1 /0/ [◖ 1 ◗] 3 /1/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗] 5 /1/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗] 7 /1/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗] 9 /1/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗] 11 /2/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗] 13 /2/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗] 15 /1/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗] 17 /1/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗] 19 /2/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 19 = -1 + 5·2^2 ◗] 21 /2/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗] 23 /2/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗] 25 /2/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗] 27 /2/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 27 = -1 + 7·2^2 ◗] 29 /2/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 29 = 1 + 7·2^2 ◗] 31 /1/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗] 33 /1/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗] 35 /2/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 35 = -1 + 9·2^2 ◗] 37 /2/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 37 = 1 + 9·2^2 ◗] 39 /2/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗] 41 /2/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗] 43 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 43 = -1 + 11·2^2 ◗] 45 /2/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗] 47 /2/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗] 49 /2/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗] 51 /2/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗] 53 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 53 = 1 + 13·2^2 ◗] 55 /2/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 55 = -1 + 7·2^3 ◗] 57 /2/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 57 = 1 + 7·2^3 ◗] 59 /2/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 59 = -1 + 15·2^2 ◗] 61 /2/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 61 = 1 + 15·2^2 ◗] 63 /1/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗] 65 /1/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗] 67 /2/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 67 = -1 + 17·2^2 ◗] 69 /2/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 69 = 1 + 17·2^2 ◗] 71 /2/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 71 = -1 + 9·2^3 ◗] 73 /2/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 73 = 1 + 9·2^3 ◗] 75 /2/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗] 77 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 19 = -1 + 5·2^2 ◗, ◖ 77 = 1 + 19·2^2 ◗] 79 /2/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 79 = -1 + 5·2^4 ◗] 81 /2/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 81 = 1 + 5·2^4 ◗] 83 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 83 = -1 + 21·2^2 ◗] 85 /2/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗] 87 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 87 = -1 + 11·2^3 ◗] 89 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 89 = 1 + 11·2^3 ◗] 91 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 91 = -1 + 23·2^2 ◗] 93 /2/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗] 95 /2/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗] 97 /2/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗] 99 /2/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗] 101 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 101 = 1 + 25·2^2 ◗] 103 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 103 = -1 + 13·2^3 ◗] 105 /2/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 105 = -7 + 7·2^4 ◗] 107 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 27 = -1 + 7·2^2 ◗, ◖ 107 = -1 + 27·2^2 ◗] 109 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 27 = -1 + 7·2^2 ◗, ◖ 109 = 1 + 27·2^2 ◗] 111 /2/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 111 = -1 + 7·2^4 ◗] 113 /2/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 113 = 1 + 7·2^4 ◗] 115 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 29 = 1 + 7·2^2 ◗, ◖ 115 = -1 + 29·2^2 ◗] 117 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 29 = 1 + 7·2^2 ◗, ◖ 117 = 1 + 29·2^2 ◗] 119 /2/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 119 = -1 + 15·2^3 ◗] 121 /2/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 121 = 1 + 15·2^3 ◗] 123 /2/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 123 = -1 + 31·2^2 ◗] 125 /2/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 125 = 1 + 31·2^2 ◗] 127 /1/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗] 129 /1/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗] 131 /2/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 131 = -1 + 33·2^2 ◗] 133 /2/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 133 = 1 + 33·2^2 ◗] 135 /2/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 135 = -1 + 17·2^3 ◗] 137 /2/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 137 = 1 + 17·2^3 ◗] 139 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 35 = -1 + 9·2^2 ◗, ◖ 139 = -1 + 35·2^2 ◗] 141 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 35 = -1 + 9·2^2 ◗, ◖ 141 = 1 + 35·2^2 ◗] 143 /2/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 143 = -1 + 9·2^4 ◗] 145 /2/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 145 = 1 + 9·2^4 ◗] 147 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 37 = 1 + 9·2^2 ◗, ◖ 147 = -1 + 37·2^2 ◗] 149 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 37 = 1 + 9·2^2 ◗, ◖ 149 = 1 + 37·2^2 ◗] 151 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 19 = -1 + 5·2^2 ◗, ◖ 151 = -1 + 19·2^3 ◗] 153 /2/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 153 = 9 + 9·2^4 ◗] 155 /2/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗] 157 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 157 = 1 + 39·2^2 ◗] 159 /2/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 159 = -1 + 5·2^5 ◗] 161 /2/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 161 = 1 + 5·2^5 ◗] 163 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 163 = -1 + 41·2^2 ◗] 165 /2/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗] 167 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 167 = -1 + 21·2^3 ◗] 169 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 169 = 1 + 21·2^3 ◗] 171 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 171 = 1 + 85·2^1 ◗] 173 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 173 = -3 + 11·2^4 ◗] 175 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 175 = -1 + 11·2^4 ◗] 177 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 177 = 1 + 11·2^4 ◗] 179 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 179 = -1 + 45·2^2 ◗] 181 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 181 = 1 + 45·2^2 ◗] 183 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 183 = -1 + 23·2^3 ◗] 185 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 185 = 1 + 23·2^3 ◗] 187 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 187 = -1 + 47·2^2 ◗] 189 /2/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 189 = -3 + 3·2^6 ◗] 191 /2/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 191 = -1 + 3·2^6 ◗] 193 /2/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 193 = 1 + 3·2^6 ◗] 195 /2/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 195 = 3 + 3·2^6 ◗] 197 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 197 = 1 + 49·2^2 ◗] 199 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 199 = -1 + 25·2^3 ◗] 201 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 201 = 1 + 25·2^3 ◗] 203 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 203 = -1 + 51·2^2 ◗] 205 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 205 = 1 + 51·2^2 ◗] 207 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 207 = -1 + 13·2^4 ◗] 209 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 209 = 1 + 13·2^4 ◗] 211 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 105 = -7 + 7·2^4 ◗, ◖ 211 = 1 + 105·2^1 ◗] 213 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 213 = -3 + 27·2^3 ◗] 215 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 27 = -1 + 7·2^2 ◗, ◖ 215 = -1 + 27·2^3 ◗] 217 /2/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 217 = -7 + 7·2^5 ◗] 219 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 55 = -1 + 7·2^3 ◗, ◖ 219 = -1 + 55·2^2 ◗] 221 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 55 = -1 + 7·2^3 ◗, ◖ 221 = 1 + 55·2^2 ◗] 223 /2/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 223 = -1 + 7·2^5 ◗] 225 /2/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 225 = 1 + 7·2^5 ◗] 227 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 57 = 1 + 7·2^3 ◗, ◖ 227 = -1 + 57·2^2 ◗] 229 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 57 = 1 + 7·2^3 ◗, ◖ 229 = 1 + 57·2^2 ◗] 231 /2/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 231 = 7 + 7·2^5 ◗] 233 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 29 = 1 + 7·2^2 ◗, ◖ 233 = 1 + 29·2^3 ◗] 235 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 59 = -1 + 15·2^2 ◗, ◖ 235 = -1 + 59·2^2 ◗] 237 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 59 = -1 + 15·2^2 ◗, ◖ 237 = 1 + 59·2^2 ◗] 239 /2/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 239 = -1 + 15·2^4 ◗] 241 /2/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 241 = 1 + 15·2^4 ◗] 243 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 61 = 1 + 15·2^2 ◗, ◖ 243 = -1 + 61·2^2 ◗] 245 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 61 = 1 + 15·2^2 ◗, ◖ 245 = 1 + 61·2^2 ◗] 247 /2/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 247 = -1 + 31·2^3 ◗] 249 /2/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 249 = 1 + 31·2^3 ◗] 251 /2/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 251 = -1 + 63·2^2 ◗] 253 /2/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 253 = 1 + 63·2^2 ◗] 255 /1/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗] 257 /1/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗] 259 /2/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 259 = -1 + 65·2^2 ◗] 261 /2/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 261 = 1 + 65·2^2 ◗] 263 /2/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 263 = -1 + 33·2^3 ◗] 265 /2/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 265 = 1 + 33·2^3 ◗] 267 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 67 = -1 + 17·2^2 ◗, ◖ 267 = -1 + 67·2^2 ◗] 269 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 67 = -1 + 17·2^2 ◗, ◖ 269 = 1 + 67·2^2 ◗] 271 /2/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 271 = -1 + 17·2^4 ◗] 273 /2/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 273 = 1 + 17·2^4 ◗] 275 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 69 = 1 + 17·2^2 ◗, ◖ 275 = -1 + 69·2^2 ◗] 277 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 69 = 1 + 17·2^2 ◗, ◖ 277 = 1 + 69·2^2 ◗] 279 /2/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 279 = -9 + 9·2^5 ◗] 281 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 35 = -1 + 9·2^2 ◗, ◖ 281 = 1 + 35·2^3 ◗] 283 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 71 = -1 + 9·2^3 ◗, ◖ 283 = -1 + 71·2^2 ◗] 285 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 71 = -1 + 9·2^3 ◗, ◖ 285 = 1 + 71·2^2 ◗] 287 /2/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 287 = -1 + 9·2^5 ◗] 289 /2/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 289 = 1 + 9·2^5 ◗] 291 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 73 = 1 + 9·2^3 ◗, ◖ 291 = -1 + 73·2^2 ◗] 293 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 73 = 1 + 9·2^3 ◗, ◖ 293 = 1 + 73·2^2 ◗] 295 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 37 = 1 + 9·2^2 ◗, ◖ 295 = -1 + 37·2^3 ◗] 297 /2/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 297 = 9 + 9·2^5 ◗] 299 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 299 = -1 + 75·2^2 ◗] 301 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 301 = 1 + 75·2^2 ◗] 303 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 19 = -1 + 5·2^2 ◗, ◖ 303 = -1 + 19·2^4 ◗] 305 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 19 = -1 + 5·2^2 ◗, ◖ 305 = 1 + 19·2^4 ◗] 307 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 153 = 9 + 9·2^4 ◗, ◖ 307 = 1 + 153·2^1 ◗] 309 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 309 = -1 + 155·2^1 ◗] 311 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 311 = -1 + 39·2^3 ◗] 313 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 313 = 1 + 39·2^3 ◗] 315 /2/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 315 = -5 + 5·2^6 ◗] 317 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 79 = -1 + 5·2^4 ◗, ◖ 317 = 1 + 79·2^2 ◗] 319 /2/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 319 = -1 + 5·2^6 ◗] 321 /2/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 321 = 1 + 5·2^6 ◗] 323 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 81 = 1 + 5·2^4 ◗, ◖ 323 = -1 + 81·2^2 ◗] 325 /2/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 325 = 5 + 5·2^6 ◗] 327 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 327 = -1 + 41·2^3 ◗] 329 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 329 = 1 + 41·2^3 ◗] 331 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 331 = 1 + 165·2^1 ◗] 333 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 333 = -3 + 21·2^4 ◗] 335 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 335 = -1 + 21·2^4 ◗] 337 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 337 = 1 + 21·2^4 ◗] 339 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 339 = -1 + 85·2^2 ◗] 341 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 341 = 1 + 85·2^2 ◗] 343 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 11 = 9 + 1·2^1 ◗, ◖ 343 = -9 + 11·2^5 ◗] 345 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 345 = 5 + 85·2^2 ◗] 347 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11 = 1 + 5·2^1 ◗, ◖ 347 = -5 + 11·2^5 ◗] 349 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 349 = -3 + 11·2^5 ◗] 351 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 351 = -1 + 11·2^5 ◗] 353 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 353 = 1 + 11·2^5 ◗] 355 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 355 = 3 + 11·2^5 ◗] 357 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 357 = -3 + 45·2^3 ◗] 359 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 359 = -1 + 45·2^3 ◗] 361 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 361 = 1 + 45·2^3 ◗] 363 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 363 = 3 + 45·2^3 ◗] 365 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 365 = -3 + 23·2^4 ◗] 367 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 367 = -1 + 23·2^4 ◗] 369 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 369 = 1 + 23·2^4 ◗] 371 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 371 = -1 + 93·2^2 ◗] 373 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 373 = 1 + 93·2^2 ◗] 375 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 375 = -1 + 47·2^3 ◗] 377 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 377 = 1 + 47·2^3 ◗] 379 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 379 = -1 + 95·2^2 ◗] 381 /2/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 381 = -3 + 3·2^7 ◗] 383 /2/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 383 = -1 + 3·2^7 ◗] 385 /2/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 385 = 1 + 3·2^7 ◗] 387 /2/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 387 = 3 + 3·2^7 ◗] 389 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 389 = 1 + 97·2^2 ◗] 391 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 391 = -1 + 49·2^3 ◗] 393 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 393 = 1 + 49·2^3 ◗] 395 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 395 = -1 + 99·2^2 ◗] 397 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 397 = 1 + 99·2^2 ◗] 399 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 399 = -1 + 25·2^4 ◗] 401 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 401 = 1 + 25·2^4 ◗] 403 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 403 = 3 + 25·2^4 ◗] 405 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 405 = -3 + 51·2^3 ◗] 407 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 407 = -1 + 51·2^3 ◗] 409 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 409 = 1 + 51·2^3 ◗] 411 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 411 = 3 + 51·2^3 ◗] 413 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 413 = -3 + 13·2^5 ◗] 415 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 415 = -1 + 13·2^5 ◗] 417 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 417 = 1 + 13·2^5 ◗] 419 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 105 = -7 + 7·2^4 ◗, ◖ 419 = -1 + 105·2^2 ◗] 421 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 105 = -7 + 7·2^4 ◗, ◖ 421 = 1 + 105·2^2 ◗] 423 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 423 = -9 + 27·2^4 ◗] 425 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 13 = 9 + 1·2^2 ◗, ◖ 425 = 9 + 13·2^5 ◗] 427 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 27 = -5 + 1·2^5 ◗, ◖ 427 = -5 + 27·2^4 ◗] 429 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 429 = -3 + 27·2^4 ◗] 431 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 27 = -1 + 7·2^2 ◗, ◖ 431 = -1 + 27·2^4 ◗] 433 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 27 = -1 + 7·2^2 ◗, ◖ 433 = 1 + 27·2^4 ◗] 435 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 217 = -7 + 7·2^5 ◗, ◖ 435 = 1 + 217·2^1 ◗] 437 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 27 = -5 + 1·2^5 ◗, ◖ 437 = 5 + 27·2^4 ◗] 439 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 55 = -1 + 7·2^3 ◗, ◖ 439 = -1 + 55·2^3 ◗] 441 /2/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 441 = -7 + 7·2^6 ◗] 443 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 111 = -1 + 7·2^4 ◗, ◖ 443 = -1 + 111·2^2 ◗] 445 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 111 = -1 + 7·2^4 ◗, ◖ 445 = 1 + 111·2^2 ◗] 447 /2/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 447 = -1 + 7·2^6 ◗] 449 /2/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 449 = 1 + 7·2^6 ◗] 451 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 113 = 1 + 7·2^4 ◗, ◖ 451 = -1 + 113·2^2 ◗] 453 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 113 = 1 + 7·2^4 ◗, ◖ 453 = 1 + 113·2^2 ◗] 455 /2/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 455 = 7 + 7·2^6 ◗] 457 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 57 = 1 + 7·2^3 ◗, ◖ 457 = 1 + 57·2^3 ◗] 459 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 113 = 1 + 7·2^4 ◗, ◖ 459 = 7 + 113·2^2 ◗] 461 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 231 = 7 + 7·2^5 ◗, ◖ 461 = -1 + 231·2^1 ◗] 463 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 29 = 1 + 7·2^2 ◗, ◖ 463 = -1 + 29·2^4 ◗] 465 /2/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 465 = -15 + 15·2^5 ◗] 467 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 29 = -3 + 1·2^5 ◗, ◖ 467 = 3 + 29·2^4 ◗] 469 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 119 = 7 + 7·2^4 ◗, ◖ 469 = -7 + 119·2^2 ◗] 471 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 59 = -1 + 15·2^2 ◗, ◖ 471 = -1 + 59·2^3 ◗] 473 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 59 = -1 + 15·2^2 ◗, ◖ 473 = 1 + 59·2^3 ◗] 475 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 119 = -1 + 15·2^3 ◗, ◖ 475 = -1 + 119·2^2 ◗] 477 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 119 = -1 + 15·2^3 ◗, ◖ 477 = 1 + 119·2^2 ◗] 479 /2/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 479 = -1 + 15·2^5 ◗] 481 /2/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 481 = 1 + 15·2^5 ◗] 483 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 121 = 1 + 15·2^3 ◗, ◖ 483 = -1 + 121·2^2 ◗] 485 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 121 = 1 + 15·2^3 ◗, ◖ 485 = 1 + 121·2^2 ◗] 487 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 61 = 1 + 15·2^2 ◗, ◖ 487 = -1 + 61·2^3 ◗] 489 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 61 = 1 + 15·2^2 ◗, ◖ 489 = 1 + 61·2^3 ◗] 491 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 123 = -1 + 31·2^2 ◗, ◖ 491 = -1 + 123·2^2 ◗] 493 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 123 = -1 + 31·2^2 ◗, ◖ 493 = 1 + 123·2^2 ◗] 495 /2/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 495 = -1 + 31·2^4 ◗] 497 /2/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 497 = 1 + 31·2^4 ◗] 499 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 125 = 1 + 31·2^2 ◗, ◖ 499 = -1 + 125·2^2 ◗] 501 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 125 = 1 + 31·2^2 ◗, ◖ 501 = 1 + 125·2^2 ◗] 503 /2/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 503 = -1 + 63·2^3 ◗] 505 /2/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 505 = 1 + 63·2^3 ◗] 507 /2/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 507 = -1 + 127·2^2 ◗] 509 /2/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 509 = 1 + 127·2^2 ◗] 511 /1/ [◖ 1 ◗, ◖ 511 = -1 + 1·2^9 ◗] 513 /1/ [◖ 1 ◗, ◖ 513 = 1 + 1·2^9 ◗] 515 /2/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 515 = -1 + 129·2^2 ◗] 517 /2/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 517 = 1 + 129·2^2 ◗] 519 /2/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 519 = -1 + 65·2^3 ◗] 521 /2/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 521 = 1 + 65·2^3 ◗] 523 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 131 = -1 + 33·2^2 ◗, ◖ 523 = -1 + 131·2^2 ◗] 525 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 131 = -1 + 33·2^2 ◗, ◖ 525 = 1 + 131·2^2 ◗] 527 /2/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 527 = -1 + 33·2^4 ◗] 529 /2/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 529 = 1 + 33·2^4 ◗] 531 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 133 = 1 + 33·2^2 ◗, ◖ 531 = -1 + 133·2^2 ◗] 533 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 133 = 1 + 33·2^2 ◗, ◖ 533 = 1 + 133·2^2 ◗] 535 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 67 = -1 + 17·2^2 ◗, ◖ 535 = -1 + 67·2^3 ◗] 537 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 67 = -1 + 17·2^2 ◗, ◖ 537 = 1 + 67·2^3 ◗] 539 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 135 = -1 + 17·2^3 ◗, ◖ 539 = -1 + 135·2^2 ◗] 541 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 135 = -1 + 17·2^3 ◗, ◖ 541 = 1 + 135·2^2 ◗] 543 /2/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 543 = -1 + 17·2^5 ◗] 545 /2/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 545 = 1 + 17·2^5 ◗] 547 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 137 = 1 + 17·2^3 ◗, ◖ 547 = -1 + 137·2^2 ◗] 549 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 137 = 1 + 17·2^3 ◗, ◖ 549 = 1 + 137·2^2 ◗] 551 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 69 = 1 + 17·2^2 ◗, ◖ 551 = -1 + 69·2^3 ◗] 553 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 69 = 1 + 17·2^2 ◗, ◖ 553 = 1 + 69·2^3 ◗] 555 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 35 = -5 + 5·2^3 ◗, ◖ 555 = -5 + 35·2^4 ◗] 557 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 279 = -9 + 9·2^5 ◗, ◖ 557 = -1 + 279·2^1 ◗] 559 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 35 = -1 + 9·2^2 ◗, ◖ 559 = -1 + 35·2^4 ◗] 561 /2/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 561 = 17 + 17·2^5 ◗] 563 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 35 = 3 + 1·2^5 ◗, ◖ 563 = 3 + 35·2^4 ◗] 565 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 35 = -5 + 5·2^3 ◗, ◖ 565 = 5 + 35·2^4 ◗] 567 /2/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 567 = -9 + 9·2^6 ◗] 569 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 71 = -1 + 9·2^3 ◗, ◖ 569 = 1 + 71·2^3 ◗] 571 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 143 = -1 + 9·2^4 ◗, ◖ 571 = -1 + 143·2^2 ◗] 573 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 143 = -1 + 9·2^4 ◗, ◖ 573 = 1 + 143·2^2 ◗] 575 /2/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 575 = -1 + 9·2^6 ◗] 577 /2/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 577 = 1 + 9·2^6 ◗] 579 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 145 = 1 + 9·2^4 ◗, ◖ 579 = -1 + 145·2^2 ◗] 581 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 145 = 1 + 9·2^4 ◗, ◖ 581 = 1 + 145·2^2 ◗] 583 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 73 = 1 + 9·2^3 ◗, ◖ 583 = -1 + 73·2^3 ◗] 585 /2/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 585 = 9 + 9·2^6 ◗] 587 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 37 = 5 + 1·2^5 ◗, ◖ 587 = -5 + 37·2^4 ◗] 589 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 145 = 1 + 9·2^4 ◗, ◖ 589 = 9 + 145·2^2 ◗] 591 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 37 = 1 + 9·2^2 ◗, ◖ 591 = -1 + 37·2^4 ◗] 593 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 37 = 1 + 9·2^2 ◗, ◖ 593 = 1 + 37·2^4 ◗] 595 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 297 = 9 + 9·2^5 ◗, ◖ 595 = 1 + 297·2^1 ◗] 597 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 37 = 5 + 1·2^5 ◗, ◖ 597 = 5 + 37·2^4 ◗] 599 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 599 = -1 + 75·2^3 ◗] 601 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 601 = 1 + 75·2^3 ◗] 603 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 19 = -1 + 5·2^2 ◗, ◖ 603 = -5 + 19·2^5 ◗] 605 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 19 = 3 + 1·2^4 ◗, ◖ 605 = -3 + 19·2^5 ◗] 607 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 19 = -1 + 5·2^2 ◗, ◖ 607 = -1 + 19·2^5 ◗] 609 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 19 = -1 + 5·2^2 ◗, ◖ 609 = 1 + 19·2^5 ◗] 611 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 153 = 9 + 9·2^4 ◗, ◖ 611 = -1 + 153·2^2 ◗] 613 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 153 = 9 + 9·2^4 ◗, ◖ 613 = 1 + 153·2^2 ◗] 615 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 615 = -5 + 155·2^2 ◗] 617 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 19 = 1 + 9·2^1 ◗, ◖ 617 = 9 + 19·2^5 ◗] 619 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 619 = -1 + 155·2^2 ◗] 621 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 621 = 1 + 155·2^2 ◗] 623 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 623 = -1 + 39·2^4 ◗] 625 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 625 = 1 + 39·2^4 ◗] 627 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 79 = -1 + 5·2^4 ◗, ◖ 627 = -5 + 79·2^3 ◗] 629 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 315 = -5 + 5·2^6 ◗, ◖ 629 = -1 + 315·2^1 ◗] 631 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 79 = -1 + 5·2^4 ◗, ◖ 631 = -1 + 79·2^3 ◗] 633 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 79 = -1 + 5·2^4 ◗, ◖ 633 = 1 + 79·2^3 ◗] 635 /2/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 635 = -5 + 5·2^7 ◗] 637 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 159 = -1 + 5·2^5 ◗, ◖ 637 = 1 + 159·2^2 ◗] 639 /2/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 639 = -1 + 5·2^7 ◗] 641 /2/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 641 = 1 + 5·2^7 ◗] 643 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 161 = 1 + 5·2^5 ◗, ◖ 643 = -1 + 161·2^2 ◗] 645 /2/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 645 = 5 + 5·2^7 ◗] 647 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 81 = 1 + 5·2^4 ◗, ◖ 647 = -1 + 81·2^3 ◗] 649 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 81 = 1 + 5·2^4 ◗, ◖ 649 = 1 + 81·2^3 ◗] 651 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 325 = 5 + 5·2^6 ◗, ◖ 651 = 1 + 325·2^1 ◗] 653 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 81 = 1 + 5·2^4 ◗, ◖ 653 = 5 + 81·2^3 ◗] 655 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 655 = -1 + 41·2^4 ◗] 657 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 657 = 1 + 41·2^4 ◗] 659 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 659 = -1 + 165·2^2 ◗] 661 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 661 = 1 + 165·2^2 ◗] 663 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 85 = 17 + 17·2^2 ◗, ◖ 663 = -17 + 85·2^3 ◗] 665 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 665 = 5 + 165·2^2 ◗] 667 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 667 = -5 + 21·2^5 ◗] 669 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 669 = -3 + 21·2^5 ◗] 671 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 671 = -1 + 21·2^5 ◗] 673 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 673 = 1 + 21·2^5 ◗] 675 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 675 = 3 + 21·2^5 ◗] 677 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 677 = 5 + 21·2^5 ◗] 679 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 679 = -1 + 85·2^3 ◗] 681 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 681 = 1 + 85·2^3 ◗] 683 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 171 = 1 + 85·2^1 ◗, ◖ 683 = -1 + 171·2^2 ◗] 685 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 685 = 5 + 85·2^3 ◗] 687 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 43 = -1 + 11·2^2 ◗, ◖ 687 = -1 + 43·2^4 ◗] 689 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 21 = 17 + 1·2^2 ◗, ◖ 689 = 17 + 21·2^5 ◗] 691 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 173 = -3 + 11·2^4 ◗, ◖ 691 = -1 + 173·2^2 ◗] 693 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 165 = 33 + 33·2^2 ◗, ◖ 693 = 33 + 165·2^2 ◗] 695 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 11 = 9 + 1·2^1 ◗, ◖ 695 = -9 + 11·2^6 ◗] 697 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 11 = 7 + 1·2^2 ◗, ◖ 697 = -7 + 11·2^6 ◗] 699 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11 = 1 + 5·2^1 ◗, ◖ 699 = -5 + 11·2^6 ◗] 701 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 701 = -3 + 11·2^6 ◗] 703 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 703 = -1 + 11·2^6 ◗] 705 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 705 = 1 + 11·2^6 ◗] 707 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 707 = 3 + 11·2^6 ◗] 709 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11 = 1 + 5·2^1 ◗, ◖ 709 = 5 + 11·2^6 ◗] 711 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 45 = 9 + 9·2^2 ◗, ◖ 711 = -9 + 45·2^4 ◗] 713 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 11 = 9 + 1·2^1 ◗, ◖ 713 = 9 + 11·2^6 ◗] 715 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 45 = 5 + 5·2^3 ◗, ◖ 715 = -5 + 45·2^4 ◗] 717 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 717 = -3 + 45·2^4 ◗] 719 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 719 = -1 + 45·2^4 ◗] 721 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 721 = 1 + 45·2^4 ◗] 723 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 723 = 3 + 45·2^4 ◗] 725 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 45 = 5 + 5·2^3 ◗, ◖ 725 = 5 + 45·2^4 ◗] 727 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 23 = -9 + 1·2^5 ◗, ◖ 727 = -9 + 23·2^5 ◗] 729 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 45 = 9 + 9·2^2 ◗, ◖ 729 = 9 + 45·2^4 ◗] 731 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 183 = -1 + 23·2^3 ◗, ◖ 731 = -1 + 183·2^2 ◗] 733 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 733 = -3 + 23·2^5 ◗] 735 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 735 = -1 + 23·2^5 ◗] 737 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 737 = 1 + 23·2^5 ◗] 739 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 739 = 3 + 23·2^5 ◗] 741 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 741 = -3 + 93·2^3 ◗] 743 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 743 = -1 + 93·2^3 ◗] 745 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 745 = 1 + 93·2^3 ◗] 747 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 747 = 3 + 93·2^3 ◗] 749 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 749 = -3 + 47·2^4 ◗] 751 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 751 = -1 + 47·2^4 ◗] 753 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 753 = 1 + 47·2^4 ◗] 755 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 189 = -3 + 3·2^6 ◗, ◖ 755 = -1 + 189·2^2 ◗] 757 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 189 = -3 + 3·2^6 ◗, ◖ 757 = 1 + 189·2^2 ◗] 759 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 759 = -1 + 95·2^3 ◗] 761 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 761 = 1 + 95·2^3 ◗] 763 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 191 = -1 + 3·2^6 ◗, ◖ 763 = -1 + 191·2^2 ◗] 765 /2/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 765 = -3 + 3·2^8 ◗] 767 /2/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 767 = -1 + 3·2^8 ◗] 769 /2/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 769 = 1 + 3·2^8 ◗] 771 /2/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 771 = 3 + 3·2^8 ◗] 773 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 193 = 1 + 3·2^6 ◗, ◖ 773 = 1 + 193·2^2 ◗] 775 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 775 = -1 + 97·2^3 ◗] 777 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 777 = 1 + 97·2^3 ◗] 779 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 195 = 3 + 3·2^6 ◗, ◖ 779 = -1 + 195·2^2 ◗] 781 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 195 = 3 + 3·2^6 ◗, ◖ 781 = 1 + 195·2^2 ◗] 783 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 783 = -1 + 49·2^4 ◗] 785 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 785 = 1 + 49·2^4 ◗] 787 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 787 = 3 + 49·2^4 ◗] 789 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 789 = -3 + 99·2^3 ◗] 791 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 791 = -1 + 99·2^3 ◗] 793 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 793 = 1 + 99·2^3 ◗] 795 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 795 = 3 + 99·2^3 ◗] 797 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 797 = -3 + 25·2^5 ◗] 799 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 799 = -1 + 25·2^5 ◗] 801 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 801 = 1 + 25·2^5 ◗] 803 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 803 = 3 + 25·2^5 ◗] 805 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 25 = 5 + 5·2^2 ◗, ◖ 805 = 5 + 25·2^5 ◗] 807 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 25 = -7 + 1·2^5 ◗, ◖ 807 = 7 + 25·2^5 ◗] 809 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 25 = 9 + 1·2^4 ◗, ◖ 809 = 9 + 25·2^5 ◗] 811 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 203 = -1 + 51·2^2 ◗, ◖ 811 = -1 + 203·2^2 ◗] 813 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 813 = -3 + 51·2^4 ◗] 815 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 815 = -1 + 51·2^4 ◗] 817 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 817 = 1 + 51·2^4 ◗] 819 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 819 = 3 + 51·2^4 ◗] 821 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 205 = 1 + 51·2^2 ◗, ◖ 821 = 1 + 205·2^2 ◗] 823 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 13 = 9 + 1·2^2 ◗, ◖ 823 = -9 + 13·2^6 ◗] 825 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 13 = -1 + 7·2^1 ◗, ◖ 825 = -7 + 13·2^6 ◗] 827 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 827 = -5 + 13·2^6 ◗] 829 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 829 = -3 + 13·2^6 ◗] 831 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 831 = -1 + 13·2^6 ◗] 833 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 833 = 1 + 13·2^6 ◗] 835 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 835 = 3 + 13·2^6 ◗] 837 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 837 = 5 + 13·2^6 ◗] 839 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 105 = -7 + 7·2^4 ◗, ◖ 839 = -1 + 105·2^3 ◗] 841 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 105 = -7 + 7·2^4 ◗, ◖ 841 = 1 + 105·2^3 ◗] 843 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 105 = -7 + 7·2^4 ◗, ◖ 211 = 1 + 105·2^1 ◗, ◖ 843 = -1 + 211·2^2 ◗] 845 /3/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 195 = 65 + 65·2^1 ◗, ◖ 845 = 65 + 195·2^2 ◗] 847 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 105 = -7 + 7·2^4 ◗, ◖ 847 = 7 + 105·2^3 ◗] 849 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 13 = 17 - 1·2^2 ◗, ◖ 849 = 17 + 13·2^6 ◗] 851 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 213 = -3 + 27·2^3 ◗, ◖ 851 = -1 + 213·2^2 ◗] 853 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 213 = -3 + 27·2^3 ◗, ◖ 853 = 1 + 213·2^2 ◗] 855 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 855 = -9 + 27·2^5 ◗] 857 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 27 = -1 + 7·2^2 ◗, ◖ 857 = -7 + 27·2^5 ◗] 859 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 27 = -5 + 1·2^5 ◗, ◖ 859 = -5 + 27·2^5 ◗] 861 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 861 = -3 + 27·2^5 ◗] 863 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 27 = -1 + 7·2^2 ◗, ◖ 863 = -1 + 27·2^5 ◗] 865 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 27 = -1 + 7·2^2 ◗, ◖ 865 = 1 + 27·2^5 ◗] 867 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 217 = -7 + 7·2^5 ◗, ◖ 867 = -1 + 217·2^2 ◗] 869 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 217 = -7 + 7·2^5 ◗, ◖ 869 = 1 + 217·2^2 ◗] 871 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 55 = -9 + 1·2^6 ◗, ◖ 871 = -9 + 55·2^4 ◗] 873 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 873 = 9 + 27·2^5 ◗] 875 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 217 = -7 + 7·2^5 ◗, ◖ 875 = 7 + 217·2^2 ◗] 877 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 55 = -1 + 7·2^3 ◗, ◖ 219 = -1 + 55·2^2 ◗, ◖ 877 = 1 + 219·2^2 ◗] 879 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 55 = -1 + 7·2^3 ◗, ◖ 879 = -1 + 55·2^4 ◗] 881 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 55 = -1 + 7·2^3 ◗, ◖ 881 = 1 + 55·2^4 ◗] 883 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 441 = -7 + 7·2^6 ◗, ◖ 883 = 1 + 441·2^1 ◗] 885 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 223 = -1 + 7·2^5 ◗, ◖ 885 = -7 + 223·2^2 ◗] 887 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 111 = -1 + 7·2^4 ◗, ◖ 887 = -1 + 111·2^3 ◗] 889 /2/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 889 = -7 + 7·2^7 ◗] 891 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 223 = -1 + 7·2^5 ◗, ◖ 891 = -1 + 223·2^2 ◗] 893 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 223 = -1 + 7·2^5 ◗, ◖ 893 = 1 + 223·2^2 ◗] 895 /2/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 895 = -1 + 7·2^7 ◗] 897 /2/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 897 = 1 + 7·2^7 ◗] 899 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 225 = 1 + 7·2^5 ◗, ◖ 899 = -1 + 225·2^2 ◗] 901 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 225 = 1 + 7·2^5 ◗, ◖ 901 = 1 + 225·2^2 ◗] 903 /2/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 903 = 7 + 7·2^7 ◗] 905 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 113 = 1 + 7·2^4 ◗, ◖ 905 = 1 + 113·2^3 ◗] 907 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 225 = 1 + 7·2^5 ◗, ◖ 907 = 7 + 225·2^2 ◗] 909 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 455 = 7 + 7·2^6 ◗, ◖ 909 = -1 + 455·2^1 ◗] 911 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 57 = 1 + 7·2^3 ◗, ◖ 911 = -1 + 57·2^4 ◗] 913 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 57 = 1 + 7·2^3 ◗, ◖ 913 = 1 + 57·2^4 ◗] 915 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 225 = -15 + 15·2^4 ◗, ◖ 915 = 15 + 225·2^2 ◗] 917 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 231 = 7 + 7·2^5 ◗, ◖ 917 = -7 + 231·2^2 ◗] 919 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 57 = 1 + 7·2^3 ◗, ◖ 919 = 7 + 57·2^4 ◗] 921 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 29 = 1 + 7·2^2 ◗, ◖ 921 = -7 + 29·2^5 ◗] 923 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 231 = 7 + 7·2^5 ◗, ◖ 923 = -1 + 231·2^2 ◗] 925 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 231 = 7 + 7·2^5 ◗, ◖ 925 = 1 + 231·2^2 ◗] 927 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 29 = 1 + 7·2^2 ◗, ◖ 927 = -1 + 29·2^5 ◗] 929 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 29 = 1 + 7·2^2 ◗, ◖ 929 = 1 + 29·2^5 ◗] 931 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 465 = -15 + 15·2^5 ◗, ◖ 931 = 1 + 465·2^1 ◗] 933 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 29 = 1 + 7·2^2 ◗, ◖ 233 = 1 + 29·2^3 ◗, ◖ 933 = 1 + 233·2^2 ◗] 935 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 29 = 1 + 7·2^2 ◗, ◖ 935 = 7 + 29·2^5 ◗] 937 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 119 = -1 + 15·2^3 ◗, ◖ 937 = -15 + 119·2^3 ◗] 939 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 59 = -5 + 1·2^6 ◗, ◖ 939 = -5 + 59·2^4 ◗] 941 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 239 = -1 + 15·2^4 ◗, ◖ 941 = -15 + 239·2^2 ◗] 943 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 59 = -1 + 15·2^2 ◗, ◖ 943 = -1 + 59·2^4 ◗] 945 /2/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 945 = -15 + 15·2^6 ◗] 947 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 481 = 1 + 15·2^5 ◗, ◖ 947 = -15 + 481·2^1 ◗] 949 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 59 = -5 + 1·2^6 ◗, ◖ 949 = 5 + 59·2^4 ◗] 951 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 119 = -1 + 15·2^3 ◗, ◖ 951 = -1 + 119·2^3 ◗] 953 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 119 = -1 + 15·2^3 ◗, ◖ 953 = 1 + 119·2^3 ◗] 955 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 239 = -1 + 15·2^4 ◗, ◖ 955 = -1 + 239·2^2 ◗] 957 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 239 = -1 + 15·2^4 ◗, ◖ 957 = 1 + 239·2^2 ◗] 959 /2/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 959 = -1 + 15·2^6 ◗] 961 /2/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 961 = 1 + 15·2^6 ◗] 963 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 241 = 1 + 15·2^4 ◗, ◖ 963 = -1 + 241·2^2 ◗] 965 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 241 = 1 + 15·2^4 ◗, ◖ 965 = 1 + 241·2^2 ◗] 967 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 121 = 1 + 15·2^3 ◗, ◖ 967 = -1 + 121·2^3 ◗] 969 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 121 = 1 + 15·2^3 ◗, ◖ 969 = 1 + 121·2^3 ◗] 971 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 239 = -1 + 15·2^4 ◗, ◖ 971 = 15 + 239·2^2 ◗] 973 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 61 = -3 + 1·2^6 ◗, ◖ 973 = -3 + 61·2^4 ◗] 975 /2/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 975 = 15 + 15·2^6 ◗] 977 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 61 = 1 + 15·2^2 ◗, ◖ 977 = 1 + 61·2^4 ◗] 979 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 61 = -3 + 1·2^6 ◗, ◖ 979 = 3 + 61·2^4 ◗] 981 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 61 = 1 + 15·2^2 ◗, ◖ 245 = 1 + 61·2^2 ◗, ◖ 981 = 1 + 245·2^2 ◗] 983 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 123 = -1 + 31·2^2 ◗, ◖ 983 = -1 + 123·2^3 ◗] 985 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 123 = -1 + 31·2^2 ◗, ◖ 985 = 1 + 123·2^3 ◗] 987 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 247 = -1 + 31·2^3 ◗, ◖ 987 = -1 + 247·2^2 ◗] 989 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 247 = -1 + 31·2^3 ◗, ◖ 989 = 1 + 247·2^2 ◗] 991 /2/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 991 = -1 + 31·2^5 ◗] 993 /2/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 993 = 1 + 31·2^5 ◗] 995 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 249 = 1 + 31·2^3 ◗, ◖ 995 = -1 + 249·2^2 ◗] 997 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 249 = 1 + 31·2^3 ◗, ◖ 997 = 1 + 249·2^2 ◗] 999 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 125 = 1 + 31·2^2 ◗, ◖ 999 = -1 + 125·2^3 ◗] 1001 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 125 = 1 + 31·2^2 ◗, ◖ 1001 = 1 + 125·2^3 ◗] 1003 /3/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 251 = -1 + 63·2^2 ◗, ◖ 1003 = -1 + 251·2^2 ◗] 1005 /3/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 251 = -1 + 63·2^2 ◗, ◖ 1005 = 1 + 251·2^2 ◗] 1007 /2/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 1007 = -1 + 63·2^4 ◗] 1009 /2/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 1009 = 1 + 63·2^4 ◗] 1011 /3/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 253 = 1 + 63·2^2 ◗, ◖ 1011 = -1 + 253·2^2 ◗] 1013 /3/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 253 = 1 + 63·2^2 ◗, ◖ 1013 = 1 + 253·2^2 ◗] 1015 /2/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 1015 = -1 + 127·2^3 ◗] 1017 /2/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 1017 = 1 + 127·2^3 ◗] 1019 /2/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 1019 = -1 + 255·2^2 ◗] 1021 /2/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 1021 = 1 + 255·2^2 ◗] 1023 /1/ [◖ 1 ◗, ◖ 1023 = -1 + 1·2^10 ◗] 1025 /1/ [◖ 1 ◗, ◖ 1025 = 1 + 1·2^10 ◗] 1027 /2/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 1027 = -1 + 257·2^2 ◗] 1029 /2/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 1029 = 1 + 257·2^2 ◗] 1031 /2/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 1031 = -1 + 129·2^3 ◗] 1033 /2/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 1033 = 1 + 129·2^3 ◗] 1035 /3/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 259 = -1 + 65·2^2 ◗, ◖ 1035 = -1 + 259·2^2 ◗] 1037 /3/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 259 = -1 + 65·2^2 ◗, ◖ 1037 = 1 + 259·2^2 ◗] 1039 /2/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 1039 = -1 + 65·2^4 ◗] 1041 /2/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 1041 = 1 + 65·2^4 ◗] 1043 /3/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 261 = 1 + 65·2^2 ◗, ◖ 1043 = -1 + 261·2^2 ◗] 1045 /3/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 261 = 1 + 65·2^2 ◗, ◖ 1045 = 1 + 261·2^2 ◗] 1047 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 131 = -1 + 33·2^2 ◗, ◖ 1047 = -1 + 131·2^3 ◗] 1049 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 131 = -1 + 33·2^2 ◗, ◖ 1049 = 1 + 131·2^3 ◗] 1051 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 263 = -1 + 33·2^3 ◗, ◖ 1051 = -1 + 263·2^2 ◗] 1053 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 263 = -1 + 33·2^3 ◗, ◖ 1053 = 1 + 263·2^2 ◗] 1055 /2/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 1055 = -1 + 33·2^5 ◗] 1057 /2/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 1057 = 1 + 33·2^5 ◗] 1059 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 265 = 1 + 33·2^3 ◗, ◖ 1059 = -1 + 265·2^2 ◗] 1061 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 265 = 1 + 33·2^3 ◗, ◖ 1061 = 1 + 265·2^2 ◗] 1063 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 133 = 1 + 33·2^2 ◗, ◖ 1063 = -1 + 133·2^3 ◗] 1065 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 133 = 1 + 33·2^2 ◗, ◖ 1065 = 1 + 133·2^3 ◗] 1067 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 271 = -1 + 17·2^4 ◗, ◖ 1067 = -17 + 271·2^2 ◗] 1069 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 67 = 3 + 1·2^6 ◗, ◖ 1069 = -3 + 67·2^4 ◗] 1071 /2/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1071 = -17 + 17·2^6 ◗] 1073 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 67 = -1 + 17·2^2 ◗, ◖ 1073 = 1 + 67·2^4 ◗] 1075 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 67 = 3 + 1·2^6 ◗, ◖ 1075 = 3 + 67·2^4 ◗] 1077 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 67 = -1 + 17·2^2 ◗, ◖ 269 = 1 + 67·2^2 ◗, ◖ 1077 = 1 + 269·2^2 ◗] 1079 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 135 = -1 + 17·2^3 ◗, ◖ 1079 = -1 + 135·2^3 ◗] 1081 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 135 = -1 + 17·2^3 ◗, ◖ 1081 = 1 + 135·2^3 ◗] 1083 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 271 = -1 + 17·2^4 ◗, ◖ 1083 = -1 + 271·2^2 ◗] 1085 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 271 = -1 + 17·2^4 ◗, ◖ 1085 = 1 + 271·2^2 ◗] 1087 /2/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1087 = -1 + 17·2^6 ◗] 1089 /2/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1089 = 1 + 17·2^6 ◗] 1091 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 273 = 1 + 17·2^4 ◗, ◖ 1091 = -1 + 273·2^2 ◗] 1093 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 273 = 1 + 17·2^4 ◗, ◖ 1093 = 1 + 273·2^2 ◗] 1095 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 137 = 1 + 17·2^3 ◗, ◖ 1095 = -1 + 137·2^3 ◗] 1097 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 137 = 1 + 17·2^3 ◗, ◖ 1097 = 1 + 137·2^3 ◗] 1099 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 69 = 5 + 1·2^6 ◗, ◖ 1099 = -5 + 69·2^4 ◗] 1101 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 271 = -1 + 17·2^4 ◗, ◖ 1101 = 17 + 271·2^2 ◗] 1103 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 69 = 1 + 17·2^2 ◗, ◖ 1103 = -1 + 69·2^4 ◗] 1105 /2/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1105 = 17 + 17·2^6 ◗] 1107 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 279 = -9 + 9·2^5 ◗, ◖ 1107 = -9 + 279·2^2 ◗] 1109 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 69 = 5 + 1·2^6 ◗, ◖ 1109 = 5 + 69·2^4 ◗] 1111 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 35 = -1 + 9·2^2 ◗, ◖ 1111 = -9 + 35·2^5 ◗] 1113 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 35 = 7 + 7·2^2 ◗, ◖ 1113 = -7 + 35·2^5 ◗] 1115 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 279 = -9 + 9·2^5 ◗, ◖ 1115 = -1 + 279·2^2 ◗] 1117 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 279 = -9 + 9·2^5 ◗, ◖ 1117 = 1 + 279·2^2 ◗] 1119 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 35 = -1 + 9·2^2 ◗, ◖ 1119 = -1 + 35·2^5 ◗] 1121 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 35 = -1 + 9·2^2 ◗, ◖ 1121 = 1 + 35·2^5 ◗] 1123 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 561 = 17 + 17·2^5 ◗, ◖ 1123 = 1 + 561·2^1 ◗] 1125 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 35 = -5 + 5·2^3 ◗, ◖ 1125 = 5 + 35·2^5 ◗] 1127 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 71 = -1 + 9·2^3 ◗, ◖ 1127 = -9 + 71·2^4 ◗] 1129 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 35 = -1 + 9·2^2 ◗, ◖ 1129 = 9 + 35·2^5 ◗] 1131 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 71 = -1 + 9·2^3 ◗, ◖ 283 = -1 + 71·2^2 ◗, ◖ 1131 = -1 + 283·2^2 ◗] 1133 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 567 = -9 + 9·2^6 ◗, ◖ 1133 = -1 + 567·2^1 ◗] 1135 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 71 = -1 + 9·2^3 ◗, ◖ 1135 = -1 + 71·2^4 ◗] 1137 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 71 = -1 + 9·2^3 ◗, ◖ 1137 = 1 + 71·2^4 ◗] 1139 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 287 = -1 + 9·2^5 ◗, ◖ 1139 = -9 + 287·2^2 ◗] 1141 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 575 = -1 + 9·2^6 ◗, ◖ 1141 = -9 + 575·2^1 ◗] 1143 /2/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 1143 = -9 + 9·2^7 ◗] 1145 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 143 = -1 + 9·2^4 ◗, ◖ 1145 = 1 + 143·2^3 ◗] 1147 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 287 = -1 + 9·2^5 ◗, ◖ 1147 = -1 + 287·2^2 ◗] 1149 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 287 = -1 + 9·2^5 ◗, ◖ 1149 = 1 + 287·2^2 ◗] 1151 /2/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 1151 = -1 + 9·2^7 ◗] 1153 /2/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 1153 = 1 + 9·2^7 ◗] 1155 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 289 = 1 + 9·2^5 ◗, ◖ 1155 = -1 + 289·2^2 ◗] 1157 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 289 = 1 + 9·2^5 ◗, ◖ 1157 = 1 + 289·2^2 ◗] 1159 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 145 = 1 + 9·2^4 ◗, ◖ 1159 = -1 + 145·2^3 ◗] 1161 /2/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 1161 = 9 + 9·2^7 ◗] 1163 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 577 = 1 + 9·2^6 ◗, ◖ 1163 = 9 + 577·2^1 ◗] 1165 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 289 = 1 + 9·2^5 ◗, ◖ 1165 = 9 + 289·2^2 ◗] 1167 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 73 = 1 + 9·2^3 ◗, ◖ 1167 = -1 + 73·2^4 ◗] 1169 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 73 = 1 + 9·2^3 ◗, ◖ 1169 = 1 + 73·2^4 ◗] 1171 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 585 = 9 + 9·2^6 ◗, ◖ 1171 = 1 + 585·2^1 ◗] 1173 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 289 = 17 + 17·2^4 ◗, ◖ 1173 = 17 + 289·2^2 ◗] 1175 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 37 = 1 + 9·2^2 ◗, ◖ 1175 = -9 + 37·2^5 ◗] 1177 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 73 = 1 + 9·2^3 ◗, ◖ 1177 = 9 + 73·2^4 ◗] 1179 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 37 = 5 + 1·2^5 ◗, ◖ 1179 = -5 + 37·2^5 ◗] 1181 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 37 = 1 + 9·2^2 ◗, ◖ 295 = -1 + 37·2^3 ◗, ◖ 1181 = 1 + 295·2^2 ◗] 1183 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 37 = 1 + 9·2^2 ◗, ◖ 1183 = -1 + 37·2^5 ◗] 1185 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 37 = 1 + 9·2^2 ◗, ◖ 1185 = 1 + 37·2^5 ◗] 1187 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 297 = 9 + 9·2^5 ◗, ◖ 1187 = -1 + 297·2^2 ◗] 1189 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 297 = 9 + 9·2^5 ◗, ◖ 1189 = 1 + 297·2^2 ◗] 1191 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 37 = 1 + 9·2^2 ◗, ◖ 149 = 1 + 37·2^2 ◗, ◖ 1191 = -1 + 149·2^3 ◗] 1193 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 37 = 1 + 9·2^2 ◗, ◖ 1193 = 9 + 37·2^5 ◗] 1195 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 1195 = -5 + 75·2^4 ◗] 1197 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 297 = 9 + 9·2^5 ◗, ◖ 1197 = 9 + 297·2^2 ◗] 1199 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 1199 = -1 + 75·2^4 ◗] 1201 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 1201 = 1 + 75·2^4 ◗] 1203 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 301 = 1 + 75·2^2 ◗, ◖ 1203 = -1 + 301·2^2 ◗] 1205 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 1205 = 5 + 75·2^4 ◗] 1207 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 19 = 1 + 9·2^1 ◗, ◖ 1207 = -9 + 19·2^6 ◗] 1209 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 155 = 31 + 31·2^2 ◗, ◖ 1209 = -31 + 155·2^3 ◗] 1211 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 19 = -1 + 5·2^2 ◗, ◖ 1211 = -5 + 19·2^6 ◗] 1213 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 19 = 3 + 1·2^4 ◗, ◖ 1213 = -3 + 19·2^6 ◗] 1215 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 19 = -1 + 5·2^2 ◗, ◖ 1215 = -1 + 19·2^6 ◗] 1217 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 19 = -1 + 5·2^2 ◗, ◖ 1217 = 1 + 19·2^6 ◗] 1219 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 19 = 3 + 1·2^4 ◗, ◖ 1219 = 3 + 19·2^6 ◗] 1221 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 19 = -1 + 5·2^2 ◗, ◖ 1221 = 5 + 19·2^6 ◗] 1223 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 153 = 9 + 9·2^4 ◗, ◖ 1223 = -1 + 153·2^3 ◗] 1225 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 153 = 9 + 9·2^4 ◗, ◖ 1225 = 1 + 153·2^3 ◗] 1227 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 153 = 9 + 9·2^4 ◗, ◖ 307 = 1 + 153·2^1 ◗, ◖ 1227 = -1 + 307·2^2 ◗] 1229 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 153 = 9 + 9·2^4 ◗, ◖ 307 = 1 + 153·2^1 ◗, ◖ 1229 = 1 + 307·2^2 ◗] 1231 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 19 = 15 + 1·2^2 ◗, ◖ 1231 = 15 + 19·2^6 ◗] 1233 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 153 = 9 + 9·2^4 ◗, ◖ 1233 = 9 + 153·2^3 ◗] 1235 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 1235 = -5 + 155·2^3 ◗] 1237 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 309 = -1 + 155·2^1 ◗, ◖ 1237 = 1 + 309·2^2 ◗] 1239 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 1239 = -1 + 155·2^3 ◗] 1241 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 1241 = 1 + 155·2^3 ◗] 1243 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 1243 = -5 + 39·2^5 ◗] 1245 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 1245 = 5 + 155·2^3 ◗] 1247 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 1247 = -1 + 39·2^5 ◗] 1249 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 1249 = 1 + 39·2^5 ◗] 1251 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 313 = 1 + 39·2^3 ◗, ◖ 1251 = -1 + 313·2^2 ◗] 1253 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 1253 = 5 + 39·2^5 ◗] 1255 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 315 = -5 + 5·2^6 ◗, ◖ 1255 = -5 + 315·2^2 ◗] 1257 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 157 = 1 + 39·2^2 ◗, ◖ 1257 = 1 + 157·2^3 ◗] 1259 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 315 = -5 + 5·2^6 ◗, ◖ 1259 = -1 + 315·2^2 ◗] 1261 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 315 = -5 + 5·2^6 ◗, ◖ 1261 = 1 + 315·2^2 ◗] 1263 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 79 = -1 + 5·2^4 ◗, ◖ 1263 = -1 + 79·2^4 ◗] 1265 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 79 = -1 + 5·2^4 ◗, ◖ 1265 = 1 + 79·2^4 ◗] 1267 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 159 = -1 + 5·2^5 ◗, ◖ 1267 = -5 + 159·2^3 ◗] 1269 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 635 = -5 + 5·2^7 ◗, ◖ 1269 = -1 + 635·2^1 ◗] 1271 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 159 = -1 + 5·2^5 ◗, ◖ 1271 = -1 + 159·2^3 ◗] 1273 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 159 = -1 + 5·2^5 ◗, ◖ 1273 = 1 + 159·2^3 ◗] 1275 /2/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 1275 = -5 + 5·2^8 ◗] 1277 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 319 = -1 + 5·2^6 ◗, ◖ 1277 = 1 + 319·2^2 ◗] 1279 /2/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 1279 = -1 + 5·2^8 ◗] 1281 /2/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 1281 = 1 + 5·2^8 ◗] 1283 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 321 = 1 + 5·2^6 ◗, ◖ 1283 = -1 + 321·2^2 ◗] 1285 /2/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 1285 = 5 + 5·2^8 ◗] 1287 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 161 = 1 + 5·2^5 ◗, ◖ 1287 = -1 + 161·2^3 ◗] 1289 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 161 = 1 + 5·2^5 ◗, ◖ 1289 = 1 + 161·2^3 ◗] 1291 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 645 = 5 + 5·2^7 ◗, ◖ 1291 = 1 + 645·2^1 ◗] 1293 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 161 = 1 + 5·2^5 ◗, ◖ 1293 = 5 + 161·2^3 ◗] 1295 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 81 = 1 + 5·2^4 ◗, ◖ 1295 = -1 + 81·2^4 ◗] 1297 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 81 = 1 + 5·2^4 ◗, ◖ 1297 = 1 + 81·2^4 ◗] 1299 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 325 = 5 + 5·2^6 ◗, ◖ 1299 = -1 + 325·2^2 ◗] 1301 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 325 = 5 + 5·2^6 ◗, ◖ 1301 = 1 + 325·2^2 ◗] 1303 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 41 = 9 + 1·2^5 ◗, ◖ 1303 = -9 + 41·2^5 ◗] 1305 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 325 = 5 + 5·2^6 ◗, ◖ 1305 = 5 + 325·2^2 ◗] 1307 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 1307 = -5 + 41·2^5 ◗] 1309 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 327 = -1 + 41·2^3 ◗, ◖ 1309 = 1 + 327·2^2 ◗] 1311 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 1311 = -1 + 41·2^5 ◗] 1313 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 1313 = 1 + 41·2^5 ◗] 1315 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 1315 = -5 + 165·2^3 ◗] 1317 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 1317 = 5 + 41·2^5 ◗] 1319 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 1319 = -1 + 165·2^3 ◗] 1321 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 1321 = 1 + 165·2^3 ◗] 1323 /3/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 315 = 63 + 63·2^2 ◗, ◖ 1323 = 63 + 315·2^2 ◗] 1325 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 1325 = 5 + 165·2^3 ◗] 1327 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 21 = 17 + 1·2^2 ◗, ◖ 1327 = -17 + 21·2^6 ◗] 1329 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 83 = -1 + 21·2^2 ◗, ◖ 1329 = 1 + 83·2^4 ◗] 1331 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 333 = -3 + 21·2^4 ◗, ◖ 1331 = -1 + 333·2^2 ◗] 1333 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 333 = -3 + 21·2^4 ◗, ◖ 1333 = 1 + 333·2^2 ◗] 1335 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 167 = -1 + 21·2^3 ◗, ◖ 1335 = -1 + 167·2^3 ◗] 1337 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 21 = 7 + 7·2^1 ◗, ◖ 1337 = -7 + 21·2^6 ◗] 1339 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 1339 = -5 + 21·2^6 ◗] 1341 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 1341 = -3 + 21·2^6 ◗] 1343 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 1343 = -1 + 21·2^6 ◗] 1345 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 1345 = 1 + 21·2^6 ◗] 1347 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 1347 = 3 + 21·2^6 ◗] 1349 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 1349 = 5 + 21·2^6 ◗] 1351 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 21 = 7 + 7·2^1 ◗, ◖ 1351 = 7 + 21·2^6 ◗] 1353 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 165 = 33 + 33·2^2 ◗, ◖ 1353 = 33 + 165·2^3 ◗] 1355 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 1355 = -5 + 85·2^4 ◗] 1357 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 339 = -1 + 85·2^2 ◗, ◖ 1357 = 1 + 339·2^2 ◗] 1359 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 1359 = -1 + 85·2^4 ◗] 1361 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 1361 = 1 + 85·2^4 ◗] 1363 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 341 = 1 + 85·2^2 ◗, ◖ 1363 = -1 + 341·2^2 ◗] 1365 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 1365 = 5 + 85·2^4 ◗] 1367 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 171 = 1 + 85·2^1 ◗, ◖ 1367 = -1 + 171·2^3 ◗] 1369 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 171 = 1 + 85·2^1 ◗, ◖ 1369 = 1 + 171·2^3 ◗] 1371 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 685 = 5 + 85·2^3 ◗, ◖ 1371 = 1 + 685·2^1 ◗] 1373 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 11 = 9 + 1·2^1 ◗, ◖ 343 = -9 + 11·2^5 ◗, ◖ 1373 = 1 + 343·2^2 ◗] 1375 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 43 = -1 + 11·2^2 ◗, ◖ 1375 = -1 + 43·2^5 ◗] 1377 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 85 = 17 + 17·2^2 ◗, ◖ 1377 = 17 + 85·2^4 ◗] 1379 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 345 = 5 + 85·2^2 ◗, ◖ 1379 = -1 + 345·2^2 ◗] 1381 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 345 = 5 + 85·2^2 ◗, ◖ 1381 = 1 + 345·2^2 ◗] 1383 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 173 = -3 + 11·2^4 ◗, ◖ 1383 = -1 + 173·2^3 ◗] 1385 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 173 = -3 + 11·2^4 ◗, ◖ 1385 = 1 + 173·2^3 ◗] 1387 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11 = 1 + 5·2^1 ◗, ◖ 347 = -5 + 11·2^5 ◗, ◖ 1387 = -1 + 347·2^2 ◗] 1389 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11 = 1 + 5·2^1 ◗, ◖ 347 = -5 + 11·2^5 ◗, ◖ 1389 = 1 + 347·2^2 ◗] 1391 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 87 = -1 + 11·2^3 ◗, ◖ 1391 = -1 + 87·2^4 ◗] 1393 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 11 = 15 - 1·2^2 ◗, ◖ 1393 = -15 + 11·2^7 ◗] 1395 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 1395 = -45 + 45·2^5 ◗] 1397 /3/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 381 = 127 + 127·2^1 ◗, ◖ 1397 = -127 + 381·2^2 ◗] 1399 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 11 = 9 + 1·2^1 ◗, ◖ 1399 = -9 + 11·2^7 ◗] 1401 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 11 = 7 + 1·2^2 ◗, ◖ 1401 = -7 + 11·2^7 ◗] 1403 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11 = 1 + 5·2^1 ◗, ◖ 1403 = -5 + 11·2^7 ◗] 1405 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 1405 = -3 + 11·2^7 ◗] 1407 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 1407 = -1 + 11·2^7 ◗] 1409 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 1409 = 1 + 11·2^7 ◗] 1411 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 1411 = 3 + 11·2^7 ◗] 1413 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11 = 1 + 5·2^1 ◗, ◖ 1413 = 5 + 11·2^7 ◗] 1415 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 11 = 7 + 1·2^2 ◗, ◖ 1415 = 7 + 11·2^7 ◗] 1417 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 11 = 9 + 1·2^1 ◗, ◖ 1417 = 9 + 11·2^7 ◗] 1419 /3/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 387 = 129 + 129·2^1 ◗, ◖ 1419 = -129 + 387·2^2 ◗] 1421 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 355 = 3 + 11·2^5 ◗, ◖ 1421 = 1 + 355·2^2 ◗] 1423 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 11 = 15 - 1·2^2 ◗, ◖ 1423 = 15 + 11·2^7 ◗] 1425 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 45 = 15 + 15·2^1 ◗, ◖ 1425 = -15 + 45·2^5 ◗] 1427 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 357 = -3 + 45·2^3 ◗, ◖ 1427 = -1 + 357·2^2 ◗] 1429 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 357 = -3 + 45·2^3 ◗, ◖ 1429 = 1 + 357·2^2 ◗] 1431 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 45 = 9 + 9·2^2 ◗, ◖ 1431 = -9 + 45·2^5 ◗] 1433 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 179 = -1 + 45·2^2 ◗, ◖ 1433 = 1 + 179·2^3 ◗] 1435 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 45 = 5 + 5·2^3 ◗, ◖ 1435 = -5 + 45·2^5 ◗] 1437 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 1437 = -3 + 45·2^5 ◗] 1439 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 1439 = -1 + 45·2^5 ◗] 1441 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 1441 = 1 + 45·2^5 ◗] 1443 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 1443 = 3 + 45·2^5 ◗] 1445 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 45 = 5 + 5·2^3 ◗, ◖ 1445 = 5 + 45·2^5 ◗] 1447 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 181 = 1 + 45·2^2 ◗, ◖ 1447 = -1 + 181·2^3 ◗] 1449 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 45 = 9 + 9·2^2 ◗, ◖ 1449 = 9 + 45·2^5 ◗] 1451 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 363 = 3 + 45·2^3 ◗, ◖ 1451 = -1 + 363·2^2 ◗] 1453 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 363 = 3 + 45·2^3 ◗, ◖ 1453 = 1 + 363·2^2 ◗] 1455 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 45 = 15 + 15·2^1 ◗, ◖ 1455 = 15 + 45·2^5 ◗] 1457 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 23 = 15 + 1·2^3 ◗, ◖ 1457 = -15 + 23·2^6 ◗] 1459 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 365 = -3 + 23·2^4 ◗, ◖ 1459 = -1 + 365·2^2 ◗] 1461 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 365 = -3 + 23·2^4 ◗, ◖ 1461 = 1 + 365·2^2 ◗] 1463 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 23 = -9 + 1·2^5 ◗, ◖ 1463 = -9 + 23·2^6 ◗] 1465 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 23 = 7 + 1·2^4 ◗, ◖ 1465 = -7 + 23·2^6 ◗] 1467 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 367 = -1 + 23·2^4 ◗, ◖ 1467 = -1 + 367·2^2 ◗] 1469 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 1469 = -3 + 23·2^6 ◗] 1471 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 1471 = -1 + 23·2^6 ◗] 1473 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 1473 = 1 + 23·2^6 ◗] 1475 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 1475 = 3 + 23·2^6 ◗] 1477 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 369 = 1 + 23·2^4 ◗, ◖ 1477 = 1 + 369·2^2 ◗] 1479 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 23 = 7 + 1·2^4 ◗, ◖ 1479 = 7 + 23·2^6 ◗] 1481 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 23 = -9 + 1·2^5 ◗, ◖ 1481 = 9 + 23·2^6 ◗] 1483 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 371 = -1 + 93·2^2 ◗, ◖ 1483 = -1 + 371·2^2 ◗] 1485 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 1485 = -3 + 93·2^4 ◗] 1487 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 1487 = -1 + 93·2^4 ◗] 1489 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 1489 = 1 + 93·2^4 ◗] 1491 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 1491 = 3 + 93·2^4 ◗] 1493 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 373 = 1 + 93·2^2 ◗, ◖ 1493 = 1 + 373·2^2 ◗] 1495 /3/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 195 = 65 + 65·2^1 ◗, ◖ 1495 = -65 + 195·2^3 ◗] 1497 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 187 = -1 + 47·2^2 ◗, ◖ 1497 = 1 + 187·2^3 ◗] 1499 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 375 = -1 + 47·2^3 ◗, ◖ 1499 = -1 + 375·2^2 ◗] 1501 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 1501 = -3 + 47·2^5 ◗] 1503 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 1503 = -1 + 47·2^5 ◗] 1505 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 1505 = 1 + 47·2^5 ◗] 1507 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 1507 = 3 + 47·2^5 ◗] 1509 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 189 = -3 + 3·2^6 ◗, ◖ 1509 = -3 + 189·2^3 ◗] 1511 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 189 = -3 + 3·2^6 ◗, ◖ 1511 = -1 + 189·2^3 ◗] 1513 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 189 = -3 + 3·2^6 ◗, ◖ 1513 = 1 + 189·2^3 ◗] 1515 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 189 = -3 + 3·2^6 ◗, ◖ 1515 = 3 + 189·2^3 ◗] 1517 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 1517 = -3 + 95·2^4 ◗] 1519 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 1519 = -1 + 95·2^4 ◗] 1521 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 1521 = 1 + 95·2^4 ◗] 1523 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 381 = -3 + 3·2^7 ◗, ◖ 1523 = -1 + 381·2^2 ◗] 1525 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 381 = -3 + 3·2^7 ◗, ◖ 1525 = 1 + 381·2^2 ◗] 1527 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 191 = -1 + 3·2^6 ◗, ◖ 1527 = -1 + 191·2^3 ◗] 1529 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 191 = -1 + 3·2^6 ◗, ◖ 1529 = 1 + 191·2^3 ◗] 1531 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 383 = -1 + 3·2^7 ◗, ◖ 1531 = -1 + 383·2^2 ◗] 1533 /2/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1533 = -3 + 3·2^9 ◗] 1535 /2/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1535 = -1 + 3·2^9 ◗] 1537 /2/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1537 = 1 + 3·2^9 ◗] 1539 /2/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1539 = 3 + 3·2^9 ◗] 1541 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 385 = 1 + 3·2^7 ◗, ◖ 1541 = 1 + 385·2^2 ◗] 1543 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 193 = 1 + 3·2^6 ◗, ◖ 1543 = -1 + 193·2^3 ◗] 1545 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 193 = 1 + 3·2^6 ◗, ◖ 1545 = 1 + 193·2^3 ◗] 1547 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 387 = 3 + 3·2^7 ◗, ◖ 1547 = -1 + 387·2^2 ◗] 1549 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 387 = 3 + 3·2^7 ◗, ◖ 1549 = 1 + 387·2^2 ◗] 1551 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 1551 = -1 + 97·2^4 ◗] 1553 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 1553 = 1 + 97·2^4 ◗] 1555 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 1555 = 3 + 97·2^4 ◗] 1557 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 195 = 3 + 3·2^6 ◗, ◖ 1557 = -3 + 195·2^3 ◗] 1559 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 195 = 3 + 3·2^6 ◗, ◖ 1559 = -1 + 195·2^3 ◗] 1561 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 195 = 3 + 3·2^6 ◗, ◖ 1561 = 1 + 195·2^3 ◗] 1563 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 195 = 3 + 3·2^6 ◗, ◖ 1563 = 3 + 195·2^3 ◗] 1565 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 1565 = -3 + 49·2^5 ◗] 1567 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 1567 = -1 + 49·2^5 ◗] 1569 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 1569 = 1 + 49·2^5 ◗] 1571 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 1571 = 3 + 49·2^5 ◗] 1573 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 393 = 1 + 49·2^3 ◗, ◖ 1573 = 1 + 393·2^2 ◗] 1575 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 49 = -7 + 7·2^3 ◗, ◖ 1575 = 7 + 49·2^5 ◗] 1577 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 197 = 1 + 49·2^2 ◗, ◖ 1577 = 1 + 197·2^3 ◗] 1579 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 395 = -1 + 99·2^2 ◗, ◖ 1579 = -1 + 395·2^2 ◗] 1581 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 1581 = -3 + 99·2^4 ◗] 1583 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 1583 = -1 + 99·2^4 ◗] 1585 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 1585 = 1 + 99·2^4 ◗] 1587 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 1587 = 3 + 99·2^4 ◗] 1589 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 397 = 1 + 99·2^2 ◗, ◖ 1589 = 1 + 397·2^2 ◗] 1591 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 25 = 9 + 1·2^4 ◗, ◖ 1591 = -9 + 25·2^6 ◗] 1593 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 25 = -7 + 1·2^5 ◗, ◖ 1593 = -7 + 25·2^6 ◗] 1595 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 25 = 5 + 5·2^2 ◗, ◖ 1595 = -5 + 25·2^6 ◗] 1597 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 1597 = -3 + 25·2^6 ◗] 1599 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 1599 = -1 + 25·2^6 ◗] 1601 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 1601 = 1 + 25·2^6 ◗] 1603 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 1603 = 3 + 25·2^6 ◗] 1605 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 25 = 5 + 5·2^2 ◗, ◖ 1605 = 5 + 25·2^6 ◗] 1607 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 25 = -7 + 1·2^5 ◗, ◖ 1607 = 7 + 25·2^6 ◗] 1609 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 25 = 9 + 1·2^4 ◗, ◖ 1609 = 9 + 25·2^6 ◗] 1611 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 403 = 3 + 25·2^4 ◗, ◖ 1611 = -1 + 403·2^2 ◗] 1613 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 403 = 3 + 25·2^4 ◗, ◖ 1613 = 1 + 403·2^2 ◗] 1615 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 51 = 17 + 17·2^1 ◗, ◖ 1615 = -17 + 51·2^5 ◗] 1617 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 25 = 17 + 1·2^3 ◗, ◖ 1617 = 17 + 25·2^6 ◗] 1619 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 405 = -3 + 51·2^3 ◗, ◖ 1619 = -1 + 405·2^2 ◗] 1621 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 405 = -3 + 51·2^3 ◗, ◖ 1621 = 1 + 405·2^2 ◗] 1623 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 203 = -1 + 51·2^2 ◗, ◖ 1623 = -1 + 203·2^3 ◗] 1625 /3/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 195 = 65 + 65·2^1 ◗, ◖ 1625 = 65 + 195·2^3 ◗] 1627 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 407 = -1 + 51·2^3 ◗, ◖ 1627 = -1 + 407·2^2 ◗] 1629 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 1629 = -3 + 51·2^5 ◗] 1631 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 1631 = -1 + 51·2^5 ◗] 1633 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 1633 = 1 + 51·2^5 ◗] 1635 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 1635 = 3 + 51·2^5 ◗] 1637 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 409 = 1 + 51·2^3 ◗, ◖ 1637 = 1 + 409·2^2 ◗] 1639 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 205 = 1 + 51·2^2 ◗, ◖ 1639 = -1 + 205·2^3 ◗] 1641 