The Largest Known Primes - The Prime Pages - University of ...
The Largest Known Primes - The Prime Pages - University of ...
The Largest Known Primes - The Prime Pages - University of ...
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THE LARGEST KNOWN PRIMES<br />
(<strong>The</strong> 5, 000 largest known primes)<br />
(selected smaller primes which have comments are included)<br />
Originally Compiled by Samuel Yates – Continued by Chris Caldwell<br />
(Last Updated Wed May 29 11:51:38 CDT 2013)<br />
So that I can maintain this database <strong>of</strong> the 5,000 largest known primes (plus selected smaller primes with<br />
1,000 or more digits), please send any new primes (that are large enough) to:<br />
http://primes.utm.edu/bios/submission.php<br />
This list in a searchable form (plus information such as how to find large primes and how to prove primality)<br />
is available at the interactive web site:<br />
http://primes.utm.edu/primes/<br />
See the last pages for information about the provers.<br />
Pr<strong>of</strong>essor Chris K. Caldwell<br />
Mathematics and Statistics caldwell@utm.edu<br />
<strong>University</strong> <strong>of</strong> Tennessee at Martin http://www.utm.edu/ ∼ caldwell/<br />
Martin, TN 38238, USA<br />
1 <strong>The</strong> List <strong>of</strong> <strong><strong>Prime</strong>s</strong><br />
<strong>The</strong> letters after the rank refer to when the prime was submitted. ‘a’ is this month, ‘b’ last month...<br />
rank description digits who year comment<br />
1 2 57885161 − 1 17425170 G13 13 Mersenne 48??<br />
2 2 43112609 − 1 12978189 G10 08 Mersenne 47??<br />
3 2 42643801 − 1 12837064 G12 09 Mersenne 46??<br />
4 2 37156667 − 1 11185272 G11 08 Mersenne 45?<br />
5 2 32582657 − 1 9808358 G9 06 Mersenne 44?<br />
6 2 30402457 − 1 9152052 G9 05 Mersenne 43?<br />
7 2 25964951 − 1 7816230 G8 05 Mersenne 42<br />
8 2 24036583 − 1 7235733 G7 04 Mersenne 41<br />
9 2 20996011 − 1 6320430 G6 03 Mersenne 40<br />
10 2 13466917 − 1 4053946 G5 01 Mersenne 39<br />
11 19249 · 2 13018586 + 1 3918990 SB10 07<br />
12 475856 524288 + 1 2976633 L3230 12 Generalized Fermat<br />
13 356926 524288 + 1 2911151 L3209 12 Generalized Fermat<br />
14 341112 524288 + 1 2900832 L3184 12 Generalized Fermat<br />
15 27653 · 2 9167433 + 1 2759677 SB8 05<br />
16 90527 · 2 9162167 + 1 2758093 L1460 10<br />
17 75898 524288 + 1 2558647 p334 11 Generalized Fermat<br />
18 28433 · 2 7830457 + 1 2357207 SB7 04<br />
19 3 · 2 7033641 + 1 2117338 L2233 11 Divides GF (7033639, 3)<br />
20 33661 · 2 7031232 + 1 2116617 SB11 07<br />
21 2 6972593 − 1 2098960 G4 99 Mersenne 38<br />
22 6679881 · 2 6679881 + 1 2010852 L917 09 Cullen<br />
23 1582137 · 2 6328550 + 1 1905090 L801 09 Cullen<br />
24 3 · 2 6090515 − 1 1833429 L1353 10<br />
1
