Statistics about the Third Edition of the Cunningham Tables All the following statistics refer to the tables of the third edition, that is, on September 18, 2001. This spreadsheet gives the number of entries in each of the eighteen tables which are (a) completely factored with all factors shown in the table, (b) completely factored, but the the final factor is shown in Appendix A, and (c) not completely factored, with the final (composite) factor given in Appendix C. (a) (b) (c) Table Fully Fully_Factored Not_Fully Factored with P Factored 2- 119 354 127 2{+}(odd) 122 349 129 2LM 246 711 251 2{+}(4k) 61 186 54 3- 73 181 16 3+ 397 559 37 5- 149 203 25 5+ 105 244 27 6- 46 108 11 6+ 170 275 25 7- 45 97 10 7+ 143 248 19 10- 35 108 22 10+ 117 240 58 11- 34 78 8 11+ 101 183 14 12- 35 75 11 12+ 174 255 13 Total 2172 4454 857 This spreadsheet gives, for each i, and for cases (a) and (b) of the previous spreadsheet, the number of entries in the Cunningham Tables which have exactly i prime factors. (a) (b) Nunber i In_Table With_P of Factors Frequency Frequency 1 850 230 2 530 823 3 439 1045 4 235 804 5 70 616 6 25 454 7 9 255 8 9 131 9 5 61 10 0 22 11 0 11 12 0 2 Total 2172 4454 This spreadsheet gives, for each n, the number of occurences of any n-digit prime in the Cunningham Tables or Appendix A. For example, the first four primes, 2, 3, 5, 7, which have one digit, occur a total of 124 times in all 18 tables combined. In Main Tables In Appendix A No_of No_of_Primes Primes Digits(n) With n Digits Pn 1 124 0 2 250 0 3 972 0 4 1636 0 5 1442 0 6 1255 0 7 996 0 8 893 0 9 758 0 10 762 0 11 674 0 12 563 0 13 544 0 14 518 0 15 455 0 16 419 0 17 366 0 18 373 0 19 363 0 20 309 0 21 329 4 22 296 9 23 280 10 24 268 9 25 266 8 26 211 25 27 203 31 28 198 21 29 216 36 30 175 31 31 137 35 32 137 41 33 167 28 34 145 41 35 138 59 36 117 40 37 101 38 38 86 41 39 82 57 40 88 52 41 83 36 42 84 51 43 72 44 44 58 39 45 48 42 46 46 45 47 39 49 48 45 52 49 42 45 50 27 51 51 21 58 52 25 39 53 21 44 54 18 45 55 25 48 56 21 53 57 13 65 58 15 38 59 13 49 60 15 57 61 15 39 62 11 45 63 6 46 64 10 52 65 6 56 66 11 39 67 6 45 68 5 42 69 5 42 70 5 40 71 8 47 72 3 40 73 3 34 74 3 55 75 6 47 76 2 45 77 0 41 78 1 41 79 1 32 80 2 37 81 0 30 82 1 32 83 0 43 84 0 30 85 0 36 86 1 48 87 1 33 88 0 22 89 0 28 90 0 32 91 1 33 92 0 30 93 1 27 94 0 26 95 0 28 96 0 27 97 0 33 98 1 39 99 0 35 100 0 22 101 0 21 102 0 26 103 0 18 104 0 27 105 0 27 106 0 18 107 0 25 108 0 19 109 0 23 110 0 17 111 0 22 112 0 25 113 0 23 114 0 16 115 0 15 116 0 22 117 0 21 118 0 22 119 0 15 120 0 21 121 0 18 122 0 11 123 0 16 124 0 21 125 0 18 126 0 21 127 0 12 128 0 15 129 0 11 130 0 10 131 0 15 132 0 15 133 0 11 134 0 19 135 0 9 136 0 10 137 0 10 138 0 19 139 0 9 140 0 14 141 0 17 142 0 8 143 0 11 144 0 10 145 0 10 146 0 8 147 0 11 148 0 12 149 0 6 150 0 11 151 0 16 152 0 10 153 0 9 154 0 8 155 0 10 156 0 14 157 0 9 158 0 15 159 0 7 160 0 6 161 0 7 162 0 6 163 0 4 164 0 5 165 0 7 166 0 8 167 0 8 168 0 13 169 0 7 170 0 4 171 0 9 172 0 12 173 0 3 174 0 5 175 0 5 176 0 8 177 0 5 178 0 8 179 0 8 180 0 6 181 0 7 182 0 4 183 0 7 184 0 5 185 0 5 186 0 5 187 0 5 188 0 2 189 0 7 190 0 3 191 0 8 192 0 6 193 0 4 194 0 1 195 0 5 196 0 5 197 0 5 198 0 7 199 0 5 200 0 7 201 0 2 202 0 4 203 0 9 204 0 4 205 0 2 206 0 7 207 0 2 208 0 5 209 0 1 210 0 4 211 0 7 212 0 4 213 0 4 214 0 2 215 0 4 216 0 6 217 0 4 218 0 4 219 0 3 220 0 3 221 0 4 222 0 5 223 0 1 224 0 2 225 0 4 226 0 2 227 0 3 228 0 5 229 0 3 230 0 2 231 0 1 232 0 7 234 0 1 235 0 1 236 0 1 237 0 7 238 0 2 239 0 3 240 0 4 241 0 1 242 0 3 243 0 5 244 0 4 245 0 2 246 0 1 247 0 4 252 0 3 253 0 2 254 0 2 255 0 1 256 0 1 257 0 1 258 0 1 259 0 1 260 0 1 261 0 1 263 0 2 264 0 3 265 0 1 266 0 1 268 0 3 269 0 1 271 0 1 272 0 1 273 0 1 274 0 1 277 0 1 278 0 1 279 0 1 281 0 1 284 0 3 286 0 2 287 0 1 288 0 2 290 0 1 291 0 1 292 0 1 294 0 3 296 0 3 299 0 1 301 0 2 302 0 2 305 0 1 307 0 2 310 0 2 311 0 2 312 0 1 315 0 2 317 0 1 319 0 1 321 0 1 324 0 1 327 0 1 332 0 1 334 0 2 343 0 1 Total 18158 4454