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 205 = 1 + 51·2^2 ◗, ◖ 1641 = 1 + 205·2^3 ◗] 1643 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 411 = 3 + 51·2^3 ◗, ◖ 1643 = -1 + 411·2^2 ◗] 1645 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 411 = 3 + 51·2^3 ◗, ◖ 1645 = 1 + 411·2^2 ◗] 1647 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 13 = 17 - 1·2^2 ◗, ◖ 1647 = -17 + 13·2^7 ◗] 1649 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 51 = 17 + 17·2^1 ◗, ◖ 1649 = 17 + 51·2^5 ◗] 1651 /3/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 381 = 127 + 127·2^1 ◗, ◖ 1651 = 127 + 381·2^2 ◗] 1653 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 413 = -3 + 13·2^5 ◗, ◖ 1653 = 1 + 413·2^2 ◗] 1655 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 13 = 9 + 1·2^2 ◗, ◖ 1655 = -9 + 13·2^7 ◗] 1657 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 13 = -1 + 7·2^1 ◗, ◖ 1657 = -7 + 13·2^7 ◗] 1659 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 1659 = -5 + 13·2^7 ◗] 1661 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 1661 = -3 + 13·2^7 ◗] 1663 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 1663 = -1 + 13·2^7 ◗] 1665 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 1665 = 1 + 13·2^7 ◗] 1667 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 1667 = 3 + 13·2^7 ◗] 1669 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 1669 = 5 + 13·2^7 ◗] 1671 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 13 = -1 + 7·2^1 ◗, ◖ 1671 = 7 + 13·2^7 ◗] 1673 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 13 = 9 + 1·2^2 ◗, ◖ 1673 = 9 + 13·2^7 ◗] 1675 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 105 = -7 + 7·2^4 ◗, ◖ 419 = -1 + 105·2^2 ◗, ◖ 1675 = -1 + 419·2^2 ◗] 1677 /3/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 387 = 129 + 129·2^1 ◗, ◖ 1677 = 129 + 387·2^2 ◗] 1679 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 105 = -7 + 7·2^4 ◗, ◖ 1679 = -1 + 105·2^4 ◗] 1681 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 105 = -7 + 7·2^4 ◗, ◖ 1681 = 1 + 105·2^4 ◗] 1683 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 1683 = 51 + 51·2^5 ◗] 1685 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 105 = -7 + 7·2^4 ◗, ◖ 421 = 1 + 105·2^2 ◗, ◖ 1685 = 1 + 421·2^2 ◗] 1687 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 105 = -7 + 7·2^4 ◗, ◖ 1687 = 7 + 105·2^4 ◗] 1689 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 105 = -7 + 7·2^4 ◗, ◖ 211 = 1 + 105·2^1 ◗, ◖ 1689 = 1 + 211·2^3 ◗] 1691 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 423 = -9 + 27·2^4 ◗, ◖ 1691 = -1 + 423·2^2 ◗] 1693 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 423 = -9 + 27·2^4 ◗, ◖ 1693 = 1 + 423·2^2 ◗] 1695 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 105 = -15 + 15·2^3 ◗, ◖ 1695 = 15 + 105·2^4 ◗] 1697 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 27 = 31 - 1·2^2 ◗, ◖ 1697 = -31 + 27·2^6 ◗] 1699 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 13 = 9 + 1·2^2 ◗, ◖ 425 = 9 + 13·2^5 ◗, ◖ 1699 = -1 + 425·2^2 ◗] 1701 /3/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 441 = -63 + 63·2^3 ◗, ◖ 1701 = -63 + 441·2^2 ◗] 1703 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 213 = -3 + 27·2^3 ◗, ◖ 1703 = -1 + 213·2^3 ◗] 1705 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 217 = -31 + 31·2^3 ◗, ◖ 1705 = -31 + 217·2^3 ◗] 1707 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 27 = -5 + 1·2^5 ◗, ◖ 427 = -5 + 27·2^4 ◗, ◖ 1707 = -1 + 427·2^2 ◗] 1709 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 27 = -5 + 1·2^5 ◗, ◖ 427 = -5 + 27·2^4 ◗, ◖ 1709 = 1 + 427·2^2 ◗] 1711 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 27 = -1 + 7·2^2 ◗, ◖ 107 = -1 + 27·2^2 ◗, ◖ 1711 = -1 + 107·2^4 ◗] 1713 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 27 = -1 + 7·2^2 ◗, ◖ 107 = -1 + 27·2^2 ◗, ◖ 1713 = 1 + 107·2^4 ◗] 1715 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 429 = -3 + 27·2^4 ◗, ◖ 1715 = -1 + 429·2^2 ◗] 1717 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 429 = -3 + 27·2^4 ◗, ◖ 1717 = 1 + 429·2^2 ◗] 1719 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 1719 = -9 + 27·2^6 ◗] 1721 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 27 = -1 + 7·2^2 ◗, ◖ 1721 = -7 + 27·2^6 ◗] 1723 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 27 = -5 + 1·2^5 ◗, ◖ 1723 = -5 + 27·2^6 ◗] 1725 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 1725 = -3 + 27·2^6 ◗] 1727 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 27 = -1 + 7·2^2 ◗, ◖ 1727 = -1 + 27·2^6 ◗] 1729 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 27 = -1 + 7·2^2 ◗, ◖ 1729 = 1 + 27·2^6 ◗] 1731 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 1731 = 3 + 27·2^6 ◗] 1733 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 27 = -5 + 1·2^5 ◗, ◖ 1733 = 5 + 27·2^6 ◗] 1735 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 217 = -7 + 7·2^5 ◗, ◖ 1735 = -1 + 217·2^3 ◗] 1737 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 217 = -7 + 7·2^5 ◗, ◖ 1737 = 1 + 217·2^3 ◗] 1739 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 217 = -7 + 7·2^5 ◗, ◖ 435 = 1 + 217·2^1 ◗, ◖ 1739 = -1 + 435·2^2 ◗] 1741 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 217 = -7 + 7·2^5 ◗, ◖ 435 = 1 + 217·2^1 ◗, ◖ 1741 = 1 + 435·2^2 ◗] 1743 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 217 = -7 + 7·2^5 ◗, ◖ 1743 = 7 + 217·2^3 ◗] 1745 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 27 = -1 + 7·2^2 ◗, ◖ 109 = 1 + 27·2^2 ◗, ◖ 1745 = 1 + 109·2^4 ◗] 1747 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 27 = -5 + 1·2^5 ◗, ◖ 437 = 5 + 27·2^4 ◗, ◖ 1747 = -1 + 437·2^2 ◗] 1749 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 27 = -5 + 1·2^5 ◗, ◖ 437 = 5 + 27·2^4 ◗, ◖ 1749 = 1 + 437·2^2 ◗] 1751 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 55 = -9 + 1·2^6 ◗, ◖ 1751 = -9 + 55·2^5 ◗] 1753 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 55 = -1 + 7·2^3 ◗, ◖ 1753 = -7 + 55·2^5 ◗] 1755 /3/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 455 = -65 + 65·2^3 ◗, ◖ 1755 = -65 + 455·2^2 ◗] 1757 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 441 = -7 + 7·2^6 ◗, ◖ 1757 = -7 + 441·2^2 ◗] 1759 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 55 = -1 + 7·2^3 ◗, ◖ 1759 = -1 + 55·2^5 ◗] 1761 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 55 = -1 + 7·2^3 ◗, ◖ 1761 = 1 + 55·2^5 ◗] 1763 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 441 = -7 + 7·2^6 ◗, ◖ 1763 = -1 + 441·2^2 ◗] 1765 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 441 = -7 + 7·2^6 ◗, ◖ 1765 = 1 + 441·2^2 ◗] 1767 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 55 = -1 + 7·2^3 ◗, ◖ 1767 = 7 + 55·2^5 ◗] 1769 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 55 = -9 + 1·2^6 ◗, ◖ 1769 = 9 + 55·2^5 ◗] 1771 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 441 = -7 + 7·2^6 ◗, ◖ 1771 = 7 + 441·2^2 ◗] 1773 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 111 = -1 + 7·2^4 ◗, ◖ 443 = -1 + 111·2^2 ◗, ◖ 1773 = 1 + 443·2^2 ◗] 1775 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 111 = -1 + 7·2^4 ◗, ◖ 1775 = -1 + 111·2^4 ◗] 1777 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 111 = -1 + 7·2^4 ◗, ◖ 1777 = 1 + 111·2^4 ◗] 1779 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 889 = -7 + 7·2^7 ◗, ◖ 1779 = 1 + 889·2^1 ◗] 1781 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 447 = -1 + 7·2^6 ◗, ◖ 1781 = -7 + 447·2^2 ◗] 1783 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 223 = -1 + 7·2^5 ◗, ◖ 1783 = -1 + 223·2^3 ◗] 1785 /2/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 1785 = -7 + 7·2^8 ◗] 1787 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 447 = -1 + 7·2^6 ◗, ◖ 1787 = -1 + 447·2^2 ◗] 1789 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 447 = -1 + 7·2^6 ◗, ◖ 1789 = 1 + 447·2^2 ◗] 1791 /2/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 1791 = -1 + 7·2^8 ◗] 1793 /2/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 1793 = 1 + 7·2^8 ◗] 1795 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 449 = 1 + 7·2^6 ◗, ◖ 1795 = -1 + 449·2^2 ◗] 1797 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 449 = 1 + 7·2^6 ◗, ◖ 1797 = 1 + 449·2^2 ◗] 1799 /2/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 1799 = 7 + 7·2^8 ◗] 1801 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 225 = 1 + 7·2^5 ◗, ◖ 1801 = 1 + 225·2^3 ◗] 1803 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 449 = 1 + 7·2^6 ◗, ◖ 1803 = 7 + 449·2^2 ◗] 1805 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 903 = 7 + 7·2^7 ◗, ◖ 1805 = -1 + 903·2^1 ◗] 1807 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 113 = 1 + 7·2^4 ◗, ◖ 1807 = -1 + 113·2^4 ◗] 1809 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 113 = 1 + 7·2^4 ◗, ◖ 1809 = 1 + 113·2^4 ◗] 1811 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 113 = 1 + 7·2^4 ◗, ◖ 453 = 1 + 113·2^2 ◗, ◖ 1811 = -1 + 453·2^2 ◗] 1813 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 455 = 7 + 7·2^6 ◗, ◖ 1813 = -7 + 455·2^2 ◗] 1815 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 113 = 1 + 7·2^4 ◗, ◖ 1815 = 7 + 113·2^4 ◗] 1817 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 57 = 1 + 7·2^3 ◗, ◖ 1817 = -7 + 57·2^5 ◗] 1819 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 455 = 7 + 7·2^6 ◗, ◖ 1819 = -1 + 455·2^2 ◗] 1821 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 455 = 7 + 7·2^6 ◗, ◖ 1821 = 1 + 455·2^2 ◗] 1823 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 57 = 1 + 7·2^3 ◗, ◖ 1823 = -1 + 57·2^5 ◗] 1825 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 57 = 1 + 7·2^3 ◗, ◖ 1825 = 1 + 57·2^5 ◗] 1827 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 455 = 7 + 7·2^6 ◗, ◖ 1827 = 7 + 455·2^2 ◗] 1829 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 465 = -31 + 31·2^4 ◗, ◖ 1829 = -31 + 465·2^2 ◗] 1831 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 57 = 1 + 7·2^3 ◗, ◖ 1831 = 7 + 57·2^5 ◗] 1833 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 57 = 1 + 7·2^3 ◗, ◖ 229 = 1 + 57·2^2 ◗, ◖ 1833 = 1 + 229·2^3 ◗] 1835 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 113 = 1 + 7·2^4 ◗, ◖ 459 = 7 + 113·2^2 ◗, ◖ 1835 = -1 + 459·2^2 ◗] 1837 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 57 = 1 + 7·2^3 ◗, ◖ 919 = 7 + 57·2^4 ◗, ◖ 1837 = -1 + 919·2^1 ◗] 1839 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 29 = 1 + 7·2^2 ◗, ◖ 115 = -1 + 29·2^2 ◗, ◖ 1839 = -1 + 115·2^4 ◗] 1841 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 231 = 7 + 7·2^5 ◗, ◖ 1841 = -7 + 231·2^3 ◗] 1843 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 231 = 7 + 7·2^5 ◗, ◖ 461 = -1 + 231·2^1 ◗, ◖ 1843 = -1 + 461·2^2 ◗] 1845 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 465 = -15 + 15·2^5 ◗, ◖ 1845 = -15 + 465·2^2 ◗] 1847 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 231 = 7 + 7·2^5 ◗, ◖ 1847 = -1 + 231·2^3 ◗] 1849 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 231 = 7 + 7·2^5 ◗, ◖ 1849 = 1 + 231·2^3 ◗] 1851 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 29 = 1 + 7·2^2 ◗, ◖ 463 = -1 + 29·2^4 ◗, ◖ 1851 = -1 + 463·2^2 ◗] 1853 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 29 = -3 + 1·2^5 ◗, ◖ 1853 = -3 + 29·2^6 ◗] 1855 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 29 = 1 + 7·2^2 ◗, ◖ 1855 = -1 + 29·2^6 ◗] 1857 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 29 = 1 + 7·2^2 ◗, ◖ 1857 = 1 + 29·2^6 ◗] 1859 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 465 = -15 + 15·2^5 ◗, ◖ 1859 = -1 + 465·2^2 ◗] 1861 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 465 = -15 + 15·2^5 ◗, ◖ 1861 = 1 + 465·2^2 ◗] 1863 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 29 = 1 + 7·2^2 ◗, ◖ 1863 = 7 + 29·2^6 ◗] 1865 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 29 = 1 + 7·2^2 ◗, ◖ 233 = 1 + 29·2^3 ◗, ◖ 1865 = 1 + 233·2^3 ◗] 1867 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 29 = -3 + 1·2^5 ◗, ◖ 467 = 3 + 29·2^4 ◗, ◖ 1867 = -1 + 467·2^2 ◗] 1869 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 29 = -3 + 1·2^5 ◗, ◖ 467 = 3 + 29·2^4 ◗, ◖ 1869 = 1 + 467·2^2 ◗] 1871 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 29 = -1 + 15·2^1 ◗, ◖ 1871 = 15 + 29·2^6 ◗] 1873 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 59 = -1 + 15·2^2 ◗, ◖ 1873 = -15 + 59·2^5 ◗] 1875 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 465 = -15 + 15·2^5 ◗, ◖ 1875 = 15 + 465·2^2 ◗] 1877 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 59 = -5 + 1·2^6 ◗, ◖ 939 = -5 + 59·2^4 ◗, ◖ 1877 = -1 + 939·2^1 ◗] 1879 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 59 = -1 + 15·2^2 ◗, ◖ 235 = -1 + 59·2^2 ◗, ◖ 1879 = -1 + 235·2^3 ◗] 1881 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 231 = -33 + 33·2^3 ◗, ◖ 1881 = 33 + 231·2^3 ◗] 1883 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 59 = -5 + 1·2^6 ◗, ◖ 1883 = -5 + 59·2^5 ◗] 1885 /3/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 455 = -65 + 65·2^3 ◗, ◖ 1885 = 65 + 455·2^2 ◗] 1887 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 59 = -1 + 15·2^2 ◗, ◖ 1887 = -1 + 59·2^5 ◗] 1889 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 59 = -1 + 15·2^2 ◗, ◖ 1889 = 1 + 59·2^5 ◗] 1891 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 945 = -15 + 15·2^6 ◗, ◖ 1891 = 1 + 945·2^1 ◗] 1893 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 59 = -5 + 1·2^6 ◗, ◖ 1893 = 5 + 59·2^5 ◗] 1895 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 119 = -9 + 1·2^7 ◗, ◖ 1895 = -9 + 119·2^4 ◗] 1897 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 119 = 7 + 7·2^4 ◗, ◖ 1897 = -7 + 119·2^4 ◗] 1899 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 119 = -1 + 15·2^3 ◗, ◖ 475 = -1 + 119·2^2 ◗, ◖ 1899 = -1 + 475·2^2 ◗] 1901 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 479 = -1 + 15·2^5 ◗, ◖ 1901 = -15 + 479·2^2 ◗] 1903 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 119 = -1 + 15·2^3 ◗, ◖ 1903 = -1 + 119·2^4 ◗] 1905 /2/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 1905 = -15 + 15·2^7 ◗] 1907 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 961 = 1 + 15·2^6 ◗, ◖ 1907 = -15 + 961·2^1 ◗] 1909 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 481 = 1 + 15·2^5 ◗, ◖ 1909 = -15 + 481·2^2 ◗] 1911 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 239 = -1 + 15·2^4 ◗, ◖ 1911 = -1 + 239·2^3 ◗] 1913 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 239 = -1 + 15·2^4 ◗, ◖ 1913 = 1 + 239·2^3 ◗] 1915 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 479 = -1 + 15·2^5 ◗, ◖ 1915 = -1 + 479·2^2 ◗] 1917 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 479 = -1 + 15·2^5 ◗, ◖ 1917 = 1 + 479·2^2 ◗] 1919 /2/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 1919 = -1 + 15·2^7 ◗] 1921 /2/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 1921 = 1 + 15·2^7 ◗] 1923 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 481 = 1 + 15·2^5 ◗, ◖ 1923 = -1 + 481·2^2 ◗] 1925 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 481 = 1 + 15·2^5 ◗, ◖ 1925 = 1 + 481·2^2 ◗] 1927 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 241 = 1 + 15·2^4 ◗, ◖ 1927 = -1 + 241·2^3 ◗] 1929 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 241 = 1 + 15·2^4 ◗, ◖ 1929 = 1 + 241·2^3 ◗] 1931 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 479 = -1 + 15·2^5 ◗, ◖ 1931 = 15 + 479·2^2 ◗] 1933 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 959 = -1 + 15·2^6 ◗, ◖ 1933 = 15 + 959·2^1 ◗] 1935 /2/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 1935 = 15 + 15·2^7 ◗] 1937 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 121 = 1 + 15·2^3 ◗, ◖ 1937 = 1 + 121·2^4 ◗] 1939 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 481 = 1 + 15·2^5 ◗, ◖ 1939 = 15 + 481·2^2 ◗] 1941 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 121 = 1 + 15·2^3 ◗, ◖ 485 = 1 + 121·2^2 ◗, ◖ 1941 = 1 + 485·2^2 ◗] 1943 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 121 = -7 + 1·2^7 ◗, ◖ 1943 = 7 + 121·2^4 ◗] 1945 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 247 = -1 + 31·2^3 ◗, ◖ 1945 = -31 + 247·2^3 ◗] 1947 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 495 = -33 + 33·2^4 ◗, ◖ 1947 = -33 + 495·2^2 ◗] 1949 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 975 = 15 + 15·2^6 ◗, ◖ 1949 = -1 + 975·2^1 ◗] 1951 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 61 = 1 + 15·2^2 ◗, ◖ 1951 = -1 + 61·2^5 ◗] 1953 /2/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 1953 = -31 + 31·2^6 ◗] 1955 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 61 = -3 + 1·2^6 ◗, ◖ 1955 = 3 + 61·2^5 ◗] 1957 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 497 = 1 + 31·2^4 ◗, ◖ 1957 = -31 + 497·2^2 ◗] 1959 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 61 = 1 + 15·2^2 ◗, ◖ 245 = 1 + 61·2^2 ◗, ◖ 1959 = -1 + 245·2^3 ◗] 1961 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 249 = 1 + 31·2^3 ◗, ◖ 1961 = -31 + 249·2^3 ◗] 1963 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 123 = -5 + 1·2^7 ◗, ◖ 1963 = -5 + 123·2^4 ◗] 1965 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 495 = 15 + 15·2^5 ◗, ◖ 1965 = -15 + 495·2^2 ◗] 1967 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 123 = -1 + 31·2^2 ◗, ◖ 1967 = -1 + 123·2^4 ◗] 1969 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 123 = -1 + 31·2^2 ◗, ◖ 1969 = 1 + 123·2^4 ◗] 1971 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 123 = -1 + 31·2^2 ◗, ◖ 493 = 1 + 123·2^2 ◗, ◖ 1971 = -1 + 493·2^2 ◗] 1973 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 123 = -5 + 1·2^7 ◗, ◖ 1973 = 5 + 123·2^4 ◗] 1975 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 247 = -1 + 31·2^3 ◗, ◖ 1975 = -1 + 247·2^3 ◗] 1977 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 247 = -1 + 31·2^3 ◗, ◖ 1977 = 1 + 247·2^3 ◗] 1979 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 495 = -1 + 31·2^4 ◗, ◖ 1979 = -1 + 495·2^2 ◗] 1981 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 495 = -1 + 31·2^4 ◗, ◖ 1981 = 1 + 495·2^2 ◗] 1983 /2/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 1983 = -1 + 31·2^6 ◗] 1985 /2/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 1985 = 1 + 31·2^6 ◗] 1987 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 497 = 1 + 31·2^4 ◗, ◖ 1987 = -1 + 497·2^2 ◗] 1989 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 497 = 1 + 31·2^4 ◗, ◖ 1989 = 1 + 497·2^2 ◗] 1991 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 249 = 1 + 31·2^3 ◗, ◖ 1991 = -1 + 249·2^3 ◗] 1993 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 249 = 1 + 31·2^3 ◗, ◖ 1993 = 1 + 249·2^3 ◗] 1995 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 495 = 15 + 15·2^5 ◗, ◖ 1995 = 15 + 495·2^2 ◗] 1997 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 125 = -3 + 1·2^7 ◗, ◖ 1997 = -3 + 125·2^4 ◗] 1999 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 125 = 1 + 31·2^2 ◗, ◖ 1999 = -1 + 125·2^4 ◗] 2001 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 125 = 1 + 31·2^2 ◗, ◖ 2001 = 1 + 125·2^4 ◗] 2003 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 125 = -3 + 1·2^7 ◗, ◖ 2003 = 3 + 125·2^4 ◗] 2005 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 125 = 1 + 31·2^2 ◗, ◖ 501 = 1 + 125·2^2 ◗, ◖ 2005 = 1 + 501·2^2 ◗] 2007 /3/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 251 = -1 + 63·2^2 ◗, ◖ 2007 = -1 + 251·2^3 ◗] 2009 /3/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 251 = -1 + 63·2^2 ◗, ◖ 2009 = 1 + 251·2^3 ◗] 2011 /3/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 503 = -1 + 63·2^3 ◗, ◖ 2011 = -1 + 503·2^2 ◗] 2013 /3/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 503 = -1 + 63·2^3 ◗, ◖ 2013 = 1 + 503·2^2 ◗] 2015 /2/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 2015 = -1 + 63·2^5 ◗] 2017 /2/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 2017 = 1 + 63·2^5 ◗] 2019 /3/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 505 = 1 + 63·2^3 ◗, ◖ 2019 = -1 + 505·2^2 ◗] 2021 /3/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 505 = 1 + 63·2^3 ◗, ◖ 2021 = 1 + 505·2^2 ◗] 2023 /3/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 253 = 1 + 63·2^2 ◗, ◖ 2023 = -1 + 253·2^3 ◗] 2025 /3/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 253 = 1 + 63·2^2 ◗, ◖ 2025 = 1 + 253·2^3 ◗] 2027 /3/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 507 = -1 + 127·2^2 ◗, ◖ 2027 = -1 + 507·2^2 ◗] 2029 /3/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 507 = -1 + 127·2^2 ◗, ◖ 2029 = 1 + 507·2^2 ◗] 2031 /2/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 2031 = -1 + 127·2^4 ◗] 2033 /2/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 2033 = 1 + 127·2^4 ◗] 2035 /3/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 509 = 1 + 127·2^2 ◗, ◖ 2035 = -1 + 509·2^2 ◗] 2037 /3/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 509 = 1 + 127·2^2 ◗, ◖ 2037 = 1 + 509·2^2 ◗] 2039 /2/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 2039 = -1 + 255·2^3 ◗] 2041 /2/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 2041 = 1 + 255·2^3 ◗] 2043 /2/ [◖ 1 ◗, ◖ 511 = -1 + 1·2^9 ◗, ◖ 2043 = -1 + 511·2^2 ◗] 2045 /2/ [◖ 1 ◗, ◖ 511 = -1 + 1·2^9 ◗, ◖ 2045 = 1 + 511·2^2 ◗] 2047 /1/ [◖ 1 ◗, ◖ 2047 = -1 + 1·2^11 ◗] 2049 /1/ [◖ 1 ◗, ◖ 2049 = 1 + 1·2^11 ◗] 2051 /2/ [◖ 1 ◗, ◖ 513 = 1 + 1·2^9 ◗, ◖ 2051 = -1 + 513·2^2 ◗] 2053 /2/ [◖ 1 ◗, ◖ 513 = 1 + 1·2^9 ◗, ◖ 2053 = 1 + 513·2^2 ◗] 2055 /2/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 2055 = -1 + 257·2^3 ◗] 2057 /2/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 2057 = 1 + 257·2^3 ◗] 2059 /3/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 515 = -1 + 129·2^2 ◗, ◖ 2059 = -1 + 515·2^2 ◗] 2061 /3/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 515 = -1 + 129·2^2 ◗, ◖ 2061 = 1 + 515·2^2 ◗] 2063 /2/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 2063 = -1 + 129·2^4 ◗] 2065 /2/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 2065 = 1 + 129·2^4 ◗] 2067 /3/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 517 = 1 + 129·2^2 ◗, ◖ 2067 = -1 + 517·2^2 ◗] 2069 /3/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 517 = 1 + 129·2^2 ◗, ◖ 2069 = 1 + 517·2^2 ◗] 2071 /3/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 259 = -1 + 65·2^2 ◗, ◖ 2071 = -1 + 259·2^3 ◗] 2073 /3/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 259 = -1 + 65·2^2 ◗, ◖ 2073 = 1 + 259·2^3 ◗] 2075 /3/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 519 = -1 + 65·2^3 ◗, ◖ 2075 = -1 + 519·2^2 ◗] 2077 /3/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 519 = -1 + 65·2^3 ◗, ◖ 2077 = 1 + 519·2^2 ◗] 2079 /2/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 2079 = -1 + 65·2^5 ◗] 2081 /2/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 2081 = 1 + 65·2^5 ◗] 2083 /3/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 521 = 1 + 65·2^3 ◗, ◖ 2083 = -1 + 521·2^2 ◗] 2085 /3/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 521 = 1 + 65·2^3 ◗, ◖ 2085 = 1 + 521·2^2 ◗] 2087 /3/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 261 = 1 + 65·2^2 ◗, ◖ 2087 = -1 + 261·2^3 ◗] 2089 /3/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 261 = 1 + 65·2^2 ◗, ◖ 2089 = 1 + 261·2^3 ◗] 2091 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 527 = -17 + 17·2^5 ◗, ◖ 2091 = -17 + 527·2^2 ◗] 2093 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 131 = 3 + 1·2^7 ◗, ◖ 2093 = -3 + 131·2^4 ◗] 2095 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 131 = -1 + 33·2^2 ◗, ◖ 2095 = -1 + 131·2^4 ◗] 2097 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 131 = -1 + 33·2^2 ◗, ◖ 2097 = 1 + 131·2^4 ◗] 2099 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 131 = 3 + 1·2^7 ◗, ◖ 2099 = 3 + 131·2^4 ◗] 2101 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 131 = -1 + 33·2^2 ◗, ◖ 525 = 1 + 131·2^2 ◗, ◖ 2101 = 1 + 525·2^2 ◗] 2103 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 263 = -1 + 33·2^3 ◗, ◖ 2103 = -1 + 263·2^3 ◗] 2105 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 263 = -1 + 33·2^3 ◗, ◖ 2105 = 1 + 263·2^3 ◗] 2107 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 527 = -1 + 33·2^4 ◗, ◖ 2107 = -1 + 527·2^2 ◗] 2109 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 527 = -1 + 33·2^4 ◗, ◖ 2109 = 1 + 527·2^2 ◗] 2111 /2/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 2111 = -1 + 33·2^6 ◗] 2113 /2/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 2113 = 1 + 33·2^6 ◗] 2115 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 529 = 1 + 33·2^4 ◗, ◖ 2115 = -1 + 529·2^2 ◗] 2117 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 529 = 1 + 33·2^4 ◗, ◖ 2117 = 1 + 529·2^2 ◗] 2119 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 265 = 1 + 33·2^3 ◗, ◖ 2119 = -1 + 265·2^3 ◗] 2121 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 265 = 1 + 33·2^3 ◗, ◖ 2121 = 1 + 265·2^3 ◗] 2123 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 133 = 5 + 1·2^7 ◗, ◖ 2123 = -5 + 133·2^4 ◗] 2125 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 527 = -17 + 17·2^5 ◗, ◖ 2125 = 17 + 527·2^2 ◗] 2127 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 133 = 1 + 33·2^2 ◗, ◖ 2127 = -1 + 133·2^4 ◗] 2129 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 133 = 1 + 33·2^2 ◗, ◖ 2129 = 1 + 133·2^4 ◗] 2131 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 133 = 1 + 33·2^2 ◗, ◖ 533 = 1 + 133·2^2 ◗, ◖ 2131 = -1 + 533·2^2 ◗] 2133 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 133 = 5 + 1·2^7 ◗, ◖ 2133 = 5 + 133·2^4 ◗] 2135 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 67 = -1 + 17·2^2 ◗, ◖ 267 = -1 + 67·2^2 ◗, ◖ 2135 = -1 + 267·2^3 ◗] 2137 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 263 = -1 + 33·2^3 ◗, ◖ 2137 = 33 + 263·2^3 ◗] 2139 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 527 = 31 + 31·2^4 ◗, ◖ 2139 = 31 + 527·2^2 ◗] 2141 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1071 = -17 + 17·2^6 ◗, ◖ 2141 = -1 + 1071·2^1 ◗] 2143 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 67 = -1 + 17·2^2 ◗, ◖ 2143 = -1 + 67·2^5 ◗] 2145 /2/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 2145 = 33 + 33·2^6 ◗] 2147 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 67 = 3 + 1·2^6 ◗, ◖ 2147 = 3 + 67·2^5 ◗] 2149 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 529 = 1 + 33·2^4 ◗, ◖ 2149 = 33 + 529·2^2 ◗] 2151 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 135 = -9 + 9·2^4 ◗, ◖ 2151 = -9 + 135·2^4 ◗] 2153 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 135 = 7 + 1·2^7 ◗, ◖ 2153 = -7 + 135·2^4 ◗] 2155 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 543 = -1 + 17·2^5 ◗, ◖ 2155 = -17 + 543·2^2 ◗] 2157 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1087 = -1 + 17·2^6 ◗, ◖ 2157 = -17 + 1087·2^1 ◗] 2159 /2/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 2159 = -17 + 17·2^7 ◗] 2161 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 135 = -1 + 17·2^3 ◗, ◖ 2161 = 1 + 135·2^4 ◗] 2163 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 545 = 1 + 17·2^5 ◗, ◖ 2163 = -17 + 545·2^2 ◗] 2165 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 135 = -1 + 17·2^3 ◗, ◖ 541 = 1 + 135·2^2 ◗, ◖ 2165 = 1 + 541·2^2 ◗] 2167 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 271 = -1 + 17·2^4 ◗, ◖ 2167 = -1 + 271·2^3 ◗] 2169 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 271 = -1 + 17·2^4 ◗, ◖ 2169 = 1 + 271·2^3 ◗] 2171 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 543 = -1 + 17·2^5 ◗, ◖ 2171 = -1 + 543·2^2 ◗] 2173 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 543 = -1 + 17·2^5 ◗, ◖ 2173 = 1 + 543·2^2 ◗] 2175 /2/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 2175 = -1 + 17·2^7 ◗] 2177 /2/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 2177 = 1 + 17·2^7 ◗] 2179 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 545 = 1 + 17·2^5 ◗, ◖ 2179 = -1 + 545·2^2 ◗] 2181 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 545 = 1 + 17·2^5 ◗, ◖ 2181 = 1 + 545·2^2 ◗] 2183 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 273 = 1 + 17·2^4 ◗, ◖ 2183 = -1 + 273·2^3 ◗] 2185 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 273 = 1 + 17·2^4 ◗, ◖ 2185 = 1 + 273·2^3 ◗] 2187 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 137 = 1 + 17·2^3 ◗, ◖ 547 = -1 + 137·2^2 ◗, ◖ 2187 = -1 + 547·2^2 ◗] 2189 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 543 = -1 + 17·2^5 ◗, ◖ 2189 = 17 + 543·2^2 ◗] 2191 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 137 = 1 + 17·2^3 ◗, ◖ 2191 = -1 + 137·2^4 ◗] 2193 /2/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 2193 = 17 + 17·2^7 ◗] 2195 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1089 = 1 + 17·2^6 ◗, ◖ 2195 = 17 + 1089·2^1 ◗] 2197 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 545 = 1 + 17·2^5 ◗, ◖ 2197 = 17 + 545·2^2 ◗] 2199 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 69 = 1 + 17·2^2 ◗, ◖ 275 = -1 + 69·2^2 ◗, ◖ 2199 = -1 + 275·2^3 ◗] 2201 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 137 = 9 + 1·2^7 ◗, ◖ 2201 = 9 + 137·2^4 ◗] 2203 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 69 = 5 + 1·2^6 ◗, ◖ 2203 = -5 + 69·2^5 ◗] 2205 /3/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 567 = 63 + 63·2^3 ◗, ◖ 2205 = -63 + 567·2^2 ◗] 2207 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 69 = 1 + 17·2^2 ◗, ◖ 2207 = -1 + 69·2^5 ◗] 2209 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 69 = 1 + 17·2^2 ◗, ◖ 2209 = 1 + 69·2^5 ◗] 2211 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1105 = 17 + 17·2^6 ◗, ◖ 2211 = 1 + 1105·2^1 ◗] 2213 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 69 = 5 + 1·2^6 ◗, ◖ 2213 = 5 + 69·2^5 ◗] 2215 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 69 = 1 + 17·2^2 ◗, ◖ 277 = 1 + 69·2^2 ◗, ◖ 2215 = -1 + 277·2^3 ◗] 2217 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 69 = 1 + 17·2^2 ◗, ◖ 277 = 1 + 69·2^2 ◗, ◖ 2217 = 1 + 277·2^3 ◗] 2219 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 69 = 5 + 1·2^6 ◗, ◖ 1109 = 5 + 69·2^4 ◗, ◖ 2219 = 1 + 1109·2^1 ◗] 2221 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 35 = -5 + 5·2^3 ◗, ◖ 555 = -5 + 35·2^4 ◗, ◖ 2221 = 1 + 555·2^2 ◗] 2223 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 279 = -9 + 9·2^5 ◗, ◖ 2223 = -9 + 279·2^3 ◗] 2225 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 69 = 1 + 17·2^2 ◗, ◖ 2225 = 17 + 69·2^5 ◗] 2227 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 561 = 17 + 17·2^5 ◗, ◖ 2227 = -17 + 561·2^2 ◗] 2229 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 279 = -9 + 9·2^5 ◗, ◖ 557 = -1 + 279·2^1 ◗, ◖ 2229 = 1 + 557·2^2 ◗] 2231 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 279 = -9 + 9·2^5 ◗, ◖ 2231 = -1 + 279·2^3 ◗] 2233 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 279 = -9 + 9·2^5 ◗, ◖ 2233 = 1 + 279·2^3 ◗] 2235 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 35 = -5 + 5·2^3 ◗, ◖ 2235 = -5 + 35·2^6 ◗] 2237 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 35 = 3 + 1·2^5 ◗, ◖ 2237 = -3 + 35·2^6 ◗] 2239 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 35 = -1 + 9·2^2 ◗, ◖ 2239 = -1 + 35·2^6 ◗] 2241 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 35 = -1 + 9·2^2 ◗, ◖ 2241 = 1 + 35·2^6 ◗] 2243 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 561 = 17 + 17·2^5 ◗, ◖ 2243 = -1 + 561·2^2 ◗] 2245 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 561 = 17 + 17·2^5 ◗, ◖ 2245 = 1 + 561·2^2 ◗] 2247 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 35 = 7 + 7·2^2 ◗, ◖ 2247 = 7 + 35·2^6 ◗] 2249 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 35 = -1 + 9·2^2 ◗, ◖ 2249 = 9 + 35·2^6 ◗] 2251 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 35 = 3 + 1·2^5 ◗, ◖ 563 = 3 + 35·2^4 ◗, ◖ 2251 = -1 + 563·2^2 ◗] 2253 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 35 = 3 + 1·2^5 ◗, ◖ 563 = 3 + 35·2^4 ◗, ◖ 2253 = 1 + 563·2^2 ◗] 2255 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 35 = -1 + 9·2^2 ◗, ◖ 141 = 1 + 35·2^2 ◗, ◖ 2255 = -1 + 141·2^4 ◗] 2257 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 35 = 1 + 17·2^1 ◗, ◖ 2257 = 17 + 35·2^6 ◗] 2259 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 567 = -9 + 9·2^6 ◗, ◖ 2259 = -9 + 567·2^2 ◗] 2261 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 561 = 17 + 17·2^5 ◗, ◖ 2261 = 17 + 561·2^2 ◗] 2263 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 71 = -1 + 9·2^3 ◗, ◖ 2263 = -9 + 71·2^5 ◗] 2265 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 71 = 7 + 1·2^6 ◗, ◖ 2265 = -7 + 71·2^5 ◗] 2267 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 567 = -9 + 9·2^6 ◗, ◖ 2267 = -1 + 567·2^2 ◗] 2269 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 567 = -9 + 9·2^6 ◗, ◖ 2269 = 1 + 567·2^2 ◗] 2271 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 71 = -1 + 9·2^3 ◗, ◖ 2271 = -1 + 71·2^5 ◗] 2273 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 71 = -1 + 9·2^3 ◗, ◖ 2273 = 1 + 71·2^5 ◗] 2275 /3/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 585 = 65 + 65·2^3 ◗, ◖ 2275 = -65 + 585·2^2 ◗] 2277 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 567 = -9 + 9·2^6 ◗, ◖ 2277 = 9 + 567·2^2 ◗] 2279 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 143 = -1 + 9·2^4 ◗, ◖ 2279 = -9 + 143·2^4 ◗] 2281 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 71 = -1 + 9·2^3 ◗, ◖ 2281 = 9 + 71·2^5 ◗] 2283 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 143 = -1 + 9·2^4 ◗, ◖ 571 = -1 + 143·2^2 ◗, ◖ 2283 = -1 + 571·2^2 ◗] 2285 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 1143 = -9 + 9·2^7 ◗, ◖ 2285 = -1 + 1143·2^1 ◗] 2287 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 143 = -1 + 9·2^4 ◗, ◖ 2287 = -1 + 143·2^4 ◗] 2289 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 143 = -1 + 9·2^4 ◗, ◖ 2289 = 1 + 143·2^4 ◗] 2291 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 575 = -1 + 9·2^6 ◗, ◖ 2291 = -9 + 575·2^2 ◗] 2293 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 1151 = -1 + 9·2^7 ◗, ◖ 2293 = -9 + 1151·2^1 ◗] 2295 /2/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 2295 = -9 + 9·2^8 ◗] 2297 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 287 = -1 + 9·2^5 ◗, ◖ 2297 = 1 + 287·2^3 ◗] 2299 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 575 = -1 + 9·2^6 ◗, ◖ 2299 = -1 + 575·2^2 ◗] 2301 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 575 = -1 + 9·2^6 ◗, ◖ 2301 = 1 + 575·2^2 ◗] 2303 /2/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 2303 = -1 + 9·2^8 ◗] 2305 /2/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 2305 = 1 + 9·2^8 ◗] 2307 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 577 = 1 + 9·2^6 ◗, ◖ 2307 = -1 + 577·2^2 ◗] 2309 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 577 = 1 + 9·2^6 ◗, ◖ 2309 = 1 + 577·2^2 ◗] 2311 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 289 = 1 + 9·2^5 ◗, ◖ 2311 = -1 + 289·2^3 ◗] 2313 /2/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 2313 = 9 + 9·2^8 ◗] 2315 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 1153 = 1 + 9·2^7 ◗, ◖ 2315 = 9 + 1153·2^1 ◗] 2317 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 577 = 1 + 9·2^6 ◗, ◖ 2317 = 9 + 577·2^2 ◗] 2319 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 145 = 1 + 9·2^4 ◗, ◖ 2319 = -1 + 145·2^4 ◗] 2321 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 145 = 1 + 9·2^4 ◗, ◖ 2321 = 1 + 145·2^4 ◗] 2323 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 1161 = 9 + 9·2^7 ◗, ◖ 2323 = 1 + 1161·2^1 ◗] 2325 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 2325 = -75 + 75·2^5 ◗] 2327 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 73 = 1 + 9·2^3 ◗, ◖ 2327 = -9 + 73·2^5 ◗] 2329 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 145 = 1 + 9·2^4 ◗, ◖ 2329 = 9 + 145·2^4 ◗] 2331 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 585 = 9 + 9·2^6 ◗, ◖ 2331 = -9 + 585·2^2 ◗] 2333 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 73 = 1 + 9·2^3 ◗, ◖ 583 = -1 + 73·2^3 ◗, ◖ 2333 = 1 + 583·2^2 ◗] 2335 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 73 = 1 + 9·2^3 ◗, ◖ 2335 = -1 + 73·2^5 ◗] 2337 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 73 = 1 + 9·2^3 ◗, ◖ 2337 = 1 + 73·2^5 ◗] 2339 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 585 = 9 + 9·2^6 ◗, ◖ 2339 = -1 + 585·2^2 ◗] 2341 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 585 = 9 + 9·2^6 ◗, ◖ 2341 = 1 + 585·2^2 ◗] 2343 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 297 = 33 + 33·2^3 ◗, ◖ 2343 = -33 + 297·2^3 ◗] 2345 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 73 = 1 + 9·2^3 ◗, ◖ 2345 = 9 + 73·2^5 ◗] 2347 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 37 = 5 + 1·2^5 ◗, ◖ 587 = -5 + 37·2^4 ◗, ◖ 2347 = -1 + 587·2^2 ◗] 2349 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 585 = 9 + 9·2^6 ◗, ◖ 2349 = 9 + 585·2^2 ◗] 2351 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 37 = 1 + 9·2^2 ◗, ◖ 147 = -1 + 37·2^2 ◗, ◖ 2351 = -1 + 147·2^4 ◗] 2353 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 37 = 1 + 9·2^2 ◗, ◖ 147 = -1 + 37·2^2 ◗, ◖ 2353 = 1 + 147·2^4 ◗] 2355 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 73 = 1 + 9·2^3 ◗, ◖ 1177 = 9 + 73·2^4 ◗, ◖ 2355 = 1 + 1177·2^1 ◗] 2357 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 37 = 5 + 1·2^5 ◗, ◖ 1179 = -5 + 37·2^5 ◗, ◖ 2357 = -1 + 1179·2^1 ◗] 2359 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 37 = 1 + 9·2^2 ◗, ◖ 2359 = -9 + 37·2^6 ◗] 2361 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 37 = 1 + 9·2^2 ◗, ◖ 295 = -1 + 37·2^3 ◗, ◖ 2361 = 1 + 295·2^3 ◗] 2363 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 37 = 5 + 1·2^5 ◗, ◖ 2363 = -5 + 37·2^6 ◗] 2365 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 37 = 1 + 9·2^2 ◗, ◖ 591 = -1 + 37·2^4 ◗, ◖ 2365 = 1 + 591·2^2 ◗] 2367 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 37 = 1 + 9·2^2 ◗, ◖ 2367 = -1 + 37·2^6 ◗] 2369 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 37 = 1 + 9·2^2 ◗, ◖ 2369 = 1 + 37·2^6 ◗] 2371 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 37 = 1 + 9·2^2 ◗, ◖ 593 = 1 + 37·2^4 ◗, ◖ 2371 = -1 + 593·2^2 ◗] 2373 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 37 = 5 + 1·2^5 ◗, ◖ 2373 = 5 + 37·2^6 ◗] 2375 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 297 = 9 + 9·2^5 ◗, ◖ 2375 = -1 + 297·2^3 ◗] 2377 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 297 = 9 + 9·2^5 ◗, ◖ 2377 = 1 + 297·2^3 ◗] 2379 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 297 = 9 + 9·2^5 ◗, ◖ 595 = 1 + 297·2^1 ◗, ◖ 2379 = -1 + 595·2^2 ◗] 2381 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 297 = 9 + 9·2^5 ◗, ◖ 595 = 1 + 297·2^1 ◗, ◖ 2381 = 1 + 595·2^2 ◗] 2383 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 37 = 1 + 9·2^2 ◗, ◖ 149 = 1 + 37·2^2 ◗, ◖ 2383 = -1 + 149·2^4 ◗] 2385 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 297 = 9 + 9·2^5 ◗, ◖ 2385 = 9 + 297·2^3 ◗] 2387 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 37 = 5 + 1·2^5 ◗, ◖ 597 = 5 + 37·2^4 ◗, ◖ 2387 = -1 + 597·2^2 ◗] 2389 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 37 = 5 + 1·2^5 ◗, ◖ 597 = 5 + 37·2^4 ◗, ◖ 2389 = 1 + 597·2^2 ◗] 2391 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 299 = -1 + 75·2^2 ◗, ◖ 2391 = -1 + 299·2^3 ◗] 2393 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 299 = -1 + 75·2^2 ◗, ◖ 2393 = 1 + 299·2^3 ◗] 2395 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 2395 = -5 + 75·2^5 ◗] 2397 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 599 = -1 + 75·2^3 ◗, ◖ 2397 = 1 + 599·2^2 ◗] 2399 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 2399 = -1 + 75·2^5 ◗] 2401 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 2401 = 1 + 75·2^5 ◗] 2403 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 601 = 1 + 75·2^3 ◗, ◖ 2403 = -1 + 601·2^2 ◗] 2405 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 2405 = 5 + 75·2^5 ◗] 2407 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 301 = 1 + 75·2^2 ◗, ◖ 2407 = -1 + 301·2^3 ◗] 2409 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 297 = 33 + 33·2^3 ◗, ◖ 2409 = 33 + 297·2^3 ◗] 2411 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 19 = -1 + 5·2^2 ◗, ◖ 603 = -5 + 19·2^5 ◗, ◖ 2411 = -1 + 603·2^2 ◗] 2413 /3/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 635 = 127 + 127·2^2 ◗, ◖ 2413 = -127 + 635·2^2 ◗] 2415 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 19 = 17 + 1·2^1 ◗, ◖ 2415 = -17 + 19·2^7 ◗] 2417 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 19 = 15 + 1·2^2 ◗, ◖ 2417 = -15 + 19·2^7 ◗] 2419 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 19 = 3 + 1·2^4 ◗, ◖ 605 = -3 + 19·2^5 ◗, ◖ 2419 = -1 + 605·2^2 ◗] 2421 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 19 = 3 + 1·2^4 ◗, ◖ 605 = -3 + 19·2^5 ◗, ◖ 2421 = 1 + 605·2^2 ◗] 2423 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 19 = 1 + 9·2^1 ◗, ◖ 2423 = -9 + 19·2^7 ◗] 2425 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 19 = -1 + 5·2^2 ◗, ◖ 303 = -1 + 19·2^4 ◗, ◖ 2425 = 1 + 303·2^3 ◗] 2427 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 19 = -1 + 5·2^2 ◗, ◖ 2427 = -5 + 19·2^7 ◗] 2429 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 19 = 3 + 1·2^4 ◗, ◖ 2429 = -3 + 19·2^7 ◗] 2431 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 19 = -1 + 5·2^2 ◗, ◖ 2431 = -1 + 19·2^7 ◗] 2433 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 19 = -1 + 5·2^2 ◗, ◖ 2433 = 1 + 19·2^7 ◗] 2435 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 19 = 3 + 1·2^4 ◗, ◖ 2435 = 3 + 19·2^7 ◗] 2437 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 19 = -1 + 5·2^2 ◗, ◖ 2437 = 5 + 19·2^7 ◗] 2439 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 153 = 9 + 9·2^4 ◗, ◖ 2439 = -9 + 153·2^4 ◗] 2441 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 19 = 1 + 9·2^1 ◗, ◖ 2441 = 9 + 19·2^7 ◗] 2443 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 153 = 9 + 9·2^4 ◗, ◖ 611 = -1 + 153·2^2 ◗, ◖ 2443 = -1 + 611·2^2 ◗] 2445 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 153 = 9 + 9·2^4 ◗, ◖ 611 = -1 + 153·2^2 ◗, ◖ 2445 = 1 + 611·2^2 ◗] 2447 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 153 = 9 + 9·2^4 ◗, ◖ 2447 = -1 + 153·2^4 ◗] 2449 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 153 = 9 + 9·2^4 ◗, ◖ 2449 = 1 + 153·2^4 ◗] 2451 /3/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 645 = 129 + 129·2^2 ◗, ◖ 2451 = -129 + 645·2^2 ◗] 2453 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 153 = 9 + 9·2^4 ◗, ◖ 613 = 1 + 153·2^2 ◗, ◖ 2453 = 1 + 613·2^2 ◗] 2455 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 153 = 9 + 9·2^4 ◗, ◖ 307 = 1 + 153·2^1 ◗, ◖ 2455 = -1 + 307·2^3 ◗] 2457 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 153 = 9 + 9·2^4 ◗, ◖ 2457 = 9 + 153·2^4 ◗] 2459 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 615 = -5 + 155·2^2 ◗, ◖ 2459 = -1 + 615·2^2 ◗] 2461 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 615 = -5 + 155·2^2 ◗, ◖ 2461 = 1 + 615·2^2 ◗] 2463 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 19 = -1 + 5·2^2 ◗, ◖ 77 = 1 + 19·2^2 ◗, ◖ 2463 = -1 + 77·2^5 ◗] 2465 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 153 = 17 + 17·2^3 ◗, ◖ 2465 = 17 + 153·2^4 ◗] 2467 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 19 = 1 + 9·2^1 ◗, ◖ 617 = 9 + 19·2^5 ◗, ◖ 2467 = -1 + 617·2^2 ◗] 2469 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 1235 = -5 + 155·2^3 ◗, ◖ 2469 = -1 + 1235·2^1 ◗] 2471 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 309 = -1 + 155·2^1 ◗, ◖ 2471 = -1 + 309·2^3 ◗] 2473 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 309 = -1 + 155·2^1 ◗, ◖ 2473 = 1 + 309·2^3 ◗] 2475 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 2475 = -5 + 155·2^4 ◗] 2477 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 619 = -1 + 155·2^2 ◗, ◖ 2477 = 1 + 619·2^2 ◗] 2479 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 2479 = -1 + 155·2^4 ◗] 2481 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 2481 = 1 + 155·2^4 ◗] 2483 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 621 = 1 + 155·2^2 ◗, ◖ 2483 = -1 + 621·2^2 ◗] 2485 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 2485 = 5 + 155·2^4 ◗] 2487 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 311 = -1 + 39·2^3 ◗, ◖ 2487 = -1 + 311·2^3 ◗] 2489 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 39 = 7 + 1·2^5 ◗, ◖ 2489 = -7 + 39·2^6 ◗] 2491 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 2491 = -5 + 39·2^6 ◗] 2493 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 623 = -1 + 39·2^4 ◗, ◖ 2493 = 1 + 623·2^2 ◗] 2495 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 2495 = -1 + 39·2^6 ◗] 2497 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 2497 = 1 + 39·2^6 ◗] 2499 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 625 = 1 + 39·2^4 ◗, ◖ 2499 = -1 + 625·2^2 ◗] 2501 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 2501 = 5 + 39·2^6 ◗] 2503 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 39 = 7 + 1·2^5 ◗, ◖ 2503 = 7 + 39·2^6 ◗] 2505 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 313 = 1 + 39·2^3 ◗, ◖ 2505 = 1 + 313·2^3 ◗] 2507 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 1253 = 5 + 39·2^5 ◗, ◖ 2507 = 1 + 1253·2^1 ◗] 2509 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 79 = -1 + 5·2^4 ◗, ◖ 627 = -5 + 79·2^3 ◗, ◖ 2509 = 1 + 627·2^2 ◗] 2511 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 155 = 31 + 31·2^2 ◗, ◖ 2511 = 31 + 155·2^4 ◗] 2513 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 79 = 15 + 1·2^6 ◗, ◖ 2513 = -15 + 79·2^5 ◗] 2515 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 315 = -5 + 5·2^6 ◗, ◖ 2515 = -5 + 315·2^3 ◗] 2517 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 315 = -5 + 5·2^6 ◗, ◖ 629 = -1 + 315·2^1 ◗, ◖ 2517 = 1 + 629·2^2 ◗] 2519 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 315 = -5 + 5·2^6 ◗, ◖ 2519 = -1 + 315·2^3 ◗] 2521 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 315 = -5 + 5·2^6 ◗, ◖ 2521 = 1 + 315·2^3 ◗] 2523 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 79 = -1 + 5·2^4 ◗, ◖ 2523 = -5 + 79·2^5 ◗] 2525 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 315 = -5 + 5·2^6 ◗, ◖ 2525 = 5 + 315·2^3 ◗] 2527 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 79 = -1 + 5·2^4 ◗, ◖ 2527 = -1 + 79·2^5 ◗] 2529 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 79 = -1 + 5·2^4 ◗, ◖ 2529 = 1 + 79·2^5 ◗] 2531 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 79 = -1 + 5·2^4 ◗, ◖ 633 = 1 + 79·2^3 ◗, ◖ 2531 = -1 + 633·2^2 ◗] 2533 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 79 = -1 + 5·2^4 ◗, ◖ 2533 = 5 + 79·2^5 ◗] 2535 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 635 = -5 + 5·2^7 ◗, ◖ 2535 = -5 + 635·2^2 ◗] 2537 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 79 = -1 + 5·2^4 ◗, ◖ 317 = 1 + 79·2^2 ◗, ◖ 2537 = 1 + 317·2^3 ◗] 2539 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 635 = -5 + 5·2^7 ◗, ◖ 2539 = -1 + 635·2^2 ◗] 2541 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 635 = -5 + 5·2^7 ◗, ◖ 2541 = 1 + 635·2^2 ◗] 2543 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 159 = -1 + 5·2^5 ◗, ◖ 2543 = -1 + 159·2^4 ◗] 2545 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 159 = -1 + 5·2^5 ◗, ◖ 2545 = 1 + 159·2^4 ◗] 2547 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 319 = -1 + 5·2^6 ◗, ◖ 2547 = -5 + 319·2^3 ◗] 2549 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 1275 = -5 + 5·2^8 ◗, ◖ 2549 = -1 + 1275·2^1 ◗] 2551 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 319 = -1 + 5·2^6 ◗, ◖ 2551 = -1 + 319·2^3 ◗] 2553 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 319 = -1 + 5·2^6 ◗, ◖ 2553 = 1 + 319·2^3 ◗] 2555 /2/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 2555 = -5 + 5·2^9 ◗] 2557 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 639 = -1 + 5·2^7 ◗, ◖ 2557 = 1 + 639·2^2 ◗] 2559 /2/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 2559 = -1 + 5·2^9 ◗] 2561 /2/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 2561 = 1 + 5·2^9 ◗] 2563 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 641 = 1 + 5·2^7 ◗, ◖ 2563 = -1 + 641·2^2 ◗] 2565 /2/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 2565 = 5 + 5·2^9 ◗] 2567 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 321 = 1 + 5·2^6 ◗, ◖ 2567 = -1 + 321·2^3 ◗] 2569 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 321 = 1 + 5·2^6 ◗, ◖ 2569 = 1 + 321·2^3 ◗] 2571 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 1285 = 5 + 5·2^8 ◗, ◖ 2571 = 1 + 1285·2^1 ◗] 2573 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 321 = 1 + 5·2^6 ◗, ◖ 2573 = 5 + 321·2^3 ◗] 2575 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 161 = 1 + 5·2^5 ◗, ◖ 2575 = -1 + 161·2^4 ◗] 2577 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 161 = 1 + 5·2^5 ◗, ◖ 2577 = 1 + 161·2^4 ◗] 2579 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 645 = 5 + 5·2^7 ◗, ◖ 2579 = -1 + 645·2^2 ◗] 2581 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 645 = 5 + 5·2^7 ◗, ◖ 2581 = 1 + 645·2^2 ◗] 2583 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 81 = 9 + 9·2^3 ◗, ◖ 2583 = -9 + 81·2^5 ◗] 2585 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 645 = 5 + 5·2^7 ◗, ◖ 2585 = 5 + 645·2^2 ◗] 2587 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 81 = 1 + 5·2^4 ◗, ◖ 2587 = -5 + 81·2^5 ◗] 2589 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 81 = 1 + 5·2^4 ◗, ◖ 647 = -1 + 81·2^3 ◗, ◖ 2589 = 1 + 647·2^2 ◗] 2591 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 81 = 1 + 5·2^4 ◗, ◖ 2591 = -1 + 81·2^5 ◗] 2593 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 81 = 1 + 5·2^4 ◗, ◖ 2593 = 1 + 81·2^5 ◗] 2595 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 325 = 5 + 5·2^6 ◗, ◖ 2595 = -5 + 325·2^3 ◗] 2597 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 81 = 1 + 5·2^4 ◗, ◖ 2597 = 5 + 81·2^5 ◗] 2599 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 325 = 5 + 5·2^6 ◗, ◖ 2599 = -1 + 325·2^3 ◗] 2601 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 325 = 5 + 5·2^6 ◗, ◖ 2601 = 1 + 325·2^3 ◗] 2603 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 325 = 5 + 5·2^6 ◗, ◖ 651 = 1 + 325·2^1 ◗, ◖ 2603 = -1 + 651·2^2 ◗] 2605 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 325 = 5 + 5·2^6 ◗, ◖ 2605 = 5 + 325·2^3 ◗] 2607 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 165 = 33 + 33·2^2 ◗, ◖ 2607 = -33 + 165·2^4 ◗] 2609 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 81 = 17 + 1·2^6 ◗, ◖ 2609 = 17 + 81·2^5 ◗] 2611 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 81 = 1 + 5·2^4 ◗, ◖ 653 = 5 + 81·2^3 ◗, ◖ 2611 = -1 + 653·2^2 ◗] 2613 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 1307 = -5 + 41·2^5 ◗, ◖ 2613 = -1 + 1307·2^1 ◗] 2615 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 41 = 9 + 1·2^5 ◗, ◖ 2615 = -9 + 41·2^6 ◗] 2617 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 327 = -1 + 41·2^3 ◗, ◖ 2617 = 1 + 327·2^3 ◗] 2619 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 2619 = -5 + 41·2^6 ◗] 2621 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 655 = -1 + 41·2^4 ◗, ◖ 2621 = 1 + 655·2^2 ◗] 2623 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 2623 = -1 + 41·2^6 ◗] 2625 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 2625 = 1 + 41·2^6 ◗] 2627 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 657 = 1 + 41·2^4 ◗, ◖ 2627 = -1 + 657·2^2 ◗] 2629 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 2629 = 5 + 41·2^6 ◗] 2631 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 329 = 1 + 41·2^3 ◗, ◖ 2631 = -1 + 329·2^3 ◗] 2633 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 41 = 9 + 1·2^5 ◗, ◖ 2633 = 9 + 41·2^6 ◗] 2635 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 2635 = -5 + 165·2^4 ◗] 2637 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 659 = -1 + 165·2^2 ◗, ◖ 2637 = 1 + 659·2^2 ◗] 2639 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 2639 = -1 + 165·2^4 ◗] 2641 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 2641 = 1 + 165·2^4 ◗] 2643 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 661 = 1 + 165·2^2 ◗, ◖ 2643 = -1 + 661·2^2 ◗] 2645 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 2645 = 5 + 165·2^4 ◗] 2647 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 331 = 1 + 165·2^1 ◗, ◖ 2647 = -1 + 331·2^3 ◗] 2649 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 331 = 1 + 165·2^1 ◗, ◖ 2649 = 1 + 331·2^3 ◗] 2651 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 1325 = 5 + 165·2^3 ◗, ◖ 2651 = 1 + 1325·2^1 ◗] 2653 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 21 = 17 + 1·2^2 ◗, ◖ 1327 = -17 + 21·2^6 ◗, ◖ 2653 = -1 + 1327·2^1 ◗] 2655 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 83 = -1 + 21·2^2 ◗, ◖ 2655 = -1 + 83·2^5 ◗] 2657 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 41 = 33 + 1·2^3 ◗, ◖ 2657 = 33 + 41·2^6 ◗] 2659 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 665 = 5 + 165·2^2 ◗, ◖ 2659 = -1 + 665·2^2 ◗] 2661 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 665 = 5 + 165·2^2 ◗, ◖ 2661 = 1 + 665·2^2 ◗] 2663 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 333 = -3 + 21·2^4 ◗, ◖ 2663 = -1 + 333·2^3 ◗] 2665 /3/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 325 = 65 + 65·2^2 ◗, ◖ 2665 = 65 + 325·2^3 ◗] 2667 /3/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 635 = 127 + 127·2^2 ◗, ◖ 2667 = 127 + 635·2^2 ◗] 2669 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 667 = -5 + 21·2^5 ◗, ◖ 2669 = 1 + 667·2^2 ◗] 2671 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 21 = 17 + 1·2^2 ◗, ◖ 2671 = -17 + 21·2^7 ◗] 2673 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 165 = 33 + 33·2^2 ◗, ◖ 2673 = 33 + 165·2^4 ◗] 2675 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 669 = -3 + 21·2^5 ◗, ◖ 2675 = -1 + 669·2^2 ◗] 2677 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 669 = -3 + 21·2^5 ◗, ◖ 2677 = 1 + 669·2^2 ◗] 2679 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 335 = -1 + 21·2^4 ◗, ◖ 2679 = -1 + 335·2^3 ◗] 2681 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 21 = 7 + 7·2^1 ◗, ◖ 2681 = -7 + 21·2^7 ◗] 2683 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 2683 = -5 + 21·2^7 ◗] 2685 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 2685 = -3 + 21·2^7 ◗] 2687 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 2687 = -1 + 21·2^7 ◗] 2689 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 2689 = 1 + 21·2^7 ◗] 2691 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 2691 = 3 + 21·2^7 ◗] 2693 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 2693 = 5 + 21·2^7 ◗] 2695 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 21 = 7 + 7·2^1 ◗, ◖ 2695 = 7 + 21·2^7 ◗] 2697 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 337 = 1 + 21·2^4 ◗, ◖ 2697 = 1 + 337·2^3 ◗] 2699 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 675 = 3 + 21·2^5 ◗, ◖ 2699 = -1 + 675·2^2 ◗] 2701 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 675 = 3 + 21·2^5 ◗, ◖ 2701 = 1 + 675·2^2 ◗] 2703 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 85 = 17 + 17·2^2 ◗, ◖ 2703 = -17 + 85·2^5 ◗] 2705 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 21 = 17 + 1·2^2 ◗, ◖ 2705 = 17 + 21·2^7 ◗] 2707 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 677 = 5 + 21·2^5 ◗, ◖ 2707 = -1 + 677·2^2 ◗] 2709 /3/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 645 = 129 + 129·2^2 ◗, ◖ 2709 = 129 + 645·2^2 ◗] 2711 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 339 = -1 + 85·2^2 ◗, ◖ 2711 = -1 + 339·2^3 ◗] 2713 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 339 = -1 + 85·2^2 ◗, ◖ 2713 = 1 + 339·2^3 ◗] 2715 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 2715 = -5 + 85·2^5 ◗] 2717 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 679 = -1 + 85·2^3 ◗, ◖ 2717 = 1 + 679·2^2 ◗] 2719 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 2719 = -1 + 85·2^5 ◗] 2721 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 2721 = 1 + 85·2^5 ◗] 2723 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 681 = 1 + 85·2^3 ◗, ◖ 2723 = -1 + 681·2^2 ◗] 2725 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 2725 = 5 + 85·2^5 ◗] 2727 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 341 = 1 + 85·2^2 ◗, ◖ 2727 = -1 + 341·2^3 ◗] 2729 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 341 = 1 + 85·2^2 ◗, ◖ 2729 = 1 + 341·2^3 ◗] 2731 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 1365 = 5 + 85·2^4 ◗, ◖ 2731 = 1 + 1365·2^1 ◗] 2733 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 171 = 3 + 21·2^3 ◗, ◖ 2733 = -3 + 171·2^4 ◗] 2735 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 171 = 1 + 85·2^1 ◗, ◖ 2735 = -1 + 171·2^4 ◗] 2737 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 85 = 17 + 17·2^2 ◗, ◖ 2737 = 17 + 85·2^5 ◗] 2739 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 685 = 5 + 85·2^3 ◗, ◖ 2739 = -1 + 685·2^2 ◗] 2741 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 685 = 5 + 85·2^3 ◗, ◖ 2741 = 1 + 685·2^2 ◗] 2743 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 11 = 9 + 1·2^1 ◗, ◖ 343 = -9 + 11·2^5 ◗, ◖ 2743 = -1 + 343·2^3 ◗] 2745 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 11 = 9 + 1·2^1 ◗, ◖ 343 = -9 + 11·2^5 ◗, ◖ 2745 = 1 + 343·2^3 ◗] 2747 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 343 = -49 + 49·2^3 ◗, ◖ 2747 = 3 + 343·2^3 ◗] 2749 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 43 = -1 + 11·2^2 ◗, ◖ 2749 = -3 + 43·2^6 ◗] 2751 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 43 = -1 + 11·2^2 ◗, ◖ 2751 = -1 + 43·2^6 ◗] 2753 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 43 = -1 + 11·2^2 ◗, ◖ 2753 = 1 + 43·2^6 ◗] 2755 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 21 = 17 + 1·2^2 ◗, ◖ 689 = 17 + 21·2^5 ◗, ◖ 2755 = -1 + 689·2^2 ◗] 2757 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 21 = 17 + 1·2^2 ◗, ◖ 689 = 17 + 21·2^5 ◗, ◖ 2757 = 1 + 689·2^2 ◗] 2759 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 345 = 5 + 85·2^2 ◗, ◖ 2759 = -1 + 345·2^3 ◗] 2761 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 345 = 5 + 85·2^2 ◗, ◖ 2761 = 1 + 345·2^3 ◗] 2763 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 345 = -23 + 23·2^4 ◗, ◖ 2763 = 3 + 345·2^3 ◗] 2765 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 173 = -3 + 11·2^4 ◗, ◖ 2765 = -3 + 173·2^4 ◗] 2767 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 173 = -3 + 11·2^4 ◗, ◖ 2767 = -1 + 173·2^4 ◗] 2769 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 173 = -3 + 11·2^4 ◗, ◖ 2769 = 1 + 173·2^4 ◗] 2771 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 165 = 33 + 33·2^2 ◗, ◖ 693 = 33 + 165·2^2 ◗, ◖ 2771 = -1 + 693·2^2 ◗] 2773 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 165 = 33 + 33·2^2 ◗, ◖ 693 = 33 + 165·2^2 ◗, ◖ 2773 = 1 + 693·2^2 ◗] 2775 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11 = 1 + 5·2^1 ◗, ◖ 347 = -5 + 11·2^5 ◗, ◖ 2775 = -1 + 347·2^3 ◗] 2777 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11 = 1 + 5·2^1 ◗, ◖ 347 = -5 + 11·2^5 ◗, ◖ 2777 = 1 + 347·2^3 ◗] 2779 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 11 = 9 + 1·2^1 ◗, ◖ 695 = -9 + 11·2^6 ◗, ◖ 2779 = -1 + 695·2^2 ◗] 2781 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 11 = 9 + 1·2^1 ◗, ◖ 695 = -9 + 11·2^6 ◗, ◖ 2781 = 1 + 695·2^2 ◗] 2783 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 87 = -1 + 11·2^3 ◗, ◖ 2783 = -1 + 87·2^5 ◗] 2785 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 87 = -1 + 11·2^3 ◗, ◖ 2785 = 1 + 87·2^5 ◗] 2787 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 11 = 7 + 1·2^2 ◗, ◖ 697 = -7 + 11·2^6 ◗, ◖ 2787 = -1 + 697·2^2 ◗] 2789 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 11 = 7 + 1·2^2 ◗, ◖ 697 = -7 + 11·2^6 ◗, ◖ 2789 = 1 + 697·2^2 ◗] 2791 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 349 = -3 + 11·2^5 ◗, ◖ 2791 = -1 + 349·2^3 ◗] 2793 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 349 = -3 + 11·2^5 ◗, ◖ 2793 = 1 + 349·2^3 ◗] 2795 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11 = 1 + 5·2^1 ◗, ◖ 699 = -5 + 11·2^6 ◗, ◖ 2795 = -1 + 699·2^2 ◗] 2797 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11 = 1 + 5·2^1 ◗, ◖ 699 = -5 + 11·2^6 ◗, ◖ 2797 = 1 + 699·2^2 ◗] 2799 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 175 = -1 + 11·2^4 ◗, ◖ 2799 = -1 + 175·2^4 ◗] 2801 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 11 = 15 - 1·2^2 ◗, ◖ 2801 = -15 + 11·2^8 ◗] 2803 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 701 = -3 + 11·2^6 ◗, ◖ 2803 = -1 + 701·2^2 ◗] 2805 /3/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 765 = 255 + 255·2^1 ◗, ◖ 2805 = -255 + 765·2^2 ◗] 2807 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 11 = 9 + 1·2^1 ◗, ◖ 2807 = -9 + 11·2^8 ◗] 2809 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 11 = 7 + 1·2^2 ◗, ◖ 2809 = -7 + 11·2^8 ◗] 2811 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11 = 1 + 5·2^1 ◗, ◖ 2811 = -5 + 11·2^8 ◗] 2813 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 2813 = -3 + 11·2^8 ◗] 2815 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 2815 = -1 + 11·2^8 ◗] 2817 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 2817 = 1 + 11·2^8 ◗] 2819 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 2819 = 3 + 11·2^8 ◗] 2821 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11 = 1 + 5·2^1 ◗, ◖ 2821 = 5 + 11·2^8 ◗] 2823 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 11 = 7 + 1·2^2 ◗, ◖ 2823 = 7 + 11·2^8 ◗] 2825 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 11 = 9 + 1·2^1 ◗, ◖ 2825 = 9 + 11·2^8 ◗] 2827 /3/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 771 = 257 + 257·2^1 ◗, ◖ 2827 = -257 + 771·2^2 ◗] 2829 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 707 = 3 + 11·2^6 ◗, ◖ 2829 = 1 + 707·2^2 ◗] 2831 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 11 = 15 - 1·2^2 ◗, ◖ 2831 = 15 + 11·2^8 ◗] 2833 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 177 = 1 + 11·2^4 ◗, ◖ 2833 = 1 + 177·2^4 ◗] 2835 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 2835 = -45 + 45·2^6 ◗] 2837 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11 = 1 + 5·2^1 ◗, ◖ 709 = 5 + 11·2^6 ◗, ◖ 2837 = 1 + 709·2^2 ◗] 2839 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 355 = 3 + 11·2^5 ◗, ◖ 2839 = -1 + 355·2^3 ◗] 2841 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 355 = 3 + 11·2^5 ◗, ◖ 2841 = 1 + 355·2^3 ◗] 2843 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 45 = 9 + 9·2^2 ◗, ◖ 711 = -9 + 45·2^4 ◗, ◖ 2843 = -1 + 711·2^2 ◗] 2845 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 45 = 9 + 9·2^2 ◗, ◖ 711 = -9 + 45·2^4 ◗, ◖ 2845 = 1 + 711·2^2 ◗] 2847 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 89 = 1 + 11·2^3 ◗, ◖ 2847 = -1 + 89·2^5 ◗] 2849 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 89 = 1 + 11·2^3 ◗, ◖ 2849 = 1 + 89·2^5 ◗] 2851 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 11 = 9 + 1·2^1 ◗, ◖ 713 = 9 + 11·2^6 ◗, ◖ 2851 = -1 + 713·2^2 ◗] 2853 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 11 = 9 + 1·2^1 ◗, ◖ 713 = 9 + 11·2^6 ◗, ◖ 2853 = 1 + 713·2^2 ◗] 2855 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 357 = -3 + 45·2^3 ◗, ◖ 2855 = -1 + 357·2^3 ◗] 2857 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 357 = -3 + 45·2^3 ◗, ◖ 2857 = 1 + 357·2^3 ◗] 2859 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 45 = 5 + 5·2^3 ◗, ◖ 715 = -5 + 45·2^4 ◗, ◖ 2859 = -1 + 715·2^2 ◗] 2861 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 45 = 5 + 5·2^3 ◗, ◖ 715 = -5 + 45·2^4 ◗, ◖ 2861 = 1 + 715·2^2 ◗] 2863 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 179 = -1 + 45·2^2 ◗, ◖ 2863 = -1 + 179·2^4 ◗] 2865 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 45 = 15 + 15·2^1 ◗, ◖ 2865 = -15 + 45·2^6 ◗] 2867 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 717 = -3 + 45·2^4 ◗, ◖ 2867 = -1 + 717·2^2 ◗] 2869 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 717 = -3 + 45·2^4 ◗, ◖ 2869 = 1 + 717·2^2 ◗] 2871 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 45 = 9 + 9·2^2 ◗, ◖ 2871 = -9 + 45·2^6 ◗] 2873 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 359 = -1 + 45·2^3 ◗, ◖ 2873 = 1 + 359·2^3 ◗] 2875 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 45 = 5 + 5·2^3 ◗, ◖ 2875 = -5 + 45·2^6 ◗] 2877 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 2877 = -3 + 45·2^6 ◗] 2879 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 2879 = -1 + 45·2^6 ◗] 2881 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 2881 = 1 + 45·2^6 ◗] 2883 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 2883 = 3 + 45·2^6 ◗] 2885 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 45 = 5 + 5·2^3 ◗, ◖ 2885 = 5 + 45·2^6 ◗] 2887 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 361 = 1 + 45·2^3 ◗, ◖ 2887 = -1 + 361·2^3 ◗] 2889 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 45 = 9 + 9·2^2 ◗, ◖ 2889 = 9 + 45·2^6 ◗] 2891 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 723 = 3 + 45·2^4 ◗, ◖ 2891 = -1 + 723·2^2 ◗] 2893 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 723 = 3 + 45·2^4 ◗, ◖ 2893 = 1 + 723·2^2 ◗] 2895 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 45 = 15 + 15·2^1 ◗, ◖ 2895 = 15 + 45·2^6 ◗] 2897 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 181 = 1 + 45·2^2 ◗, ◖ 2897 = 1 + 181·2^4 ◗] 2899 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 45 = 5 + 5·2^3 ◗, ◖ 725 = 5 + 45·2^4 ◗, ◖ 2899 = -1 + 725·2^2 ◗] 2901 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 45 = 5 + 5·2^3 ◗, ◖ 725 = 5 + 45·2^4 ◗, ◖ 2901 = 1 + 725·2^2 ◗] 2903 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 363 = 3 + 45·2^3 ◗, ◖ 2903 = -1 + 363·2^3 ◗] 2905 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 363 = 3 + 45·2^3 ◗, ◖ 2905 = 1 + 363·2^3 ◗] 2907 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 23 = -9 + 1·2^5 ◗, ◖ 727 = -9 + 23·2^5 ◗, ◖ 2907 = -1 + 727·2^2 ◗] 2909 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 23 = -9 + 1·2^5 ◗, ◖ 727 = -9 + 23·2^5 ◗, ◖ 2909 = 1 + 727·2^2 ◗] 2911 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 91 = -1 + 23·2^2 ◗, ◖ 2911 = -1 + 91·2^5 ◗] 2913 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 23 = 31 - 1·2^3 ◗, ◖ 2913 = -31 + 23·2^7 ◗] 2915 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 45 = 9 + 9·2^2 ◗, ◖ 729 = 9 + 45·2^4 ◗, ◖ 2915 = -1 + 729·2^2 ◗] 2917 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 45 = 9 + 9·2^2 ◗, ◖ 729 = 9 + 45·2^4 ◗, ◖ 2917 = 1 + 729·2^2 ◗] 2919 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 365 = -3 + 23·2^4 ◗, ◖ 2919 = -1 + 365·2^3 ◗] 2921 /3/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 381 = 127 + 127·2^1 ◗, ◖ 2921 = -127 + 381·2^3 ◗] 2923 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 365 = -3 + 23·2^4 ◗, ◖ 2923 = 3 + 365·2^3 ◗] 2925 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 2925 = 45 + 45·2^6 ◗] 2927 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 183 = -1 + 23·2^3 ◗, ◖ 2927 = -1 + 183·2^4 ◗] 2929 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 23 = 15 + 1·2^3 ◗, ◖ 2929 = -15 + 23·2^7 ◗] 2931 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 733 = -3 + 23·2^5 ◗, ◖ 2931 = -1 + 733·2^2 ◗] 2933 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 733 = -3 + 23·2^5 ◗, ◖ 2933 = 1 + 733·2^2 ◗] 2935 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 23 = -9 + 1·2^5 ◗, ◖ 2935 = -9 + 23·2^7 ◗] 2937 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 23 = 7 + 1·2^4 ◗, ◖ 2937 = -7 + 23·2^7 ◗] 2939 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 735 = -1 + 23·2^5 ◗, ◖ 2939 = -1 + 735·2^2 ◗] 2941 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 2941 = -3 + 23·2^7 ◗] 2943 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 2943 = -1 + 23·2^7 ◗] 2945 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 2945 = 1 + 23·2^7 ◗] 2947 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 2947 = 3 + 23·2^7 ◗] 2949 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 737 = 1 + 23·2^5 ◗, ◖ 2949 = 1 + 737·2^2 ◗] 2951 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 23 = 7 + 1·2^4 ◗, ◖ 2951 = 7 + 23·2^7 ◗] 2953 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 23 = -9 + 1·2^5 ◗, ◖ 2953 = 9 + 23·2^7 ◗] 2955 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 739 = 3 + 23·2^5 ◗, ◖ 2955 = -1 + 739·2^2 ◗] 2957 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 739 = 3 + 23·2^5 ◗, ◖ 2957 = 1 + 739·2^2 ◗] 2959 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 23 = 15 + 1·2^3 ◗, ◖ 2959 = 15 + 23·2^7 ◗] 2961 /3/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 189 = 63 + 63·2^1 ◗, ◖ 2961 = -63 + 189·2^4 ◗] 2963 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 741 = -3 + 93·2^3 ◗, ◖ 2963 = -1 + 741·2^2 ◗] 2965 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 741 = -3 + 93·2^3 ◗, ◖ 2965 = 1 + 741·2^2 ◗] 2967 /3/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 387 = 129 + 129·2^1 ◗, ◖ 2967 = -129 + 387·2^3 ◗] 2969 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 371 = -1 + 93·2^2 ◗, ◖ 2969 = 1 + 371·2^3 ◗] 2971 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 743 = -1 + 93·2^3 ◗, ◖ 2971 = -1 + 743·2^2 ◗] 2973 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 2973 = -3 + 93·2^5 ◗] 2975 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 2975 = -1 + 93·2^5 ◗] 2977 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 2977 = 1 + 93·2^5 ◗] 2979 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 2979 = 3 + 93·2^5 ◗] 2981 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 745 = 1 + 93·2^3 ◗, ◖ 2981 = 1 + 745·2^2 ◗] 2983 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 373 = 1 + 93·2^2 ◗, ◖ 2983 = -1 + 373·2^3 ◗] 2985 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 373 = 1 + 93·2^2 ◗, ◖ 2985 = 1 + 373·2^3 ◗] 2987 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 747 = 3 + 93·2^3 ◗, ◖ 2987 = -1 + 747·2^2 ◗] 2989 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 747 = 3 + 93·2^3 ◗, ◖ 2989 = 1 + 747·2^2 ◗] 2991 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 47 = -17 + 1·2^6 ◗, ◖ 2991 = -17 + 47·2^6 ◗] 2993 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 47 = 15 + 1·2^5 ◗, ◖ 2993 = -15 + 47·2^6 ◗] 2995 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 749 = -3 + 47·2^4 ◗, ◖ 2995 = -1 + 749·2^2 ◗] 2997 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 749 = -3 + 47·2^4 ◗, ◖ 2997 = 1 + 749·2^2 ◗] 2999 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 375 = -1 + 47·2^3 ◗, ◖ 2999 = -1 + 375·2^3 ◗] 3001 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 375 = -1 + 47·2^3 ◗, ◖ 3001 = 1 + 375·2^3 ◗] 3003 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 751 = -1 + 47·2^4 ◗, ◖ 3003 = -1 + 751·2^2 ◗] 3005 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 3005 = -3 + 47·2^6 ◗] 3007 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 3007 = -1 + 47·2^6 ◗] 3009 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 3009 = 1 + 47·2^6 ◗] 3011 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 3011 = 3 + 47·2^6 ◗] 3013 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 753 = 1 + 47·2^4 ◗, ◖ 3013 = 1 + 753·2^2 ◗] 3015 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 377 = 1 + 47·2^3 ◗, ◖ 3015 = -1 + 377·2^3 ◗] 3017 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 377 = 1 + 47·2^3 ◗, ◖ 3017 = 1 + 377·2^3 ◗] 3019 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 189 = -3 + 3·2^6 ◗, ◖ 755 = -1 + 189·2^2 ◗, ◖ 3019 = -1 + 755·2^2 ◗] 3021 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 189 = -3 + 3·2^6 ◗, ◖ 3021 = -3 + 189·2^4 ◗] 3023 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 189 = -3 + 3·2^6 ◗, ◖ 3023 = -1 + 189·2^4 ◗] 3025 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 189 = -3 + 3·2^6 ◗, ◖ 3025 = 1 + 189·2^4 ◗] 3027 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 189 = -3 + 3·2^6 ◗, ◖ 3027 = 3 + 189·2^4 ◗] 3029 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 189 = -3 + 3·2^6 ◗, ◖ 757 = 1 + 189·2^2 ◗, ◖ 3029 = 1 + 757·2^2 ◗] 3031 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 379 = -1 + 95·2^2 ◗, ◖ 3031 = -1 + 379·2^3 ◗] 3033 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 379 = -1 + 95·2^2 ◗, ◖ 3033 = 1 + 379·2^3 ◗] 3035 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 759 = -1 + 95·2^3 ◗, ◖ 3035 = -1 + 759·2^2 ◗] 3037 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 3037 = -3 + 95·2^5 ◗] 3039 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 3039 = -1 + 95·2^5 ◗] 3041 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 3041 = 1 + 95·2^5 ◗] 3043 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 3043 = 3 + 95·2^5 ◗] 3045 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 381 = -3 + 3·2^7 ◗, ◖ 3045 = -3 + 381·2^3 ◗] 3047 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 381 = -3 + 3·2^7 ◗, ◖ 3047 = -1 + 381·2^3 ◗] 3049 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 381 = -3 + 3·2^7 ◗, ◖ 3049 = 1 + 381·2^3 ◗] 3051 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 381 = -3 + 3·2^7 ◗, ◖ 3051 = 3 + 381·2^3 ◗] 3053 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 191 = -1 + 3·2^6 ◗, ◖ 3053 = -3 + 191·2^4 ◗] 3055 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 191 = -1 + 3·2^6 ◗, ◖ 3055 = -1 + 191·2^4 ◗] 3057 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 191 = -1 + 3·2^6 ◗, ◖ 3057 = 1 + 191·2^4 ◗] 3059 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 765 = -3 + 3·2^8 ◗, ◖ 3059 = -1 + 765·2^2 ◗] 3061 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 765 = -3 + 3·2^8 ◗, ◖ 3061 = 1 + 765·2^2 ◗] 3063 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 383 = -1 + 3·2^7 ◗, ◖ 3063 = -1 + 383·2^3 ◗] 3065 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 383 = -1 + 3·2^7 ◗, ◖ 3065 = 1 + 383·2^3 ◗] 3067 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 767 = -1 + 3·2^8 ◗, ◖ 3067 = -1 + 767·2^2 ◗] 3069 /2/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3069 = -3 + 3·2^10 ◗] 3071 /2/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3071 = -1 + 3·2^10 ◗] 3073 /2/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3073 = 1 + 3·2^10 ◗] 3075 /2/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3075 = 3 + 3·2^10 ◗] 3077 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 769 = 1 + 3·2^8 ◗, ◖ 3077 = 1 + 769·2^2 ◗] 3079 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 385 = 1 + 3·2^7 ◗, ◖ 3079 = -1 + 385·2^3 ◗] 3081 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 385 = 