ank description digits who year comment<br />
25 7 · 2 5775996 + 1 1738749 L3325 12<br />
26 252191 · 2 5497878 − 1 1655032 L3183 12<br />
27 258317 · 2 5450519 + 1 1640776 g414 08<br />
28 773620 262144 + 1 1543643 L3118 12 Generalized Fermat<br />
29 3 · 2 5082306 + 1 1529928 L780 09 Divides GF (5082303, 3),<br />
GF (5082305, 5)<br />
30 676754 262144 + 1 1528413 L2975 12 Generalized Fermat<br />
31 5359 · 2 5054502 + 1 1521561 SB6 03<br />
32 525094 262144 + 1 1499526 p338 12 Generalized Fermat<br />
33 265711 · 2 4858008 + 1 1462412 g414 08<br />
34 1271 · 2 4850526 − 1 1460157 L1828 12<br />
35 361658 262144 + 1 1457075 p332 11 Generalized Fermat<br />
36 9 · 2 4683555 − 1 1409892 L1828 12<br />
37 121 · 2 4553899 − 1 1370863 L3023 12<br />
38 145310 262144 + 1 1353265 p314 11 Generalized Fermat<br />
39 353159 · 2 4331116 − 1 1303802 L2408 11<br />
40 141941 · 2 4299438 − 1 1294265 L689 11<br />
41 15 · 2 4246384 + 1 1278291 L3432 13 Divides GF (4246381, 6)<br />
42 3 · 2 4235414 − 1 1274988 L606 08<br />
43 191 · 2 4203426 − 1 1265360 L2484 12<br />
44 40734 262144 + 1 1208473 p309 11 Generalized Fermat<br />
45 9 · 2 4005979 − 1 1205921 L1828 12<br />
46 27 · 2 3855094 − 1 1160501 L3033 12<br />
47 24518 262144 + 1 1150678 g413 08 Generalized Fermat<br />
48 123547 · 2 3804809 − 1 1145367 L2371 11<br />
49 415267 · 2 3771929 − 1 1135470 L2373 11<br />
50 11 · 2 3771821 + 1 1135433 p286 13<br />
51 938237 · 2 3752950 − 1 1129757 L521 07 Woodall<br />
52 65531 · 2 3629342 − 1 1092546 L2269 11<br />
53 485767 · 2 3609357 − 1 1086531 L622 08<br />
54 5 · 2 3569154 − 1 1074424 L503 09<br />
55 1019 · 2 3536312 − 1 1064539 L1828 12<br />
56 7 · 2 3511774 + 1 1057151 p236 08 Divides GF (3511773, 6)<br />
57 428639 · 2 3506452 − 1 1055553 L2046 11<br />
58 9 · 2 3497442 + 1 1052836 L1780 12 Generalized Fermat<br />
59 1273 · 2 3448551 − 1 1038121 L1828 12<br />
60 191249 · 2 3417696 − 1 1028835 L1949 10<br />
61 59 · 2 3408416 − 1 1026038 L426 10<br />
62 81 · 2 3352924 + 1 1009333 L1728 12 Generalized Fermat<br />
63 1087 · 2 3336385 − 1 1004355 L1828 12<br />
64 464253 · 2 3321908 − 1 1000000 L466 13<br />
65 191273 · 2 3321908 − 1 1000000 L466 13<br />
66 3139 · 2 3321905 − 1 999997 L185 08<br />
67 4847 · 2 3321063 + 1 999744 SB9 05<br />
68 223 · 2 3264459 − 1 982703 L1884 12<br />
69 9 · 2 3259381 − 1 981173 L1828 11<br />
70 211195 · 2 3224974 + 1 970820 L2121 13<br />
71 94373 · 2 3206717 + 1 965323 L2785 13<br />
72 113983 · 2 3201175 − 1 963655 L613 08<br />
73 1087 · 2 3164677 − 1 952666 L1828 12<br />
2
ank description digits who year comment<br />
74 15 · 2 3162659 + 1 952057 p286 12<br />
75 19 · 2 3155009 − 1 949754 L1828 12<br />
76 3 · 2 3136255 − 1 944108 L256 07<br />
77 1019 · 2 3103680 − 1 934304 L1828 12<br />
78 5 · 2 3090860 − 1 930443 L1862 12<br />
