
|
Known smallest n-digit prime 15-tuplets
Note: n = exp + 1 , 10exp + Offset + di are 15 primes
|
||||
|
P1 : d = 0, 2, 6, 8, 12, 18, 20, 26, 30, 32, 36, 42, 48, 50, 56
P2 : d = 0, 2, 6, 12, 14, 20, 24, 26, 30, 36, 42, 44, 50, 54, 56 P3 : d = 0, 2, 6, 12, 14, 20, 26, 30, 32, 36, 42, 44, 50, 54, 56 P4 : d = 0, 6, 8, 14, 20, 24, 26, 30, 36, 38, 44, 48, 50, 54, 56 |
||||
| exp | Offset_P1 | Offset_P2 | Offset_P3 | Offset_P4 |
|---|---|---|---|---|
| 1 | 1 |
7 |
||
| 18 | 158 722 981 124 148 367 Jörg Waldvogel 2009 |
|||
| 19 | 34 360 646 117 391 789 301 Tom Hadley Oct 2001 |
7 905 159 760 365 247 387 Jim Morton Nov 2001 |
6 485 850 001 899 818 467 Jörg Waldvogel 2009 |
4 094 050 870 111 867 483 Jens Kruse Andersen 2007 |
| 20 | 13 615 698 477 681 825 541 Norman Luhn Nov 2018 |
51 477 098 804 870 766 217 Norman Luhn Nov 2018 |
5 151 328 771 084 515 847 Norman Luhn Nov 2018 |
41 851 207 652 098 108 993 Norman Luhn Nov 2018 |
| 21 | 289 988 234 671 740 098 611 Norman Luhn Nov 2018 |
19 354 381 483 289 946 307 Norman Luhn Nov 2018 |
99 638 576 123 052 218 257 Norman Luhn Nov 2018 |
54 894 504 682 878 214 183 Norman Luhn Nov 2018 |
| 22 | 145 140 704 965 821 580 141 Norman Luhn Nov 2018 |
58 912 595 078 909 068 447 Norman Luhn Nov 2018 |
26 586 761 658 844 960 237 Norman Luhn Nov 2018 |
225 504 021 532 679 514 463 Norman Luhn Nov 2018 |
| 23 | 702 724 608 533 151 539 551 Norman Luhn Nov 2018 |
62 117 785 865 841 079 687 Norman Luhn Nov 2018 |
44 128 489 317 063 894 847 Norman Luhn Nov 2018 |
103 283 320 480 569 754 453 Norman Luhn Nov 2018 |
| 24 | 246 552 183 249 816 179 851 Norman Luhn Dec 2018 |
9 162 985 306 844 349 997 Norman Luhn Dec 2018 |
543 345 438 817 590 469 987 Norman Luhn Dec 2018 |
543 338 893 999 053 267 943 Norman Luhn Dec 2018 |
| 29 | 5 745 569 203 832 854 981 801 Norman Luhn Apr 2021 |
1 341 915 517 111 319 670 637 Norman Luhn Apr 2021 |
1 651 438 068 367 136 632 687 Norman Luhn Apr 2021 |
8 317 726 120 972 779 285 703 Norman Luhn Apr 2021 |