1 + 3·2^7 ◗, ◖ 3081 = 1 + 385·2^3 ◗] 3083 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 771 = 3 + 3·2^8 ◗, ◖ 3083 = -1 + 771·2^2 ◗] 3085 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 771 = 3 + 3·2^8 ◗, ◖ 3085 = 1 + 771·2^2 ◗] 3087 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 193 = 1 + 3·2^6 ◗, ◖ 3087 = -1 + 193·2^4 ◗] 3089 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 193 = 1 + 3·2^6 ◗, ◖ 3089 = 1 + 193·2^4 ◗] 3091 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 193 = 1 + 3·2^6 ◗, ◖ 3091 = 3 + 193·2^4 ◗] 3093 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 387 = 3 + 3·2^7 ◗, ◖ 3093 = -3 + 387·2^3 ◗] 3095 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 387 = 3 + 3·2^7 ◗, ◖ 3095 = -1 + 387·2^3 ◗] 3097 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 387 = 3 + 3·2^7 ◗, ◖ 3097 = 1 + 387·2^3 ◗] 3099 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 387 = 3 + 3·2^7 ◗, ◖ 3099 = 3 + 387·2^3 ◗] 3101 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 3101 = -3 + 97·2^5 ◗] 3103 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 3103 = -1 + 97·2^5 ◗] 3105 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 3105 = 1 + 97·2^5 ◗] 3107 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 3107 = 3 + 97·2^5 ◗] 3109 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 777 = 1 + 97·2^3 ◗, ◖ 3109 = 1 + 777·2^2 ◗] 3111 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 389 = 1 + 97·2^2 ◗, ◖ 3111 = -1 + 389·2^3 ◗] 3113 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 389 = 1 + 97·2^2 ◗, ◖ 3113 = 1 + 389·2^3 ◗] 3115 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 195 = 3 + 3·2^6 ◗, ◖ 779 = -1 + 195·2^2 ◗, ◖ 3115 = -1 + 779·2^2 ◗] 3117 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 195 = 3 + 3·2^6 ◗, ◖ 3117 = -3 + 195·2^4 ◗] 3119 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 195 = 3 + 3·2^6 ◗, ◖ 3119 = -1 + 195·2^4 ◗] 3121 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 195 = 3 + 3·2^6 ◗, ◖ 3121 = 1 + 195·2^4 ◗] 3123 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 195 = 3 + 3·2^6 ◗, ◖ 3123 = 3 + 195·2^4 ◗] 3125 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 195 = 3 + 3·2^6 ◗, ◖ 781 = 1 + 195·2^2 ◗, ◖ 3125 = 1 + 781·2^2 ◗] 3127 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 391 = -1 + 49·2^3 ◗, ◖ 3127 = -1 + 391·2^3 ◗] 3129 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 49 = -7 + 7·2^3 ◗, ◖ 3129 = -7 + 49·2^6 ◗] 3131 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 783 = -1 + 49·2^4 ◗, ◖ 3131 = -1 + 783·2^2 ◗] 3133 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 3133 = -3 + 49·2^6 ◗] 3135 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 3135 = -1 + 49·2^6 ◗] 3137 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 3137 = 1 + 49·2^6 ◗] 3139 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 3139 = 3 + 49·2^6 ◗] 3141 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 785 = 1 + 49·2^4 ◗, ◖ 3141 = 1 + 785·2^2 ◗] 3143 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 49 = -7 + 7·2^3 ◗, ◖ 3143 = 7 + 49·2^6 ◗] 3145 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 393 = 1 + 49·2^3 ◗, ◖ 3145 = 1 + 393·2^3 ◗] 3147 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 787 = 3 + 49·2^4 ◗, ◖ 3147 = -1 + 787·2^2 ◗] 3149 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 787 = 3 + 49·2^4 ◗, ◖ 3149 = 1 + 787·2^2 ◗] 3151 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 49 = -15 + 1·2^6 ◗, ◖ 3151 = 15 + 49·2^6 ◗] 3153 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 49 = 17 + 1·2^5 ◗, ◖ 3153 = 17 + 49·2^6 ◗] 3155 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 789 = -3 + 99·2^3 ◗, ◖ 3155 = -1 + 789·2^2 ◗] 3157 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 789 = -3 + 99·2^3 ◗, ◖ 3157 = 1 + 789·2^2 ◗] 3159 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 395 = -1 + 99·2^2 ◗, ◖ 3159 = -1 + 395·2^3 ◗] 3161 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 395 = -1 + 99·2^2 ◗, ◖ 3161 = 1 + 395·2^3 ◗] 3163 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 791 = -1 + 99·2^3 ◗, ◖ 3163 = -1 + 791·2^2 ◗] 3165 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 3165 = -3 + 99·2^5 ◗] 3167 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 3167 = -1 + 99·2^5 ◗] 3169 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 3169 = 1 + 99·2^5 ◗] 3171 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 3171 = 3 + 99·2^5 ◗] 3173 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 793 = 1 + 99·2^3 ◗, ◖ 3173 = 1 + 793·2^2 ◗] 3175 /3/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 381 = 127 + 127·2^1 ◗, ◖ 3175 = 127 + 381·2^3 ◗] 3177 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 397 = 1 + 99·2^2 ◗, ◖ 3177 = 1 + 397·2^3 ◗] 3179 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 795 = 3 + 99·2^3 ◗, ◖ 3179 = -1 + 795·2^2 ◗] 3181 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 795 = 3 + 99·2^3 ◗, ◖ 3181 = 1 + 795·2^2 ◗] 3183 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 25 = 17 + 1·2^3 ◗, ◖ 3183 = -17 + 25·2^7 ◗] 3185 /3/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 195 = 65 + 65·2^1 ◗, ◖ 3185 = 65 + 195·2^4 ◗] 3187 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 797 = -3 + 25·2^5 ◗, ◖ 3187 = -1 + 797·2^2 ◗] 3189 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 797 = -3 + 25·2^5 ◗, ◖ 3189 = 1 + 797·2^2 ◗] 3191 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 25 = 9 + 1·2^4 ◗, ◖ 3191 = -9 + 25·2^7 ◗] 3193 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 25 = -7 + 1·2^5 ◗, ◖ 3193 = -7 + 25·2^7 ◗] 3195 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 25 = 5 + 5·2^2 ◗, ◖ 3195 = -5 + 25·2^7 ◗] 3197 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 3197 = -3 + 25·2^7 ◗] 3199 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 3199 = -1 + 25·2^7 ◗] 3201 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 3201 = 1 + 25·2^7 ◗] 3203 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 3203 = 3 + 25·2^7 ◗] 3205 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 25 = 5 + 5·2^2 ◗, ◖ 3205 = 5 + 25·2^7 ◗] 3207 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 25 = -7 + 1·2^5 ◗, ◖ 3207 = 7 + 25·2^7 ◗] 3209 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 25 = 9 + 1·2^4 ◗, ◖ 3209 = 9 + 25·2^7 ◗] 3211 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 803 = 3 + 25·2^5 ◗, ◖ 3211 = -1 + 803·2^2 ◗] 3213 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 3213 = -51 + 51·2^6 ◗] 3215 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 201 = 1 + 25·2^3 ◗, ◖ 3215 = -1 + 201·2^4 ◗] 3217 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 25 = 17 + 1·2^3 ◗, ◖ 3217 = 17 + 25·2^7 ◗] 3219 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 25 = 5 + 5·2^2 ◗, ◖ 805 = 5 + 25·2^5 ◗, ◖ 3219 = -1 + 805·2^2 ◗] 3221 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 25 = 5 + 5·2^2 ◗, ◖ 805 = 5 + 25·2^5 ◗, ◖ 3221 = 1 + 805·2^2 ◗] 3223 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 403 = 3 + 25·2^4 ◗, ◖ 3223 = -1 + 403·2^3 ◗] 3225 /3/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 387 = 129 + 129·2^1 ◗, ◖ 3225 = 129 + 387·2^3 ◗] 3227 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 25 = -7 + 1·2^5 ◗, ◖ 807 = 7 + 25·2^5 ◗, ◖ 3227 = -1 + 807·2^2 ◗] 3229 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 25 = -7 + 1·2^5 ◗, ◖ 807 = 7 + 25·2^5 ◗, ◖ 3229 = 1 + 807·2^2 ◗] 3231 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 101 = 1 + 25·2^2 ◗, ◖ 3231 = -1 + 101·2^5 ◗] 3233 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 25 = 33 - 1·2^3 ◗, ◖ 3233 = 33 + 25·2^7 ◗] 3235 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 25 = 9 + 1·2^4 ◗, ◖ 809 = 9 + 25·2^5 ◗, ◖ 3235 = -1 + 809·2^2 ◗] 3237 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 25 = 9 + 1·2^4 ◗, ◖ 809 = 9 + 25·2^5 ◗, ◖ 3237 = 1 + 809·2^2 ◗] 3239 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 405 = -3 + 51·2^3 ◗, ◖ 3239 = -1 + 405·2^3 ◗] 3241 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 405 = -3 + 51·2^3 ◗, ◖ 3241 = 1 + 405·2^3 ◗] 3243 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 405 = -3 + 51·2^3 ◗, ◖ 3243 = 3 + 405·2^3 ◗] 3245 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 203 = -1 + 51·2^2 ◗, ◖ 3245 = -3 + 203·2^4 ◗] 3247 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 51 = 17 + 17·2^1 ◗, ◖ 3247 = -17 + 51·2^6 ◗] 3249 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 203 = -1 + 51·2^2 ◗, ◖ 3249 = 1 + 203·2^4 ◗] 3251 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 813 = -3 + 51·2^4 ◗, ◖ 3251 = -1 + 813·2^2 ◗] 3253 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 813 = -3 + 51·2^4 ◗, ◖ 3253 = 1 + 813·2^2 ◗] 3255 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 105 = -7 + 7·2^4 ◗, ◖ 3255 = -105 + 105·2^5 ◗] 3257 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 407 = -1 + 51·2^3 ◗, ◖ 3257 = 1 + 407·2^3 ◗] 3259 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 815 = -1 + 51·2^4 ◗, ◖ 3259 = -1 + 815·2^2 ◗] 3261 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 3261 = -3 + 51·2^6 ◗] 3263 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 3263 = -1 + 51·2^6 ◗] 3265 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 3265 = 1 + 51·2^6 ◗] 3267 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 3267 = 3 + 51·2^6 ◗] 3269 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 817 = 1 + 51·2^4 ◗, ◖ 3269 = 1 + 817·2^2 ◗] 3271 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 409 = 1 + 51·2^3 ◗, ◖ 3271 = -1 + 409·2^3 ◗] 3273 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 409 = 1 + 51·2^3 ◗, ◖ 3273 = 1 + 409·2^3 ◗] 3275 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 819 = 3 + 51·2^4 ◗, ◖ 3275 = -1 + 819·2^2 ◗] 3277 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 819 = 3 + 51·2^4 ◗, ◖ 3277 = 1 + 819·2^2 ◗] 3279 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 205 = 1 + 51·2^2 ◗, ◖ 3279 = -1 + 205·2^4 ◗] 3281 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 51 = 17 + 17·2^1 ◗, ◖ 3281 = 17 + 51·2^6 ◗] 3283 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 205 = 1 + 51·2^2 ◗, ◖ 3283 = 3 + 205·2^4 ◗] 3285 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 411 = 3 + 51·2^3 ◗, ◖ 3285 = -3 + 411·2^3 ◗] 3287 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 411 = 3 + 51·2^3 ◗, ◖ 3287 = -1 + 411·2^3 ◗] 3289 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 411 = 3 + 51·2^3 ◗, ◖ 3289 = 1 + 411·2^3 ◗] 3291 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 13 = 9 + 1·2^2 ◗, ◖ 823 = -9 + 13·2^6 ◗, ◖ 3291 = -1 + 823·2^2 ◗] 3293 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 13 = 9 + 1·2^2 ◗, ◖ 823 = -9 + 13·2^6 ◗, ◖ 3293 = 1 + 823·2^2 ◗] 3295 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 103 = -1 + 13·2^3 ◗, ◖ 3295 = -1 + 103·2^5 ◗] 3297 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 103 = -1 + 13·2^3 ◗, ◖ 3297 = 1 + 103·2^5 ◗] 3299 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 13 = -1 + 7·2^1 ◗, ◖ 825 = -7 + 13·2^6 ◗, ◖ 3299 = -1 + 825·2^2 ◗] 3301 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 13 = -1 + 7·2^1 ◗, ◖ 825 = -7 + 13·2^6 ◗, ◖ 3301 = 1 + 825·2^2 ◗] 3303 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 413 = -3 + 13·2^5 ◗, ◖ 3303 = -1 + 413·2^3 ◗] 3305 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 413 = -3 + 13·2^5 ◗, ◖ 3305 = 1 + 413·2^3 ◗] 3307 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 827 = -5 + 13·2^6 ◗, ◖ 3307 = -1 + 827·2^2 ◗] 3309 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 827 = -5 + 13·2^6 ◗, ◖ 3309 = 1 + 827·2^2 ◗] 3311 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 13 = 17 - 1·2^2 ◗, ◖ 3311 = -17 + 13·2^8 ◗] 3313 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 13 = 15 - 1·2^1 ◗, ◖ 3313 = -15 + 13·2^8 ◗] 3315 /3/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 765 = 255 + 255·2^1 ◗, ◖ 3315 = 255 + 765·2^2 ◗] 3317 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 829 = -3 + 13·2^6 ◗, ◖ 3317 = 1 + 829·2^2 ◗] 3319 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 13 = 9 + 1·2^2 ◗, ◖ 3319 = -9 + 13·2^8 ◗] 3321 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 13 = -1 + 7·2^1 ◗, ◖ 3321 = -7 + 13·2^8 ◗] 3323 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 3323 = -5 + 13·2^8 ◗] 3325 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 3325 = -3 + 13·2^8 ◗] 3327 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 3327 = -1 + 13·2^8 ◗] 3329 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 3329 = 1 + 13·2^8 ◗] 3331 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 3331 = 3 + 13·2^8 ◗] 3333 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 3333 = 5 + 13·2^8 ◗] 3335 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 13 = -1 + 7·2^1 ◗, ◖ 3335 = 7 + 13·2^8 ◗] 3337 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 13 = 9 + 1·2^2 ◗, ◖ 3337 = 9 + 13·2^8 ◗] 3339 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 835 = 3 + 13·2^6 ◗, ◖ 3339 = -1 + 835·2^2 ◗] 3341 /3/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 771 = 257 + 257·2^1 ◗, ◖ 3341 = 257 + 771·2^2 ◗] 3343 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 13 = 15 - 1·2^1 ◗, ◖ 3343 = 15 + 13·2^8 ◗] 3345 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 13 = 17 - 1·2^2 ◗, ◖ 3345 = 17 + 13·2^8 ◗] 3347 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 837 = 5 + 13·2^6 ◗, ◖ 3347 = -1 + 837·2^2 ◗] 3349 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 837 = 5 + 13·2^6 ◗, ◖ 3349 = 1 + 837·2^2 ◗] 3351 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 105 = -7 + 7·2^4 ◗, ◖ 419 = -1 + 105·2^2 ◗, ◖ 3351 = -1 + 419·2^3 ◗] 3353 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 105 = -7 + 7·2^4 ◗, ◖ 3353 = -7 + 105·2^5 ◗] 3355 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 105 = -7 + 7·2^4 ◗, ◖ 839 = -1 + 105·2^3 ◗, ◖ 3355 = -1 + 839·2^2 ◗] 3357 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 105 = -7 + 7·2^4 ◗, ◖ 839 = -1 + 105·2^3 ◗, ◖ 3357 = 1 + 839·2^2 ◗] 3359 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 105 = -7 + 7·2^4 ◗, ◖ 3359 = -1 + 105·2^5 ◗] 3361 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 105 = -7 + 7·2^4 ◗, ◖ 3361 = 1 + 105·2^5 ◗] 3363 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 105 = -7 + 7·2^4 ◗, ◖ 841 = 1 + 105·2^3 ◗, ◖ 3363 = -1 + 841·2^2 ◗] 3365 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 105 = -7 + 7·2^4 ◗, ◖ 841 = 1 + 105·2^3 ◗, ◖ 3365 = 1 + 841·2^2 ◗] 3367 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 105 = -7 + 7·2^4 ◗, ◖ 3367 = 7 + 105·2^5 ◗] 3369 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 105 = -7 + 7·2^4 ◗, ◖ 421 = 1 + 105·2^2 ◗, ◖ 3369 = 1 + 421·2^3 ◗] 3371 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 27 = -5 + 1·2^5 ◗, ◖ 211 = -5 + 27·2^3 ◗, ◖ 3371 = -5 + 211·2^4 ◗] 3373 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 105 = -7 + 7·2^4 ◗, ◖ 1687 = 7 + 105·2^4 ◗, ◖ 3373 = -1 + 1687·2^1 ◗] 3375 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 105 = -15 + 15·2^3 ◗, ◖ 3375 = 15 + 105·2^5 ◗] 3377 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 105 = -7 + 7·2^4 ◗, ◖ 211 = 1 + 105·2^1 ◗, ◖ 3377 = 1 + 211·2^4 ◗] 3379 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 195 = 65 + 65·2^1 ◗, ◖ 845 = 65 + 195·2^2 ◗, ◖ 3379 = -1 + 845·2^2 ◗] 3381 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 195 = 65 + 65·2^1 ◗, ◖ 845 = 65 + 195·2^2 ◗, ◖ 3381 = 1 + 845·2^2 ◗] 3383 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 423 = -9 + 27·2^4 ◗, ◖ 3383 = -1 + 423·2^3 ◗] 3385 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 423 = -9 + 27·2^4 ◗, ◖ 3385 = 1 + 423·2^3 ◗] 3387 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 105 = -7 + 7·2^4 ◗, ◖ 847 = 7 + 105·2^3 ◗, ◖ 3387 = -1 + 847·2^2 ◗] 3389 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 105 = -7 + 7·2^4 ◗, ◖ 847 = 7 + 105·2^3 ◗, ◖ 3389 = 1 + 847·2^2 ◗] 3391 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 53 = 1 + 13·2^2 ◗, ◖ 3391 = -1 + 53·2^6 ◗] 3393 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 53 = 1 + 13·2^2 ◗, ◖ 3393 = 1 + 53·2^6 ◗] 3395 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 13 = 17 - 1·2^2 ◗, ◖ 849 = 17 + 13·2^6 ◗, ◖ 3395 = -1 + 849·2^2 ◗] 3397 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 13 = 17 - 1·2^2 ◗, ◖ 849 = 17 + 13·2^6 ◗, ◖ 3397 = 1 + 849·2^2 ◗] 3399 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 13 = 9 + 1·2^2 ◗, ◖ 425 = 9 + 13·2^5 ◗, ◖ 3399 = -1 + 425·2^3 ◗] 3401 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 13 = 9 + 1·2^2 ◗, ◖ 425 = 9 + 13·2^5 ◗, ◖ 3401 = 1 + 425·2^3 ◗] 3403 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 441 = -63 + 63·2^3 ◗, ◖ 1701 = -63 + 441·2^2 ◗, ◖ 3403 = 1 + 1701·2^1 ◗] 3405 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 213 = -3 + 27·2^3 ◗, ◖ 3405 = -3 + 213·2^4 ◗] 3407 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 213 = -3 + 27·2^3 ◗, ◖ 3407 = -1 + 213·2^4 ◗] 3409 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 213 = -3 + 27·2^3 ◗, ◖ 3409 = 1 + 213·2^4 ◗] 3411 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 217 = -31 + 31·2^3 ◗, ◖ 1705 = -31 + 217·2^3 ◗, ◖ 3411 = 1 + 1705·2^1 ◗] 3413 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 61 = -3 + 1·2^6 ◗, ◖ 427 = -61 + 61·2^3 ◗, ◖ 3413 = -3 + 427·2^3 ◗] 3415 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 27 = -5 + 1·2^5 ◗, ◖ 427 = -5 + 27·2^4 ◗, ◖ 3415 = -1 + 427·2^3 ◗] 3417 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 27 = -5 + 1·2^5 ◗, ◖ 427 = -5 + 27·2^4 ◗, ◖ 3417 = 1 + 427·2^3 ◗] 3419 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 855 = -9 + 27·2^5 ◗, ◖ 3419 = -1 + 855·2^2 ◗] 3421 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 855 = -9 + 27·2^5 ◗, ◖ 3421 = 1 + 855·2^2 ◗] 3423 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 27 = -1 + 7·2^2 ◗, ◖ 107 = -1 + 27·2^2 ◗, ◖ 3423 = -1 + 107·2^5 ◗] 3425 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 27 = 31 - 1·2^2 ◗, ◖ 3425 = -31 + 27·2^7 ◗] 3427 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 27 = -1 + 7·2^2 ◗, ◖ 857 = -7 + 27·2^5 ◗, ◖ 3427 = -1 + 857·2^2 ◗] 3429 /3/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 889 = -127 + 127·2^3 ◗, ◖ 3429 = -127 + 889·2^2 ◗] 3431 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 429 = -3 + 27·2^4 ◗, ◖ 3431 = -1 + 429·2^3 ◗] 3433 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 429 = -3 + 27·2^4 ◗, ◖ 3433 = 1 + 429·2^3 ◗] 3435 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 27 = -5 + 1·2^5 ◗, ◖ 859 = -5 + 27·2^5 ◗, ◖ 3435 = -1 + 859·2^2 ◗] 3437 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 27 = -5 + 1·2^5 ◗, ◖ 859 = -5 + 27·2^5 ◗, ◖ 3437 = 1 + 859·2^2 ◗] 3439 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 27 = -1 + 7·2^2 ◗, ◖ 215 = -1 + 27·2^3 ◗, ◖ 3439 = -1 + 215·2^4 ◗] 3441 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 217 = -31 + 31·2^3 ◗, ◖ 3441 = -31 + 217·2^4 ◗] 3443 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 861 = -3 + 27·2^5 ◗, ◖ 3443 = -1 + 861·2^2 ◗] 3445 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 861 = -3 + 27·2^5 ◗, ◖ 3445 = 1 + 861·2^2 ◗] 3447 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 3447 = -9 + 27·2^7 ◗] 3449 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 27 = -1 + 7·2^2 ◗, ◖ 3449 = -7 + 27·2^7 ◗] 3451 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 27 = -5 + 1·2^5 ◗, ◖ 3451 = -5 + 27·2^7 ◗] 3453 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 3453 = -3 + 27·2^7 ◗] 3455 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 27 = -1 + 7·2^2 ◗, ◖ 3455 = -1 + 27·2^7 ◗] 3457 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 27 = -1 + 7·2^2 ◗, ◖ 3457 = 1 + 27·2^7 ◗] 3459 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 3459 = 3 + 27·2^7 ◗] 3461 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 27 = -5 + 1·2^5 ◗, ◖ 3461 = 5 + 27·2^7 ◗] 3463 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 27 = -1 + 7·2^2 ◗, ◖ 3463 = 7 + 27·2^7 ◗] 3465 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 3465 = 9 + 27·2^7 ◗] 3467 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 217 = -7 + 7·2^5 ◗, ◖ 867 = -1 + 217·2^2 ◗, ◖ 3467 = -1 + 867·2^2 ◗] 3469 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 217 = -7 + 7·2^5 ◗, ◖ 867 = -1 + 217·2^2 ◗, ◖ 3469 = 1 + 867·2^2 ◗] 3471 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 217 = -7 + 7·2^5 ◗, ◖ 3471 = -1 + 217·2^4 ◗] 3473 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 217 = -7 + 7·2^5 ◗, ◖ 3473 = 1 + 217·2^4 ◗] 3475 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 217 = -7 + 7·2^5 ◗, ◖ 869 = 1 + 217·2^2 ◗, ◖ 3475 = -1 + 869·2^2 ◗] 3477 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 217 = -7 + 7·2^5 ◗, ◖ 869 = 1 + 217·2^2 ◗, ◖ 3477 = 1 + 869·2^2 ◗] 3479 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 217 = -7 + 7·2^5 ◗, ◖ 3479 = 7 + 217·2^4 ◗] 3481 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 217 = -7 + 7·2^5 ◗, ◖ 435 = 1 + 217·2^1 ◗, ◖ 3481 = 1 + 435·2^3 ◗] 3483 /3/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 903 = -129 + 129·2^3 ◗, ◖ 3483 = -129 + 903·2^2 ◗] 3485 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 55 = -9 + 1·2^6 ◗, ◖ 871 = -9 + 55·2^4 ◗, ◖ 3485 = 1 + 871·2^2 ◗] 3487 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 27 = 31 - 1·2^2 ◗, ◖ 3487 = 31 + 27·2^7 ◗] 3489 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 27 = -1 + 7·2^2 ◗, ◖ 109 = 1 + 27·2^2 ◗, ◖ 3489 = 1 + 109·2^5 ◗] 3491 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 873 = 9 + 27·2^5 ◗, ◖ 3491 = -1 + 873·2^2 ◗] 3493 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 873 = 9 + 27·2^5 ◗, ◖ 3493 = 1 + 873·2^2 ◗] 3495 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 27 = -5 + 1·2^5 ◗, ◖ 437 = 5 + 27·2^4 ◗, ◖ 3495 = -1 + 437·2^3 ◗] 3497 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 27 = -5 + 1·2^5 ◗, ◖ 437 = 5 + 27·2^4 ◗, ◖ 3497 = 1 + 437·2^3 ◗] 3499 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 217 = -7 + 7·2^5 ◗, ◖ 875 = 7 + 217·2^2 ◗, ◖ 3499 = -1 + 875·2^2 ◗] 3501 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 55 = -9 + 1·2^6 ◗, ◖ 1751 = -9 + 55·2^5 ◗, ◖ 3501 = -1 + 1751·2^1 ◗] 3503 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 217 = -31 + 31·2^3 ◗, ◖ 3503 = 31 + 217·2^4 ◗] 3505 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 55 = -1 + 7·2^3 ◗, ◖ 219 = -1 + 55·2^2 ◗, ◖ 3505 = 1 + 219·2^4 ◗] 3507 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 55 = -1 + 7·2^3 ◗, ◖ 1753 = -7 + 55·2^5 ◗, ◖ 3507 = 1 + 1753·2^1 ◗] 3509 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 455 = -65 + 65·2^3 ◗, ◖ 1755 = -65 + 455·2^2 ◗, ◖ 3509 = -1 + 1755·2^1 ◗] 3511 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 55 = -9 + 1·2^6 ◗, ◖ 3511 = -9 + 55·2^6 ◗] 3513 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 55 = -1 + 7·2^3 ◗, ◖ 3513 = -7 + 55·2^6 ◗] 3515 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 55 = -1 + 7·2^3 ◗, ◖ 879 = -1 + 55·2^4 ◗, ◖ 3515 = -1 + 879·2^2 ◗] 3517 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 55 = -1 + 7·2^3 ◗, ◖ 879 = -1 + 55·2^4 ◗, ◖ 3517 = 1 + 879·2^2 ◗] 3519 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 55 = -1 + 7·2^3 ◗, ◖ 3519 = -1 + 55·2^6 ◗] 3521 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 55 = -1 + 7·2^3 ◗, ◖ 3521 = 1 + 55·2^6 ◗] 3523 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 55 = -1 + 7·2^3 ◗, ◖ 881 = 1 + 55·2^4 ◗, ◖ 3523 = -1 + 881·2^2 ◗] 3525 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 55 = -1 + 7·2^3 ◗, ◖ 881 = 1 + 55·2^4 ◗, ◖ 3525 = 1 + 881·2^2 ◗] 3527 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 441 = -7 + 7·2^6 ◗, ◖ 3527 = -1 + 441·2^3 ◗] 3529 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 441 = -7 + 7·2^6 ◗, ◖ 3529 = 1 + 441·2^3 ◗] 3531 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 441 = -7 + 7·2^6 ◗, ◖ 883 = 1 + 441·2^1 ◗, ◖ 3531 = -1 + 883·2^2 ◗] 3533 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 441 = -7 + 7·2^6 ◗, ◖ 883 = 1 + 441·2^1 ◗, ◖ 3533 = 1 + 883·2^2 ◗] 3535 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 441 = -7 + 7·2^6 ◗, ◖ 3535 = 7 + 441·2^3 ◗] 3537 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 55 = -1 + 7·2^3 ◗, ◖ 221 = 1 + 55·2^2 ◗, ◖ 3537 = 1 + 221·2^4 ◗] 3539 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 55 = -9 + 1·2^6 ◗, ◖ 1769 = 9 + 55·2^5 ◗, ◖ 3539 = 1 + 1769·2^1 ◗] 3541 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 223 = -1 + 7·2^5 ◗, ◖ 885 = -7 + 223·2^2 ◗, ◖ 3541 = 1 + 885·2^2 ◗] 3543 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 111 = -1 + 7·2^4 ◗, ◖ 443 = -1 + 111·2^2 ◗, ◖ 3543 = -1 + 443·2^3 ◗] 3545 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 111 = -1 + 7·2^4 ◗, ◖ 3545 = -7 + 111·2^5 ◗] 3547 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 111 = -1 + 7·2^4 ◗, ◖ 887 = -1 + 111·2^3 ◗, ◖ 3547 = -1 + 887·2^2 ◗] 3549 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 889 = -7 + 7·2^7 ◗, ◖ 3549 = -7 + 889·2^2 ◗] 3551 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 111 = -1 + 7·2^4 ◗, ◖ 3551 = -1 + 111·2^5 ◗] 3553 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 111 = -1 + 7·2^4 ◗, ◖ 3553 = 1 + 111·2^5 ◗] 3555 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 889 = -7 + 7·2^7 ◗, ◖ 3555 = -1 + 889·2^2 ◗] 3557 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 889 = -7 + 7·2^7 ◗, ◖ 3557 = 1 + 889·2^2 ◗] 3559 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 111 = -1 + 7·2^4 ◗, ◖ 3559 = 7 + 111·2^5 ◗] 3561 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 223 = -1 + 7·2^5 ◗, ◖ 3561 = -7 + 223·2^4 ◗] 3563 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 889 = -7 + 7·2^7 ◗, ◖ 3563 = 7 + 889·2^2 ◗] 3565 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 223 = -1 + 7·2^5 ◗, ◖ 891 = -1 + 223·2^2 ◗, ◖ 3565 = 1 + 891·2^2 ◗] 3567 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 223 = -1 + 7·2^5 ◗, ◖ 3567 = -1 + 223·2^4 ◗] 3569 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 223 = -1 + 7·2^5 ◗, ◖ 3569 = 1 + 223·2^4 ◗] 3571 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 1785 = -7 + 7·2^8 ◗, ◖ 3571 = 1 + 1785·2^1 ◗] 3573 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 895 = -1 + 7·2^7 ◗, ◖ 3573 = -7 + 895·2^2 ◗] 3575 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 447 = -1 + 7·2^6 ◗, ◖ 3575 = -1 + 447·2^3 ◗] 3577 /2/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 3577 = -7 + 7·2^9 ◗] 3579 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 895 = -1 + 7·2^7 ◗, ◖ 3579 = -1 + 895·2^2 ◗] 3581 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 895 = -1 + 7·2^7 ◗, ◖ 3581 = 1 + 895·2^2 ◗] 3583 /2/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 3583 = -1 + 7·2^9 ◗] 3585 /2/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 3585 = 1 + 7·2^9 ◗] 3587 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 897 = 1 + 7·2^7 ◗, ◖ 3587 = -1 + 897·2^2 ◗] 3589 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 897 = 1 + 7·2^7 ◗, ◖ 3589 = 1 + 897·2^2 ◗] 3591 /2/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 3591 = 7 + 7·2^9 ◗] 3593 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 449 = 1 + 7·2^6 ◗, ◖ 3593 = 1 + 449·2^3 ◗] 3595 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 897 = 1 + 7·2^7 ◗, ◖ 3595 = 7 + 897·2^2 ◗] 3597 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 1799 = 7 + 7·2^8 ◗, ◖ 3597 = -1 + 1799·2^1 ◗] 3599 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 225 = 1 + 7·2^5 ◗, ◖ 3599 = -1 + 225·2^4 ◗] 3601 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 225 = 1 + 7·2^5 ◗, ◖ 3601 = 1 + 225·2^4 ◗] 3603 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 225 = 1 + 7·2^5 ◗, ◖ 901 = 1 + 225·2^2 ◗, ◖ 3603 = -1 + 901·2^2 ◗] 3605 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 903 = 7 + 7·2^7 ◗, ◖ 3605 = -7 + 903·2^2 ◗] 3607 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 225 = 1 + 7·2^5 ◗, ◖ 3607 = 7 + 225·2^4 ◗] 3609 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 113 = 1 + 7·2^4 ◗, ◖ 3609 = -7 + 113·2^5 ◗] 3611 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 903 = 7 + 7·2^7 ◗, ◖ 3611 = -1 + 903·2^2 ◗] 3613 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 903 = 7 + 7·2^7 ◗, ◖ 3613 = 1 + 903·2^2 ◗] 3615 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 113 = 1 + 7·2^4 ◗, ◖ 3615 = -1 + 113·2^5 ◗] 3617 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 113 = 1 + 7·2^4 ◗, ◖ 3617 = 1 + 113·2^5 ◗] 3619 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 903 = 7 + 7·2^7 ◗, ◖ 3619 = 7 + 903·2^2 ◗] 3621 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 113 = 1 + 7·2^4 ◗, ◖ 905 = 1 + 113·2^3 ◗, ◖ 3621 = 1 + 905·2^2 ◗] 3623 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 113 = 1 + 7·2^4 ◗, ◖ 3623 = 7 + 113·2^5 ◗] 3625 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 113 = 1 + 7·2^4 ◗, ◖ 453 = 1 + 113·2^2 ◗, ◖ 3625 = 1 + 453·2^3 ◗] 3627 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 225 = 1 + 7·2^5 ◗, ◖ 907 = 7 + 225·2^2 ◗, ◖ 3627 = -1 + 907·2^2 ◗] 3629 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 113 = 1 + 7·2^4 ◗, ◖ 1815 = 7 + 113·2^4 ◗, ◖ 3629 = -1 + 1815·2^1 ◗] 3631 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 113 = -15 + 1·2^7 ◗, ◖ 3631 = 15 + 113·2^5 ◗] 3633 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 455 = 7 + 7·2^6 ◗, ◖ 3633 = -7 + 455·2^3 ◗] 3635 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 455 = 7 + 7·2^6 ◗, ◖ 909 = -1 + 455·2^1 ◗, ◖ 3635 = -1 + 909·2^2 ◗] 3637 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 455 = 7 + 7·2^6 ◗, ◖ 909 = -1 + 455·2^1 ◗, ◖ 3637 = 1 + 909·2^2 ◗] 3639 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 455 = 7 + 7·2^6 ◗, ◖ 3639 = -1 + 455·2^3 ◗] 3641 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 455 = 7 + 7·2^6 ◗, ◖ 3641 = 1 + 455·2^3 ◗] 3643 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 57 = 1 + 7·2^3 ◗, ◖ 911 = -1 + 57·2^4 ◗, ◖ 3643 = -1 + 911·2^2 ◗] 3645 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 57 = 1 + 7·2^3 ◗, ◖ 911 = -1 + 57·2^4 ◗, ◖ 3645 = 1 + 911·2^2 ◗] 3647 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 57 = 1 + 7·2^3 ◗, ◖ 3647 = -1 + 57·2^6 ◗] 3649 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 57 = 1 + 7·2^3 ◗, ◖ 3649 = 1 + 57·2^6 ◗] 3651 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 57 = 1 + 7·2^3 ◗, ◖ 913 = 1 + 57·2^4 ◗, ◖ 3651 = -1 + 913·2^2 ◗] 3653 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 57 = 1 + 7·2^3 ◗, ◖ 913 = 1 + 57·2^4 ◗, ◖ 3653 = 1 + 913·2^2 ◗] 3655 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 57 = 1 + 7·2^3 ◗, ◖ 3655 = 7 + 57·2^6 ◗] 3657 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 57 = 1 + 7·2^3 ◗, ◖ 457 = 1 + 57·2^3 ◗, ◖ 3657 = 1 + 457·2^3 ◗] 3659 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 225 = -15 + 15·2^4 ◗, ◖ 915 = 15 + 225·2^2 ◗, ◖ 3659 = -1 + 915·2^2 ◗] 3661 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 57 = 1 + 7·2^3 ◗, ◖ 1831 = 7 + 57·2^5 ◗, ◖ 3661 = -1 + 1831·2^1 ◗] 3663 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 231 = -33 + 33·2^3 ◗, ◖ 3663 = -33 + 231·2^4 ◗] 3665 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 57 = 1 + 7·2^3 ◗, ◖ 229 = 1 + 57·2^2 ◗, ◖ 3665 = 1 + 229·2^4 ◗] 3667 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 231 = 7 + 7·2^5 ◗, ◖ 917 = -7 + 231·2^2 ◗, ◖ 3667 = -1 + 917·2^2 ◗] 3669 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 231 = 7 + 7·2^5 ◗, ◖ 917 = -7 + 231·2^2 ◗, ◖ 3669 = 1 + 917·2^2 ◗] 3671 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 113 = 1 + 7·2^4 ◗, ◖ 459 = 7 + 113·2^2 ◗, ◖ 3671 = -1 + 459·2^3 ◗] 3673 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 113 = 1 + 7·2^4 ◗, ◖ 459 = 7 + 113·2^2 ◗, ◖ 3673 = 1 + 459·2^3 ◗] 3675 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 57 = 1 + 7·2^3 ◗, ◖ 919 = 7 + 57·2^4 ◗, ◖ 3675 = -1 + 919·2^2 ◗] 3677 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 57 = 1 + 7·2^3 ◗, ◖ 919 = 7 + 57·2^4 ◗, ◖ 3677 = 1 + 919·2^2 ◗] 3679 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 29 = 33 - 1·2^2 ◗, ◖ 3679 = -33 + 29·2^7 ◗] 3681 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 29 = 31 - 1·2^1 ◗, ◖ 3681 = -31 + 29·2^7 ◗] 3683 /3/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 889 = -127 + 127·2^3 ◗, ◖ 3683 = 127 + 889·2^2 ◗] 3685 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 29 = 1 + 7·2^2 ◗, ◖ 921 = -7 + 29·2^5 ◗, ◖ 3685 = 1 + 921·2^2 ◗] 3687 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 231 = 7 + 7·2^5 ◗, ◖ 461 = -1 + 231·2^1 ◗, ◖ 3687 = -1 + 461·2^3 ◗] 3689 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 231 = 7 + 7·2^5 ◗, ◖ 3689 = -7 + 231·2^4 ◗] 3691 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 231 = 7 + 7·2^5 ◗, ◖ 923 = -1 + 231·2^2 ◗, ◖ 3691 = -1 + 923·2^2 ◗] 3693 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 231 = 7 + 7·2^5 ◗, ◖ 923 = -1 + 231·2^2 ◗, ◖ 3693 = 1 + 923·2^2 ◗] 3695 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 231 = 7 + 7·2^5 ◗, ◖ 3695 = -1 + 231·2^4 ◗] 3697 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 231 = 7 + 7·2^5 ◗, ◖ 3697 = 1 + 231·2^4 ◗] 3699 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 231 = 7 + 7·2^5 ◗, ◖ 925 = 1 + 231·2^2 ◗, ◖ 3699 = -1 + 925·2^2 ◗] 3701 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 231 = 7 + 7·2^5 ◗, ◖ 925 = 1 + 231·2^2 ◗, ◖ 3701 = 1 + 925·2^2 ◗] 3703 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 231 = 7 + 7·2^5 ◗, ◖ 3703 = 7 + 231·2^4 ◗] 3705 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 29 = 1 + 7·2^2 ◗, ◖ 3705 = -7 + 29·2^7 ◗] 3707 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 29 = 1 + 7·2^2 ◗, ◖ 927 = -1 + 29·2^5 ◗, ◖ 3707 = -1 + 927·2^2 ◗] 3709 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 29 = -3 + 1·2^5 ◗, ◖ 3709 = -3 + 29·2^7 ◗] 3711 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 29 = 1 + 7·2^2 ◗, ◖ 3711 = -1 + 29·2^7 ◗] 3713 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 29 = 1 + 7·2^2 ◗, ◖ 3713 = 1 + 29·2^7 ◗] 3715 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 29 = -3 + 1·2^5 ◗, ◖ 3715 = 3 + 29·2^7 ◗] 3717 /3/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 945 = -63 + 63·2^4 ◗, ◖ 3717 = -63 + 945·2^2 ◗] 3719 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 465 = -15 + 15·2^5 ◗, ◖ 3719 = -1 + 465·2^3 ◗] 3721 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 465 = -15 + 15·2^5 ◗, ◖ 3721 = 1 + 465·2^3 ◗] 3723 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 465 = -15 + 15·2^5 ◗, ◖ 931 = 1 + 465·2^1 ◗, ◖ 3723 = -1 + 931·2^2 ◗] 3725 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 465 = -15 + 15·2^5 ◗, ◖ 931 = 1 + 465·2^1 ◗, ◖ 3725 = 1 + 931·2^2 ◗] 3727 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 29 = -1 + 15·2^1 ◗, ◖ 3727 = 15 + 29·2^7 ◗] 3729 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 231 = -33 + 33·2^3 ◗, ◖ 3729 = 33 + 231·2^4 ◗] 3731 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 29 = -3 + 1·2^5 ◗, ◖ 233 = 1 + 29·2^3 ◗, ◖ 3731 = 3 + 233·2^4 ◗] 3733 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 29 = -3 + 1·2^5 ◗, ◖ 467 = 3 + 29·2^4 ◗, ◖ 3733 = -3 + 467·2^3 ◗] 3735 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 465 = -15 + 15·2^5 ◗, ◖ 3735 = 15 + 465·2^3 ◗] 3737 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 29 = -3 + 1·2^5 ◗, ◖ 467 = 3 + 29·2^4 ◗, ◖ 3737 = 1 + 467·2^3 ◗] 3739 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 29 = 1 + 7·2^2 ◗, ◖ 935 = 7 + 29·2^5 ◗, ◖ 3739 = -1 + 935·2^2 ◗] 3741 /3/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 903 = -129 + 129·2^3 ◗, ◖ 3741 = 129 + 903·2^2 ◗] 3743 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 29 = 31 - 1·2^1 ◗, ◖ 3743 = 31 + 29·2^7 ◗] 3745 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 29 = 33 - 1·2^2 ◗, ◖ 3745 = 33 + 29·2^7 ◗] 3747 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 59 = -1 + 15·2^2 ◗, ◖ 1873 = -15 + 59·2^5 ◗, ◖ 3747 = 1 + 1873·2^1 ◗] 3749 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 119 = -1 + 15·2^3 ◗, ◖ 937 = -15 + 119·2^3 ◗, ◖ 3749 = 1 + 937·2^2 ◗] 3751 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 465 = -31 + 31·2^4 ◗, ◖ 3751 = 31 + 465·2^3 ◗] 3753 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 119 = 7 + 7·2^4 ◗, ◖ 469 = -7 + 119·2^2 ◗, ◖ 3753 = 1 + 469·2^3 ◗] 3755 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 59 = -5 + 1·2^6 ◗, ◖ 939 = -5 + 59·2^4 ◗, ◖ 3755 = -1 + 939·2^2 ◗] 3757 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 59 = -5 + 1·2^6 ◗, ◖ 939 = -5 + 59·2^4 ◗, ◖ 3757 = 1 + 939·2^2 ◗] 3759 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 59 = -1 + 15·2^2 ◗, ◖ 235 = -1 + 59·2^2 ◗, ◖ 3759 = -1 + 235·2^4 ◗] 3761 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 59 = -1 + 15·2^2 ◗, ◖ 3761 = -15 + 59·2^6 ◗] 3763 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 239 = -1 + 15·2^4 ◗, ◖ 941 = -15 + 239·2^2 ◗, ◖ 3763 = -1 + 941·2^2 ◗] 3765 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 945 = -15 + 15·2^6 ◗, ◖ 3765 = -15 + 945·2^2 ◗] 3767 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 59 = -1 + 15·2^2 ◗, ◖ 471 = -1 + 59·2^3 ◗, ◖ 3767 = -1 + 471·2^3 ◗] 3769 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 59 = -1 + 15·2^2 ◗, ◖ 471 = -1 + 59·2^3 ◗, ◖ 3769 = 1 + 471·2^3 ◗] 3771 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 59 = -5 + 1·2^6 ◗, ◖ 3771 = -5 + 59·2^6 ◗] 3773 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 59 = -1 + 15·2^2 ◗, ◖ 943 = -1 + 59·2^4 ◗, ◖ 3773 = 1 + 943·2^2 ◗] 3775 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 59 = -1 + 15·2^2 ◗, ◖ 3775 = -1 + 59·2^6 ◗] 3777 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 59 = -1 + 15·2^2 ◗, ◖ 3777 = 1 + 59·2^6 ◗] 3779 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 945 = -15 + 15·2^6 ◗, ◖ 3779 = -1 + 945·2^2 ◗] 3781 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 945 = -15 + 15·2^6 ◗, ◖ 3781 = 1 + 945·2^2 ◗] 3783 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 59 = -1 + 15·2^2 ◗, ◖ 473 = 1 + 59·2^3 ◗, ◖ 3783 = -1 + 473·2^3 ◗] 3785 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 59 = -1 + 15·2^2 ◗, ◖ 473 = 1 + 59·2^3 ◗, ◖ 3785 = 1 + 473·2^3 ◗] 3787 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 59 = -5 + 1·2^6 ◗, ◖ 1893 = 5 + 59·2^5 ◗, ◖ 3787 = 1 + 1893·2^1 ◗] 3789 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 119 = -9 + 1·2^7 ◗, ◖ 1895 = -9 + 119·2^4 ◗, ◖ 3789 = -1 + 1895·2^1 ◗] 3791 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 119 = -17 + 17·2^3 ◗, ◖ 3791 = -17 + 119·2^5 ◗] 3793 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 119 = -1 + 15·2^3 ◗, ◖ 3793 = -15 + 119·2^5 ◗] 3795 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 945 = -15 + 15·2^6 ◗, ◖ 3795 = 15 + 945·2^2 ◗] 3797 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 59 = -5 + 1·2^6 ◗, ◖ 949 = 5 + 59·2^4 ◗, ◖ 3797 = 1 + 949·2^2 ◗] 3799 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 119 = -9 + 1·2^7 ◗, ◖ 3799 = -9 + 119·2^5 ◗] 3801 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 119 = 7 + 7·2^4 ◗, ◖ 3801 = -7 + 119·2^5 ◗] 3803 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 119 = -1 + 15·2^3 ◗, ◖ 951 = -1 + 119·2^3 ◗, ◖ 3803 = -1 + 951·2^2 ◗] 3805 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 119 = -1 + 15·2^3 ◗, ◖ 951 = -1 + 119·2^3 ◗, ◖ 3805 = 1 + 951·2^2 ◗] 3807 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 119 = -1 + 15·2^3 ◗, ◖ 3807 = -1 + 119·2^5 ◗] 3809 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 119 = -1 + 15·2^3 ◗, ◖ 3809 = 1 + 119·2^5 ◗] 3811 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 1905 = -15 + 15·2^7 ◗, ◖ 3811 = 1 + 1905·2^1 ◗] 3813 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 961 = -31 + 31·2^5 ◗, ◖ 3813 = -31 + 961·2^2 ◗] 3815 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 119 = 7 + 7·2^4 ◗, ◖ 3815 = 7 + 119·2^5 ◗] 3817 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 119 = -9 + 1·2^7 ◗, ◖ 3817 = 9 + 119·2^5 ◗] 3819 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 239 = -1 + 15·2^4 ◗, ◖ 955 = -1 + 239·2^2 ◗, ◖ 3819 = -1 + 955·2^2 ◗] 3821 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 959 = -1 + 15·2^6 ◗, ◖ 3821 = -15 + 959·2^2 ◗] 3823 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 239 = -1 + 15·2^4 ◗, ◖ 3823 = -1 + 239·2^4 ◗] 3825 /2/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 3825 = -15 + 15·2^8 ◗] 3827 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 1921 = 1 + 15·2^7 ◗, ◖ 3827 = -15 + 1921·2^1 ◗] 3829 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 961 = 1 + 15·2^6 ◗, ◖ 3829 = -15 + 961·2^2 ◗] 3831 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 479 = -1 + 15·2^5 ◗, ◖ 3831 = -1 + 479·2^3 ◗] 3833 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 479 = -1 + 15·2^5 ◗, ◖ 3833 = 1 + 479·2^3 ◗] 3835 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 959 = -1 + 15·2^6 ◗, ◖ 3835 = -1 + 959·2^2 ◗] 3837 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 959 = -1 + 15·2^6 ◗, ◖ 3837 = 1 + 959·2^2 ◗] 3839 /2/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 3839 = -1 + 15·2^8 ◗] 3841 /2/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 3841 = 1 + 15·2^8 ◗] 3843 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 961 = 1 + 15·2^6 ◗, ◖ 3843 = -1 + 961·2^2 ◗] 3845 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 961 = 1 + 15·2^6 ◗, ◖ 3845 = 1 + 961·2^2 ◗] 3847 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 481 = 1 + 15·2^5 ◗, ◖ 3847 = -1 + 481·2^3 ◗] 3849 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 481 = 1 + 15·2^5 ◗, ◖ 3849 = 1 + 481·2^3 ◗] 3851 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 959 = -1 + 15·2^6 ◗, ◖ 3851 = 15 + 959·2^2 ◗] 3853 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 1919 = -1 + 15·2^7 ◗, ◖ 3853 = 15 + 1919·2^1 ◗] 3855 /2/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 3855 = 15 + 15·2^8 ◗] 3857 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 241 = 1 + 15·2^4 ◗, ◖ 3857 = 1 + 241·2^4 ◗] 3859 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 961 = 1 + 15·2^6 ◗, ◖ 3859 = 15 + 961·2^2 ◗] 3861 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 241 = 1 + 15·2^4 ◗, ◖ 965 = 1 + 241·2^2 ◗, ◖ 3861 = 1 + 965·2^2 ◗] 3863 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 481 = 1 + 15·2^5 ◗, ◖ 3863 = 15 + 481·2^3 ◗] 3865 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 121 = -7 + 1·2^7 ◗, ◖ 3865 = -7 + 121·2^5 ◗] 3867 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 121 = 1 + 15·2^3 ◗, ◖ 967 = -1 + 121·2^3 ◗, ◖ 3867 = -1 + 967·2^2 ◗] 3869 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 1935 = 15 + 15·2^7 ◗, ◖ 3869 = -1 + 1935·2^1 ◗] 3871 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 121 = 1 + 15·2^3 ◗, ◖ 3871 = -1 + 121·2^5 ◗] 3873 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 121 = 1 + 15·2^3 ◗, ◖ 3873 = 1 + 121·2^5 ◗] 3875 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 961 = -31 + 31·2^5 ◗, ◖ 3875 = 31 + 961·2^2 ◗] 3877 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 121 = 1 + 15·2^3 ◗, ◖ 969 = 1 + 121·2^3 ◗, ◖ 3877 = 1 + 969·2^2 ◗] 3879 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 121 = -7 + 1·2^7 ◗, ◖ 3879 = 7 + 121·2^5 ◗] 3881 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 121 = 1 + 15·2^3 ◗, ◖ 485 = 1 + 121·2^2 ◗, ◖ 3881 = 1 + 485·2^3 ◗] 3883 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 239 = -1 + 15·2^4 ◗, ◖ 971 = 15 + 239·2^2 ◗, ◖ 3883 = -1 + 971·2^2 ◗] 3885 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 975 = 15 + 15·2^6 ◗, ◖ 3885 = -15 + 975·2^2 ◗] 3887 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 121 = 1 + 15·2^3 ◗, ◖ 3887 = 15 + 121·2^5 ◗] 3889 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 61 = 1 + 15·2^2 ◗, ◖ 3889 = -15 + 61·2^6 ◗] 3891 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 61 = -3 + 1·2^6 ◗, ◖ 973 = -3 + 61·2^4 ◗, ◖ 3891 = -1 + 973·2^2 ◗] 3893 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 61 = -3 + 1·2^6 ◗, ◖ 973 = -3 + 61·2^4 ◗, ◖ 3893 = 1 + 973·2^2 ◗] 3895 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 61 = 1 + 15·2^2 ◗, ◖ 487 = -1 + 61·2^3 ◗, ◖ 3895 = -1 + 487·2^3 ◗] 3897 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 61 = 1 + 15·2^2 ◗, ◖ 487 = -1 + 61·2^3 ◗, ◖ 3897 = 1 + 487·2^3 ◗] 3899 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 975 = 15 + 15·2^6 ◗, ◖ 3899 = -1 + 975·2^2 ◗] 3901 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 975 = 15 + 15·2^6 ◗, ◖ 3901 = 1 + 975·2^2 ◗] 3903 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 61 = 1 + 15·2^2 ◗, ◖ 3903 = -1 + 61·2^6 ◗] 3905 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 61 = 1 + 15·2^2 ◗, ◖ 3905 = 1 + 61·2^6 ◗] 3907 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 1953 = -31 + 31·2^6 ◗, ◖ 3907 = 1 + 1953·2^1 ◗] 3909 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 61 = 1 + 15·2^2 ◗, ◖ 977 = 1 + 61·2^4 ◗, ◖ 3909 = 1 + 977·2^2 ◗] 3911 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 61 = 1 + 15·2^2 ◗, ◖ 489 = 1 + 61·2^3 ◗, ◖ 3911 = -1 + 489·2^3 ◗] 3913 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 61 = 1 + 15·2^2 ◗, ◖ 489 = 1 + 61·2^3 ◗, ◖ 3913 = 1 + 489·2^3 ◗] 3915 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 975 = 15 + 15·2^6 ◗, ◖ 3915 = 15 + 975·2^2 ◗] 3917 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 61 = -3 + 1·2^6 ◗, ◖ 979 = 3 + 61·2^4 ◗, ◖ 3917 = 1 + 979·2^2 ◗] 3919 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 61 = 1 + 15·2^2 ◗, ◖ 3919 = 15 + 61·2^6 ◗] 3921 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 247 = -1 + 31·2^3 ◗, ◖ 3921 = -31 + 247·2^4 ◗] 3923 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 249 = 1 + 31·2^3 ◗, ◖ 1961 = -31 + 249·2^3 ◗, ◖ 3923 = 1 + 1961·2^1 ◗] 3925 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 123 = -5 + 1·2^7 ◗, ◖ 1963 = -5 + 123·2^4 ◗, ◖ 3925 = -1 + 1963·2^1 ◗] 3927 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 495 = -33 + 33·2^4 ◗, ◖ 3927 = -33 + 495·2^3 ◗] 3929 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 495 = -1 + 31·2^4 ◗, ◖ 3929 = -31 + 495·2^3 ◗] 3931 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 123 = -5 + 1·2^7 ◗, ◖ 3931 = -5 + 123·2^5 ◗] 3933 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 991 = -1 + 31·2^5 ◗, ◖ 3933 = -31 + 991·2^2 ◗] 3935 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 123 = -1 + 31·2^2 ◗, ◖ 3935 = -1 + 123·2^5 ◗] 3937 /2/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 3937 = -31 + 31·2^7 ◗] 3939 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 1985 = 1 + 31·2^6 ◗, ◖ 3939 = -31 + 1985·2^1 ◗] 3941 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 123 = -5 + 1·2^7 ◗, ◖ 3941 = 5 + 123·2^5 ◗] 3943 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 247 = -9 + 1·2^8 ◗, ◖ 3943 = -9 + 247·2^4 ◗] 3945 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 495 = 15 + 15·2^5 ◗, ◖ 3945 = -15 + 495·2^3 ◗] 3947 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 247 = -1 + 31·2^3 ◗, ◖ 987 = -1 + 247·2^2 ◗, ◖ 3947 = -1 + 987·2^2 ◗] 3949 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 247 = -1 + 31·2^3 ◗, ◖ 987 = -1 + 247·2^2 ◗, ◖ 3949 = 1 + 987·2^2 ◗] 3951 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 247 = -1 + 31·2^3 ◗, ◖ 3951 = -1 + 247·2^4 ◗] 3953 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 247 = -1 + 31·2^3 ◗, ◖ 3953 = 1 + 247·2^4 ◗] 3955 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 247 = -1 + 31·2^3 ◗, ◖ 989 = 1 + 247·2^2 ◗, ◖ 3955 = -1 + 989·2^2 ◗] 3957 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 247 = -1 + 31·2^3 ◗, ◖ 989 = 1 + 247·2^2 ◗, ◖ 3957 = 1 + 989·2^2 ◗] 3959 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 495 = -1 + 31·2^4 ◗, ◖ 3959 = -1 + 495·2^3 ◗] 3961 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 495 = -1 + 31·2^4 ◗, ◖ 3961 = 1 + 495·2^3 ◗] 3963 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 991 = -1 + 31·2^5 ◗, ◖ 3963 = -1 + 991·2^2 ◗] 3965 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 991 = -1 + 31·2^5 ◗, ◖ 3965 = 1 + 991·2^2 ◗] 3967 /2/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 3967 = -1 + 31·2^7 ◗] 3969 /2/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 3969 = 1 + 31·2^7 ◗] 3971 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 993 = 1 + 31·2^5 ◗, ◖ 3971 = -1 + 993·2^2 ◗] 3973 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 993 = 1 + 31·2^5 ◗, ◖ 3973 = 1 + 993·2^2 ◗] 3975 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 497 = 1 + 31·2^4 ◗, ◖ 3975 = -1 + 497·2^3 ◗] 3977 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 497 = 1 + 31·2^4 ◗, ◖ 3977 = 1 + 497·2^3 ◗] 3979 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 249 = 1 + 31·2^3 ◗, ◖ 995 = -1 + 249·2^2 ◗, ◖ 3979 = -1 + 995·2^2 ◗] 3981 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 249 = 1 + 31·2^3 ◗, ◖ 995 = -1 + 249·2^2 ◗, ◖ 3981 = 1 + 995·2^2 ◗] 3983 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 249 = 1 + 31·2^3 ◗, ◖ 3983 = -1 + 249·2^4 ◗] 3985 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 249 = 1 + 31·2^3 ◗, ◖ 3985 = 1 + 249·2^4 ◗] 3987 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 249 = 1 + 31·2^3 ◗, ◖ 997 = 1 + 249·2^2 ◗, ◖ 3987 = -1 + 997·2^2 ◗] 3989 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 249 = 1 + 31·2^3 ◗, ◖ 997 = 1 + 249·2^2 ◗, ◖ 3989 = 1 + 997·2^2 ◗] 3991 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 249 = -7 + 1·2^8 ◗, ◖ 3991 = 7 + 249·2^4 ◗] 3993 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 495 = -33 + 33·2^4 ◗, ◖ 3993 = 33 + 495·2^3 ◗] 3995 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 991 = -1 + 31·2^5 ◗, ◖ 3995 = 31 + 991·2^2 ◗] 3997 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 125 = -3 + 1·2^7 ◗, ◖ 3997 = -3 + 125·2^5 ◗] 3999 /2/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 3999 = 31 + 31·2^7 ◗] 4001 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 125 = 1 + 31·2^2 ◗, ◖ 4001 = 1 + 125·2^5 ◗] 4003 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 125 = -3 + 1·2^7 ◗, ◖ 4003 = 3 + 125·2^5 ◗] 4005 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 125 = 1 + 31·2^2 ◗, ◖ 1001 = 1 + 125·2^3 ◗, ◖ 4005 = 1 + 1001·2^2 ◗] 4007 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 497 = 1 + 31·2^4 ◗, ◖ 4007 = 31 + 497·2^3 ◗] 4009 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 125 = 1 + 31·2^2 ◗, ◖ 501 = 1 + 125·2^2 ◗, ◖ 4009 = 1 + 501·2^3 ◗] 4011 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 251 = -5 + 1·2^8 ◗, ◖ 4011 = -5 + 251·2^4 ◗] 4013 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 251 = -1 + 63·2^2 ◗, ◖ 1003 = -1 + 251·2^2 ◗, ◖ 4013 = 1 + 1003·2^2 ◗] 4015 /3/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 251 = -1 + 63·2^2 ◗, ◖ 4015 = -1 + 251·2^4 ◗] 4017 /3/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 251 = -1 + 63·2^2 ◗, ◖ 4017 = 1 + 251·2^4 ◗] 4019 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 251 = -1 + 63·2^2 ◗, ◖ 1005 = 1 + 251·2^2 ◗, ◖ 4019 = -1 + 1005·2^2 ◗] 4021 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 251 = -5 + 1·2^8 ◗, ◖ 4021 = 5 + 251·2^4 ◗] 4023 /3/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 503 = -1 + 63·2^3 ◗, ◖ 4023 = -1 + 503·2^3 ◗] 4025 /3/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 503 = -1 + 63·2^3 ◗, ◖ 4025 = 1 + 503·2^3 ◗] 4027 /3/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 1007 = -1 + 63·2^4 ◗, ◖ 4027 = -1 + 1007·2^2 ◗] 4029 /3/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 1007 = -1 + 63·2^4 ◗, ◖ 4029 = 1 + 1007·2^2 ◗] 4031 /2/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 4031 = -1 + 63·2^6 ◗] 4033 /2/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 4033 = 1 + 63·2^6 ◗] 4035 /3/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 1009 = 1 + 63·2^4 ◗, ◖ 4035 = -1 + 1009·2^2 ◗] 4037 /3/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 1009 = 1 + 63·2^4 ◗, ◖ 4037 = 1 + 1009·2^2 ◗] 4039 /3/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 505 = 1 + 63·2^3 ◗, ◖ 4039 = -1 + 505·2^3 ◗] 4041 /3/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 505 = 1 + 63·2^3 ◗, ◖ 4041 = 1 + 505·2^3 ◗] 4043 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 253 = 1 + 63·2^2 ◗, ◖ 1011 = -1 + 253·2^2 ◗, ◖ 4043 = -1 + 1011·2^2 ◗] 4045 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 253 = -3 + 1·2^8 ◗, ◖ 4045 = -3 + 253·2^4 ◗] 4047 /3/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 253 = 1 + 63·2^2 ◗, ◖ 4047 = -1 + 253·2^4 ◗] 4049 /3/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 253 = 1 + 63·2^2 ◗, ◖ 4049 = 1 + 253·2^4 ◗] 4051 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 253 = -3 + 1·2^8 ◗, ◖ 4051 = 3 + 253·2^4 ◗] 4053 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 253 = 1 + 63·2^2 ◗, ◖ 1013 = 1 + 253·2^2 ◗, ◖ 4053 = 1 + 1013·2^2 ◗] 4055 /3/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 507 = -1 + 127·2^2 ◗, ◖ 4055 = -1 + 507·2^3 ◗] 4057 /3/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 507 = -1 + 127·2^2 ◗, ◖ 4057 = 1 + 507·2^3 ◗] 4059 /3/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 1015 = -1 + 127·2^3 ◗, ◖ 4059 = -1 + 1015·2^2 ◗] 4061 /3/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 1015 = -1 + 127·2^3 ◗, ◖ 4061 = 1 + 1015·2^2 ◗] 4063 /2/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 4063 = -1 + 127·2^5 ◗] 4065 /2/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 4065 = 1 + 127·2^5 ◗] 4067 /3/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 1017 = 1 + 127·2^3 ◗, ◖ 4067 = -1 + 1017·2^2 ◗] 4069 /3/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 1017 = 1 + 127·2^3 ◗, ◖ 4069 = 1 + 1017·2^2 ◗] 4071 /3/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 509 = 1 + 127·2^2 ◗, ◖ 4071 = -1 + 509·2^3 ◗] 4073 /3/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 509 = 1 + 127·2^2 ◗, ◖ 4073 = 1 + 509·2^3 ◗] 4075 /3/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 1019 = -1 + 255·2^2 ◗, ◖ 4075 = -1 + 1019·2^2 ◗] 4077 /3/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 1019 = -1 + 255·2^2 ◗, ◖ 4077 = 1 + 1019·2^2 ◗] 4079 /2/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 4079 = -1 + 255·2^4 ◗] 4081 /2/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 4081 = 1 + 255·2^4 ◗] 4083 /3/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 1021 = 1 + 255·2^2 ◗, ◖ 4083 = -1 + 1021·2^2 ◗] 4085 /3/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 1021 = 1 + 255·2^2 ◗, ◖ 4085 = 1 + 1021·2^2 ◗] 4087 /2/ [◖ 1 ◗, ◖ 511 = -1 + 1·2^9 ◗, ◖ 4087 = -1 + 511·2^3 ◗] 4089 /2/ [◖ 1 ◗, ◖ 511 = -1 + 1·2^9 ◗, ◖ 4089 = 1 + 511·2^3 ◗] 4091 /2/ [◖ 1 ◗, ◖ 1023 = -1 + 1·2^10 ◗, ◖ 4091 = -1 + 1023·2^2 ◗] 4093 /2/ [◖ 1 ◗, ◖ 1023 = -1 + 1·2^10 ◗, ◖ 4093 = 1 + 1023·2^2 ◗] 4095 /1/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗] ==== no guarantee ==== ? 4097 /1/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗] ? 4099 /2/ [◖ 1 ◗, ◖ 1025 = 1 + 1·2^10 ◗, ◖ 4099 = -1 + 1025·2^2 ◗] ? 4101 /2/ [◖ 1 ◗, ◖ 1025 = 1 + 1·2^10 ◗, ◖ 4101 = 1 + 1025·2^2 ◗] ? 4103 /2/ [◖ 1 ◗, ◖ 513 = 1 + 1·2^9 ◗, ◖ 4103 = -1 + 513·2^3 ◗] ? 4105 /2/ [◖ 1 ◗, ◖ 513 = 1 + 1·2^9 ◗, ◖ 4105 = 1 + 513·2^3 ◗] ? 4107 /3/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 1027 = -1 + 257·2^2 ◗, ◖ 4107 = -1 + 1027·2^2 ◗] ? 4109 /3/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 1027 = -1 + 257·2^2 ◗, ◖ 4109 = 1 + 1027·2^2 ◗] ? 4111 /2/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 4111 = -1 + 257·2^4 ◗] ? 4113 /2/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 4113 = 1 + 257·2^4 ◗] ? 4115 /3/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 1029 = 1 + 257·2^2 ◗, ◖ 4115 = -1 + 1029·2^2 ◗] ? 4117 /3/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 1029 = 1 + 257·2^2 ◗, ◖ 4117 = 1 + 1029·2^2 ◗] ? 4119 /3/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 515 = -1 + 129·2^2 ◗, ◖ 4119 = -1 + 515·2^3 ◗] ? 4121 /3/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 515 = -1 + 129·2^2 ◗, ◖ 4121 = 1 + 515·2^3 ◗] ? 4123 /3/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 1031 = -1 + 129·2^3 ◗, ◖ 4123 = -1 + 1031·2^2 ◗] ? 4125 /3/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 1031 = -1 + 129·2^3 ◗, ◖ 4125 = 1 + 1031·2^2 ◗] ? 4127 /2/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 4127 = -1 + 129·2^5 ◗] ? 4129 /2/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 4129 = 1 + 129·2^5 ◗] ? 4131 /3/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 1033 = 1 + 129·2^3 ◗, ◖ 4131 = -1 + 1033·2^2 ◗] ? 4133 /3/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 1033 = 1 + 129·2^3 ◗, ◖ 4133 = 1 + 1033·2^2 ◗] ? 4135 /3/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 517 = 1 + 129·2^2 ◗, ◖ 4135 = -1 + 517·2^3 ◗] ? 4137 /3/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 517 = 1 + 129·2^2 ◗, ◖ 4137 = 1 + 517·2^3 ◗] ? 4139 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 259 = -1 + 65·2^2 ◗, ◖ 1035 = -1 + 259·2^2 ◗, ◖ 4139 = -1 + 1035·2^2 ◗] ? 4141 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 259 = 3 + 1·2^8 ◗, ◖ 4141 = -3 + 259·2^4 ◗] ? 4143 /3/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 259 = -1 + 65·2^2 ◗, ◖ 4143 = -1 + 259·2^4 ◗] ? 4145 /3/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 259 = -1 + 65·2^2 ◗, ◖ 4145 = 1 + 259·2^4 ◗] ? 4147 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 259 = 3 + 1·2^8 ◗, ◖ 4147 = 3 + 259·2^4 ◗] ? 4149 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 259 = -1 + 65·2^2 ◗, ◖ 1037 = 1 + 259·2^2 ◗, ◖ 4149 = 1 + 1037·2^2 ◗] ? 4151 /3/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 519 = -1 + 65·2^3 ◗, ◖ 4151 = -1 + 519·2^3 ◗] ? 4153 /3/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 519 = -1 + 65·2^3 ◗, ◖ 4153 = 1 + 519·2^3 ◗] ? 4155 /3/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 1039 = -1 + 65·2^4 ◗, ◖ 4155 = -1 + 1039·2^2 ◗] ? 4157 /3/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 1039 = -1 + 65·2^4 ◗, ◖ 4157 = 1 + 1039·2^2 ◗] ? 4159 /2/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 4159 = -1 + 65·2^6 ◗] ? 4161 /2/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 4161 = 1 + 65·2^6 ◗] ? 4163 /3/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 1041 = 1 + 65·2^4 ◗, ◖ 4163 = -1 + 1041·2^2 ◗] ? 4165 /3/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 1041 = 1 + 65·2^4 ◗, ◖ 4165 = 1 + 1041·2^2 ◗] ? 4167 /3/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 521 = 1 + 65·2^3 ◗, ◖ 4167 = -1 + 521·2^3 ◗] ? 4169 /3/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 521 = 1 + 65·2^3 ◗, ◖ 4169 = 1 + 521·2^3 ◗] ? 4171 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 261 = 5 + 1·2^8 ◗, ◖ 4171 = -5 + 261·2^4 ◗] ? 4173 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 261 = 1 + 65·2^2 ◗, ◖ 1043 = -1 + 261·2^2 ◗, ◖ 4173 = 1 + 1043·2^2 ◗] ? 4175 /3/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 261 = 1 + 65·2^2 ◗, ◖ 4175 = -1 + 261·2^4 ◗] ? 4177 /3/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 261 = 1 + 65·2^2 ◗, ◖ 4177 = 1 + 261·2^4 ◗] ? 4179 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 261 = 1 + 65·2^2 ◗, ◖ 1045 = 1 + 261·2^2 ◗, ◖ 4179 = -1 + 1045·2^2 ◗] ? 4181 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 261 = 5 + 1·2^8 ◗, ◖ 4181 = 5 + 261·2^4 ◗] ? 4183 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 527 = -1 + 33·2^4 ◗, ◖ 4183 = -33 + 527·2^3 ◗] ? 4185 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 527 = 31 + 31·2^4 ◗, ◖ 4185 = -31 + 527·2^3 ◗] ? 4187 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 1055 = -1 + 33·2^5 ◗, ◖ 4187 = -33 + 1055·2^2 ◗] ? 4189 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 131 = 3 + 1·2^7 ◗, ◖ 4189 = -3 + 131·2^5 ◗] ? 4191 /2/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 4191 = -33 + 33·2^7 ◗] ? 4193 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 131 = -1 + 33·2^2 ◗, ◖ 4193 = 1 + 131·2^5 ◗] ? 4195 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 131 = 3 + 1·2^7 ◗, ◖ 4195 = 3 + 131·2^5 ◗] ? 4197 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 131 = -1 + 33·2^2 ◗, ◖ 1049 = 1 + 131·2^3 ◗, ◖ 4197 = 1 + 1049·2^2 ◗] ? 4199 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 527 = -17 + 17·2^5 ◗, ◖ 4199 = -17 + 527·2^3 ◗] ? 4201 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 263 = 7 + 1·2^8 ◗, ◖ 4201 = -7 + 263·2^4 ◗] ? 4203 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 263 = -1 + 33·2^3 ◗, ◖ 1051 = -1 + 263·2^2 ◗, ◖ 4203 = -1 + 1051·2^2 ◗] ? 4205 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 263 = -1 + 33·2^3 ◗, ◖ 1051 = -1 + 263·2^2 ◗, ◖ 4205 = 1 + 1051·2^2 ◗] ? 4207 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 263 = -1 + 33·2^3 ◗, ◖ 4207 = -1 + 263·2^4 ◗] ? 4209 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 263 = -1 + 33·2^3 ◗, ◖ 4209 = 1 + 263·2^4 ◗] ? 4211 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 263 = -1 + 33·2^3 ◗, ◖ 1053 = 1 + 263·2^2 ◗, ◖ 4211 = -1 + 1053·2^2 ◗] ? 4213 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 263 = -1 + 33·2^3 ◗, ◖ 1053 = 1 + 263·2^2 ◗, ◖ 4213 = 1 + 1053·2^2 ◗] ? 4215 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 527 = -1 + 33·2^4 ◗, ◖ 4215 = -1 + 527·2^3 ◗] ? 4217 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 527 = -1 + 33·2^4 ◗, ◖ 4217 = 1 + 527·2^3 ◗] ? 4219 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 1055 = -1 + 33·2^5 ◗, ◖ 4219 = -1 + 1055·2^2 ◗] ? 4221 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 1055 = -1 + 33·2^5 ◗, ◖ 4221 = 1 + 1055·2^2 ◗] ? 4223 /2/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 4223 = -1 + 33·2^7 ◗] ? 4225 /2/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 4225 = 1 + 33·2^7 ◗] ? 4227 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 1057 = 1 + 33·2^5 ◗, ◖ 4227 = -1 + 1057·2^2 ◗] ? 4229 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 1057 = 1 + 33·2^5 ◗, ◖ 4229 = 1 + 1057·2^2 ◗] ? 4231 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 529 = 1 + 33·2^4 ◗, ◖ 4231 = -1 + 529·2^3 ◗] ? 4233 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 529 = 1 + 33·2^4 ◗, ◖ 4233 = 1 + 529·2^3 ◗] ? 4235 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 265 = 1 + 33·2^3 ◗, ◖ 1059 = -1 + 265·2^2 ◗, ◖ 4235 = -1 + 1059·2^2 ◗] ? 4237 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 265 = 1 + 33·2^3 ◗, ◖ 1059 = -1 + 265·2^2 ◗, ◖ 4237 = 1 + 1059·2^2 ◗] ? 4239 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 265 = 1 + 33·2^3 ◗, ◖ 4239 = -1 + 265·2^4 ◗] ? 4241 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 265 = 1 + 33·2^3 ◗, ◖ 4241 = 1 + 265·2^4 ◗] ? 4243 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 265 = 1 + 33·2^3 ◗, ◖ 1061 = 1 + 265·2^2 ◗, ◖ 4243 = -1 + 1061·2^2 ◗] ? 4245 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 265 = 1 + 33·2^3 ◗, ◖ 1061 = 1 + 265·2^2 ◗, ◖ 4245 = 1 + 1061·2^2 ◗] ? 4247 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 527 = 31 + 31·2^4 ◗, ◖ 4247 = 31 + 527·2^3 ◗] ? 4249 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 265 = 9 + 1·2^8 ◗, ◖ 4249 = 9 + 265·2^4 ◗] ? 4251 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 133 = 5 + 1·2^7 ◗, ◖ 4251 = -5 + 133·2^5 ◗] ? 4253 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 1055 = -1 + 33·2^5 ◗, ◖ 4253 = 33 + 1055·2^2 ◗] ? 4255 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 133 = 1 + 33·2^2 ◗, ◖ 4255 = -1 + 133·2^5 ◗] ? 4257 /2/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 4257 = 33 + 33·2^7 ◗] ? 4259 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 2113 = 1 + 33·2^6 ◗, ◖ 4259 = 33 + 2113·2^1 ◗] ? 4261 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 133 = 5 + 1·2^7 ◗, ◖ 4261 = 5 + 133·2^5 ◗] ? 4263 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 133 = 1 + 33·2^2 ◗, ◖ 533 = 1 + 133·2^2 ◗, ◖ 4263 = -1 + 533·2^3 ◗] ? 4265 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 529 = 1 + 33·2^4 ◗, ◖ 4265 = 33 + 529·2^3 ◗] ? 4267 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1071 = -17 + 17·2^6 ◗, ◖ 4267 = -17 + 1071·2^2 ◗] ? 4269 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 271 = -1 + 17·2^4 ◗, ◖ 1067 = -17 + 271·2^2 ◗, ◖ 4269 = 1 + 1067·2^2 ◗] ? 4271 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 67 = -1 + 17·2^2 ◗, ◖ 4271 = -17 + 67·2^6 ◗] ? 4273 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 265 = 1 + 33·2^3 ◗, ◖ 4273 = 33 + 265·2^4 ◗] ? 4275 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 67 = 3 + 1·2^6 ◗, ◖ 1069 = -3 + 67·2^4 ◗, ◖ 4275 = -1 + 1069·2^2 ◗] ? 4277 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 67 = 3 + 1·2^6 ◗, ◖ 1069 = -3 + 67·2^4 ◗, ◖ 4277 = 1 + 1069·2^2 ◗] ? 4279 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 67 = -1 + 17·2^2 ◗, ◖ 535 = -1 + 67·2^3 ◗, ◖ 4279 = -1 + 535·2^3 ◗] ? 4281 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 67 = -1 + 17·2^2 ◗, ◖ 535 = -1 + 67·2^3 ◗, ◖ 4281 = 1 + 535·2^3 ◗] ? 4283 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1071 = -17 + 17·2^6 ◗, ◖ 4283 = -1 + 1071·2^2 ◗] ? 4285 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1071 = -17 + 17·2^6 ◗, ◖ 4285 = 1 + 1071·2^2 ◗] ? 4287 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 67 = -1 + 17·2^2 ◗, ◖ 4287 = -1 + 67·2^6 ◗] ? 4289 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 67 = -1 + 17·2^2 ◗, ◖ 4289 = 1 + 67·2^6 ◗] ? 4291 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 2145 = 33 + 33·2^6 ◗, ◖ 4291 = 1 + 2145·2^1 ◗] ? 4293 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 67 = -1 + 17·2^2 ◗, ◖ 1073 = 1 + 67·2^4 ◗, ◖ 4293 = 1 + 1073·2^2 ◗] ? 4295 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 67 = -1 + 17·2^2 ◗, ◖ 537 = 1 + 67·2^3 ◗, ◖ 4295 = -1 + 537·2^3 ◗] ? 4297 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 67 = -1 + 17·2^2 ◗, ◖ 537 = 1 + 67·2^3 ◗, ◖ 4297 = 1 + 537·2^3 ◗] ? 4299 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 67 = 3 + 1·2^6 ◗, ◖ 1075 = 3 + 67·2^4 ◗, ◖ 4299 = -1 + 1075·2^2 ◗] ? 4301 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1071 = -17 + 17·2^6 ◗, ◖ 4301 = 17 + 1071·2^2 ◗] ? 4303 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 135 = -1 + 17·2^3 ◗, ◖ 4303 = -17 + 135·2^5 ◗] ? 4305 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 67 = -1 + 17·2^2 ◗, ◖ 4305 = 17 + 67·2^6 ◗] ? 4307 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 135 = 7 + 1·2^7 ◗, ◖ 2153 = -7 + 135·2^4 ◗, ◖ 4307 = 1 + 2153·2^1 ◗] ? 4309 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 543 = -1 + 17·2^5 ◗, ◖ 2155 = -17 + 543·2^2 ◗, ◖ 4309 = -1 + 2155·2^1 ◗] ? 4311 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 135 = -9 + 9·2^4 ◗, ◖ 4311 = -9 + 135·2^5 ◗] ? 4313 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 135 = 7 + 1·2^7 ◗, ◖ 4313 = -7 + 135·2^5 ◗] ? 4315 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 135 = -1 + 17·2^3 ◗, ◖ 1079 = -1 + 135·2^3 ◗, ◖ 4315 = -1 + 1079·2^2 ◗] ? 4317 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 2159 = -17 + 17·2^7 ◗, ◖ 4317 = -1 + 2159·2^1 ◗] ? 4319 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 135 = -1 + 17·2^3 ◗, ◖ 4319 = -1 + 135·2^5 ◗] ? 4321 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 135 = -1 + 17·2^3 ◗, ◖ 4321 = 1 + 135·2^5 ◗] ? 4323 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 1089 = 33 + 33·2^5 ◗, ◖ 4323 = -33 + 1089·2^2 ◗] ? 4325 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 135 = -1 + 17·2^3 ◗, ◖ 1081 = 1 + 135·2^3 ◗, ◖ 4325 = 1 + 1081·2^2 ◗] ? 4327 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 135 = 7 + 1·2^7 ◗, ◖ 4327 = 7 + 135·2^5 ◗] ? 4329 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 135 = -9 + 9·2^4 ◗, ◖ 4329 = 9 + 135·2^5 ◗] ? 4331 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1087 = -1 + 17·2^6 ◗, ◖ 4331 = -17 + 1087·2^2 ◗] ? 4333 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 2175 = -1 + 17·2^7 ◗, ◖ 4333 = -17 + 2175·2^1 ◗] ? 4335 /2/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4335 = -17 + 17·2^8 ◗] ? 4337 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 271 = -1 + 17·2^4 ◗, ◖ 4337 = 1 + 271·2^4 ◗] ? 4339 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1089 = 1 + 17·2^6 ◗, ◖ 4339 = -17 + 1089·2^2 ◗] ? 4341 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 271 = -1 + 17·2^4 ◗, ◖ 1085 = 1 + 271·2^2 ◗, ◖ 4341 = 1 + 1085·2^2 ◗] ? 4343 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 543 = -1 + 17·2^5 ◗, ◖ 4343 = -1 + 543·2^3 ◗] ? 4345 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 543 = -1 + 17·2^5 ◗, ◖ 4345 = 1 + 543·2^3 ◗] ? 4347 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1087 = -1 + 17·2^6 ◗, ◖ 4347 = -1 + 1087·2^2 ◗] ? 4349 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1087 = -1 + 17·2^6 ◗, ◖ 4349 = 1 + 1087·2^2 ◗] ? 4351 /2/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4351 = -1 + 17·2^8 ◗] ? 4353 /2/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4353 = 1 + 17·2^8 ◗] ? 4355 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1089 = 1 + 17·2^6 ◗, ◖ 4355 = -1 + 1089·2^2 ◗] ? 4357 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1089 = 1 + 17·2^6 ◗, ◖ 4357 = 1 + 1089·2^2 ◗] ? 4359 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 545 = 1 + 17·2^5 ◗, ◖ 4359 = -1 + 545·2^3 ◗] ? 4361 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 545 = 1 + 17·2^5 ◗, ◖ 4361 = 1 + 545·2^3 ◗] ? 4363 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 273 = 1 + 17·2^4 ◗, ◖ 1091 = -1 + 273·2^2 ◗, ◖ 4363 = -1 + 1091·2^2 ◗] ? 4365 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1087 = -1 + 17·2^6 ◗, ◖ 4365 = 17 + 1087·2^2 ◗] ? 4367 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 273 = 1 + 17·2^4 ◗, ◖ 4367 = -1 + 273·2^4 ◗] ? 4369 /2/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4369 = 17 + 17·2^8 ◗] ? 4371 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 2177 = 1 + 17·2^7 ◗, ◖ 4371 = 17 + 2177·2^1 ◗] ? 4373 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1089 = 1 + 17·2^6 ◗, ◖ 4373 = 17 + 1089·2^2 ◗] ? 4375 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 137 = 9 + 1·2^7 ◗, ◖ 4375 = -9 + 137·2^5 ◗] ? 4377 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 545 = 1 + 17·2^5 ◗, ◖ 4377 = 17 + 545·2^3 ◗] ? 4379 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 137 = 1 + 17·2^3 ◗, ◖ 1095 = -1 + 137·2^3 ◗, ◖ 4379 = -1 + 1095·2^2 ◗] ? 4381 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 137 = 1 + 17·2^3 ◗, ◖ 1095 = -1 + 137·2^3 ◗, ◖ 4381 = 1 + 1095·2^2 ◗] ? 4383 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 137 = 1 + 17·2^3 ◗, ◖ 4383 = -1 + 137·2^5 ◗] ? 4385 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 137 = 1 + 17·2^3 ◗, ◖ 4385 = 1 + 137·2^5 ◗] ? 4387 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 2193 = 17 + 17·2^7 ◗, ◖ 4387 = 1 + 2193·2^1 ◗] ? 4389 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 1089 = 33 + 33·2^5 ◗, ◖ 4389 = 33 + 1089·2^2 ◗] ? 4391 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 137 = 1 + 17·2^3 ◗, ◖ 549 = 1 + 137·2^2 ◗, ◖ 4391 = -1 + 549·2^3 ◗] ? 4393 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 137 = 9 + 1·2^7 ◗, ◖ 4393 = 9 + 137·2^5 ◗] ? 4395 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 69 = 5 + 1·2^6 ◗, ◖ 1099 = -5 + 69·2^4 ◗, ◖ 4395 = -1 + 1099·2^2 ◗] ? 4397 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 69 = 5 + 1·2^6 ◗, ◖ 1099 = -5 + 69·2^4 ◗, ◖ 4397 = 1 + 1099·2^2 ◗] ? 4399 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 69 = 1 + 17·2^2 ◗, ◖ 4399 = -17 + 69·2^6 ◗] ? 4401 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 137 = 1 + 17·2^3 ◗, ◖ 4401 = 17 + 137·2^5 ◗] ? 4403 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1105 = 17 + 17·2^6 ◗, ◖ 4403 = -17 + 1105·2^2 ◗] ? 4405 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 69 = 5 + 1·2^6 ◗, ◖ 2203 = -5 + 69·2^5 ◗, ◖ 4405 = -1 + 2203·2^1 ◗] ? 4407 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 69 = 1 + 17·2^2 ◗, ◖ 551 = -1 + 69·2^3 ◗, ◖ 4407 = -1 + 551·2^3 ◗] ? 4409 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 69 = 1 + 17·2^2 ◗, ◖ 551 = -1 + 69·2^3 ◗, ◖ 4409 = 1 + 551·2^3 ◗] ? 4411 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 69 = 5 + 1·2^6 ◗, ◖ 4411 = -5 + 69·2^6 ◗] ? 4413 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 69 = 1 + 17·2^2 ◗, ◖ 1103 = -1 + 69·2^4 ◗, ◖ 4413 = 1 + 1103·2^2 ◗] ? 4415 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 69 = 1 + 17·2^2 ◗, ◖ 4415 = -1 + 69·2^6 ◗] ? 4417 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 69 = 1 + 17·2^2 ◗, ◖ 4417 = 1 + 69·2^6 ◗] ? 4419 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1105 = 17 + 17·2^6 ◗, ◖ 4419 = -1 + 1105·2^2 ◗] ? 4421 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1105 = 17 + 17·2^6 ◗, ◖ 4421 = 1 + 1105·2^2 ◗] ? 4423 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 69 = 1 + 17·2^2 ◗, ◖ 553 = 1 + 69·2^3 ◗, ◖ 4423 = -1 + 553·2^3 ◗] ? 4425 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 69 = 1 + 17·2^2 ◗, ◖ 553 = 1 + 69·2^3 ◗, ◖ 4425 = 1 + 553·2^3 ◗] ? 4427 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 69 = 5 + 1·2^6 ◗, ◖ 2213 = 5 + 69·2^5 ◗, ◖ 4427 = 1 + 2213·2^1 ◗] ? 4429 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 279 = -9 + 9·2^5 ◗, ◖ 1107 = -9 + 279·2^2 ◗, ◖ 4429 = 1 + 1107·2^2 ◗] ? 4431 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 69 = 1 + 17·2^2 ◗, ◖ 277 = 1 + 69·2^2 ◗, ◖ 4431 = -1 + 277·2^4 ◗] ? 4433 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 69 = 1 + 17·2^2 ◗, ◖ 4433 = 17 + 69·2^6 ◗] ? 4435 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 69 = 5 + 1·2^6 ◗, ◖ 1109 = 5 + 69·2^4 ◗, ◖ 4435 = -1 + 1109·2^2 ◗] ? 4437 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1105 = 17 + 17·2^6 ◗, ◖ 4437 = 17 + 1105·2^2 ◗] ? 4439 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 35 = -5 + 5·2^3 ◗, ◖ 555 = -5 + 35·2^4 ◗, ◖ 4439 = -1 + 555·2^3 ◗] ? 4441 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 35 = -5 + 5·2^3 ◗, ◖ 555 = -5 + 35·2^4 ◗, ◖ 4441 = 1 + 555·2^3 ◗] ? 4443 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 35 = -1 + 9·2^2 ◗, ◖ 1111 = -9 + 35·2^5 ◗, ◖ 4443 = -1 + 1111·2^2 ◗] ? 4445 /3/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 1143 = 127 + 127·2^3 ◗, ◖ 4445 = -127 + 1143·2^2 ◗] ? 4447 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 35 = 33 + 1·2^1 ◗, ◖ 4447 = -33 + 35·2^7 ◗] ? 4449 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 35 = 31 + 1·2^2 ◗, ◖ 4449 = -31 + 35·2^7 ◗] ? 