79 21 · 2 3065701 + 1 922870 p286 12<br />
80 5 · 2 3059698 − 1 921062 L503 08<br />
81 383731 · 2 3021377 − 1 909531 L466 11<br />
82 2 3021377 − 1 909526 G3 98 Mersenne 37<br />
83 7 · 2 3015762 + 1 907836 g279 08<br />
84 43 · 2 2994958 + 1 901574 L3222 13<br />
85 1095 · 2 2992587 − 1 900862 L1828 11<br />
86 15 · 2 2988834 + 1 899730 p286 12<br />
87 39 · 2 2978894 + 1 896739 L2719 13<br />
88 4348099 · 2 2976221 − 1 895939 L466 08<br />
89 2 2976221 − 1 895932 G2 97 Mersenne 36<br />
90 198677 · 2 2950515 + 1 888199 L2121 12<br />
91 17 · 2 2946584 − 1 887012 L3519 13<br />
92 25 · 2 2927222 + 1 881184 L1935 13 Generalized Fermat<br />
93 7 · 2 2915954 + 1 877791 g279 08 Divides GF (2915953, 12) [g322]<br />
94 427194 · 113 427194 + 1 877069 p310 12 Generalized Cullen<br />
95 63 · 2 2898957 + 1 872675 L3262 13<br />
96 11 · 2 2897409 + 1 872209 L2973 13 Divides GF (2897408, 3)<br />
97 51 · 2 2881227 + 1 867338 L3512 13<br />
98 1207 · 2 2861901 − 1 861522 L1828 11<br />
99 222361 · 2 2854840 + 1 859398 g403 06<br />
100 177 · 2 2816050 + 1 847718 L129 12<br />
101 96 · 10 846519 − 1 846521 L2425 11 Near-repdigit<br />
102 63 · 2 2807130 + 1 845033 L3262 13<br />
103 43 · 2 2795582 + 1 841556 L2842 13<br />
104 15 · 2 2785940 + 1 838653 p286 12<br />
105 57 · 2 2765963 + 1 832640 L3262 13<br />
106 57 · 2 2747499 + 1 827082 L3514 13 Divides Fermat F (2747497)<br />
107 17 · 2 2721830 − 1 819354 p294 10<br />
108 165 · 2 2717378 − 1 818015 L2055 12<br />
109 45 · 2 2711732 + 1 816315 L1349 12<br />
110 39 · 2 2705367 + 1 814399 L1576 13 Divides GF (2705360, 3)<br />
111 11 · 2 2691961 + 1 810363 p286 13 Divides GF (2691960, 12)<br />
112 1372930 131072 + 1 804474 g236 03 Generalized Fermat<br />
113 1361244 131072 + 1 803988 g236 04 Generalized Fermat<br />
114 1176694 131072 + 1 795695 g236 03 Generalized Fermat<br />
115 13 · 2 2642943 − 1 795607 L1862 12<br />
116 342673 · 2 2639439 − 1 794556 L53 07<br />
117 1063730 131072 + 1 789949 g260 13 Generalized Fermat<br />
118 1243 · 2 2623707 − 1 789818 L1828 11<br />
119 13 · 2 2606075 − 1 784508 L1862 11<br />
120 25 · 2 2583690 + 1 777770 L3249 13 Generalized Fermat<br />
121 334310 · 211 334310 − 1 777037 p350 12 Generalized Woodall<br />
122 51 · 2 2578652 + 1 776254 L3262 13<br />
123 75 · 2 2562382 − 1 771356 L2055 11<br />
3
ank description digits who year comment<br />
124 147559 · 2 2562218 + 1 771310 L764 12<br />
125 404 · 12 714558 + 1 771141 L1471 11<br />
126 9 · 2 2543551 + 1 765687 L1204 11 Divides Fermat F (2543548),<br />
GF (2543549, 3),<br />
GF (2543549, 6),<br />
GF (2543549, 12)<br />
127 689186 131072 + 1 765243 g429 13 Generalized Fermat<br />
128 123287 · 2 2538167 + 1 764070 L3054 12<br />
129 45 · 2 2507894 + 1 754953 L1349 12<br />
130 572186 131072 + 1 754652 g0 04 Generalized Fermat<br />