4451 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 35 = 7 + 7·2^2 ◗, ◖ 1113 = -7 + 35·2^5 ◗, ◖ 4451 = -1 + 1113·2^2 ◗] ? 4453 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 35 = 7 + 7·2^2 ◗, ◖ 1113 = -7 + 35·2^5 ◗, ◖ 4453 = 1 + 1113·2^2 ◗] ? 4455 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 279 = -9 + 9·2^5 ◗, ◖ 4455 = -9 + 279·2^4 ◗] ? 4457 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 279 = -9 + 9·2^5 ◗, ◖ 557 = -1 + 279·2^1 ◗, ◖ 4457 = 1 + 557·2^3 ◗] ? 4459 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 279 = -9 + 9·2^5 ◗, ◖ 1115 = -1 + 279·2^2 ◗, ◖ 4459 = -1 + 1115·2^2 ◗] ? 4461 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 279 = -9 + 9·2^5 ◗, ◖ 1115 = -1 + 279·2^2 ◗, ◖ 4461 = 1 + 1115·2^2 ◗] ? 4463 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 279 = -9 + 9·2^5 ◗, ◖ 4463 = -1 + 279·2^4 ◗] ? 4465 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 279 = -9 + 9·2^5 ◗, ◖ 4465 = 1 + 279·2^4 ◗] ? 4467 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 279 = -9 + 9·2^5 ◗, ◖ 1117 = 1 + 279·2^2 ◗, ◖ 4467 = -1 + 1117·2^2 ◗] ? 4469 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 279 = -9 + 9·2^5 ◗, ◖ 1117 = 1 + 279·2^2 ◗, ◖ 4469 = 1 + 1117·2^2 ◗] ? 4471 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 35 = -1 + 9·2^2 ◗, ◖ 4471 = -9 + 35·2^7 ◗] ? 4473 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 279 = -9 + 9·2^5 ◗, ◖ 4473 = 9 + 279·2^4 ◗] ? 4475 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 35 = -5 + 5·2^3 ◗, ◖ 4475 = -5 + 35·2^7 ◗] ? 4477 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 35 = 3 + 1·2^5 ◗, ◖ 4477 = -3 + 35·2^7 ◗] ? 4479 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 35 = -1 + 9·2^2 ◗, ◖ 4479 = -1 + 35·2^7 ◗] ? 4481 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 35 = -1 + 9·2^2 ◗, ◖ 4481 = 1 + 35·2^7 ◗] ? 4483 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 35 = 3 + 1·2^5 ◗, ◖ 4483 = 3 + 35·2^7 ◗] ? 4485 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 35 = -5 + 5·2^3 ◗, ◖ 4485 = 5 + 35·2^7 ◗] ? 4487 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 561 = 17 + 17·2^5 ◗, ◖ 4487 = -1 + 561·2^3 ◗] ? 4489 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 561 = 17 + 17·2^5 ◗, ◖ 4489 = 1 + 561·2^3 ◗] ? 4491 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 561 = 17 + 17·2^5 ◗, ◖ 1123 = 1 + 561·2^1 ◗, ◖ 4491 = -1 + 1123·2^2 ◗] ? 4493 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 561 = 17 + 17·2^5 ◗, ◖ 1123 = 1 + 561·2^1 ◗, ◖ 4493 = 1 + 1123·2^2 ◗] ? 4495 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 279 = 31 + 31·2^3 ◗, ◖ 4495 = 31 + 279·2^4 ◗] ? 4497 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 35 = 1 + 17·2^1 ◗, ◖ 4497 = 17 + 35·2^7 ◗] ? 4499 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 35 = -5 + 5·2^3 ◗, ◖ 1125 = 5 + 35·2^5 ◗, ◖ 4499 = -1 + 1125·2^2 ◗] ? 4501 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 35 = -5 + 5·2^3 ◗, ◖ 1125 = 5 + 35·2^5 ◗, ◖ 4501 = 1 + 1125·2^2 ◗] ? 4503 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 35 = 3 + 1·2^5 ◗, ◖ 563 = 3 + 35·2^4 ◗, ◖ 4503 = -1 + 563·2^3 ◗] ? 4505 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 561 = 17 + 17·2^5 ◗, ◖ 4505 = 17 + 561·2^3 ◗] ? 4507 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 71 = -1 + 9·2^3 ◗, ◖ 1127 = -9 + 71·2^4 ◗, ◖ 4507 = -1 + 1127·2^2 ◗] ? 4509 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 71 = -1 + 9·2^3 ◗, ◖ 1127 = -9 + 71·2^4 ◗, ◖ 4509 = 1 + 1127·2^2 ◗] ? 4511 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 35 = 31 + 1·2^2 ◗, ◖ 4511 = 31 + 35·2^7 ◗] ? 4513 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 35 = 33 + 1·2^1 ◗, ◖ 4513 = 33 + 35·2^7 ◗] ? 4515 /3/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 1161 = 129 + 129·2^3 ◗, ◖ 4515 = -129 + 1161·2^2 ◗] ? 4517 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 35 = -1 + 9·2^2 ◗, ◖ 1129 = 9 + 35·2^5 ◗, ◖ 4517 = 1 + 1129·2^2 ◗] ? 4519 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 35 = -5 + 5·2^3 ◗, ◖ 565 = 5 + 35·2^4 ◗, ◖ 4519 = -1 + 565·2^3 ◗] ? 4521 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 561 = 33 + 33·2^4 ◗, ◖ 4521 = 33 + 561·2^3 ◗] ? 4523 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 561 = 17 + 17·2^5 ◗, ◖ 2261 = 17 + 561·2^2 ◗, ◖ 4523 = 1 + 2261·2^1 ◗] ? 4525 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 71 = -1 + 9·2^3 ◗, ◖ 2263 = -9 + 71·2^5 ◗, ◖ 4525 = -1 + 2263·2^1 ◗] ? 4527 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 567 = -9 + 9·2^6 ◗, ◖ 4527 = -9 + 567·2^3 ◗] ? 4529 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 71 = -1 + 9·2^3 ◗, ◖ 283 = -1 + 71·2^2 ◗, ◖ 4529 = 1 + 283·2^4 ◗] ? 4531 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 567 = -9 + 9·2^6 ◗, ◖ 1133 = -1 + 567·2^1 ◗, ◖ 4531 = -1 + 1133·2^2 ◗] ? 4533 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 567 = -9 + 9·2^6 ◗, ◖ 1133 = -1 + 567·2^1 ◗, ◖ 4533 = 1 + 1133·2^2 ◗] ? 4535 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 567 = -9 + 9·2^6 ◗, ◖ 4535 = -1 + 567·2^3 ◗] ? 4537 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 567 = -9 + 9·2^6 ◗, ◖ 4537 = 1 + 567·2^3 ◗] ? 4539 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 71 = -1 + 9·2^3 ◗, ◖ 1135 = -1 + 71·2^4 ◗, ◖ 4539 = -1 + 1135·2^2 ◗] ? 4541 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 71 = -1 + 9·2^3 ◗, ◖ 1135 = -1 + 71·2^4 ◗, ◖ 4541 = 1 + 1135·2^2 ◗] ? 4543 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 71 = -1 + 9·2^3 ◗, ◖ 4543 = -1 + 71·2^6 ◗] ? 4545 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 71 = -1 + 9·2^3 ◗, ◖ 4545 = 1 + 71·2^6 ◗] ? 4547 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 71 = -1 + 9·2^3 ◗, ◖ 1137 = 1 + 71·2^4 ◗, ◖ 4547 = -1 + 1137·2^2 ◗] ? 4549 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 71 = -1 + 9·2^3 ◗, ◖ 1137 = 1 + 71·2^4 ◗, ◖ 4549 = 1 + 1137·2^2 ◗] ? 4551 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 71 = 7 + 1·2^6 ◗, ◖ 4551 = 7 + 71·2^6 ◗] ? 4553 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 71 = -1 + 9·2^3 ◗, ◖ 4553 = 9 + 71·2^6 ◗] ? 4555 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 287 = -1 + 9·2^5 ◗, ◖ 1139 = -9 + 287·2^2 ◗, ◖ 4555 = -1 + 1139·2^2 ◗] ? 4557 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 143 = -1 + 9·2^4 ◗, ◖ 2279 = -9 + 143·2^4 ◗, ◖ 4557 = -1 + 2279·2^1 ◗] ? 4559 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 71 = -1 + 9·2^3 ◗, ◖ 285 = 1 + 71·2^2 ◗, ◖ 4559 = -1 + 285·2^4 ◗] ? 4561 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 143 = 15 + 1·2^7 ◗, ◖ 4561 = -15 + 143·2^5 ◗] ? 4563 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 1143 = -9 + 9·2^7 ◗, ◖ 4563 = -9 + 1143·2^2 ◗] ? 4565 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 575 = -1 + 9·2^6 ◗, ◖ 1141 = -9 + 575·2^1 ◗, ◖ 4565 = 1 + 1141·2^2 ◗] ? 4567 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 143 = -1 + 9·2^4 ◗, ◖ 4567 = -9 + 143·2^5 ◗] ? 4569 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 143 = -1 + 9·2^4 ◗, ◖ 571 = -1 + 143·2^2 ◗, ◖ 4569 = 1 + 571·2^3 ◗] ? 4571 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 1143 = -9 + 9·2^7 ◗, ◖ 4571 = -1 + 1143·2^2 ◗] ? 4573 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 1143 = -9 + 9·2^7 ◗, ◖ 4573 = 1 + 1143·2^2 ◗] ? 4575 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 143 = -1 + 9·2^4 ◗, ◖ 4575 = -1 + 143·2^5 ◗] ? 4577 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 143 = -1 + 9·2^4 ◗, ◖ 4577 = 1 + 143·2^5 ◗] ? 4579 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 143 = -1 + 9·2^4 ◗, ◖ 1145 = 1 + 143·2^3 ◗, ◖ 4579 = -1 + 1145·2^2 ◗] ? 4581 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 1143 = -9 + 9·2^7 ◗, ◖ 4581 = 9 + 1143·2^2 ◗] ? 4583 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 287 = -1 + 9·2^5 ◗, ◖ 4583 = -9 + 287·2^4 ◗] ? 4585 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 143 = -1 + 9·2^4 ◗, ◖ 4585 = 9 + 143·2^5 ◗] ? 4587 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 287 = -1 + 9·2^5 ◗, ◖ 1147 = -1 + 287·2^2 ◗, ◖ 4587 = -1 + 1147·2^2 ◗] ? 4589 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 2295 = -9 + 9·2^8 ◗, ◖ 4589 = -1 + 2295·2^1 ◗] ? 4591 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 287 = -1 + 9·2^5 ◗, ◖ 4591 = -1 + 287·2^4 ◗] ? 4593 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 287 = -1 + 9·2^5 ◗, ◖ 4593 = 1 + 287·2^4 ◗] ? 4595 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 1151 = -1 + 9·2^7 ◗, ◖ 4595 = -9 + 1151·2^2 ◗] ? 4597 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 2303 = -1 + 9·2^8 ◗, ◖ 4597 = -9 + 2303·2^1 ◗] ? 4599 /2/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4599 = -9 + 9·2^9 ◗] ? 4601 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 575 = -1 + 9·2^6 ◗, ◖ 4601 = 1 + 575·2^3 ◗] ? 4603 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 1151 = -1 + 9·2^7 ◗, ◖ 4603 = -1 + 1151·2^2 ◗] ? 4605 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 1151 = -1 + 9·2^7 ◗, ◖ 4605 = 1 + 1151·2^2 ◗] ? 4607 /2/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4607 = -1 + 9·2^9 ◗] ? 4609 /2/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4609 = 1 + 9·2^9 ◗] ? 4611 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 1153 = 1 + 9·2^7 ◗, ◖ 4611 = -1 + 1153·2^2 ◗] ? 4613 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 1153 = 1 + 9·2^7 ◗, ◖ 4613 = 1 + 1153·2^2 ◗] ? 4615 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 577 = 1 + 9·2^6 ◗, ◖ 4615 = -1 + 577·2^3 ◗] ? 4617 /2/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4617 = 9 + 9·2^9 ◗] ? 4619 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 2305 = 1 + 9·2^8 ◗, ◖ 4619 = 9 + 2305·2^1 ◗] ? 4621 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 1153 = 1 + 9·2^7 ◗, ◖ 4621 = 9 + 1153·2^2 ◗] ? 4623 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 289 = 1 + 9·2^5 ◗, ◖ 4623 = -1 + 289·2^4 ◗] ? 4625 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 289 = 1 + 9·2^5 ◗, ◖ 4625 = 1 + 289·2^4 ◗] ? 4627 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 2313 = 9 + 9·2^8 ◗, ◖ 4627 = 1 + 2313·2^1 ◗] ? 4629 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 289 = 1 + 9·2^5 ◗, ◖ 1157 = 1 + 289·2^2 ◗, ◖ 4629 = 1 + 1157·2^2 ◗] ? 4631 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 145 = 1 + 9·2^4 ◗, ◖ 4631 = -9 + 145·2^5 ◗] ? 4633 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 289 = 1 + 9·2^5 ◗, ◖ 4633 = 9 + 289·2^4 ◗] ? 4635 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 1161 = 9 + 9·2^7 ◗, ◖ 4635 = -9 + 1161·2^2 ◗] ? 4637 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 145 = 1 + 9·2^4 ◗, ◖ 1159 = -1 + 145·2^3 ◗, ◖ 4637 = 1 + 1159·2^2 ◗] ? 4639 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 145 = 1 + 9·2^4 ◗, ◖ 4639 = -1 + 145·2^5 ◗] ? 4641 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 145 = 1 + 9·2^4 ◗, ◖ 4641 = 1 + 145·2^5 ◗] ? 4643 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 1161 = 9 + 9·2^7 ◗, ◖ 4643 = -1 + 1161·2^2 ◗] ? 4645 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 1161 = 9 + 9·2^7 ◗, ◖ 4645 = 1 + 1161·2^2 ◗] ? 4647 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 145 = 1 + 9·2^4 ◗, ◖ 581 = 1 + 145·2^2 ◗, ◖ 4647 = -1 + 581·2^3 ◗] ? 4649 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 145 = 1 + 9·2^4 ◗, ◖ 4649 = 9 + 145·2^5 ◗] ? 4651 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 577 = 1 + 9·2^6 ◗, ◖ 1163 = 9 + 577·2^1 ◗, ◖ 4651 = -1 + 1163·2^2 ◗] ? 4653 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 1161 = 9 + 9·2^7 ◗, ◖ 4653 = 9 + 1161·2^2 ◗] ? 4655 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 73 = 1 + 9·2^3 ◗, ◖ 291 = -1 + 73·2^2 ◗, ◖ 4655 = -1 + 291·2^4 ◗] ? 4657 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 145 = 17 + 1·2^7 ◗, ◖ 4657 = 17 + 145·2^5 ◗] ? 4659 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 145 = 1 + 9·2^4 ◗, ◖ 2329 = 9 + 145·2^4 ◗, ◖ 4659 = 1 + 2329·2^1 ◗] ? 4661 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 289 = 1 + 9·2^5 ◗, ◖ 1165 = 9 + 289·2^2 ◗, ◖ 4661 = 1 + 1165·2^2 ◗] ? 4663 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 73 = 1 + 9·2^3 ◗, ◖ 4663 = -9 + 73·2^6 ◗] ? 4665 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 73 = 1 + 9·2^3 ◗, ◖ 583 = -1 + 73·2^3 ◗, ◖ 4665 = 1 + 583·2^3 ◗] ? 4667 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 73 = 1 + 9·2^3 ◗, ◖ 1167 = -1 + 73·2^4 ◗, ◖ 4667 = -1 + 1167·2^2 ◗] ? 4669 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 73 = 1 + 9·2^3 ◗, ◖ 1167 = -1 + 73·2^4 ◗, ◖ 4669 = 1 + 1167·2^2 ◗] ? 4671 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 73 = 1 + 9·2^3 ◗, ◖ 4671 = -1 + 73·2^6 ◗] ? 4673 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 73 = 1 + 9·2^3 ◗, ◖ 4673 = 1 + 73·2^6 ◗] ? 4675 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 73 = 1 + 9·2^3 ◗, ◖ 1169 = 1 + 73·2^4 ◗, ◖ 4675 = -1 + 1169·2^2 ◗] ? 4677 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 73 = 1 + 9·2^3 ◗, ◖ 1169 = 1 + 73·2^4 ◗, ◖ 4677 = 1 + 1169·2^2 ◗] ? 4679 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 585 = 9 + 9·2^6 ◗, ◖ 4679 = -1 + 585·2^3 ◗] ? 4681 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 585 = 9 + 9·2^6 ◗, ◖ 4681 = 1 + 585·2^3 ◗] ? 4683 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 585 = 9 + 9·2^6 ◗, ◖ 1171 = 1 + 585·2^1 ◗, ◖ 4683 = -1 + 1171·2^2 ◗] ? 4685 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 585 = 9 + 9·2^6 ◗, ◖ 1171 = 1 + 585·2^1 ◗, ◖ 4685 = 1 + 1171·2^2 ◗] ? 4687 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 73 = 1 + 9·2^3 ◗, ◖ 293 = 1 + 73·2^2 ◗, ◖ 4687 = -1 + 293·2^4 ◗] ? 4689 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 585 = 9 + 9·2^6 ◗, ◖ 4689 = 9 + 585·2^3 ◗] ? 4691 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 73 = 1 + 9·2^3 ◗, ◖ 2345 = 9 + 73·2^5 ◗, ◖ 4691 = 1 + 2345·2^1 ◗] ? 4693 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 289 = 17 + 17·2^4 ◗, ◖ 1173 = 17 + 289·2^2 ◗, ◖ 4693 = 1 + 1173·2^2 ◗] ? 4695 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 37 = 5 + 1·2^5 ◗, ◖ 587 = -5 + 37·2^4 ◗, ◖ 4695 = -1 + 587·2^3 ◗] ? 4697 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 37 = 5 + 1·2^5 ◗, ◖ 587 = -5 + 37·2^4 ◗, ◖ 4697 = 1 + 587·2^3 ◗] ? 4699 /3/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 1143 = 127 + 127·2^3 ◗, ◖ 4699 = 127 + 1143·2^2 ◗] ? 4701 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 37 = 1 + 9·2^2 ◗, ◖ 1175 = -9 + 37·2^5 ◗, ◖ 4701 = 1 + 1175·2^2 ◗] ? 4703 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 37 = 33 + 1·2^2 ◗, ◖ 4703 = -33 + 37·2^7 ◗] ? 4705 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 37 = 1 + 9·2^2 ◗, ◖ 147 = -1 + 37·2^2 ◗, ◖ 4705 = 1 + 147·2^5 ◗] ? 4707 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 73 = 1 + 9·2^3 ◗, ◖ 1177 = 9 + 73·2^4 ◗, ◖ 4707 = -1 + 1177·2^2 ◗] ? 4709 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 73 = 1 + 9·2^3 ◗, ◖ 1177 = 9 + 73·2^4 ◗, ◖ 4709 = 1 + 1177·2^2 ◗] ? 4711 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 145 = 1 + 9·2^4 ◗, ◖ 589 = 9 + 145·2^2 ◗, ◖ 4711 = -1 + 589·2^3 ◗] ? 4713 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 145 = 1 + 9·2^4 ◗, ◖ 589 = 9 + 145·2^2 ◗, ◖ 4713 = 1 + 589·2^3 ◗] ? 4715 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 37 = 5 + 1·2^5 ◗, ◖ 1179 = -5 + 37·2^5 ◗, ◖ 4715 = -1 + 1179·2^2 ◗] ? 4717 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 37 = 5 + 1·2^5 ◗, ◖ 1179 = -5 + 37·2^5 ◗, ◖ 4717 = 1 + 1179·2^2 ◗] ? 4719 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 297 = 33 + 33·2^3 ◗, ◖ 4719 = -33 + 297·2^4 ◗] ? 4721 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 37 = 1 + 9·2^2 ◗, ◖ 295 = -1 + 37·2^3 ◗, ◖ 4721 = 1 + 295·2^4 ◗] ? 4723 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 37 = 5 + 1·2^5 ◗, ◖ 591 = -1 + 37·2^4 ◗, ◖ 4723 = -5 + 591·2^3 ◗] ? 4725 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 4725 = -75 + 75·2^6 ◗] ? 4727 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 37 = 1 + 9·2^2 ◗, ◖ 4727 = -9 + 37·2^7 ◗] ? 4729 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 37 = 1 + 9·2^2 ◗, ◖ 591 = -1 + 37·2^4 ◗, ◖ 4729 = 1 + 591·2^3 ◗] ? 4731 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 37 = 5 + 1·2^5 ◗, ◖ 4731 = -5 + 37·2^7 ◗] ? 4733 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 37 = 1 + 9·2^2 ◗, ◖ 1183 = -1 + 37·2^5 ◗, ◖ 4733 = 1 + 1183·2^2 ◗] ? 4735 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 37 = 1 + 9·2^2 ◗, ◖ 4735 = -1 + 37·2^7 ◗] ? 4737 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 37 = 1 + 9·2^2 ◗, ◖ 4737 = 1 + 37·2^7 ◗] ? 4739 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 37 = 1 + 9·2^2 ◗, ◖ 1185 = 1 + 37·2^5 ◗, ◖ 4739 = -1 + 1185·2^2 ◗] ? 4741 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 37 = 5 + 1·2^5 ◗, ◖ 4741 = 5 + 37·2^7 ◗] ? 4743 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 297 = 9 + 9·2^5 ◗, ◖ 4743 = -9 + 297·2^4 ◗] ? 4745 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 37 = 1 + 9·2^2 ◗, ◖ 4745 = 9 + 37·2^7 ◗] ? 4747 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 297 = 9 + 9·2^5 ◗, ◖ 1187 = -1 + 297·2^2 ◗, ◖ 4747 = -1 + 1187·2^2 ◗] ? 4749 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 297 = 9 + 9·2^5 ◗, ◖ 1187 = -1 + 297·2^2 ◗, ◖ 4749 = 1 + 1187·2^2 ◗] ? 4751 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 297 = 9 + 9·2^5 ◗, ◖ 4751 = -1 + 297·2^4 ◗] ? 4753 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 297 = 9 + 9·2^5 ◗, ◖ 4753 = 1 + 297·2^4 ◗] ? 4755 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 297 = 9 + 9·2^5 ◗, ◖ 1189 = 1 + 297·2^2 ◗, ◖ 4755 = -1 + 1189·2^2 ◗] ? 4757 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 297 = 9 + 9·2^5 ◗, ◖ 1189 = 1 + 297·2^2 ◗, ◖ 4757 = 1 + 1189·2^2 ◗] ? 4759 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 297 = 9 + 9·2^5 ◗, ◖ 595 = 1 + 297·2^1 ◗, ◖ 4759 = -1 + 595·2^3 ◗] ? 4761 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 297 = 9 + 9·2^5 ◗, ◖ 4761 = 9 + 297·2^4 ◗] ? 4763 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 35 = 3 + 1·2^5 ◗, ◖ 595 = 35 + 35·2^4 ◗, ◖ 4763 = 3 + 595·2^3 ◗] ? 4765 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 19 = 3 + 1·2^4 ◗, ◖ 149 = -3 + 19·2^3 ◗, ◖ 4765 = -3 + 149·2^5 ◗] ? 4767 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 37 = 1 + 9·2^2 ◗, ◖ 149 = 1 + 37·2^2 ◗, ◖ 4767 = -1 + 149·2^5 ◗] ? 4769 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 37 = 33 + 1·2^2 ◗, ◖ 4769 = 33 + 37·2^7 ◗] ? 4771 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 37 = 1 + 9·2^2 ◗, ◖ 1193 = 9 + 37·2^5 ◗, ◖ 4771 = -1 + 1193·2^2 ◗] ? 4773 /3/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 1161 = 129 + 129·2^3 ◗, ◖ 4773 = 129 + 1161·2^2 ◗] ? 4775 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 37 = 5 + 1·2^5 ◗, ◖ 597 = 5 + 37·2^4 ◗, ◖ 4775 = -1 + 597·2^3 ◗] ? 4777 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 37 = 5 + 1·2^5 ◗, ◖ 597 = 5 + 37·2^4 ◗, ◖ 4777 = 1 + 597·2^3 ◗] ? 4779 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 1195 = -5 + 75·2^4 ◗, ◖ 4779 = -1 + 1195·2^2 ◗] ? 4781 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 1195 = -5 + 75·2^4 ◗, ◖ 4781 = 1 + 1195·2^2 ◗] ? 4783 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 299 = -1 + 75·2^2 ◗, ◖ 4783 = -1 + 299·2^4 ◗] ? 4785 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 75 = 15 + 15·2^2 ◗, ◖ 4785 = -15 + 75·2^6 ◗] ? 4787 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 297 = 9 + 9·2^5 ◗, ◖ 1197 = 9 + 297·2^2 ◗, ◖ 4787 = -1 + 1197·2^2 ◗] ? 4789 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 2395 = -5 + 75·2^5 ◗, ◖ 4789 = -1 + 2395·2^1 ◗] ? 4791 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 599 = -1 + 75·2^3 ◗, ◖ 4791 = -1 + 599·2^3 ◗] ? 4793 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 599 = -1 + 75·2^3 ◗, ◖ 4793 = 1 + 599·2^3 ◗] ? 4795 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 4795 = -5 + 75·2^6 ◗] ? 4797 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 1199 = -1 + 75·2^4 ◗, ◖ 4797 = 1 + 1199·2^2 ◗] ? 4799 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 4799 = -1 + 75·2^6 ◗] ? 4801 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 4801 = 1 + 75·2^6 ◗] ? 4803 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 1201 = 1 + 75·2^4 ◗, ◖ 4803 = -1 + 1201·2^2 ◗] ? 4805 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 4805 = 5 + 75·2^6 ◗] ? 4807 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 601 = 1 + 75·2^3 ◗, ◖ 4807 = -1 + 601·2^3 ◗] ? 4809 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 601 = 1 + 75·2^3 ◗, ◖ 4809 = 1 + 601·2^3 ◗] ? 4811 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 2405 = 5 + 75·2^5 ◗, ◖ 4811 = 1 + 2405·2^1 ◗] ? 4813 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 19 = 3 + 1·2^4 ◗, ◖ 301 = -3 + 19·2^4 ◗, ◖ 4813 = -3 + 301·2^4 ◗] ? 4815 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 75 = 15 + 15·2^2 ◗, ◖ 4815 = 15 + 75·2^6 ◗] ? 4817 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 301 = 1 + 75·2^2 ◗, ◖ 4817 = 1 + 301·2^4 ◗] ? 4819 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 1205 = 5 + 75·2^4 ◗, ◖ 4819 = -1 + 1205·2^2 ◗] ? 4821 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 1205 = 5 + 75·2^4 ◗, ◖ 4821 = 1 + 1205·2^2 ◗] ? 4823 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 19 = -1 + 5·2^2 ◗, ◖ 603 = -5 + 19·2^5 ◗, ◖ 4823 = -1 + 603·2^3 ◗] ? 4825 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 19 = -1 + 5·2^2 ◗, ◖ 603 = -5 + 19·2^5 ◗, ◖ 4825 = 1 + 603·2^3 ◗] ? 4827 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 19 = 1 + 9·2^1 ◗, ◖ 1207 = -9 + 19·2^6 ◗, ◖ 4827 = -1 + 1207·2^2 ◗] ? 4829 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 19 = 1 + 9·2^1 ◗, ◖ 1207 = -9 + 19·2^6 ◗, ◖ 4829 = 1 + 1207·2^2 ◗] ? 4831 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 19 = -1 + 5·2^2 ◗, ◖ 151 = -1 + 19·2^3 ◗, ◖ 4831 = -1 + 151·2^5 ◗] ? 4833 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 19 = -1 + 5·2^2 ◗, ◖ 151 = -1 + 19·2^3 ◗, ◖ 4833 = 1 + 151·2^5 ◗] ? 4835 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 19 = 15 + 1·2^2 ◗, ◖ 2417 = -15 + 19·2^7 ◗, ◖ 4835 = 1 + 2417·2^1 ◗] ? 4837 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 155 = 31 + 31·2^2 ◗, ◖ 1209 = -31 + 155·2^3 ◗, ◖ 4837 = 1 + 1209·2^2 ◗] ? 4839 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 19 = 3 + 1·2^4 ◗, ◖ 605 = -3 + 19·2^5 ◗, ◖ 4839 = -1 + 605·2^3 ◗] ? 4841 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 19 = 3 + 1·2^4 ◗, ◖ 605 = -3 + 19·2^5 ◗, ◖ 4841 = 1 + 605·2^3 ◗] ? 4843 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 19 = -1 + 5·2^2 ◗, ◖ 1211 = -5 + 19·2^6 ◗, ◖ 4843 = -1 + 1211·2^2 ◗] ? 4845 /3/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 1275 = 255 + 255·2^2 ◗, ◖ 4845 = -255 + 1275·2^2 ◗] ? 4847 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 19 = 17 + 1·2^1 ◗, ◖ 4847 = -17 + 19·2^8 ◗] ? 4849 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 19 = 15 + 1·2^2 ◗, ◖ 4849 = -15 + 19·2^8 ◗] ? 4851 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 19 = 3 + 1·2^4 ◗, ◖ 1213 = -3 + 19·2^6 ◗, ◖ 4851 = -1 + 1213·2^2 ◗] ? 4853 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 19 = 3 + 1·2^4 ◗, ◖ 1213 = -3 + 19·2^6 ◗, ◖ 4853 = 1 + 1213·2^2 ◗] ? 4855 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 19 = 1 + 9·2^1 ◗, ◖ 4855 = -9 + 19·2^8 ◗] ? 4857 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 19 = -1 + 5·2^2 ◗, ◖ 607 = -1 + 19·2^5 ◗, ◖ 4857 = 1 + 607·2^3 ◗] ? 4859 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 19 = -1 + 5·2^2 ◗, ◖ 4859 = -5 + 19·2^8 ◗] ? 4861 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 19 = 3 + 1·2^4 ◗, ◖ 4861 = -3 + 19·2^8 ◗] ? 4863 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 19 = -1 + 5·2^2 ◗, ◖ 4863 = -1 + 19·2^8 ◗] ? 4865 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 19 = -1 + 5·2^2 ◗, ◖ 4865 = 1 + 19·2^8 ◗] ? 4867 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 19 = 3 + 1·2^4 ◗, ◖ 4867 = 3 + 19·2^8 ◗] ? 4869 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 19 = -1 + 5·2^2 ◗, ◖ 4869 = 5 + 19·2^8 ◗] ? 4871 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 19 = -1 + 5·2^2 ◗, ◖ 609 = 1 + 19·2^5 ◗, ◖ 4871 = -1 + 609·2^3 ◗] ? 4873 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 19 = 1 + 9·2^1 ◗, ◖ 4873 = 9 + 19·2^8 ◗] ? 4875 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 4875 = 75 + 75·2^6 ◗] ? 4877 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 19 = 3 + 1·2^4 ◗, ◖ 1219 = 3 + 19·2^6 ◗, ◖ 4877 = 1 + 1219·2^2 ◗] ? 4879 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 153 = 17 + 17·2^3 ◗, ◖ 4879 = -17 + 153·2^5 ◗] ? 4881 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 19 = 17 + 1·2^1 ◗, ◖ 4881 = 17 + 19·2^8 ◗] ? 4883 /3/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 1285 = 257 + 257·2^2 ◗, ◖ 4883 = -257 + 1285·2^2 ◗] ? 4885 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 19 = -1 + 5·2^2 ◗, ◖ 1221 = 5 + 19·2^6 ◗, ◖ 4885 = 1 + 1221·2^2 ◗] ? 4887 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 153 = 9 + 9·2^4 ◗, ◖ 4887 = -9 + 153·2^5 ◗] ? 4889 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 153 = 9 + 9·2^4 ◗, ◖ 611 = -1 + 153·2^2 ◗, ◖ 4889 = 1 + 611·2^3 ◗] ? 4891 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 153 = 9 + 9·2^4 ◗, ◖ 1223 = -1 + 153·2^3 ◗, ◖ 4891 = -1 + 1223·2^2 ◗] ? 4893 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 153 = 9 + 9·2^4 ◗, ◖ 1223 = -1 + 153·2^3 ◗, ◖ 4893 = 1 + 1223·2^2 ◗] ? 4895 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 153 = 9 + 9·2^4 ◗, ◖ 4895 = -1 + 153·2^5 ◗] ? 4897 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 153 = 9 + 9·2^4 ◗, ◖ 4897 = 1 + 153·2^5 ◗] ? 4899 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 153 = 9 + 9·2^4 ◗, ◖ 1225 = 1 + 153·2^3 ◗, ◖ 4899 = -1 + 1225·2^2 ◗] ? 4901 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 153 = 9 + 9·2^4 ◗, ◖ 1225 = 1 + 153·2^3 ◗, ◖ 4901 = 1 + 1225·2^2 ◗] ? 4903 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 153 = 9 + 9·2^4 ◗, ◖ 613 = 1 + 153·2^2 ◗, ◖ 4903 = -1 + 613·2^3 ◗] ? 4905 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 153 = 9 + 9·2^4 ◗, ◖ 4905 = 9 + 153·2^5 ◗] ? 4907 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 307 = -5 + 39·2^3 ◗, ◖ 4907 = -5 + 307·2^4 ◗] ? 4909 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 19 = 3 + 1·2^4 ◗, ◖ 307 = 3 + 19·2^4 ◗, ◖ 4909 = -3 + 307·2^4 ◗] ? 4911 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 153 = 9 + 9·2^4 ◗, ◖ 307 = 1 + 153·2^1 ◗, ◖ 4911 = -1 + 307·2^4 ◗] ? 4913 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 153 = 17 + 17·2^3 ◗, ◖ 4913 = 17 + 153·2^5 ◗] ? 4915 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 153 = 9 + 9·2^4 ◗, ◖ 2457 = 9 + 153·2^4 ◗, ◖ 4915 = 1 + 2457·2^1 ◗] ? 4917 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 307 = -5 + 39·2^3 ◗, ◖ 4917 = 5 + 307·2^4 ◗] ? 4919 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 615 = -5 + 155·2^2 ◗, ◖ 4919 = -1 + 615·2^3 ◗] ? 4921 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 615 = -5 + 155·2^2 ◗, ◖ 4921 = 1 + 615·2^3 ◗] ? 4923 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 19 = 15 + 1·2^2 ◗, ◖ 1231 = 15 + 19·2^6 ◗, ◖ 4923 = -1 + 1231·2^2 ◗] ? 4925 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 19 = 15 + 1·2^2 ◗, ◖ 1231 = 15 + 19·2^6 ◗, ◖ 4925 = 1 + 1231·2^2 ◗] ? 4927 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 19 = -1 + 5·2^2 ◗, ◖ 77 = 1 + 19·2^2 ◗, ◖ 4927 = -1 + 77·2^6 ◗] ? 4929 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 155 = 31 + 31·2^2 ◗, ◖ 4929 = -31 + 155·2^5 ◗] ? 4931 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 153 = 9 + 9·2^4 ◗, ◖ 1233 = 9 + 153·2^3 ◗, ◖ 4931 = -1 + 1233·2^2 ◗] ? 4933 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 153 = 9 + 9·2^4 ◗, ◖ 1233 = 9 + 153·2^3 ◗, ◖ 4933 = 1 + 1233·2^2 ◗] ? 4935 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 19 = 1 + 9·2^1 ◗, ◖ 617 = 9 + 19·2^5 ◗, ◖ 4935 = -1 + 617·2^3 ◗] ? 4937 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 19 = 1 + 9·2^1 ◗, ◖ 617 = 9 + 19·2^5 ◗, ◖ 4937 = 1 + 617·2^3 ◗] ? 4939 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 1235 = -5 + 155·2^3 ◗, ◖ 4939 = -1 + 1235·2^2 ◗] ? 4941 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 1235 = -5 + 155·2^3 ◗, ◖ 4941 = 1 + 1235·2^2 ◗] ? 4943 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 309 = -1 + 155·2^1 ◗, ◖ 4943 = -1 + 309·2^4 ◗] ? 4945 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 309 = -1 + 155·2^1 ◗, ◖ 4945 = 1 + 309·2^4 ◗] ? 4947 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 619 = -1 + 155·2^2 ◗, ◖ 4947 = -5 + 619·2^3 ◗] ? 4949 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 2475 = -5 + 155·2^4 ◗, ◖ 4949 = -1 + 2475·2^1 ◗] ? 4951 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 619 = -1 + 155·2^2 ◗, ◖ 4951 = -1 + 619·2^3 ◗] ? 4953 /3/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 635 = 127 + 127·2^2 ◗, ◖ 4953 = -127 + 635·2^3 ◗] ? 4955 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 4955 = -5 + 155·2^5 ◗] ? 4957 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 1239 = -1 + 155·2^3 ◗, ◖ 4957 = 1 + 1239·2^2 ◗] ? 4959 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 4959 = -1 + 155·2^5 ◗] ? 4961 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 4961 = 1 + 155·2^5 ◗] ? 4963 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 1241 = 1 + 155·2^3 ◗, ◖ 4963 = -1 + 1241·2^2 ◗] ? 4965 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 4965 = 5 + 155·2^5 ◗] ? 4967 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 621 = 1 + 155·2^2 ◗, ◖ 4967 = -1 + 621·2^3 ◗] ? 4969 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 621 = 1 + 155·2^2 ◗, ◖ 4969 = 1 + 621·2^3 ◗] ? 4971 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 1243 = -5 + 39·2^5 ◗, ◖ 4971 = -1 + 1243·2^2 ◗] ? 4973 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 1243 = -5 + 39·2^5 ◗, ◖ 4973 = 1 + 1243·2^2 ◗] ? 4975 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 311 = -1 + 39·2^3 ◗, ◖ 4975 = -1 + 311·2^4 ◗] ? 4977 /3/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 315 = 63 + 63·2^2 ◗, ◖ 4977 = -63 + 315·2^4 ◗] ? 4979 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 1245 = 5 + 155·2^3 ◗, ◖ 4979 = -1 + 1245·2^2 ◗] ? 4981 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 2491 = -5 + 39·2^6 ◗, ◖ 4981 = -1 + 2491·2^1 ◗] ? 4983 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 623 = -1 + 39·2^4 ◗, ◖ 4983 = -1 + 623·2^3 ◗] ? 4985 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 39 = 7 + 1·2^5 ◗, ◖ 4985 = -7 + 39·2^7 ◗] ? 4987 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 4987 = -5 + 39·2^7 ◗] ? 4989 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 1247 = -1 + 39·2^5 ◗, ◖ 4989 = 1 + 1247·2^2 ◗] ? 4991 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 4991 = -1 + 39·2^7 ◗] ? 4993 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 4993 = 1 + 39·2^7 ◗] ? 4995 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 1249 = 1 + 39·2^5 ◗, ◖ 4995 = -1 + 1249·2^2 ◗] ? 4997 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 4997 = 5 + 39·2^7 ◗] ? 4999 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 39 = 7 + 1·2^5 ◗, ◖ 4999 = 7 + 39·2^7 ◗] ? 5001 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 625 = 1 + 39·2^4 ◗, ◖ 5001 = 1 + 625·2^3 ◗] ? 5003 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 2501 = 5 + 39·2^6 ◗, ◖ 5003 = 1 + 2501·2^1 ◗] ? 5005 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 39 = 7 + 1·2^5 ◗, ◖ 2503 = 7 + 39·2^6 ◗, ◖ 5005 = -1 + 2503·2^1 ◗] ? 5007 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 313 = 1 + 39·2^3 ◗, ◖ 5007 = -1 + 313·2^4 ◗] ? 5009 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 313 = 1 + 39·2^3 ◗, ◖ 5009 = 1 + 313·2^4 ◗] ? 5011 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 1253 = 5 + 39·2^5 ◗, ◖ 5011 = -1 + 1253·2^2 ◗] ? 5013 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 1253 = 5 + 39·2^5 ◗, ◖ 5013 = 1 + 1253·2^2 ◗] ? 5015 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 79 = -1 + 5·2^4 ◗, ◖ 627 = -5 + 79·2^3 ◗, ◖ 5015 = -1 + 627·2^3 ◗] ? 5017 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 79 = -1 + 5·2^4 ◗, ◖ 627 = -5 + 79·2^3 ◗, ◖ 5017 = 1 + 627·2^3 ◗] ? 5019 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 315 = -5 + 5·2^6 ◗, ◖ 1255 = -5 + 315·2^2 ◗, ◖ 5019 = -1 + 1255·2^2 ◗] ? 5021 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 315 = -5 + 5·2^6 ◗, ◖ 1255 = -5 + 315·2^2 ◗, ◖ 5021 = 1 + 1255·2^2 ◗] ? 5023 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 39 = 31 + 1·2^3 ◗, ◖ 5023 = 31 + 39·2^7 ◗] ? 5025 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 157 = 1 + 39·2^2 ◗, ◖ 5025 = 1 + 157·2^5 ◗] ? 5027 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 79 = 15 + 1·2^6 ◗, ◖ 2513 = -15 + 79·2^5 ◗, ◖ 5027 = 1 + 2513·2^1 ◗] ? 5029 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 315 = -5 + 5·2^6 ◗, ◖ 2515 = -5 + 315·2^3 ◗, ◖ 5029 = -1 + 2515·2^1 ◗] ? 5031 /3/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 645 = 129 + 129·2^2 ◗, ◖ 5031 = -129 + 645·2^3 ◗] ? 5033 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 315 = -5 + 5·2^6 ◗, ◖ 629 = -1 + 315·2^1 ◗, ◖ 5033 = 1 + 629·2^3 ◗] ? 5035 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 315 = -5 + 5·2^6 ◗, ◖ 5035 = -5 + 315·2^4 ◗] ? 5037 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 315 = -5 + 5·2^6 ◗, ◖ 1259 = -1 + 315·2^2 ◗, ◖ 5037 = 1 + 1259·2^2 ◗] ? 5039 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 315 = -5 + 5·2^6 ◗, ◖ 5039 = -1 + 315·2^4 ◗] ? 5041 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 315 = -5 + 5·2^6 ◗, ◖ 5041 = 1 + 315·2^4 ◗] ? 5043 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 315 = -5 + 5·2^6 ◗, ◖ 1261 = 1 + 315·2^2 ◗, ◖ 5043 = -1 + 1261·2^2 ◗] ? 5045 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 315 = -5 + 5·2^6 ◗, ◖ 5045 = 5 + 315·2^4 ◗] ? 5047 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 79 = -1 + 5·2^4 ◗, ◖ 631 = -1 + 79·2^3 ◗, ◖ 5047 = -1 + 631·2^3 ◗] ? 5049 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 153 = 9 + 9·2^4 ◗, ◖ 5049 = 153 + 153·2^5 ◗] ? 5051 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 79 = -1 + 5·2^4 ◗, ◖ 5051 = -5 + 79·2^6 ◗] ? 5053 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 79 = -1 + 5·2^4 ◗, ◖ 1263 = -1 + 79·2^4 ◗, ◖ 5053 = 1 + 1263·2^2 ◗] ? 5055 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 79 = -1 + 5·2^4 ◗, ◖ 5055 = -1 + 79·2^6 ◗] ? 5057 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 79 = -1 + 5·2^4 ◗, ◖ 5057 = 1 + 79·2^6 ◗] ? 5059 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 79 = -1 + 5·2^4 ◗, ◖ 1265 = 1 + 79·2^4 ◗, ◖ 5059 = -1 + 1265·2^2 ◗] ? 5061 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 79 = -1 + 5·2^4 ◗, ◖ 5061 = 5 + 79·2^6 ◗] ? 5063 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 79 = -1 + 5·2^4 ◗, ◖ 633 = 1 + 79·2^3 ◗, ◖ 5063 = -1 + 633·2^3 ◗] ? 5065 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 79 = -1 + 5·2^4 ◗, ◖ 633 = 1 + 79·2^3 ◗, ◖ 5065 = 1 + 633·2^3 ◗] ? 5067 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 79 = -1 + 5·2^4 ◗, ◖ 2533 = 5 + 79·2^5 ◗, ◖ 5067 = 1 + 2533·2^1 ◗] ? 5069 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 159 = -1 + 5·2^5 ◗, ◖ 1267 = -5 + 159·2^3 ◗, ◖ 5069 = 1 + 1267·2^2 ◗] ? 5071 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 79 = 15 + 1·2^6 ◗, ◖ 5071 = 15 + 79·2^6 ◗] ? 5073 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 79 = -1 + 5·2^4 ◗, ◖ 317 = 1 + 79·2^2 ◗, ◖ 5073 = 1 + 317·2^4 ◗] ? 5075 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 635 = -5 + 5·2^7 ◗, ◖ 5075 = -5 + 635·2^3 ◗] ? 5077 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 635 = -5 + 5·2^7 ◗, ◖ 1269 = -1 + 635·2^1 ◗, ◖ 5077 = 1 + 1269·2^2 ◗] ? 5079 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 635 = -5 + 5·2^7 ◗, ◖ 5079 = -1 + 635·2^3 ◗] ? 5081 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 635 = -5 + 5·2^7 ◗, ◖ 5081 = 1 + 635·2^3 ◗] ? 5083 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 159 = -1 + 5·2^5 ◗, ◖ 5083 = -5 + 159·2^5 ◗] ? 5085 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 635 = -5 + 5·2^7 ◗, ◖ 5085 = 5 + 635·2^3 ◗] ? 5087 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 159 = -1 + 5·2^5 ◗, ◖ 5087 = -1 + 159·2^5 ◗] ? 5089 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 159 = -1 + 5·2^5 ◗, ◖ 5089 = 1 + 159·2^5 ◗] ? 5091 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 159 = -1 + 5·2^5 ◗, ◖ 1273 = 1 + 159·2^3 ◗, ◖ 5091 = -1 + 1273·2^2 ◗] ? 5093 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 159 = -1 + 5·2^5 ◗, ◖ 5093 = 5 + 159·2^5 ◗] ? 5095 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 1275 = -5 + 5·2^8 ◗, ◖ 5095 = -5 + 1275·2^2 ◗] ? 5097 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 159 = -1 + 5·2^5 ◗, ◖ 637 = 1 + 159·2^2 ◗, ◖ 5097 = 1 + 637·2^3 ◗] ? 5099 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 1275 = -5 + 5·2^8 ◗, ◖ 5099 = -1 + 1275·2^2 ◗] ? 5101 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 1275 = -5 + 5·2^8 ◗, ◖ 5101 = 1 + 1275·2^2 ◗] ? 5103 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 319 = -1 + 5·2^6 ◗, ◖ 5103 = -1 + 319·2^4 ◗] ? 5105 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 319 = -1 + 5·2^6 ◗, ◖ 5105 = 1 + 319·2^4 ◗] ? 5107 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 639 = -1 + 5·2^7 ◗, ◖ 5107 = -5 + 639·2^3 ◗] ? 5109 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 2555 = -5 + 5·2^9 ◗, ◖ 5109 = -1 + 2555·2^1 ◗] ? 5111 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 639 = -1 + 5·2^7 ◗, ◖ 5111 = -1 + 639·2^3 ◗] ? 5113 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 639 = -1 + 5·2^7 ◗, ◖ 5113 = 1 + 639·2^3 ◗] ? 5115 /2/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5115 = -5 + 5·2^10 ◗] ? 5117 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 1279 = -1 + 5·2^8 ◗, ◖ 5117 = 1 + 1279·2^2 ◗] ? 5119 /2/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5119 = -1 + 5·2^10 ◗] ? 5121 /2/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5121 = 1 + 5·2^10 ◗] ? 5123 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 1281 = 1 + 5·2^8 ◗, ◖ 5123 = -1 + 1281·2^2 ◗] ? 5125 /2/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5125 = 5 + 5·2^10 ◗] ? 5127 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 641 = 1 + 5·2^7 ◗, ◖ 5127 = -1 + 641·2^3 ◗] ? 5129 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 641 = 1 + 5·2^7 ◗, ◖ 5129 = 1 + 641·2^3 ◗] ? 5131 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 2565 = 5 + 5·2^9 ◗, ◖ 5131 = 1 + 2565·2^1 ◗] ? 5133 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 641 = 1 + 5·2^7 ◗, ◖ 5133 = 5 + 641·2^3 ◗] ? 5135 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 321 = 1 + 5·2^6 ◗, ◖ 5135 = -1 + 321·2^4 ◗] ? 5137 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 321 = 1 + 5·2^6 ◗, ◖ 5137 = 1 + 321·2^4 ◗] ? 5139 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 1285 = 5 + 5·2^8 ◗, ◖ 5139 = -1 + 1285·2^2 ◗] ? 5141 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 1285 = 5 + 5·2^8 ◗, ◖ 5141 = 1 + 1285·2^2 ◗] ? 5143 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 161 = 1 + 5·2^5 ◗, ◖ 643 = -1 + 161·2^2 ◗, ◖ 5143 = -1 + 643·2^3 ◗] ? 5145 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 1285 = 5 + 5·2^8 ◗, ◖ 5145 = 5 + 1285·2^2 ◗] ? 5147 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 161 = 1 + 5·2^5 ◗, ◖ 5147 = -5 + 161·2^5 ◗] ? 5149 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 161 = 1 + 5·2^5 ◗, ◖ 1287 = -1 + 161·2^3 ◗, ◖ 5149 = 1 + 1287·2^2 ◗] ? 5151 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 161 = 1 + 5·2^5 ◗, ◖ 5151 = -1 + 161·2^5 ◗] ? 5153 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 161 = 1 + 5·2^5 ◗, ◖ 5153 = 1 + 161·2^5 ◗] ? 5155 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 645 = 5 + 5·2^7 ◗, ◖ 5155 = -5 + 645·2^3 ◗] ? 5157 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 161 = 1 + 5·2^5 ◗, ◖ 5157 = 5 + 161·2^5 ◗] ? 5159 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 645 = 5 + 5·2^7 ◗, ◖ 5159 = -1 + 645·2^3 ◗] ? 5161 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 645 = 5 + 5·2^7 ◗, ◖ 5161 = 1 + 645·2^3 ◗] ? 5163 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 645 = 5 + 5·2^7 ◗, ◖ 1291 = 1 + 645·2^1 ◗, ◖ 5163 = -1 + 1291·2^2 ◗] ? 5165 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 645 = 5 + 5·2^7 ◗, ◖ 5165 = 5 + 645·2^3 ◗] ? 5167 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 81 = 17 + 1·2^6 ◗, ◖ 5167 = -17 + 81·2^6 ◗] ? 5169 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 81 = 1 + 5·2^4 ◗, ◖ 323 = -1 + 81·2^2 ◗, ◖ 5169 = 1 + 323·2^4 ◗] ? 5171 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 161 = 1 + 5·2^5 ◗, ◖ 1293 = 5 + 161·2^3 ◗, ◖ 5171 = -1 + 1293·2^2 ◗] ? 5173 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 81 = 1 + 5·2^4 ◗, ◖ 2587 = -5 + 81·2^5 ◗, ◖ 5173 = -1 + 2587·2^1 ◗] ? 5175 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 81 = 9 + 9·2^3 ◗, ◖ 5175 = -9 + 81·2^6 ◗] ? 5177 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 81 = 1 + 5·2^4 ◗, ◖ 647 = -1 + 81·2^3 ◗, ◖ 5177 = 1 + 647·2^3 ◗] ? 5179 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 81 = 1 + 5·2^4 ◗, ◖ 5179 = -5 + 81·2^6 ◗] ? 5181 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 81 = 1 + 5·2^4 ◗, ◖ 1295 = -1 + 81·2^4 ◗, ◖ 5181 = 1 + 1295·2^2 ◗] ? 5183 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 81 = 1 + 5·2^4 ◗, ◖ 5183 = -1 + 81·2^6 ◗] ? 5185 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 81 = 1 + 5·2^4 ◗, ◖ 5185 = 1 + 81·2^6 ◗] ? 5187 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 81 = 1 + 5·2^4 ◗, ◖ 1297 = 1 + 81·2^4 ◗, ◖ 5187 = -1 + 1297·2^2 ◗] ? 5189 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 81 = 1 + 5·2^4 ◗, ◖ 5189 = 5 + 81·2^6 ◗] ? 5191 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 81 = 1 + 5·2^4 ◗, ◖ 649 = 1 + 81·2^3 ◗, ◖ 5191 = -1 + 649·2^3 ◗] ? 5193 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 81 = 9 + 9·2^3 ◗, ◖ 5193 = 9 + 81·2^6 ◗] ? 5195 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 325 = 5 + 5·2^6 ◗, ◖ 5195 = -5 + 325·2^4 ◗] ? 5197 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 325 = 5 + 5·2^6 ◗, ◖ 1299 = -1 + 325·2^2 ◗, ◖ 5197 = 1 + 1299·2^2 ◗] ? 5199 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 325 = 5 + 5·2^6 ◗, ◖ 5199 = -1 + 325·2^4 ◗] ? 5201 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 325 = 5 + 5·2^6 ◗, ◖ 5201 = 1 + 325·2^4 ◗] ? 5203 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 325 = 5 + 5·2^6 ◗, ◖ 1301 = 1 + 325·2^2 ◗, ◖ 5203 = -1 + 1301·2^2 ◗] ? 5205 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 325 = 5 + 5·2^6 ◗, ◖ 5205 = 5 + 325·2^4 ◗] ? 5207 /3/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 635 = 127 + 127·2^2 ◗, ◖ 5207 = 127 + 635·2^3 ◗] ? 5209 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 325 = 5 + 5·2^6 ◗, ◖ 651 = 1 + 325·2^1 ◗, ◖ 5209 = 1 + 651·2^3 ◗] ? 5211 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 325 = 5 + 5·2^6 ◗, ◖ 2605 = 5 + 325·2^3 ◗, ◖ 5211 = 1 + 2605·2^1 ◗] ? 5213 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 41 = 9 + 1·2^5 ◗, ◖ 1303 = -9 + 41·2^5 ◗, ◖ 5213 = 1 + 1303·2^2 ◗] ? 5215 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 41 = 33 + 1·2^3 ◗, ◖ 5215 = -33 + 41·2^7 ◗] ? 5217 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 163 = -1 + 41·2^2 ◗, ◖ 5217 = 1 + 163·2^5 ◗] ? 5219 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 325 = 5 + 5·2^6 ◗, ◖ 1305 = 5 + 325·2^2 ◗, ◖ 5219 = -1 + 1305·2^2 ◗] ? 5221 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 325 = 5 + 5·2^6 ◗, ◖ 1305 = 5 + 325·2^2 ◗, ◖ 5221 = 1 + 1305·2^2 ◗] ? 5223 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 81 = 1 + 5·2^4 ◗, ◖ 653 = 5 + 81·2^3 ◗, ◖ 5223 = -1 + 653·2^3 ◗] ? 5225 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 81 = 1 + 5·2^4 ◗, ◖ 653 = 5 + 81·2^3 ◗, ◖ 5225 = 1 + 653·2^3 ◗] ? 5227 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 1307 = -5 + 41·2^5 ◗, ◖ 5227 = -1 + 1307·2^2 ◗] ? 5229 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 1307 = -5 + 41·2^5 ◗, ◖ 5229 = 1 + 1307·2^2 ◗] ? 5231 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 327 = -1 + 41·2^3 ◗, ◖ 5231 = -1 + 327·2^4 ◗] ? 5233 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 327 = -1 + 41·2^3 ◗, ◖ 5233 = 1 + 327·2^4 ◗] ? 5235 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 655 = -1 + 41·2^4 ◗, ◖ 5235 = -5 + 655·2^3 ◗] ? 5237 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 2619 = -5 + 41·2^6 ◗, ◖ 5237 = -1 + 2619·2^1 ◗] ? 5239 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 41 = 9 + 1·2^5 ◗, ◖ 5239 = -9 + 41·2^7 ◗] ? 5241 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 655 = -1 + 41·2^4 ◗, ◖ 5241 = 1 + 655·2^3 ◗] ? 5243 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 5243 = -5 + 41·2^7 ◗] ? 5245 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 1311 = -1 + 41·2^5 ◗, ◖ 5245 = 1 + 1311·2^2 ◗] ? 5247 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 5247 = -1 + 41·2^7 ◗] ? 5249 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 5249 = 1 + 41·2^7 ◗] ? 5251 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 1313 = 1 + 41·2^5 ◗, ◖ 5251 = -1 + 1313·2^2 ◗] ? 5253 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 5253 = 5 + 41·2^7 ◗] ? 5255 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 657 = 1 + 41·2^4 ◗, ◖ 5255 = -1 + 657·2^3 ◗] ? 5257 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 41 = 9 + 1·2^5 ◗, ◖ 5257 = 9 + 41·2^7 ◗] ? 5259 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 2629 = 5 + 41·2^6 ◗, ◖ 5259 = 1 + 2629·2^1 ◗] ? 5261 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 1315 = -5 + 165·2^3 ◗, ◖ 5261 = 1 + 1315·2^2 ◗] ? 5263 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 329 = 1 + 41·2^3 ◗, ◖ 5263 = -1 + 329·2^4 ◗] ? 5265 /3/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 325 = 65 + 65·2^2 ◗, ◖ 5265 = 65 + 325·2^4 ◗] ? 5267 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 1317 = 5 + 41·2^5 ◗, ◖ 5267 = -1 + 1317·2^2 ◗] ? 5269 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 1317 = 5 + 41·2^5 ◗, ◖ 5269 = 1 + 1317·2^2 ◗] ? 5271 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 659 = -1 + 165·2^2 ◗, ◖ 5271 = -1 + 659·2^3 ◗] ? 5273 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 659 = -1 + 165·2^2 ◗, ◖ 5273 = 1 + 659·2^3 ◗] ? 5275 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 5275 = -5 + 165·2^5 ◗] ? 5277 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 1319 = -1 + 165·2^3 ◗, ◖ 5277 = 1 + 1319·2^2 ◗] ? 5279 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 5279 = -1 + 165·2^5 ◗] ? 5281 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 5281 = 1 + 165·2^5 ◗] ? 5283 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 1321 = 1 + 165·2^3 ◗, ◖ 5283 = -1 + 1321·2^2 ◗] ? 5285 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 5285 = 5 + 165·2^5 ◗] ? 5287 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 661 = 1 + 165·2^2 ◗, ◖ 5287 = -1 + 661·2^3 ◗] ? 5289 /3/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 645 = 129 + 129·2^2 ◗, ◖ 5289 = 129 + 645·2^3 ◗] ? 5291 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 2645 = 5 + 165·2^4 ◗, ◖ 5291 = 1 + 2645·2^1 ◗] ? 5293 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 315 = 63 + 63·2^2 ◗, ◖ 1323 = 63 + 315·2^2 ◗, ◖ 5293 = 1 + 1323·2^2 ◗] ? 5295 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 331 = 1 + 165·2^1 ◗, ◖ 5295 = -1 + 331·2^4 ◗] ? 5297 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 331 = 1 + 165·2^1 ◗, ◖ 5297 = 1 + 331·2^4 ◗] ? 5299 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 1325 = 5 + 165·2^3 ◗, ◖ 5299 = -1 + 1325·2^2 ◗] ? 5301 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 1325 = 5 + 165·2^3 ◗, ◖ 5301 = 1 + 1325·2^2 ◗] ? 5303 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 85 = 17 + 17·2^2 ◗, ◖ 663 = -17 + 85·2^3 ◗, ◖ 5303 = -1 + 663·2^3 ◗] ? 5305 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 85 = 17 + 17·2^2 ◗, ◖ 663 = -17 + 85·2^3 ◗, ◖ 5305 = 1 + 663·2^3 ◗] ? 5307 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 21 = 17 + 1·2^2 ◗, ◖ 1327 = -17 + 21·2^6 ◗, ◖ 5307 = -1 + 1327·2^2 ◗] ? 5309 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 21 = 17 + 1·2^2 ◗, ◖ 1327 = -17 + 21·2^6 ◗, ◖ 5309 = 1 + 1327·2^2 ◗] ? 5311 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 83 = -1 + 21·2^2 ◗, ◖ 5311 = -1 + 83·2^6 ◗] ? 5313 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 165 = 33 + 33·2^2 ◗, ◖ 5313 = 33 + 165·2^5 ◗] ? 5315 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 41 = 33 + 1·2^3 ◗, ◖ 2657 = 33 + 41·2^6 ◗, ◖ 5315 = 1 + 2657·2^1 ◗] ? 5317 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 665 = -95 + 95·2^3 ◗, ◖ 5317 = -3 + 665·2^3 ◗] ? 5319 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 665 = 5 + 165·2^2 ◗, ◖ 5319 = -1 + 665·2^3 ◗] ? 5321 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 665 = 5 + 165·2^2 ◗, ◖ 5321 = 1 + 665·2^3 ◗] ? 5323 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 665 = -95 + 95·2^3 ◗, ◖ 5323 = 3 + 665·2^3 ◗] ? 5325 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 333 = -3 + 21·2^4 ◗, ◖ 5325 = -3 + 333·2^4 ◗] ? 5327 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 333 = -3 + 21·2^4 ◗, ◖ 5327 = -1 + 333·2^4 ◗] ? 5329 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 333 = -3 + 21·2^4 ◗, ◖ 5329 = 1 + 333·2^4 ◗] ? 5331 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 325 = 65 + 65·2^2 ◗, ◖ 2665 = 65 + 325·2^3 ◗, ◖ 5331 = 1 + 2665·2^1 ◗] ? 5333 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 635 = 127 + 127·2^2 ◗, ◖ 2667 = 127 + 635·2^2 ◗, ◖ 5333 = -1 + 2667·2^1 ◗] ? 5335 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 667 = -5 + 21·2^5 ◗, ◖ 5335 = -1 + 667·2^3 ◗] ? 5337 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 667 = -5 + 21·2^5 ◗, ◖ 5337 = 1 + 667·2^3 ◗] ? 5339 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 167 = -1 + 21·2^3 ◗, ◖ 5339 = -5 + 167·2^5 ◗] ? 5341 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 21 = 17 + 1·2^2 ◗, ◖ 2671 = -17 + 21·2^7 ◗, ◖ 5341 = -1 + 2671·2^1 ◗] ? 5343 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 167 = -1 + 21·2^3 ◗, ◖ 5343 = -1 + 167·2^5 ◗] ? 5345 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 167 = -1 + 21·2^3 ◗, ◖ 5345 = 1 + 167·2^5 ◗] ? 5347 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 21 = 7 + 7·2^1 ◗, ◖ 1337 = -7 + 21·2^6 ◗, ◖ 5347 = -1 + 1337·2^2 ◗] ? 5349 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 21 = 7 + 7·2^1 ◗, ◖ 1337 = -7 + 21·2^6 ◗, ◖ 5349 = 1 + 1337·2^2 ◗] ? 5351 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 669 = -3 + 21·2^5 ◗, ◖ 5351 = -1 + 669·2^3 ◗] ? 5353 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 669 = -3 + 21·2^5 ◗, ◖ 5353 = 1 + 669·2^3 ◗] ? 5355 /3/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 1275 = 255 + 255·2^2 ◗, ◖ 5355 = 255 + 1275·2^2 ◗] ? 5357 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 1339 = -5 + 21·2^6 ◗, ◖ 5357 = 1 + 1339·2^2 ◗] ? 5359 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 21 = 17 + 1·2^2 ◗, ◖ 5359 = -17 + 21·2^8 ◗] ? 5361 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 335 = -1 + 21·2^4 ◗, ◖ 5361 = 1 + 335·2^4 ◗] ? 5363 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 1341 = -3 + 21·2^6 ◗, ◖ 5363 = -1 + 1341·2^2 ◗] ? 5365 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 1341 = -3 + 21·2^6 ◗, ◖ 5365 = 1 + 1341·2^2 ◗] ? 5367 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 671 = -1 + 21·2^5 ◗, ◖ 5367 = -1 + 671·2^3 ◗] ? 5369 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 21 = 7 + 7·2^1 ◗, ◖ 5369 = -7 + 21·2^8 ◗] ? 5371 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 5371 = -5 + 21·2^8 ◗] ? 5373 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 5373 = -3 + 21·2^8 ◗] ? 5375 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 5375 = -1 + 21·2^8 ◗] ? 5377 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 5377 = 1 + 21·2^8 ◗] ? 5379 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 5379 = 3 + 21·2^8 ◗] ? 5381 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 5381 = 5 + 21·2^8 ◗] ? 5383 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 21 = 7 + 7·2^1 ◗, ◖ 5383 = 7 + 21·2^8 ◗] ? 5385 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 673 = 1 + 21·2^5 ◗, ◖ 5385 = 1 + 673·2^3 ◗] ? 5387 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 1347 = 3 + 21·2^6 ◗, ◖ 5387 = -1 + 1347·2^2 ◗] ? 5389 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 1347 = 3 + 21·2^6 ◗, ◖ 5389 = 1 + 1347·2^2 ◗] ? 5391 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 337 = 1 + 21·2^4 ◗, ◖ 5391 = -1 + 337·2^4 ◗] ? 5393 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 21 = 17 + 1·2^2 ◗, ◖ 5393 = 17 + 21·2^8 ◗] ? 5395 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 1349 = 5 + 21·2^6 ◗, ◖ 5395 = -1 + 1349·2^2 ◗] ? 5397 /3/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 1285 = 257 + 257·2^2 ◗, ◖ 5397 = 257 + 1285·2^2 ◗] ? 5399 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 675 = 3 + 21·2^5 ◗, ◖ 5399 = -1 + 675·2^3 ◗] ? 5401 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 675 = 3 + 21·2^5 ◗, ◖ 5401 = 1 + 675·2^3 ◗] ? 5403 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 21 = 7 + 7·2^1 ◗, ◖ 1351 = 7 + 21·2^6 ◗, ◖ 5403 = -1 + 1351·2^2 ◗] ? 5405 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 21 = 7 + 7·2^1 ◗, ◖ 1351 = 7 + 21·2^6 ◗, ◖ 5405 = 1 + 1351·2^2 ◗] ? 5407 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 169 = 1 + 21·2^3 ◗, ◖ 5407 = -1 + 169·2^5 ◗] ? 5409 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 169 = 1 + 21·2^3 ◗, ◖ 5409 = 1 + 169·2^5 ◗] ? 5411 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 21 = 17 + 1·2^2 ◗, ◖ 2705 = 17 + 21·2^7 ◗, ◖ 5411 = 1 + 2705·2^1 ◗] ? 5413 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 165 = 33 + 33·2^2 ◗, ◖ 1353 = 33 + 165·2^3 ◗, ◖ 5413 = 1 + 1353·2^2 ◗] ? 5415 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 677 = 5 + 21·2^5 ◗, ◖ 5415 = -1 + 677·2^3 ◗] ? 5417 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 677 = 5 + 21·2^5 ◗, ◖ 5417 = 1 + 677·2^3 ◗] ? 5419 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 1355 = -5 + 85·2^4 ◗, ◖ 5419 = -1 + 1355·2^2 ◗] ? 5421 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 1355 = -5 + 85·2^4 ◗, ◖ 5421 = 1 + 1355·2^2 ◗] ? 5423 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 85 = 17 + 17·2^2 ◗, ◖ 5423 = -17 + 85·2^6 ◗] ? 5425 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 339 = -1 + 85·2^2 ◗, ◖ 5425 = 1 + 339·2^4 ◗] ? 5427 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 339 = 3 + 21·2^4 ◗, ◖ 5427 = 3 + 339·2^4 ◗] ? 5429 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 2715 = -5 + 85·2^5 ◗, ◖ 5429 = -1 + 2715·2^1 ◗] ? 5431 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 679 = -1 + 85·2^3 ◗, ◖ 5431 = -1 + 679·2^3 ◗] ? 5433 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 679 = -1 + 85·2^3 ◗, ◖ 5433 = 1 + 679·2^3 ◗] ? 5435 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 5435 = -5 + 85·2^6 ◗] ? 5437 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 1359 = -1 + 85·2^4 ◗, ◖ 5437 = 1 + 1359·2^2 ◗] ? 5439 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 5439 = -1 + 85·2^6 ◗] ? 5441 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 5441 = 1 + 85·2^6 ◗] ? 5443 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 1361 = 1 + 85·2^4 ◗, ◖ 5443 = -1 + 1361·2^2 ◗] ? 5445 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 5445 = 5 + 85·2^6 ◗] ? 5447 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 681 = 1 + 85·2^3 ◗, ◖ 5447 = -1 + 681·2^3 ◗] ? 5449 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 681 = 1 + 85·2^3 ◗, ◖ 5449 = 1 + 681·2^3 ◗] ? 5451 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 2725 = 5 + 85·2^5 ◗, ◖ 5451 = 1 + 2725·2^1 ◗] ? 5453 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 341 = -11 + 11·2^5 ◗, ◖ 5453 = -3 + 341·2^4 ◗] ? 5455 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 341 = 1 + 85·2^2 ◗, ◖ 5455 = -1 + 341·2^4 ◗] ? 5457 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 85 = 17 + 17·2^2 ◗, ◖ 5457 = 17 + 85·2^6 ◗] ? 5459 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 1365 = 5 + 85·2^4 ◗, ◖ 5459 = -1 + 1365·2^2 ◗] ? 5461 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 1365 = 5 + 85·2^4 ◗, ◖ 5461 = 1 + 1365·2^2 ◗] ? 5463 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 1365 = 21 + 21·2^6 ◗, ◖ 5463 = 3 + 1365·2^2 ◗] ? 5465 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 1365 = 5 + 85·2^4 ◗, ◖ 5465 = 5 + 1365·2^2 ◗] ? 5467 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 171 = 1 + 85·2^1 ◗, ◖ 5467 = -5 + 171·2^5 ◗] ? 5469 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 171 = 3 + 21·2^3 ◗, ◖ 5469 = -3 + 171·2^5 ◗] ? 5471 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 171 = 1 + 85·2^1 ◗, ◖ 5471 = -1 + 171·2^5 ◗] ? 5473 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 171 = 1 + 85·2^1 ◗, ◖ 5473 = 1 + 171·2^5 ◗] ? 5475 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 85 = 17 + 17·2^2 ◗, ◖ 2737 = 17 + 85·2^5 ◗, ◖ 5475 = 1 + 2737·2^1 ◗] ? 5477 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 171 = 1 + 85·2^1 ◗, ◖ 5477 = 5 + 171·2^5 ◗] ? 5479 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 685 = 5 + 85·2^3 ◗, ◖ 5479 = -1 + 685·2^3 ◗] ? 5481 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 685 = 5 + 85·2^3 ◗, ◖ 5481 = 1 + 685·2^3 ◗] ? 5483 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 545 = 33 + 1·2^9 ◗, ◖ 2725 = 545 + 545·2^2 ◗, ◖ 5483 = 33 + 2725·2^1 ◗] ? 5485 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 343 = -49 + 49·2^3 ◗, ◖ 5485 = -3 + 343·2^4 ◗] ? 5487 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 11 = 9 + 1·2^1 ◗, ◖ 343 = -9 + 11·2^5 ◗, ◖ 5487 = -1 + 343·2^4 ◗] ? 5489 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 11 = 9 + 1·2^1 ◗, ◖ 343 = -9 + 11·2^5 ◗, ◖ 5489 = 1 + 343·2^4 ◗] ? 5491 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 343 = -49 + 49·2^3 ◗, ◖ 5491 = 3 + 343·2^4 ◗] ? 5493 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 383 = 127 + 1·2^8 ◗, ◖ 1405 = -127 + 383·2^2 ◗, ◖ 5493 = -127 + 1405·2^2 ◗] ? 5495 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 11 = 9 + 1·2^1 ◗, ◖ 43 = -1 + 11·2^2 ◗, ◖ 5495 = -9 + 43·2^7 ◗] ? 5497 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 11 = 9 + 1·2^1 ◗, ◖ 343 = -9 + 11·2^5 ◗, ◖ 5497 = 9 + 343·2^4 ◗] ? 5499 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11 = 1 + 5·2^1 ◗, ◖ 43 = -1 + 11·2^2 ◗, ◖ 5499 = -5 + 43·2^7 ◗] ? 5501 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 43 = -1 + 11·2^2 ◗, ◖ 5501 = -3 + 43·2^7 ◗] ? 5503 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 43 = -1 + 11·2^2 ◗, ◖ 5503 = -1 + 43·2^7 ◗] ? 5505 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 43 = -1 + 11·2^2 ◗, ◖ 5505 = 1 + 43·2^7 ◗] ? 5507 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 85 = 17 + 17·2^2 ◗, ◖ 1377 = 17 + 85·2^4 ◗, ◖ 5507 = -1 + 1377·2^2 ◗] ? 5509 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 85 = 17 + 17·2^2 ◗, ◖ 1377 = 17 + 85·2^4 ◗, ◖ 5509 = 1 + 1377·2^2 ◗] ? 5511 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 21 = 17 + 1·2^2 ◗, ◖ 689 = 17 + 21·2^5 ◗, ◖ 5511 = -1 + 689·2^3 ◗] ? 5513 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 21 = 17 + 1·2^2 ◗, ◖ 689 = 17 + 21·2^5 ◗, ◖ 5513 = 1 + 689·2^3 ◗] ? 5515 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 345 = 5 + 85·2^2 ◗, ◖ 5515 = -5 + 345·2^4 ◗] ? 5517 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 345 = -23 + 23·2^4 ◗, ◖ 5517 = -3 + 345·2^4 ◗] ? 5519 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 345 = 5 + 85·2^2 ◗, ◖ 5519 = -1 + 345·2^4 ◗] ? 5521 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 345 = 5 + 85·2^2 ◗, ◖ 5521 = 1 + 345·2^4 ◗] ? 5523 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 345 = -23 + 23·2^4 ◗, ◖ 5523 = 3 + 345·2^4 ◗] ? 5525 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 5525 = 85 + 85·2^6 ◗] ? 5527 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 41 = 9 + 1·2^5 ◗, ◖ 173 = 9 + 41·2^2 ◗, ◖ 5527 = -9 + 173·2^5 ◗] ? 5529 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 21 = 17 + 1·2^2 ◗, ◖ 689 = 17 + 21·2^5 ◗, ◖ 5529 = 17 + 689·2^3 ◗] ? 5531 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 173 = 5 + 21·2^3 ◗, ◖ 5531 = -5 + 173·2^5 ◗] ? 5533 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 173 = -3 + 11·2^4 ◗, ◖ 5533 = -3 + 173·2^5 ◗] ? 5535 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 173 = -3 + 11·2^4 ◗, ◖ 5535 = -1 + 173·2^5 ◗] ? 5537 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 173 = -3 + 11·2^4 ◗, ◖ 5537 = 1 + 173·2^5 ◗] ? 5539 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 173 = -3 + 11·2^4 ◗, ◖ 5539 = 3 + 173·2^5 ◗] ? 5541 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 693 = -11 + 11·2^6 ◗, ◖ 5541 = -3 + 693·2^3 ◗] ? 5543 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 165 = 33 + 33·2^2 ◗, ◖ 693 = 33 + 165·2^2 ◗, ◖ 5543 = -1 + 693·2^3 ◗] ? 5545 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 165 = 33 + 33·2^2 ◗, ◖ 693 = 33 + 165·2^2 ◗, ◖ 5545 = 1 + 693·2^3 ◗] ? 5547 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 693 = -11 + 11·2^6 ◗, ◖ 5547 = 3 + 693·2^3 ◗] ? 5549 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11 = 1 + 5·2^1 ◗, ◖ 693 = -11 + 11·2^6 ◗, ◖ 5549 = 5 + 693·2^3 ◗] ? 5551 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11 = 1 + 5·2^1 ◗, ◖ 347 = -5 + 11·2^5 ◗, ◖ 5551 = -1 + 347·2^4 ◗] ? 5553 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11 = 1 + 5·2^1 ◗, ◖ 347 = -5 + 11·2^5 ◗, ◖ 5553 = 1 + 347·2^4 ◗] ? 5555 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 693 = -11 + 11·2^6 ◗, ◖ 5555 = 11 + 693·2^3 ◗] ? 5557 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11 = 1 + 5·2^1 ◗, ◖ 347 = -5 + 11·2^5 ◗, ◖ 5557 = 5 + 347·2^4 ◗] ? 5559 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 11 = 9 + 1·2^1 ◗, ◖ 695 = -9 + 11·2^6 ◗, ◖ 5559 = -1 + 695·2^3 ◗] ? 5561 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 11 = 9 + 1·2^1 ◗, ◖ 695 = -9 + 11·2^6 ◗, ◖ 5561 = 1 + 695·2^3 ◗] ? 5563 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11 = 1 + 5·2^1 ◗, ◖ 87 = -1 + 11·2^3 ◗, ◖ 5563 = -5 + 87·2^6 ◗] ? 5565 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 87 = -1 + 11·2^3 ◗, ◖ 5565 = -3 + 87·2^6 ◗] ? 5567 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 87 = -1 + 11·2^3 ◗, ◖ 5567 = -1 + 87·2^6 ◗] ? 5569 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 87 = -1 + 11·2^3 ◗, ◖ 5569 = 1 + 87·2^6 ◗] ? 5571 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 87 = -1 + 11·2^3 ◗, ◖ 5571 = 3 + 87·2^6 ◗] ? 5573 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11 = 1 + 5·2^1 ◗, ◖ 87 = -1 + 11·2^3 ◗, ◖ 5573 = 5 + 87·2^6 ◗] ? 5575 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 11 = 7 + 1·2^2 ◗, ◖ 697 = -7 + 11·2^6 ◗, ◖ 5575 = -1 + 697·2^3 ◗] ? 5577 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 11 = 7 + 1·2^2 ◗, ◖ 697 = -7 + 11·2^6 ◗, ◖ 5577 = 1 + 697·2^3 ◗] ? 5579 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 1395 = -45 + 45·2^5 ◗, ◖ 5579 = -1 + 1395·2^2 ◗] ? 5581 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 1395 = -45 + 45·2^5 ◗, ◖ 5581 = 1 + 1395·2^2 ◗] ? 5583 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 349 = -3 + 11·2^5 ◗, ◖ 5583 = -1 + 349·2^4 ◗] ? 5585 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 349 = -3 + 11·2^5 ◗, ◖ 5585 = 1 + 349·2^4 ◗] ? 5587 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 381 = 127 + 127·2^1 ◗, ◖ 1397 = -127 + 381·2^2 ◗, ◖ 5587 = -1 + 1397·2^2 ◗] ? 5589 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 381 = 127 + 127·2^1 ◗, ◖ 1397 = -127 + 381·2^2 ◗, ◖ 5589 = 1 + 1397·2^2 ◗] ? 5591 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11 = 1 + 5·2^1 ◗, ◖ 699 = -5 + 11·2^6 ◗, ◖ 5591 = -1 + 699·2^3 ◗] ? 5593 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11 = 1 + 5·2^1 ◗, ◖ 699 = -5 + 11·2^6 ◗, ◖ 5593 = 1 + 699·2^3 ◗] ? 5595 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 11 = 9 + 1·2^1 ◗, ◖ 1399 = -9 + 11·2^7 ◗, ◖ 5595 = -1 + 1399·2^2 ◗] ? 5597 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 11 = 9 + 1·2^1 ◗, ◖ 1399 = -9 + 11·2^7 ◗, ◖ 5597 = 1 + 1399·2^2 ◗] ? 5599 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 175 = -1 + 11·2^4 ◗, ◖ 5599 = -1 + 175·2^5 ◗] ? 5601 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 175 = -1 + 11·2^4 ◗, ◖ 5601 = 1 + 175·2^5 ◗] ? 5603 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 11 = 7 + 1·2^2 ◗, ◖ 1401 = -7 + 11·2^7 ◗, ◖ 5603 = -1 + 1401·2^2 ◗] ? 5605 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 11 = 7 + 1·2^2 ◗, ◖ 1401 = -7 + 11·2^7 ◗, ◖ 5605 = 1 + 1401·2^2 ◗] ? 5607 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 701 = -3 + 11·2^6 ◗, ◖ 5607 = -1 + 701·2^3 ◗] ? 5609 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 701 = -3 + 11·2^6 ◗, ◖ 5609 = 1 + 701·2^3 ◗] ? 5611 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11 = 1 + 5·2^1 ◗, ◖ 1403 = -5 + 11·2^7 ◗, ◖ 5611 = -1 + 1403·2^2 ◗] ? 5613 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11 = 1 + 5·2^1 ◗, ◖ 1403 = -5 + 11·2^7 ◗, ◖ 5613 = 1 + 1403·2^2 ◗] ? 5615 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 351 = -1 + 11·2^5 ◗, ◖ 5615 = -1 + 351·2^4 ◗] ? 5617 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 351 = -1 + 11·2^5 ◗, ◖ 5617 = 1 + 351·2^4 ◗] ? 5619 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 1405 = -3 + 11·2^7 ◗, ◖ 5619 = -1 + 1405·2^2 ◗] ? 5621 /3/ [◖ 1 ◗, ◖ 511 = -1 + 1·2^9 ◗, ◖ 1533 = 511 + 511·2^1 ◗, ◖ 5621 = -511 + 1533·2^2 ◗] ? 5623 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 11 = 9 + 1·2^1 ◗, ◖ 5623 = -9 + 11·2^9 ◗] ? 5625 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 11 = 7 + 1·2^2 ◗, ◖ 5625 = -7 + 11·2^9 ◗] ? 5627 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11 = 1 + 5·2^1 ◗, ◖ 5627 = -5 + 11·2^9 ◗] ? 5629 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 5629 = -3 + 11·2^9 ◗] ? 5631 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 5631 = -1 + 11·2^9 ◗] ? 5633 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 5633 = 1 + 11·2^9 ◗] ? 5635 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 5635 = 3 + 11·2^9 ◗] ? 5637 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11 = 1 + 5·2^1 ◗, ◖ 5637 = 5 + 11·2^9 ◗] ? 5639 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 11 = 7 + 1·2^2 ◗, ◖ 5639 = 7 + 11·2^9 ◗] ? 5641 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 11 = 9 + 1·2^1 ◗, ◖ 5641 = 9 + 11·2^9 ◗] ? 5643 /3/ [◖ 1 ◗, ◖ 513 = 1 + 1·2^9 ◗, ◖ 1539 = 513 + 513·2^1 ◗, ◖ 5643 = -513 + 1539·2^2 ◗] ? 5645 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 1411 = 3 + 11·2^7 ◗, ◖ 5645 = 1 + 1411·2^2 ◗] ? 5647 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 353 = 1 + 11·2^5 ◗, ◖ 5647 = -1 + 353·2^4 ◗] ? 5649 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 353 = 1 + 11·2^5 ◗, ◖ 5649 = 1 + 353·2^4 ◗] ? 5651 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11 = 1 + 5·2^1 ◗, ◖ 1413 = 5 + 11·2^7 ◗, ◖ 5651 = -1 + 1413·2^2 ◗] ? 5653 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11 = 1 + 5·2^1 ◗, ◖ 1413 = 5 + 11·2^7 ◗, ◖ 5653 = 1 + 1413·2^2 ◗] ? 5655 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 707 = 3 + 11·2^6 ◗, ◖ 5655 = -1 + 707·2^3 ◗] ? 5657 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 707 = 3 + 11·2^6 ◗, ◖ 5657 = 1 + 707·2^3 ◗] ? 5659 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 11 = 7 + 1·2^2 ◗, ◖ 1415 = 7 + 11·2^7 ◗, ◖ 5659 = -1 + 1415·2^2 ◗] ? 5661 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 11 = 7 + 1·2^2 ◗, ◖ 1415 = 7 + 11·2^7 ◗, ◖ 5661 = 1 + 1415·2^2 ◗] ? 5663 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 177 = 1 + 11·2^4 ◗, ◖ 5663 = -1 + 177·2^5 ◗] ? 5665 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 177 = 1 + 11·2^4 ◗, ◖ 5665 = 1 + 177·2^5 ◗] ? 5667 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 11 = 9 + 1·2^1 ◗, ◖ 1417 = 9 + 11·2^7 ◗, ◖ 5667 = -1 + 1417·2^2 ◗] ? 5669 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 11 = 9 + 1·2^1 ◗, ◖ 1417 = 9 + 11·2^7 ◗, ◖ 5669 = 1 + 1417·2^2 ◗] ? 5671 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11 = 1 + 5·2^1 ◗, ◖ 709 = 5 + 11·2^6 ◗, ◖ 5671 = -1 + 709·2^3 ◗] ? 5673 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11 = 1 + 5·2^1 ◗, ◖ 709 = 5 + 11·2^6 ◗, ◖ 5673 = 1 + 709·2^3 ◗] ? 5675 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 387 = 129 + 129·2^1 ◗, ◖ 1419 = -129 + 387·2^2 ◗, ◖ 5675 = -1 + 1419·2^2 ◗] ? 5677 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 387 = 129 + 129·2^1 ◗, ◖ 1419 = -129 + 387·2^2 ◗, ◖ 5677 = 1 + 1419·2^2 ◗] ? 5679 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 355 = 3 + 11·2^5 ◗, ◖ 5679 = -1 + 355·2^4 ◗] ? 5681 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 355 = 3 + 11·2^5 ◗, ◖ 5681 = 1 + 355·2^4 ◗] ? 5683 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 355 = 3 + 11·2^5 ◗, ◖ 5683 = 3 + 355·2^4 ◗] ? 5685 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 45 = 5 + 5·2^3 ◗, ◖ 355 = -5 + 45·2^3 ◗, ◖ 5685 = 5 + 355·2^4 ◗] ? 5687 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 45 = 9 + 9·2^2 ◗, ◖ 711 = -9 + 45·2^4 ◗, ◖ 5687 = -1 + 711·2^3 ◗] ? 5689 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 45 = 9 + 9·2^2 ◗, ◖ 711 = -9 + 45·2^4 ◗, ◖ 5689 = 1 + 711·2^3 ◗] ? 5691 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11 = 1 + 5·2^1 ◗, ◖ 89 = 1 + 11·2^3 ◗, ◖ 5691 = -5 + 89·2^6 ◗] ? 5693 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 89 = 1 + 11·2^3 ◗, ◖ 5693 = -3 + 89·2^6 ◗] ? 5695 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 89 = 1 + 11·2^3 ◗, ◖ 5695 = -1 + 89·2^6 ◗] ? 5697 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 89 = 1 + 11·2^3 ◗, ◖ 5697 = 1 + 89·2^6 ◗] ? 5699 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 45 = 15 + 15·2^1 ◗, ◖ 1425 = -15 + 45·2^5 ◗, ◖ 5699 = -1 + 1425·2^2 ◗] ? 5701 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 45 = 15 + 15·2^1 ◗, ◖ 1425 = -15 + 45·2^5 ◗, ◖ 5701 = 1 + 1425·2^2 ◗] ? 5703 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 11 = 9 + 1·2^1 ◗, ◖ 713 = 9 + 11·2^6 ◗, ◖ 5703 = -1 + 713·2^3 ◗] ? 5705 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 11 = 9 + 1·2^1 ◗, ◖ 713 = 9 + 11·2^6 ◗, ◖ 5705 = 1 + 713·2^3 ◗] ? 5707 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 713 = -23 + 23·2^5 ◗, ◖ 5707 = 3 + 713·2^3 ◗] ? 5709 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 357 = -3 + 45·2^3 ◗, ◖ 5709 = -3 + 357·2^4 ◗] ? 5711 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 357 = -3 + 45·2^3 ◗, ◖ 5711 = -1 + 357·2^4 ◗] ? 5713 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 357 = -3 + 45·2^3 ◗, ◖ 5713 = 1 + 357·2^4 ◗] ? 5715 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 5715 = -45 + 45·2^7 ◗] ? 5717 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 715 = 11 + 11·2^6 ◗, ◖ 5717 = -3 + 715·2^3 ◗] ? 5719 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 45 = 5 + 5·2^3 ◗, ◖ 715 = -5 + 45·2^4 ◗, ◖ 5719 = -1 + 715·2^3 ◗] ? 5721 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 45 = 5 + 5·2^3 ◗, ◖ 715 = -5 + 45·2^4 ◗, ◖ 5721 = 1 + 715·2^3 ◗] ? 5723 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 45 = 9 + 9·2^2 ◗, ◖ 1431 = -9 + 45·2^5 ◗, ◖ 5723 = -1 + 1431·2^2 ◗] ? 5725 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 45 = 9 + 9·2^2 ◗, ◖ 1431 = -9 + 45·2^5 ◗, ◖ 5725 = 1 + 1431·2^2 ◗] ? 5727 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 179 = -1 + 45·2^2 ◗, ◖ 5727 = -1 + 179·2^5 ◗] ? 5729 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 179 = -1 + 45·2^2 ◗, ◖ 5729 = 1 + 179·2^5 ◗] ? 5731 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 45 = 15 + 15·2^1 ◗, ◖ 2865 = -15 + 45·2^6 ◗, ◖ 5731 = 1 + 2865·2^1 ◗] ? 5733 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 717 = -3 + 45·2^4 ◗, ◖ 5733 = -3 + 717·2^3 ◗] ? 5735 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 717 = -3 + 45·2^4 ◗, ◖ 5735 = -1 + 717·2^3 ◗] ? 5737 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 717 = -3 + 45·2^4 ◗, ◖ 5737 = 1 + 717·2^3 ◗] ? 5739 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 45 = 5 + 5·2^3 ◗, ◖ 1435 = -5 + 45·2^5 ◗, ◖ 5739 = -1 + 1435·2^2 ◗] ? 5741 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 45 = 5 + 5·2^3 ◗, ◖ 1435 = -5 + 45·2^5 ◗, ◖ 5741 = 1 + 1435·2^2 ◗] ? 5743 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 359 = -1 + 45·2^3 ◗, ◖ 5743 = -1 + 359·2^4 ◗] ? 5745 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 45 = 15 + 15·2^1 ◗, ◖ 5745 = -15 + 45·2^7 ◗] ? 5747 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 1437 = -3 + 45·2^5 ◗, ◖ 5747 = -1 + 1437·2^2 ◗] ? 5749 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 1437 = -3 + 45·2^5 ◗, ◖ 5749 = 1 + 1437·2^2 ◗] ? 5751 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 45 = 9 + 9·2^2 ◗, ◖ 5751 = -9 + 45·2^7 ◗] ? 5753 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 719 = -1 + 45·2^4 ◗, ◖ 5753 = 1 + 719·2^3 ◗] ? 5755 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 45 = 5 + 5·2^3 ◗, ◖ 5755 = -5 + 45·2^7 ◗] ? 5757 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 5757 = -3 + 45·2^7 ◗] ? 5759 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 5759 = -1 + 45·2^7 ◗] ? 5761 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 5761 = 1 + 45·2^7 ◗] ? 5763 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 5763 = 3 + 45·2^7 ◗] ? 5765 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 45 = 5 + 5·2^3 ◗, ◖ 5765 = 5 + 45·2^7 ◗] ? 5767 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 721 = 1 + 45·2^4 ◗, ◖ 5767 = -1 + 721·2^3 ◗] ? 5769 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 45 = 9 + 9·2^2 ◗, ◖ 5769 = 9 + 45·2^7 ◗] ? 5771 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 1443 = 3 + 45·2^5 ◗, ◖ 5771 = -1 + 1443·2^2 ◗] ? 5773 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 1443 = 3 + 45·2^5 ◗, ◖ 5773 = 1 + 1443·2^2 ◗] ? 5775 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 45 = 15 + 15·2^1 ◗, ◖ 5775 = 15 + 45·2^7 ◗] ? 5777 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 361 = 1 + 45·2^3 ◗, ◖ 5777 = 1 + 361·2^4 ◗] ? 5779 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 45 = 5 + 5·2^3 ◗, ◖ 1445 = 5 + 45·2^5 ◗, ◖ 5779 = -1 + 1445·2^2 ◗] ? 5781 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 45 = 5 + 5·2^3 ◗, ◖ 1445 = 5 + 45·2^5 ◗, ◖ 5781 = 1 + 1445·2^2 ◗] ? 5783 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 723 = 3 + 45·2^4 ◗, ◖ 5783 = -1 + 723·2^3 ◗] ? 5785 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 723 = 3 + 45·2^4 ◗, ◖ 5785 = 1 + 723·2^3 ◗] ? 5787 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 723 = 3 + 45·2^4 ◗, ◖ 5787 = 3 + 723·2^3 ◗] ? 5789 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 45 = 15 + 15·2^1 ◗, ◖ 2895 = 15 + 45·2^6 ◗, ◖ 5789 = -1 + 2895·2^1 ◗] ? 5791 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 181 = 1 + 45·2^2 ◗, ◖ 5791 = -1 + 181·2^5 ◗] ? 5793 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 181 = 1 + 45·2^2 ◗, ◖ 5793 = 1 + 181·2^5 ◗] ? 5795 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 45 = 9 + 9·2^2 ◗, ◖ 1449 = 9 + 45·2^5 ◗, ◖ 5795 = -1 + 1449·2^2 ◗] ? 5797 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 45 = 9 + 9·2^2 ◗, ◖ 1449 = 9 + 45·2^5 ◗, ◖ 5797 = 1 + 1449·2^2 ◗] ? 5799 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 45 = 5 + 5·2^3 ◗, ◖ 725 = 5 + 45·2^4 ◗, ◖ 5799 = -1 + 725·2^3 ◗] ? 5801 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 45 = 5 + 5·2^3 ◗, ◖ 725 = 5 + 45·2^4 ◗, ◖ 5801 = 1 + 725·2^3 ◗] ? 5803 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11 = 1 + 5·2^1 ◗, ◖ 363 = 11 + 11·2^5 ◗, ◖ 5803 = -5 + 363·2^4 ◗] ? 5805 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 5805 = 45 + 45·2^7 ◗] ? 5807 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 363 = 3 + 45·2^3 ◗, ◖ 5807 = -1 + 363·2^4 ◗] ? 5809 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 363 = 3 + 45·2^3 ◗, ◖ 5809 = 1 + 363·2^4 ◗] ? 5811 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 363 = 3 + 45·2^3 ◗, ◖ 5811 = 3 + 363·2^4 ◗] ? 5813 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11 = 1 + 5·2^1 ◗, ◖ 363 = 11 + 11·2^5 ◗, ◖ 5813 = 5 + 363·2^4 ◗] ? 5815 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 45 = 9 + 9·2^2 ◗, ◖ 91 = 1 + 45·2^1 ◗, ◖ 5815 = -9 + 91·2^6 ◗] ? 5817 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 1455 = -97 + 97·2^4 ◗, ◖ 5817 = -3 + 1455·2^2 ◗] ? 5819 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 45 = 15 + 15·2^1 ◗, ◖ 1455 = 15 + 45·2^5 ◗, ◖ 5819 = -1 + 1455·2^2 ◗] ? 5821 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 45 = 15 + 15·2^1 ◗, ◖ 1455 = 15 + 45·2^5 ◗, ◖ 5821 = 1 + 1455·2^2 ◗] ? 5823 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 91 = -1 + 23·2^2 ◗, ◖ 5823 = -1 + 91·2^6 ◗] ? 5825 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 91 = -1 + 23·2^2 ◗, ◖ 5825 = 1 + 91·2^6 ◗] ? 5827 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 23 = 15 + 1·2^3 ◗, ◖ 1457 = -15 + 23·2^6 ◗, ◖ 5827 = -1 + 1457·2^2 ◗] ? 5829 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 23 = 15 + 1·2^3 ◗, ◖ 1457 = -15 + 23·2^6 ◗, ◖ 5829 = 1 + 1457·2^2 ◗] ? 5831 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 45 = 9 + 9·2^2 ◗, ◖ 729 = 9 + 45·2^4 ◗, ◖ 5831 = -1 + 729·2^3 ◗] ? 5833 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 45 = 9 + 9·2^2 ◗, ◖ 729 = 9 + 45·2^4 ◗, ◖ 5833 = 1 + 729·2^3 ◗] ? 5835 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 45 = 5 + 5·2^3 ◗, ◖ 365 = 5 + 45·2^3 ◗, ◖ 5835 = -5 + 365·2^4 ◗] ? 5837 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 365 = -3 + 23·2^4 ◗, ◖ 5837 = -3 + 365·2^4 ◗] ? 5839 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 365 = -3 + 23·2^4 ◗, ◖ 5839 = -1 + 365·2^4 ◗] ? 5841 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 365 = -3 + 23·2^4 ◗, ◖ 5841 = 1 + 365·2^4 ◗] ? 5843 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 381 = 127 + 127·2^1 ◗, ◖ 2921 = -127 + 381·2^3 ◗, ◖ 5843 = 1 + 2921·2^1 ◗] ? 5845 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 2921 = -23 + 23·2^7 ◗, ◖ 5845 = 3 + 2921·2^1 ◗] ? 5847 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 2925 = 45 + 45·2^6 ◗, ◖ 5847 = -3 + 2925·2^1 ◗] ? 5849 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 2925 = 45 + 45·2^6 ◗, ◖ 5849 = -1 + 2925·2^1 ◗] ? 5851 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 2925 = 45 + 45·2^6 ◗, ◖ 5851 = 1 + 2925·2^1 ◗] ? 5853 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 183 = -1 + 23·2^3 ◗, ◖ 5853 = -3 + 183·2^5 ◗] ? 5855 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 183 = -1 + 23·2^3 ◗, ◖ 5855 = -1 + 183·2^5 ◗] ? 5857 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 183 = -1 + 23·2^3 ◗, ◖ 5857 = 1 + 183·2^5 ◗] ? 5859 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 5859 = -93 + 93·2^6 ◗] ? 5861 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 23 = 7 + 1·2^4 ◗, ◖ 1465 = -7 + 23·2^6 ◗, ◖ 5861 = 1 + 1465·2^2 ◗] ? 5863 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 733 = -3 + 23·2^5 ◗, ◖ 5863 = -1 + 733·2^3 ◗] ? 5865 /3/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 765 = 255 + 255·2^1 ◗, ◖ 5865 = -255 + 765·2^3 ◗] ? 5867 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 733 = -3 + 23·2^5 ◗, ◖ 5867 = 3 + 733·2^3 ◗] ? 5869 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 367 = -1 + 23·2^4 ◗, ◖ 5869 = -3 + 367·2^4 ◗] ? 5871 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 367 = -1 + 23·2^4 ◗, ◖ 5871 = -1 + 367·2^4 ◗] ? 5873 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 23 = 15 + 1·2^3 ◗, ◖ 5873 = -15 + 23·2^8 ◗] ? 5875 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 1469 = -3 + 23·2^6 ◗, ◖ 5875 = -1 + 1469·2^2 ◗] ? 5877 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 1469 = -3 + 23·2^6 ◗, ◖ 5877 = 1 + 1469·2^2 ◗] ? 5879 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 735 = -1 + 23·2^5 ◗, ◖ 5879 = -1 + 735·2^3 ◗] ? 5881 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 23 = 7 + 1·2^4 ◗, ◖ 5881 = -7 + 23·2^8 ◗] ? 5883 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 1471 = -1 + 23·2^6 ◗, ◖ 5883 = -1 + 1471·2^2 ◗] ? 5885 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 5885 = -3 + 23·2^8 ◗] ? 5887 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 5887 = -1 + 23·2^8 ◗] ? 5889 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 5889 = 1 + 23·2^8 ◗] ? 5891 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 5891 = 3 + 23·2^8 ◗] ? 5893 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 1473 = 1 + 23·2^6 ◗, ◖ 5893 = 1 + 1473·2^2 ◗] ? 5895 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 23 = 7 + 1·2^4 ◗, ◖ 5895 = 7 + 23·2^8 ◗] ? 5897 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 737 = 1 + 23·2^5 ◗, ◖ 5897 = 1 + 737·2^3 ◗] ? 5899 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 1475 = 3 + 23·2^6 ◗, ◖ 5899 = -1 + 1475·2^2 ◗] ? 5901 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 1475 = 3 + 23·2^6 ◗, ◖ 5901 = 1 + 1475·2^2 ◗] ? 5903 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 23 = 15 + 1·2^3 ◗, ◖ 5903 = 15 + 23·2^8 ◗] ? 5905 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 369 = 1 + 23·2^4 ◗, ◖ 5905 = 1 + 369·2^4 ◗] ? 5907 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 369 = 1 + 23·2^4 ◗, ◖ 5907 = 3 + 369·2^4 ◗] ? 5909 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 739 = 3 + 23·2^5 ◗, ◖ 5909 = -3 + 739·2^3 ◗] ? 5911 /3/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 771 = 257 + 257·2^1 ◗, ◖ 5911 = -257 + 771·2^3 ◗] ? 5913 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 739 = 3 + 23·2^5 ◗, ◖ 5913 = 1 + 739·2^3 ◗] ? 5915 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 23 = 7 + 1·2^4 ◗, ◖ 1479 = 7 + 23·2^6 ◗, ◖ 5915 = -1 + 1479·2^2 ◗] ? 5917 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 23 = 7 + 1·2^4 ◗, ◖ 1479 = 7 + 23·2^6 ◗, ◖ 5917 = 1 + 1479·2^2 ◗] ? 5919 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 185 = 1 + 23·2^3 ◗, ◖ 5919 = -1 + 185·2^5 ◗] ? 5921 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 93 = 31 + 31·2^1 ◗, ◖ 5921 = -31 + 93·2^6 ◗] ? 5923 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 189 = 63 + 63·2^1 ◗, ◖ 2961 = -63 + 189·2^4 ◗, ◖ 5923 = 1 + 2961·2^1 ◗] ? 5925 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 741 = -3 + 93·2^3 ◗, ◖ 5925 = -3 + 741·2^3 ◗] ? 5927 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 741 = -3 + 93·2^3 ◗, ◖ 5927 = -1 + 741·2^3 ◗] ? 5929 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 741 = -3 + 93·2^3 ◗, ◖ 5929 = 1 + 741·2^3 ◗] ? 5931 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 741 = -3 + 93·2^3 ◗, ◖ 5931 = 3 + 741·2^3 ◗] ? 5933 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 387 = 129 + 129·2^1 ◗, ◖ 2967 = -129 + 387·2^3 ◗, ◖ 5933 = -1 + 2967·2^1 ◗] ? 5935 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 371 = -1 + 93·2^2 ◗, ◖ 5935 = -1 + 371·2^4 ◗] ? 5937 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 371 = -1 + 93·2^2 ◗, ◖ 5937 = 1 + 371·2^4 ◗] ? 5939 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 1485 = -3 + 93·2^4 ◗, ◖ 5939 = -1 + 1485·2^2 ◗] ? 5941 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 1485 = -3 + 93·2^4 ◗, ◖ 5941 = 1 + 1485·2^2 ◗] ? 5943 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 743 = -1 + 93·2^3 ◗, ◖ 5943 = -1 + 743·2^3 ◗] ? 5945 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 743 = -1 + 93·2^3 ◗, ◖ 5945 = 1 + 743·2^3 ◗] ? 5947 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 1487 = -1 + 93·2^4 ◗, ◖ 5947 = -1 + 1487·2^2 ◗] ? 5949 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 5949 = -3 + 93·2^6 ◗] ? 5951 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 5951 = -1 + 93·2^6 ◗] ? 5953 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 5953 = 1 + 93·2^6 ◗] ? 5955 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 5955 = 3 + 93·2^6 ◗] ? 5957 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 1489 = 1 + 93·2^4 ◗, ◖ 5957 = 1 + 1489·2^2 ◗] ? 5959 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 745 = 1 + 93·2^3 ◗, ◖ 5959 = -1 + 745·2^3 ◗] ? 5961 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 745 = 1 + 93·2^3 ◗, ◖ 5961 = 1 + 745·2^3 ◗] ? 5963 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 1491 = 3 + 93·2^4 ◗, ◖ 5963 = -1 + 1491·2^2 ◗] ? 5965 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 1491 = 3 + 93·2^4 ◗, ◖ 5965 = 1 + 1491·2^2 ◗] ? 5967 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 373 = 1 + 93·2^2 ◗, ◖ 5967 = -1 + 373·2^4 ◗] ? 5969 /3/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 381 = 127 + 127·2^1 ◗, ◖ 5969 = -127 + 381·2^4 ◗] ? 5971 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 373 = 1 + 93·2^2 ◗, ◖ 5971 = 3 + 373·2^4 ◗] ? 5973 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 747 = 3 + 93·2^3 ◗, ◖ 5973 = -3 + 747·2^3 ◗] ? 5975 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 747 = 3 + 93·2^3 ◗, ◖ 5975 = -1 + 747·2^3 ◗] ? 5977 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 747 = 3 + 93·2^3 ◗, ◖ 5977 = 1 + 747·2^3 ◗] ? 5979 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 195 = 65 + 65·2^1 ◗, ◖ 1495 = -65 + 195·2^3 ◗, ◖ 5979 = -1 + 1495·2^2 ◗] ? 5981 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 195 = 65 + 65·2^1 ◗, ◖ 1495 = -65 + 195·2^3 ◗, ◖ 5981 = 1 + 1495·2^2 ◗] ? 5983 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 93 = 31 + 31·2^1 ◗, ◖ 5983 = 31 + 93·2^6 ◗] ? 5985 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 47 = 31 + 1·2^4 ◗, ◖ 5985 = -31 + 47·2^7 ◗] ? 5987 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 47 = 15 + 1·2^5 ◗, ◖ 2993 = -15 + 47·2^6 ◗, ◖ 5987 = 1 + 2993·2^1 ◗] ? 5989 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 749 = -3 + 47·2^4 ◗, ◖ 5989 = -3 + 749·2^3 ◗] ? 5991 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 749 = -3 + 47·2^4 ◗, ◖ 5991 = -1 + 749·2^3 ◗] ? 5993 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 749 = -3 + 47·2^4 ◗, ◖ 5993 = 1 + 749·2^3 ◗] ? 5995 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 749 = -3 + 47·2^4 ◗, ◖ 5995 = 3 + 749·2^3 ◗] ? 5997 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 375 = -1 + 47·2^3 ◗, ◖ 5997 = -3 + 375·2^4 ◗] ? 5999 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 375 = -1 + 47·2^3 ◗, ◖ 5999 = -1 + 375·2^4 ◗] ? 6001 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 47 = 15 + 1·2^5 ◗, ◖ 6001 = -15 + 47·2^7 ◗] ? 6003 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 1501 = -3 + 47·2^5 ◗, ◖ 6003 = -1 + 1501·2^2 ◗] ? 6005 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 1501 = -3 + 47·2^5 ◗, ◖ 6005 = 1 + 1501·2^2 ◗] ? 6007 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 751 = -1 + 47·2^4 ◗, ◖ 6007 = -1 + 751·2^3 ◗] ? 6009 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 751 = -1 + 47·2^4 ◗, ◖ 6009 = 1 + 751·2^3 ◗] ? 6011 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 1503 = -1 + 47·2^5 ◗, ◖ 6011 = -1 + 1503·2^2 ◗] ? 6013 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 6013 = -3 + 47·2^7 ◗] ? 6015 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 6015 = -1 + 47·2^7 ◗] ? 6017 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 6017 = 1 + 47·2^7 ◗] ? 6019 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 6019 = 3 + 47·2^7 ◗] ? 6021 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 1505 = 1 + 47·2^5 ◗, ◖ 6021 = 1 + 1505·2^2 ◗] ? 6023 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 753 = 1 + 47·2^4 ◗, ◖ 6023 = -1 + 753·2^3 ◗] ? 6025 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 753 = 1 + 47·2^4 ◗, ◖ 6025 = 1 + 753·2^3 ◗] ? 6027 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 1507 = 3 + 47·2^5 ◗, ◖ 6027 = -1 + 1507·2^2 ◗] ? 6029 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 1507 = 3 + 47·2^5 ◗, ◖ 6029 = 1 + 1507·2^2 ◗] ? 6031 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 47 = 15 + 1·2^5 ◗, ◖ 6031 = 15 + 47·2^7 ◗] ? 6033 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 377 = 1 + 47·2^3 ◗, ◖ 6033 = 1 + 377·2^4 ◗] ? 6035 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 189 = -3 + 3·2^6 ◗, ◖ 1509 = -3 + 189·2^3 ◗, ◖ 6035 = -1 + 1509·2^2 ◗] ? 6037 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 189 = -3 + 3·2^6 ◗, ◖ 1509 = -3 + 189·2^3 ◗, ◖ 6037 = 1 + 1509·2^2 ◗] ? 6039 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 189 = -3 + 3·2^6 ◗, ◖ 755 = -1 + 189·2^2 ◗, ◖ 6039 = -1 + 755·2^3 ◗] ? 6041 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 189 = -3 + 3·2^6 ◗, ◖ 755 = -1 + 189·2^2 ◗, ◖ 6041 = 1 + 755·2^3 ◗] ? 6043 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 189 = -3 + 3·2^6 ◗, ◖ 1511 = -1 + 189·2^3 ◗, ◖ 6043 = -1 + 1511·2^2 ◗] ? 6045 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 189 = -3 + 3·2^6 ◗, ◖ 6045 = -3 + 189·2^5 ◗] ? 6047 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 189 = -3 + 3·2^6 ◗, ◖ 6047 = -1 + 189·2^5 ◗] ? 6049 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 189 = -3 + 3·2^6 ◗, ◖ 6049 = 1 + 189·2^5 ◗] ? 6051 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 189 = -3 + 3·2^6 ◗, ◖ 6051 = 3 + 189·2^5 ◗] ? 6053 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 189 = -3 + 3·2^6 ◗, ◖ 1513 = 1 + 189·2^3 ◗, ◖ 6053 = 1 + 1513·2^2 ◗] ? 6055 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 189 = -3 + 3·2^6 ◗, ◖ 757 = 1 + 189·2^2 ◗, ◖ 6055 = -1 + 757·2^3 ◗] ? 6057 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 189 = -3 + 3·2^6 ◗, ◖ 757 = 1 + 189·2^2 ◗, ◖ 6057 = 1 + 757·2^3 ◗] ? 6059 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 189 = -3 + 3·2^6 ◗, ◖ 1515 = 3 + 189·2^3 ◗, ◖ 6059 = -1 + 1515·2^2 ◗] ? 6061 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 189 = -3 + 3·2^6 ◗, ◖ 1515 = 3 + 189·2^3 ◗, ◖ 6061 = 1 + 1515·2^2 ◗] ? 6063 /3/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 387 = 129 + 129·2^1 ◗, ◖ 6063 = -129 + 387·2^4 ◗] ? 6065 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 379 = -1 + 95·2^2 ◗, ◖ 6065 = 1 + 379·2^4 ◗] ? 6067 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 1517 = -3 + 95·2^4 ◗, ◖ 6067 = -1 + 1517·2^2 ◗] ? 6069 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 1517 = -3 + 95·2^4 ◗, ◖ 6069 = 1 + 1517·2^2 ◗] ? 6071 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 759 = -1 + 95·2^3 ◗, ◖ 6071 = -1 + 759·2^3 ◗] ? 6073 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 759 = -1 + 95·2^3 ◗, ◖ 6073 = 1 + 759·2^3 ◗] ? 6075 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 1519 = -1 + 95·2^4 ◗, ◖ 6075 = -1 + 1519·2^2 ◗] ? 6077 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 6077 = -3 + 95·2^6 ◗] ? 6079 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 6079 = -1 + 95·2^6 ◗] ? 6081 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 6081 = 1 + 95·2^6 ◗] ? 6083 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 6083 = 3 + 95·2^6 ◗] ? 6085 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 1521 = 1 + 95·2^4 ◗, ◖ 6085 = 1 + 1521·2^2 ◗] ? 6087 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 761 = 1 + 95·2^3 ◗, ◖ 6087 = -1 + 761·2^3 ◗] ? 6089 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 761 = 1 + 95·2^3 ◗, ◖ 6089 = 1 + 761·2^3 ◗] ? 6091 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 381 = -3 + 3·2^7 ◗, ◖ 1523 = -1 + 381·2^2 ◗, ◖ 6091 = -1 + 1523·2^2 ◗] ? 6093 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 381 = -3 + 3·2^7 ◗, ◖ 6093 = -3 + 381·2^4 ◗] ? 6095 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 381 = -3 + 3·2^7 ◗, ◖ 6095 = -1 + 381·2^4 ◗] ? 6097 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 381 = -3 + 3·2^7 ◗, ◖ 6097 = 1 + 381·2^4 ◗] ? 6099 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 381 = -3 + 3·2^7 ◗, ◖ 6099 = 3 + 381·2^4 ◗] ? 6101 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 381 = -3 + 3·2^7 ◗, ◖ 1525 = 1 + 381·2^2 ◗, ◖ 6101 = 1 + 1525·2^2 ◗] ? 6103 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 191 = -1 + 3·2^6 ◗, ◖ 763 = -1 + 191·2^2 ◗, ◖ 6103 = -1 + 763·2^3 ◗] ? 6105 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 191 = -1 + 3·2^6 ◗, ◖ 763 = -1 + 191·2^2 ◗, ◖ 6105 = 1 + 763·2^3 ◗] ? 6107 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 191 = -1 + 3·2^6 ◗, ◖ 1527 = -1 + 191·2^3 ◗, ◖ 6107 = -1 + 1527·2^2 ◗] ? 6109 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 191 = -1 + 3·2^6 ◗, ◖ 6109 = -3 + 191·2^5 ◗] ? 6111 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 191 = -1 + 3·2^6 ◗, ◖ 6111 = -1 + 191·2^5 ◗] ? 6113 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 191 = -1 + 3·2^6 ◗, ◖ 6113 = 1 + 191·2^5 ◗] ? 6115 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 191 = -1 + 3·2^6 ◗, ◖ 6115 = 3 + 191·2^5 ◗] ? 6117 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 765 = -3 + 3·2^8 ◗, ◖ 6117 = -3 + 765·2^3 ◗] ? 6119 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 765 = -3 + 3·2^8 ◗, ◖ 6119 = -1 + 765·2^3 ◗] ? 6121 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 765 = -3 + 3·2^8 ◗, ◖ 6121 = 1 + 765·2^3 ◗] ? 6123 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 765 = -3 + 3·2^8 ◗, ◖ 6123 = 3 + 765·2^3 ◗] ? 6125 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 383 = -1 + 3·2^7 ◗, ◖ 6125 = -3 + 383·2^4 ◗] ? 6127 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 383 = -1 + 3·2^7 ◗, ◖ 6127 = -1 + 383·2^4 ◗] ? 6129 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 383 = -1 + 3·2^7 ◗, ◖ 6129 = 1 + 383·2^4 ◗] ? 6131 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1533 = -3 + 3·2^9 ◗, ◖ 6131 = -1 + 1533·2^2 ◗] ? 6133 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1533 = -3 + 3·2^9 ◗, ◖ 6133 = 1 + 1533·2^2 ◗] ? 6135 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 767 = -1 + 3·2^8 ◗, ◖ 6135 = -1 + 767·2^3 ◗] ? 6137 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 767 = -1 + 3·2^8 ◗, ◖ 6137 = 1 + 767·2^3 ◗] ? 6139 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1535 = -1 + 3·2^9 ◗, ◖ 6139 = -1 + 1535·2^2 ◗] ? 6141 /2/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6141 = -3 + 3·2^11 ◗] ? 6143 /2/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6143 = -1 + 3·2^11 ◗] ? 6145 /2/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6145 = 1 + 3·2^11 ◗] ? 6147 /2/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6147 = 3 + 3·2^11 ◗] ? 6149 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1537 = 1 + 3·2^9 ◗, ◖ 6149 = 1 + 1537·2^2 ◗] ? 6151 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 769 = 1 + 3·2^8 ◗, ◖ 6151 = -1 + 769·2^3 ◗] ? 6153 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 769 = 1 + 3·2^8 ◗, ◖ 6153 = 1 + 769·2^3 ◗] ? 6155 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1539 = 3 + 3·2^9 ◗, ◖ 6155 = -1 + 1539·2^2 ◗] ? 6157 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1539 = 3 + 3·2^9 ◗, ◖ 6157 = 1 + 1539·2^2 ◗] ? 6159 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 385 = 1 + 3·2^7 ◗, ◖ 6159 = -1 + 385·2^4 ◗] ? 6161 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 385 = 1 + 3·2^7 ◗, ◖ 6161 = 1 + 385·2^4 ◗] ? 6163 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 385 = 1 + 3·2^7 ◗, ◖ 6163 = 3 + 385·2^4 ◗] ? 6165 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 771 = 3 + 3·2^8 ◗, ◖ 6165 = -3 + 771·2^3 ◗] ? 6167 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 771 = 3 + 3·2^8 ◗, ◖ 6167 = -1 + 771·2^3 ◗] ? 6169 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 771 = 3 + 3·2^8 ◗, ◖ 6169 = 1 + 771·2^3 ◗] ? 6171 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 771 = 3 + 3·2^8 ◗, ◖ 6171 = 3 + 771·2^3 ◗] ? 6173 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 193 = 1 + 3·2^6 ◗, ◖ 6173 = -3 + 193·2^5 ◗] ? 6175 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 193 = 1 + 3·2^6 ◗, ◖ 6175 = -1 + 193·2^5 ◗] ? 6177 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 193 = 1 + 3·2^6 ◗, ◖ 6177 = 1 + 193·2^5 ◗] ? 6179 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 193 = 1 + 3·2^6 ◗, ◖ 6179 = 3 + 193·2^5 ◗] ? 6181 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 193 = 1 + 3·2^6 ◗, ◖ 1545 = 1 + 193·2^3 ◗, ◖ 6181 = 1 + 1545·2^2 ◗] ? 6183 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 193 = 1 + 3·2^6 ◗, ◖ 773 = 1 + 193·2^2 ◗, ◖ 6183 = -1 + 773·2^3 ◗] ? 6185 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 193 = 1 + 3·2^6 ◗, ◖ 773 = 1 + 193·2^2 ◗, ◖ 6185 = 1 + 773·2^3 ◗] ? 6187 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 387 = 3 + 3·2^7 ◗, ◖ 1547 = -1 + 387·2^2 ◗, ◖ 6187 = -1 + 1547·2^2 ◗] ? 6189 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 387 = 3 + 3·2^7 ◗, ◖ 6189 = -3 + 387·2^4 ◗] ? 6191 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 387 = 3 + 3·2^7 ◗, ◖ 6191 = -1 + 387·2^4 ◗] ? 6193 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 387 = 3 + 3·2^7 ◗, ◖ 6193 = 1 + 387·2^4 ◗] ? 6195 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 387 = 3 + 3·2^7 ◗, ◖ 6195 = 3 + 387·2^4 ◗] ? 6197 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 387 = 3 + 3·2^7 ◗, ◖ 1549 = 1 + 387·2^2 ◗, ◖ 6197 = 1 + 1549·2^2 ◗] ? 6199 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 775 = -1 + 97·2^3 ◗, ◖ 6199 = -1 + 775·2^3 ◗] ? 6201 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 775 = -1 + 97·2^3 ◗, ◖ 6201 = 1 + 775·2^3 ◗] ? 6203 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 1551 = -1 + 97·2^4 ◗, ◖ 6203 = -1 + 1551·2^2 ◗] ? 6205 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 6205 = -3 + 97·2^6 ◗] ? 6207 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 6207 = -1 + 97·2^6 ◗] ? 6209 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 6209 = 1 + 97·2^6 ◗] ? 6211 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 6211 = 3 + 97·2^6 ◗] ? 6213 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 1553 = 1 + 97·2^4 ◗, ◖ 6213 = 1 + 1553·2^2 ◗] ? 6215 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 777 = 1 + 97·2^3 ◗, ◖ 6215 = -1 + 777·2^3 ◗] ? 6217 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 777 = 1 + 97·2^3 ◗, ◖ 6217 = 1 + 777·2^3 ◗] ? 6219 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 1555 = 3 + 97·2^4 ◗, ◖ 6219 = -1 + 1555·2^2 ◗] ? 6221 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 1555 = 3 + 97·2^4 ◗, ◖ 6221 = 1 + 1555·2^2 ◗] ? 6223 /3/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 381 = 127 + 127·2^1 ◗, ◖ 6223 = 127 + 381·2^4 ◗] ? 6225 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 389 = 1 + 97·2^2 ◗, ◖ 6225 = 1 + 389·2^4 ◗] ? 6227 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 195 = 3 + 3·2^6 ◗, ◖ 1557 = -3 + 195·2^3 ◗, ◖ 6227 = -1 + 1557·2^2 ◗] ? 6229 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 195 = 3 + 3·2^6 ◗, ◖ 1557 = -3 + 195·2^3 ◗, ◖ 6229 = 1 + 1557·2^2 ◗] ? 6231 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 195 = 3 + 3·2^6 ◗, ◖ 779 = -1 + 195·2^2 ◗, ◖ 6231 = -1 + 779·2^3 ◗] ? 6233 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 195 = 3 + 3·2^6 ◗, ◖ 779 = -1 + 195·2^2 ◗, ◖ 6233 = 1 + 779·2^3 ◗] ? 6235 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 195 = 3 + 3·2^6 ◗, ◖ 1559 = -1 + 195·2^3 ◗, ◖ 6235 = -1 + 1559·2^2 ◗] ? 6237 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 195 = 3 + 3·2^6 ◗, ◖ 6237 = -3 + 195·2^5 ◗] ? 6239 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 195 = 3 + 3·2^6 ◗, ◖ 6239 = -1 + 195·2^5 ◗] ? 6241 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 195 = 3 + 3·2^6 ◗, ◖ 6241 = 1 + 195·2^5 ◗] ? 6243 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 195 = 3 + 3·2^6 ◗, ◖ 6243 = 3 + 195·2^5 ◗] ? 6245 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 195 = 3 + 3·2^6 ◗, ◖ 1561 = 1 + 195·2^3 ◗, ◖ 6245 = 1 + 1561·2^2 ◗] ? 6247 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 195 = 3 + 3·2^6 ◗, ◖ 781 = 1 + 195·2^2 ◗, ◖ 6247 = -1 + 781·2^3 ◗] ? 6249 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 195 = 3 + 3·2^6 ◗, ◖ 781 = 1 + 195·2^2 ◗, ◖ 6249 = 1 + 781·2^3 ◗] ? 6251 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 195 = 3 + 3·2^6 ◗, ◖ 1563 = 3 + 195·2^3 ◗, ◖ 6251 = -1 + 1563·2^2 ◗] ? 6253 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 195 = 3 + 3·2^6 ◗, ◖ 1563 = 3 + 195·2^3 ◗, ◖ 6253 = 1 + 1563·2^2 ◗] ? 6255 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 49 = 17 + 1·2^5 ◗, ◖ 6255 = -17 + 49·2^7 ◗] ? 6257 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 391 = -1 + 49·2^3 ◗, ◖ 6257 = 1 + 391·2^4 ◗] ? 6259 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 1565 = -3 + 49·2^5 ◗, ◖ 6259 = -1 + 1565·2^2 ◗] ? 6261 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 1565 = -3 + 49·2^5 ◗, ◖ 6261 = 1 + 1565·2^2 ◗] ? 6263 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 783 = -1 + 49·2^4 ◗, ◖ 6263 = -1 + 783·2^3 ◗] ? 6265 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 783 = -1 + 49·2^4 ◗, ◖ 6265 = 1 + 783·2^3 ◗] ? 6267 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 1567 = -1 + 49·2^5 ◗, ◖ 6267 = -1 + 1567·2^2 ◗] ? 6269 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 6269 = -3 + 49·2^7 ◗] ? 6271 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 6271 = -1 + 49·2^7 ◗] ? 6273 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 6273 = 1 + 49·2^7 ◗] ? 6275 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 6275 = 3 + 49·2^7 ◗] ? 6277 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 1569 = 1 + 49·2^5 ◗, ◖ 6277 = 1 + 1569·2^2 ◗] ? 6279 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 785 = 1 + 49·2^4 ◗, ◖ 6279 = -1 + 785·2^3 ◗] ? 6281 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 785 = 1 + 49·2^4 ◗, ◖ 6281 = 1 + 785·2^3 ◗] ? 6283 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 1571 = 3 + 49·2^5 ◗, ◖ 6283 = -1 + 1571·2^2 ◗] ? 6285 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 1571 = 3 + 49·2^5 ◗, ◖ 6285 = 1 + 1571·2^2 ◗] ? 6287 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 393 = 1 + 49·2^3 ◗, ◖ 6287 = -1 + 393·2^4 ◗] ? 6289 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 49 = 17 + 1·2^5 ◗, ◖ 6289 = 17 + 49·2^7 ◗] ? 6291 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 393 = 1 + 49·2^3 ◗, ◖ 6291 = 3 + 393·2^4 ◗] ? 6293 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 787 = 3 + 49·2^4 ◗, ◖ 6293 = -3 + 787·2^3 ◗] ? 6295 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 787 = 3 + 49·2^4 ◗, ◖ 6295 = -1 + 787·2^3 ◗] ? 6297 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 787 = 3 + 49·2^4 ◗, ◖ 6297 = 1 + 787·2^3 ◗] ? 6299 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 189 = 63 + 63·2^1 ◗, ◖ 1575 = 63 + 189·2^3 ◗, ◖ 6299 = -1 + 1575·2^2 ◗] ? 6301 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 189 = 63 + 63·2^1 ◗, ◖ 1575 = 63 + 189·2^3 ◗, ◖ 6301 = 1 + 1575·2^2 ◗] ? 6303 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 99 = 33 + 33·2^1 ◗, ◖ 6303 = -33 + 99·2^6 ◗] ? 6305 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 49 = 33 + 1·2^4 ◗, ◖ 6305 = 33 + 49·2^7 ◗] ? 6307 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 49 = 17 + 1·2^5 ◗, ◖ 3153 = 17 + 49·2^6 ◗, ◖ 6307 = 1 + 3153·2^1 ◗] ? 6309 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 789 = -3 + 99·2^3 ◗, ◖ 6309 = -3 + 789·2^3 ◗] ? 6311 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 789 = -3 + 99·2^3 ◗, ◖ 6311 = -1 + 789·2^3 ◗] ? 6313 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 789 = -3 + 99·2^3 ◗, ◖ 6313 = 1 + 789·2^3 ◗] ? 6315 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 789 = -3 + 99·2^3 ◗, ◖ 6315 = 3 + 789·2^3 ◗] ? 6317 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 395 = -1 + 99·2^2 ◗, ◖ 6317 = -3 + 395·2^4 ◗] ? 6319 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 395 = -1 + 99·2^2 ◗, ◖ 6319 = -1 + 395·2^4 ◗] ? 6321 /3/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 387 = 129 + 129·2^1 ◗, ◖ 6321 = 129 + 387·2^4 ◗] ? 6323 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 1581 = -3 + 99·2^4 ◗, ◖ 6323 = -1 + 1581·2^2 ◗] ? 6325 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 1581 = -3 + 99·2^4 ◗, ◖ 6325 = 1 + 1581·2^2 ◗] ? 6327 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 791 = -1 + 99·2^3 ◗, ◖ 6327 = -1 + 791·2^3 ◗] ? 6329 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 791 = -1 + 99·2^3 ◗, ◖ 6329 = 1 + 791·2^3 ◗] ? 6331 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 1583 = -1 + 99·2^4 ◗, ◖ 6331 = -1 + 1583·2^2 ◗] ? 6333 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 6333 = -3 + 99·2^6 ◗] ? 6335 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 6335 = -1 + 99·2^6 ◗] ? 6337 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 6337 = 1 + 99·2^6 ◗] ? 6339 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 6339 = 3 + 99·2^6 ◗] ? 6341 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 1585 = 1 + 99·2^4 ◗, ◖ 6341 = 1 + 1585·2^2 ◗] ? 6343 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 793 = 1 + 99·2^3 ◗, ◖ 6343 = -1 + 793·2^3 ◗] ? 6345 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 793 = 1 + 99·2^3 ◗, ◖ 6345 = 1 + 793·2^3 ◗] ? 6347 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 1587 = 3 + 99·2^4 ◗, ◖ 6347 = -1 + 1587·2^2 ◗] ? 6349 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 1587 = 3 + 99·2^4 ◗, ◖ 6349 = 1 + 1587·2^2 ◗] ? 6351 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 397 = 1 + 99·2^2 ◗, ◖ 6351 = -1 + 397·2^4 ◗] ? 6353 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 397 = 1 + 99·2^2 ◗, ◖ 6353 = 1 + 397·2^4 ◗] ? 6355 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 397 = 1 + 99·2^2 ◗, ◖ 6355 = 3 + 397·2^4 ◗] ? 6357 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 795 = 3 + 99·2^3 ◗, ◖ 6357 = -3 + 795·2^3 ◗] ? 6359 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 795 = 3 + 99·2^3 ◗, ◖ 6359 = -1 + 795·2^3 ◗] ? 6361 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 795 = 3 + 99·2^3 ◗, ◖ 6361 = 1 + 795·2^3 ◗] ? 6363 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 25 = 9 + 1·2^4 ◗, ◖ 1591 = -9 + 25·2^6 ◗, ◖ 6363 = -1 + 1591·2^2 ◗] ? 6365 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 25 = 9 + 1·2^4 ◗, ◖ 1591 = -9 + 25·2^6 ◗, ◖ 6365 = 1 + 1591·2^2 ◗] ? 6367 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 199 = -1 + 25·2^3 ◗, ◖ 6367 = -1 + 199·2^5 ◗] ? 6369 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 99 = 33 + 33·2^1 ◗, ◖ 6369 = 33 + 99·2^6 ◗] ? 6371 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 195 = 65 + 65·2^1 ◗, ◖ 3185 = 65 + 195·2^4 ◗, ◖ 6371 = 1 + 3185·2^1 ◗] ? 6373 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 797 = -3 + 25·2^5 ◗, ◖ 6373 = -3 + 797·2^3 ◗] ? 6375 /3/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 765 = 255 + 255·2^1 ◗, ◖ 6375 = 255 + 765·2^3 ◗] ? 6377 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 797 = -3 + 25·2^5 ◗, ◖ 6377 = 1 + 797·2^3 ◗] ? 6379 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 25 = 5 + 5·2^2 ◗, ◖ 1595 = -5 + 25·2^6 ◗, ◖ 6379 = -1 + 1595·2^2 ◗] ? 6381 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 25 = 5 + 5·2^2 ◗, ◖ 1595 = -5 + 25·2^6 ◗, ◖ 6381 = 1 + 1595·2^2 ◗] ? 6383 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 25 = 17 + 1·2^3 ◗, ◖ 6383 = -17 + 25·2^8 ◗] ? 6385 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 399 = -1 + 25·2^4 ◗, ◖ 6385 = 1 + 399·2^4 ◗] ? 6387 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 1597 = -3 + 25·2^6 ◗, ◖ 6387 = -1 + 1597·2^2 ◗] ? 6389 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 1597 = -3 + 25·2^6 ◗, ◖ 6389 = 1 + 1597·2^2 ◗] ? 6391 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 25 = 9 + 1·2^4 ◗, ◖ 6391 = -9 + 25·2^8 ◗] ? 6393 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 799 = -1 + 25·2^5 ◗, ◖ 6393 = 1 + 799·2^3 ◗] ? 6395 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 25 = 5 + 5·2^2 ◗, ◖ 6395 = -5 + 25·2^8 ◗] ? 6397 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 6397 = -3 + 25·2^8 ◗] ? 6399 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 6399 = -1 + 25·2^8 ◗] ? 6401 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 6401 = 1 + 25·2^8 ◗] ? 6403 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 6403 = 3 + 25·2^8 ◗] ? 6405 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 25 = 5 + 5·2^2 ◗, ◖ 6405 = 5 + 25·2^8 ◗] ? 6407 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 801 = 1 + 25·2^5 ◗, ◖ 6407 = -1 + 801·2^3 ◗] ? 6409 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 25 = 9 + 1·2^4 ◗, ◖ 6409 = 9 + 25·2^8 ◗] ? 6411 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 1603 = 3 + 25·2^6 ◗, ◖ 6411 = -1 + 1603·2^2 ◗] ? 6413 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 1603 = 3 + 25·2^6 ◗, ◖ 6413 = 1 + 1603·2^2 ◗] ? 6415 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 401 = 1 + 25·2^4 ◗, ◖ 6415 = -1 + 401·2^4 ◗] ? 6417 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 25 = 17 + 1·2^3 ◗, ◖ 6417 = 17 + 25·2^8 ◗] ? 6419 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 25 = 5 + 5·2^2 ◗, ◖ 1605 = 5 + 25·2^6 ◗, ◖ 6419 = -1 + 1605·2^2 ◗] ? 6421 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 25 = 5 + 5·2^2 ◗, ◖ 1605 = 5 + 25·2^6 ◗, ◖ 6421 = 1 + 1605·2^2 ◗] ? 6423 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 803 = 3 + 25·2^5 ◗, ◖ 6423 = -1 + 803·2^3 ◗] ? 6425 /3/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 771 = 257 + 257·2^1 ◗, ◖ 6425 = 257 + 771·2^3 ◗] ? 6427 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 3213 = -51 + 51·2^6 ◗, ◖ 6427 = 1 + 3213·2^1 ◗] ? 6429 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 201 = 1 + 25·2^3 ◗, ◖ 6429 = -3 + 201·2^5 ◗] ? 6431 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 201 = 1 + 25·2^3 ◗, ◖ 6431 = -1 + 201·2^5 ◗] ? 6433 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 201 = 1 + 25·2^3 ◗, ◖ 6433 = 1 + 201·2^5 ◗] ? 6435 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 6435 = 99 + 99·2^6 ◗] ? 6437 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 25 = 9 + 1·2^4 ◗, ◖ 1609 = 9 + 25·2^6 ◗, ◖ 6437 = 1 + 1609·2^2 ◗] ? 6439 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 25 = 5 + 5·2^2 ◗, ◖ 805 = 5 + 25·2^5 ◗, ◖ 6439 = -1 + 805·2^3 ◗] ? 6441 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 25 = 5 + 5·2^2 ◗, ◖ 805 = 5 + 25·2^5 ◗, ◖ 6441 = 1 + 805·2^3 ◗] ? 6443 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 403 = -13 + 13·2^5 ◗, ◖ 6443 = -5 + 403·2^4 ◗] ? 6445 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 403 = 3 + 25·2^4 ◗, ◖ 6445 = -3 + 403·2^4 ◗] ? 6447 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 403 = 3 + 25·2^4 ◗, ◖ 6447 = -1 + 403·2^4 ◗] ? 6449 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 403 = 3 + 25·2^4 ◗, ◖ 6449 = 1 + 403·2^4 ◗] ? 6451 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 387 = 129 + 129·2^1 ◗, ◖ 3225 = 129 + 387·2^3 ◗, ◖ 6451 = 1 + 3225·2^1 ◗] ? 6453 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 3225 = 25 + 25·2^7 ◗, ◖ 6453 = 3 + 3225·2^1 ◗] ? 6455 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 25 = 5 + 5·2^2 ◗, ◖ 3225 = 25 + 25·2^7 ◗, ◖ 6455 = 5 + 3225·2^1 ◗] ? 6457 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 1615 = 95 + 95·2^4 ◗, ◖ 6457 = -3 + 1615·2^2 ◗] ? 6459 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 51 = 17 + 17·2^1 ◗, ◖ 1615 = -17 + 51·2^5 ◗, ◖ 6459 = -1 + 1615·2^2 ◗] ? 6461 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 51 = 17 + 17·2^1 ◗, ◖ 1615 = -17 + 51·2^5 ◗, ◖ 6461 = 1 + 1615·2^2 ◗] ? 6463 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 101 = 1 + 25·2^2 ◗, ◖ 6463 = -1 + 101·2^6 ◗] ? 6465 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 101 = 1 + 25·2^2 ◗, ◖ 6465 = 1 + 101·2^6 ◗] ? 6467 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 25 = 17 + 1·2^3 ◗, ◖ 1617 = 17 + 25·2^6 ◗, ◖ 6467 = -1 + 1617·2^2 ◗] ? 6469 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 25 = 17 + 1·2^3 ◗, ◖ 1617 = 17 + 25·2^6 ◗, ◖ 6469 = 1 + 1617·2^2 ◗] ? 6471 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 25 = 9 + 1·2^4 ◗, ◖ 809 = 9 + 25·2^5 ◗, ◖ 6471 = -1 + 809·2^3 ◗] ? 6473 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 25 = 9 + 1·2^4 ◗, ◖ 809 = 9 + 25·2^5 ◗, ◖ 6473 = 1 + 809·2^3 ◗] ? 6475 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 25 = 5 + 5·2^2 ◗, ◖ 405 = 5 + 25·2^4 ◗, ◖ 6475 = -5 + 405·2^4 ◗] ? 6477 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 6477 = -51 + 51·2^7 ◗] ? 6479 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 405 = -3 + 51·2^3 ◗, ◖ 6479 = -1 + 405·2^4 ◗] ? 6481 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 405 = -3 + 51·2^3 ◗, ◖ 6481 = 1 + 405·2^4 ◗] ? 6483 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 405 = -3 + 51·2^3 ◗, ◖ 6483 = 3 + 405·2^4 ◗] ? 6485 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 25 = 5 + 5·2^2 ◗, ◖ 405 = 5 + 25·2^4 ◗, ◖ 6485 = 5 + 405·2^4 ◗] ? 6487 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 135 = 7 + 1·2^7 ◗, ◖ 405 = 135 + 135·2^1 ◗, ◖ 6487 = 7 + 405·2^4 ◗] ? 6489 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 405 = -27 + 27·2^4 ◗, ◖ 6489 = 9 + 405·2^4 ◗] ? 6491 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 191 = -1 + 3·2^6 ◗, ◖ 3247 = 191 + 191·2^4 ◗, ◖ 6491 = -3 + 3247·2^1 ◗] ? 6493 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 51 = 17 + 17·2^1 ◗, ◖ 3247 = -17 + 51·2^6 ◗, ◖ 6493 = -1 + 3247·2^1 ◗] ? 6495 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 203 = -1 + 51·2^2 ◗, ◖ 6495 = -1 + 203·2^5 ◗] ? 6497 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 203 = -1 + 51·2^2 ◗, ◖ 6497 = 1 + 203·2^5 ◗] ? 6499 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 195 = 65 + 65·2^1 ◗, ◖ 1625 = 65 + 195·2^3 ◗, ◖ 6499 = -1 + 1625·2^2 ◗] ? 6501 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 195 = 65 + 65·2^1 ◗, ◖ 1625 = 65 + 195·2^3 ◗, ◖ 6501 = 1 + 1625·2^2 ◗] ? 6503 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 813 = -3 + 51·2^4 ◗, ◖ 6503 = -1 + 813·2^3 ◗] ? 6505 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 813 = -3 + 51·2^4 ◗, ◖ 6505 = 1 + 813·2^3 ◗] ? 6507 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 813 = -3 + 51·2^4 ◗, ◖ 6507 = 3 + 813·2^3 ◗] ? 6509 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 407 = -1 + 51·2^3 ◗, ◖ 6509 = -3 + 407·2^4 ◗] ? 6511 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 51 = 17 + 17·2^1 ◗, ◖ 6511 = -17 + 51·2^7 ◗] ? 6513 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 407 = -1 + 51·2^3 ◗, ◖ 6513 = 1 + 407·2^4 ◗] ? 6515 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 1629 = -3 + 51·2^5 ◗, ◖ 6515 = -1 + 1629·2^2 ◗] ? 6517 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 1629 = -3 + 51·2^5 ◗, ◖ 6517 = 1 + 1629·2^2 ◗] ? 6519 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 815 = -1 + 51·2^4 ◗, ◖ 6519 = -1 + 815·2^3 ◗] ? 6521 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 815 = -1 + 51·2^4 ◗, ◖ 6521 = 1 + 815·2^3 ◗] ? 6523 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 1631 = -1 + 51·2^5 ◗, ◖ 6523 = -1 + 1631·2^2 ◗] ? 6525 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 6525 = -3 + 51·2^7 ◗] ? 6527 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 6527 = -1 + 51·2^7 ◗] ? 6529 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 6529 = 1 + 51·2^7 ◗] ? 6531 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 6531 = 3 + 51·2^7 ◗] ? 6533 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 1633 = 1 + 51·2^5 ◗, ◖ 6533 = 1 + 1633·2^2 ◗] ? 6535 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 817 = 1 + 51·2^4 ◗, ◖ 6535 = -1 + 817·2^3 ◗] ? 6537 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 817 = 1 + 51·2^4 ◗, ◖ 6537 = 1 + 817·2^3 ◗] ? 6539 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 1635 = 3 + 51·2^5 ◗, ◖ 6539 = -1 + 1635·2^2 ◗] ? 6541 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 1635 = 3 + 51·2^5 ◗, ◖ 6541 = 1 + 1635·2^2 ◗] ? 6543 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 409 = 1 + 51·2^3 ◗, ◖ 6543 = -1 + 409·2^4 ◗] ? 6545 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 51 = 17 + 17·2^1 ◗, ◖ 6545 = 17 + 51·2^7 ◗] ? 6547 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 409 = 1 + 51·2^3 ◗, ◖ 6547 = 3 + 409·2^4 ◗] ? 6549 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 819 = 3 + 51·2^4 ◗, ◖ 6549 = -3 + 819·2^3 ◗] ? 6551 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 819 = 3 + 51·2^4 ◗, ◖ 6551 = -1 + 819·2^3 ◗] ? 6553 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 819 = 3 + 51·2^4 ◗, ◖ 6553 = 1 + 819·2^3 ◗] ? 6555 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 819 = 3 + 51·2^4 ◗, ◖ 6555 = 3 + 819·2^3 ◗] ? 6557 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 205 = 1 + 51·2^2 ◗, ◖ 6557 = -3 + 205·2^5 ◗] ? 6559 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 205 = 1 + 51·2^2 ◗, ◖ 6559 = -1 + 205·2^5 ◗] ? 6561 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 205 = 1 + 51·2^2 ◗, ◖ 6561 = 1 + 205·2^5 ◗] ? 6563 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 51 = 17 + 17·2^1 ◗, ◖ 3281 = 17 + 51·2^6 ◗, ◖ 6563 = 1 + 3281·2^1 ◗] ? 6565 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 193 = 1 + 3·2^6 ◗, ◖ 3281 = 193 + 193·2^4 ◗, ◖ 6565 = 3 + 3281·2^1 ◗] ? 6567 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 137 = 9 + 1·2^7 ◗, ◖ 411 = 137 + 137·2^1 ◗, ◖ 6567 = -9 + 411·2^4 ◗] ? 6569 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 41 = 9 + 1·2^5 ◗, ◖ 205 = 41 + 41·2^2 ◗, ◖ 6569 = 9 + 205·2^5 ◗] ? 6571 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 411 = -5 + 13·2^5 ◗, ◖ 6571 = -5 + 411·2^4 ◗] ? 6573 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 411 = 3 + 51·2^3 ◗, ◖ 6573 = -3 + 411·2^4 ◗] ? 6575 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 411 = 3 + 51·2^3 ◗, ◖ 6575 = -1 + 411·2^4 ◗] ? 6577 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 411 = 3 + 51·2^3 ◗, ◖ 6577 = 1 + 411·2^4 ◗] ? 6579 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 6579 = 51 + 51·2^7 ◗] ? 6581 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 411 = -5 + 13·2^5 ◗, ◖ 6581 = 5 + 411·2^4 ◗] ? 6583 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 13 = 9 + 1·2^2 ◗, ◖ 823 = -9 + 13·2^6 ◗, ◖ 6583 = -1 + 823·2^3 ◗] ? 6585 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 13 = 9 + 1·2^2 ◗, ◖ 823 = -9 + 13·2^6 ◗, ◖ 6585 = 1 + 823·2^3 ◗] ? 6587 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 103 = -1 + 13·2^3 ◗, ◖ 6587 = -5 + 103·2^6 ◗] ? 6589 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 103 = -1 + 13·2^3 ◗, ◖ 6589 = -3 + 103·2^6 ◗] ? 6591 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 103 = -1 + 13·2^3 ◗, ◖ 6591 = -1 + 103·2^6 ◗] ? 6593 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 103 = -1 + 13·2^3 ◗, ◖ 6593 = 1 + 103·2^6 ◗] ? 6595 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 51 = 17 + 17·2^1 ◗, ◖ 1649 = 17 + 51·2^5 ◗, ◖ 6595 = -1 + 1649·2^2 ◗] ? 6597 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 51 = 17 + 17·2^1 ◗, ◖ 1649 = 17 + 51·2^5 ◗, ◖ 6597 = 1 + 1649·2^2 ◗] ? 6599 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 99 = 33 + 33·2^1 ◗, ◖ 825 = 33 + 99·2^3 ◗, ◖ 6599 = -1 + 825·2^3 ◗] ? 6601 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 99 = 33 + 33·2^1 ◗, ◖ 825 = 33 + 99·2^3 ◗, ◖ 6601 = 1 + 825·2^3 ◗] ? 6603 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 381 = 127 + 127·2^1 ◗, ◖ 1651 = 127 + 381·2^2 ◗, ◖ 6603 = -1 + 1651·2^2 ◗] ? 6605 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 381 = 127 + 127·2^1 ◗, ◖ 1651 = 127 + 381·2^2 ◗, ◖ 6605 = 1 + 1651·2^2 ◗] ? 6607 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 413 = -3 + 13·2^5 ◗, ◖ 6607 = -1 + 413·2^4 ◗] ? 6609 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 413 = -3 + 13·2^5 ◗, ◖ 6609 = 1 + 413·2^4 ◗] ? 6611 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 413 = -3 + 13·2^5 ◗, ◖ 6611 = 3 + 413·2^4 ◗] ? 6613 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 13 = 9 + 1·2^2 ◗, ◖ 1651 = -13 + 13·2^7 ◗, ◖ 6613 = 9 + 1651·2^2 ◗] ? 6615 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 827 = -5 + 13·2^6 ◗, ◖ 6615 = -1 + 827·2^3 ◗] ? 6617 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 827 = -5 + 13·2^6 ◗, ◖ 6617 = 1 + 827·2^3 ◗] ? 6619 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 13 = 9 + 1·2^2 ◗, ◖ 1655 = -9 + 13·2^7 ◗, ◖ 6619 = -1 + 1655·2^2 ◗] ? 6621 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 13 = 9 + 1·2^2 ◗, ◖ 1655 = -9 + 13·2^7 ◗, ◖ 6621 = 1 + 1655·2^2 ◗] ? 6623 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 207 = -1 + 13·2^4 ◗, ◖ 6623 = -1 + 207·2^5 ◗] ? 6625 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 207 = -1 + 13·2^4 ◗, ◖ 6625 = 1 + 207·2^5 ◗] ? 6627 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 207 = -1 + 13·2^4 ◗, ◖ 6627 = 3 + 207·2^5 ◗] ? 6629 /4/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 765 = 255 + 255·2^1 ◗, ◖ 3315 = 255 + 765·2^2 ◗, ◖ 6629 = -1 + 3315·2^1 ◗] ? 6631 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 829 = -3 + 13·2^6 ◗, ◖ 6631 = -1 + 829·2^3 ◗] ? 6633 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 829 = -3 + 13·2^6 ◗, ◖ 6633 = 1 + 829·2^3 ◗] ? 6635 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 1659 = -5 + 13·2^7 ◗, ◖ 6635 = -1 + 1659·2^2 ◗] ? 6637 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 1659 = -5 + 13·2^7 ◗, ◖ 6637 = 1 + 1659·2^2 ◗] ? 6639 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 415 = -1 + 13·2^5 ◗, ◖ 6639 = -1 + 415·2^4 ◗] ? 6641 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 415 = -1 + 13·2^5 ◗, ◖ 6641 = 1 + 415·2^4 ◗] ? 6643 /3/ [◖ 1 ◗, ◖ 511 = -1 + 1·2^9 ◗, ◖ 1533 = 511 + 511·2^1 ◗, ◖ 6643 = 511 + 1533·2^2 ◗] ? 6645 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 1661 = -3 + 13·2^7 ◗, ◖ 6645 = 1 + 1661·2^2 ◗] ? 6647 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 13 = 9 + 1·2^2 ◗, ◖ 6647 = -9 + 13·2^9 ◗] ? 6649 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 831 = -1 + 13·2^6 ◗, ◖ 6649 = 1 + 831·2^3 ◗] ? 6651 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 6651 = -5 + 13·2^9 ◗] ? 6653 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 6653 = -3 + 13·2^9 ◗] ? 6655 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 6655 = -1 + 13·2^9 ◗] ? 6657 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 6657 = 1 + 13·2^9 ◗] ? 6659 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 6659 = 3 + 13·2^9 ◗] ? 6661 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 6661 = 5 + 13·2^9 ◗] ? 6663 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 833 = 1 + 13·2^6 ◗, ◖ 6663 = -1 + 833·2^3 ◗] ? 6665 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 13 = 9 + 1·2^2 ◗, ◖ 6665 = 9 + 13·2^9 ◗] ? 6667 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 1667 = 3 + 13·2^7 ◗, ◖ 6667 = -1 + 1667·2^2 ◗] ? 6669 /3/ [◖ 1 ◗, ◖ 513 = 1 + 1·2^9 ◗, ◖ 1539 = 513 + 513·2^1 ◗, ◖ 6669 = 513 + 1539·2^2 ◗] ? 6671 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 417 = 1 + 13·2^5 ◗, ◖ 6671 = -1 + 417·2^4 ◗] ? 6673 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 417 = 1 + 13·2^5 ◗, ◖ 6673 = 1 + 417·2^4 ◗] ? 6675 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 1669 = 5 + 13·2^7 ◗, ◖ 6675 = -1 + 1669·2^2 ◗] ? 6677 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 1669 = 5 + 13·2^7 ◗, ◖ 6677 = 1 + 1669·2^2 ◗] ? 6679 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 835 = 3 + 13·2^6 ◗, ◖ 6679 = -1 + 835·2^3 ◗] ? 6681 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 835 = 3 + 13·2^6 ◗, ◖ 6681 = 1 + 835·2^3 ◗] ? 6683 /4/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 771 = 257 + 257·2^1 ◗, ◖ 3341 = 257 + 771·2^2 ◗, ◖ 6683 = 1 + 3341·2^1 ◗] ? 6685 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 209 = 1 + 13·2^4 ◗, ◖ 6685 = -3 + 209·2^5 ◗] ? 6687 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 209 = 1 + 13·2^4 ◗, ◖ 6687 = -1 + 209·2^5 ◗] ? 6689 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 209 = 1 + 13·2^4 ◗, ◖ 6689 = 1 + 209·2^5 ◗] ? 6691 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 13 = 9 + 1·2^2 ◗, ◖ 1673 = 9 + 13·2^7 ◗, ◖ 6691 = -1 + 1673·2^2 ◗] ? 6693 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 13 = 9 + 1·2^2 ◗, ◖ 1673 = 9 + 13·2^7 ◗, ◖ 6693 = 1 + 1673·2^2 ◗] ? 6695 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 837 = 5 + 13·2^6 ◗, ◖ 6695 = -1 + 837·2^3 ◗] ? 6697 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 837 = 5 + 13·2^6 ◗, ◖ 6697 = 1 + 837·2^3 ◗] ? 6699 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 837 = -27 + 27·2^5 ◗, ◖ 6699 = 3 + 837·2^3 ◗] ? 6701 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 419 = 3 + 13·2^5 ◗, ◖ 6701 = -3 + 419·2^4 ◗] ? 6703 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 419 = 3 + 13·2^5 ◗, ◖ 6703 = -1 + 419·2^4 ◗] ? 6705 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 419 = 3 + 13·2^5 ◗, ◖ 6705 = 1 + 419·2^4 ◗] ? 6707 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 387 = 129 + 129·2^1 ◗, ◖ 1677 = 129 + 387·2^2 ◗, ◖ 6707 = -1 + 1677·2^2 ◗] ? 6709 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 387 = 129 + 129·2^1 ◗, ◖ 1677 = 129 + 387·2^2 ◗, ◖ 6709 = 1 + 1677·2^2 ◗] ? 6711 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 1677 = 13 + 13·2^7 ◗, ◖ 6711 = 3 + 1677·2^2 ◗] ? 6713 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 1677 = 13 + 13·2^7 ◗, ◖ 6713 = 5 + 1677·2^2 ◗] ? 6715 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 51 = 17 + 17·2^1 ◗, ◖ 1683 = 51 + 51·2^5 ◗, ◖ 6715 = -17 + 1683·2^2 ◗] ? 6717 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 13 = 9 + 1·2^2 ◗, ◖ 1677 = 13 + 13·2^7 ◗, ◖ 6717 = 9 + 1677·2^2 ◗] ? 6719 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 13 = 9 + 1·2^2 ◗, ◖ 841 = 9 + 13·2^6 ◗, ◖ 6719 = -9 + 841·2^3 ◗] ? 6721 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 6721 = 65 + 13·2^9 ◗] ? 6723 /4/ [◖ 1 ◗, ◖ 2049 = 1 + 1·2^11 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 2337 = 2049 + 9·2^5 ◗, ◖ 6723 = 2049 + 2337·2^1 ◗] ? 6725 /4/ [◖ 1 ◗, ◖ 513 = 1 + 1·2^9 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 1553 = 513 + 65·2^4 ◗, ◖ 6725 = 513 + 1553·2^2 ◗] ? 6727 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 13 = 9 + 1·2^2 ◗, ◖ 841 = 9 + 13·2^6 ◗, ◖ 6727 = -1 + 841·2^3 ◗] ? 6729 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 13 = 9 + 1·2^2 ◗, ◖ 841 = 9 + 13·2^6 ◗, ◖ 6729 = 1 + 841·2^3 ◗] ? 6731 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 1683 = 51 + 51·2^5 ◗, ◖ 6731 = -1 + 1683·2^2 ◗] ? 6733 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 1683 = 51 + 51·2^5 ◗, ◖ 6733 = 1 + 1683·2^2 ◗] ? 6735 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 421 = 5 + 13·2^5 ◗, ◖ 6735 = -1 + 421·2^4 ◗] ? 6737 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 421 = 5 + 13·2^5 ◗, ◖ 6737 = 1 + 421·2^4 ◗] ? 6739 /4/ [◖ 1 ◗, ◖ 511 = -1 + 1·2^9 ◗, ◖ 519 = 511 + 1·2^3 ◗, ◖ 1557 = 519 + 519·2^1 ◗, ◖ 6739 = 511 + 1557·2^2 ◗] ? 6741 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 421 = 5 + 13·2^5 ◗, ◖ 6741 = 5 + 421·2^4 ◗] ---- ? 6745 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 855 = 95 + 95·2^3 ◗, ◖ 6745 = -95 + 855·2^3 ◗] ? 6747 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 191 = 127 + 1·2^6 ◗, ◖ 1655 = 127 + 191·2^3 ◗, ◖ 6747 = 127 + 1655·2^2 ◗] ? 6749 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 211 = 3 + 13·2^4 ◗, ◖ 6749 = -3 + 211·2^5 ◗] ? 6751 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 211 = 3 + 13·2^4 ◗, ◖ 6751 = -1 + 211·2^5 ◗] ? 6753 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 211 = 3 + 13·2^4 ◗, ◖ 6753 = 1 + 211·2^5 ◗] ? 6755 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 211 = 3 + 13·2^4 ◗, ◖ 6755 = 3 + 211·2^5 ◗] ? 6757 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 845 = 13 + 13·2^6 ◗, ◖ 6757 = -3 + 845·2^3 ◗] ? 6759 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 195 = 65 + 65·2^1 ◗, ◖ 845 = 65 + 195·2^2 ◗, ◖ 6759 = -1 + 845·2^3 ◗] ? 6761 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 195 = 65 + 65·2^1 ◗, ◖ 845 = 65 + 195·2^2 ◗, ◖ 6761 = 1 + 845·2^3 ◗] ? 6763 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 845 = 13 + 13·2^6 ◗, ◖ 6763 = 3 + 845·2^3 ◗] ? 6765 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 423 = 47 + 47·2^3 ◗, ◖ 6765 = -3 + 423·2^4 ◗] ? 6767 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 423 = -9 + 27·2^4 ◗, ◖ 6767 = -1 + 423·2^4 ◗] ? 6769 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 423 = -9 + 27·2^4 ◗, ◖ 6769 = 1 + 423·2^4 ◗] ? 6771 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 423 = 47 + 47·2^3 ◗, ◖ 6771 = 3 + 423·2^4 ◗] ? 6773 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 845 = 13 + 13·2^6 ◗, ◖ 6773 = 13 + 845·2^3 ◗] ? 6775 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 13 = 9 + 1·2^2 ◗, ◖ 53 = 1 + 13·2^2 ◗, ◖ 6775 = -9 + 53·2^7 ◗] ? 6777 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 423 = -9 + 27·2^4 ◗, ◖ 6777 = 9 + 423·2^4 ◗] ? 6779 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 53 = 1 + 13·2^2 ◗, ◖ 6779 = -5 + 53·2^7 ◗] ? 6781 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 53 = 1 + 13·2^2 ◗, ◖ 6781 = -3 + 53·2^7 ◗] ? 6783 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 53 = 1 + 13·2^2 ◗, ◖ 6783 = -1 + 53·2^7 ◗] ? 6785 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 53 = 1 + 13·2^2 ◗, ◖ 6785 = 1 + 53·2^7 ◗] ? 6787 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 53 = 1 + 13·2^2 ◗, ◖ 6787 = 3 + 53·2^7 ◗] ? 6789 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 53 = 1 + 13·2^2 ◗, ◖ 6789 = 5 + 53·2^7 ◗] ? 6791 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 13 = 9 + 1·2^2 ◗, ◖ 425 = 9 + 13·2^5 ◗, ◖ 6791 = -9 + 425·2^4 ◗] ? 6793 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 13 = 9 + 1·2^2 ◗, ◖ 53 = 1 + 13·2^2 ◗, ◖ 6793 = 9 + 53·2^7 ◗] ? 6795 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 25 = 5 + 5·2^2 ◗, ◖ 425 = 25 + 25·2^4 ◗, ◖ 6795 = -5 + 425·2^4 ◗] ? 6797 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 425 = 25 + 25·2^4 ◗, ◖ 6797 = -3 + 425·2^4 ◗] ? 6799 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 13 = 9 + 1·2^2 ◗, ◖ 425 = 9 + 13·2^5 ◗, ◖ 6799 = -1 + 425·2^4 ◗] ? 6801 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 13 = 9 + 1·2^2 ◗, ◖ 425 = 9 + 13·2^5 ◗, ◖ 6801 = 1 + 425·2^4 ◗] ? 6803 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 1701 = -27 + 27·2^6 ◗, ◖ 6803 = -1 + 1701·2^2 ◗] ? 6805 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 1701 = -27 + 27·2^6 ◗, ◖ 6805 = 1 + 1701·2^2 ◗] ? 6807 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 1701 = -27 + 27·2^6 ◗, ◖ 6807 = 3 + 1701·2^2 ◗] ? 6809 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 13 = 9 + 1·2^2 ◗, ◖ 425 = 9 + 13·2^5 ◗, ◖ 6809 = 9 + 425·2^4 ◗] ? 6811 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 213 = 5 + 13·2^4 ◗, ◖ 6811 = -5 + 213·2^5 ◗] ? 6813 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 213 = -3 + 27·2^3 ◗, ◖ 6813 = -3 + 213·2^5 ◗] ? 6815 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 213 = -3 + 27·2^3 ◗, ◖ 6815 = -1 + 213·2^5 ◗] ? 6817 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 213 = -3 + 27·2^3 ◗, ◖ 6817 = 1 + 213·2^5 ◗] ? 6819 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 213 = -3 + 27·2^3 ◗, ◖ 6819 = 3 + 213·2^5 ◗] ? 6821 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 213 = 5 + 13·2^4 ◗, ◖ 6821 = 5 + 213·2^5 ◗] ? 6823 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 71 = 7 + 1·2^6 ◗, ◖ 213 = 71 + 71·2^1 ◗, ◖ 6823 = 7 + 213·2^5 ◗] ? 6825 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 71 = -1 + 9·2^3 ◗, ◖ 213 = 71 + 71·2^1 ◗, ◖ 6825 = 9 + 213·2^5 ◗] ? 6827 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 251 = -5 + 1·2^8 ◗, ◖ 411 = 251 + 5·2^5 ◗, ◖ 6827 = 251 + 411·2^4 ◗] ? 6829 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 53 = 45 + 1·2^3 ◗, ◖ 6829 = 45 + 53·2^7 ◗] ? 6831 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 855 = -9 + 27·2^5 ◗, ◖ 6831 = -9 + 855·2^3 ◗] ? 6833 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 49 = 17 + 1·2^5 ◗, ◖ 213 = 17 + 49·2^2 ◗, ◖ 6833 = 17 + 213·2^5 ◗] ? 6835 /4/ [◖ 1 ◗, ◖ 511 = -1 + 1·2^9 ◗, ◖ 527 = 511 + 1·2^4 ◗, ◖ 1581 = 527 + 527·2^1 ◗, ◖ 6835 = 511 + 1581·2^2 ◗] ? 6837 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 855 = 95 + 95·2^3 ◗, ◖ 6837 = -3 + 855·2^3 ◗] ? 6839 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 855 = -9 + 27·2^5 ◗, ◖ 6839 = -1 + 855·2^3 ◗] ? 6841 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 855 = -9 + 27·2^5 ◗, ◖ 6841 = 1 + 855·2^3 ◗] ? 6843 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 855 = 95 + 95·2^3 ◗, ◖ 6843 = 3 + 855·2^3 ◗] ? 6845 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 107 = -1 + 27·2^2 ◗, ◖ 6845 = -3 + 107·2^6 ◗] ? 6847 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 107 = -1 + 27·2^2 ◗, ◖ 6847 = -1 + 107·2^6 ◗] ? 6849 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 107 = -1 + 27·2^2 ◗, ◖ 6849 = 1 + 107·2^6 ◗] ? 6851 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 107 = -1 + 27·2^2 ◗, ◖ 6851 = 3 + 107·2^6 ◗] ? 6853 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 107 = 75 + 1·2^5 ◗, ◖ 6853 = 5 + 107·2^6 ◗] ? 6855 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 3429 = -27 + 27·2^7 ◗, ◖ 6855 = -3 + 3429·2^1 ◗] ? 6857 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 3429 = -27 + 27·2^7 ◗, ◖ 6857 = -1 + 3429·2^1 ◗] ? 6859 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 3429 = -27 + 27·2^7 ◗, ◖ 6859 = 1 + 3429·2^1 ◗] ? 6861 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 429 = -3 + 27·2^4 ◗, ◖ 6861 = -3 + 429·2^4 ◗] ? 6863 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 429 = -3 + 27·2^4 ◗, ◖ 6863 = -1 + 429·2^4 ◗] ? 6865 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 429 = -3 + 27·2^4 ◗, ◖ 6865 = 1 + 429·2^4 ◗] ? 6867 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 429 = -3 + 27·2^4 ◗, ◖ 6867 = 3 + 429·2^4 ◗] ? 6869 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 429 = 13 + 13·2^5 ◗, ◖ 6869 = 5 + 429·2^4 ◗] ? 6871 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 215 = -1 + 27·2^3 ◗, ◖ 6871 = -9 + 215·2^5 ◗] ? 6873 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 191 = -1 + 3·2^6 ◗, ◖ 1719 = 191 + 191·2^3 ◗, ◖ 6873 = -3 + 1719·2^2 ◗] ? 6875 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 1719 = -9 + 27·2^6 ◗, ◖ 6875 = -1 + 1719·2^2 ◗] ? 6877 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 1719 = -9 + 27·2^6 ◗, ◖ 6877 = 1 + 1719·2^2 ◗] ? 6879 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 215 = -1 + 27·2^3 ◗, ◖ 6879 = -1 + 215·2^5 ◗] ? 6881 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 215 = -1 + 27·2^3 ◗, ◖ 6881 = 1 + 215·2^5 ◗] ? 6883 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 215 = -1 + 27·2^3 ◗, ◖ 6883 = 3 + 215·2^5 ◗] ? 6885 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 6885 = -27 + 27·2^8 ◗] ? 6887 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 861 = -3 + 27·2^5 ◗, ◖ 6887 = -1 + 861·2^3 ◗] ? 6889 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 861 = -3 + 27·2^5 ◗, ◖ 6889 = 1 + 861·2^3 ◗] ? 6891 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 861 = -3 + 27·2^5 ◗, ◖ 6891 = 3 + 861·2^3 ◗] ? 6893 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 3447 = -9 + 27·2^7 ◗, ◖ 6893 = -1 + 3447·2^1 ◗] ? 6895 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 431 = -1 + 27·2^4 ◗, ◖ 6895 = -1 + 431·2^4 ◗] ? 6897 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 431 = -1 + 27·2^4 ◗, ◖ 6897 = 1 + 431·2^4 ◗] ? 6899 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 1725 = -3 + 27·2^6 ◗, ◖ 6899 = -1 + 1725·2^2 ◗] ? 6901 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 1725 = -3 + 27·2^6 ◗, ◖ 6901 = 1 + 1725·2^2 ◗] ? 6903 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 6903 = -9 + 27·2^8 ◗] ? 6905 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 863 = -1 + 27·2^5 ◗, ◖ 6905 = 1 + 863·2^3 ◗] ? 6907 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 1727 = -1 + 27·2^6 ◗, ◖ 6907 = -1 + 1727·2^2 ◗] ? 6909 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 6909 = -3 + 27·2^8 ◗] ? 6911 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 6911 = -1 + 27·2^8 ◗] ? 6913 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 6913 = 1 + 27·2^8 ◗] ? 6915 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 6915 = 3 + 27·2^8 ◗] ? 6917 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 1729 = 1 + 27·2^6 ◗, ◖ 6917 = 1 + 1729·2^2 ◗] ? 6919 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 865 = 1 + 27·2^5 ◗, ◖ 6919 = -1 + 865·2^3 ◗] ? 6921 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 6921 = 9 + 27·2^8 ◗] ? 6923 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 1731 = 3 + 27·2^6 ◗, ◖ 6923 = -1 + 1731·2^2 ◗] ? 6925 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 1731 = 3 + 27·2^6 ◗, ◖ 6925 = 1 + 1731·2^2 ◗] ? 6927 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 433 = 1 + 27·2^4 ◗, ◖ 6927 = -1 + 433·2^4 ◗] ? 6929 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 433 = 1 + 27·2^4 ◗, ◖ 6929 = 1 + 433·2^4 ◗] ? 6931 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 3465 = 9 + 27·2^7 ◗, ◖ 6931 = 1 + 3465·2^1 ◗] ? 6933 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 867 = 3 + 27·2^5 ◗, ◖ 6933 = -3 + 867·2^3 ◗] ? 6935 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 867 = 3 + 27·2^5 ◗, ◖ 6935 = -1 + 867·2^3 ◗] ? 6937 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 867 = 3 + 27·2^5 ◗, ◖ 6937 = 1 + 867·2^3 ◗] ? 6939 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 6939 = 27 + 27·2^8 ◗] ? 6941 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 2303 = -1 + 9·2^8 ◗, ◖ 2319 = 2303 + 1·2^4 ◗, ◖ 6941 = 2303 + 2319·2^1 ◗] ? 6943 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 145 = 17 + 1·2^7 ◗, ◖ 435 = 145 + 145·2^1 ◗, ◖ 6943 = -17 + 435·2^4 ◗] ? 6945 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 193 = 1 + 3·2^6 ◗, ◖ 1737 = 193 + 193·2^3 ◗, ◖ 6945 = -3 + 1737·2^2 ◗] ? 6947 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 1737 = 9 + 27·2^6 ◗, ◖ 6947 = -1 + 1737·2^2 ◗] ? 6949 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 1737 = 9 + 27·2^6 ◗, ◖ 6949 = 1 + 1737·2^2 ◗] ? 6951 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 193 = 1 + 3·2^6 ◗, ◖ 1737 = 193 + 193·2^3 ◗, ◖ 6951 = 3 + 1737·2^2 ◗] ? 6953 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 51 = 17 + 17·2^1 ◗, ◖ 867 = 51 + 51·2^4 ◗, ◖ 6953 = 17 + 867·2^3 ◗] ? 6955 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 195 = 65 + 65·2^1 ◗, ◖ 1755 = 195 + 195·2^3 ◗, ◖ 6955 = -65 + 1755·2^2 ◗] ? 6957 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 435 = 3 + 27·2^4 ◗, ◖ 6957 = -3 + 435·2^4 ◗] ? 6959 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 435 = 3 + 27·2^4 ◗, ◖ 6959 = -1 + 435·2^4 ◗] ? 6961 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 435 = 3 + 27·2^4 ◗, ◖ 6961 = 1 + 435·2^4 ◗] ? 6963 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 435 = 3 + 27·2^4 ◗, ◖ 6963 = 3 + 435·2^4 ◗] ? 6965 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 3483 = 27 + 27·2^7 ◗, ◖ 6965 = -1 + 3483·2^1 ◗] ? 6967 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 3483 = 27 + 27·2^7 ◗, ◖ 6967 = 1 + 3483·2^1 ◗] ? 6969 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 3483 = 27 + 27·2^7 ◗, ◖ 6969 = 3 + 3483·2^1 ◗] ? 6971 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 109 = 5 + 13·2^3 ◗, ◖ 6971 = -5 + 109·2^6 ◗] ? 6973 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 109 = 1 + 27·2^2 ◗, ◖ 6973 = -3 + 109·2^6 ◗] ? 6975 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 109 = 1 + 27·2^2 ◗, ◖ 6975 = -1 + 109·2^6 ◗] ? 6977 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 109 = 1 + 27·2^2 ◗, ◖ 6977 = 1 + 109·2^6 ◗] ? 6979 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 109 = 1 + 27·2^2 ◗, ◖ 6979 = 3 + 109·2^6 ◗] ? 6981 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 873 = 97 + 97·2^3 ◗, ◖ 6981 = -3 + 873·2^3 ◗] ? 6983 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 873 = 9 + 27·2^5 ◗, ◖ 6983 = -1 + 873·2^3 ◗] ? 6985 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 873 = 9 + 27·2^5 ◗, ◖ 6985 = 1 + 873·2^3 ◗] ? 6987 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 873 = 97 + 97·2^3 ◗, ◖ 6987 = 3 + 873·2^3 ◗] ? 6989 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 577 = 65 + 1·2^9 ◗, ◖ 1731 = 577 + 577·2^1 ◗, ◖ 6989 = 65 + 1731·2^2 ◗] ? 6991 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 47 = 15 + 1·2^5 ◗, ◖ 109 = 15 + 47·2^1 ◗, ◖ 6991 = 15 + 109·2^6 ◗] ? 6993 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 873 = 9 + 27·2^5 ◗, ◖ 6993 = 9 + 873·2^3 ◗] ? 6995 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 635 = -5 + 5·2^7 ◗, ◖ 795 = 635 + 5·2^5 ◗, ◖ 6995 = 635 + 795·2^3 ◗] ? 6997 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 261 = 5 + 1·2^8 ◗, ◖ 421 = 261 + 5·2^5 ◗, ◖ 6997 = 261 + 421·2^4 ◗] ? 6999 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 73 = 1 + 9·2^3 ◗, ◖ 219 = 73 + 73·2^1 ◗, ◖ 6999 = -9 + 219·2^5 ◗] ? 7001 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 191 = 127 + 1·2^6 ◗, ◖ 891 = 127 + 191·2^2 ◗, ◖ 7001 = -127 + 891·2^3 ◗] ? 7003 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 59 = -5 + 1·2^6 ◗, ◖ 219 = 59 + 5·2^5 ◗, ◖ 7003 = -5 + 219·2^5 ◗] ? 7005 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 219 = 3 + 27·2^3 ◗, ◖ 7005 = -3 + 219·2^5 ◗] ? 7007 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 219 = 3 + 27·2^3 ◗, ◖ 7007 = -1 + 219·2^5 ◗] ? 7009 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 219 = 3 + 27·2^3 ◗, ◖ 7009 = 1 + 219·2^5 ◗] ? 7011 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 219 = 3 + 27·2^3 ◗, ◖ 7011 = 3 + 219·2^5 ◗] ? 7013 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 59 = -5 + 1·2^6 ◗, ◖ 219 = 59 + 5·2^5 ◗, ◖ 7013 = 5 + 219·2^5 ◗] ? 7015 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 1275 = -5 + 5·2^8 ◗, ◖ 1435 = 1275 + 5·2^5 ◗, ◖ 7015 = 1275 + 1435·2^2 ◗] ? 7017 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 1755 = 27 + 27·2^6 ◗, ◖ 7017 = -3 + 1755·2^2 ◗] ? 7019 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 1755 = 27 + 27·2^6 ◗, ◖ 7019 = -1 + 1755·2^2 ◗] ? 7021 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 1755 = 27 + 27·2^6 ◗, ◖ 7021 = 1 + 1755·2^2 ◗] ? 7023 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 1755 = 27 + 27·2^6 ◗, ◖ 7023 = 3 + 1755·2^2 ◗] ? 7025 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 95 = 63 + 1·2^5 ◗, ◖ 443 = 63 + 95·2^2 ◗, ◖ 7025 = -63 + 443·2^4 ◗] ? 7027 /4/ [◖ 1 ◗, ◖ 511 = -1 + 1·2^9 ◗, ◖ 543 = 511 + 1·2^5 ◗, ◖ 1629 = 543 + 543·2^1 ◗, ◖ 7027 = 511 + 1629·2^2 ◗] ? 7029 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 1755 = 27 + 27·2^6 ◗, ◖ 7029 = 9 + 1755·2^2 ◗] ? 7031 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 767 = -1 + 3·2^8 ◗, ◖ 783 = 767 + 1·2^4 ◗, ◖ 7031 = 767 + 783·2^3 ◗] ? 7033 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 1151 = 127 + 1·2^10 ◗, ◖ 3453 = 1151 + 1151·2^1 ◗, ◖ 7033 = 127 + 3453·2^1 ◗] ? 7035 /4/ [◖ 1 ◗, ◖ 1023 = -1 + 1·2^10 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 1503 = 1023 + 15·2^5 ◗, ◖ 7035 = 1023 + 1503·2^2 ◗] ? 7037 /4/ [◖ 1 ◗, ◖ 1023 = -1 + 1·2^10 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 3007 = 1023 + 31·2^6 ◗, ◖ 7037 = 1023 + 3007·2^1 ◗] ? 7039 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 47 = 31 + 1·2^4 ◗, ◖ 219 = 31 + 47·2^2 ◗, ◖ 7039 = 31 + 219·2^5 ◗] ? 7041 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 95 = 31 + 1·2^6 ◗, ◖ 221 = 31 + 95·2^1 ◗, ◖ 7041 = -31 + 221·2^5 ◗] ? 7043 /4/ [◖ 1 ◗, ◖ 1025 = 1 + 1·2^10 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 3009 = 1025 + 31·2^6 ◗, ◖ 7043 = 1025 + 3009·2^1 ◗] ? 7045 /4/ [◖ 1 ◗, ◖ 1025 = 1 + 1·2^10 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 1505 = 1025 + 15·2^5 ◗, ◖ 7045 = 1025 + 1505·2^2 ◗] ? 7047 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 1153 = 129 + 1·2^10 ◗, ◖ 3459 = 1153 + 1153·2^1 ◗, ◖ 7047 = 129 + 3459·2^1 ◗] ? 7049 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 97 = 65 + 1·2^5 ◗, ◖ 873 = 97 + 97·2^3 ◗, ◖ 7049 = 65 + 873·2^3 ◗] ? 7051 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 641 = 1 + 5·2^7 ◗, ◖ 1923 = 641 + 641·2^1 ◗, ◖ 7051 = -641 + 1923·2^2 ◗] ? 7053 /4/ [◖ 1 ◗, ◖ 513 = 1 + 1·2^9 ◗, ◖ 545 = 513 + 1·2^5 ◗, ◖ 1635 = 545 + 545·2^1 ◗, ◖ 7053 = 513 + 1635·2^2 ◗] ? 7055 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 51 = 17 + 17·2^1 ◗, ◖ 221 = 17 + 51·2^2 ◗, ◖ 7055 = -17 + 221·2^5 ◗] ? 7057 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 191 = 63 + 1·2^7 ◗, ◖ 445 = 63 + 191·2^1 ◗, ◖ 7057 = -63 + 445·2^4 ◗] ? 7059 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 385 = 129 + 1·2^8 ◗, ◖ 3465 = 385 + 385·2^3 ◗, ◖ 7059 = 129 + 3465·2^1 ◗] ? 7061 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 1009 = 1 + 63·2^4 ◗, ◖ 1513 = 1009 + 63·2^3 ◗, ◖ 7061 = 1009 + 1513·2^2 ◗] ? 7063 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 13 = 9 + 1·2^2 ◗, ◖ 221 = 13 + 13·2^4 ◗, ◖ 7063 = -9 + 221·2^5 ◗] ? 7065 /4/ [◖ 1 ◗, ◖ 1023 = -1 + 1·2^10 ◗, ◖ 1007 = 1023 - 1·2^4 ◗, ◖ 3021 = 1007 + 1007·2^1 ◗, ◖ 7065 = 1023 + 3021·2^1 ◗] ? 7067 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 221 = 13 + 13·2^4 ◗, ◖ 7067 = -5 + 221·2^5 ◗] ? 7069 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 221 = 13 + 13·2^4 ◗, ◖ 7069 = -3 + 221·2^5 ◗] ? 7071 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 51 = 17 + 17·2^1 ◗, ◖ 221 = 17 + 51·2^2 ◗, ◖ 7071 = -1 + 221·2^5 ◗] ? 7073 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 51 = 17 + 17·2^1 ◗, ◖ 221 = 17 + 51·2^2 ◗, ◖ 7073 = 1 + 221·2^5 ◗] ? 7075 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 221 = 13 + 13·2^4 ◗, ◖ 7075 = 3 + 221·2^5 ◗] ? 7077 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 221 = 13 + 13·2^4 ◗, ◖ 7077 = 5 + 221·2^5 ◗] ? 7079 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 193 = 129 + 1·2^6 ◗, ◖ 901 = 129 + 193·2^2 ◗, ◖ 7079 = -129 + 901·2^3 ◗] ? 7081 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 13 = 9 + 1·2^2 ◗, ◖ 221 = 13 + 13·2^4 ◗, ◖ 7081 = 9 + 221·2^5 ◗] ? 7083 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 123 = -5 + 1·2^7 ◗, ◖ 443 = 123 + 5·2^6 ◗, ◖ 7083 = -5 + 443·2^4 ◗] ? 7085 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 195 = 65 + 65·2^1 ◗, ◖ 1755 = 195 + 195·2^3 ◗, ◖ 7085 = 65 + 1755·2^2 ◗] ? 7087 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 95 = 63 + 1·2^5 ◗, ◖ 443 = 63 + 95·2^2 ◗, ◖ 7087 = -1 + 443·2^4 ◗] ? 7089 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 95 = 63 + 1·2^5 ◗, ◖ 443 = 63 + 95·2^2 ◗, ◖ 7089 = 1 + 443·2^4 ◗] ? 7091 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 387 = 3 + 3·2^7 ◗, ◖ 419 = 387 + 1·2^5 ◗, ◖ 7091 = 387 + 419·2^4 ◗] ? 7093 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 123 = -5 + 1·2^7 ◗, ◖ 443 = 123 + 5·2^6 ◗, ◖ 7093 = 5 + 443·2^4 ◗] ? 7095 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 99 = 33 + 33·2^1 ◗, ◖ 891 = 99 + 99·2^3 ◗, ◖ 7095 = -33 + 891·2^3 ◗] ? 7097 /4/ [◖ 1 ◗, ◖ 1023 = -1 + 1·2^10 ◗, ◖ 1007 = 1023 - 1·2^4 ◗, ◖ 3037 = 1023 + 1007·2^1 ◗, ◖ 7097 = 1023 + 3037·2^1 ◗] ? 7099 /4/ [◖ 1 ◗, ◖ 1023 = -1 + 1·2^10 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 1519 = 1023 + 31·2^4 ◗, ◖ 7099 = 1023 + 1519·2^2 ◗] ? 7101 /4/ [◖ 1 ◗, ◖ 1023 = -1 + 1·2^10 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 3039 = 1023 + 63·2^5 ◗, ◖ 7101 = 1023 + 3039·2^1 ◗] ? 7103 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 95 = 31 + 1·2^6 ◗, ◖ 221 = 31 + 95·2^1 ◗, ◖ 7103 = 31 + 221·2^5 ◗] ? 7105 /4/ [◖ 1 ◗, ◖ 1025 = 1 + 1·2^10 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 7105 = 1025 + 95·2^6 ◗] ? 7107 /4/ [◖ 1 ◗, ◖ 1025 = 1 + 1·2^10 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 3041 = 1025 + 63·2^5 ◗, ◖ 7107 = 1025 + 3041·2^1 ◗] ? 7109 /4/ [◖ 1 ◗, ◖ 1025 = 1 + 1·2^10 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 1521 = 1025 + 31·2^4 ◗, ◖ 7109 = 1025 + 1521·2^2 ◗] ? 7111 /4/ [◖ 1 ◗, ◖ 1025 = 1 + 1·2^10 ◗, ◖ 1009 = 1025 - 1·2^4 ◗, ◖ 3043 = 1025 + 1009·2^1 ◗, ◖ 7111 = 1025 + 3043·2^1 ◗] ? 7113 /4/ [◖ 1 ◗, ◖ 1023 = -1 + 1·2^10 ◗, ◖ 1015 = 1023 - 1·2^3 ◗, ◖ 3045 = 1015 + 1015·2^1 ◗, ◖ 7113 = 1023 + 3045·2^1 ◗] ? 7115 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 1017 = 1 + 127·2^3 ◗, ◖ 3049 = 1017 + 127·2^4 ◗, ◖ 7115 = 1017 + 3049·2^1 ◗] ? 7117 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 61 = -3 + 1·2^6 ◗, ◖ 445 = 61 + 3·2^7 ◗, ◖ 7117 = -3 + 445·2^4 ◗] ? 7119 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 191 = 63 + 1·2^7 ◗, ◖ 445 = 63 + 191·2^1 ◗, ◖ 7119 = -1 + 445·2^4 ◗] ? 7121 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 191 = 63 + 1·2^7 ◗, ◖ 445 = 63 + 191·2^1 ◗, ◖ 7121 = 1 + 445·2^4 ◗] ? 7123 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 61 = -3 + 1·2^6 ◗, ◖ 445 = 61 + 3·2^7 ◗, ◖ 7123 = 3 + 445·2^4 ◗] ? 7125 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 891 = 27 + 27·2^5 ◗, ◖ 7125 = -3 + 891·2^3 ◗] ? 7127 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 191 = 127 + 1·2^6 ◗, ◖ 891 = 127 + 191·2^2 ◗, ◖ 7127 = -1 + 891·2^3 ◗] ? 7129 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 191 = 127 + 1·2^6 ◗, ◖ 891 = 127 + 191·2^2 ◗, ◖ 7129 = 1 + 891·2^3 ◗] ? 7131 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 891 = 27 + 27·2^5 ◗, ◖ 7131 = 3 + 891·2^3 ◗] ? 7133 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 251 = -5 + 1·2^8 ◗, ◖ 891 = 251 + 5·2^7 ◗, ◖ 7133 = 5 + 891·2^3 ◗] ? 7135 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 79 = 63 + 1·2^4 ◗, ◖ 221 = 63 + 79·2^1 ◗, ◖ 7135 = 63 + 221·2^5 ◗] ? 7137 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 891 = 27 + 27·2^5 ◗, ◖ 7137 = 9 + 891·2^3 ◗] ? 7139 /4/ [◖ 1 ◗, ◖ 1025 = 1 + 1·2^10 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 3057 = 1025 + 127·2^4 ◗, ◖ 7139 = 1025 + 3057·2^1 ◗] ? 7141 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 125 = -3 + 1·2^7 ◗, ◖ 893 = 125 + 3·2^8 ◗, ◖ 7141 = -3 + 893·2^3 ◗] ? 7143 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 383 = 127 + 1·2^8 ◗, ◖ 893 = 127 + 383·2^1 ◗, ◖ 7143 = -1 + 893·2^3 ◗] ? 7145 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 383 = 127 + 1·2^8 ◗, ◖ 893 = 127 + 383·2^1 ◗, ◖ 7145 = 1 + 893·2^3 ◗] ? 7147 /4/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 383 = 255 + 1·2^7 ◗, ◖ 1787 = 255 + 383·2^2 ◗, ◖ 7147 = -1 + 1787·2^2 ◗] ? 7149 /4/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 383 = 255 + 1·2^7 ◗, ◖ 1787 = 255 + 383·2^2 ◗, ◖ 7149 = 1 + 1787·2^2 ◗] ? 7151 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 193 = 65 + 1·2^7 ◗, ◖ 451 = 65 + 193·2^1 ◗, ◖ 7151 = -65 + 451·2^4 ◗] ? 7153 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 253 = -3 + 1·2^8 ◗, ◖ 1789 = 253 + 3·2^9 ◗, ◖ 7153 = -3 + 1789·2^2 ◗] ? 7155 /4/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 767 = 255 + 1·2^9 ◗, ◖ 1789 = 255 + 767·2^1 ◗, ◖ 7155 = -1 + 1789·2^2 ◗] ? 7157 /4/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 767 = 255 + 1·2^9 ◗, ◖ 1789 = 255 + 767·2^1 ◗, ◖ 7157 = 1 + 1789·2^2 ◗] ? 7159 /4/ [◖ 1 ◗, ◖ 511 = -1 + 1·2^9 ◗, ◖ 767 = 511 + 1·2^8 ◗, ◖ 3579 = 511 + 767·2^2 ◗, ◖ 7159 = 1 + 3579·2^1 ◗] ? 7161 /3/ [◖ 1 ◗, ◖ 1023 = -1 + 1·2^10 ◗, ◖ 3069 = 1023 + 1023·2^1 ◗, ◖ 7161 = 1023 + 3069·2^1 ◗] ? 7163 /3/ [◖ 1 ◗, ◖ 1023 = -1 + 1·2^10 ◗, ◖ 1535 = 1023 + 1·2^9 ◗, ◖ 7163 = 1023 + 1535·2^2 ◗] ? 7165 /3/ [◖ 1 ◗, ◖ 1023 = -1 + 1·2^10 ◗, ◖ 3071 = 1023 + 1·2^11 ◗, ◖ 7165 = 1023 + 3071·2^1 ◗] ? 7167 /3/ [◖ 1 ◗, ◖ 1023 = -1 + 1·2^10 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 7167 = 1023 + 3·2^11 ◗] ? 7169 /3/ [◖ 1 ◗, ◖ 1025 = 1 + 1·2^10 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 7169 = 1025 + 3·2^11 ◗] ? 7171 /3/ [◖ 1 ◗, ◖ 1025 = 1 + 1·2^10 ◗, ◖ 3073 = 1025 + 1·2^11 ◗, ◖ 7171 = 1025 + 3073·2^1 ◗] ? 7173 /3/ [◖ 1 ◗, ◖ 1025 = 1 + 1·2^10 ◗, ◖ 1537 = 1025 + 1·2^9 ◗, ◖ 7173 = 1025 + 1537·2^2 ◗] ? 7175 /3/ [◖ 1 ◗, ◖ 1025 = 1 + 1·2^10 ◗, ◖ 3075 = 1025 + 1025·2^1 ◗, ◖ 7175 = 1025 + 3075·2^1 ◗] ? 7177 /4/ [◖ 1 ◗, ◖ 513 = 1 + 1·2^9 ◗, ◖ 769 = 513 + 1·2^8 ◗, ◖ 3589 = 513 + 769·2^2 ◗, ◖ 7177 = -1 + 3589·2^1 ◗] ? 7179 /4/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 769 = 257 + 1·2^9 ◗, ◖ 1795 = 257 + 769·2^1 ◗, ◖ 7179 = -1 + 1795·2^2 ◗] ? 7181 /4/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 769 = 257 + 1·2^9 ◗, ◖ 1795 = 257 + 769·2^1 ◗, ◖ 7181 = 1 + 1795·2^2 ◗] ? 7183 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 259 = 3 + 1·2^8 ◗, ◖ 1795 = 259 + 3·2^9 ◗, ◖ 7183 = 3 + 1795·2^2 ◗] ? 7185 /4/ [◖ 1 ◗, ◖ 1025 = 1 + 1·2^10 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 385 = 1 + 3·2^7 ◗, ◖ 7185 = 1025 + 385·2^4 ◗] ? 7187 /4/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 385 = 257 + 1·2^7 ◗, ◖ 1797 = 257 + 385·2^2 ◗, ◖ 7187 = -1 + 1797·2^2 ◗] ? 7189 /4/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 385 = 257 + 1·2^7 ◗, ◖ 1797 = 257 + 385·2^2 ◗, ◖ 7189 = 1 + 1797·2^2 ◗] ? 7191 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 385 = 129 + 1·2^8 ◗, ◖ 899 = 129 + 385·2^1 ◗, ◖ 7191 = -1 + 899·2^3 ◗] ? 7193 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 385 = 129 + 1·2^8 ◗, ◖ 899 = 129 + 385·2^1 ◗, ◖ 7193 = 1 + 899·2^3 ◗] ? 7195 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 131 = 3 + 1·2^7 ◗, ◖ 899 = 131 + 3·2^8 ◗, ◖ 7195 = 3 + 899·2^3 ◗] ? 7197 /4/ [◖ 1 ◗, ◖ 1023 = -1 + 1·2^10 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 3087 = 1023 + 129·2^4 ◗, ◖ 7197 = 1023 + 3087·2^1 ◗] ? 7199 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 81 = 65 + 1·2^4 ◗, ◖ 227 = 65 + 81·2^1 ◗, ◖ 7199 = -65 + 227·2^5 ◗] ? 7201 /4/ [◖ 1 ◗, ◖ 1025 = 1 + 1·2^10 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 193 = 1 + 3·2^6 ◗, ◖ 7201 = 1025 + 193·2^5 ◗] ? 7203 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 261 = 5 + 1·2^8 ◗, ◖ 901 = 261 + 5·2^7 ◗, ◖ 7203 = -5 + 901·2^3 ◗] ? 7205 /4/ [◖ 1 ◗, ◖ 1025 = 1 + 1·2^10 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 1545 = 1025 + 65·2^3 ◗, ◖ 7205 = 1025 + 1545·2^2 ◗] ? 7207 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 193 = 129 + 1·2^6 ◗, ◖ 901 = 129 + 193·2^2 ◗, ◖ 7207 = -1 + 901·2^3 ◗] ? 7209 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 193 = 129 + 1·2^6 ◗, ◖ 901 = 129 + 193·2^2 ◗, ◖ 7209 = 1 + 901·2^3 ◗] ? 7211 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 123 = -5 + 1·2^7 ◗, ◖ 443 = 123 + 5·2^6 ◗, ◖ 7211 = 123 + 443·2^4 ◗] ? 7213 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 67 = 3 + 1·2^6 ◗, ◖ 451 = 67 + 3·2^7 ◗, ◖ 7213 = -3 + 451·2^4 ◗] ? 7215 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 193 = 65 + 1·2^7 ◗, ◖ 451 = 65 + 193·2^1 ◗, ◖ 7215 = -1 + 451·2^4 ◗] ? 7217 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 193 = 65 + 1·2^7 ◗, ◖ 451 = 65 + 193·2^1 ◗, ◖ 7217 = 1 + 451·2^4 ◗] ? 7219 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 67 = 3 + 1·2^6 ◗, ◖ 451 = 67 + 3·2^7 ◗, ◖ 7219 = 3 + 451·2^4 ◗] ? 7221 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 1031 = -1 + 129·2^3 ◗, ◖ 3095 = 1031 + 129·2^4 ◗, ◖ 7221 = 1031 + 3095·2^1 ◗] ? 7223 /4/ [◖ 1 ◗, ◖ 1025 = 1 + 1·2^10 ◗, ◖ 1033 = 1025 + 1·2^3 ◗, ◖ 3099 = 1033 + 1033·2^1 ◗, ◖ 7223 = 1025 + 3099·2^1 ◗] ? 7225 /4/ [◖ 1 ◗, ◖ 1023 = -1 + 1·2^10 ◗, ◖ 1039 = 1023 + 1·2^4 ◗, ◖ 3101 = 1023 + 1039·2^1 ◗, ◖ 7225 = 1023 + 3101·2^1 ◗] ? 7227 /4/ [◖ 1 ◗, ◖ 1023 = -1 + 1·2^10 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 1551 = 1023 + 33·2^4 ◗, ◖ 7227 = 1023 + 1551·2^2 ◗] ? 7229 /4/ [◖ 1 ◗, ◖ 1023 = -1 + 1·2^10 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 3103 = 1023 + 65·2^5 ◗, ◖ 7229 = 1023 + 3103·2^1 ◗] ? 7231 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 97 = 33 + 1·2^6 ◗, ◖ 227 = 33 + 97·2^1 ◗, ◖ 7231 = -33 + 227·2^5 ◗] ? 7233 /4/ [◖ 1 ◗, ◖ 1025 = 1 + 1·2^10 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 7233 = 1025 + 97·2^6 ◗] ? 7235 /4/ [◖ 1 ◗, ◖ 1025 = 1 + 1·2^10 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 3105 = 1025 + 65·2^5 ◗, ◖ 7235 = 1025 + 3105·2^1 ◗] ? 7237 /4/ [◖ 1 ◗, ◖ 1025 = 1 + 1·2^10 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 1553 = 1025 + 33·2^4 ◗, ◖ 7237 = 1025 + 1553·2^2 ◗] ? 7239 /4/ [◖ 1 ◗, ◖ 1025 = 1 + 1·2^10 ◗, ◖ 1041 = 1025 + 1·2^4 ◗, ◖ 3107 = 1025 + 1041·2^1 ◗, ◖ 7239 = 1025 + 3107·2^1 ◗] ? 7241 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 577 = 1 + 9·2^6 ◗, ◖ 833 = 577 + 1·2^8 ◗, ◖ 7241 = 577 + 833·2^3 ◗] ? 7243 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 133 = 5 + 1·2^7 ◗, ◖ 453 = 133 + 5·2^6 ◗, ◖ 7243 = -5 + 453·2^4 ◗] ? 7245 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 381 = -3 + 3·2^7 ◗, ◖ 429 = 381 + 3·2^4 ◗, ◖ 7245 = 381 + 429·2^4 ◗] ? 7247 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 97 = 65 + 1·2^5 ◗, ◖ 453 = 65 + 97·2^2 ◗, ◖ 7247 = -1 + 453·2^4 ◗] ? 7249 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 97 = 65 + 1·2^5 ◗, ◖ 453 = 65 + 97·2^2 ◗, ◖ 7249 = 1 + 453·2^4 ◗] ? 7251 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 381 = -3 + 3·2^7 ◗, ◖ 477 = 381 + 3·2^5 ◗, ◖ 7251 = -381 + 477·2^4 ◗] ? 7253 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 133 = 5 + 1·2^7 ◗, ◖ 453 = 133 + 5·2^6 ◗, ◖ 7253 = 5 + 453·2^4 ◗] ? 7255 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 191 = 127 + 1·2^6 ◗, ◖ 891 = 127 + 191·2^2 ◗, ◖ 7255 = 127 + 891·2^3 ◗] ? 7257 /4/ [◖ 1 ◗, ◖ 1023 = -1 + 1·2^10 ◗, ◖ 1039 = 1023 + 1·2^4 ◗, ◖ 3117 = 1039 + 1039·2^1 ◗, ◖ 7257 = 1023 + 3117·2^1 ◗] ? 7259 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 69 = 5 + 1·2^6 ◗, ◖ 229 = 69 + 5·2^5 ◗, ◖ 7259 = -69 + 229·2^5 ◗] ? 7261 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 35 = 3 + 1·2^5 ◗, ◖ 227 = 35 + 3·2^6 ◗, ◖ 7261 = -3 + 227·2^5 ◗] ? 7263 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 97 = 33 + 1·2^6 ◗, ◖ 227 = 33 + 97·2^1 ◗, ◖ 7263 = -1 + 227·2^5 ◗] ? 7265 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 97 = 33 + 1·2^6 ◗, ◖ 227 = 33 + 97·2^1 ◗, ◖ 7265 = 1 + 227·2^5 ◗] ? 7267 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 35 = 3 + 1·2^5 ◗, ◖ 227 = 35 + 3·2^6 ◗, ◖ 7267 = 3 + 227·2^5 ◗] ? 7269 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 125 = -3 + 1·2^7 ◗, ◖ 893 = 125 + 3·2^8 ◗, ◖ 7269 = 125 + 893·2^3 ◗] ? 7271 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 383 = 127 + 1·2^8 ◗, ◖ 893 = 127 + 383·2^1 ◗, ◖ 7271 = 127 + 893·2^3 ◗] ? 7273 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 1039 = -1 + 65·2^4 ◗, ◖ 3117 = 1039 + 1039·2^1 ◗, ◖ 7273 = 1039 + 3117·2^1 ◗] ? 7275 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 1039 = -1 + 65·2^4 ◗, ◖ 1559 = 1039 + 65·2^3 ◗, ◖ 7275 = 1039 + 1559·2^2 ◗] ? 7277 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 383 = -1 + 3·2^7 ◗, ◖ 1915 = 383 + 383·2^2 ◗, ◖ 7277 = -383 + 1915·2^2 ◗] ? 7279 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 383 = -1 + 3·2^7 ◗, ◖ 431 = 383 + 3·2^4 ◗, ◖ 7279 = 383 + 431·2^4 ◗] ? 7281 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 193 = 65 + 1·2^7 ◗, ◖ 451 = 65 + 193·2^1 ◗, ◖ 7281 = 65 + 451·2^4 ◗] ? 7283 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 1041 = 1 + 65·2^4 ◗, ◖ 3121 = 1041 + 65·2^5 ◗, ◖ 7283 = 1041 + 3121·2^1 ◗] ? 7285 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 1041 = 1 + 65·2^4 ◗, ◖ 1561 = 1041 + 65·2^3 ◗, ◖ 7285 = 1041 + 1561·2^2 ◗] ? 7287 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 767 = -1 + 3·2^8 ◗, ◖ 815 = 767 + 3·2^4 ◗, ◖ 7287 = 767 + 815·2^3 ◗] ? 7289 /4/ [◖ 1 ◗, ◖ 1023 = -1 + 1·2^10 ◗, ◖ 1055 = 1023 + 1·2^5 ◗, ◖ 3133 = 1023 + 1055·2^1 ◗, ◖ 7289 = 1023 + 3133·2^1 ◗] ? 7291 /4/ [◖ 1 ◗, ◖ 1023 = -1 + 1·2^10 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1567 = 1023 + 17·2^5 ◗, ◖ 7291 = 1023 + 1567·2^2 ◗] ? 7293 /4/ [◖ 1 ◗, ◖ 1023 = -1 + 1·2^10 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 3135 = 1023 + 33·2^6 ◗, ◖ 7293 = 1023 + 3135·2^1 ◗] ? 7295 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 49 = 33 + 1·2^4 ◗, ◖ 229 = 33 + 49·2^2 ◗, ◖ 7295 = -33 + 229·2^5 ◗] ? 7297 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 97 = 33 + 1·2^6 ◗, ◖ 227 = 33 + 97·2^1 ◗, ◖ 7297 = 33 + 227·2^5 ◗] ? 7299 /4/ [◖ 1 ◗, ◖ 1025 = 1 + 1·2^10 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 3137 = 1025 + 33·2^6 ◗, ◖ 7299 = 1025 + 3137·2^1 ◗] ? 7301 /4/ [◖ 1 ◗, ◖ 1025 = 1 + 1·2^10 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1569 = 1025 + 17·2^5 ◗, ◖ 7301 = 1025 + 1569·2^2 ◗] ? 7303 /4/ [◖ 1 ◗, ◖ 1025 = 1 + 1·2^10 ◗, ◖ 1057 = 1025 + 1·2^5 ◗, ◖ 3139 = 1025 + 1057·2^1 ◗, ◖ 7303 = 1025 + 3139·2^1 ◗] ? 7305 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 769 = 1 + 3·2^8 ◗, ◖ 817 = 769 + 3·2^4 ◗, ◖ 7305 = 769 + 817·2^3 ◗] ---- ? 7309 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 115 = 51 + 1·2^6 ◗, ◖ 7309 = -51 + 115·2^6 ◗] ? 7311 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1539 = 3 + 3·2^9 ◗, ◖ 1443 = 1539 - 3·2^5 ◗, ◖ 7311 = 1539 + 1443·2^2 ◗] ? 7313 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 97 = 65 + 1·2^5 ◗, ◖ 453 = 65 + 97·2^2 ◗, ◖ 7313 = 65 + 453·2^4 ◗] ? 7315 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 385 = 1 + 3·2^7 ◗, ◖ 1925 = 385 + 385·2^2 ◗, ◖ 7315 = -385 + 1925·2^2 ◗] ? 7317 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 459 = 27 + 27·2^4 ◗, ◖ 7317 = -27 + 459·2^4 ◗] ? 7319 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 249 = -7 + 1·2^8 ◗, ◖ 473 = 249 + 7·2^5 ◗, ◖ 7319 = -249 + 473·2^4 ◗] ? 7321 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 385 = 129 + 1·2^8 ◗, ◖ 899 = 129 + 385·2^1 ◗, ◖ 7321 = 129 + 899·2^3 ◗] ? 7323 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 69 = 5 + 1·2^6 ◗, ◖ 229 = 69 + 5·2^5 ◗, ◖ 7323 = -5 + 229·2^5 ◗] ? 7325 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 35 = -5 + 5·2^3 ◗, ◖ 115 = 35 + 5·2^4 ◗, ◖ 7325 = -35 + 115·2^6 ◗] ? 7327 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 49 = 33 + 1·2^4 ◗, ◖ 229 = 33 + 49·2^2 ◗, ◖ 7327 = -1 + 229·2^5 ◗] ? 7329 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 49 = 33 + 1·2^4 ◗, ◖ 229 = 33 + 49·2^2 ◗, ◖ 7329 = 1 + 229·2^5 ◗] ---- ? 7333 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 69 = 5 + 1·2^6 ◗, ◖ 229 = 69 + 5·2^5 ◗, ◖ 7333 = 5 + 229·2^5 ◗] ? 7335 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 459 = 27 + 27·2^4 ◗, ◖ 7335 = -9 + 459·2^4 ◗] ? 7337 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 193 = 129 + 1·2^6 ◗, ◖ 901 = 129 + 193·2^2 ◗, ◖ 7337 = 129 + 901·2^3 ◗] ---- ? 7341 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 459 = 27 + 27·2^4 ◗, ◖ 7341 = -3 + 459·2^4 ◗] ? 7343 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 459 = 27 + 27·2^4 ◗, ◖ 7343 = -1 + 459·2^4 ◗] ? 7345 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 459 = 27 + 27·2^4 ◗, ◖ 7345 = 1 + 459·2^4 ◗] ? 7347 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 459 = 27 + 27·2^4 ◗, ◖ 7347 = 3 + 459·2^4 ◗] ---- ? 7351 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 105 = -7 + 7·2^4 ◗, ◖ 233 = 105 + 1·2^7 ◗, ◖ 7351 = -105 + 233·2^5 ◗] ? 7353 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 459 = 27 + 27·2^4 ◗, ◖ 7353 = 9 + 459·2^4 ◗] ? 7355 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 35 = -5 + 5·2^3 ◗, ◖ 115 = 35 + 5·2^4 ◗, ◖ 7355 = -5 + 115·2^6 ◗] ? 7357 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 115 = 23 + 23·2^2 ◗, ◖ 7357 = -3 + 115·2^6 ◗] ? 7359 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 49 = 17 + 1·2^5 ◗, ◖ 115 = 17 + 49·2^1 ◗, ◖ 7359 = -1 + 115·2^6 ◗] ? 7361 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 49 = 17 + 1·2^5 ◗, ◖ 115 = 17 + 49·2^1 ◗, ◖ 7361 = 1 + 115·2^6 ◗] ? 7363 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 115 = 23 + 23·2^2 ◗, ◖ 7363 = 3 + 115·2^6 ◗] ? 7365 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 35 = -5 + 5·2^3 ◗, ◖ 115 = 35 + 5·2^4 ◗, ◖ 7365 = 5 + 115·2^6 ◗] ? 7367 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 23 = 7 + 1·2^4 ◗, ◖ 115 = 23 + 23·2^2 ◗, ◖ 7367 = 7 + 115·2^6 ◗] ---- ? 7371 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 459 = 27 + 27·2^4 ◗, ◖ 7371 = 27 + 459·2^4 ◗] ? 7373 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 253 = -3 + 1·2^8 ◗, ◖ 445 = 253 + 3·2^6 ◗, ◖ 7373 = 253 + 445·2^4 ◗] ? 7375 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 23 = 15 + 1·2^3 ◗, ◖ 115 = 23 + 23·2^2 ◗, ◖ 7375 = 15 + 115·2^6 ◗] ? 7377 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 49 = 17 + 1·2^5 ◗, ◖ 115 = 17 + 49·2^1 ◗, ◖ 7377 = 17 + 115·2^6 ◗] ? 7379 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 19 = 3 + 1·2^4 ◗, ◖ 115 = 19 + 3·2^5 ◗, ◖ 7379 = 19 + 115·2^6 ◗] ? 7381 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 133 = 5 + 1·2^7 ◗, ◖ 453 = 133 + 5·2^6 ◗, ◖ 7381 = 133 + 453·2^4 ◗] ? 7383 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 115 = 23 + 23·2^2 ◗, ◖ 7383 = 23 + 115·2^6 ◗] ? 7385 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 1055 = -1 + 33·2^5 ◗, ◖ 3165 = 1055 + 1055·2^1 ◗, ◖ 7385 = 1055 + 3165·2^1 ◗] ? 7387 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 1055 = -1 + 33·2^5 ◗, ◖ 1583 = 1055 + 33·2^4 ◗, ◖ 7387 = 1055 + 1583·2^2 ◗] ? 7389 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 1055 = -1 + 33·2^5 ◗, ◖ 3167 = 1055 + 33·2^6 ◗, ◖ 7389 = 1055 + 3167·2^1 ◗] ? 7391 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 3583 = -1 + 7·2^9 ◗, ◖ 119 = 7 + 7·2^4 ◗, ◖ 7391 = 3583 + 119·2^5 ◗] ? 7393 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 41 = 33 + 1·2^3 ◗, ◖ 115 = 33 + 41·2^1 ◗, ◖ 7393 = 33 + 115·2^6 ◗] ? 7395 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 1057 = 1 + 33·2^5 ◗, ◖ 3169 = 1057 + 33·2^6 ◗, ◖ 7395 = 1057 + 3169·2^1 ◗] ? 7397 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 1057 = 1 + 33·2^5 ◗, ◖ 1585 = 1057 + 33·2^4 ◗, ◖ 7397 = 1057 + 1585·2^2 ◗] ? 7399 /4/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 319 = 255 + 1·2^6 ◗, ◖ 893 = 255 + 319·2^1 ◗, ◖ 7399 = 255 + 893·2^3 ◗] ? 7401 /4/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 319 = 255 + 1·2^6 ◗, ◖ 957 = 319 + 319·2^1 ◗, ◖ 7401 = -255 + 957·2^3 ◗] ? 7403 /4/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 383 = 255 + 1·2^7 ◗, ◖ 1787 = 255 + 383·2^2 ◗, ◖ 7403 = 255 + 1787·2^2 ◗] ? 7405 /4/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 383 = 255 + 1·2^7 ◗, ◖ 1915 = 383 + 383·2^2 ◗, ◖ 7405 = -255 + 1915·2^2 ◗] ? 7407 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 81 = 9 + 9·2^3 ◗, ◖ 117 = 81 + 9·2^2 ◗, ◖ 7407 = -81 + 117·2^6 ◗] ? 7409 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 253 = -3 + 1·2^8 ◗, ◖ 1789 = 253 + 3·2^9 ◗, ◖ 7409 = 253 + 1789·2^2 ◗] ? 7411 /4/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 767 = 255 + 1·2^9 ◗, ◖ 1789 = 255 + 767·2^1 ◗, ◖ 7411 = 255 + 1789·2^2 ◗] ? 7413 /4/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 767 = 255 + 1·2^9 ◗, ◖ 3323 = 255 + 767·2^2 ◗, ◖ 7413 = 767 + 3323·2^1 ◗] ? 7415 /4/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 767 = 255 + 1·2^9 ◗, ◖ 3835 = 767 + 767·2^2 ◗, ◖ 7415 = -255 + 3835·2^1 ◗] ? 7417 /4/ [◖ 1 ◗, ◖ 1023 = -1 + 1·2^10 ◗, ◖ 1087 = 1023 + 1·2^6 ◗, ◖ 3197 = 1023 + 1087·2^1 ◗, ◖ 7417 = 1023 + 3197·2^1 ◗] ? 7419 /4/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 1279 = 255 + 1·2^10 ◗, ◖ 3837 = 1279 + 1279·2^1 ◗, ◖ 7419 = -255 + 3837·2^1 ◗] ? 7421 /4/ [◖ 1 ◗, ◖ 1023 = -1 + 1·2^10 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 3199 = 1023 + 17·2^7 ◗, ◖ 7421 = 1023 + 3199·2^1 ◗] ? 7423 /4/ [◖ 1 ◗, ◖ 511 = -1 + 1·2^9 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 7423 = 511 + 27·2^8 ◗] ? 7425 /4/ [◖ 1 ◗, ◖ 513 = 1 + 1·2^9 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 7425 = 513 + 27·2^8 ◗] ? 7427 /4/ [◖ 1 ◗, ◖ 1025 = 1 + 1·2^10 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 3201 = 1025 + 17·2^7 ◗, ◖ 7427 = 1025 + 3201·2^1 ◗] ? 7429 /4/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 1281 = 257 + 1·2^10 ◗, ◖ 3843 = 1281 + 1281·2^1 ◗, ◖ 7429 = -257 + 3843·2^1 ◗] ? 7431 /4/ [◖ 1 ◗, ◖ 1025 = 1 + 1·2^10 ◗, ◖ 1089 = 1025 + 1·2^6 ◗, ◖ 3203 = 1025 + 1089·2^1 ◗, ◖ 7431 = 1025 + 3203·2^1 ◗] ? 7433 /4/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 769 = 257 + 1·2^9 ◗, ◖ 3845 = 769 + 769·2^2 ◗, ◖ 7433 = -257 + 3845·2^1 ◗] ? 7435 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 115 = 75 + 5·2^3 ◗, ◖ 7435 = 75 + 115·2^6 ◗] ? 7437 /4/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 769 = 257 + 1·2^9 ◗, ◖ 1795 = 257 + 769·2^1 ◗, ◖ 7437 = 257 + 1795·2^2 ◗] ? 7439 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 3839 = -1 + 15·2^8 ◗, ◖ 225 = -15 + 15·2^4 ◗, ◖ 7439 = 3839 + 225·2^4 ◗] ? 7441 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 113 = -15 + 1·2^7 ◗, ◖ 233 = 113 + 15·2^3 ◗, ◖ 7441 = -15 + 233·2^5 ◗] ? 7443 /4/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 385 = 257 + 1·2^7 ◗, ◖ 1925 = 385 + 385·2^2 ◗, ◖ 7443 = -257 + 1925·2^2 ◗] ? 7445 /4/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 385 = 257 + 1·2^7 ◗, ◖ 1797 = 257 + 385·2^2 ◗, ◖ 7445 = 257 + 1797·2^2 ◗] ? 7447 /4/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 321 = 257 + 1·2^6 ◗, ◖ 963 = 321 + 321·2^1 ◗, ◖ 7447 = -257 + 963·2^3 ◗] ? 7449 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 121 = -7 + 1·2^7 ◗, ◖ 233 = 121 + 7·2^4 ◗, ◖ 7449 = -7 + 233·2^5 ◗] ? 7451 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 771 = 3 + 3·2^8 ◗, ◖ 835 = 771 + 1·2^6 ◗, ◖ 7451 = 771 + 835·2^3 ◗] ? 7453 /4/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 771 = 257 + 257·2^1 ◗, ◖ 3341 = 257 + 771·2^2 ◗, ◖ 7453 = 771 + 3341·2^1 ◗] ? 7455 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 121 = -7 + 1·2^7 ◗, ◖ 233 = 121 + 7·2^4 ◗, ◖ 7455 = -1 + 233·2^5 ◗] ? 7457 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 121 = -7 + 1·2^7 ◗, ◖ 233 = 121 + 7·2^4 ◗, ◖ 7457 = 1 + 233·2^5 ◗] ? 7459 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 115 = 99 + 1·2^4 ◗, ◖ 7459 = 99 + 115·2^6 ◗] ? 7461 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 117 = 9 + 27·2^2 ◗, ◖ 7461 = -27 + 117·2^6 ◗] ? 7463 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 121 = -7 + 1·2^7 ◗, ◖ 233 = 121 + 7·2^4 ◗, ◖ 7463 = 7 + 233·2^5 ◗] ---- ? 7467 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 117 = 21 + 3·2^5 ◗, ◖ 7467 = -21 + 117·2^6 ◗] ? 7469 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 261 = 5 + 1·2^8 ◗, ◖ 901 = 261 + 5·2^7 ◗, ◖ 7469 = 261 + 901·2^3 ◗] ? 7471 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 25 = 17 + 1·2^3 ◗, ◖ 117 = 17 + 25·2^2 ◗, ◖ 7471 = -17 + 117·2^6 ◗] ? 7473 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 235 = 47 + 47·2^2 ◗, ◖ 7473 = -47 + 235·2^5 ◗] ? 7475 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 117 = 13 + 13·2^3 ◗, ◖ 7475 = -13 + 117·2^6 ◗] ---- ? 7479 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 117 = 9 + 27·2^2 ◗, ◖ 7479 = -9 + 117·2^6 ◗] ? 7481 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 39 = 7 + 1·2^5 ◗, ◖ 117 = 39 + 39·2^1 ◗, ◖ 7481 = -7 + 117·2^6 ◗] ? 7483 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 117 = 39 + 39·2^1 ◗, ◖ 7483 = -5 + 117·2^6 ◗] ? 7485 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 117 = 13 + 13·2^3 ◗, ◖ 7485 = -3 + 117·2^6 ◗] ? 7487 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 117 = 9 + 27·2^2 ◗, ◖ 7487 = -1 + 117·2^6 ◗] ? 7489 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 117 = 9 + 27·2^2 ◗, ◖ 7489 = 1 + 117·2^6 ◗] ? 7491 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 117 = 13 + 13·2^3 ◗, ◖ 7491 = 3 + 117·2^6 ◗] ? 7493 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 117 = 39 + 39·2^1 ◗, ◖ 7493 = 5 + 117·2^6 ◗] ? 7495 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 39 = 7 + 1·2^5 ◗, ◖ 117 = 39 + 39·2^1 ◗, ◖ 7495 = 7 + 117·2^6 ◗] ? 7497 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 117 = 9 + 27·2^2 ◗, ◖ 7497 = 9 + 117·2^6 ◗] ---- ? 7501 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 117 = 13 + 13·2^3 ◗, ◖ 7501 = 13 + 117·2^6 ◗] ? 7503 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1539 = 3 + 3·2^9 ◗, ◖ 1491 = 1539 - 3·2^4 ◗, ◖ 7503 = 1539 + 1491·2^2 ◗] ? 7505 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 25 = 17 + 1·2^3 ◗, ◖ 117 = 17 + 25·2^2 ◗, ◖ 7505 = 17 + 117·2^6 ◗] ---- ? 7509 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 117 = 21 + 3·2^5 ◗, ◖ 7509 = 21 + 117·2^6 ◗] ? 7511 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 383 = 127 + 1·2^8 ◗, ◖ 891 = 383 + 127·2^2 ◗, ◖ 7511 = 383 + 891·2^3 ◗] ? 7513 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 191 = 127 + 1·2^6 ◗, ◖ 955 = 191 + 191·2^2 ◗, ◖ 7513 = -127 + 955·2^3 ◗] ? 7515 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 235 = 75 + 5·2^5 ◗, ◖ 7515 = -5 + 235·2^5 ◗] ? 7517 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 235 = 47 + 47·2^2 ◗, ◖ 7517 = -3 + 235·2^5 ◗] ? 7519 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 235 = 47 + 47·2^2 ◗, ◖ 7519 = -1 + 235·2^5 ◗] ? 7521 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 235 = 47 + 47·2^2 ◗, ◖ 7521 = 1 + 235·2^5 ◗] ? 7523 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 235 = 47 + 47·2^2 ◗, ◖ 7523 = 3 + 235·2^5 ◗] ? 7525 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 235 = 75 + 5·2^5 ◗, ◖ 7525 = 5 + 235·2^5 ◗] ? 7527 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 193 = 1 + 3·2^6 ◗, ◖ 965 = 193 + 193·2^2 ◗, ◖ 7527 = -193 + 965·2^3 ◗] ? 7529 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 263 = 7 + 1·2^8 ◗, ◖ 487 = 263 + 7·2^5 ◗, ◖ 7529 = -263 + 487·2^4 ◗] ? 7531 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1071 = -17 + 17·2^6 ◗, ◖ 1615 = 1071 + 17·2^5 ◗, ◖ 7531 = 1071 + 1615·2^2 ◗] ? 7533 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 383 = 127 + 1·2^8 ◗, ◖ 1915 = 383 + 383·2^2 ◗, ◖ 7533 = -127 + 1915·2^2 ◗] ? 7535 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 47 = 15 + 1·2^5 ◗, ◖ 235 = 47 + 47·2^2 ◗, ◖ 7535 = 15 + 235·2^5 ◗] ? 7537 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 225 = -31 + 1·2^8 ◗, ◖ 473 = 225 + 31·2^3 ◗, ◖ 7537 = -31 + 473·2^4 ◗] ? 7539 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 237 = 45 + 3·2^6 ◗, ◖ 7539 = -45 + 237·2^5 ◗] ? 7541 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 639 = 127 + 1·2^9 ◗, ◖ 1917 = 639 + 639·2^1 ◗, ◖ 7541 = -127 + 1917·2^2 ◗] ? 7543 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4087 = -9 + 1·2^12 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 7543 = 4087 + 27·2^7 ◗] ? 7545 /4/ [◖ 1 ◗, ◖ 1023 = -1 + 1·2^10 ◗, ◖ 1087 = 1023 + 1·2^6 ◗, ◖ 3261 = 1087 + 1087·2^1 ◗, ◖ 7545 = 1023 + 3261·2^1 ◗] ? 7547 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1535 = -1 + 3·2^9 ◗, ◖ 1503 = 1535 - 1·2^5 ◗, ◖ 7547 = 1535 + 1503·2^2 ◗] ? 7549 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 2559 = -1 + 5·2^9 ◗, ◖ 2495 = 2559 - 1·2^6 ◗, ◖ 7549 = 2559 + 2495·2^1 ◗] ? 7551 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 47 = 31 + 1·2^4 ◗, ◖ 235 = 47 + 47·2^2 ◗, ◖ 7551 = 31 + 235·2^5 ◗] ? 7553 /4/ [◖ 1 ◗, ◖ 1025 = 1 + 1·2^10 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 7553 = 1025 + 51·2^7 ◗] ? 7555 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 2561 = 1 + 5·2^9 ◗, ◖ 2497 = 2561 - 1·2^6 ◗, ◖ 7555 = 2561 + 2497·2^1 ◗] ? 7557 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1537 = 1 + 3·2^9 ◗, ◖ 1505 = 1537 - 1·2^5 ◗, ◖ 7557 = 1537 + 1505·2^2 ◗] ? 7559 /4/ [◖ 1 ◗, ◖ 1025 = 1 + 1·2^10 ◗, ◖ 1089 = 1025 + 1·2^6 ◗, ◖ 3267 = 1089 + 1089·2^1 ◗, ◖ 7559 = 1025 + 3267·2^1 ◗] ? 7561 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 249 = -7 + 1·2^8 ◗, ◖ 473 = 249 + 7·2^5 ◗, ◖ 7561 = -7 + 473·2^4 ◗] ? 7563 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 641 = 129 + 1·2^9 ◗, ◖ 1923 = 641 + 641·2^1 ◗, ◖ 7563 = -129 + 1923·2^2 ◗] ? 7565 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1071 = -17 + 17·2^6 ◗, ◖ 3247 = 1071 + 17·2^7 ◗, ◖ 7565 = 1071 + 3247·2^1 ◗] ? 7567 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 249 = -7 + 1·2^8 ◗, ◖ 473 = 249 + 7·2^5 ◗, ◖ 7567 = -1 + 473·2^4 ◗] ? 7569 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 249 = -7 + 1·2^8 ◗, ◖ 473 = 249 + 7·2^5 ◗, ◖ 7569 = 1 + 473·2^4 ◗] ? 7571 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 385 = 129 + 1·2^8 ◗, ◖ 1925 = 385 + 385·2^2 ◗, ◖ 7571 = -129 + 1925·2^2 ◗] ? 7573 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 117 = 85 + 1·2^5 ◗, ◖ 7573 = 85 + 117·2^6 ◗] ? 7575 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 249 = -7 + 1·2^8 ◗, ◖ 473 = 249 + 7·2^5 ◗, ◖ 7575 = 7 + 473·2^4 ◗] ? 7577 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 191 = 63 + 1·2^7 ◗, ◖ 955 = 191 + 191·2^2 ◗, ◖ 7577 = -63 + 955·2^3 ◗] ? 7579 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 79 = -1 + 5·2^4 ◗, ◖ 237 = 79 + 79·2^1 ◗, ◖ 7579 = -5 + 237·2^5 ◗] ? 7581 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 237 = 45 + 3·2^6 ◗, ◖ 7581 = -3 + 237·2^5 ◗] ? 7583 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 79 = -1 + 5·2^4 ◗, ◖ 237 = 79 + 79·2^1 ◗, ◖ 7583 = -1 + 237·2^5 ◗] ? 7585 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 79 = -1 + 5·2^4 ◗, ◖ 237 = 79 + 79·2^1 ◗, ◖ 7585 = 1 + 237·2^5 ◗] ? 7587 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 237 = 45 + 3·2^6 ◗, ◖ 7587 = 3 + 237·2^5 ◗] ? 7589 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 79 = -1 + 5·2^4 ◗, ◖ 237 = 79 + 79·2^1 ◗, ◖ 7589 = 5 + 237·2^5 ◗] ? 7591 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 193 = 129 + 1·2^6 ◗, ◖ 965 = 193 + 193·2^2 ◗, ◖ 7591 = -129 + 965·2^3 ◗] ? 7593 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 319 = 63 + 1·2^8 ◗, ◖ 957 = 319 + 319·2^1 ◗, ◖ 7593 = -63 + 957·2^3 ◗] ? 7595 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 475 = 155 + 5·2^6 ◗, ◖ 7595 = -5 + 475·2^4 ◗] ? 7597 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 475 = 95 + 95·2^2 ◗, ◖ 7597 = -3 + 475·2^4 ◗] ? 7599 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 475 = 95 + 95·2^2 ◗, ◖ 7599 = -1 + 475·2^4 ◗] ? 7601 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 475 = 95 + 95·2^2 ◗, ◖ 7601 = 1 + 475·2^4 ◗] ? 7603 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 475 = 95 + 95·2^2 ◗, ◖ 7603 = 3 + 475·2^4 ◗] ? 7605 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 475 = 155 + 5·2^6 ◗, ◖ 7605 = 5 + 475·2^4 ◗] ? 7607 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4087 = -9 + 1·2^12 ◗, ◖ 55 = -9 + 1·2^6 ◗, ◖ 7607 = 4087 + 55·2^6 ◗] ? 7609 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1087 = -1 + 17·2^6 ◗, ◖ 3261 = 1087 + 1087·2^1 ◗, ◖ 7609 = 1087 + 3261·2^1 ◗] ? 7611 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1535 = -1 + 3·2^9 ◗, ◖ 1519 = 1535 - 1·2^4 ◗, ◖ 7611 = 1535 + 1519·2^2 ◗] ? 7613 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 2559 = -1 + 5·2^9 ◗, ◖ 2527 = 2559 - 1·2^5 ◗, ◖ 7613 = 2559 + 2527·2^1 ◗] ? 7615 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 55 = -1 + 7·2^3 ◗, ◖ 7615 = 4095 + 55·2^6 ◗] ? 7617 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 505 = -7 + 1·2^9 ◗, ◖ 953 = 505 + 7·2^6 ◗, ◖ 7617 = -7 + 953·2^3 ◗] ? 7619 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 2561 = 1 + 5·2^9 ◗, ◖ 2529 = 2561 - 1·2^5 ◗, ◖ 7619 = 2561 + 2529·2^1 ◗] ? 7621 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1537 = 1 + 3·2^9 ◗, ◖ 1521 = 1537 - 1·2^4 ◗, ◖ 7621 = 1537 + 1521·2^2 ◗] ? 7623 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 505 = -7 + 1·2^9 ◗, ◖ 953 = 505 + 7·2^6 ◗, ◖ 7623 = -1 + 953·2^3 ◗] ? 7625 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 505 = -7 + 1·2^9 ◗, ◖ 953 = 505 + 7·2^6 ◗, ◖ 7625 = 1 + 953·2^3 ◗] ? 7627 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 159 = -1 + 5·2^5 ◗, ◖ 477 = 159 + 159·2^1 ◗, ◖ 7627 = -5 + 477·2^4 ◗] ? 7629 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 477 = 93 + 3·2^7 ◗, ◖ 7629 = -3 + 477·2^4 ◗] ? 7631 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 159 = -1 + 5·2^5 ◗, ◖ 477 = 159 + 159·2^1 ◗, ◖ 7631 = -1 + 477·2^4 ◗] ? 7633 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 159 = -1 + 5·2^5 ◗, ◖ 477 = 159 + 159·2^1 ◗, ◖ 7633 = 1 + 477·2^4 ◗] ? 7635 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 477 = 93 + 3·2^7 ◗, ◖ 7635 = 3 + 477·2^4 ◗] ? 7637 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 191 = -1 + 3·2^6 ◗, ◖ 955 = 191 + 191·2^2 ◗, ◖ 7637 = -3 + 955·2^3 ◗] ? 7639 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 191 = -1 + 3·2^6 ◗, ◖ 955 = 191 + 191·2^2 ◗, ◖ 7639 = -1 + 955·2^3 ◗] ? 7641 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 191 = -1 + 3·2^6 ◗, ◖ 955 = 191 + 191·2^2 ◗, ◖ 7641 = 1 + 955·2^3 ◗] ? 7643 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 191 = -1 + 3·2^6 ◗, ◖ 955 = 191 + 191·2^2 ◗, ◖ 7643 = 3 + 955·2^3 ◗] ? 7645 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 315 = -5 + 5·2^6 ◗, ◖ 955 = 315 + 5·2^7 ◗, ◖ 7645 = 5 + 955·2^3 ◗] ? 7647 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 79 = 63 + 1·2^4 ◗, ◖ 237 = 79 + 79·2^1 ◗, ◖ 7647 = 63 + 237·2^5 ◗] ? 7649 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 111 = -1 + 7·2^4 ◗, ◖ 7649 = 4097 + 111·2^5 ◗] ? 7651 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 1017 = -7 + 1·2^10 ◗, ◖ 1913 = 1017 + 7·2^7 ◗, ◖ 7651 = -1 + 1913·2^2 ◗] ? 7653 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 1017 = -7 + 1·2^10 ◗, ◖ 1913 = 1017 + 7·2^7 ◗, ◖ 7653 = 1 + 1913·2^2 ◗] ? 7655 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 319 = -1 + 5·2^6 ◗, ◖ 957 = 319 + 319·2^1 ◗, ◖ 7655 = -1 + 957·2^3 ◗] ? 7657 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 319 = -1 + 5·2^6 ◗, ◖ 957 = 319 + 319·2^1 ◗, ◖ 7657 = 1 + 957·2^3 ◗] ? 7659 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 383 = -1 + 3·2^7 ◗, ◖ 1915 = 383 + 383·2^2 ◗, ◖ 7659 = -1 + 1915·2^2 ◗] ? 7661 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 383 = -1 + 3·2^7 ◗, ◖ 1915 = 383 + 383·2^2 ◗, ◖ 7661 = 1 + 1915·2^2 ◗] ? 7663 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 383 = -1 + 3·2^7 ◗, ◖ 1915 = 383 + 383·2^2 ◗, ◖ 7663 = 3 + 1915·2^2 ◗] ? 7665 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1533 = -3 + 3·2^9 ◗, ◖ 7665 = 1533 + 1533·2^2 ◗] ? 7667 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 639 = -1 + 5·2^7 ◗, ◖ 1917 = 639 + 639·2^1 ◗, ◖ 7667 = -1 + 1917·2^2 ◗] ? 7669 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 767 = -1 + 3·2^8 ◗, ◖ 3835 = 767 + 767·2^2 ◗, ◖ 7669 = -1 + 3835·2^1 ◗] ? 7671 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 767 = -1 + 3·2^8 ◗, ◖ 3835 = 767 + 767·2^2 ◗, ◖ 7671 = 1 + 3835·2^1 ◗] ? 7673 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 4089 = -7 + 1·2^12 ◗, ◖ 7673 = 4089 + 7·2^9 ◗] ? 7675 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1535 = -1 + 3·2^9 ◗, ◖ 7675 = 1535 + 1535·2^2 ◗] ? 7677 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 2559 = -1 + 5·2^9 ◗, ◖ 7677 = 2559 + 2559·2^1 ◗] ? 7679 /3/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 7679 = 4095 + 7·2^9 ◗] ? 7681 /3/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 7681 = 4097 + 7·2^9 ◗] ? 7683 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 2561 = 1 + 5·2^9 ◗, ◖ 7683 = 2561 + 2561·2^1 ◗] ? 7685 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1537 = 1 + 3·2^9 ◗, ◖ 7685 = 1537 + 1537·2^2 ◗] ? 7687 /3/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 4103 = 7 + 1·2^12 ◗, ◖ 7687 = 4103 + 7·2^9 ◗] ? 7689 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 769 = 1 + 3·2^8 ◗, ◖ 3845 = 769 + 769·2^2 ◗, ◖ 7689 = -1 + 3845·2^1 ◗] ? 7691 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 769 = 1 + 3·2^8 ◗, ◖ 3845 = 769 + 769·2^2 ◗, ◖ 7691 = 1 + 3845·2^1 ◗] ? 7693 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 641 = 1 + 5·2^7 ◗, ◖ 1923 = 641 + 641·2^1 ◗, ◖ 7693 = 1 + 1923·2^2 ◗] ? 7695 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1539 = 3 + 3·2^9 ◗, ◖ 7695 = 1539 + 1539·2^2 ◗] ? 7697 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 385 = 1 + 3·2^7 ◗, ◖ 1925 = 385 + 385·2^2 ◗, ◖ 7697 = -3 + 1925·2^2 ◗] ? 7699 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 385 = 1 + 3·2^7 ◗, ◖ 1925 = 385 + 385·2^2 ◗, ◖ 7699 = -1 + 1925·2^2 ◗] ? 7701 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 385 = 1 + 3·2^7 ◗, ◖ 1925 = 385 + 385·2^2 ◗, ◖ 7701 = 1 + 1925·2^2 ◗] ? 7703 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 321 = 1 + 5·2^6 ◗, ◖ 963 = 321 + 321·2^1 ◗, ◖ 7703 = -1 + 963·2^3 ◗] ? 7705 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 321 = 1 + 5·2^6 ◗, ◖ 963 = 321 + 321·2^1 ◗, ◖ 7705 = 1 + 963·2^3 ◗] ? 7707 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 1031 = 7 + 1·2^10 ◗, ◖ 1927 = 1031 + 7·2^7 ◗, ◖ 7707 = -1 + 1927·2^2 ◗] ? 7709 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 1031 = 7 + 1·2^10 ◗, ◖ 1927 = 1031 + 7·2^7 ◗, ◖ 7709 = 1 + 1927·2^2 ◗] ? 7711 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 81 = 65 + 1·2^4 ◗, ◖ 243 = 81 + 81·2^1 ◗, ◖ 7711 = -65 + 243·2^5 ◗] ? 7713 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 113 = 1 + 7·2^4 ◗, ◖ 7713 = 4097 + 113·2^5 ◗] ? 7715 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 325 = 5 + 5·2^6 ◗, ◖ 965 = 325 + 5·2^7 ◗, ◖ 7715 = -5 + 965·2^3 ◗] ? 7717 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 193 = 1 + 3·2^6 ◗, ◖ 965 = 193 + 193·2^2 ◗, ◖ 7717 = -3 + 965·2^3 ◗] ? 7719 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 193 = 1 + 3·2^6 ◗, ◖ 965 = 193 + 193·2^2 ◗, ◖ 7719 = -1 + 965·2^3 ◗] ? 7721 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 193 = 1 + 3·2^6 ◗, ◖ 965 = 193 + 193·2^2 ◗, ◖ 7721 = 1 + 965·2^3 ◗] ? 7723 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 193 = 1 + 3·2^6 ◗, ◖ 965 = 193 + 193·2^2 ◗, ◖ 7723 = 3 + 965·2^3 ◗] ? 7725 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 483 = 99 + 3·2^7 ◗, ◖ 7725 = -3 + 483·2^4 ◗] ? 7727 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 161 = 1 + 5·2^5 ◗, ◖ 483 = 161 + 161·2^1 ◗, ◖ 7727 = -1 + 483·2^4 ◗] ? 7729 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 161 = 1 + 5·2^5 ◗, ◖ 483 = 161 + 161·2^1 ◗, ◖ 7729 = 1 + 483·2^4 ◗] ? 7731 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 483 = 99 + 3·2^7 ◗, ◖ 7731 = 3 + 483·2^4 ◗] ? 7733 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 161 = 1 + 5·2^5 ◗, ◖ 483 = 161 + 161·2^1 ◗, ◖ 7733 = 5 + 483·2^4 ◗] ? 7735 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 519 = 7 + 1·2^9 ◗, ◖ 967 = 519 + 7·2^6 ◗, ◖ 7735 = -1 + 967·2^3 ◗] ? 7737 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 519 = 7 + 1·2^9 ◗, ◖ 967 = 519 + 7·2^6 ◗, ◖ 7737 = 1 + 967·2^3 ◗] ? 7739 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1535 = -1 + 3·2^9 ◗, ◖ 1551 = 1535 + 1·2^4 ◗, ◖ 7739 = 1535 + 1551·2^2 ◗] ? 7741 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 2559 = -1 + 5·2^9 ◗, ◖ 2591 = 2559 + 1·2^5 ◗, ◖ 7741 = 2559 + 2591·2^1 ◗] ? 7743 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 519 = 7 + 1·2^9 ◗, ◖ 967 = 519 + 7·2^6 ◗, ◖ 7743 = 7 + 967·2^3 ◗] ? 7745 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 57 = 1 + 7·2^3 ◗, ◖ 7745 = 4097 + 57·2^6 ◗] ? 7747 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 2561 = 1 + 5·2^9 ◗, ◖ 2593 = 2561 + 1·2^5 ◗, ◖ 7747 = 2561 + 2593·2^1 ◗] ? 7749 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1537 = 1 + 3·2^9 ◗, ◖ 1553 = 1537 + 1·2^4 ◗, ◖ 7749 = 1537 + 1553·2^2 ◗] ? 7751 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 4103 = 7 + 1·2^12 ◗, ◖ 57 = 1 + 7·2^3 ◗, ◖ 7751 = 4103 + 57·2^6 ◗] ? 7753 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 119 = 127 - 1·2^3 ◗, ◖ 3945 = -119 + 127·2^5 ◗, ◖ 7753 = 3945 + 119·2^5 ◗] ? 7755 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 485 = 165 + 5·2^6 ◗, ◖ 7755 = -5 + 485·2^4 ◗] ? 7757 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 485 = 97 + 97·2^2 ◗, ◖ 7757 = -3 + 485·2^4 ◗] ? 7759 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 485 = 97 + 97·2^2 ◗, ◖ 7759 = -1 + 485·2^4 ◗] ? 7761 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 485 = 97 + 97·2^2 ◗, ◖ 7761 = 1 + 485·2^4 ◗] ? 7763 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 485 = 97 + 97·2^2 ◗, ◖ 7763 = 3 + 485·2^4 ◗] ? 7765 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 485 = 165 + 5·2^6 ◗, ◖ 7765 = 5 + 485·2^4 ◗] ? 7767 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 243 = 27 + 27·2^3 ◗, ◖ 7767 = -9 + 243·2^5 ◗] ? 7769 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 321 = 65 + 1·2^8 ◗, ◖ 963 = 321 + 321·2^1 ◗, ◖ 7769 = 65 + 963·2^3 ◗] ? 7771 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 81 = 1 + 5·2^4 ◗, ◖ 243 = 81 + 81·2^1 ◗, ◖ 7771 = -5 + 243·2^5 ◗] ? 7773 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 243 = 27 + 27·2^3 ◗, ◖ 7773 = -3 + 243·2^5 ◗] ? 7775 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 81 = 1 + 5·2^4 ◗, ◖ 243 = 81 + 81·2^1 ◗, ◖ 7775 = -1 + 243·2^5 ◗] ? 7777 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 81 = 1 + 5·2^4 ◗, ◖ 243 = 81 + 81·2^1 ◗, ◖ 7777 = 1 + 243·2^5 ◗] ? 7779 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 243 = 27 + 27·2^3 ◗, ◖ 7779 = 3 + 243·2^5 ◗] ? 7781 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 81 = 1 + 5·2^4 ◗, ◖ 243 = 81 + 81·2^1 ◗, ◖ 7781 = 5 + 243·2^5 ◗] ? 7783 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 639 = 127 + 1·2^9 ◗, ◖ 893 = 639 + 127·2^1 ◗, ◖ 7783 = 639 + 893·2^3 ◗] ? 7785 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 243 = 27 + 27·2^3 ◗, ◖ 7785 = 9 + 243·2^5 ◗] ? 7787 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 383 = 127 + 1·2^8 ◗, ◖ 1915 = 383 + 383·2^2 ◗, ◖ 7787 = 127 + 1915·2^2 ◗] ---- ? 7791 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 263 = 7 + 1·2^8 ◗, ◖ 487 = 263 + 7·2^5 ◗, ◖ 7791 = -1 + 487·2^4 ◗] ? 7793 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 263 = 7 + 1·2^8 ◗, ◖ 487 = 263 + 7·2^5 ◗, ◖ 7793 = 1 + 487·2^4 ◗] ? 7795 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 639 = 127 + 1·2^9 ◗, ◖ 1917 = 639 + 639·2^1 ◗, ◖ 7795 = 127 + 1917·2^2 ◗] ? 7797 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 325 = 5 + 5·2^6 ◗, ◖ 2599 = -1 + 325·2^3 ◗, ◖ 7797 = 2599 + 2599·2^1 ◗] ? 7799 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 263 = 7 + 1·2^8 ◗, ◖ 487 = 263 + 7·2^5 ◗, ◖ 7799 = 7 + 487·2^4 ◗] ? 7801 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 497 = -15 + 1·2^9 ◗, ◖ 977 = 497 + 15·2^5 ◗, ◖ 7801 = -15 + 977·2^3 ◗] ? 7803 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1535 = -1 + 3·2^9 ◗, ◖ 1567 = 1535 + 1·2^5 ◗, ◖ 7803 = 1535 + 1567·2^2 ◗] ? 7805 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 2559 = -1 + 5·2^9 ◗, ◖ 2623 = 2559 + 1·2^6 ◗, ◖ 7805 = 2559 + 2623·2^1 ◗] ? 7807 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 49 = 33 + 1·2^4 ◗, ◖ 245 = 49 + 49·2^2 ◗, ◖ 7807 = -33 + 245·2^5 ◗] ? 7809 /4/ [◖ 1 ◗, ◖ 2049 = 1 + 1·2^11 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 7809 = 2049 + 45·2^7 ◗] ? 7811 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 2561 = 1 + 5·2^9 ◗, ◖ 2625 = 2561 + 1·2^6 ◗, ◖ 7811 = 2561 + 2625·2^1 ◗] ? 7813 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 961 = -63 + 1·2^10 ◗, ◖ 1969 = 961 + 63·2^4 ◗, ◖ 7813 = -63 + 1969·2^2 ◗] ? 7815 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 497 = -15 + 1·2^9 ◗, ◖ 977 = 497 + 15·2^5 ◗, ◖ 7815 = -1 + 977·2^3 ◗] ? 7817 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 497 = -15 + 1·2^9 ◗, ◖ 977 = 497 + 15·2^5 ◗, ◖ 7817 = 1 + 977·2^3 ◗] ---- ? 7821 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 641 = 129 + 1·2^9 ◗, ◖ 1923 = 641 + 641·2^1 ◗, ◖ 7821 = 129 + 1923·2^2 ◗] ? 7823 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 49 = 17 + 1·2^5 ◗, ◖ 245 = 49 + 49·2^2 ◗, ◖ 7823 = -17 + 245·2^5 ◗] ? 7825 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 223 = -33 + 1·2^8 ◗, ◖ 487 = 223 + 33·2^3 ◗, ◖ 7825 = 33 + 487·2^4 ◗] ? 7827 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 243 = 51 + 3·2^6 ◗, ◖ 7827 = 51 + 243·2^5 ◗] ? 7829 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 385 = 129 + 1·2^8 ◗, ◖ 1925 = 385 + 385·2^2 ◗, ◖ 7829 = 129 + 1925·2^2 ◗] ? 7831 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 497 = -15 + 1·2^9 ◗, ◖ 977 = 497 + 15·2^5 ◗, ◖ 7831 = 15 + 977·2^3 ◗] ? 7833 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 641 = 129 + 1·2^9 ◗, ◖ 899 = 641 + 129·2^1 ◗, ◖ 7833 = 641 + 899·2^3 ◗] ? 7835 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 245 = 85 + 5·2^5 ◗, ◖ 7835 = -5 + 245·2^5 ◗] ? 7837 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 245 = 49 + 49·2^2 ◗, ◖ 7837 = -3 + 245·2^5 ◗] ? 7839 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 245 = 49 + 49·2^2 ◗, ◖ 7839 = -1 + 245·2^5 ◗] ? 7841 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 245 = 49 + 49·2^2 ◗, ◖ 7841 = 1 + 245·2^5 ◗] ? 7843 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 245 = 49 + 49·2^2 ◗, ◖ 7843 = 3 + 245·2^5 ◗] ? 7845 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 245 = 85 + 5·2^5 ◗, ◖ 7845 = 5 + 245·2^5 ◗] ? 7847 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 481 = -31 + 1·2^9 ◗, ◖ 977 = 481 + 31·2^4 ◗, ◖ 7847 = 31 + 977·2^3 ◗] ? 7849 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 193 = 129 + 1·2^6 ◗, ◖ 965 = 193 + 193·2^2 ◗, ◖ 7849 = 129 + 965·2^3 ◗] ---- ? 7853 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 645 = 5 + 5·2^7 ◗, ◖ 901 = 645 + 1·2^8 ◗, ◖ 7853 = 645 + 901·2^3 ◗] ? 7855 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 2565 = 5 + 5·2^9 ◗, ◖ 2645 = 2565 + 5·2^4 ◗, ◖ 7855 = 2565 + 2645·2^1 ◗] ? 7857 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 49 = 17 + 1·2^5 ◗, ◖ 245 = 49 + 49·2^2 ◗, ◖ 7857 = 17 + 245·2^5 ◗] ? 7859 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 253 = -1 + 127·2^1 ◗, ◖ 3811 = -253 + 127·2^5 ◗, ◖ 7859 = 3811 + 253·2^4 ◗] ? 7861 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 1009 = -15 + 1·2^10 ◗, ◖ 1969 = 1009 + 15·2^6 ◗, ◖ 7861 = -15 + 1969·2^2 ◗] ? 7863 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 41 = 9 + 1·2^5 ◗, ◖ 2615 = -9 + 41·2^6 ◗, ◖ 7863 = 2615 + 41·2^7 ◗] ? 7865 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 4225 = 65 + 65·2^6 ◗, ◖ 455 = -65 + 65·2^3 ◗, ◖ 7865 = 4225 + 455·2^3 ◗] ? 7867 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1535 = -1 + 3·2^9 ◗, ◖ 1583 = 1535 + 3·2^4 ◗, ◖ 7867 = 1535 + 1583·2^2 ◗] ? 7869 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1533 = -3 + 3·2^9 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 7869 = 1533 + 99·2^6 ◗] ? 7871 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 59 = -1 + 15·2^2 ◗, ◖ 7871 = 4095 + 59·2^6 ◗] ? 7873 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 49 = 33 + 1·2^4 ◗, ◖ 245 = 49 + 49·2^2 ◗, ◖ 7873 = 33 + 245·2^5 ◗] ? 7875 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 1009 = -15 + 1·2^10 ◗, ◖ 1969 = 1009 + 15·2^6 ◗, ◖ 7875 = -1 + 1969·2^2 ◗] ? 7877 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 1009 = -15 + 1·2^10 ◗, ◖ 1969 = 1009 + 15·2^6 ◗, ◖ 7877 = 1 + 1969·2^2 ◗] ? 7879 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 121 = 129 - 1·2^3 ◗, ◖ 4007 = -121 + 129·2^5 ◗, ◖ 7879 = 4007 + 121·2^5 ◗] ? 7881 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 41 = 9 + 1·2^5 ◗, ◖ 2633 = 9 + 41·2^6 ◗, ◖ 7881 = 2633 + 41·2^7 ◗] ---- ? 7887 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1539 = 3 + 3·2^9 ◗, ◖ 1587 = 1539 + 3·2^4 ◗, ◖ 7887 = 1539 + 1587·2^2 ◗] ? 7889 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 245 = 49 + 49·2^2 ◗, ◖ 7889 = 49 + 245·2^5 ◗] ? 7891 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 1009 = -15 + 1·2^10 ◗, ◖ 1969 = 1009 + 15·2^6 ◗, ◖ 7891 = 15 + 1969·2^2 ◗] ---- ? 7895 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4087 = -9 + 1·2^12 ◗, ◖ 119 = -9 + 1·2^7 ◗, ◖ 7895 = 4087 + 119·2^5 ◗] ? 7897 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 4089 = -7 + 1·2^12 ◗, ◖ 119 = 7 + 7·2^4 ◗, ◖ 7897 = 4089 + 119·2^5 ◗] ? 7899 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 195 = 3 + 3·2^6 ◗, ◖ 963 = 195 + 3·2^8 ◗, ◖ 7899 = 195 + 963·2^3 ◗] ? 7901 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 3937 = -31 + 31·2^7 ◗, ◖ 991 = -1 + 31·2^5 ◗, ◖ 7901 = 3937 + 991·2^2 ◗] ? 7903 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 119 = -1 + 15·2^3 ◗, ◖ 7903 = 4095 + 119·2^5 ◗] ? 7905 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 3937 = -31 + 31·2^7 ◗, ◖ 7905 = 3937 + 31·2^7 ◗] ? 7907 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 2033 = -15 + 1·2^11 ◗, ◖ 3953 = 2033 + 15·2^7 ◗, ◖ 7907 = 1 + 3953·2^1 ◗] ? 7909 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 765 = -3 + 3·2^8 ◗, ◖ 893 = 765 + 1·2^7 ◗, ◖ 7909 = 765 + 893·2^3 ◗] ? 7911 /4/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 319 = 255 + 1·2^6 ◗, ◖ 957 = 319 + 319·2^1 ◗, ◖ 7911 = 255 + 957·2^3 ◗] ? 7913 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 193 = 1 + 3·2^6 ◗, ◖ 965 = 193 + 193·2^2 ◗, ◖ 7913 = 193 + 965·2^3 ◗] ? 7915 /4/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 383 = 255 + 1·2^7 ◗, ◖ 1915 = 383 + 383·2^2 ◗, ◖ 7915 = 255 + 1915·2^2 ◗] ? 7917 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 4081 = -15 + 1·2^12 ◗, ◖ 959 = -1 + 15·2^6 ◗, ◖ 7917 = 4081 + 959·2^2 ◗] ? 7919 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 239 = -1 + 15·2^4 ◗, ◖ 7919 = 4095 + 239·2^4 ◗] ? 7921 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 4081 = -15 + 1·2^12 ◗, ◖ 7921 = 4081 + 15·2^8 ◗] ? 7923 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 4081 = -15 + 1·2^12 ◗, ◖ 1921 = 1 + 15·2^7 ◗, ◖ 7923 = 4081 + 1921·2^1 ◗] ? 7925 /4/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 767 = 255 + 1·2^9 ◗, ◖ 3835 = 767 + 767·2^2 ◗, ◖ 7925 = 255 + 3835·2^1 ◗] ? 7927 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 479 = -1 + 15·2^5 ◗, ◖ 7927 = 4095 + 479·2^3 ◗] ? 7929 /4/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 1279 = 255 + 1·2^10 ◗, ◖ 3837 = 1279 + 1279·2^1 ◗, ◖ 7929 = 255 + 3837·2^1 ◗] ? 7931 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 959 = -65 + 1·2^10 ◗, ◖ 1999 = 959 + 65·2^4 ◗, ◖ 7931 = -65 + 1999·2^2 ◗] ? 7933 /4/ [◖ 1 ◗, ◖ 2047 = -1 + 1·2^11 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 2943 = 2047 + 7·2^7 ◗, ◖ 7933 = 2047 + 2943·2^1 ◗] ? 7935 /3/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 7935 = 4095 + 15·2^8 ◗] ? 7937 /3/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 7937 = 4097 + 15·2^8 ◗] ? 7939 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 961 = -63 + 1·2^10 ◗, ◖ 1969 = 961 + 63·2^4 ◗, ◖ 7939 = 63 + 1969·2^2 ◗] ? 7941 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 961 = 1 + 15·2^6 ◗, ◖ 7941 = 4097 + 961·2^2 ◗] ? 7943 /4/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 1281 = 257 + 1·2^10 ◗, ◖ 3843 = 1281 + 1281·2^1 ◗, ◖ 7943 = 257 + 3843·2^1 ◗] ? 7945 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 481 = 1 + 15·2^5 ◗, ◖ 7945 = 4097 + 481·2^3 ◗] ? 7947 /4/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 769 = 257 + 1·2^9 ◗, ◖ 3845 = 769 + 769·2^2 ◗, ◖ 7947 = 257 + 3845·2^1 ◗] ? 7949 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 4111 = 15 + 1·2^12 ◗, ◖ 1919 = -1 + 15·2^7 ◗, ◖ 7949 = 4111 + 1919·2^1 ◗] ? 7951 /3/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 4111 = 15 + 1·2^12 ◗, ◖ 7951 = 4111 + 15·2^8 ◗] ? 7953 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 241 = 1 + 15·2^4 ◗, ◖ 7953 = 4097 + 241·2^4 ◗] ? 7955 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 315 = -5 + 5·2^6 ◗, ◖ 955 = 315 + 5·2^7 ◗, ◖ 7955 = 315 + 955·2^3 ◗] ? 7957 /4/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 385 = 257 + 1·2^7 ◗, ◖ 1925 = 385 + 385·2^2 ◗, ◖ 7957 = 257 + 1925·2^2 ◗] ? 7959 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 4111 = 15 + 1·2^12 ◗, ◖ 481 = 1 + 15·2^5 ◗, ◖ 7959 = 4111 + 481·2^3 ◗] ? 7961 /4/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 321 = 257 + 1·2^6 ◗, ◖ 963 = 321 + 321·2^1 ◗, ◖ 7961 = 257 + 963·2^3 ◗] ? 7963 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 771 = 3 + 3·2^8 ◗, ◖ 899 = 771 + 1·2^7 ◗, ◖ 7963 = 771 + 899·2^3 ◗] ? 7965 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 2063 = 15 + 1·2^11 ◗, ◖ 3983 = 2063 + 15·2^7 ◗, ◖ 7965 = -1 + 3983·2^1 ◗] ? 7967 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 3999 = 31 + 31·2^7 ◗, ◖ 7967 = 3999 + 31·2^7 ◗] ? 7969 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 121 = 1 + 15·2^3 ◗, ◖ 7969 = 4097 + 121·2^5 ◗] ? 7971 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 2017 = -31 + 1·2^11 ◗, ◖ 4001 = 2017 + 31·2^6 ◗, ◖ 7971 = -31 + 4001·2^1 ◗] ---- ? 7975 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 319 = -1 + 5·2^6 ◗, ◖ 957 = 319 + 319·2^1 ◗, ◖ 7975 = 319 + 957·2^3 ◗] ---- ? 7981 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 1039 = 15 + 1·2^10 ◗, ◖ 1999 = 1039 + 15·2^6 ◗, ◖ 7981 = -15 + 1999·2^2 ◗] ? 7983 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 4111 = 15 + 1·2^12 ◗, ◖ 121 = 1 + 15·2^3 ◗, ◖ 7983 = 4111 + 121·2^5 ◗] ? 7985 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 2555 = -5 + 5·2^9 ◗, ◖ 2715 = 2555 + 5·2^5 ◗, ◖ 7985 = 2555 + 2715·2^1 ◗] ---- ? 7991 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 25 = 9 + 1·2^4 ◗, ◖ 1591 = -9 + 25·2^6 ◗, ◖ 7991 = 1591 + 25·2^8 ◗] ? 7993 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 3969 = -63 + 63·2^6 ◗, ◖ 503 = -1 + 63·2^3 ◗, ◖ 7993 = 3969 + 503·2^3 ◗] ? 7995 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 1039 = 15 + 1·2^10 ◗, ◖ 1999 = 1039 + 15·2^6 ◗, ◖ 7995 = -1 + 1999·2^2 ◗] ? 7997 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 1039 = 15 + 1·2^10 ◗, ◖ 1999 = 1039 + 15·2^6 ◗, ◖ 7997 = 1 + 1999·2^2 ◗] ? 7999 /4/ [◖ 1 ◗, ◖ 2047 = -1 + 1·2^11 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 7999 = 2047 + 93·2^6 ◗] ? 8001 /3/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 3969 = -63 + 63·2^6 ◗, ◖ 8001 = 3969 + 63·2^6 ◗] ? 8003 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 2017 = -31 + 1·2^11 ◗, ◖ 4001 = 2017 + 31·2^6 ◗, ◖ 8003 = 1 + 4001·2^1 ◗] ? 8005 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 245 = 165 + 5·2^4 ◗, ◖ 8005 = 165 + 245·2^5 ◗] ---- ? 8009 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 3969 = -63 + 63·2^6 ◗, ◖ 505 = 1 + 63·2^3 ◗, ◖ 8009 = 3969 + 505·2^3 ◗] ? 8011 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 1039 = 15 + 1·2^10 ◗, ◖ 1999 = 1039 + 15·2^6 ◗, ◖ 8011 = 15 + 1999·2^2 ◗] ? 8013 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 381 = -3 + 3·2^7 ◗, ◖ 477 = 381 + 3·2^5 ◗, ◖ 8013 = 381 + 477·2^4 ◗] ? 8015 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 2565 = 5 + 5·2^9 ◗, ◖ 2725 = 2565 + 5·2^5 ◗, ◖ 8015 = 2565 + 2725·2^1 ◗] ? 8017 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 4065 = -31 + 1·2^12 ◗, ◖ 247 = -1 + 31·2^3 ◗, ◖ 8017 = 4065 + 247·2^4 ◗] ? 8019 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 1143 = -9 + 9·2^7 ◗, ◖ 1719 = 1143 + 9·2^6 ◗, ◖ 8019 = 1143 + 1719·2^2 ◗] ---- ? 8023 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 231 = 7 + 7·2^5 ◗, ◖ 487 = 231 + 1·2^8 ◗, ◖ 8023 = 231 + 487·2^4 ◗] ? 8025 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 321 = 1 + 5·2^6 ◗, ◖ 963 = 321 + 321·2^1 ◗, ◖ 8025 = 321 + 963·2^3 ◗] ? 8027 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 4091 = -5 + 1·2^12 ◗, ◖ 123 = -5 + 1·2^7 ◗, ◖ 8027 = 4091 + 123·2^5 ◗] ? 8029 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 4065 = -31 + 1·2^12 ◗, ◖ 991 = -1 + 31·2^5 ◗, ◖ 8029 = 4065 + 991·2^2 ◗] ? 8031 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 123 = -1 + 31·2^2 ◗, ◖ 8031 = 4095 + 123·2^5 ◗] ? 8033 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 4065 = -31 + 1·2^12 ◗, ◖ 8033 = 4065 + 31·2^7 ◗] ? 8035 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 2017 = -31 + 1·2^11 ◗, ◖ 3009 = 2017 + 31·2^5 ◗, ◖ 8035 = 2017 + 3009·2^1 ◗] ? 8037 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 4101 = 5 + 1·2^12 ◗, ◖ 123 = -5 + 1·2^7 ◗, ◖ 8037 = 4101 + 123·2^5 ◗] ? 8039 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4087 = -9 + 1·2^12 ◗, ◖ 247 = -9 + 1·2^8 ◗, ◖ 8039 = 4087 + 247·2^4 ◗] ? 8041 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 4081 = -15 + 1·2^12 ◗, ◖ 495 = 15 + 15·2^5 ◗, ◖ 8041 = 4081 + 495·2^3 ◗] ? 8043 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 383 = -1 + 3·2^7 ◗, ◖ 1915 = 383 + 383·2^2 ◗, ◖ 8043 = 383 + 1915·2^2 ◗] ? 8045 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 325 = 5 + 5·2^6 ◗, ◖ 965 = 325 + 5·2^7 ◗, ◖ 8045 = 325 + 965·2^3 ◗] ? 8047 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 247 = -1 + 31·2^3 ◗, ◖ 8047 = 4095 + 247·2^4 ◗] ? 8049 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 247 = -1 + 31·2^3 ◗, ◖ 8049 = 4097 + 247·2^4 ◗] ---- ? 8055 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 495 = -1 + 31·2^4 ◗, ◖ 8055 = 4095 + 495·2^3 ◗] ? 8057 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 495 = -1 + 31·2^4 ◗, ◖ 8057 = 4097 + 495·2^3 ◗] ? 8059 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 991 = -1 + 31·2^5 ◗, ◖ 8059 = 4095 + 991·2^2 ◗] ? 8061 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 959 = -65 + 1·2^10 ◗, ◖ 1999 = 959 + 65·2^4 ◗, ◖ 8061 = 65 + 1999·2^2 ◗] ? 8063 /3/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 8063 = 4095 + 31·2^7 ◗] ? 8065 /3/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 8065 = 4097 + 31·2^7 ◗] ? 8067 /4/ [◖ 1 ◗, ◖ 2049 = 1 + 1·2^11 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 3009 = 2049 + 15·2^6 ◗, ◖ 8067 = 2049 + 3009·2^1 ◗] ? 8069 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 993 = 1 + 31·2^5 ◗, ◖ 8069 = 4097 + 993·2^2 ◗] ? 8071 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 497 = 1 + 31·2^4 ◗, ◖ 8071 = 4095 + 497·2^3 ◗] ? 8073 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 497 = 1 + 31·2^4 ◗, ◖ 8073 = 4097 + 497·2^3 ◗] ? 8075 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 51 = 17 + 17·2^1 ◗, ◖ 1615 = -17 + 51·2^5 ◗, ◖ 8075 = 1615 + 1615·2^2 ◗] ---- ? 8079 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 249 = 1 + 31·2^3 ◗, ◖ 8079 = 4095 + 249·2^4 ◗] ? 8081 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 249 = 1 + 31·2^3 ◗, ◖ 8081 = 4097 + 249·2^4 ◗] ---- ? 8085 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 385 = 1 + 3·2^7 ◗, ◖ 1925 = 385 + 385·2^2 ◗, ◖ 8085 = 385 + 1925·2^2 ◗] ? 8087 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 4103 = 7 + 1·2^12 ◗, ◖ 249 = -7 + 1·2^8 ◗, ◖ 8087 = 4103 + 249·2^4 ◗] ? 8089 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 4129 = 33 + 1·2^12 ◗, ◖ 495 = -33 + 33·2^4 ◗, ◖ 8089 = 4129 + 495·2^3 ◗] ? 8091 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 1161 = 9 + 9·2^7 ◗, ◖ 3465 = 1161 + 9·2^8 ◗, ◖ 8091 = 1161 + 3465·2^1 ◗] ? 8093 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 2015 = -1 + 63·2^5 ◗, ◖ 3039 = 2015 + 1·2^10 ◗, ◖ 8093 = 2015 + 3039·2^1 ◗] ? 8095 /3/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 4127 = 31 + 1·2^12 ◗, ◖ 8095 = 4127 + 31·2^7 ◗] ? 8097 /4/ [◖ 1 ◗, ◖ 2049 = 1 + 1·2^11 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 189 = -3 + 3·2^6 ◗, ◖ 8097 = 2049 + 189·2^5 ◗] ? 8099 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 2017 = 1 + 63·2^5 ◗, ◖ 3041 = 2017 + 1·2^10 ◗, ◖ 8099 = 2017 + 3041·2^1 ◗] ---- ? 8103 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 4127 = 31 + 1·2^12 ◗, ◖ 497 = 1 + 31·2^4 ◗, ◖ 8103 = 4127 + 497·2^3 ◗] ---- ? 8107 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 4091 = -5 + 1·2^12 ◗, ◖ 251 = -5 + 1·2^8 ◗, ◖ 8107 = 4091 + 251·2^4 ◗] ? 8109 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 1161 = 9 + 9·2^7 ◗, ◖ 1737 = 1161 + 9·2^6 ◗, ◖ 8109 = 1161 + 1737·2^2 ◗] ? 8111 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 251 = -1 + 63·2^2 ◗, ◖ 8111 = 4095 + 251·2^4 ◗] ? 8113 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 251 = -1 + 63·2^2 ◗, ◖ 8113 = 4097 + 251·2^4 ◗] ? 8115 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 387 = 3 + 3·2^7 ◗, ◖ 483 = 387 + 3·2^5 ◗, ◖ 8115 = 387 + 483·2^4 ◗] ? 8117 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 4101 = 5 + 1·2^12 ◗, ◖ 251 = -5 + 1·2^8 ◗, ◖ 8117 = 4101 + 251·2^4 ◗] ? 8119 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 503 = -1 + 63·2^3 ◗, ◖ 8119 = 4095 + 503·2^3 ◗] ? 8121 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 503 = -1 + 63·2^3 ◗, ◖ 8121 = 4097 + 503·2^3 ◗] ? 8123 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 1007 = -1 + 63·2^4 ◗, ◖ 8123 = 4095 + 1007·2^2 ◗] ? 8125 /4/ [◖ 1 ◗, ◖ 2047 = -1 + 1·2^11 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 3039 = 2047 + 31·2^5 ◗, ◖ 8125 = 2047 + 3039·2^1 ◗] ? 8127 /3/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 8127 = 4095 + 63·2^6 ◗] ? 8129 /3/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 8129 = 4097 + 63·2^6 ◗] ? 8131 /4/ [◖ 1 ◗, ◖ 2049 = 1 + 1·2^11 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 3041 = 2049 + 31·2^5 ◗, ◖ 8131 = 2049 + 3041·2^1 ◗] ? 8133 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 1009 = 1 + 63·2^4 ◗, ◖ 8133 = 4097 + 1009·2^2 ◗] ? 8135 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 505 = 1 + 63·2^3 ◗, ◖ 8135 = 4095 + 505·2^3 ◗] ? 8137 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 505 = 1 + 63·2^3 ◗, ◖ 8137 = 4097 + 505·2^3 ◗] ---- ? 8141 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 2031 = -1 + 127·2^4 ◗, ◖ 3055 = 2031 + 1·2^10 ◗, ◖ 8141 = 2031 + 3055·2^1 ◗] ? 8143 /4/ [◖ 1 ◗, ◖ 2047 = -1 + 1·2^11 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 381 = -3 + 3·2^7 ◗, ◖ 8143 = 2047 + 381·2^4 ◗] ? 8145 /4/ [◖ 1 ◗, ◖ 2049 = 1 + 1·2^11 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 381 = -3 + 3·2^7 ◗, ◖ 8145 = 2049 + 381·2^4 ◗] ? 8147 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 2033 = 1 + 127·2^4 ◗, ◖ 3057 = 2033 + 1·2^10 ◗, ◖ 8147 = 2033 + 3057·2^1 ◗] ---- ? 8151 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 507 = -1 + 127·2^2 ◗, ◖ 8151 = 4095 + 507·2^3 ◗] ? 8153 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 507 = -1 + 127·2^2 ◗, ◖ 8153 = 4097 + 507·2^3 ◗] ? 8155 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 1015 = -1 + 127·2^3 ◗, ◖ 8155 = 4095 + 1015·2^2 ◗] ? 8157 /4/ [◖ 1 ◗, ◖ 2047 = -1 + 1·2^11 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 3055 = 2047 + 63·2^4 ◗, ◖ 8157 = 2047 + 3055·2^1 ◗] ? 8159 /3/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 8159 = 4095 + 127·2^5 ◗] ? 8161 /3/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 8161 = 4097 + 127·2^5 ◗] ? 8163 /4/ [◖ 1 ◗, ◖ 2049 = 1 + 1·2^11 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 3057 = 2049 + 63·2^4 ◗, ◖ 8163 = 2049 + 3057·2^1 ◗] ? 8165 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 1017 = 1 + 127·2^3 ◗, ◖ 8165 = 4097 + 1017·2^2 ◗] ? 8167 /4/ [◖ 1 ◗, ◖ 2047 = -1 + 1·2^11 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 765 = -3 + 3·2^8 ◗, ◖ 8167 = 2047 + 765·2^3 ◗] ? 8169 /4/ [◖ 1 ◗, ◖ 2049 = 1 + 1·2^11 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 765 = -3 + 3·2^8 ◗, ◖ 8169 = 2049 + 765·2^3 ◗] ? 8171 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 1019 = -1 + 255·2^2 ◗, ◖ 8171 = 4095 + 1019·2^2 ◗] ? 8173 /4/ [◖ 1 ◗, ◖ 2047 = -1 + 1·2^11 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 3063 = 2047 + 127·2^3 ◗, ◖ 8173 = 2047 + 3063·2^1 ◗] ? 8175 /3/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 8175 = 4095 + 255·2^4 ◗] ? 8177 /3/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 8177 = 4097 + 255·2^4 ◗] ? 8179 /4/ [◖ 1 ◗, ◖ 511 = -1 + 1·2^9 ◗, ◖ 639 = 511 + 1·2^7 ◗, ◖ 1917 = 639 + 639·2^1 ◗, ◖ 8179 = 511 + 1917·2^2 ◗] ? 8181 /4/ [◖ 1 ◗, ◖ 511 = -1 + 1·2^9 ◗, ◖ 767 = 511 + 1·2^8 ◗, ◖ 3835 = 767 + 767·2^2 ◗, ◖ 8181 = 511 + 3835·2^1 ◗] ? 8183 /3/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 511 = -1 + 1·2^9 ◗, ◖ 8183 = 4095 + 511·2^3 ◗] ? 8185 /3/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 511 = -1 + 1·2^9 ◗, ◖ 8185 = 4097 + 511·2^3 ◗] ? 8187 /3/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 1023 = -1 + 1·2^10 ◗, ◖ 8187 = 4095 + 1023·2^2 ◗] ? 8189 /3/ [◖ 1 ◗, ◖ 2047 = -1 + 1·2^11 ◗, ◖ 3071 = 2047 + 1·2^10 ◗, ◖ 8189 = 2047 + 3071·2^1 ◗] ? 8191 /2/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 8191 = 4095 + 1·2^12 ◗] ? 8193 /2/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 8193 = 4097 + 1·2^12 ◗] ? 8195 /3/ [◖ 1 ◗, ◖ 2049 = 1 + 1·2^11 ◗, ◖ 3073 = 2049 + 1·2^10 ◗, ◖ 8195 = 2049 + 3073·2^1 ◗] ? 8197 /3/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 1025 = 1 + 1·2^10 ◗, ◖ 8197 = 4097 + 1025·2^2 ◗] ? 8199 /3/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 513 = 1 + 1·2^9 ◗, ◖ 8199 = 4095 + 513·2^3 ◗] ? 8201 /3/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 513 = 1 + 1·2^9 ◗, ◖ 8201 = 4097 + 513·2^3 ◗] ? 8203 /4/ [◖ 1 ◗, ◖ 513 = 1 + 1·2^9 ◗, ◖ 769 = 513 + 1·2^8 ◗, ◖ 3845 = 769 + 769·2^2 ◗, ◖ 8203 = 513 + 3845·2^1 ◗] ? 8205 /4/ [◖ 1 ◗, ◖ 513 = 1 + 1·2^9 ◗, ◖ 641 = 513 + 1·2^7 ◗, ◖ 1923 = 641 + 641·2^1 ◗, ◖ 8205 = 513 + 1923·2^2 ◗] ? 8207 /3/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 8207 = 4095 + 257·2^4 ◗] ? 8209 /3/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 8209 = 4097 + 257·2^4 ◗] ? 8211 /4/ [◖ 1 ◗, ◖ 2049 = 1 + 1·2^11 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 3081 = 2049 + 129·2^3 ◗, ◖ 8211 = 2049 + 3081·2^1 ◗] ? 8213 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 1029 = 1 + 257·2^2 ◗, ◖ 8213 = 4097 + 1029·2^2 ◗] ? 8215 /4/ [◖ 1 ◗, ◖ 2047 = -1 + 1·2^11 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 771 = 3 + 3·2^8 ◗, ◖ 8215 = 2047 + 771·2^3 ◗] ? 8217 /4/ [◖ 1 ◗, ◖ 2049 = 1 + 1·2^11 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 771 = 3 + 3·2^8 ◗, ◖ 8217 = 2049 + 771·2^3 ◗] ? 8219 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 1031 = -1 + 129·2^3 ◗, ◖ 8219 = 4095 + 1031·2^2 ◗] ? 8221 /4/ [◖ 1 ◗, ◖ 2047 = -1 + 1·2^11 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 3087 = 2047 + 65·2^4 ◗, ◖ 8221 = 2047 + 3087·2^1 ◗] ? 8223 /3/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 8223 = 4095 + 129·2^5 ◗] ? 8225 /3/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 8225 = 4097 + 129·2^5 ◗] ? 8227 /4/ [◖ 1 ◗, ◖ 2049 = 1 + 1·2^11 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 3089 = 2049 + 65·2^4 ◗, ◖ 8227 = 2049 + 3089·2^1 ◗] ? 8229 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 1033 = 1 + 129·2^3 ◗, ◖ 8229 = 4097 + 1033·2^2 ◗] ? 8231 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 517 = 1 + 129·2^2 ◗, ◖ 8231 = 4095 + 517·2^3 ◗] ? 8233 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 517 = 1 + 129·2^2 ◗, ◖ 8233 = 4097 + 517·2^3 ◗] ---- ? 8237 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 2063 = -1 + 129·2^4 ◗, ◖ 3087 = 2063 + 1·2^10 ◗, ◖ 8237 = 2063 + 3087·2^1 ◗] ? 8239 /4/ [◖ 1 ◗, ◖ 2047 = -1 + 1·2^11 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 387 = 3 + 3·2^7 ◗, ◖ 8239 = 2047 + 387·2^4 ◗] ? 8241 /4/ [◖ 1 ◗, ◖ 2049 = 1 + 1·2^11 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 387 = 3 + 3·2^7 ◗, ◖ 8241 = 2049 + 387·2^4 ◗] ? 8243 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 2065 = 1 + 129·2^4 ◗, ◖ 3089 = 2065 + 1·2^10 ◗, ◖ 8243 = 2065 + 3089·2^1 ◗] ? 8245 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 51 = 17 + 17·2^1 ◗, ◖ 1649 = 17 + 51·2^5 ◗, ◖ 8245 = 1649 + 1649·2^2 ◗] ? 8247 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 519 = -1 + 65·2^3 ◗, ◖ 8247 = 4095 + 519·2^3 ◗] ? 8249 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 519 = -1 + 65·2^3 ◗, ◖ 8249 = 4097 + 519·2^3 ◗] ? 8251 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 1039 = -1 + 65·2^4 ◗, ◖ 8251 = 4095 + 1039·2^2 ◗] ? 8253 /4/ [◖ 1 ◗, ◖ 2047 = -1 + 1·2^11 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 3103 = 2047 + 33·2^5 ◗, ◖ 8253 = 2047 + 3103·2^1 ◗] ? 8255 /3/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 8255 = 4095 + 65·2^6 ◗] ? 8257 /3/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 8257 = 4097 + 65·2^6 ◗] ? 8259 /4/ [◖ 1 ◗, ◖ 2049 = 1 + 1·2^11 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 3105 = 2049 + 33·2^5 ◗, ◖ 8259 = 2049 + 3105·2^1 ◗] ? 8261 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 1041 = 1 + 65·2^4 ◗, ◖ 8261 = 4097 + 1041·2^2 ◗] ? 8263 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 521 = 1 + 65·2^3 ◗, ◖ 8263 = 4095 + 521·2^3 ◗] ? 8265 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 521 = 1 + 65·2^3 ◗, ◖ 8265 = 4097 + 521·2^3 ◗] ? 8267 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 4091 = -5 + 1·2^12 ◗, ◖ 261 = 5 + 1·2^8 ◗, ◖ 8267 = 4091 + 261·2^4 ◗] ? 8269 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 2031 = -17 + 1·2^11 ◗, ◖ 3119 = 2031 + 17·2^6 ◗, ◖ 8269 = 2031 + 3119·2^1 ◗] ? 8271 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 261 = 1 + 65·2^2 ◗, ◖ 8271 = 4095 + 261·2^4 ◗] ? 8273 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 261 = 1 + 65·2^2 ◗, ◖ 8273 = 4097 + 261·2^4 ◗] ? 8275 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 635 = -5 + 5·2^7 ◗, ◖ 955 = 635 + 5·2^6 ◗, ◖ 8275 = 635 + 955·2^3 ◗] ? 8277 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 4101 = 5 + 1·2^12 ◗, ◖ 261 = 5 + 1·2^8 ◗, ◖ 8277 = 4101 + 261·2^4 ◗] ? 8279 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 4063 = -33 + 1·2^12 ◗, ◖ 527 = -1 + 33·2^4 ◗, ◖ 8279 = 4063 + 527·2^3 ◗] ? 8281 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 279 = -9 + 9·2^5 ◗, ◖ 535 = 279 + 1·2^8 ◗, ◖ 8281 = -279 + 535·2^4 ◗] ? 8283 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 4063 = -33 + 1·2^12 ◗, ◖ 1055 = -1 + 33·2^5 ◗, ◖ 8283 = 4063 + 1055·2^2 ◗] ? 8285 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 2079 = -1 + 65·2^5 ◗, ◖ 3103 = 2079 + 1·2^10 ◗, ◖ 8285 = 2079 + 3103·2^1 ◗] ? 8287 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 4063 = -33 + 1·2^12 ◗, ◖ 8287 = 4063 + 33·2^7 ◗] ? 8289 /4/ [◖ 1 ◗, ◖ 2049 = 1 + 1·2^11 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 195 = 3 + 3·2^6 ◗, ◖ 8289 = 2049 + 195·2^5 ◗] ? 8291 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 2081 = 1 + 65·2^5 ◗, ◖ 3105 = 2081 + 1·2^10 ◗, ◖ 8291 = 2081 + 3105·2^1 ◗] ---- ? 8295 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 635 = -5 + 5·2^7 ◗, ◖ 1915 = 635 + 5·2^8 ◗, ◖ 8295 = 635 + 1915·2^2 ◗] ? 8297 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 4089 = -7 + 1·2^12 ◗, ◖ 263 = 7 + 1·2^8 ◗, ◖ 8297 = 4089 + 263·2^4 ◗] ? 8299 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 251 = -1 + 63·2^2 ◗, ◖ 4283 = 251 + 63·2^6 ◗, ◖ 8299 = 4283 + 251·2^4 ◗] ---- ? 8303 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 263 = -1 + 33·2^3 ◗, ◖ 8303 = 4095 + 263·2^4 ◗] ? 8305 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 263 = -1 + 33·2^3 ◗, ◖ 8305 = 4097 + 263·2^4 ◗] ? 8307 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 639 = -1 + 5·2^7 ◗, ◖ 1917 = 639 + 639·2^1 ◗, ◖ 8307 = 639 + 1917·2^2 ◗] ---- ? 8311 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 527 = -1 + 33·2^4 ◗, ◖ 8311 = 4095 + 527·2^3 ◗] ? 8313 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 527 = -1 + 33·2^4 ◗, ◖ 8313 = 4097 + 527·2^3 ◗] ? 8315 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 1055 = -1 + 33·2^5 ◗, ◖ 8315 = 4095 + 1055·2^2 ◗] ? 8317 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 1087 = 63 + 1·2^10 ◗, ◖ 2095 = 1087 + 63·2^4 ◗, ◖ 8317 = -63 + 2095·2^2 ◗] ? 8319 /3/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 8319 = 4095 + 33·2^7 ◗] ? 8321 /3/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 8321 = 4097 + 33·2^7 ◗] ? 8323 /4/ [◖ 1 ◗, ◖ 2049 = 1 + 1·2^11 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 3137 = 2049 + 17·2^6 ◗, ◖ 8323 = 2049 + 3137·2^1 ◗] ? 8325 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 1057 = 1 + 33·2^5 ◗, ◖ 8325 = 4097 + 1057·2^2 ◗] ? 8327 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 529 = 1 + 33·2^4 ◗, ◖ 8327 = 4095 + 529·2^3 ◗] ? 8329 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 529 = 1 + 33·2^4 ◗, ◖ 8329 = 4097 + 529·2^3 ◗] ---- ? 8333 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 641 = 1 + 5·2^7 ◗, ◖ 1923 = 641 + 641·2^1 ◗, ◖ 8333 = 641 + 1923·2^2 ◗] ? 8335 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 265 = 1 + 33·2^3 ◗, ◖ 8335 = 4095 + 265·2^4 ◗] ? 8337 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 265 = 1 + 33·2^3 ◗, ◖ 8337 = 4097 + 265·2^4 ◗] ---- ? 8343 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 4127 = 31 + 1·2^12 ◗, ◖ 527 = 31 + 31·2^4 ◗, ◖ 8343 = 4127 + 527·2^3 ◗] ? 8345 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 645 = 5 + 5·2^7 ◗, ◖ 1925 = 645 + 5·2^8 ◗, ◖ 8345 = 645 + 1925·2^2 ◗] ? 8347 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 4091 = -5 + 1·2^12 ◗, ◖ 133 = 5 + 1·2^7 ◗, ◖ 8347 = 4091 + 133·2^5 ◗] ? 8349 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 4129 = 33 + 1·2^12 ◗, ◖ 1055 = -1 + 33·2^5 ◗, ◖ 8349 = 4129 + 1055·2^2 ◗] ? 8351 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 133 = 1 + 33·2^2 ◗, ◖ 8351 = 4095 + 133·2^5 ◗] ? 8353 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 4129 = 33 + 1·2^12 ◗, ◖ 8353 = 4129 + 33·2^7 ◗] ? 8355 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 2081 = 33 + 1·2^11 ◗, ◖ 3137 = 2081 + 33·2^5 ◗, ◖ 8355 = 2081 + 3137·2^1 ◗] ? 8357 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 4101 = 5 + 1·2^12 ◗, ◖ 133 = 5 + 1·2^7 ◗, ◖ 8357 = 4101 + 133·2^5 ◗] ---- ? 8361 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 4129 = 33 + 1·2^12 ◗, ◖ 529 = 1 + 33·2^4 ◗, ◖ 8361 = 4129 + 529·2^3 ◗] ? 8363 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1007 = -17 + 1·2^10 ◗, ◖ 2095 = 1007 + 17·2^6 ◗, ◖ 8363 = -17 + 2095·2^2 ◗] ? 8365 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 645 = 5 + 5·2^7 ◗, ◖ 965 = 645 + 5·2^6 ◗, ◖ 8365 = 645 + 965·2^3 ◗] ? 8367 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4079 = -17 + 1·2^12 ◗, ◖ 67 = -1 + 17·2^2 ◗, ◖ 8367 = 4079 + 67·2^6 ◗] ? 8369 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 4129 = 33 + 1·2^12 ◗, ◖ 265 = 1 + 33·2^3 ◗, ◖ 8369 = 4129 + 265·2^4 ◗] ? 8371 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 2065 = 17 + 1·2^11 ◗, ◖ 3153 = 2065 + 17·2^6 ◗, ◖ 8371 = 2065 + 3153·2^1 ◗] ---- ? 8375 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 137 = 129 + 1·2^3 ◗, ◖ 3991 = -137 + 129·2^5 ◗, ◖ 8375 = 3991 + 137·2^5 ◗] ? 8377 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 4225 = 65 + 65·2^6 ◗, ◖ 519 = -1 + 65·2^3 ◗, ◖ 8377 = 4225 + 519·2^3 ◗] ? 8379 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1007 = -17 + 1·2^10 ◗, ◖ 2095 = 1007 + 17·2^6 ◗, ◖ 8379 = -1 + 2095·2^2 ◗] ? 8381 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1007 = -17 + 1·2^10 ◗, ◖ 2095 = 1007 + 17·2^6 ◗, ◖ 8381 = 1 + 2095·2^2 ◗] ? 8383 /4/ [◖ 1 ◗, ◖ 2047 = -1 + 1·2^11 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 8383 = 2047 + 99·2^6 ◗] ? 8385 /3/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 4225 = 65 + 65·2^6 ◗, ◖ 8385 = 4225 + 65·2^6 ◗] ? 8387 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 2081 = 33 + 1·2^11 ◗, ◖ 4193 = 2081 + 33·2^6 ◗, ◖ 8387 = 1 + 4193·2^1 ◗] ? 8389 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 4225 = 65 + 65·2^6 ◗, ◖ 1041 = 1 + 65·2^4 ◗, ◖ 8389 = 4225 + 1041·2^2 ◗] ---- ? 8393 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 4225 = 65 + 65·2^6 ◗, ◖ 521 = 1 + 65·2^3 ◗, ◖ 8393 = 4225 + 521·2^3 ◗] ---- ? 8397 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1007 = -17 + 1·2^10 ◗, ◖ 2095 = 1007 + 17·2^6 ◗, ◖ 8397 = 17 + 2095·2^2 ◗] ? 8399 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4079 = -17 + 1·2^12 ◗, ◖ 135 = -1 + 17·2^3 ◗, ◖ 8399 = 4079 + 135·2^5 ◗] ? 8401 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4113 = 17 + 1·2^12 ◗, ◖ 67 = -1 + 17·2^2 ◗, ◖ 8401 = 4113 + 67·2^6 ◗] ---- ? 8407 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4087 = -9 + 1·2^12 ◗, ◖ 135 = -9 + 9·2^4 ◗, ◖ 8407 = 4087 + 135·2^5 ◗] ? 8409 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 4089 = -7 + 1·2^12 ◗, ◖ 135 = 7 + 1·2^7 ◗, ◖ 8409 = 4089 + 135·2^5 ◗] ? 8411 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 4191 = -33 + 33·2^7 ◗, ◖ 1055 = -1 + 33·2^5 ◗, ◖ 8411 = 4191 + 1055·2^2 ◗] ? 8413 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 2031 = -17 + 1·2^11 ◗, ◖ 4207 = 2031 + 17·2^7 ◗, ◖ 8413 = -1 + 4207·2^1 ◗] ? 8415 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 4191 = -33 + 33·2^7 ◗, ◖ 8415 = 4191 + 33·2^7 ◗] ? 8417 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 135 = -1 + 17·2^3 ◗, ◖ 8417 = 4097 + 135·2^5 ◗] ? 8419 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 2081 = 33 + 1·2^11 ◗, ◖ 4193 = 2081 + 33·2^6 ◗, ◖ 8419 = 33 + 4193·2^1 ◗] ? 8421 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 765 = -3 + 3·2^8 ◗, ◖ 957 = 765 + 3·2^6 ◗, ◖ 8421 = 765 + 957·2^3 ◗] ? 8423 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 1275 = -5 + 5·2^8 ◗, ◖ 1787 = 1275 + 1·2^9 ◗, ◖ 8423 = 1275 + 1787·2^2 ◗] ? 8425 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4105 = 9 + 1·2^12 ◗, ◖ 135 = -9 + 9·2^4 ◗, ◖ 8425 = 4105 + 135·2^5 ◗] ? 8427 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 765 = -3 + 3·2^8 ◗, ◖ 1149 = 765 + 3·2^7 ◗, ◖ 8427 = -765 + 1149·2^3 ◗] ? 8429 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4079 = -17 + 1·2^12 ◗, ◖ 2175 = -1 + 17·2^7 ◗, ◖ 8429 = 4079 + 2175·2^1 ◗] ? 8431 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4079 = -17 + 1·2^12 ◗, ◖ 8431 = 4079 + 17·2^8 ◗] ? 8433 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 271 = -1 + 17·2^4 ◗, ◖ 8433 = 4097 + 271·2^4 ◗] ? 8435 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4079 = -17 + 1·2^12 ◗, ◖ 1089 = 1 + 17·2^6 ◗, ◖ 8435 = 4079 + 1089·2^2 ◗] ? 8437 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 767 = -1 + 3·2^8 ◗, ◖ 2301 = 767 + 767·2^1 ◗, ◖ 8437 = -767 + 2301·2^2 ◗] ? 8439 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 543 = -1 + 17·2^5 ◗, ◖ 8439 = 4095 + 543·2^3 ◗] ? 8441 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 543 = -1 + 17·2^5 ◗, ◖ 8441 = 4097 + 543·2^3 ◗] ? 8443 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 1087 = 63 + 1·2^10 ◗, ◖ 2095 = 1087 + 63·2^4 ◗, ◖ 8443 = 63 + 2095·2^2 ◗] ? 8445 /4/ [◖ 1 ◗, ◖ 2047 = -1 + 1·2^11 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 3199 = 2047 + 9·2^7 ◗, ◖ 8445 = 2047 + 3199·2^1 ◗] ? 8447 /3/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 8447 = 4095 + 17·2^8 ◗] ? 8449 /3/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 8449 = 4097 + 17·2^8 ◗] ? 8451 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 1089 = 65 + 1·2^10 ◗, ◖ 2129 = 1089 + 65·2^4 ◗, ◖ 8451 = -65 + 2129·2^2 ◗] ? 8453 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1089 = 1 + 17·2^6 ◗, ◖ 8453 = 4097 + 1089·2^2 ◗] ? 8455 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 545 = 1 + 17·2^5 ◗, ◖ 8455 = 4095 + 545·2^3 ◗] ? 8457 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 545 = 1 + 17·2^5 ◗, ◖ 8457 = 4097 + 545·2^3 ◗] ? 8459 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 769 = 1 + 3·2^8 ◗, ◖ 2307 = 769 + 769·2^1 ◗, ◖ 8459 = -769 + 2307·2^2 ◗] ? 8461 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4113 = 17 + 1·2^12 ◗, ◖ 1087 = -1 + 17·2^6 ◗, ◖ 8461 = 4113 + 1087·2^2 ◗] ? 8463 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 273 = 1 + 17·2^4 ◗, ◖ 8463 = 4095 + 273·2^4 ◗] ? 8465 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4113 = 17 + 1·2^12 ◗, ◖ 8465 = 4113 + 17·2^8 ◗] ? 8467 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4113 = 17 + 1·2^12 ◗, ◖ 2177 = 1 + 17·2^7 ◗, ◖ 8467 = 4113 + 2177·2^1 ◗] ? 8469 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 771 = 3 + 3·2^8 ◗, ◖ 1155 = 771 + 3·2^7 ◗, ◖ 8469 = -771 + 1155·2^3 ◗] ? 8471 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4087 = -9 + 1·2^12 ◗, ◖ 137 = 9 + 1·2^7 ◗, ◖ 8471 = 4087 + 137·2^5 ◗] ? 8473 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 1285 = 5 + 5·2^8 ◗, ◖ 1797 = 1285 + 1·2^9 ◗, ◖ 8473 = 1285 + 1797·2^2 ◗] ? 8475 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 771 = 3 + 3·2^8 ◗, ◖ 963 = 771 + 3·2^6 ◗, ◖ 8475 = 771 + 963·2^3 ◗] ? 8477 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 4257 = 33 + 33·2^7 ◗, ◖ 1055 = -1 + 33·2^5 ◗, ◖ 8477 = 4257 + 1055·2^2 ◗] ? 8479 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 137 = 1 + 17·2^3 ◗, ◖ 8479 = 4095 + 137·2^5 ◗] ? 8481 /3/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 4257 = 33 + 33·2^7 ◗, ◖ 8481 = 4257 + 33·2^7 ◗] ? 8483 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 2065 = 17 + 1·2^11 ◗, ◖ 4241 = 2065 + 17·2^7 ◗, ◖ 8483 = 1 + 4241·2^1 ◗] ? 8485 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 4129 = 33 + 1·2^12 ◗, ◖ 1089 = 33 + 33·2^5 ◗, ◖ 8485 = 4129 + 1089·2^2 ◗] ---- ? 8489 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4105 = 9 + 1·2^12 ◗, ◖ 137 = 9 + 1·2^7 ◗, ◖ 8489 = 4105 + 137·2^5 ◗] ---- ? 8495 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4079 = -17 + 1·2^12 ◗, ◖ 69 = 1 + 17·2^2 ◗, ◖ 8495 = 4079 + 69·2^6 ◗] ? 8497 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4113 = 17 + 1·2^12 ◗, ◖ 137 = 1 + 17·2^3 ◗, ◖ 8497 = 4113 + 137·2^5 ◗] ? 8499 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1041 = 17 + 1·2^10 ◗, ◖ 2129 = 1041 + 17·2^6 ◗, ◖ 8499 = -17 + 2129·2^2 ◗] ---- ? 8505 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 3969 = -63 + 63·2^6 ◗, ◖ 567 = 63 + 63·2^3 ◗, ◖ 8505 = 3969 + 567·2^3 ◗] ? 8507 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 4091 = -5 + 1·2^12 ◗, ◖ 69 = 5 + 1·2^6 ◗, ◖ 8507 = 4091 + 69·2^6 ◗] ? 8509 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 2159 = 127 + 127·2^4 ◗, ◖ 3175 = 2159 + 127·2^3 ◗, ◖ 8509 = 2159 + 3175·2^1 ◗] ? 8511 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 69 = 1 + 17·2^2 ◗, ◖ 8511 = 4095 + 69·2^6 ◗] ? 8513 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 69 = 1 + 17·2^2 ◗, ◖ 8513 = 4097 + 69·2^6 ◗] ? 8515 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1041 = 17 + 1·2^10 ◗, ◖ 2129 = 1041 + 17·2^6 ◗, ◖ 8515 = -1 + 2129·2^2 ◗] ? 8517 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1041 = 17 + 1·2^10 ◗, ◖ 2129 = 1041 + 17·2^6 ◗, ◖ 8517 = 1 + 2129·2^2 ◗] ? 8519 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 135 = 127 + 1·2^3 ◗, ◖ 4199 = 135 + 127·2^5 ◗, ◖ 8519 = 4199 + 135·2^5 ◗] ---- ? 8525 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 2159 = -17 + 17·2^7 ◗, ◖ 3183 = 2159 + 1·2^10 ◗, ◖ 8525 = 2159 + 3183·2^1 ◗] ---- ? 8529 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 287 = 31 + 1·2^8 ◗, ◖ 535 = 287 + 31·2^3 ◗, ◖ 8529 = -31 + 535·2^4 ◗] ? 8531 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 259 = 1 + 129·2^1 ◗, ◖ 4387 = 259 + 129·2^5 ◗, ◖ 8531 = 4387 + 259·2^4 ◗] ? 8533 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1041 = 17 + 1·2^10 ◗, ◖ 2129 = 1041 + 17·2^6 ◗, ◖ 8533 = 17 + 2129·2^2 ◗] ? 8535 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 119 = -9 + 1·2^7 ◗, ◖ 4727 = 119 + 9·2^9 ◗, ◖ 8535 = 4727 + 119·2^5 ◗] ? 8537 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 639 = 127 + 1·2^9 ◗, ◖ 1147 = 639 + 127·2^2 ◗, ◖ 8537 = -639 + 1147·2^3 ◗] ---- ? 8541 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 1151 = 127 + 1·2^10 ◗, ◖ 2167 = 1151 + 127·2^3 ◗, ◖ 8541 = -127 + 2167·2^2 ◗] ? 8543 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 4063 = -33 + 1·2^12 ◗, ◖ 35 = 33 + 1·2^1 ◗, ◖ 8543 = 4063 + 35·2^7 ◗] ? 8545 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 4257 = 33 + 33·2^7 ◗, ◖ 67 = 1 + 33·2^1 ◗, ◖ 8545 = 4257 + 67·2^6 ◗] ? 8547 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 2145 = 33 + 33·2^6 ◗, ◖ 3201 = 2145 + 33·2^5 ◗, ◖ 8547 = 2145 + 3201·2^1 ◗] ? 8549 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 897 = -127 + 1·2^10 ◗, ◖ 1913 = 897 + 127·2^3 ◗, ◖ 8549 = 897 + 1913·2^2 ◗] ? 8551 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 247 = -9 + 1·2^8 ◗, ◖ 535 = 247 + 9·2^5 ◗, ◖ 8551 = -9 + 535·2^4 ◗] ---- ? 8557 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 2175 = 127 + 1·2^11 ◗, ◖ 3191 = 2175 + 127·2^3 ◗, ◖ 8557 = 2175 + 3191·2^1 ◗] ? 8559 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 247 = -9 + 1·2^8 ◗, ◖ 535 = 247 + 9·2^5 ◗, ◖ 8559 = -1 + 535·2^4 ◗] ? 8561 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 247 = -9 + 1·2^8 ◗, ◖ 535 = 247 + 9·2^5 ◗, ◖ 8561 = 1 + 535·2^4 ◗] ? 8563 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 259 = -1 + 65·2^2 ◗, ◖ 4419 = 259 + 65·2^6 ◗, ◖ 8563 = 4419 + 259·2^4 ◗] ? 8565 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 251 = -5 + 1·2^8 ◗, ◖ 571 = 251 + 5·2^6 ◗, ◖ 8565 = -571 + 571·2^4 ◗] ? 8567 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 529 = 17 + 1·2^9 ◗, ◖ 1073 = 529 + 17·2^5 ◗, ◖ 8567 = -17 + 1073·2^3 ◗] ? 8569 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 247 = -9 + 1·2^8 ◗, ◖ 535 = 247 + 9·2^5 ◗, ◖ 8569 = 9 + 535·2^4 ◗] ? 8571 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 4091 = -5 + 1·2^12 ◗, ◖ 35 = -5 + 5·2^3 ◗, ◖ 8571 = 4091 + 35·2^7 ◗] ? 8573 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 2175 = -1 + 17·2^7 ◗, ◖ 3199 = 2175 + 1·2^10 ◗, ◖ 8573 = 2175 + 3199·2^1 ◗] ? 8575 /4/ [◖ 1 ◗, ◖ 2047 = -1 + 1·2^11 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 8575 = 2047 + 51·2^7 ◗] ? 8577 /4/ [◖ 1 ◗, ◖ 2049 = 1 + 1·2^11 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 8577 = 2049 + 51·2^7 ◗] ? 8579 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 2177 = 1 + 17·2^7 ◗, ◖ 3201 = 2177 + 1·2^10 ◗, ◖ 8579 = 2177 + 3201·2^1 ◗] ? 8581 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 1089 = 65 + 1·2^10 ◗, ◖ 2129 = 1089 + 65·2^4 ◗, ◖ 8581 = 65 + 2129·2^2 ◗] ? 8583 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 529 = 17 + 1·2^9 ◗, ◖ 1073 = 529 + 17·2^5 ◗, ◖ 8583 = -1 + 1073·2^3 ◗] ? 8585 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 529 = 17 + 1·2^9 ◗, ◖ 1073 = 529 + 17·2^5 ◗, ◖ 8585 = 1 + 1073·2^3 ◗] ---- ? 8591 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 287 = 31 + 1·2^8 ◗, ◖ 535 = 287 + 31·2^3 ◗, ◖ 8591 = 31 + 535·2^4 ◗] ? 8593 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 2065 = 17 + 1·2^11 ◗, ◖ 51 = 17 + 17·2^1 ◗, ◖ 8593 = 2065 + 51·2^7 ◗] ? 8595 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 2177 = 129 + 1·2^11 ◗, ◖ 3209 = 2177 + 129·2^3 ◗, ◖ 8595 = 2177 + 3209·2^1 ◗] ? 8597 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 261 = 1 + 65·2^2 ◗, ◖ 4421 = 261 + 65·2^6 ◗, ◖ 8597 = 4421 + 261·2^4 ◗] ? 8599 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 137 = 1 + 17·2^3 ◗, ◖ 4215 = -137 + 17·2^8 ◗, ◖ 8599 = 4215 + 137·2^5 ◗] ? 8601 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 529 = 17 + 1·2^9 ◗, ◖ 1073 = 529 + 17·2^5 ◗, ◖ 8601 = 17 + 1073·2^3 ◗] ? 8603 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 895 = -129 + 1·2^10 ◗, ◖ 1927 = 895 + 129·2^3 ◗, ◖ 8603 = 895 + 1927·2^2 ◗] ---- ? 8607 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 4127 = 31 + 1·2^12 ◗, ◖ 35 = 31 + 1·2^2 ◗, ◖ 8607 = 4127 + 35·2^7 ◗] ? 8609 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 4129 = 33 + 1·2^12 ◗, ◖ 35 = 33 + 1·2^1 ◗, ◖ 8609 = 4129 + 35·2^7 ◗] ? 8611 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 1153 = 129 + 1·2^10 ◗, ◖ 2185 = 1153 + 129·2^3 ◗, ◖ 8611 = -129 + 2185·2^2 ◗] ? 8613 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 4257 = 33 + 33·2^7 ◗, ◖ 1089 = 33 + 33·2^5 ◗, ◖ 8613 = 4257 + 1089·2^2 ◗] ? 8615 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 641 = 129 + 1·2^9 ◗, ◖ 1157 = 641 + 129·2^2 ◗, ◖ 8615 = -641 + 1157·2^3 ◗] ? 8617 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 545 = 33 + 1·2^9 ◗, ◖ 1073 = 545 + 33·2^4 ◗, ◖ 8617 = 33 + 1073·2^3 ◗] ? 8619 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4335 = -17 + 17·2^8 ◗, ◖ 1071 = -17 + 17·2^6 ◗, ◖ 8619 = 4335 + 1071·2^2 ◗] ---- ? 8623 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 503 = -9 + 1·2^9 ◗, ◖ 1079 = 503 + 9·2^6 ◗, ◖ 8623 = -9 + 1079·2^3 ◗] ? 8625 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 3825 = -15 + 15·2^8 ◗, ◖ 75 = 15 + 15·2^2 ◗, ◖ 8625 = 3825 + 75·2^6 ◗] ? 8627 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 2193 = 17 + 17·2^7 ◗, ◖ 3217 = 2193 + 1·2^10 ◗, ◖ 8627 = 2193 + 3217·2^1 ◗] ---- ? 8631 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 503 = -9 + 1·2^9 ◗, ◖ 1079 = 503 + 9·2^6 ◗, ◖ 8631 = -1 + 1079·2^3 ◗] ? 8633 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 503 = -9 + 1·2^9 ◗, ◖ 1079 = 503 + 9·2^6 ◗, ◖ 8633 = 1 + 1079·2^3 ◗] ? 8635 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4351 = -1 + 17·2^8 ◗, ◖ 1071 = -17 + 17·2^6 ◗, ◖ 8635 = 4351 + 1071·2^2 ◗] ? 8637 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4353 = 1 + 17·2^8 ◗, ◖ 1071 = -17 + 17·2^6 ◗, ◖ 8637 = 4353 + 1071·2^2 ◗] ? 8639 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 71 = -1 + 9·2^3 ◗, ◖ 8639 = 4095 + 71·2^6 ◗] ? 8641 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 503 = -9 + 1·2^9 ◗, ◖ 1079 = 503 + 9·2^6 ◗, ◖ 8641 = 9 + 1079·2^3 ◗] ? 8643 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 2193 = 129 + 129·2^4 ◗, ◖ 3225 = 2193 + 129·2^3 ◗, ◖ 8643 = 2193 + 3225·2^1 ◗] ? 8645 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 4225 = 65 + 65·2^6 ◗, ◖ 1105 = 65 + 65·2^4 ◗, ◖ 8645 = 4225 + 1105·2^2 ◗] ? 8647 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 4103 = 7 + 1·2^12 ◗, ◖ 71 = 7 + 1·2^6 ◗, ◖ 8647 = 4103 + 71·2^6 ◗] ? 8649 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4105 = 9 + 1·2^12 ◗, ◖ 71 = -1 + 9·2^3 ◗, ◖ 8649 = 4105 + 71·2^6 ◗] ? 8651 /4/ [◖ 1 ◗, ◖ 511 = -1 + 1·2^9 ◗, ◖ 507 = 511 - 1·2^2 ◗, ◖ 4595 = 507 + 511·2^3 ◗, ◖ 8651 = 4595 + 507·2^3 ◗] ? 8653 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 2159 = -17 + 17·2^7 ◗, ◖ 3247 = 2159 + 17·2^6 ◗, ◖ 8653 = 2159 + 3247·2^1 ◗] ? 8655 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4335 = -17 + 17·2^8 ◗, ◖ 135 = -1 + 17·2^3 ◗, ◖ 8655 = 4335 + 135·2^5 ◗] ? 8657 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4369 = 17 + 17·2^8 ◗, ◖ 67 = -1 + 17·2^2 ◗, ◖ 8657 = 4369 + 67·2^6 ◗] ? 8659 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 1015 = -9 + 1·2^10 ◗, ◖ 2167 = 1015 + 9·2^7 ◗, ◖ 8659 = -9 + 2167·2^2 ◗] ? 8661 /4/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 509 = -1 + 255·2^1 ◗, ◖ 4589 = 509 + 255·2^4 ◗, ◖ 8661 = 4589 + 509·2^3 ◗] ? 8663 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4087 = -9 + 1·2^12 ◗, ◖ 143 = -1 + 9·2^4 ◗, ◖ 8663 = 4087 + 143·2^5 ◗] ---- ? 8667 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 1015 = -9 + 1·2^10 ◗, ◖ 2167 = 1015 + 9·2^7 ◗, ◖ 8667 = -1 + 2167·2^2 ◗] ? 8669 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 1015 = -9 + 1·2^10 ◗, ◖ 2167 = 1015 + 9·2^7 ◗, ◖ 8669 = 1 + 2167·2^2 ◗] ? 8671 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 143 = -1 + 9·2^4 ◗, ◖ 8671 = 4095 + 143·2^5 ◗] ? 8673 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 143 = -1 + 9·2^4 ◗, ◖ 8673 = 4097 + 143·2^5 ◗] ---- ? 8677 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 1015 = -9 + 1·2^10 ◗, ◖ 2167 = 1015 + 9·2^7 ◗, ◖ 8677 = 9 + 2167·2^2 ◗] ? 8679 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4087 = -9 + 1·2^12 ◗, ◖ 287 = -1 + 9·2^5 ◗, ◖ 8679 = 4087 + 287·2^4 ◗] ? 8681 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4105 = 9 + 1·2^12 ◗, ◖ 143 = -1 + 9·2^4 ◗, ◖ 8681 = 4105 + 143·2^5 ◗] ? 8683 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4335 = -17 + 17·2^8 ◗, ◖ 1087 = -1 + 17·2^6 ◗, ◖ 8683 = 4335 + 1087·2^2 ◗] ? 8685 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 2039 = -9 + 1·2^11 ◗, ◖ 4343 = 2039 + 9·2^8 ◗, ◖ 8685 = -1 + 4343·2^1 ◗] ? 8687 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4335 = -17 + 17·2^8 ◗, ◖ 8687 = 4335 + 17·2^8 ◗] ? 8689 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 287 = -1 + 9·2^5 ◗, ◖ 8689 = 4097 + 287·2^4 ◗] ? 8691 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4087 = -9 + 1·2^12 ◗, ◖ 1151 = -1 + 9·2^7 ◗, ◖ 8691 = 4087 + 1151·2^2 ◗] ? 8693 /4/ [◖ 1 ◗, ◖ 511 = -1 + 1·2^9 ◗, ◖ 767 = 511 + 1·2^8 ◗, ◖ 2301 = 767 + 767·2^1 ◗, ◖ 8693 = -511 + 2301·2^2 ◗] ? 8695 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4087 = -9 + 1·2^12 ◗, ◖ 8695 = 4087 + 9·2^9 ◗] ? 8697 /4/ [◖ 1 ◗, ◖ 1023 = -1 + 1·2^10 ◗, ◖ 1279 = 1023 + 1·2^8 ◗, ◖ 3837 = 1279 + 1279·2^1 ◗, ◖ 8697 = 1023 + 3837·2^1 ◗] ? 8699 /4/ [◖ 1 ◗, ◖ 511 = -1 + 1·2^9 ◗, ◖ 1535 = 511 + 1·2^10 ◗, ◖ 4605 = 1535 + 1535·2^1 ◗, ◖ 8699 = -511 + 4605·2^1 ◗] ? 8701 /4/ [◖ 1 ◗, ◖ 2047 = -1 + 1·2^11 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 3327 = 2047 + 5·2^8 ◗, ◖ 8701 = 2047 + 3327·2^1 ◗] ? 8703 /3/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 8703 = 4095 + 9·2^9 ◗] ? 8705 /3/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 8705 = 4097 + 9·2^9 ◗] ? 8707 /4/ [◖ 1 ◗, ◖ 2049 = 1 + 1·2^11 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 3329 = 2049 + 5·2^8 ◗, ◖ 8707 = 2049 + 3329·2^1 ◗] ? 8709 /4/ [◖ 1 ◗, ◖ 513 = 1 + 1·2^9 ◗, ◖ 1537 = 513 + 1·2^10 ◗, ◖ 4611 = 1537 + 1537·2^1 ◗, ◖ 8709 = -513 + 4611·2^1 ◗] ? 8711 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 577 = 65 + 1·2^9 ◗, ◖ 1097 = 577 + 65·2^3 ◗, ◖ 8711 = -65 + 1097·2^3 ◗] ? 8713 /3/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4105 = 9 + 1·2^12 ◗, ◖ 8713 = 4105 + 9·2^9 ◗] ? 8715 /4/ [◖ 1 ◗, ◖ 513 = 1 + 1·2^9 ◗, ◖ 769 = 513 + 1·2^8 ◗, ◖ 2307 = 769 + 769·2^1 ◗, ◖ 8715 = -513 + 2307·2^2 ◗] ? 8717 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4105 = 9 + 1·2^12 ◗, ◖ 1153 = 1 + 9·2^7 ◗, ◖ 8717 = 4105 + 1153·2^2 ◗] ? 8719 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 289 = 1 + 9·2^5 ◗, ◖ 8719 = 4095 + 289·2^4 ◗] ? 8721 /3/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4369 = 17 + 17·2^8 ◗, ◖ 8721 = 4369 + 17·2^8 ◗] ? 8723 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 2057 = 9 + 1·2^11 ◗, ◖ 4361 = 2057 + 9·2^8 ◗, ◖ 8723 = 1 + 4361·2^1 ◗] ? 8725 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4369 = 17 + 17·2^8 ◗, ◖ 1089 = 1 + 17·2^6 ◗, ◖ 8725 = 4369 + 1089·2^2 ◗] ? 8727 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4087 = -9 + 1·2^12 ◗, ◖ 145 = 1 + 9·2^4 ◗, ◖ 8727 = 4087 + 145·2^5 ◗] ? 8729 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4105 = 9 + 1·2^12 ◗, ◖ 289 = 1 + 9·2^5 ◗, ◖ 8729 = 4105 + 289·2^4 ◗] ? 8731 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 1033 = 9 + 1·2^10 ◗, ◖ 2185 = 1033 + 9·2^7 ◗, ◖ 8731 = -9 + 2185·2^2 ◗] ---- ? 8735 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 145 = 1 + 9·2^4 ◗, ◖ 8735 = 4095 + 145·2^5 ◗] ? 8737 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 145 = 1 + 9·2^4 ◗, ◖ 8737 = 4097 + 145·2^5 ◗] ? 8739 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 1033 = 9 + 1·2^10 ◗, ◖ 2185 = 1033 + 9·2^7 ◗, ◖ 8739 = -1 + 2185·2^2 ◗] ? 8741 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 1033 = 9 + 1·2^10 ◗, ◖ 2185 = 1033 + 9·2^7 ◗, ◖ 8741 = 1 + 2185·2^2 ◗] ---- ? 8745 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4105 = 9 + 1·2^12 ◗, ◖ 145 = 1 + 9·2^4 ◗, ◖ 8745 = 4105 + 145·2^5 ◗] ? 8747 /4/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 515 = 1 + 257·2^1 ◗, ◖ 4627 = 515 + 257·2^4 ◗, ◖ 8747 = 4627 + 515·2^3 ◗] ? 8749 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 1033 = 9 + 1·2^10 ◗, ◖ 2185 = 1033 + 9·2^7 ◗, ◖ 8749 = 9 + 2185·2^2 ◗] ? 8751 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4335 = -17 + 17·2^8 ◗, ◖ 69 = 1 + 17·2^2 ◗, ◖ 8751 = 4335 + 69·2^6 ◗] ? 8753 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4113 = 17 + 1·2^12 ◗, ◖ 145 = 17 + 1·2^7 ◗, ◖ 8753 = 4113 + 145·2^5 ◗] ? 8755 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 2193 = 17 + 17·2^7 ◗, ◖ 3281 = 2193 + 17·2^6 ◗, ◖ 8755 = 2193 + 3281·2^1 ◗] ? 8757 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 59 = -5 + 1·2^6 ◗, ◖ 139 = 59 + 5·2^4 ◗, ◖ 8757 = -139 + 139·2^6 ◗] ? 8759 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4087 = -9 + 1·2^12 ◗, ◖ 73 = 1 + 9·2^3 ◗, ◖ 8759 = 4087 + 73·2^6 ◗] ---- ? 8763 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 4191 = 127 + 127·2^5 ◗, ◖ 1143 = 127 + 127·2^3 ◗, ◖ 8763 = 4191 + 1143·2^2 ◗] ---- ? 8767 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 521 = 9 + 1·2^9 ◗, ◖ 1097 = 521 + 9·2^6 ◗, ◖ 8767 = -9 + 1097·2^3 ◗] ? 8769 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 73 = 1 + 9·2^3 ◗, ◖ 8769 = 4097 + 73·2^6 ◗] ? 8771 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4351 = -1 + 17·2^8 ◗, ◖ 1105 = 17 + 17·2^6 ◗, ◖ 8771 = 4351 + 1105·2^2 ◗] ? 8773 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4353 = 1 + 17·2^8 ◗, ◖ 1105 = 17 + 17·2^6 ◗, ◖ 8773 = 4353 + 1105·2^2 ◗] ? 8775 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 521 = 9 + 1·2^9 ◗, ◖ 1097 = 521 + 9·2^6 ◗, ◖ 8775 = -1 + 1097·2^3 ◗] ? 8777 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 521 = 9 + 1·2^9 ◗, ◖ 1097 = 521 + 9·2^6 ◗, ◖ 8777 = 1 + 1097·2^3 ◗] ---- ? 8781 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 517 = 1 + 129·2^2 ◗, ◖ 4645 = 517 + 129·2^5 ◗, ◖ 8781 = 4645 + 517·2^3 ◗] ? 8783 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 143 = 127 + 1·2^4 ◗, ◖ 4207 = 143 + 127·2^5 ◗, ◖ 8783 = 4207 + 143·2^5 ◗] ? 8785 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 521 = 9 + 1·2^9 ◗, ◖ 1097 = 521 + 9·2^6 ◗, ◖ 8785 = 9 + 1097·2^3 ◗] ? 8787 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 381 = -3 + 3·2^7 ◗, ◖ 573 = 381 + 3·2^6 ◗, ◖ 8787 = -381 + 573·2^4 ◗] ? 8789 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4369 = 17 + 17·2^8 ◗, ◖ 1105 = 17 + 17·2^6 ◗, ◖ 8789 = 4369 + 1105·2^2 ◗] ---- ? 8793 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 135 = -9 + 9·2^4 ◗, ◖ 4473 = -135 + 9·2^9 ◗, ◖ 8793 = 4473 + 135·2^5 ◗] ? 8795 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 1151 = 127 + 1·2^10 ◗, ◖ 2167 = 1151 + 127·2^3 ◗, ◖ 8795 = 127 + 2167·2^2 ◗] ? 8797 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 35 = 1 + 17·2^1 ◗, ◖ 4317 = -35 + 17·2^8 ◗, ◖ 8797 = 4317 + 35·2^7 ◗] ? 8799 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 4063 = -33 + 1·2^12 ◗, ◖ 37 = 33 + 1·2^2 ◗, ◖ 8799 = 4063 + 37·2^7 ◗] ---- ? 8807 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 247 = -9 + 1·2^8 ◗, ◖ 535 = 247 + 9·2^5 ◗, ◖ 8807 = 247 + 535·2^4 ◗] ? 8809 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 383 = -1 + 3·2^7 ◗, ◖ 1149 = 383 + 383·2^1 ◗, ◖ 8809 = -383 + 1149·2^3 ◗] ? 8811 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 381 = -3 + 3·2^7 ◗, ◖ 1149 = 381 + 3·2^8 ◗, ◖ 8811 = -381 + 1149·2^3 ◗] ---- ? 8815 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 289 = 33 + 1·2^8 ◗, ◖ 553 = 289 + 33·2^3 ◗, ◖ 8815 = -33 + 553·2^4 ◗] ? 8817 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 79 = 15 + 1·2^6 ◗, ◖ 139 = 79 + 15·2^2 ◗, ◖ 8817 = -79 + 139·2^6 ◗] ---- ? 8821 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 139 = 75 + 1·2^6 ◗, ◖ 8821 = -75 + 139·2^6 ◗] ? 8823 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3069 = -3 + 3·2^10 ◗, ◖ 2877 = 3069 - 3·2^6 ◗, ◖ 8823 = 3069 + 2877·2^1 ◗] ? 8825 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 23 = 7 + 1·2^4 ◗, ◖ 2937 = -7 + 23·2^7 ◗, ◖ 8825 = 2937 + 23·2^8 ◗] ? 8827 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 4091 = -5 + 1·2^12 ◗, ◖ 37 = 5 + 1·2^5 ◗, ◖ 8827 = 4091 + 37·2^7 ◗] ? 8829 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3071 = -1 + 3·2^10 ◗, ◖ 2879 = 3071 - 3·2^6 ◗, ◖ 8829 = 3071 + 2879·2^1 ◗] ? 8831 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 37 = 1 + 9·2^2 ◗, ◖ 8831 = 4095 + 37·2^7 ◗] ? 8833 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 37 = 1 + 9·2^2 ◗, ◖ 8833 = 4097 + 37·2^7 ◗] ? 8835 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3073 = 1 + 3·2^10 ◗, ◖ 2881 = 3073 - 3·2^6 ◗, ◖ 8835 = 3073 + 2881·2^1 ◗] ? 8837 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 59 = -5 + 1·2^6 ◗, ◖ 139 = 59 + 5·2^4 ◗, ◖ 8837 = -59 + 139·2^6 ◗] ? 8839 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 265 = 9 + 1·2^8 ◗, ◖ 553 = 265 + 9·2^5 ◗, ◖ 8839 = -9 + 553·2^4 ◗] ? 8841 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 577 = 65 + 1·2^9 ◗, ◖ 1097 = 577 + 65·2^3 ◗, ◖ 8841 = 65 + 1097·2^3 ◗] ---- ? 8847 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 265 = 9 + 1·2^8 ◗, ◖ 553 = 265 + 9·2^5 ◗, ◖ 8847 = -1 + 553·2^4 ◗] ? 8849 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 265 = 9 + 1·2^8 ◗, ◖ 553 = 265 + 9·2^5 ◗, ◖ 8849 = 1 + 553·2^4 ◗] ---- ? 8853 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 387 = 3 + 3·2^7 ◗, ◖ 1155 = 387 + 3·2^8 ◗, ◖ 8853 = -387 + 1155·2^3 ◗] ? 8855 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 385 = 1 + 3·2^7 ◗, ◖ 1155 = 385 + 385·2^1 ◗, ◖ 8855 = -385 + 1155·2^3 ◗] ? 8857 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 265 = 9 + 1·2^8 ◗, ◖ 553 = 265 + 9·2^5 ◗, ◖ 8857 = 9 + 553·2^4 ◗] ---- ? 8865 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 4129 = 33 + 1·2^12 ◗, ◖ 37 = 33 + 1·2^2 ◗, ◖ 8865 = 4129 + 37·2^7 ◗] ? 8867 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 35 = 1 + 17·2^1 ◗, ◖ 4387 = 35 + 17·2^8 ◗, ◖ 8867 = 4387 + 35·2^7 ◗] ? 8869 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 1153 = 129 + 1·2^10 ◗, ◖ 2185 = 1153 + 129·2^3 ◗, ◖ 8869 = 129 + 2185·2^2 ◗] ---- ? 8873 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 137 = 1 + 17·2^3 ◗, ◖ 4489 = 137 + 17·2^8 ◗, ◖ 8873 = 4489 + 137·2^5 ◗] ---- ? 8877 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 387 = 3 + 3·2^7 ◗, ◖ 579 = 387 + 3·2^6 ◗, ◖ 8877 = -387 + 579·2^4 ◗] ---- ? 8881 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 79 = 15 + 1·2^6 ◗, ◖ 139 = 79 + 15·2^2 ◗, ◖ 8881 = -15 + 139·2^6 ◗] ? 8883 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 189 = 63 + 63·2^1 ◗, ◖ 2961 = -63 + 189·2^4 ◗, ◖ 8883 = 2961 + 2961·2^1 ◗] ? 8885 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 251 = -5 + 1·2^8 ◗, ◖ 571 = 251 + 5·2^6 ◗, ◖ 8885 = -251 + 571·2^4 ◗] ? 8887 /4/ [◖ 1 ◗, ◖ 1023 = -1 + 1·2^10 ◗, ◖ 959 = 1023 - 1·2^6 ◗, ◖ 5051 = 959 + 1023·2^2 ◗, ◖ 8887 = 5051 + 959·2^2 ◗] ---- ? 8891 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 59 = -5 + 1·2^6 ◗, ◖ 139 = 59 + 5·2^4 ◗, ◖ 8891 = -5 + 139·2^6 ◗] ---- ? 8895 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 59 = -5 + 1·2^6 ◗, ◖ 139 = 59 + 5·2^4 ◗, ◖ 8895 = -1 + 139·2^6 ◗] ? 8897 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 59 = -5 + 1·2^6 ◗, ◖ 139 = 59 + 5·2^4 ◗, ◖ 8897 = 1 + 139·2^6 ◗] ---- ? 8901 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 59 = -5 + 1·2^6 ◗, ◖ 139 = 59 + 5·2^4 ◗, ◖ 8901 = 5 + 139·2^6 ◗] ---- ? 8905 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 4225 = 65 + 65·2^6 ◗, ◖ 585 = 65 + 65·2^3 ◗, ◖ 8905 = 4225 + 585·2^3 ◗] ---- ? 8911 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 79 = 15 + 1·2^6 ◗, ◖ 139 = 79 + 15·2^2 ◗, ◖ 8911 = 15 + 139·2^6 ◗] ? 8913 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 287 = -1 + 9·2^5 ◗, ◖ 4321 = -287 + 9·2^9 ◗, ◖ 8913 = 4321 + 287·2^4 ◗] ---- ? 8919 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4599 = -9 + 9·2^9 ◗, ◖ 135 = -9 + 9·2^4 ◗, ◖ 8919 = 4599 + 135·2^5 ◗] ? 8921 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 39 = 31 + 1·2^3 ◗, ◖ 3929 = -39 + 31·2^7 ◗, ◖ 8921 = 3929 + 39·2^7 ◗] ? 8923 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 991 = -1 + 31·2^5 ◗, ◖ 4959 = 991 + 31·2^7 ◗, ◖ 8923 = 4959 + 991·2^2 ◗] ? 8925 /4/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 2295 = 255 + 255·2^3 ◗, ◖ 3315 = 2295 + 255·2^2 ◗, ◖ 8925 = 2295 + 3315·2^1 ◗] ? 8927 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4607 = -1 + 9·2^9 ◗, ◖ 135 = -9 + 9·2^4 ◗, ◖ 8927 = 4607 + 135·2^5 ◗] ? 8929 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4609 = 1 + 9·2^9 ◗, ◖ 135 = -9 + 9·2^4 ◗, ◖ 8929 = 4609 + 135·2^5 ◗] ? 8931 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 141 = 93 + 3·2^4 ◗, ◖ 8931 = -93 + 141·2^6 ◗] ? 8933 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 123 = -5 + 1·2^7 ◗, ◖ 283 = 123 + 5·2^5 ◗, ◖ 8933 = -123 + 283·2^5 ◗] ? 8935 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 1275 = -5 + 5·2^8 ◗, ◖ 1915 = 1275 + 5·2^7 ◗, ◖ 8935 = 1275 + 1915·2^2 ◗] ? 8937 /4/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 383 = 255 + 1·2^7 ◗, ◖ 1149 = 383 + 383·2^1 ◗, ◖ 8937 = -255 + 1149·2^3 ◗] ? 8939 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 509 = -3 + 1·2^9 ◗, ◖ 1277 = 509 + 3·2^8 ◗, ◖ 8939 = -1277 + 1277·2^3 ◗] ? 8941 /4/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 1279 = 255 + 1·2^10 ◗, ◖ 2299 = 1279 + 255·2^2 ◗, ◖ 8941 = -255 + 2299·2^2 ◗] ? 8943 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4079 = -17 + 1·2^12 ◗, ◖ 19 = 17 + 1·2^1 ◗, ◖ 8943 = 4079 + 19·2^8 ◗] ? 8945 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 1275 = -5 + 5·2^8 ◗, ◖ 3835 = 1275 + 5·2^9 ◗, ◖ 8945 = 1275 + 3835·2^1 ◗] ? 8947 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 13 = 9 + 1·2^2 ◗, ◖ 2291 = -13 + 9·2^8 ◗, ◖ 8947 = 2291 + 13·2^9 ◗] ? 8949 /4/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 767 = 255 + 1·2^9 ◗, ◖ 2301 = 767 + 767·2^1 ◗, ◖ 8949 = -255 + 2301·2^2 ◗] ? 8951 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3069 = -3 + 3·2^10 ◗, ◖ 2941 = 3069 - 1·2^7 ◗, ◖ 8951 = 3069 + 2941·2^1 ◗] ? 8953 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 1279 = -1 + 5·2^8 ◗, ◖ 3837 = 1279 + 1279·2^1 ◗, ◖ 8953 = 1279 + 3837·2^1 ◗] ? 8955 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 59 = -5 + 1·2^6 ◗, ◖ 139 = 59 + 5·2^4 ◗, ◖ 8955 = 59 + 139·2^6 ◗] ? 8957 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3071 = -1 + 3·2^10 ◗, ◖ 2943 = 3071 - 1·2^7 ◗, ◖ 8957 = 3071 + 2943·2^1 ◗] ? 8959 /4/ [◖ 1 ◗, ◖ 2047 = -1 + 1·2^11 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 8959 = 2047 + 27·2^8 ◗] ? 8961 /4/ [◖ 1 ◗, ◖ 2049 = 1 + 1·2^11 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 8961 = 2049 + 27·2^8 ◗] ? 8963 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3073 = 1 + 3·2^10 ◗, ◖ 2945 = 3073 - 1·2^7 ◗, ◖ 8963 = 3073 + 2945·2^1 ◗] ? 8965 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 4101 = 5 + 1·2^12 ◗, ◖ 19 = -1 + 5·2^2 ◗, ◖ 8965 = 4101 + 19·2^8 ◗] ? 8967 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 1281 = 1 + 5·2^8 ◗, ◖ 3843 = 1281 + 1281·2^1 ◗, ◖ 8967 = 1281 + 3843·2^1 ◗] ? 8969 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3075 = 3 + 3·2^10 ◗, ◖ 2947 = 3075 - 1·2^7 ◗, ◖ 8969 = 3075 + 2947·2^1 ◗] ? 8971 /4/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 769 = 257 + 1·2^9 ◗, ◖ 2307 = 769 + 769·2^1 ◗, ◖ 8971 = -257 + 2307·2^2 ◗] ? 8973 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 13 = 9 + 1·2^2 ◗, ◖ 2317 = 13 + 9·2^8 ◗, ◖ 8973 = 2317 + 13·2^9 ◗] ? 8975 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 145 = 17 + 1·2^7 ◗, ◖ 281 = 145 + 17·2^3 ◗, ◖ 8975 = -17 + 281·2^5 ◗] ? 8977 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 141 = 47 + 47·2^1 ◗, ◖ 8977 = -47 + 141·2^6 ◗] ? 8979 /4/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 1281 = 257 + 1·2^10 ◗, ◖ 2309 = 1281 + 257·2^2 ◗, ◖ 8979 = -257 + 2309·2^2 ◗] ? 8981 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 515 = 3 + 1·2^9 ◗, ◖ 1283 = 515 + 3·2^8 ◗, ◖ 8981 = -1283 + 1283·2^3 ◗] ? 8983 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 137 = 9 + 1·2^7 ◗, ◖ 281 = 137 + 9·2^4 ◗, ◖ 8983 = -9 + 281·2^5 ◗] ? 8985 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 1285 = 5 + 5·2^8 ◗, ◖ 1925 = 1285 + 5·2^7 ◗, ◖ 8985 = 1285 + 1925·2^2 ◗] ? 8987 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 2313 = 9 + 9·2^8 ◗, ◖ 3337 = 2313 + 1·2^10 ◗, ◖ 8987 = 2313 + 3337·2^1 ◗] ---- ? 8991 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 137 = 9 + 1·2^7 ◗, ◖ 281 = 137 + 9·2^4 ◗, ◖ 8991 = -1 + 281·2^5 ◗] ? 8993 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 137 = 9 + 1·2^7 ◗, ◖ 281 = 137 + 9·2^4 ◗, ◖ 8993 = 1 + 281·2^5 ◗] ? 8995 /4/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 2313 = 257 + 257·2^3 ◗, ◖ 3341 = 2313 + 257·2^2 ◗, ◖ 8995 = 2313 + 3341·2^1 ◗] ? 8997 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 37 = 33 + 1·2^2 ◗, ◖ 4261 = 37 + 33·2^7 ◗, ◖ 8997 = 4261 + 37·2^7 ◗] ? 8999 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 39 = 31 + 1·2^3 ◗, ◖ 4007 = 39 + 31·2^7 ◗, ◖ 8999 = 4007 + 39·2^7 ◗] ? 9001 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 137 = 9 + 1·2^7 ◗, ◖ 281 = 137 + 9·2^4 ◗, ◖ 9001 = 9 + 281·2^5 ◗] ---- ? 9009 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 145 = 17 + 1·2^7 ◗, ◖ 281 = 145 + 17·2^3 ◗, ◖ 9009 = 17 + 281·2^5 ◗] ---- ? 9015 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3069 = -3 + 3·2^10 ◗, ◖ 2973 = 3069 - 3·2^5 ◗, ◖ 9015 = 3069 + 2973·2^1 ◗] ? 9017 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 3937 = -127 + 127·2^5 ◗, ◖ 635 = 127 + 127·2^2 ◗, ◖ 9017 = 3937 + 635·2^3 ◗] ---- ? 9021 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 141 = 47 + 47·2^1 ◗, ◖ 9021 = -3 + 141·2^6 ◗] ? 9023 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 141 = 47 + 47·2^1 ◗, ◖ 9023 = -1 + 141·2^6 ◗] ? 9025 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 141 = 47 + 47·2^1 ◗, ◖ 9025 = 1 + 141·2^6 ◗] ? 9027 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 141 = 47 + 47·2^1 ◗, ◖ 9027 = 3 + 141·2^6 ◗] ---- ? 9033 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3075 = 3 + 3·2^10 ◗, ◖ 2979 = 3075 - 3·2^5 ◗, ◖ 9033 = 3075 + 2979·2^1 ◗] ? 9035 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 261 = 5 + 1·2^8 ◗, ◖ 581 = 261 + 5·2^6 ◗, ◖ 9035 = -261 + 581·2^4 ◗] ---- ? 9039 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 47 = 15 + 1·2^5 ◗, ◖ 141 = 47 + 47·2^1 ◗, ◖ 9039 = 15 + 141·2^6 ◗] ? 9041 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 191 = 127 + 1·2^6 ◗, ◖ 573 = 191 + 191·2^1 ◗, ◖ 9041 = -127 + 573·2^4 ◗] ---- ? 9047 /4/ [◖ 1 ◗, ◖ 1023 = -1 + 1·2^10 ◗, ◖ 991 = 1023 - 1·2^5 ◗, ◖ 5083 = 991 + 1023·2^2 ◗, ◖ 9047 = 5083 + 991·2^2 ◗] ? 9049 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 639 = 127 + 1·2^9 ◗, ◖ 1147 = 639 + 127·2^2 ◗, ◖ 9049 = -127 + 1147·2^3 ◗] ? 9051 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 123 = -5 + 1·2^7 ◗, ◖ 283 = 123 + 5·2^5 ◗, ◖ 9051 = -5 + 283·2^5 ◗] ? 9053 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 35 = -1 + 9·2^2 ◗, ◖ 4573 = -35 + 9·2^9 ◗, ◖ 9053 = 4573 + 35·2^7 ◗] ? 9055 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 123 = -5 + 1·2^7 ◗, ◖ 283 = 123 + 5·2^5 ◗, ◖ 9055 = -1 + 283·2^5 ◗] ? 9057 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 123 = -5 + 1·2^7 ◗, ◖ 283 = 123 + 5·2^5 ◗, ◖ 9057 = 1 + 283·2^5 ◗] ---- ? 9061 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 123 = -5 + 1·2^7 ◗, ◖ 283 = 123 + 5·2^5 ◗, ◖ 9061 = 5 + 283·2^5 ◗] ? 9063 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4599 = -9 + 9·2^9 ◗, ◖ 279 = -9 + 9·2^5 ◗, ◖ 9063 = 4599 + 279·2^4 ◗] ? 9065 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 383 = 127 + 1·2^8 ◗, ◖ 1149 = 383 + 383·2^1 ◗, ◖ 9065 = -127 + 1149·2^3 ◗] ? 9067 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 1007 = -1 + 63·2^4 ◗, ◖ 5039 = 1007 + 63·2^6 ◗, ◖ 9067 = 5039 + 1007·2^2 ◗] ? 9069 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 141 = 45 + 3·2^5 ◗, ◖ 9069 = 45 + 141·2^6 ◗] ? 9071 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 141 = 47 + 47·2^1 ◗, ◖ 9071 = 47 + 141·2^6 ◗] ? 9073 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 319 = 63 + 1·2^8 ◗, ◖ 571 = 319 + 63·2^2 ◗, ◖ 9073 = -63 + 571·2^4 ◗] ? 9075 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 189 = -3 + 3·2^6 ◗, ◖ 3025 = 1 + 189·2^4 ◗, ◖ 9075 = 3025 + 3025·2^1 ◗] ? 9077 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 1009 = 1 + 63·2^4 ◗, ◖ 5041 = 1009 + 63·2^6 ◗, ◖ 9077 = 5041 + 1009·2^2 ◗] ? 9079 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3069 = -3 + 3·2^10 ◗, ◖ 3005 = 3069 - 1·2^6 ◗, ◖ 9079 = 3069 + 3005·2^1 ◗] ? 9081 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4617 = 9 + 9·2^9 ◗, ◖ 279 = -9 + 9·2^5 ◗, ◖ 9081 = 4617 + 279·2^4 ◗] ? 9083 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 4091 = -5 + 1·2^12 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 9083 = 4091 + 39·2^7 ◗] ? 9085 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3071 = -1 + 3·2^10 ◗, ◖ 3007 = 3071 - 1·2^6 ◗, ◖ 9085 = 3071 + 3007·2^1 ◗] ? 9087 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 159 = 31 + 1·2^7 ◗, ◖ 283 = 159 + 31·2^2 ◗, ◖ 9087 = 31 + 283·2^5 ◗] ? 9089 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 95 = 31 + 1·2^6 ◗, ◖ 285 = 95 + 95·2^1 ◗, ◖ 9089 = -31 + 285·2^5 ◗] ? 9091 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3073 = 1 + 3·2^10 ◗, ◖ 3009 = 3073 - 1·2^6 ◗, ◖ 9091 = 3073 + 3009·2^1 ◗] ? 9093 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 4101 = 5 + 1·2^12 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 9093 = 4101 + 39·2^7 ◗] ? 9095 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 4103 = 7 + 1·2^12 ◗, ◖ 39 = 7 + 1·2^5 ◗, ◖ 9095 = 4103 + 39·2^7 ◗] ? 9097 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3075 = 3 + 3·2^10 ◗, ◖ 3011 = 3075 - 1·2^6 ◗, ◖ 9097 = 3075 + 3011·2^1 ◗] ---- ? 9103 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 145 = 1 + 9·2^4 ◗, ◖ 4463 = -145 + 9·2^9 ◗, ◖ 9103 = 4463 + 145·2^5 ◗] ? 9105 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 191 = 63 + 1·2^7 ◗, ◖ 573 = 191 + 191·2^1 ◗, ◖ 9105 = -63 + 573·2^4 ◗] ---- ? 9111 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 385 = 129 + 1·2^8 ◗, ◖ 1155 = 385 + 385·2^1 ◗, ◖ 9111 = -129 + 1155·2^3 ◗] ? 9113 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 265 = 9 + 1·2^8 ◗, ◖ 553 = 265 + 9·2^5 ◗, ◖ 9113 = 265 + 553·2^4 ◗] ---- ? 9117 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 285 = 95 + 95·2^1 ◗, ◖ 9117 = -3 + 285·2^5 ◗] ? 9119 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 285 = 95 + 95·2^1 ◗, ◖ 9119 = -1 + 285·2^5 ◗] ? 9121 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 285 = 95 + 95·2^1 ◗, ◖ 9121 = 1 + 285·2^5 ◗] ? 9123 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 285 = 95 + 95·2^1 ◗, ◖ 9123 = 3 + 285·2^5 ◗] ---- ? 9127 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 641 = 129 + 1·2^9 ◗, ◖ 1157 = 641 + 129·2^2 ◗, ◖ 9127 = -129 + 1157·2^3 ◗] ? 9129 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3075 = 3 + 3·2^10 ◗, ◖ 3027 = 3075 - 3·2^4 ◗, ◖ 9129 = 3075 + 3027·2^1 ◗] ? 9131 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 251 = -5 + 1·2^8 ◗, ◖ 571 = 251 + 5·2^6 ◗, ◖ 9131 = -5 + 571·2^4 ◗] ---- ? 9135 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 251 = -5 + 1·2^8 ◗, ◖ 571 = 251 + 5·2^6 ◗, ◖ 9135 = -1 + 571·2^4 ◗] ? 9137 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 251 = -5 + 1·2^8 ◗, ◖ 571 = 251 + 5·2^6 ◗, ◖ 9137 = 1 + 571·2^4 ◗] ? 9139 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 1015 = -1 + 127·2^3 ◗, ◖ 5079 = 1015 + 127·2^5 ◗, ◖ 9139 = 5079 + 1015·2^2 ◗] ? 9141 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 251 = -5 + 1·2^8 ◗, ◖ 571 = 251 + 5·2^6 ◗, ◖ 9141 = 5 + 571·2^4 ◗] ? 9143 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4607 = -1 + 9·2^9 ◗, ◖ 567 = -9 + 9·2^6 ◗, ◖ 9143 = 4607 + 567·2^3 ◗] ? 9145 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4609 = 1 + 9·2^9 ◗, ◖ 567 = -9 + 9·2^6 ◗, ◖ 9145 = 4609 + 567·2^3 ◗] ? 9147 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 4091 = -5 + 1·2^12 ◗, ◖ 79 = -1 + 5·2^4 ◗, ◖ 9147 = 4091 + 79·2^6 ◗] ? 9149 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3071 = -1 + 3·2^10 ◗, ◖ 3039 = 3071 - 1·2^5 ◗, ◖ 9149 = 3071 + 3039·2^1 ◗] ? 9151 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 95 = 31 + 1·2^6 ◗, ◖ 285 = 95 + 95·2^1 ◗, ◖ 9151 = 31 + 285·2^5 ◗] ? 9153 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 79 = -1 + 5·2^4 ◗, ◖ 9153 = 4097 + 79·2^6 ◗] ? 9155 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3073 = 1 + 3·2^10 ◗, ◖ 3041 = 3073 - 1·2^5 ◗, ◖ 9155 = 3073 + 3041·2^1 ◗] ? 9157 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 4101 = 5 + 1·2^12 ◗, ◖ 79 = -1 + 5·2^4 ◗, ◖ 9157 = 4101 + 79·2^6 ◗] ? 9159 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3069 = -3 + 3·2^10 ◗, ◖ 3045 = 3069 - 3·2^3 ◗, ◖ 9159 = 3069 + 3045·2^1 ◗] ? 9161 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3075 = 3 + 3·2^10 ◗, ◖ 3043 = 3075 - 1·2^5 ◗, ◖ 9161 = 3075 + 3043·2^1 ◗] ---- ? 9165 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 191 = -1 + 3·2^6 ◗, ◖ 573 = 191 + 191·2^1 ◗, ◖ 9165 = -3 + 573·2^4 ◗] ? 9167 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 191 = -1 + 3·2^6 ◗, ◖ 573 = 191 + 191·2^1 ◗, ◖ 9167 = -1 + 573·2^4 ◗] ? 9169 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 191 = -1 + 3·2^6 ◗, ◖ 573 = 191 + 191·2^1 ◗, ◖ 9169 = 1 + 573·2^4 ◗] ? 9171 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 191 = -1 + 3·2^6 ◗, ◖ 573 = 191 + 191·2^1 ◗, ◖ 9171 = 3 + 573·2^4 ◗] ---- ? 9175 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 507 = -5 + 1·2^9 ◗, ◖ 1147 = 507 + 5·2^7 ◗, ◖ 9175 = -1 + 1147·2^3 ◗] ? 9177 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 507 = -5 + 1·2^9 ◗, ◖ 1147 = 507 + 5·2^7 ◗, ◖ 9177 = 1 + 1147·2^3 ◗] ? 9179 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4607 = -1 + 9·2^9 ◗, ◖ 1143 = -9 + 9·2^7 ◗, ◖ 9179 = 4607 + 1143·2^2 ◗] ? 9181 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 507 = -5 + 1·2^9 ◗, ◖ 1147 = 507 + 5·2^7 ◗, ◖ 9181 = 5 + 1147·2^3 ◗] ? 9183 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 95 = 63 + 1·2^5 ◗, ◖ 285 = 95 + 95·2^1 ◗, ◖ 9183 = 63 + 285·2^5 ◗] ? 9185 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 159 = -1 + 5·2^5 ◗, ◖ 9185 = 4097 + 159·2^5 ◗] ? 9187 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3073 = 1 + 3·2^10 ◗, ◖ 3057 = 3073 - 1·2^4 ◗, ◖ 9187 = 3073 + 3057·2^1 ◗] ? 9189 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 383 = -1 + 3·2^7 ◗, ◖ 1149 = 383 + 383·2^1 ◗, ◖ 9189 = -3 + 1149·2^3 ◗] ? 9191 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 383 = -1 + 3·2^7 ◗, ◖ 1149 = 383 + 383·2^1 ◗, ◖ 9191 = -1 + 1149·2^3 ◗] ? 9193 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 383 = -1 + 3·2^7 ◗, ◖ 1149 = 383 + 383·2^1 ◗, ◖ 9193 = 1 + 1149·2^3 ◗] ? 9195 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 1019 = -5 + 1·2^10 ◗, ◖ 2299 = 1019 + 5·2^8 ◗, ◖ 9195 = -1 + 2299·2^2 ◗] ? 9197 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 1019 = -5 + 1·2^10 ◗, ◖ 2299 = 1019 + 5·2^8 ◗, ◖ 9197 = 1 + 2299·2^2 ◗] ? 9199 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 193 = 65 + 1·2^7 ◗, ◖ 579 = 193 + 193·2^1 ◗, ◖ 9199 = -65 + 579·2^4 ◗] ? 9201 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 767 = -1 + 3·2^8 ◗, ◖ 2301 = 767 + 767·2^1 ◗, ◖ 9201 = -3 + 2301·2^2 ◗] ? 9203 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 767 = -1 + 3·2^8 ◗, ◖ 2301 = 767 + 767·2^1 ◗, ◖ 9203 = -1 + 2301·2^2 ◗] ? 9205 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 767 = -1 + 3·2^8 ◗, ◖ 2301 = 767 + 767·2^1 ◗, ◖ 9205 = 1 + 2301·2^2 ◗] ? 9207 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3069 = -3 + 3·2^10 ◗, ◖ 9207 = 3069 + 3069·2^1 ◗] ? 9209 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1535 = -1 + 3·2^9 ◗, ◖ 4605 = 1535 + 1535·2^1 ◗, ◖ 9209 = -1 + 4605·2^1 ◗] ? 9211 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 4091 = -5 + 1·2^12 ◗, ◖ 9211 = 4091 + 5·2^10 ◗] ? 9213 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3071 = -1 + 3·2^10 ◗, ◖ 9213 = 3071 + 3071·2^1 ◗] ? 9215 /3/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 9215 = 4095 + 5·2^10 ◗] ? 9217 /3/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 9217 = 4097 + 5·2^10 ◗] ? 9219 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3073 = 1 + 3·2^10 ◗, ◖ 9219 = 3073 + 3073·2^1 ◗] ? 9221 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 4101 = 5 + 1·2^12 ◗, ◖ 9221 = 4101 + 5·2^10 ◗] ? 9223 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1537 = 1 + 3·2^9 ◗, ◖ 4611 = 1537 + 1537·2^1 ◗, ◖ 9223 = 1 + 4611·2^1 ◗] ? 9225 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3075 = 3 + 3·2^10 ◗, ◖ 9225 = 3075 + 3075·2^1 ◗] ? 9227 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 769 = 1 + 3·2^8 ◗, ◖ 2307 = 769 + 769·2^1 ◗, ◖ 9227 = -1 + 2307·2^2 ◗] ? 9229 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 769 = 1 + 3·2^8 ◗, ◖ 2307 = 769 + 769·2^1 ◗, ◖ 9229 = 1 + 2307·2^2 ◗] ? 9231 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 769 = 1 + 3·2^8 ◗, ◖ 2307 = 769 + 769·2^1 ◗, ◖ 9231 = 3 + 2307·2^2 ◗] ? 9233 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 321 = 1 + 5·2^6 ◗, ◖ 9233 = 4097 + 321·2^4 ◗] ? 9235 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 1029 = 5 + 1·2^10 ◗, ◖ 2309 = 1029 + 5·2^8 ◗, ◖ 9235 = -1 + 2309·2^2 ◗] ? 9237 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 1029 = 5 + 1·2^10 ◗, ◖ 2309 = 1029 + 5·2^8 ◗, ◖ 9237 = 1 + 2309·2^2 ◗] ? 9239 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 385 = 1 + 3·2^7 ◗, ◖ 1155 = 385 + 385·2^1 ◗, ◖ 9239 = -1 + 1155·2^3 ◗] ? 9241 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 385 = 1 + 3·2^7 ◗, ◖ 1155 = 385 + 385·2^1 ◗, ◖ 9241 = 1 + 1155·2^3 ◗] ? 9243 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 385 = 1 + 3·2^7 ◗, ◖ 1155 = 385 + 385·2^1 ◗, ◖ 9243 = 3 + 1155·2^3 ◗] ? 9245 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3071 = -1 + 3·2^10 ◗, ◖ 3087 = 3071 + 1·2^4 ◗, ◖ 9245 = 3071 + 3087·2^1 ◗] ? 9247 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 97 = 65 + 1·2^5 ◗, ◖ 291 = 97 + 97·2^1 ◗, ◖ 9247 = -65 + 291·2^5 ◗] ? 9249 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 161 = 1 + 5·2^5 ◗, ◖ 9249 = 4097 + 161·2^5 ◗] ? 9251 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 517 = 5 + 1·2^9 ◗, ◖ 1157 = 517 + 5·2^7 ◗, ◖ 9251 = -5 + 1157·2^3 ◗] ? 9253 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4609 = 1 + 9·2^9 ◗, ◖ 1161 = 9 + 9·2^7 ◗, ◖ 9253 = 4609 + 1161·2^2 ◗] ? 9255 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 517 = 5 + 1·2^9 ◗, ◖ 1157 = 517 + 5·2^7 ◗, ◖ 9255 = -1 + 1157·2^3 ◗] ? 9257 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 517 = 5 + 1·2^9 ◗, ◖ 1157 = 517 + 5·2^7 ◗, ◖ 9257 = 1 + 1157·2^3 ◗] ---- ? 9261 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 193 = 1 + 3·2^6 ◗, ◖ 579 = 193 + 193·2^1 ◗, ◖ 9261 = -3 + 579·2^4 ◗] ? 9263 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 193 = 1 + 3·2^6 ◗, ◖ 579 = 193 + 193·2^1 ◗, ◖ 9263 = -1 + 579·2^4 ◗] ? 9265 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 193 = 1 + 3·2^6 ◗, ◖ 579 = 193 + 193·2^1 ◗, ◖ 9265 = 1 + 579·2^4 ◗] ? 9267 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 193 = 1 + 3·2^6 ◗, ◖ 579 = 193 + 193·2^1 ◗, ◖ 9267 = 3 + 579·2^4 ◗] ---- ? 9271 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3069 = -3 + 3·2^10 ◗, ◖ 3101 = 3069 + 1·2^5 ◗, ◖ 9271 = 3069 + 3101·2^1 ◗] ? 9273 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3075 = 3 + 3·2^10 ◗, ◖ 3099 = 3075 + 3·2^3 ◗, ◖ 9273 = 3075 + 3099·2^1 ◗] ? 9275 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 4091 = -5 + 1·2^12 ◗, ◖ 81 = 1 + 5·2^4 ◗, ◖ 9275 = 4091 + 81·2^6 ◗] ? 9277 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3071 = -1 + 3·2^10 ◗, ◖ 3103 = 3071 + 1·2^5 ◗, ◖ 9277 = 3071 + 3103·2^1 ◗] ? 9279 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 97 = 33 + 1·2^6 ◗, ◖ 291 = 97 + 97·2^1 ◗, ◖ 9279 = -33 + 291·2^5 ◗] ? 9281 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 81 = 1 + 5·2^4 ◗, ◖ 9281 = 4097 + 81·2^6 ◗] ? 9283 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3073 = 1 + 3·2^10 ◗, ◖ 3105 = 3073 + 1·2^5 ◗, ◖ 9283 = 3073 + 3105·2^1 ◗] ? 9285 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 4101 = 5 + 1·2^12 ◗, ◖ 81 = 1 + 5·2^4 ◗, ◖ 9285 = 4101 + 81·2^6 ◗] ? 9287 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4607 = -1 + 9·2^9 ◗, ◖ 585 = 9 + 9·2^6 ◗, ◖ 9287 = 4607 + 585·2^3 ◗] ? 9289 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4609 = 1 + 9·2^9 ◗, ◖ 585 = 9 + 9·2^6 ◗, ◖ 9289 = 4609 + 585·2^3 ◗] ? 9291 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 261 = 5 + 1·2^8 ◗, ◖ 581 = 261 + 5·2^6 ◗, ◖ 9291 = -5 + 581·2^4 ◗] ? 9293 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 1033 = 1 + 129·2^3 ◗, ◖ 5161 = 1033 + 129·2^5 ◗, ◖ 9293 = 5161 + 1033·2^2 ◗] ? 9295 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 261 = 5 + 1·2^8 ◗, ◖ 581 = 261 + 5·2^6 ◗, ◖ 9295 = -1 + 581·2^4 ◗] ? 9297 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 261 = 5 + 1·2^8 ◗, ◖ 581 = 261 + 5·2^6 ◗, ◖ 9297 = 1 + 581·2^4 ◗] ---- ? 9301 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 261 = 5 + 1·2^8 ◗, ◖ 581 = 261 + 5·2^6 ◗, ◖ 9301 = 5 + 581·2^4 ◗] ? 9303 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 639 = 127 + 1·2^9 ◗, ◖ 1147 = 639 + 127·2^2 ◗, ◖ 9303 = 127 + 1147·2^3 ◗] ? 9305 /4/ [◖ 1 ◗, ◖ 1025 = 1 + 1·2^10 ◗, ◖ 1041 = 1025 + 1·2^4 ◗, ◖ 5141 = 1041 + 1025·2^2 ◗, ◖ 9305 = 5141 + 1041·2^2 ◗] ? 9307 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 37 = 1 + 9·2^2 ◗, ◖ 4571 = -37 + 9·2^9 ◗, ◖ 9307 = 4571 + 37·2^7 ◗] ? 9309 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 291 = 97 + 97·2^1 ◗, ◖ 9309 = -3 + 291·2^5 ◗] ? 9311 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 291 = 97 + 97·2^1 ◗, ◖ 9311 = -1 + 291·2^5 ◗] ? 9313 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 291 = 97 + 97·2^1 ◗, ◖ 9313 = 1 + 291·2^5 ◗] ? 9315 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 291 = 97 + 97·2^1 ◗, ◖ 9315 = 3 + 291·2^5 ◗] ---- ? 9319 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 383 = 127 + 1·2^8 ◗, ◖ 1149 = 383 + 383·2^1 ◗, ◖ 9319 = 127 + 1149·2^3 ◗] ? 9321 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3075 = 3 + 3·2^10 ◗, ◖ 3123 = 3075 + 3·2^4 ◗, ◖ 9321 = 3075 + 3123·2^1 ◗] ---- ? 9327 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 143 = -1 + 9·2^4 ◗, ◖ 4751 = 143 + 9·2^9 ◗, ◖ 9327 = 4751 + 143·2^5 ◗] ? 9329 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 193 = 65 + 1·2^7 ◗, ◖ 579 = 193 + 193·2^1 ◗, ◖ 9329 = 65 + 579·2^4 ◗] ---- ? 9335 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3069 = -3 + 3·2^10 ◗, ◖ 3133 = 3069 + 1·2^6 ◗, ◖ 9335 = 3069 + 3133·2^1 ◗] ---- ? 9339 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 4091 = -5 + 1·2^12 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 9339 = 4091 + 41·2^7 ◗] ? 9341 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3071 = -1 + 3·2^10 ◗, ◖ 3135 = 3071 + 1·2^6 ◗, ◖ 9341 = 3071 + 3135·2^1 ◗] ? 9343 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 161 = 33 + 1·2^7 ◗, ◖ 293 = 161 + 33·2^2 ◗, ◖ 9343 = -33 + 293·2^5 ◗] ? 9345 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 97 = 33 + 1·2^6 ◗, ◖ 291 = 97 + 97·2^1 ◗, ◖ 9345 = 33 + 291·2^5 ◗] ? 9347 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3073 = 1 + 3·2^10 ◗, ◖ 3137 = 3073 + 1·2^6 ◗, ◖ 9347 = 3073 + 3137·2^1 ◗] ? 9349 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 4101 = 5 + 1·2^12 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 9349 = 4101 + 41·2^7 ◗] ? 9351 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4599 = -9 + 9·2^9 ◗, ◖ 297 = 9 + 9·2^5 ◗, ◖ 9351 = 4599 + 297·2^4 ◗] ? 9353 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3075 = 3 + 3·2^10 ◗, ◖ 3139 = 3075 + 1·2^6 ◗, ◖ 9353 = 3075 + 3139·2^1 ◗] ? 9355 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 1039 = -1 + 65·2^4 ◗, ◖ 5199 = 1039 + 65·2^6 ◗, ◖ 9355 = 5199 + 1039·2^2 ◗] ? 9357 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 147 = 51 + 3·2^5 ◗, ◖ 9357 = -51 + 147·2^6 ◗] ? 9359 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 147 = 49 + 49·2^1 ◗, ◖ 9359 = -49 + 147·2^6 ◗] ? 9361 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 321 = 65 + 1·2^8 ◗, ◖ 581 = 321 + 65·2^2 ◗, ◖ 9361 = 65 + 581·2^4 ◗] ? 9363 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 195 = 3 + 3·2^6 ◗, ◖ 3121 = 1 + 195·2^4 ◗, ◖ 9363 = 3121 + 3121·2^1 ◗] ? 9365 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 1041 = 1 + 65·2^4 ◗, ◖ 5201 = 1041 + 65·2^6 ◗, ◖ 9365 = 5201 + 1041·2^2 ◗] ? 9367 /4/ [◖ 1 ◗, ◖ 1023 = -1 + 1·2^10 ◗, ◖ 1055 = 1023 + 1·2^5 ◗, ◖ 5147 = 1055 + 1023·2^2 ◗, ◖ 9367 = 5147 + 1055·2^2 ◗] ? 9369 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 385 = 129 + 1·2^8 ◗, ◖ 1155 = 385 + 385·2^1 ◗, ◖ 9369 = 129 + 1155·2^3 ◗] ? 9371 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 133 = 5 + 1·2^7 ◗, ◖ 293 = 133 + 5·2^5 ◗, ◖ 9371 = -5 + 293·2^5 ◗] ---- ? 9375 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 133 = 5 + 1·2^7 ◗, ◖ 293 = 133 + 5·2^5 ◗, ◖ 9375 = -1 + 293·2^5 ◗] ? 9377 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 133 = 5 + 1·2^7 ◗, ◖ 293 = 133 + 5·2^5 ◗, ◖ 9377 = 1 + 293·2^5 ◗] ---- ? 9381 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 133 = 5 + 1·2^7 ◗, ◖ 293 = 133 + 5·2^5 ◗, ◖ 9381 = 5 + 293·2^5 ◗] ---- ? 9385 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 641 = 129 + 1·2^9 ◗, ◖ 1157 = 641 + 129·2^2 ◗, ◖ 9385 = 129 + 1157·2^3 ◗] ? 9387 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 251 = -5 + 1·2^8 ◗, ◖ 571 = 251 + 5·2^6 ◗, ◖ 9387 = 251 + 571·2^4 ◗] ---- ? 9391 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 49 = 17 + 1·2^5 ◗, ◖ 147 = 49 + 49·2^1 ◗, ◖ 9391 = -17 + 147·2^6 ◗] ? 9393 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 193 = 129 + 1·2^6 ◗, ◖ 579 = 193 + 193·2^1 ◗, ◖ 9393 = 129 + 579·2^4 ◗] ---- ? 9399 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3069 = -3 + 3·2^10 ◗, ◖ 3165 = 3069 + 3·2^5 ◗, ◖ 9399 = 3069 + 3165·2^1 ◗] ? 9401 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 265 = 9 + 1·2^8 ◗, ◖ 553 = 265 + 9·2^5 ◗, ◖ 9401 = 553 + 553·2^4 ◗] ---- ? 9405 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 147 = 49 + 49·2^1 ◗, ◖ 9405 = -3 + 147·2^6 ◗] ? 9407 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 147 = 49 + 49·2^1 ◗, ◖ 9407 = -1 + 147·2^6 ◗] ? 9409 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 147 = 49 + 49·2^1 ◗, ◖ 9409 = 1 + 147·2^6 ◗] ? 9411 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 147 = 49 + 49·2^1 ◗, ◖ 9411 = 3 + 147·2^6 ◗] ---- ? 9417 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3075 = 3 + 3·2^10 ◗, ◖ 3171 = 3075 + 3·2^5 ◗, ◖ 9417 = 3075 + 3171·2^1 ◗] ---- ? 9425 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 49 = 17 + 1·2^5 ◗, ◖ 147 = 49 + 49·2^1 ◗, ◖ 9425 = 17 + 147·2^6 ◗] ---- ? 9431 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 41 = 33 + 1·2^3 ◗, ◖ 4183 = -41 + 33·2^7 ◗, ◖ 9431 = 4183 + 41·2^7 ◗] ---- ? 9435 /4/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 4335 = 255 + 255·2^4 ◗, ◖ 1275 = 255 + 255·2^2 ◗, ◖ 9435 = 4335 + 1275·2^2 ◗] ---- ? 9439 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 4191 = -33 + 33·2^7 ◗, ◖ 41 = 33 + 1·2^3 ◗, ◖ 9439 = 4191 + 41·2^7 ◗] ? 9441 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 49 = 33 + 1·2^4 ◗, ◖ 147 = 49 + 49·2^1 ◗, ◖ 9441 = 33 + 147·2^6 ◗] ---- ? 9447 /4/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 383 = 255 + 1·2^7 ◗, ◖ 1149 = 383 + 383·2^1 ◗, ◖ 9447 = 255 + 1149·2^3 ◗] ? 9449 /4/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 767 = 255 + 1·2^9 ◗, ◖ 1277 = 767 + 255·2^1 ◗, ◖ 9449 = -767 + 1277·2^3 ◗] ? 9451 /4/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 1279 = 255 + 1·2^10 ◗, ◖ 2299 = 1279 + 255·2^2 ◗, ◖ 9451 = 255 + 2299·2^2 ◗] ? 9453 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 19 = 1 + 9·2^1 ◗, ◖ 4589 = -19 + 9·2^9 ◗, ◖ 9453 = 4589 + 19·2^8 ◗] ? 9455 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 81 = 17 + 1·2^6 ◗, ◖ 149 = 81 + 17·2^2 ◗, ◖ 9455 = -81 + 149·2^6 ◗] ? 9457 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 147 = 49 + 49·2^1 ◗, ◖ 9457 = 49 + 147·2^6 ◗] ? 9459 /4/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 767 = 255 + 1·2^9 ◗, ◖ 2301 = 767 + 767·2^1 ◗, ◖ 9459 = 255 + 2301·2^2 ◗] ---- ? 9463 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3069 = -3 + 3·2^10 ◗, ◖ 3197 = 3069 + 1·2^7 ◗, ◖ 9463 = 3069 + 3197·2^1 ◗] ? 9465 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 4089 = -7 + 1·2^12 ◗, ◖ 21 = 7 + 7·2^1 ◗, ◖ 9465 = 4089 + 21·2^8 ◗] ? 9467 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 69 = 5 + 1·2^6 ◗, ◖ 149 = 69 + 5·2^4 ◗, ◖ 9467 = -69 + 149·2^6 ◗] ? 9469 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3071 = -1 + 3·2^10 ◗, ◖ 3199 = 3071 + 1·2^7 ◗, ◖ 9469 = 3071 + 3199·2^1 ◗] ? 9471 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 9471 = 4095 + 21·2^8 ◗] ? 9473 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 9473 = 4097 + 21·2^8 ◗] ? 9475 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3073 = 1 + 3·2^10 ◗, ◖ 3201 = 3073 + 1·2^7 ◗, ◖ 9475 = 3073 + 3201·2^1 ◗] ? 9477 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 4101 = 5 + 1·2^12 ◗, ◖ 21 = 1 + 5·2^2 ◗, ◖ 9477 = 4101 + 21·2^8 ◗] ? 9479 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 4103 = 7 + 1·2^12 ◗, ◖ 21 = 7 + 7·2^1 ◗, ◖ 9479 = 4103 + 21·2^8 ◗] ? 9481 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3075 = 3 + 3·2^10 ◗, ◖ 3203 = 3075 + 1·2^7 ◗, ◖ 9481 = 3075 + 3203·2^1 ◗] ---- ? 9485 /4/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 769 = 257 + 1·2^9 ◗, ◖ 2307 = 769 + 769·2^1 ◗, ◖ 9485 = 257 + 2307·2^2 ◗] ? 9487 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 287 = -1 + 9·2^5 ◗, ◖ 4895 = 287 + 9·2^9 ◗, ◖ 9487 = 4895 + 287·2^4 ◗] ? 9489 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4113 = 17 + 1·2^12 ◗, ◖ 21 = 17 + 1·2^2 ◗, ◖ 9489 = 4113 + 21·2^8 ◗] ? 9491 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 19 = 1 + 9·2^1 ◗, ◖ 4627 = 19 + 9·2^9 ◗, ◖ 9491 = 4627 + 19·2^8 ◗] ? 9493 /4/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 1281 = 257 + 1·2^10 ◗, ◖ 2309 = 1281 + 257·2^2 ◗, ◖ 9493 = 257 + 2309·2^2 ◗] ? 9495 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4599 = -9 + 9·2^9 ◗, ◖ 153 = 9 + 9·2^4 ◗, ◖ 9495 = 4599 + 153·2^5 ◗] ? 9497 /4/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 385 = 257 + 1·2^7 ◗, ◖ 1155 = 385 + 385·2^1 ◗, ◖ 9497 = 257 + 1155·2^3 ◗] ? 9499 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 1055 = -1 + 33·2^5 ◗, ◖ 5279 = 1055 + 33·2^7 ◗, ◖ 9499 = 5279 + 1055·2^2 ◗] ? 9501 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 3167 = -1 + 99·2^5 ◗, ◖ 9501 = 3167 + 3167·2^1 ◗] ? 9503 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4607 = -1 + 9·2^9 ◗, ◖ 153 = 9 + 9·2^4 ◗, ◖ 9503 = 4607 + 153·2^5 ◗] ? 9505 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4609 = 1 + 9·2^9 ◗, ◖ 153 = 9 + 9·2^4 ◗, ◖ 9505 = 4609 + 153·2^5 ◗] ? 9507 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 147 = 99 + 3·2^4 ◗, ◖ 9507 = 99 + 147·2^6 ◗] ? 9509 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 133 = 5 + 1·2^7 ◗, ◖ 293 = 133 + 5·2^5 ◗, ◖ 9509 = 133 + 293·2^5 ◗] ---- ? 9513 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4617 = 9 + 9·2^9 ◗, ◖ 153 = 9 + 9·2^4 ◗, ◖ 9513 = 4617 + 153·2^5 ◗] ---- ? 9519 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 81 = 17 + 1·2^6 ◗, ◖ 149 = 81 + 17·2^2 ◗, ◖ 9519 = -17 + 149·2^6 ◗] ? 9521 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 289 = 1 + 9·2^5 ◗, ◖ 4897 = 289 + 9·2^9 ◗, ◖ 9521 = 4897 + 289·2^4 ◗] ---- ? 9525 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 381 = 127 + 127·2^1 ◗, ◖ 3175 = 127 + 381·2^3 ◗, ◖ 9525 = 3175 + 3175·2^1 ◗] ? 9527 /4/ [◖ 1 ◗, ◖ 1023 = -1 + 1·2^10 ◗, ◖ 1087 = 1023 + 1·2^6 ◗, ◖ 5179 = 1087 + 1023·2^2 ◗, ◖ 9527 = 5179 + 1087·2^2 ◗] ---- ? 9531 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 69 = 5 + 1·2^6 ◗, ◖ 149 = 69 + 5·2^4 ◗, ◖ 9531 = -5 + 149·2^6 ◗] ---- ? 9535 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 69 = 5 + 1·2^6 ◗, ◖ 149 = 69 + 5·2^4 ◗, ◖ 9535 = -1 + 149·2^6 ◗] ? 9537 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 69 = 5 + 1·2^6 ◗, ◖ 149 = 69 + 5·2^4 ◗, ◖ 9537 = 1 + 149·2^6 ◗] ---- ? 9541 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 69 = 5 + 1·2^6 ◗, ◖ 149 = 69 + 5·2^4 ◗, ◖ 9541 = 5 + 149·2^6 ◗] ---- ? 9545 /4/ [◖ 1 ◗, ◖ 1025 = 1 + 1·2^10 ◗, ◖ 1089 = 1025 + 1·2^6 ◗, ◖ 5189 = 1089 + 1025·2^2 ◗, ◖ 9545 = 5189 + 1089·2^2 ◗] ---- ? 9549 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 381 = -3 + 3·2^7 ◗, ◖ 573 = 381 + 3·2^6 ◗, ◖ 9549 = 381 + 573·2^4 ◗] ---- ? 9553 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 81 = 17 + 1·2^6 ◗, ◖ 149 = 81 + 17·2^2 ◗, ◖ 9553 = 17 + 149·2^6 ◗] ? 9555 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 195 = 65 + 65·2^1 ◗, ◖ 3185 = 65 + 195·2^4 ◗, ◖ 9555 = 3185 + 3185·2^1 ◗] ? 9557 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 261 = 5 + 1·2^8 ◗, ◖ 581 = 261 + 5·2^6 ◗, ◖ 9557 = 261 + 581·2^4 ◗] ---- ? 9565 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 35 = -5 + 5·2^3 ◗, ◖ 5085 = -35 + 5·2^10 ◗, ◖ 9565 = 5085 + 35·2^7 ◗] ---- ? 9569 /4/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 321 = 257 + 1·2^6 ◗, ◖ 4433 = 321 + 257·2^4 ◗, ◖ 9569 = 4433 + 321·2^4 ◗] ---- ? 9573 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 381 = -3 + 3·2^7 ◗, ◖ 1149 = 381 + 3·2^8 ◗, ◖ 9573 = 381 + 1149·2^3 ◗] ? 9575 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 383 = -1 + 3·2^7 ◗, ◖ 1149 = 383 + 383·2^1 ◗, ◖ 9575 = 383 + 1149·2^3 ◗] ---- ? 9583 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 25 = 17 + 1·2^3 ◗, ◖ 3183 = -17 + 25·2^7 ◗, ◖ 9583 = 3183 + 25·2^8 ◗] ? 9585 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 3825 = -15 + 15·2^8 ◗, ◖ 45 = 15 + 15·2^1 ◗, ◖ 9585 = 3825 + 45·2^7 ◗] ---- ? 9591 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3069 = -3 + 3·2^10 ◗, ◖ 3261 = 3069 + 3·2^6 ◗, ◖ 9591 = 3069 + 3261·2^1 ◗] ? 9593 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 639 = -1 + 5·2^7 ◗, ◖ 4481 = -639 + 5·2^10 ◗, ◖ 9593 = 4481 + 639·2^3 ◗] ? 9595 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5115 = -5 + 5·2^10 ◗, ◖ 35 = -5 + 5·2^3 ◗, ◖ 9595 = 5115 + 35·2^7 ◗] ? 9597 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3071 = -1 + 3·2^10 ◗, ◖ 3263 = 3071 + 3·2^6 ◗, ◖ 9597 = 3071 + 3263·2^1 ◗] ? 9599 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3071 = -1 + 3·2^10 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 9599 = 3071 + 51·2^7 ◗] ? 9601 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3073 = 1 + 3·2^10 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 9601 = 3073 + 51·2^7 ◗] ? 9603 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3073 = 1 + 3·2^10 ◗, ◖ 3265 = 3073 + 3·2^6 ◗, ◖ 9603 = 3073 + 3265·2^1 ◗] ? 9605 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 69 = 5 + 1·2^6 ◗, ◖ 149 = 69 + 5·2^4 ◗, ◖ 9605 = 69 + 149·2^6 ◗] ? 9607 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 641 = 1 + 5·2^7 ◗, ◖ 4479 = -641 + 5·2^10 ◗, ◖ 9607 = 4479 + 641·2^3 ◗] ? 9609 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3075 = 3 + 3·2^10 ◗, ◖ 3267 = 3075 + 3·2^6 ◗, ◖ 9609 = 3075 + 3267·2^1 ◗] ---- ? 9615 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 3855 = 15 + 15·2^8 ◗, ◖ 45 = 15 + 15·2^1 ◗, ◖ 9615 = 3855 + 45·2^7 ◗] ? 9617 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 81 = 17 + 1·2^6 ◗, ◖ 149 = 81 + 17·2^2 ◗, ◖ 9617 = 81 + 149·2^6 ◗] ---- ? 9621 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 149 = 85 + 1·2^6 ◗, ◖ 9621 = 85 + 149·2^6 ◗] ---- ? 9625 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 385 = 1 + 3·2^7 ◗, ◖ 1155 = 385 + 385·2^1 ◗, ◖ 9625 = 385 + 1155·2^3 ◗] ? 9627 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 387 = 3 + 3·2^7 ◗, ◖ 1155 = 387 + 3·2^8 ◗, ◖ 9627 = 387 + 1155·2^3 ◗] ---- ? 9635 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 35 = -5 + 5·2^3 ◗, ◖ 5155 = 35 + 5·2^10 ◗, ◖ 9635 = 5155 + 35·2^7 ◗] ---- ? 9639 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 3213 = -51 + 51·2^6 ◗, ◖ 9639 = 3213 + 3213·2^1 ◗] ---- ? 9645 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 259 = 3 + 1·2^8 ◗, ◖ 643 = 259 + 3·2^7 ◗, ◖ 9645 = -643 + 643·2^4 ◗] ---- ? 9651 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 387 = 3 + 3·2^7 ◗, ◖ 579 = 387 + 3·2^6 ◗, ◖ 9651 = 387 + 579·2^4 ◗] ---- ? 9657 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 153 = 9 + 9·2^4 ◗, ◖ 4761 = 153 + 9·2^9 ◗, ◖ 9657 = 4761 + 153·2^5 ◗] ---- ? 9669 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 133 = 5 + 1·2^7 ◗, ◖ 293 = 133 + 5·2^5 ◗, ◖ 9669 = 293 + 293·2^5 ◗] ---- ? 9675 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 387 = 129 + 129·2^1 ◗, ◖ 3225 = 129 + 387·2^3 ◗, ◖ 9675 = 3225 + 3225·2^1 ◗] ---- ? 9683 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 507 = -5 + 1·2^9 ◗, ◖ 1147 = 507 + 5·2^7 ◗, ◖ 9683 = 507 + 1147·2^3 ◗] ? 9685 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 69 = 5 + 1·2^6 ◗, ◖ 149 = 69 + 5·2^4 ◗, ◖ 9685 = 149 + 149·2^6 ◗] ---- ? 9705 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 23 = 15 + 1·2^3 ◗, ◖ 3817 = -23 + 15·2^8 ◗, ◖ 9705 = 3817 + 23·2^8 ◗] ? 9707 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 509 = -3 + 1·2^9 ◗, ◖ 1277 = 509 + 3·2^8 ◗, ◖ 9707 = -509 + 1277·2^3 ◗] ? 9709 /4/ [◖ 1 ◗, ◖ 511 = -1 + 1·2^9 ◗, ◖ 4599 = 511 + 511·2^3 ◗, ◖ 2555 = 511 + 511·2^2 ◗, ◖ 9709 = 4599 + 2555·2^1 ◗] ? 9711 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4335 = -17 + 17·2^8 ◗, ◖ 21 = 17 + 1·2^2 ◗, ◖ 9711 = 4335 + 21·2^8 ◗] ? 9713 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 2555 = -5 + 5·2^9 ◗, ◖ 3579 = 2555 + 1·2^10 ◗, ◖ 9713 = 2555 + 3579·2^1 ◗] ? 9715 /4/ [◖ 1 ◗, ◖ 511 = -1 + 1·2^9 ◗, ◖ 767 = 511 + 1·2^8 ◗, ◖ 2301 = 767 + 767·2^1 ◗, ◖ 9715 = 511 + 2301·2^2 ◗] ? 9717 /4/ [◖ 1 ◗, ◖ 511 = -1 + 1·2^9 ◗, ◖ 1535 = 511 + 1·2^10 ◗, ◖ 2557 = 1535 + 511·2^1 ◗, ◖ 9717 = -511 + 2557·2^2 ◗] ? 9719 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3069 = -3 + 3·2^10 ◗, ◖ 3325 = 3069 + 1·2^8 ◗, ◖ 9719 = 3069 + 3325·2^1 ◗] ? 9721 /4/ [◖ 1 ◗, ◖ 511 = -1 + 1·2^9 ◗, ◖ 1535 = 511 + 1·2^10 ◗, ◖ 4605 = 1535 + 1535·2^1 ◗, ◖ 9721 = 511 + 4605·2^1 ◗] ? 9723 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 4091 = -5 + 1·2^12 ◗, ◖ 11 = 1 + 5·2^1 ◗, ◖ 9723 = 4091 + 11·2^9 ◗] ? 9725 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3071 = -1 + 3·2^10 ◗, ◖ 3327 = 3071 + 1·2^8 ◗, ◖ 9725 = 3071 + 3327·2^1 ◗] ? 9727 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 9727 = 4095 + 11·2^9 ◗] ? 9729 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 9729 = 4097 + 11·2^9 ◗] ? 9731 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3073 = 1 + 3·2^10 ◗, ◖ 3329 = 3073 + 1·2^8 ◗, ◖ 9731 = 3073 + 3329·2^1 ◗] ? 9733 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 4101 = 5 + 1·2^12 ◗, ◖ 11 = 1 + 5·2^1 ◗, ◖ 9733 = 4101 + 11·2^9 ◗] ? 9735 /4/ [◖ 1 ◗, ◖ 513 = 1 + 1·2^9 ◗, ◖ 1537 = 513 + 1·2^10 ◗, ◖ 4611 = 1537 + 1537·2^1 ◗, ◖ 9735 = 513 + 4611·2^1 ◗] ? 9737 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3075 = 3 + 3·2^10 ◗, ◖ 3331 = 3075 + 1·2^8 ◗, ◖ 9737 = 3075 + 3331·2^1 ◗] ? 9739 /4/ [◖ 1 ◗, ◖ 513 = 1 + 1·2^9 ◗, ◖ 1537 = 513 + 1·2^10 ◗, ◖ 2563 = 1537 + 513·2^1 ◗, ◖ 9739 = -513 + 2563·2^2 ◗] ? 9741 /4/ [◖ 1 ◗, ◖ 513 = 1 + 1·2^9 ◗, ◖ 769 = 513 + 1·2^8 ◗, ◖ 2307 = 769 + 769·2^1 ◗, ◖ 9741 = 513 + 2307·2^2 ◗] ? 9743 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 2565 = 5 + 5·2^9 ◗, ◖ 3589 = 2565 + 1·2^10 ◗, ◖ 9743 = 2565 + 3589·2^1 ◗] ? 9745 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4369 = 17 + 17·2^8 ◗, ◖ 21 = 17 + 1·2^2 ◗, ◖ 9745 = 4369 + 21·2^8 ◗] ? 9747 /4/ [◖ 1 ◗, ◖ 513 = 1 + 1·2^9 ◗, ◖ 4617 = 513 + 513·2^3 ◗, ◖ 2565 = 513 + 513·2^2 ◗, ◖ 9747 = 4617 + 2565·2^1 ◗] ? 9749 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 515 = 3 + 1·2^9 ◗, ◖ 1283 = 515 + 3·2^8 ◗, ◖ 9749 = -515 + 1283·2^3 ◗] ? 9751 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 23 = 15 + 1·2^3 ◗, ◖ 3863 = 23 + 15·2^8 ◗, ◖ 9751 = 3863 + 23·2^8 ◗] ---- ? 9765 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 4805 = -155 + 155·2^5 ◗, ◖ 9765 = 4805 + 155·2^5 ◗] ---- ? 9773 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 517 = 5 + 1·2^9 ◗, ◖ 1157 = 517 + 5·2^7 ◗, ◖ 9773 = 517 + 1157·2^3 ◗] ? 9775 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4335 = -17 + 17·2^8 ◗, ◖ 85 = 17 + 17·2^2 ◗, ◖ 9775 = 4335 + 85·2^6 ◗] ---- ? 9779 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 29 = -3 + 1·2^5 ◗, ◖ 77 = 29 + 3·2^4 ◗, ◖ 9779 = -77 + 77·2^7 ◗] ---- ? 9783 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4599 = -9 + 9·2^9 ◗, ◖ 81 = 9 + 9·2^3 ◗, ◖ 9783 = 4599 + 81·2^6 ◗] ---- ? 9787 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1087 = -1 + 17·2^6 ◗, ◖ 5439 = 1087 + 17·2^8 ◗, ◖ 9787 = 5439 + 1087·2^2 ◗] ? 9789 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 3263 = -1 + 51·2^6 ◗, ◖ 9789 = 3263 + 3263·2^1 ◗] ? 9791 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4607 = -1 + 9·2^9 ◗, ◖ 81 = 9 + 9·2^3 ◗, ◖ 9791 = 4607 + 81·2^6 ◗] ? 9793 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4609 = 1 + 9·2^9 ◗, ◖ 81 = 9 + 9·2^3 ◗, ◖ 9793 = 4609 + 81·2^6 ◗] ? 9795 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 3265 = 1 + 51·2^6 ◗, ◖ 9795 = 3265 + 3265·2^1 ◗] ? 9797 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 1089 = 1 + 17·2^6 ◗, ◖ 5441 = 1089 + 17·2^8 ◗, ◖ 9797 = 5441 + 1089·2^2 ◗] ---- ? 9801 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4617 = 9 + 9·2^9 ◗, ◖ 81 = 9 + 9·2^3 ◗, ◖ 9801 = 4617 + 81·2^6 ◗] ---- ? 9809 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4369 = 17 + 17·2^8 ◗, ◖ 85 = 17 + 17·2^2 ◗, ◖ 9809 = 4369 + 85·2^6 ◗] ? 9811 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 77 = 45 + 1·2^5 ◗, ◖ 9811 = -45 + 77·2^7 ◗] ---- ? 9815 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 41 = 9 + 1·2^5 ◗, ◖ 77 = 41 + 9·2^2 ◗, ◖ 9815 = -41 + 77·2^7 ◗] ---- ? 9819 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 37 = 5 + 1·2^5 ◗, ◖ 77 = 37 + 5·2^3 ◗, ◖ 9819 = -37 + 77·2^7 ◗] ---- ? 9825 /4/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 383 = 255 + 1·2^7 ◗, ◖ 3697 = -383 + 255·2^4 ◗, ◖ 9825 = 3697 + 383·2^4 ◗] ? 9827 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 29 = -3 + 1·2^5 ◗, ◖ 77 = 29 + 3·2^4 ◗, ◖ 9827 = -29 + 77·2^7 ◗] ---- ? 9839 /4/ [◖ 1 ◗, ◖ 511 = -1 + 1·2^9 ◗, ◖ 639 = 511 + 1·2^7 ◗, ◖ 4727 = 639 + 511·2^3 ◗, ◖ 9839 = 4727 + 639·2^3 ◗] ? 9841 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 47 = 15 + 1·2^5 ◗, ◖ 77 = 47 + 15·2^1 ◗, ◖ 9841 = -15 + 77·2^7 ◗] ? 9843 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 51 = 17 + 17·2^1 ◗, ◖ 3281 = 17 + 51·2^6 ◗, ◖ 9843 = 3281 + 3281·2^1 ◗] ? 9845 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 5045 = -75 + 5·2^10 ◗, ◖ 9845 = 5045 + 75·2^6 ◗] ? 9847 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 41 = 9 + 1·2^5 ◗, ◖ 77 = 41 + 9·2^2 ◗, ◖ 9847 = -9 + 77·2^7 ◗] ---- ? 9851 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 37 = 5 + 1·2^5 ◗, ◖ 77 = 37 + 5·2^3 ◗, ◖ 9851 = -5 + 77·2^7 ◗] ? 9853 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 29 = -3 + 1·2^5 ◗, ◖ 77 = 29 + 3·2^4 ◗, ◖ 9853 = -3 + 77·2^7 ◗] ? 9855 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 29 = -3 + 1·2^5 ◗, ◖ 77 = 29 + 3·2^4 ◗, ◖ 9855 = -1 + 77·2^7 ◗] ? 9857 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 29 = -3 + 1·2^5 ◗, ◖ 77 = 29 + 3·2^4 ◗, ◖ 9857 = 1 + 77·2^7 ◗] ? 9859 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 29 = -3 + 1·2^5 ◗, ◖ 77 = 29 + 3·2^4 ◗, ◖ 9859 = 3 + 77·2^7 ◗] ? 9861 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 37 = 5 + 1·2^5 ◗, ◖ 77 = 37 + 5·2^3 ◗, ◖ 9861 = 5 + 77·2^7 ◗] ---- ? 9865 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 41 = 9 + 1·2^5 ◗, ◖ 77 = 41 + 9·2^2 ◗, ◖ 9865 = 9 + 77·2^7 ◗] ---- ? 9871 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 47 = 15 + 1·2^5 ◗, ◖ 77 = 47 + 15·2^1 ◗, ◖ 9871 = 15 + 77·2^7 ◗] ? 9873 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 521 = 9 + 1·2^9 ◗, ◖ 1097 = 521 + 9·2^6 ◗, ◖ 9873 = 1097 + 1097·2^3 ◗] ---- ? 9877 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 261 = 5 + 1·2^8 ◗, ◖ 581 = 261 + 5·2^6 ◗, ◖ 9877 = 581 + 581·2^4 ◗] ---- ? 9885 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 29 = -3 + 1·2^5 ◗, ◖ 77 = 29 + 3·2^4 ◗, ◖ 9885 = 29 + 77·2^7 ◗] ? 9887 /4/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 385 = 257 + 1·2^7 ◗, ◖ 3727 = -385 + 257·2^4 ◗, ◖ 9887 = 3727 + 385·2^4 ◗] ? 9889 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 3937 = -31 + 31·2^7 ◗, ◖ 93 = 31 + 31·2^1 ◗, ◖ 9889 = 3937 + 93·2^6 ◗] ? 9891 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 61 = -3 + 1·2^6 ◗, ◖ 157 = 61 + 3·2^5 ◗, ◖ 9891 = -157 + 157·2^6 ◗] ? 9893 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 37 = 5 + 1·2^5 ◗, ◖ 77 = 37 + 5·2^3 ◗, ◖ 9893 = 37 + 77·2^7 ◗] ---- ? 9897 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 41 = 9 + 1·2^5 ◗, ◖ 77 = 41 + 9·2^2 ◗, ◖ 9897 = 41 + 77·2^7 ◗] ---- ? 9901 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 77 = 45 + 1·2^5 ◗, ◖ 9901 = 45 + 77·2^7 ◗] ? 9903 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 47 = 15 + 1·2^5 ◗, ◖ 77 = 47 + 15·2^1 ◗, ◖ 9903 = 47 + 77·2^7 ◗] ? 9905 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 319 = -1 + 5·2^6 ◗, ◖ 4801 = -319 + 5·2^10 ◗, ◖ 9905 = 4801 + 319·2^4 ◗] ---- ? 9915 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5115 = -5 + 5·2^10 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 9915 = 5115 + 75·2^6 ◗] ? 9917 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 1983 = -1 + 31·2^6 ◗, ◖ 5951 = 1983 + 31·2^7 ◗, ◖ 9917 = 5951 + 1983·2^1 ◗] ? 9919 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5119 = -1 + 5·2^10 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 9919 = 5119 + 75·2^6 ◗] ? 9921 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5121 = 1 + 5·2^10 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 9921 = 5121 + 75·2^6 ◗] ? 9923 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 1985 = 1 + 31·2^6 ◗, ◖ 5953 = 1985 + 31·2^7 ◗, ◖ 9923 = 5953 + 1985·2^1 ◗] ? 9925 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5125 = 5 + 5·2^10 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 9925 = 5125 + 75·2^6 ◗] ---- ? 9933 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 29 = -3 + 1·2^5 ◗, ◖ 77 = 29 + 3·2^4 ◗, ◖ 9933 = 77 + 77·2^7 ◗] ? 9935 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 321 = 1 + 5·2^6 ◗, ◖ 4799 = -321 + 5·2^10 ◗, ◖ 9935 = 4799 + 321·2^4 ◗] ? 9937 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 47 = 31 + 1·2^4 ◗, ◖ 3921 = -47 + 31·2^7 ◗, ◖ 9937 = 3921 + 47·2^7 ◗] ? 9939 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 253 = -3 + 1·2^8 ◗, ◖ 637 = 253 + 3·2^7 ◗, ◖ 9939 = -253 + 637·2^4 ◗] ---- ? 9945 /4/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 3825 = -255 + 255·2^4 ◗, ◖ 765 = 255 + 255·2^1 ◗, ◖ 9945 = 3825 + 765·2^3 ◗] ---- ? 9951 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 3999 = 31 + 31·2^7 ◗, ◖ 93 = 31 + 31·2^1 ◗, ◖ 9951 = 3999 + 93·2^6 ◗] ? 9953 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 95 = 31 + 1·2^6 ◗, ◖ 157 = 95 + 31·2^1 ◗, ◖ 9953 = -95 + 157·2^6 ◗] ? 9955 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 157 = 93 + 1·2^6 ◗, ◖ 9955 = -93 + 157·2^6 ◗] ? 9957 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 765 = -3 + 3·2^8 ◗, ◖ 1149 = 765 + 3·2^7 ◗, ◖ 9957 = 765 + 1149·2^3 ◗] ---- ? 9961 /4/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 767 = 255 + 1·2^9 ◗, ◖ 1277 = 767 + 255·2^1 ◗, ◖ 9961 = -255 + 1277·2^3 ◗] ---- ? 9965 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 19 = -1 + 5·2^2 ◗, ◖ 5101 = -19 + 5·2^10 ◗, ◖ 9965 = 5101 + 19·2^8 ◗] ---- ? 9969 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 765 = -3 + 3·2^8 ◗, ◖ 2301 = 765 + 3·2^9 ◗, ◖ 9969 = 765 + 2301·2^2 ◗] ? 9971 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 767 = -1 + 3·2^8 ◗, ◖ 2301 = 767 + 767·2^1 ◗, ◖ 9971 = 767 + 2301·2^2 ◗] ---- ? 9975 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3069 = -3 + 3·2^10 ◗, ◖ 3453 = 3069 + 3·2^7 ◗, ◖ 9975 = 3069 + 3453·2^1 ◗] ? 9977 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 4089 = -7 + 1·2^12 ◗, ◖ 23 = 7 + 1·2^4 ◗, ◖ 9977 = 4089 + 23·2^8 ◗] ? 9979 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5115 = -5 + 5·2^10 ◗, ◖ 19 = -1 + 5·2^2 ◗, ◖ 9979 = 5115 + 19·2^8 ◗] ? 9981 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3071 = -1 + 3·2^10 ◗, ◖ 3455 = 3071 + 3·2^7 ◗, ◖ 9981 = 3071 + 3455·2^1 ◗] ? 9983 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 9983 = 4095 + 23·2^8 ◗] ? 9985 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 9985 = 4097 + 23·2^8 ◗] ? 9987 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3073 = 1 + 3·2^10 ◗, ◖ 3457 = 3073 + 3·2^7 ◗, ◖ 9987 = 3073 + 3457·2^1 ◗] ? 9989 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5125 = 5 + 5·2^10 ◗, ◖ 19 = -1 + 5·2^2 ◗, ◖ 9989 = 5125 + 19·2^8 ◗] ? 9991 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 4103 = 7 + 1·2^12 ◗, ◖ 23 = 7 + 1·2^4 ◗, ◖ 9991 = 4103 + 23·2^8 ◗] ? 9993 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3075 = 3 + 3·2^10 ◗, ◖ 3459 = 3075 + 3·2^7 ◗, ◖ 9993 = 3075 + 3459·2^1 ◗] ? 9995 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 75 = -5 + 5·2^4 ◗, ◖ 5195 = 75 + 5·2^10 ◗, ◖ 9995 = 5195 + 75·2^6 ◗] ? 9997 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 769 = 1 + 3·2^8 ◗, ◖ 2307 = 769 + 769·2^1 ◗, ◖ 9997 = 769 + 2307·2^2 ◗] ? 9999 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 771 = 3 + 3·2^8 ◗, ◖ 2307 = 771 + 3·2^9 ◗, ◖ 9999 = 771 + 2307·2^2 ◗] ---- ? 10003 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 19 = -1 + 5·2^2 ◗, ◖ 5139 = 19 + 5·2^10 ◗, ◖ 10003 = 5139 + 19·2^8 ◗] ---- ? 10007 /4/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 769 = 257 + 1·2^9 ◗, ◖ 1283 = 769 + 257·2^1 ◗, ◖ 10007 = -257 + 1283·2^3 ◗] ---- ? 10011 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 771 = 3 + 3·2^8 ◗, ◖ 1155 = 771 + 3·2^7 ◗, ◖ 10011 = 771 + 1155·2^3 ◗] ? 10013 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 131 = 3 + 1·2^7 ◗, ◖ 323 = 131 + 3·2^6 ◗, ◖ 10013 = -323 + 323·2^5 ◗] ? 10015 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 3999 = 31 + 31·2^7 ◗, ◖ 47 = 31 + 1·2^4 ◗, ◖ 10015 = 3999 + 47·2^7 ◗] ? 10017 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 95 = 31 + 1·2^6 ◗, ◖ 157 = 95 + 31·2^1 ◗, ◖ 10017 = -31 + 157·2^6 ◗] ? 10019 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 125 = -3 + 1·2^7 ◗, ◖ 317 = 125 + 3·2^6 ◗, ◖ 10019 = -125 + 317·2^5 ◗] ---- ? 10023 /4/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 3855 = -257 + 257·2^4 ◗, ◖ 771 = 257 + 257·2^1 ◗, ◖ 10023 = 3855 + 771·2^3 ◗] ---- ? 10029 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 259 = 3 + 1·2^8 ◗, ◖ 643 = 259 + 3·2^7 ◗, ◖ 10029 = -259 + 643·2^4 ◗] ? 10031 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 47 = 31 + 1·2^4 ◗, ◖ 4015 = 47 + 31·2^7 ◗, ◖ 10031 = 4015 + 47·2^7 ◗] ? 10033 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 3937 = -127 + 127·2^5 ◗, ◖ 381 = 127 + 127·2^1 ◗, ◖ 10033 = 3937 + 381·2^4 ◗] ---- ? 10043 /4/ [◖ 1 ◗, ◖ 2047 = -1 + 1·2^11 ◗, ◖ 1983 = 2047 - 1·2^6 ◗, ◖ 6077 = 1983 + 2047·2^1 ◗, ◖ 10043 = 6077 + 1983·2^1 ◗] ? 10045 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 61 = -3 + 1·2^6 ◗, ◖ 157 = 61 + 3·2^5 ◗, ◖ 10045 = -3 + 157·2^6 ◗] ? 10047 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 61 = -3 + 1·2^6 ◗, ◖ 157 = 61 + 3·2^5 ◗, ◖ 10047 = -1 + 157·2^6 ◗] ? 10049 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 61 = -3 + 1·2^6 ◗, ◖ 157 = 61 + 3·2^5 ◗, ◖ 10049 = 1 + 157·2^6 ◗] ? 10051 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 61 = -3 + 1·2^6 ◗, ◖ 157 = 61 + 3·2^5 ◗, ◖ 10051 = 3 + 157·2^6 ◗] ? 10053 /4/ [◖ 1 ◗, ◖ 2049 = 1 + 1·2^11 ◗, ◖ 1985 = 2049 - 1·2^6 ◗, ◖ 6083 = 1985 + 2049·2^1 ◗, ◖ 10053 = 6083 + 1985·2^1 ◗] ---- ? 10065 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 383 = 127 + 1·2^8 ◗, ◖ 637 = 383 + 127·2^1 ◗, ◖ 10065 = -127 + 637·2^4 ◗] ---- ? 10073 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 5081 = -39 + 5·2^10 ◗, ◖ 10073 = 5081 + 39·2^7 ◗] ? 10075 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5115 = -5 + 5·2^10 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 10075 = 5115 + 155·2^5 ◗] ? 10077 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 2015 = -1 + 63·2^5 ◗, ◖ 6047 = 2015 + 63·2^6 ◗, ◖ 10077 = 6047 + 2015·2^1 ◗] ? 10079 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 95 = 31 + 1·2^6 ◗, ◖ 157 = 95 + 31·2^1 ◗, ◖ 10079 = 31 + 157·2^6 ◗] ? 10081 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 191 = 63 + 1·2^7 ◗, ◖ 317 = 191 + 63·2^1 ◗, ◖ 10081 = -63 + 317·2^5 ◗] ? 10083 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 2017 = 1 + 63·2^5 ◗, ◖ 6049 = 2017 + 63·2^6 ◗, ◖ 10083 = 6049 + 2017·2^1 ◗] ? 10085 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5125 = 5 + 5·2^10 ◗, ◖ 155 = -5 + 5·2^5 ◗, ◖ 10085 = 5125 + 155·2^5 ◗] ---- ? 10097 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 4081 = -15 + 1·2^12 ◗, ◖ 47 = 15 + 1·2^5 ◗, ◖ 10097 = 4081 + 47·2^7 ◗] ---- ? 10107 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5115 = -5 + 5·2^10 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 10107 = 5115 + 39·2^7 ◗] ? 10109 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 61 = -3 + 1·2^6 ◗, ◖ 157 = 61 + 3·2^5 ◗, ◖ 10109 = 61 + 157·2^6 ◗] ? 10111 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 10111 = 4095 + 47·2^7 ◗] ? 10113 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 10113 = 4097 + 47·2^7 ◗] ? 10115 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 4099 = 3 + 1·2^12 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 10115 = 4099 + 47·2^7 ◗] ? 10117 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5125 = 5 + 5·2^10 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 10117 = 5125 + 39·2^7 ◗] ---- ? 10127 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 4111 = 15 + 1·2^12 ◗, ◖ 47 = 15 + 1·2^5 ◗, ◖ 10127 = 4111 + 47·2^7 ◗] ---- ? 10139 /4/ [◖ 1 ◗, ◖ 2047 = -1 + 1·2^11 ◗, ◖ 2015 = 2047 - 1·2^5 ◗, ◖ 6109 = 2015 + 2047·2^1 ◗, ◖ 10139 = 6109 + 2015·2^1 ◗] ? 10141 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 125 = -3 + 1·2^7 ◗, ◖ 317 = 125 + 3·2^6 ◗, ◖ 10141 = -3 + 317·2^5 ◗] ? 10143 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 125 = -3 + 1·2^7 ◗, ◖ 317 = 125 + 3·2^6 ◗, ◖ 10143 = -1 + 317·2^5 ◗] ? 10145 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 125 = -3 + 1·2^7 ◗, ◖ 317 = 125 + 3·2^6 ◗, ◖ 10145 = 1 + 317·2^5 ◗] ? 10147 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 125 = -3 + 1·2^7 ◗, ◖ 317 = 125 + 3·2^6 ◗, ◖ 10147 = 3 + 317·2^5 ◗] ? 10149 /4/ [◖ 1 ◗, ◖ 2049 = 1 + 1·2^11 ◗, ◖ 2017 = 2049 - 1·2^5 ◗, ◖ 6115 = 2017 + 2049·2^1 ◗, ◖ 10149 = 6115 + 2017·2^1 ◗] ? 10151 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 39 = -1 + 5·2^3 ◗, ◖ 5159 = 39 + 5·2^10 ◗, ◖ 10151 = 5159 + 39·2^7 ◗] ---- ? 10155 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5115 = -5 + 5·2^10 ◗, ◖ 315 = -5 + 5·2^6 ◗, ◖ 10155 = 5115 + 315·2^4 ◗] ? 10157 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 2031 = -1 + 127·2^4 ◗, ◖ 6095 = 2031 + 127·2^5 ◗, ◖ 10157 = 6095 + 2031·2^1 ◗] ? 10159 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 385 = 129 + 1·2^8 ◗, ◖ 643 = 385 + 129·2^1 ◗, ◖ 10159 = -129 + 643·2^4 ◗] ? 10161 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5121 = 1 + 5·2^10 ◗, ◖ 315 = -5 + 5·2^6 ◗, ◖ 10161 = 5121 + 315·2^4 ◗] ? 10163 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 2033 = 1 + 127·2^4 ◗, ◖ 6097 = 2033 + 127·2^5 ◗, ◖ 10163 = 6097 + 2033·2^1 ◗] ? 10165 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5125 = 5 + 5·2^10 ◗, ◖ 315 = -5 + 5·2^6 ◗, ◖ 10165 = 5125 + 315·2^4 ◗] ---- ? 10171 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5115 = -5 + 5·2^10 ◗, ◖ 79 = -1 + 5·2^4 ◗, ◖ 10171 = 5115 + 79·2^6 ◗] ? 10173 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 4093 = -3 + 1·2^12 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 10173 = 4093 + 95·2^6 ◗] ? 10175 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 10175 = 4095 + 95·2^6 ◗] ? 10177 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 10177 = 4097 + 95·2^6 ◗] ? 10179 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 4099 = 3 + 1·2^12 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 10179 = 4099 + 95·2^6 ◗] ? 10181 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5125 = 5 + 5·2^10 ◗, ◖ 79 = -1 + 5·2^4 ◗, ◖ 10181 = 5125 + 79·2^6 ◗] ---- ? 10187 /4/ [◖ 1 ◗, ◖ 2047 = -1 + 1·2^11 ◗, ◖ 2031 = 2047 - 1·2^4 ◗, ◖ 6125 = 2031 + 2047·2^1 ◗, ◖ 10187 = 6125 + 2031·2^1 ◗] ? 10189 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 253 = -3 + 1·2^8 ◗, ◖ 637 = 253 + 3·2^7 ◗, ◖ 10189 = -3 + 637·2^4 ◗] ? 10191 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 253 = -3 + 1·2^8 ◗, ◖ 637 = 253 + 3·2^7 ◗, ◖ 10191 = -1 + 637·2^4 ◗] ? 10193 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 253 = -3 + 1·2^8 ◗, ◖ 637 = 253 + 3·2^7 ◗, ◖ 10193 = 1 + 637·2^4 ◗] ? 10195 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 253 = -3 + 1·2^8 ◗, ◖ 637 = 253 + 3·2^7 ◗, ◖ 10195 = 3 + 637·2^4 ◗] ? 10197 /4/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 2039 = -1 + 255·2^3 ◗, ◖ 6119 = 2039 + 255·2^4 ◗, ◖ 10197 = 6119 + 2039·2^1 ◗] ? 10199 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5119 = -1 + 5·2^10 ◗, ◖ 635 = -5 + 5·2^7 ◗, ◖ 10199 = 5119 + 635·2^3 ◗] ? 10201 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5121 = 1 + 5·2^10 ◗, ◖ 635 = -5 + 5·2^7 ◗, ◖ 10201 = 5121 + 635·2^3 ◗] ? 10203 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5115 = -5 + 5·2^10 ◗, ◖ 159 = -1 + 5·2^5 ◗, ◖ 10203 = 5115 + 159·2^5 ◗] ? 10205 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 131 = 3 + 1·2^7 ◗, ◖ 323 = 131 + 3·2^6 ◗, ◖ 10205 = -131 + 323·2^5 ◗] ? 10207 /4/ [◖ 1 ◗, ◖ 63 = -1 + 1·2^6 ◗, ◖ 191 = 63 + 1·2^7 ◗, ◖ 317 = 191 + 63·2^1 ◗, ◖ 10207 = 63 + 317·2^5 ◗] ? 10209 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 191 = -1 + 3·2^6 ◗, ◖ 10209 = 4097 + 191·2^5 ◗] ? 10211 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 4099 = 3 + 1·2^12 ◗, ◖ 191 = -1 + 3·2^6 ◗, ◖ 10211 = 4099 + 191·2^5 ◗] ? 10213 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 509 = -3 + 1·2^9 ◗, ◖ 1277 = 509 + 3·2^8 ◗, ◖ 10213 = -3 + 1277·2^3 ◗] ? 10215 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 509 = -3 + 1·2^9 ◗, ◖ 1277 = 509 + 3·2^8 ◗, ◖ 10215 = -1 + 1277·2^3 ◗] ? 10217 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 509 = -3 + 1·2^9 ◗, ◖ 1277 = 509 + 3·2^8 ◗, ◖ 10217 = 1 + 1277·2^3 ◗] ? 10219 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 509 = -3 + 1·2^9 ◗, ◖ 1277 = 509 + 3·2^8 ◗, ◖ 10219 = 3 + 1277·2^3 ◗] ? 10221 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5121 = 1 + 5·2^10 ◗, ◖ 1275 = -5 + 5·2^8 ◗, ◖ 10221 = 5121 + 1275·2^2 ◗] ? 10223 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 383 = -1 + 3·2^7 ◗, ◖ 10223 = 4095 + 383·2^4 ◗] ? 10225 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1021 = -3 + 1·2^10 ◗, ◖ 2557 = 1021 + 3·2^9 ◗, ◖ 10225 = -3 + 2557·2^2 ◗] ? 10227 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1021 = -3 + 1·2^10 ◗, ◖ 2557 = 1021 + 3·2^9 ◗, ◖ 10227 = -1 + 2557·2^2 ◗] ? 10229 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1021 = -3 + 1·2^10 ◗, ◖ 2557 = 1021 + 3·2^9 ◗, ◖ 10229 = 1 + 2557·2^2 ◗] ? 10231 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1021 = -3 + 1·2^10 ◗, ◖ 2557 = 1021 + 3·2^9 ◗, ◖ 10231 = 3 + 2557·2^2 ◗] ? 10233 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 2045 = -3 + 1·2^11 ◗, ◖ 5117 = 2045 + 3·2^10 ◗, ◖ 10233 = -1 + 5117·2^1 ◗] ? 10235 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5115 = -5 + 5·2^10 ◗, ◖ 10235 = 5115 + 5·2^10 ◗] ? 10237 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 4093 = -3 + 1·2^12 ◗, ◖ 10237 = 4093 + 3·2^11 ◗] ? 10239 /3/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 10239 = 4095 + 3·2^11 ◗] ? 10241 /3/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 10241 = 4097 + 3·2^11 ◗] ? 10243 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 4099 = 3 + 1·2^12 ◗, ◖ 10243 = 4099 + 3·2^11 ◗] ? 10245 /3/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5125 = 5 + 5·2^10 ◗, ◖ 10245 = 5125 + 5·2^10 ◗] ? 10247 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 2051 = 3 + 1·2^11 ◗, ◖ 5123 = 2051 + 3·2^10 ◗, ◖ 10247 = 1 + 5123·2^1 ◗] ? 10249 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1027 = 3 + 1·2^10 ◗, ◖ 2563 = 1027 + 3·2^9 ◗, ◖ 10249 = -3 + 2563·2^2 ◗] ? 10251 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1027 = 3 + 1·2^10 ◗, ◖ 2563 = 1027 + 3·2^9 ◗, ◖ 10251 = -1 + 2563·2^2 ◗] ? 10253 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1027 = 3 + 1·2^10 ◗, ◖ 2563 = 1027 + 3·2^9 ◗, ◖ 10253 = 1 + 2563·2^2 ◗] ? 10255 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1027 = 3 + 1·2^10 ◗, ◖ 2563 = 1027 + 3·2^9 ◗, ◖ 10255 = 3 + 2563·2^2 ◗] ? 10257 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 385 = 1 + 3·2^7 ◗, ◖ 10257 = 4097 + 385·2^4 ◗] ? 10259 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5119 = -1 + 5·2^10 ◗, ◖ 1285 = 5 + 5·2^8 ◗, ◖ 10259 = 5119 + 1285·2^2 ◗] ? 10261 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 515 = 3 + 1·2^9 ◗, ◖ 1283 = 515 + 3·2^8 ◗, ◖ 10261 = -3 + 1283·2^3 ◗] ? 10263 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 515 = 3 + 1·2^9 ◗, ◖ 1283 = 515 + 3·2^8 ◗, ◖ 10263 = -1 + 1283·2^3 ◗] ? 10265 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 515 = 3 + 1·2^9 ◗, ◖ 1283 = 515 + 3·2^8 ◗, ◖ 10265 = 1 + 1283·2^3 ◗] ? 10267 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 515 = 3 + 1·2^9 ◗, ◖ 1283 = 515 + 3·2^8 ◗, ◖ 10267 = 3 + 1283·2^3 ◗] ? 10269 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 125 = -3 + 1·2^7 ◗, ◖ 317 = 125 + 3·2^6 ◗, ◖ 10269 = 125 + 317·2^5 ◗] ? 10271 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 193 = 65 + 1·2^7 ◗, ◖ 323 = 193 + 65·2^1 ◗, ◖ 10271 = -65 + 323·2^5 ◗] ? 10273 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 193 = 1 + 3·2^6 ◗, ◖ 10273 = 4097 + 193·2^5 ◗] ? 10275 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 4099 = 3 + 1·2^12 ◗, ◖ 193 = 1 + 3·2^6 ◗, ◖ 10275 = 4099 + 193·2^5 ◗] ? 10277 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5125 = 5 + 5·2^10 ◗, ◖ 161 = 1 + 5·2^5 ◗, ◖ 10277 = 5125 + 161·2^5 ◗] ? 10279 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5119 = -1 + 5·2^10 ◗, ◖ 645 = 5 + 5·2^7 ◗, ◖ 10279 = 5119 + 645·2^3 ◗] ? 10281 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5121 = 1 + 5·2^10 ◗, ◖ 645 = 5 + 5·2^7 ◗, ◖ 10281 = 5121 + 645·2^3 ◗] ? 10283 /4/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 2057 = 1 + 257·2^3 ◗, ◖ 6169 = 2057 + 257·2^4 ◗, ◖ 10283 = 6169 + 2057·2^1 ◗] ? 10285 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 259 = 3 + 1·2^8 ◗, ◖ 643 = 259 + 3·2^7 ◗, ◖ 10285 = -3 + 643·2^4 ◗] ? 10287 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 259 = 3 + 1·2^8 ◗, ◖ 643 = 259 + 3·2^7 ◗, ◖ 10287 = -1 + 643·2^4 ◗] ? 10289 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 259 = 3 + 1·2^8 ◗, ◖ 643 = 259 + 3·2^7 ◗, ◖ 10289 = 1 + 643·2^4 ◗] ? 10291 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 259 = 3 + 1·2^8 ◗, ◖ 643 = 259 + 3·2^7 ◗, ◖ 10291 = 3 + 643·2^4 ◗] ? 10293 /4/ [◖ 1 ◗, ◖ 2049 = 1 + 1·2^11 ◗, ◖ 2065 = 2049 + 1·2^4 ◗, ◖ 6163 = 2065 + 2049·2^1 ◗, ◖ 10293 = 6163 + 2065·2^1 ◗] ---- ? 10299 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5115 = -5 + 5·2^10 ◗, ◖ 81 = 1 + 5·2^4 ◗, ◖ 10299 = 5115 + 81·2^6 ◗] ? 10301 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 4093 = -3 + 1·2^12 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 10301 = 4093 + 97·2^6 ◗] ? 10303 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 10303 = 4095 + 97·2^6 ◗] ? 10305 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 10305 = 4097 + 97·2^6 ◗] ? 10307 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 4099 = 3 + 1·2^12 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 10307 = 4099 + 97·2^6 ◗] ? 10309 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5125 = 5 + 5·2^10 ◗, ◖ 81 = 1 + 5·2^4 ◗, ◖ 10309 = 5125 + 81·2^6 ◗] ---- ? 10315 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5115 = -5 + 5·2^10 ◗, ◖ 325 = 5 + 5·2^6 ◗, ◖ 10315 = 5115 + 325·2^4 ◗] ? 10317 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 2063 = -1 + 129·2^4 ◗, ◖ 6191 = 2063 + 129·2^5 ◗, ◖ 10317 = 6191 + 2063·2^1 ◗] ? 10319 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 383 = 127 + 1·2^8 ◗, ◖ 637 = 383 + 127·2^1 ◗, ◖ 10319 = 127 + 637·2^4 ◗] ? 10321 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5121 = 1 + 5·2^10 ◗, ◖ 325 = 5 + 5·2^6 ◗, ◖ 10321 = 5121 + 325·2^4 ◗] ? 10323 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 2065 = 1 + 129·2^4 ◗, ◖ 6193 = 2065 + 129·2^5 ◗, ◖ 10323 = 6193 + 2065·2^1 ◗] ? 10325 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5125 = 5 + 5·2^10 ◗, ◖ 325 = 5 + 5·2^6 ◗, ◖ 10325 = 5125 + 325·2^4 ◗] ? 10327 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 5079 = -41 + 5·2^10 ◗, ◖ 10327 = 5079 + 41·2^7 ◗] ---- ? 10331 /4/ [◖ 1 ◗, ◖ 2047 = -1 + 1·2^11 ◗, ◖ 2079 = 2047 + 1·2^5 ◗, ◖ 6173 = 2079 + 2047·2^1 ◗, ◖ 10331 = 6173 + 2079·2^1 ◗] ? 10333 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 131 = 3 + 1·2^7 ◗, ◖ 323 = 131 + 3·2^6 ◗, ◖ 10333 = -3 + 323·2^5 ◗] ? 10335 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 131 = 3 + 1·2^7 ◗, ◖ 323 = 131 + 3·2^6 ◗, ◖ 10335 = -1 + 323·2^5 ◗] ? 10337 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 131 = 3 + 1·2^7 ◗, ◖ 323 = 131 + 3·2^6 ◗, ◖ 10337 = 1 + 323·2^5 ◗] ? 10339 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 131 = 3 + 1·2^7 ◗, ◖ 323 = 131 + 3·2^6 ◗, ◖ 10339 = 3 + 323·2^5 ◗] ? 10341 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 3447 = -9 + 27·2^7 ◗, ◖ 10341 = 3447 + 3447·2^1 ◗] ---- ? 10351 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4079 = -17 + 1·2^12 ◗, ◖ 49 = 17 + 1·2^5 ◗, ◖ 10351 = 4079 + 49·2^7 ◗] ---- ? 10359 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4599 = -9 + 9·2^9 ◗, ◖ 45 = 9 + 9·2^2 ◗, ◖ 10359 = 4599 + 45·2^7 ◗] ---- ? 10363 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5115 = -5 + 5·2^10 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 10363 = 5115 + 41·2^7 ◗] ? 10365 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 67 = 3 + 1·2^6 ◗, ◖ 163 = 67 + 3·2^5 ◗, ◖ 10365 = -67 + 163·2^6 ◗] ? 10367 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 10367 = 4095 + 49·2^7 ◗] ? 10369 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 10369 = 4097 + 49·2^7 ◗] ? 10371 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 4099 = 3 + 1·2^12 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 10371 = 4099 + 49·2^7 ◗] ? 10373 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5125 = 5 + 5·2^10 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 10373 = 5125 + 41·2^7 ◗] ---- ? 10377 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4617 = 9 + 9·2^9 ◗, ◖ 45 = 9 + 9·2^2 ◗, ◖ 10377 = 4617 + 45·2^7 ◗] ---- ? 10385 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4113 = 17 + 1·2^12 ◗, ◖ 49 = 17 + 1·2^5 ◗, ◖ 10385 = 4113 + 49·2^7 ◗] ---- ? 10395 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5115 = -5 + 5·2^10 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 10395 = 5115 + 165·2^5 ◗] ? 10397 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 2079 = -1 + 65·2^5 ◗, ◖ 6239 = 2079 + 65·2^6 ◗, ◖ 10397 = 6239 + 2079·2^1 ◗] ? 10399 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 97 = 33 + 1·2^6 ◗, ◖ 163 = 97 + 33·2^1 ◗, ◖ 10399 = -33 + 163·2^6 ◗] ? 10401 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 193 = 65 + 1·2^7 ◗, ◖ 323 = 193 + 65·2^1 ◗, ◖ 10401 = 65 + 323·2^5 ◗] ? 10403 /4/ [◖ 1 ◗, ◖ 65 = 1 + 1·2^6 ◗, ◖ 2081 = 1 + 65·2^5 ◗, ◖ 6241 = 2081 + 65·2^6 ◗, ◖ 10403 = 6241 + 2081·2^1 ◗] ? 10405 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5125 = 5 + 5·2^10 ◗, ◖ 165 = 5 + 5·2^5 ◗, ◖ 10405 = 5125 + 165·2^5 ◗] ---- ? 10409 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 41 = 1 + 5·2^3 ◗, ◖ 5161 = 41 + 5·2^10 ◗, ◖ 10409 = 5161 + 41·2^7 ◗] ---- ? 10413 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 517 = 5 + 1·2^9 ◗, ◖ 1157 = 517 + 5·2^7 ◗, ◖ 10413 = 1157 + 1157·2^3 ◗] ---- ? 10417 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 385 = 129 + 1·2^8 ◗, ◖ 643 = 385 + 129·2^1 ◗, ◖ 10417 = 129 + 643·2^4 ◗] ---- ? 10427 /4/ [◖ 1 ◗, ◖ 2047 = -1 + 1·2^11 ◗, ◖ 2111 = 2047 + 1·2^6 ◗, ◖ 6205 = 2111 + 2047·2^1 ◗, ◖ 10427 = 6205 + 2111·2^1 ◗] ? 10429 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 67 = 3 + 1·2^6 ◗, ◖ 163 = 67 + 3·2^5 ◗, ◖ 10429 = -3 + 163·2^6 ◗] ? 10431 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 67 = 3 + 1·2^6 ◗, ◖ 163 = 67 + 3·2^5 ◗, ◖ 10431 = -1 + 163·2^6 ◗] ? 10433 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 67 = 3 + 1·2^6 ◗, ◖ 163 = 67 + 3·2^5 ◗, ◖ 10433 = 1 + 163·2^6 ◗] ? 10435 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 67 = 3 + 1·2^6 ◗, ◖ 163 = 67 + 3·2^5 ◗, ◖ 10435 = 3 + 163·2^6 ◗] ? 10437 /4/ [◖ 1 ◗, ◖ 2049 = 1 + 1·2^11 ◗, ◖ 2113 = 2049 + 1·2^6 ◗, ◖ 6211 = 2113 + 2049·2^1 ◗, ◖ 10437 = 6211 + 2113·2^1 ◗] ---- ? 10445 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 253 = -3 + 1·2^8 ◗, ◖ 637 = 253 + 3·2^7 ◗, ◖ 10445 = 253 + 637·2^4 ◗] ? 10447 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 49 = 33 + 1·2^4 ◗, ◖ 4175 = -49 + 33·2^7 ◗, ◖ 10447 = 4175 + 49·2^7 ◗] ? 10449 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 4257 = 129 + 129·2^5 ◗, ◖ 387 = 129 + 129·2^1 ◗, ◖ 10449 = 4257 + 387·2^4 ◗] ---- ? 10455 /4/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 4335 = 255 + 255·2^4 ◗, ◖ 765 = 255 + 255·2^1 ◗, ◖ 10455 = 4335 + 765·2^3 ◗] ---- ? 10461 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 125 = -3 + 1·2^7 ◗, ◖ 317 = 125 + 3·2^6 ◗, ◖ 10461 = 317 + 317·2^5 ◗] ? 10463 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 4191 = -33 + 33·2^7 ◗, ◖ 49 = 33 + 1·2^4 ◗, ◖ 10463 = 4191 + 49·2^7 ◗] ? 10465 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 97 = 33 + 1·2^6 ◗, ◖ 163 = 97 + 33·2^1 ◗, ◖ 10465 = 33 + 163·2^6 ◗] ? 10467 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 131 = 3 + 1·2^7 ◗, ◖ 323 = 131 + 3·2^6 ◗, ◖ 10467 = 131 + 323·2^5 ◗] ---- ? 10471 /4/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 767 = 255 + 1·2^9 ◗, ◖ 1277 = 767 + 255·2^1 ◗, ◖ 10471 = 255 + 1277·2^3 ◗] ---- ? 10475 /4/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 1279 = 255 + 1·2^10 ◗, ◖ 2299 = 1279 + 255·2^2 ◗, ◖ 10475 = 1279 + 2299·2^2 ◗] ---- ? 10479 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4079 = -17 + 1·2^12 ◗, ◖ 25 = 17 + 1·2^3 ◗, ◖ 10479 = 4079 + 25·2^8 ◗] ---- ? 10487 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4087 = -9 + 1·2^12 ◗, ◖ 25 = 9 + 1·2^4 ◗, ◖ 10487 = 4087 + 25·2^8 ◗] ---- ? 10491 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 4091 = -5 + 1·2^12 ◗, ◖ 25 = 5 + 5·2^2 ◗, ◖ 10491 = 4091 + 25·2^8 ◗] ? 10493 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 4093 = -3 + 1·2^12 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 10493 = 4093 + 25·2^8 ◗] ? 10495 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 10495 = 4095 + 25·2^8 ◗] ? 10497 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 10497 = 4097 + 25·2^8 ◗] ? 10499 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 67 = 3 + 1·2^6 ◗, ◖ 163 = 67 + 3·2^5 ◗, ◖ 10499 = 67 + 163·2^6 ◗] ? 10501 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 4101 = 5 + 1·2^12 ◗, ◖ 25 = 5 + 5·2^2 ◗, ◖ 10501 = 4101 + 25·2^8 ◗] ---- ? 10505 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4105 = 9 + 1·2^12 ◗, ◖ 25 = 9 + 1·2^4 ◗, ◖ 10505 = 4105 + 25·2^8 ◗] ---- ? 10513 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4113 = 17 + 1·2^12 ◗, ◖ 25 = 17 + 1·2^3 ◗, ◖ 10513 = 4113 + 25·2^8 ◗] ---- ? 10517 /4/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 1281 = 257 + 1·2^10 ◗, ◖ 2309 = 1281 + 257·2^2 ◗, ◖ 10517 = 1281 + 2309·2^2 ◗] ---- ? 10521 /4/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 769 = 257 + 1·2^9 ◗, ◖ 1283 = 769 + 257·2^1 ◗, ◖ 10521 = 257 + 1283·2^3 ◗] ---- ? 10527 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 4191 = -33 + 33·2^7 ◗, ◖ 99 = 33 + 33·2^1 ◗, ◖ 10527 = 4191 + 99·2^6 ◗] ? 10529 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 97 = 33 + 1·2^6 ◗, ◖ 163 = 97 + 33·2^1 ◗, ◖ 10529 = 97 + 163·2^6 ◗] ? 10531 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 163 = 99 + 1·2^6 ◗, ◖ 10531 = 99 + 163·2^6 ◗] ---- ? 10537 /4/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 4369 = 257 + 257·2^4 ◗, ◖ 771 = 257 + 257·2^1 ◗, ◖ 10537 = 4369 + 771·2^3 ◗] ---- ? 10541 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 35 = 3 + 1·2^5 ◗, ◖ 83 = 35 + 3·2^4 ◗, ◖ 10541 = -83 + 83·2^7 ◗] ? 10543 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 319 = -1 + 5·2^6 ◗, ◖ 5439 = 319 + 5·2^10 ◗, ◖ 10543 = 5439 + 319·2^4 ◗] ? 10545 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 49 = 33 + 1·2^4 ◗, ◖ 4273 = 49 + 33·2^7 ◗, ◖ 10545 = 4273 + 49·2^7 ◗] ? 10547 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 259 = 3 + 1·2^8 ◗, ◖ 643 = 259 + 3·2^7 ◗, ◖ 10547 = 259 + 643·2^4 ◗] ---- ? 10555 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5115 = -5 + 5·2^10 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 10555 = 5115 + 85·2^6 ◗] ? 10557 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 2111 = -1 + 33·2^6 ◗, ◖ 6335 = 2111 + 33·2^7 ◗, ◖ 10557 = 6335 + 2111·2^1 ◗] ? 10559 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5119 = -1 + 5·2^10 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 10559 = 5119 + 85·2^6 ◗] ? 10561 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5121 = 1 + 5·2^10 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 10561 = 5121 + 85·2^6 ◗] ? 10563 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 2113 = 1 + 33·2^6 ◗, ◖ 6337 = 2113 + 33·2^7 ◗, ◖ 10563 = 6337 + 2113·2^1 ◗] ? 10565 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5125 = 5 + 5·2^10 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 10565 = 5125 + 85·2^6 ◗] ---- ? 10573 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 83 = 51 + 1·2^5 ◗, ◖ 10573 = -51 + 83·2^7 ◗] ? 10575 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 49 = 17 + 1·2^5 ◗, ◖ 83 = 49 + 17·2^1 ◗, ◖ 10575 = -49 + 83·2^7 ◗] ? 10577 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 321 = 1 + 5·2^6 ◗, ◖ 5441 = 321 + 5·2^10 ◗, ◖ 10577 = 5441 + 321·2^4 ◗] ---- ? 10589 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 35 = 3 + 1·2^5 ◗, ◖ 83 = 35 + 3·2^4 ◗, ◖ 10589 = -35 + 83·2^7 ◗] ? 10591 /4/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 383 = 255 + 1·2^7 ◗, ◖ 4463 = 383 + 255·2^4 ◗, ◖ 10591 = 4463 + 383·2^4 ◗] ? 10593 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 4257 = 33 + 33·2^7 ◗, ◖ 99 = 33 + 33·2^1 ◗, ◖ 10593 = 4257 + 99·2^6 ◗] ? 10595 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 67 = 3 + 1·2^6 ◗, ◖ 163 = 67 + 3·2^5 ◗, ◖ 10595 = 163 + 163·2^6 ◗] ---- ? 10607 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 49 = 17 + 1·2^5 ◗, ◖ 83 = 49 + 17·2^1 ◗, ◖ 10607 = -17 + 83·2^7 ◗] ---- ? 10619 /4/ [◖ 1 ◗, ◖ 2047 = -1 + 1·2^11 ◗, ◖ 2175 = 2047 + 1·2^7 ◗, ◖ 6269 = 2175 + 2047·2^1 ◗, ◖ 10619 = 6269 + 2175·2^1 ◗] ? 10621 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 35 = 3 + 1·2^5 ◗, ◖ 83 = 35 + 3·2^4 ◗, ◖ 10621 = -3 + 83·2^7 ◗] ? 10623 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 35 = 3 + 1·2^5 ◗, ◖ 83 = 35 + 3·2^4 ◗, ◖ 10623 = -1 + 83·2^7 ◗] ? 10625 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 35 = 3 + 1·2^5 ◗, ◖ 83 = 35 + 3·2^4 ◗, ◖ 10625 = 1 + 83·2^7 ◗] ? 10627 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 35 = 3 + 1·2^5 ◗, ◖ 83 = 35 + 3·2^4 ◗, ◖ 10627 = 3 + 83·2^7 ◗] ? 10629 /4/ [◖ 1 ◗, ◖ 2049 = 1 + 1·2^11 ◗, ◖ 2177 = 2049 + 1·2^7 ◗, ◖ 6275 = 2177 + 2049·2^1 ◗, ◖ 10629 = 6275 + 2177·2^1 ◗] ---- ? 10641 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 49 = 17 + 1·2^5 ◗, ◖ 83 = 49 + 17·2^1 ◗, ◖ 10641 = 17 + 83·2^7 ◗] ---- ? 10645 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 5205 = 85 + 5·2^10 ◗, ◖ 10645 = 5205 + 85·2^6 ◗] ---- ? 10657 /4/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 385 = 257 + 1·2^7 ◗, ◖ 4497 = 385 + 257·2^4 ◗, ◖ 10657 = 4497 + 385·2^4 ◗] ? 10659 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 35 = 3 + 1·2^5 ◗, ◖ 83 = 35 + 3·2^4 ◗, ◖ 10659 = 35 + 83·2^7 ◗] ---- ? 10673 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 49 = 17 + 1·2^5 ◗, ◖ 83 = 49 + 17·2^1 ◗, ◖ 10673 = 49 + 83·2^7 ◗] ? 10675 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 83 = 51 + 1·2^5 ◗, ◖ 10675 = 51 + 83·2^7 ◗] ---- ? 10707 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 35 = 3 + 1·2^5 ◗, ◖ 83 = 35 + 3·2^4 ◗, ◖ 10707 = 83 + 83·2^7 ◗] ---- ? 10725 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 509 = -3 + 1·2^9 ◗, ◖ 1277 = 509 + 3·2^8 ◗, ◖ 10725 = 509 + 1277·2^3 ◗] ? 10727 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 25 = 17 + 1·2^3 ◗, ◖ 4327 = -25 + 17·2^8 ◗, ◖ 10727 = 4327 + 25·2^8 ◗] ---- ? 10731 /4/ [◖ 1 ◗, ◖ 511 = -1 + 1·2^9 ◗, ◖ 4599 = 511 + 511·2^3 ◗, ◖ 1533 = 511 + 511·2^1 ◗, ◖ 10731 = 4599 + 1533·2^2 ◗] ---- ? 10735 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4335 = -17 + 17·2^8 ◗, ◖ 25 = 17 + 1·2^3 ◗, ◖ 10735 = 4335 + 25·2^8 ◗] ? 10737 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1533 = -3 + 3·2^9 ◗, ◖ 2301 = 1533 + 3·2^8 ◗, ◖ 10737 = 1533 + 2301·2^2 ◗] ? 10739 /4/ [◖ 1 ◗, ◖ 511 = -1 + 1·2^9 ◗, ◖ 1535 = 511 + 1·2^10 ◗, ◖ 2557 = 1535 + 511·2^1 ◗, ◖ 10739 = 511 + 2557·2^2 ◗] ? 10741 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11 = 1 + 5·2^1 ◗, ◖ 5109 = -11 + 5·2^10 ◗, ◖ 10741 = 5109 + 11·2^9 ◗] ? 10743 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1533 = -3 + 3·2^9 ◗, ◖ 4605 = 1533 + 3·2^10 ◗, ◖ 10743 = 1533 + 4605·2^1 ◗] ? 10745 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1535 = -1 + 3·2^9 ◗, ◖ 4605 = 1535 + 1535·2^1 ◗, ◖ 10745 = 1535 + 4605·2^1 ◗] ? 10747 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 4091 = -5 + 1·2^12 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 10747 = 4091 + 13·2^9 ◗] ? 10749 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 4093 = -3 + 1·2^12 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 10749 = 4093 + 13·2^9 ◗] ? 10751 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 10751 = 4095 + 13·2^9 ◗] ? 10753 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 10753 = 4097 + 13·2^9 ◗] ? 10755 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 4099 = 3 + 1·2^12 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 10755 = 4099 + 13·2^9 ◗] ? 10757 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 4101 = 5 + 1·2^12 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 10757 = 4101 + 13·2^9 ◗] ? 10759 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1537 = 1 + 3·2^9 ◗, ◖ 4611 = 1537 + 1537·2^1 ◗, ◖ 10759 = 1537 + 4611·2^1 ◗] ? 10761 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1539 = 3 + 3·2^9 ◗, ◖ 4611 = 1539 + 3·2^10 ◗, ◖ 10761 = 1539 + 4611·2^1 ◗] ? 10763 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11 = 1 + 5·2^1 ◗, ◖ 5131 = 11 + 5·2^10 ◗, ◖ 10763 = 5131 + 11·2^9 ◗] ? 10765 /4/ [◖ 1 ◗, ◖ 513 = 1 + 1·2^9 ◗, ◖ 1537 = 513 + 1·2^10 ◗, ◖ 2563 = 1537 + 513·2^1 ◗, ◖ 10765 = 513 + 2563·2^2 ◗] ? 10767 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1539 = 3 + 3·2^9 ◗, ◖ 2307 = 1539 + 3·2^8 ◗, ◖ 10767 = 1539 + 2307·2^2 ◗] ? 10769 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4369 = 17 + 17·2^8 ◗, ◖ 25 = 17 + 1·2^3 ◗, ◖ 10769 = 4369 + 25·2^8 ◗] ---- ? 10773 /4/ [◖ 1 ◗, ◖ 513 = 1 + 1·2^9 ◗, ◖ 4617 = 513 + 513·2^3 ◗, ◖ 1539 = 513 + 513·2^1 ◗, ◖ 10773 = 4617 + 1539·2^2 ◗] ---- ? 10777 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 25 = 17 + 1·2^3 ◗, ◖ 4377 = 25 + 17·2^8 ◗, ◖ 10777 = 4377 + 25·2^8 ◗] ? 10779 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 515 = 3 + 1·2^9 ◗, ◖ 1283 = 515 + 3·2^8 ◗, ◖ 10779 = 515 + 1283·2^3 ◗] ---- ? 10795 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 85 = 5 + 5·2^4 ◗, ◖ 5355 = -85 + 85·2^6 ◗, ◖ 10795 = 5355 + 85·2^6 ◗] ---- ? 10829 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 253 = -3 + 1·2^8 ◗, ◖ 637 = 253 + 3·2^7 ◗, ◖ 10829 = 637 + 637·2^4 ◗] ---- ? 10835 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 45 = 5 + 5·2^3 ◗, ◖ 5075 = -45 + 5·2^10 ◗, ◖ 10835 = 5075 + 45·2^7 ◗] ---- ? 10863 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4335 = -17 + 17·2^8 ◗, ◖ 51 = 17 + 17·2^1 ◗, ◖ 10863 = 4335 + 51·2^7 ◗] ---- ? 10871 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 639 = -1 + 5·2^7 ◗, ◖ 5759 = 639 + 5·2^10 ◗, ◖ 10871 = 5759 + 639·2^3 ◗] ---- ? 10875 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5115 = -5 + 5·2^10 ◗, ◖ 45 = 5 + 5·2^3 ◗, ◖ 10875 = 5115 + 45·2^7 ◗] ? 10877 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 2175 = -1 + 17·2^7 ◗, ◖ 6527 = 2175 + 17·2^8 ◗, ◖ 10877 = 6527 + 2175·2^1 ◗] ? 10879 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5119 = -1 + 5·2^10 ◗, ◖ 45 = 5 + 5·2^3 ◗, ◖ 10879 = 5119 + 45·2^7 ◗] ? 10881 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5121 = 1 + 5·2^10 ◗, ◖ 45 = 5 + 5·2^3 ◗, ◖ 10881 = 5121 + 45·2^7 ◗] ? 10883 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 2177 = 1 + 17·2^7 ◗, ◖ 6529 = 2177 + 17·2^8 ◗, ◖ 10883 = 6529 + 2177·2^1 ◗] ? 10885 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5125 = 5 + 5·2^10 ◗, ◖ 45 = 5 + 5·2^3 ◗, ◖ 10885 = 5125 + 45·2^7 ◗] ---- ? 10889 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 641 = 1 + 5·2^7 ◗, ◖ 5761 = 641 + 5·2^10 ◗, ◖ 10889 = 5761 + 641·2^3 ◗] ---- ? 10897 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 4369 = 17 + 17·2^8 ◗, ◖ 51 = 17 + 17·2^1 ◗, ◖ 10897 = 4369 + 51·2^7 ◗] ---- ? 10925 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 45 = 5 + 5·2^3 ◗, ◖ 5165 = 45 + 5·2^10 ◗, ◖ 10925 = 5165 + 45·2^7 ◗] ---- ? 10931 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 259 = 3 + 1·2^8 ◗, ◖ 643 = 259 + 3·2^7 ◗, ◖ 10931 = 643 + 643·2^4 ◗] ---- ? 10965 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 19 = 3 + 1·2^4 ◗, ◖ 43 = 19 + 3·2^3 ◗, ◖ 10965 = -43 + 43·2^8 ◗] ---- ? 10981 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 43 = 27 + 1·2^4 ◗, ◖ 10981 = -27 + 43·2^8 ◗] ? 10983 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 25 = 9 + 1·2^4 ◗, ◖ 43 = 25 + 9·2^1 ◗, ◖ 10983 = -25 + 43·2^8 ◗] ---- ? 10989 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 19 = 3 + 1·2^4 ◗, ◖ 43 = 19 + 3·2^3 ◗, ◖ 10989 = -19 + 43·2^8 ◗] ? 10991 /4/ [◖ 1 ◗, ◖ 511 = -1 + 1·2^9 ◗, ◖ 767 = 511 + 1·2^8 ◗, ◖ 4855 = 767 + 511·2^3 ◗, ◖ 10991 = 4855 + 767·2^3 ◗] ---- ? 10999 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 25 = 9 + 1·2^4 ◗, ◖ 43 = 25 + 9·2^1 ◗, ◖ 10999 = -9 + 43·2^8 ◗] ---- ? 11003 /4/ [◖ 1 ◗, ◖ 2047 = -1 + 1·2^11 ◗, ◖ 2303 = 2047 + 1·2^8 ◗, ◖ 6397 = 2303 + 2047·2^1 ◗, ◖ 11003 = 6397 + 2303·2^1 ◗] ? 11005 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 19 = 3 + 1·2^4 ◗, ◖ 43 = 19 + 3·2^3 ◗, ◖ 11005 = -3 + 43·2^8 ◗] ? 11007 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 19 = 3 + 1·2^4 ◗, ◖ 43 = 19 + 3·2^3 ◗, ◖ 11007 = -1 + 43·2^8 ◗] ? 11009 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 19 = 3 + 1·2^4 ◗, ◖ 43 = 19 + 3·2^3 ◗, ◖ 11009 = 1 + 43·2^8 ◗] ? 11011 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 19 = 3 + 1·2^4 ◗, ◖ 43 = 19 + 3·2^3 ◗, ◖ 11011 = 3 + 43·2^8 ◗] ? 11013 /4/ [◖ 1 ◗, ◖ 2049 = 1 + 1·2^11 ◗, ◖ 2305 = 2049 + 1·2^8 ◗, ◖ 6403 = 2305 + 2049·2^1 ◗, ◖ 11013 = 6403 + 2305·2^1 ◗] ---- ? 11017 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 25 = 9 + 1·2^4 ◗, ◖ 43 = 25 + 9·2^1 ◗, ◖ 11017 = 9 + 43·2^8 ◗] ---- ? 11025 /4/ [◖ 1 ◗, ◖ 513 = 1 + 1·2^9 ◗, ◖ 769 = 513 + 1·2^8 ◗, ◖ 4873 = 769 + 513·2^3 ◗, ◖ 11025 = 4873 + 769·2^3 ◗] ? 11027 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 19 = 3 + 1·2^4 ◗, ◖ 43 = 19 + 3·2^3 ◗, ◖ 11027 = 19 + 43·2^8 ◗] ---- ? 11033 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 25 = 9 + 1·2^4 ◗, ◖ 43 = 25 + 9·2^1 ◗, ◖ 11033 = 25 + 43·2^8 ◗] ? 11035 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 43 = 27 + 1·2^4 ◗, ◖ 11035 = 27 + 43·2^8 ◗] ---- ? 11051 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 19 = 3 + 1·2^4 ◗, ◖ 43 = 19 + 3·2^3 ◗, ◖ 11051 = 43 + 43·2^8 ◗] ---- ? 11249 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1021 = -3 + 1·2^10 ◗, ◖ 2557 = 1021 + 3·2^9 ◗, ◖ 11249 = 1021 + 2557·2^2 ◗] ? 11251 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 13 = 9 + 1·2^2 ◗, ◖ 4595 = -13 + 9·2^9 ◗, ◖ 11251 = 4595 + 13·2^9 ◗] ? 11253 /4/ [◖ 1 ◗, ◖ 1023 = -1 + 1·2^10 ◗, ◖ 5115 = 1023 + 1023·2^2 ◗, ◖ 3069 = 1023 + 1023·2^1 ◗, ◖ 11253 = 5115 + 3069·2^1 ◗] ? 11255 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4599 = -9 + 9·2^9 ◗, ◖ 13 = 9 + 1·2^2 ◗, ◖ 11255 = 4599 + 13·2^9 ◗] ? 11257 /4/ [◖ 1 ◗, ◖ 1023 = -1 + 1·2^10 ◗, ◖ 3071 = 1023 + 1·2^11 ◗, ◖ 5117 = 3071 + 1023·2^1 ◗, ◖ 11257 = 1023 + 5117·2^1 ◗] ? 11259 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5115 = -5 + 5·2^10 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11259 = 5115 + 3·2^11 ◗] ? 11261 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6141 = -3 + 3·2^11 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11261 = 6141 + 5·2^10 ◗] ? 11263 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6143 = -1 + 3·2^11 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11263 = 6143 + 5·2^10 ◗] ? 11265 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6145 = 1 + 3·2^11 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11265 = 6145 + 5·2^10 ◗] ? 11267 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6147 = 3 + 3·2^11 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 11267 = 6147 + 5·2^10 ◗] ? 11269 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5125 = 5 + 5·2^10 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 11269 = 5125 + 3·2^11 ◗] ? 11271 /4/ [◖ 1 ◗, ◖ 1025 = 1 + 1·2^10 ◗, ◖ 3073 = 1025 + 1·2^11 ◗, ◖ 5123 = 3073 + 1025·2^1 ◗, ◖ 11271 = 1025 + 5123·2^1 ◗] ? 11273 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4617 = 9 + 9·2^9 ◗, ◖ 13 = 9 + 1·2^2 ◗, ◖ 11273 = 4617 + 13·2^9 ◗] ? 11275 /4/ [◖ 1 ◗, ◖ 1025 = 1 + 1·2^10 ◗, ◖ 5125 = 1025 + 1025·2^2 ◗, ◖ 3075 = 1025 + 1025·2^1 ◗, ◖ 11275 = 5125 + 3075·2^1 ◗] ? 11277 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 13 = 9 + 1·2^2 ◗, ◖ 4621 = 13 + 9·2^9 ◗, ◖ 11277 = 4621 + 13·2^9 ◗] ? 11279 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1027 = 3 + 1·2^10 ◗, ◖ 2563 = 1027 + 3·2^9 ◗, ◖ 11279 = 1027 + 2563·2^2 ◗] ---- ? 11475 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 5715 = -45 + 45·2^7 ◗, ◖ 11475 = 5715 + 45·2^7 ◗] ---- ? 11493 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 509 = -3 + 1·2^9 ◗, ◖ 1277 = 509 + 3·2^8 ◗, ◖ 11493 = 1277 + 1277·2^3 ◗] ? 11495 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 1019 = -5 + 1·2^10 ◗, ◖ 2299 = 1019 + 5·2^8 ◗, ◖ 11495 = 2299 + 2299·2^2 ◗] ---- ? 11499 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 6123 = -21 + 3·2^11 ◗, ◖ 11499 = 6123 + 21·2^8 ◗] ---- ? 11505 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 45 = 15 + 15·2^1 ◗, ◖ 5745 = -15 + 45·2^7 ◗, ◖ 11505 = 5745 + 45·2^7 ◗] ---- ? 11511 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4599 = -9 + 9·2^9 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 11511 = 4599 + 27·2^8 ◗] ? 11513 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 767 = -1 + 3·2^8 ◗, ◖ 5377 = -767 + 3·2^11 ◗, ◖ 11513 = 5377 + 767·2^3 ◗] ? 11515 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5115 = -5 + 5·2^10 ◗, ◖ 25 = 5 + 5·2^2 ◗, ◖ 11515 = 5115 + 25·2^8 ◗] ? 11517 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6141 = -3 + 3·2^11 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 11517 = 6141 + 21·2^8 ◗] ? 11519 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6143 = -1 + 3·2^11 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 11519 = 6143 + 21·2^8 ◗] ? 11521 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6145 = 1 + 3·2^11 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 11521 = 6145 + 21·2^8 ◗] ? 11523 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6147 = 3 + 3·2^11 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 11523 = 6147 + 21·2^8 ◗] ? 11525 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5125 = 5 + 5·2^10 ◗, ◖ 25 = 5 + 5·2^2 ◗, ◖ 11525 = 5125 + 25·2^8 ◗] ? 11527 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 769 = 1 + 3·2^8 ◗, ◖ 5375 = -769 + 3·2^11 ◗, ◖ 11527 = 5375 + 769·2^3 ◗] ? 11529 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 4617 = 9 + 9·2^9 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 11529 = 4617 + 27·2^8 ◗] ---- ? 11535 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 45 = 15 + 15·2^1 ◗, ◖ 5775 = 15 + 45·2^7 ◗, ◖ 11535 = 5775 + 45·2^7 ◗] ---- ? 11541 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 21 = -3 + 3·2^3 ◗, ◖ 6165 = 21 + 3·2^11 ◗, ◖ 11541 = 6165 + 21·2^8 ◗] ---- ? 11545 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 1029 = 5 + 1·2^10 ◗, ◖ 2309 = 1029 + 5·2^8 ◗, ◖ 11545 = 2309 + 2309·2^2 ◗] ? 11547 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 515 = 3 + 1·2^9 ◗, ◖ 1283 = 515 + 3·2^8 ◗, ◖ 11547 = 1283 + 1283·2^3 ◗] ---- ? 11565 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 5805 = 45 + 45·2^7 ◗, ◖ 11565 = 5805 + 45·2^7 ◗] ---- ? 11753 /4/ [◖ 1 ◗, ◖ 511 = -1 + 1·2^9 ◗, ◖ 1533 = 511 + 511·2^1 ◗, ◖ 5621 = -511 + 1533·2^2 ◗, ◖ 11753 = 5621 + 1533·2^2 ◗] ---- ? 11761 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1533 = -3 + 3·2^9 ◗, ◖ 2557 = 1533 + 1·2^10 ◗, ◖ 11761 = 1533 + 2557·2^2 ◗] ? 11763 /4/ [◖ 1 ◗, ◖ 511 = -1 + 1·2^9 ◗, ◖ 1535 = 511 + 1·2^10 ◗, ◖ 2557 = 1535 + 511·2^1 ◗, ◖ 11763 = 1535 + 2557·2^2 ◗] ? 11765 /4/ [◖ 1 ◗, ◖ 511 = -1 + 1·2^9 ◗, ◖ 2559 = 511 + 1·2^11 ◗, ◖ 4603 = 2559 + 511·2^2 ◗, ◖ 11765 = 2559 + 4603·2^1 ◗] ? 11767 /4/ [◖ 1 ◗, ◖ 1023 = -1 + 1·2^10 ◗, ◖ 1535 = 1023 + 1·2^9 ◗, ◖ 5627 = 1535 + 1023·2^2 ◗, ◖ 11767 = 5627 + 1535·2^2 ◗] ? 11769 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 23 = 7 + 1·2^4 ◗, ◖ 5881 = -7 + 23·2^8 ◗, ◖ 11769 = 5881 + 23·2^8 ◗] ? 11771 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5115 = -5 + 5·2^10 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 11771 = 5115 + 13·2^9 ◗] ? 11773 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6141 = -3 + 3·2^11 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 11773 = 6141 + 11·2^9 ◗] ? 11775 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6143 = -1 + 3·2^11 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 11775 = 6143 + 11·2^9 ◗] ? 11777 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6145 = 1 + 3·2^11 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 11777 = 6145 + 11·2^9 ◗] ? 11779 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6147 = 3 + 3·2^11 ◗, ◖ 11 = -1 + 3·2^2 ◗, ◖ 11779 = 6147 + 11·2^9 ◗] ? 11781 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 5125 = 5 + 5·2^10 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 11781 = 5125 + 13·2^9 ◗] ? 11783 /4/ [◖ 1 ◗, ◖ 7 = -1 + 1·2^3 ◗, ◖ 23 = 7 + 1·2^4 ◗, ◖ 5895 = 7 + 23·2^8 ◗, ◖ 11783 = 5895 + 23·2^8 ◗] ? 11785 /4/ [◖ 1 ◗, ◖ 1025 = 1 + 1·2^10 ◗, ◖ 1537 = 1025 + 1·2^9 ◗, ◖ 5637 = 1537 + 1025·2^2 ◗, ◖ 11785 = 5637 + 1537·2^2 ◗] ? 11787 /4/ [◖ 1 ◗, ◖ 513 = 1 + 1·2^9 ◗, ◖ 2561 = 513 + 1·2^11 ◗, ◖ 4613 = 2561 + 513·2^2 ◗, ◖ 11787 = 2561 + 4613·2^1 ◗] ? 11789 /4/ [◖ 1 ◗, ◖ 513 = 1 + 1·2^9 ◗, ◖ 1537 = 513 + 1·2^10 ◗, ◖ 2563 = 1537 + 513·2^1 ◗, ◖ 11789 = 1537 + 2563·2^2 ◗] ? 11791 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1539 = 3 + 3·2^9 ◗, ◖ 2563 = 1539 + 1·2^10 ◗, ◖ 11791 = 1539 + 2563·2^2 ◗] ---- ? 11799 /4/ [◖ 1 ◗, ◖ 513 = 1 + 1·2^9 ◗, ◖ 1539 = 513 + 513·2^1 ◗, ◖ 5643 = -513 + 1539·2^2 ◗, ◖ 11799 = 5643 + 1539·2^2 ◗] ---- ? 11811 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 5859 = -93 + 93·2^6 ◗, ◖ 11811 = 5859 + 93·2^6 ◗] ---- ? 11859 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 6099 = -45 + 3·2^11 ◗, ◖ 11859 = 6099 + 45·2^7 ◗] ---- ? 11873 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 93 = 31 + 31·2^1 ◗, ◖ 5921 = -31 + 93·2^6 ◗, ◖ 11873 = 5921 + 93·2^6 ◗] ---- ? 11889 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 383 = -1 + 3·2^7 ◗, ◖ 5761 = -383 + 3·2^11 ◗, ◖ 11889 = 5761 + 383·2^4 ◗] ---- ? 11901 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6141 = -3 + 3·2^11 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 11901 = 6141 + 45·2^7 ◗] ? 11903 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6143 = -1 + 3·2^11 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 11903 = 6143 + 45·2^7 ◗] ? 11905 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6145 = 1 + 3·2^11 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 11905 = 6145 + 45·2^7 ◗] ? 11907 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6147 = 3 + 3·2^11 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 11907 = 6147 + 45·2^7 ◗] ---- ? 11919 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 385 = 1 + 3·2^7 ◗, ◖ 5759 = -385 + 3·2^11 ◗, ◖ 11919 = 5759 + 385·2^4 ◗] ---- ? 11935 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 93 = 31 + 31·2^1 ◗, ◖ 5983 = 31 + 93·2^6 ◗, ◖ 11935 = 5983 + 93·2^6 ◗] ---- ? 11949 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 45 = -3 + 3·2^4 ◗, ◖ 6189 = 45 + 3·2^11 ◗, ◖ 11949 = 6189 + 45·2^7 ◗] ---- ? 11985 /4/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 765 = 255 + 255·2^1 ◗, ◖ 5865 = -255 + 765·2^3 ◗, ◖ 11985 = 5865 + 765·2^3 ◗] ---- ? 11997 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 6045 = 93 + 93·2^6 ◗, ◖ 11997 = 6045 + 93·2^6 ◗] ---- ? 12001 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 47 = 31 + 1·2^4 ◗, ◖ 5985 = -31 + 47·2^7 ◗, ◖ 12001 = 5985 + 47·2^7 ◗] ? 12003 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 6051 = -93 + 3·2^11 ◗, ◖ 12003 = 6051 + 93·2^6 ◗] ---- ? 12009 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 6121 = -23 + 3·2^11 ◗, ◖ 12009 = 6121 + 23·2^8 ◗] ---- ? 12017 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 47 = 15 + 1·2^5 ◗, ◖ 6001 = -15 + 47·2^7 ◗, ◖ 12017 = 6001 + 47·2^7 ◗] ---- ? 12029 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6141 = -3 + 3·2^11 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 12029 = 6141 + 23·2^8 ◗] ? 12031 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6143 = -1 + 3·2^11 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 12031 = 6143 + 23·2^8 ◗] ? 12033 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6145 = 1 + 3·2^11 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 12033 = 6145 + 23·2^8 ◗] ? 12035 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6147 = 3 + 3·2^11 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 12035 = 6147 + 23·2^8 ◗] ---- ? 12047 /4/ [◖ 1 ◗, ◖ 15 = -1 + 1·2^4 ◗, ◖ 47 = 15 + 1·2^5 ◗, ◖ 6031 = 15 + 47·2^7 ◗, ◖ 12047 = 6031 + 47·2^7 ◗] ---- ? 12055 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 23 = -1 + 3·2^3 ◗, ◖ 6167 = 23 + 3·2^11 ◗, ◖ 12055 = 6167 + 23·2^8 ◗] ---- ? 12063 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 47 = 31 + 1·2^4 ◗, ◖ 6047 = 31 + 47·2^7 ◗, ◖ 12063 = 6047 + 47·2^7 ◗] ? 12065 /4/ [◖ 1 ◗, ◖ 127 = -1 + 1·2^7 ◗, ◖ 381 = 127 + 127·2^1 ◗, ◖ 5969 = -127 + 381·2^4 ◗, ◖ 12065 = 5969 + 381·2^4 ◗] ---- ? 12079 /4/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 771 = 257 + 257·2^1 ◗, ◖ 5911 = -257 + 771·2^3 ◗, ◖ 12079 = 5911 + 771·2^3 ◗] ---- ? 12093 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6141 = -3 + 3·2^11 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 12093 = 6141 + 93·2^6 ◗] ? 12095 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6143 = -1 + 3·2^11 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 12095 = 6143 + 93·2^6 ◗] ? 12097 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6145 = 1 + 3·2^11 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 12097 = 6145 + 93·2^6 ◗] ? 12099 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6147 = 3 + 3·2^11 ◗, ◖ 93 = -3 + 3·2^5 ◗, ◖ 12099 = 6147 + 93·2^6 ◗] ---- ? 12113 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 6097 = -47 + 3·2^11 ◗, ◖ 12113 = 6097 + 47·2^7 ◗] ---- ? 12127 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 193 = 1 + 3·2^6 ◗, ◖ 5951 = -193 + 3·2^11 ◗, ◖ 12127 = 5951 + 193·2^5 ◗] ? 12129 /4/ [◖ 1 ◗, ◖ 31 = -1 + 1·2^5 ◗, ◖ 95 = 31 + 1·2^6 ◗, ◖ 6049 = -31 + 95·2^6 ◗, ◖ 12129 = 6049 + 95·2^6 ◗] ---- ? 12157 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6141 = -3 + 3·2^11 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 12157 = 6141 + 47·2^7 ◗] ? 12159 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6143 = -1 + 3·2^11 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 12159 = 6143 + 47·2^7 ◗] ? 12161 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6145 = 1 + 3·2^11 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 12161 = 6145 + 47·2^7 ◗] ? 12163 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6147 = 3 + 3·2^11 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 12163 = 6147 + 47·2^7 ◗] ---- ? 12189 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6141 = -3 + 3·2^11 ◗, ◖ 189 = -3 + 3·2^6 ◗, ◖ 12189 = 6141 + 189·2^5 ◗] ? 12191 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6143 = -1 + 3·2^11 ◗, ◖ 189 = -3 + 3·2^6 ◗, ◖ 12191 = 6143 + 189·2^5 ◗] ? 12193 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6145 = 1 + 3·2^11 ◗, ◖ 189 = -3 + 3·2^6 ◗, ◖ 12193 = 6145 + 189·2^5 ◗] ? 12195 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6147 = 3 + 3·2^11 ◗, ◖ 189 = -3 + 3·2^6 ◗, ◖ 12195 = 6147 + 189·2^5 ◗] ---- ? 12207 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 47 = -1 + 3·2^4 ◗, ◖ 6191 = 47 + 3·2^11 ◗, ◖ 12207 = 6191 + 47·2^7 ◗] ---- ? 12221 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6141 = -3 + 3·2^11 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 12221 = 6141 + 95·2^6 ◗] ? 12223 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6143 = -1 + 3·2^11 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 12223 = 6143 + 95·2^6 ◗] ? 12225 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6145 = 1 + 3·2^11 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 12225 = 6145 + 95·2^6 ◗] ? 12227 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6147 = 3 + 3·2^11 ◗, ◖ 95 = -1 + 3·2^5 ◗, ◖ 12227 = 6147 + 95·2^6 ◗] ---- ? 12237 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6141 = -3 + 3·2^11 ◗, ◖ 381 = -3 + 3·2^7 ◗, ◖ 12237 = 6141 + 381·2^4 ◗] ? 12239 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6143 = -1 + 3·2^11 ◗, ◖ 381 = -3 + 3·2^7 ◗, ◖ 12239 = 6143 + 381·2^4 ◗] ? 12241 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6145 = 1 + 3·2^11 ◗, ◖ 381 = -3 + 3·2^7 ◗, ◖ 12241 = 6145 + 381·2^4 ◗] ? 12243 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6147 = 3 + 3·2^11 ◗, ◖ 381 = -3 + 3·2^7 ◗, ◖ 12243 = 6147 + 381·2^4 ◗] ---- ? 12253 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6141 = -3 + 3·2^11 ◗, ◖ 191 = -1 + 3·2^6 ◗, ◖ 12253 = 6141 + 191·2^5 ◗] ? 12255 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6143 = -1 + 3·2^11 ◗, ◖ 191 = -1 + 3·2^6 ◗, ◖ 12255 = 6143 + 191·2^5 ◗] ? 12257 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6145 = 1 + 3·2^11 ◗, ◖ 191 = -1 + 3·2^6 ◗, ◖ 12257 = 6145 + 191·2^5 ◗] ? 12259 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6147 = 3 + 3·2^11 ◗, ◖ 191 = -1 + 3·2^6 ◗, ◖ 12259 = 6147 + 191·2^5 ◗] ? 12261 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6141 = -3 + 3·2^11 ◗, ◖ 765 = -3 + 3·2^8 ◗, ◖ 12261 = 6141 + 765·2^3 ◗] ? 12263 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6143 = -1 + 3·2^11 ◗, ◖ 765 = -3 + 3·2^8 ◗, ◖ 12263 = 6143 + 765·2^3 ◗] ? 12265 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6145 = 1 + 3·2^11 ◗, ◖ 765 = -3 + 3·2^8 ◗, ◖ 12265 = 6145 + 765·2^3 ◗] ? 12267 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6147 = 3 + 3·2^11 ◗, ◖ 765 = -3 + 3·2^8 ◗, ◖ 12267 = 6147 + 765·2^3 ◗] ? 12269 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6141 = -3 + 3·2^11 ◗, ◖ 383 = -1 + 3·2^7 ◗, ◖ 12269 = 6141 + 383·2^4 ◗] ? 12271 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6143 = -1 + 3·2^11 ◗, ◖ 383 = -1 + 3·2^7 ◗, ◖ 12271 = 6143 + 383·2^4 ◗] ? 12273 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6145 = 1 + 3·2^11 ◗, ◖ 383 = -1 + 3·2^7 ◗, ◖ 12273 = 6145 + 383·2^4 ◗] ? 12275 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6143 = -1 + 3·2^11 ◗, ◖ 1533 = -3 + 3·2^9 ◗, ◖ 12275 = 6143 + 1533·2^2 ◗] ? 12277 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6145 = 1 + 3·2^11 ◗, ◖ 1533 = -3 + 3·2^9 ◗, ◖ 12277 = 6145 + 1533·2^2 ◗] ? 12279 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6143 = -1 + 3·2^11 ◗, ◖ 767 = -1 + 3·2^8 ◗, ◖ 12279 = 6143 + 767·2^3 ◗] ? 12281 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6145 = 1 + 3·2^11 ◗, ◖ 767 = -1 + 3·2^8 ◗, ◖ 12281 = 6145 + 767·2^3 ◗] ? 12283 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6145 = 1 + 3·2^11 ◗, ◖ 3069 = -3 + 3·2^10 ◗, ◖ 12283 = 6145 + 3069·2^1 ◗] ? 12285 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6141 = -3 + 3·2^11 ◗, ◖ 12285 = 6141 + 3·2^11 ◗] ? 12287 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6143 = -1 + 3·2^11 ◗, ◖ 12287 = 6143 + 3·2^11 ◗] ? 12289 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6145 = 1 + 3·2^11 ◗, ◖ 12289 = 6145 + 3·2^11 ◗] ? 12291 /3/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6147 = 3 + 3·2^11 ◗, ◖ 12291 = 6147 + 3·2^11 ◗] ? 12293 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6145 = 1 + 3·2^11 ◗, ◖ 1537 = 1 + 3·2^9 ◗, ◖ 12293 = 6145 + 1537·2^2 ◗] ? 12295 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6145 = 1 + 3·2^11 ◗, ◖ 3075 = 3 + 3·2^10 ◗, ◖ 12295 = 6145 + 3075·2^1 ◗] ? 12297 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6145 = 1 + 3·2^11 ◗, ◖ 769 = 1 + 3·2^8 ◗, ◖ 12297 = 6145 + 769·2^3 ◗] ? 12299 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6143 = -1 + 3·2^11 ◗, ◖ 1539 = 3 + 3·2^9 ◗, ◖ 12299 = 6143 + 1539·2^2 ◗] ? 12301 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6145 = 1 + 3·2^11 ◗, ◖ 1539 = 3 + 3·2^9 ◗, ◖ 12301 = 6145 + 1539·2^2 ◗] ? 12303 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6143 = -1 + 3·2^11 ◗, ◖ 385 = 1 + 3·2^7 ◗, ◖ 12303 = 6143 + 385·2^4 ◗] ? 12305 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6145 = 1 + 3·2^11 ◗, ◖ 385 = 1 + 3·2^7 ◗, ◖ 12305 = 6145 + 385·2^4 ◗] ? 12307 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6147 = 3 + 3·2^11 ◗, ◖ 385 = 1 + 3·2^7 ◗, ◖ 12307 = 6147 + 385·2^4 ◗] ? 12309 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6141 = -3 + 3·2^11 ◗, ◖ 771 = 3 + 3·2^8 ◗, ◖ 12309 = 6141 + 771·2^3 ◗] ? 12311 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6143 = -1 + 3·2^11 ◗, ◖ 771 = 3 + 3·2^8 ◗, ◖ 12311 = 6143 + 771·2^3 ◗] ? 12313 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6145 = 1 + 3·2^11 ◗, ◖ 771 = 3 + 3·2^8 ◗, ◖ 12313 = 6145 + 771·2^3 ◗] ? 12315 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6147 = 3 + 3·2^11 ◗, ◖ 771 = 3 + 3·2^8 ◗, ◖ 12315 = 6147 + 771·2^3 ◗] ? 12317 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6141 = -3 + 3·2^11 ◗, ◖ 193 = 1 + 3·2^6 ◗, ◖ 12317 = 6141 + 193·2^5 ◗] ? 12319 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6143 = -1 + 3·2^11 ◗, ◖ 193 = 1 + 3·2^6 ◗, ◖ 12319 = 6143 + 193·2^5 ◗] ? 12321 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6145 = 1 + 3·2^11 ◗, ◖ 193 = 1 + 3·2^6 ◗, ◖ 12321 = 6145 + 193·2^5 ◗] ? 12323 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6147 = 3 + 3·2^11 ◗, ◖ 193 = 1 + 3·2^6 ◗, ◖ 12323 = 6147 + 193·2^5 ◗] ---- ? 12333 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6141 = -3 + 3·2^11 ◗, ◖ 387 = 3 + 3·2^7 ◗, ◖ 12333 = 6141 + 387·2^4 ◗] ? 12335 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6143 = -1 + 3·2^11 ◗, ◖ 387 = 3 + 3·2^7 ◗, ◖ 12335 = 6143 + 387·2^4 ◗] ? 12337 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6145 = 1 + 3·2^11 ◗, ◖ 387 = 3 + 3·2^7 ◗, ◖ 12337 = 6145 + 387·2^4 ◗] ? 12339 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6147 = 3 + 3·2^11 ◗, ◖ 387 = 3 + 3·2^7 ◗, ◖ 12339 = 6147 + 387·2^4 ◗] ---- ? 12349 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6141 = -3 + 3·2^11 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 12349 = 6141 + 97·2^6 ◗] ? 12351 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6143 = -1 + 3·2^11 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 12351 = 6143 + 97·2^6 ◗] ? 12353 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6145 = 1 + 3·2^11 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 12353 = 6145 + 97·2^6 ◗] ? 12355 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6147 = 3 + 3·2^11 ◗, ◖ 97 = 1 + 3·2^5 ◗, ◖ 12355 = 6147 + 97·2^6 ◗] ---- ? 12367 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 6095 = -49 + 3·2^11 ◗, ◖ 12367 = 6095 + 49·2^7 ◗] ---- ? 12381 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6141 = -3 + 3·2^11 ◗, ◖ 195 = 3 + 3·2^6 ◗, ◖ 12381 = 6141 + 195·2^5 ◗] ? 12383 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6143 = -1 + 3·2^11 ◗, ◖ 195 = 3 + 3·2^6 ◗, ◖ 12383 = 6143 + 195·2^5 ◗] ? 12385 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6145 = 1 + 3·2^11 ◗, ◖ 195 = 3 + 3·2^6 ◗, ◖ 12385 = 6145 + 195·2^5 ◗] ? 12387 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6147 = 3 + 3·2^11 ◗, ◖ 195 = 3 + 3·2^6 ◗, ◖ 12387 = 6147 + 195·2^5 ◗] ---- ? 12413 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6141 = -3 + 3·2^11 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 12413 = 6141 + 49·2^7 ◗] ? 12415 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6143 = -1 + 3·2^11 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 12415 = 6143 + 49·2^7 ◗] ? 12417 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6145 = 1 + 3·2^11 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 12417 = 6145 + 49·2^7 ◗] ? 12419 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6147 = 3 + 3·2^11 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 12419 = 6147 + 49·2^7 ◗] ---- ? 12447 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 191 = -1 + 3·2^6 ◗, ◖ 6335 = 191 + 3·2^11 ◗, ◖ 12447 = 6335 + 191·2^5 ◗] ? 12449 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 97 = 33 + 1·2^6 ◗, ◖ 6241 = 33 + 97·2^6 ◗, ◖ 12449 = 6241 + 97·2^6 ◗] ---- ? 12465 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 49 = 1 + 3·2^4 ◗, ◖ 6193 = 49 + 3·2^11 ◗, ◖ 12465 = 6193 + 49·2^7 ◗] ---- ? 12477 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6141 = -3 + 3·2^11 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 12477 = 6141 + 99·2^6 ◗] ? 12479 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6143 = -1 + 3·2^11 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 12479 = 6143 + 99·2^6 ◗] ? 12481 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6145 = 1 + 3·2^11 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 12481 = 6145 + 99·2^6 ◗] ? 12483 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6147 = 3 + 3·2^11 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 12483 = 6147 + 99·2^6 ◗] ---- ? 12495 /4/ [◖ 1 ◗, ◖ 255 = -1 + 1·2^8 ◗, ◖ 765 = 255 + 255·2^1 ◗, ◖ 6375 = 255 + 765·2^3 ◗, ◖ 12495 = 6375 + 765·2^3 ◗] ---- ? 12511 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 49 = 33 + 1·2^4 ◗, ◖ 6239 = -33 + 49·2^7 ◗, ◖ 12511 = 6239 + 49·2^7 ◗] ? 12513 /4/ [◖ 1 ◗, ◖ 129 = 1 + 1·2^7 ◗, ◖ 387 = 129 + 129·2^1 ◗, ◖ 6321 = 129 + 387·2^4 ◗, ◖ 12513 = 6321 + 387·2^4 ◗] ---- ? 12519 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 6119 = -25 + 3·2^11 ◗, ◖ 12519 = 6119 + 25·2^8 ◗] ---- ? 12527 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 49 = 17 + 1·2^5 ◗, ◖ 6255 = -17 + 49·2^7 ◗, ◖ 12527 = 6255 + 49·2^7 ◗] ---- ? 12541 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6141 = -3 + 3·2^11 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 12541 = 6141 + 25·2^8 ◗] ? 12543 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6143 = -1 + 3·2^11 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 12543 = 6143 + 25·2^8 ◗] ? 12545 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6145 = 1 + 3·2^11 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 12545 = 6145 + 25·2^8 ◗] ? 12547 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6147 = 3 + 3·2^11 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 12547 = 6147 + 25·2^8 ◗] ---- ? 12561 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 49 = 17 + 1·2^5 ◗, ◖ 6289 = 17 + 49·2^7 ◗, ◖ 12561 = 6289 + 49·2^7 ◗] ---- ? 12569 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 25 = 1 + 3·2^3 ◗, ◖ 6169 = 25 + 3·2^11 ◗, ◖ 12569 = 6169 + 25·2^8 ◗] ---- ? 12573 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 6237 = -99 + 99·2^6 ◗, ◖ 12573 = 6237 + 99·2^6 ◗] ---- ? 12577 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 49 = 33 + 1·2^4 ◗, ◖ 6305 = 33 + 49·2^7 ◗, ◖ 12577 = 6305 + 49·2^7 ◗] ? 12579 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 6243 = 99 + 3·2^11 ◗, ◖ 12579 = 6243 + 99·2^6 ◗] ---- ? 12593 /4/ [◖ 1 ◗, ◖ 257 = 1 + 1·2^8 ◗, ◖ 771 = 257 + 257·2^1 ◗, ◖ 6425 = 257 + 771·2^3 ◗, ◖ 12593 = 6425 + 771·2^3 ◗] ---- ? 12621 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 6093 = -51 + 3·2^11 ◗, ◖ 12621 = 6093 + 51·2^7 ◗] ---- ? 12639 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 99 = 33 + 33·2^1 ◗, ◖ 6303 = -33 + 99·2^6 ◗, ◖ 12639 = 6303 + 99·2^6 ◗] ---- ? 12655 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 383 = -1 + 3·2^7 ◗, ◖ 6527 = 383 + 3·2^11 ◗, ◖ 12655 = 6527 + 383·2^4 ◗] ---- ? 12669 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6141 = -3 + 3·2^11 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 12669 = 6141 + 51·2^7 ◗] ? 12671 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6143 = -1 + 3·2^11 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 12671 = 6143 + 51·2^7 ◗] ? 12673 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6145 = 1 + 3·2^11 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 12673 = 6145 + 51·2^7 ◗] ? 12675 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6147 = 3 + 3·2^11 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 12675 = 6147 + 51·2^7 ◗] ---- ? 12689 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 385 = 1 + 3·2^7 ◗, ◖ 6529 = 385 + 3·2^11 ◗, ◖ 12689 = 6529 + 385·2^4 ◗] ---- ? 12705 /4/ [◖ 1 ◗, ◖ 33 = 1 + 1·2^5 ◗, ◖ 99 = 33 + 33·2^1 ◗, ◖ 6369 = 33 + 99·2^6 ◗, ◖ 12705 = 6369 + 99·2^6 ◗] ---- ? 12723 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 6195 = 51 + 3·2^11 ◗, ◖ 12723 = 6195 + 51·2^7 ◗] ---- ? 12771 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 99 = 3 + 3·2^5 ◗, ◖ 6435 = 99 + 99·2^6 ◗, ◖ 12771 = 6435 + 99·2^6 ◗] ---- ? 12775 /4/ [◖ 1 ◗, ◖ 511 = -1 + 1·2^9 ◗, ◖ 1533 = 511 + 511·2^1 ◗, ◖ 6643 = 511 + 1533·2^2 ◗, ◖ 12775 = 6643 + 1533·2^2 ◗] ---- ? 12783 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 25 = 17 + 1·2^3 ◗, ◖ 6383 = -17 + 25·2^8 ◗, ◖ 12783 = 6383 + 25·2^8 ◗] ? 12785 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1021 = -3 + 1·2^10 ◗, ◖ 2557 = 1021 + 3·2^9 ◗, ◖ 12785 = 2557 + 2557·2^2 ◗] ? 12787 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 6131 = -13 + 3·2^11 ◗, ◖ 12787 = 6131 + 13·2^9 ◗] ---- ? 12791 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 25 = 9 + 1·2^4 ◗, ◖ 6391 = -9 + 25·2^8 ◗, ◖ 12791 = 6391 + 25·2^8 ◗] ---- ? 12795 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 25 = 5 + 5·2^2 ◗, ◖ 6395 = -5 + 25·2^8 ◗, ◖ 12795 = 6395 + 25·2^8 ◗] ? 12797 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6141 = -3 + 3·2^11 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 12797 = 6141 + 13·2^9 ◗] ? 12799 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6143 = -1 + 3·2^11 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 12799 = 6143 + 13·2^9 ◗] ? 12801 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6145 = 1 + 3·2^11 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 12801 = 6145 + 13·2^9 ◗] ? 12803 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6147 = 3 + 3·2^11 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 12803 = 6147 + 13·2^9 ◗] ? 12805 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 25 = 5 + 5·2^2 ◗, ◖ 6405 = 5 + 25·2^8 ◗, ◖ 12805 = 6405 + 25·2^8 ◗] ---- ? 12809 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 25 = 9 + 1·2^4 ◗, ◖ 6409 = 9 + 25·2^8 ◗, ◖ 12809 = 6409 + 25·2^8 ◗] ---- ? 12813 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 6157 = 13 + 3·2^11 ◗, ◖ 12813 = 6157 + 13·2^9 ◗] ? 12815 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1027 = 3 + 1·2^10 ◗, ◖ 2563 = 1027 + 3·2^9 ◗, ◖ 12815 = 2563 + 2563·2^2 ◗] ? 12817 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 25 = 17 + 1·2^3 ◗, ◖ 6417 = 17 + 25·2^8 ◗, ◖ 12817 = 6417 + 25·2^8 ◗] ---- ? 12825 /4/ [◖ 1 ◗, ◖ 513 = 1 + 1·2^9 ◗, ◖ 1539 = 513 + 513·2^1 ◗, ◖ 6669 = 513 + 1539·2^2 ◗, ◖ 12825 = 6669 + 1539·2^2 ◗] ---- ? 13005 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 6477 = -51 + 51·2^7 ◗, ◖ 13005 = 6477 + 51·2^7 ◗] ---- ? 13029 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 6117 = -27 + 3·2^11 ◗, ◖ 13029 = 6117 + 27·2^8 ◗] ---- ? 13039 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 51 = 17 + 17·2^1 ◗, ◖ 6511 = -17 + 51·2^7 ◗, ◖ 13039 = 6511 + 51·2^7 ◗] ---- ? 13047 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 767 = -1 + 3·2^8 ◗, ◖ 6911 = 767 + 3·2^11 ◗, ◖ 13047 = 6911 + 767·2^3 ◗] ---- ? 13053 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6141 = -3 + 3·2^11 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 13053 = 6141 + 27·2^8 ◗] ? 13055 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6143 = -1 + 3·2^11 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 13055 = 6143 + 27·2^8 ◗] ? 13057 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6145 = 1 + 3·2^11 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 13057 = 6145 + 27·2^8 ◗] ? 13059 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6147 = 3 + 3·2^11 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 13059 = 6147 + 27·2^8 ◗] ---- ? 13065 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 769 = 1 + 3·2^8 ◗, ◖ 6913 = 769 + 3·2^11 ◗, ◖ 13065 = 6913 + 769·2^3 ◗] ---- ? 13073 /4/ [◖ 1 ◗, ◖ 17 = 1 + 1·2^4 ◗, ◖ 51 = 17 + 17·2^1 ◗, ◖ 6545 = 17 + 51·2^7 ◗, ◖ 13073 = 6545 + 51·2^7 ◗] ---- ? 13083 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 6171 = 27 + 3·2^11 ◗, ◖ 13083 = 6171 + 27·2^8 ◗] ---- ? 13107 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 51 = 3 + 3·2^4 ◗, ◖ 6579 = 51 + 51·2^7 ◗, ◖ 13107 = 6579 + 51·2^7 ◗] ---- ? 13299 /4/ [◖ 1 ◗, ◖ 1023 = -1 + 1·2^10 ◗, ◖ 3069 = 1023 + 1023·2^1 ◗, ◖ 7161 = 1023 + 3069·2^1 ◗, ◖ 13299 = 7161 + 3069·2^1 ◗] ---- ? 13303 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3069 = -3 + 3·2^10 ◗, ◖ 5117 = 3069 + 1·2^11 ◗, ◖ 13303 = 3069 + 5117·2^1 ◗] ? 13305 /4/ [◖ 1 ◗, ◖ 1023 = -1 + 1·2^10 ◗, ◖ 3071 = 1023 + 1·2^11 ◗, ◖ 5117 = 3071 + 1023·2^1 ◗, ◖ 13305 = 3071 + 5117·2^1 ◗] ? 13307 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 6651 = -5 + 13·2^9 ◗, ◖ 13307 = 6651 + 13·2^9 ◗] ? 13309 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 6653 = -3 + 13·2^9 ◗, ◖ 13309 = 6653 + 13·2^9 ◗] ? 13311 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 8191 = 4095 + 1·2^12 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13311 = 8191 + 5·2^10 ◗] ? 13313 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 8193 = 4097 + 1·2^12 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13313 = 8193 + 5·2^10 ◗] ? 13315 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 13 = 1 + 3·2^2 ◗, ◖ 6659 = 3 + 13·2^9 ◗, ◖ 13315 = 6659 + 13·2^9 ◗] ? 13317 /4/ [◖ 1 ◗, ◖ 5 = 1 + 1·2^2 ◗, ◖ 13 = 5 + 1·2^3 ◗, ◖ 6661 = 5 + 13·2^9 ◗, ◖ 13317 = 6661 + 13·2^9 ◗] ? 13319 /4/ [◖ 1 ◗, ◖ 1025 = 1 + 1·2^10 ◗, ◖ 3073 = 1025 + 1·2^11 ◗, ◖ 5123 = 3073 + 1025·2^1 ◗, ◖ 13319 = 3073 + 5123·2^1 ◗] ? 13321 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3075 = 3 + 3·2^10 ◗, ◖ 5123 = 3075 + 1·2^11 ◗, ◖ 13321 = 3075 + 5123·2^1 ◗] ---- ? 13325 /4/ [◖ 1 ◗, ◖ 1025 = 1 + 1·2^10 ◗, ◖ 3075 = 1025 + 1025·2^1 ◗, ◖ 7175 = 1025 + 3075·2^1 ◗, ◖ 13325 = 7175 + 3075·2^1 ◗] ---- ? 13797 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 6885 = -27 + 27·2^8 ◗, ◖ 13797 = 6885 + 27·2^8 ◗] ---- ? 13809 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1533 = -3 + 3·2^9 ◗, ◖ 7677 = 1533 + 3·2^11 ◗, ◖ 13809 = 7677 + 1533·2^2 ◗] ---- ? 13815 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 6903 = -9 + 27·2^8 ◗, ◖ 13815 = 6903 + 27·2^8 ◗] ---- ? 13819 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1535 = -1 + 3·2^9 ◗, ◖ 7679 = 1535 + 3·2^11 ◗, ◖ 13819 = 7679 + 1535·2^2 ◗] ? 13821 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 6909 = -3 + 27·2^8 ◗, ◖ 13821 = 6909 + 27·2^8 ◗] ? 13823 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 6911 = -1 + 27·2^8 ◗, ◖ 13823 = 6911 + 27·2^8 ◗] ? 13825 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 6913 = 1 + 27·2^8 ◗, ◖ 13825 = 6913 + 27·2^8 ◗] ? 13827 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 6915 = 3 + 27·2^8 ◗, ◖ 13827 = 6915 + 27·2^8 ◗] ? 13829 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1537 = 1 + 3·2^9 ◗, ◖ 7681 = 1537 + 3·2^11 ◗, ◖ 13829 = 7681 + 1537·2^2 ◗] ---- ? 13833 /4/ [◖ 1 ◗, ◖ 9 = 1 + 1·2^3 ◗, ◖ 27 = 9 + 9·2^1 ◗, ◖ 6921 = 9 + 27·2^8 ◗, ◖ 13833 = 6921 + 27·2^8 ◗] ---- ? 13839 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 1539 = 3 + 3·2^9 ◗, ◖ 7683 = 1539 + 3·2^11 ◗, ◖ 13839 = 7683 + 1539·2^2 ◗] ---- ? 13851 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 27 = 3 + 3·2^3 ◗, ◖ 6939 = 27 + 27·2^8 ◗, ◖ 13851 = 6939 + 27·2^8 ◗] ---- ? 14329 /4/ [◖ 1 ◗, ◖ 2047 = -1 + 1·2^11 ◗, ◖ 6141 = 2047 + 2047·2^1 ◗, ◖ 10235 = 6141 + 2047·2^1 ◗, ◖ 14329 = 10235 + 2047·2^1 ◗] ? 14331 /4/ [◖ 1 ◗, ◖ 2047 = -1 + 1·2^11 ◗, ◖ 3071 = 2047 + 1·2^10 ◗, ◖ 8189 = 2047 + 3071·2^1 ◗, ◖ 14331 = 8189 + 3071·2^1 ◗] ? 14333 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 2045 = -3 + 1·2^11 ◗, ◖ 8189 = 2045 + 3·2^11 ◗, ◖ 14333 = 8189 + 3·2^11 ◗] ? 14335 /4/ [◖ 1 ◗, ◖ 4095 = -1 + 1·2^12 ◗, ◖ 8191 = 4095 + 1·2^12 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 14335 = 8191 + 3·2^11 ◗] ? 14337 /4/ [◖ 1 ◗, ◖ 4097 = 1 + 1·2^12 ◗, ◖ 8193 = 4097 + 1·2^12 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 14337 = 8193 + 3·2^11 ◗] ? 14339 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 2051 = 3 + 1·2^11 ◗, ◖ 8195 = 2051 + 3·2^11 ◗, ◖ 14339 = 8195 + 3·2^11 ◗] ? 14341 /4/ [◖ 1 ◗, ◖ 2049 = 1 + 1·2^11 ◗, ◖ 3073 = 2049 + 1·2^10 ◗, ◖ 8195 = 2049 + 3073·2^1 ◗, ◖ 14341 = 8195 + 3073·2^1 ◗] ? 14343 /4/ [◖ 1 ◗, ◖ 2049 = 1 + 1·2^11 ◗, ◖ 6147 = 2049 + 2049·2^1 ◗, ◖ 10245 = 6147 + 2049·2^1 ◗, ◖ 14343 = 10245 + 2049·2^1 ◗] ---- ? 15345 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3069 = -3 + 3·2^10 ◗, ◖ 9207 = 3069 + 3069·2^1 ◗, ◖ 15345 = 9207 + 3069·2^1 ◗] ---- ? 15351 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 2045 = -3 + 1·2^11 ◗, ◖ 5117 = 2045 + 3·2^10 ◗, ◖ 15351 = 5117 + 5117·2^1 ◗] ---- ? 15355 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3071 = -1 + 3·2^10 ◗, ◖ 9213 = 3071 + 3071·2^1 ◗, ◖ 15355 = 9213 + 3071·2^1 ◗] ? 15357 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3071 = -1 + 3·2^10 ◗, ◖ 9215 = 3071 + 3·2^11 ◗, ◖ 15357 = 9215 + 3071·2^1 ◗] ? 15359 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3071 = -1 + 3·2^10 ◗, ◖ 9215 = 3071 + 3·2^11 ◗, ◖ 15359 = 9215 + 3·2^11 ◗] ? 15361 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3073 = 1 + 3·2^10 ◗, ◖ 9217 = 3073 + 3·2^11 ◗, ◖ 15361 = 9217 + 3·2^11 ◗] ? 15363 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3073 = 1 + 3·2^10 ◗, ◖ 9217 = 3073 + 3·2^11 ◗, ◖ 15363 = 9217 + 3073·2^1 ◗] ? 15365 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3073 = 1 + 3·2^10 ◗, ◖ 9219 = 3073 + 3073·2^1 ◗, ◖ 15365 = 9219 + 3073·2^1 ◗] ---- ? 15369 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 2051 = 3 + 1·2^11 ◗, ◖ 5123 = 2051 + 3·2^10 ◗, ◖ 15369 = 5123 + 5123·2^1 ◗] ---- ? 15375 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 3075 = 3 + 3·2^10 ◗, ◖ 9225 = 3075 + 3075·2^1 ◗, ◖ 15375 = 9225 + 3075·2^1 ◗] ---- ? 16381 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 4093 = -3 + 1·2^12 ◗, ◖ 10237 = 4093 + 3·2^11 ◗, ◖ 16381 = 10237 + 3·2^11 ◗] ? 16383 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6143 = -1 + 3·2^11 ◗, ◖ 10239 = 6143 + 1·2^12 ◗, ◖ 16383 = 10239 + 3·2^11 ◗] ? 16385 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6145 = 1 + 3·2^11 ◗, ◖ 10241 = 6145 + 1·2^12 ◗, ◖ 16385 = 10241 + 3·2^11 ◗] ? 16387 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 4099 = 3 + 1·2^12 ◗, ◖ 10243 = 4099 + 3·2^11 ◗, ◖ 16387 = 10243 + 3·2^11 ◗] ---- ? 18429 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6141 = -3 + 3·2^11 ◗, ◖ 12285 = 6141 + 3·2^11 ◗, ◖ 18429 = 12285 + 3·2^11 ◗] ? 18431 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6143 = -1 + 3·2^11 ◗, ◖ 12287 = 6143 + 3·2^11 ◗, ◖ 18431 = 12287 + 3·2^11 ◗] ? 18433 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6145 = 1 + 3·2^11 ◗, ◖ 12289 = 6145 + 3·2^11 ◗, ◖ 18433 = 12289 + 3·2^11 ◗] ? 18435 /4/ [◖ 1 ◗, ◖ 3 = 1 + 1·2^1 ◗, ◖ 6147 = 3 + 3·2^11 ◗, ◖ 12291 = 6147 + 3·2^11 ◗, ◖ 18435 = 12291 + 3·2^11 ◗]