131 165 · 2 2500130 − 1 752617 L2055 11<br />
132 57 · 2 2492031 + 1 750178 L1230 13<br />
133 3 · 2 2478785 + 1 746190 g245 03 Divides Fermat F (2478782),<br />
GF (2478782, 3),<br />
GF (2478776, 6),<br />
GF (2478782, 12)<br />
134 11 · 2 2476839 + 1 745604 L2691 11<br />
135 1061 · 2 2474282 − 1 744837 L1828 12<br />
136 81 · 2 2468789 + 1 743182 g418 09<br />
137 26773 · 2 2465343 − 1 742147 L197 06<br />
138 5 · 2 2460482 − 1 740680 L503 08<br />
139 41676 · 7 875197 − 1 739632 L2777 12 Generalized Woodall<br />
140 75 · 2 2446050 + 1 736337 L3035 13<br />
141 386892 131072 + 1 732377 p259 09 Generalized Fermat<br />
142 23 · 2 2425641 + 1 730193 L2675 11<br />
143 69 · 2 2410035 − 1 725495 L2074 13<br />
144 15 · 2 2393365 + 1 720476 L1349 10<br />
145 99 · 2 2383846 + 1 717612 L1780 13<br />
146 737 · 2 2382804 − 1 717299 L191 07<br />
147 61 · 2 2381887 − 1 717022 L2432 12<br />
148 1117 · 2 2373977 − 1 714642 L1828 12<br />
149 99 · 2 2370390 + 1 713561 L1204 13<br />
150 1183953 · 2 2367907 − 1 712818 L447 07 Woodall<br />
151 150209! + 1 712355 p3 11 Factorial<br />
152 2683 · 2 2360743 − 1 710658 L1959 12<br />
153 45 · 2 2347187 + 1 706576 L1349 12<br />
154 127 · 2 2346377 − 1 706332 L282 09<br />
155 33 · 2 2345001 + 1 705918 L2322 13<br />
156 83 · 2 2342345 + 1 705119 L2626 13<br />
157 275293 · 2 2335007 − 1 702913 L193 06<br />
158 228188 131072 + 1 702323 g124 10 Generalized Fermat<br />
159 15 · 2 2323205 − 1 699356 L2484 11<br />
160 1983 · 366 271591 − 1 696222 L2054 12<br />
161 3 · 2 2312734 − 1 696203 L158 05<br />
162 450457 · 2 2307905 − 1 694755 L172 06<br />
163 1087 · 2 2293345 − 1 690369 L1828 11<br />
164 3 · 2 2291610 + 1 689844 L753 08 Divides GF (2291607, 3),<br />
GF (2291609, 5)<br />
165 93 · 2 2263894 + 1 681502 L2826 13<br />
166 65 · 2 2250637 + 1 677512 L3487 13<br />
4
ank description digits who year comment<br />
167 35 · 2 2241049 + 1 674625 L2742 13<br />
168 831 · 2 2235253 + 1 672882 L3432 13<br />
169 103 · 2 2232551 − 1 672067 L2484 13<br />
170 11 · 2 2230369 + 1 671410 L2561 11 Divides GF (2230368, 3)<br />
171 130816 131072 + 1 670651 g308 03 Generalized Fermat<br />
172 27 · 2 2218064 + 1 667706 L690 09<br />
173 67 · 2 2215581 − 1 666959 L268 10<br />
174 157533 · 2 2214598 − 1 666666 L3494 13<br />
175 3 · 10 665829 + 1 665830 p300 12<br />
176 165 · 2 2207550 − 1 664541 L2055 11<br />
177 19 · 2 2206266 + 1 664154 p189 06<br />
178 2 · 179 294739 + 1 664004 g424 11 Divides P hi(179 294739 , 2)<br />
179 5077 · 2 2198565 − 1 661838 L251 08<br />
180 114487 · 2 2198389 − 1 661787 L179 06<br />
181 404882 · 43 404882 − 1 661368 p310 11 Generalized Woodall<br />
182 39 · 2 2188855 + 1 658913 p286 13<br />
183 196597 · 2 2178109 − 1 655682 L175 06<br />
184 69 · 2 2174213 − 1 654506 L2055 12<br />
185 7 · 2 2167800 + 1 652574 g279 07 Divides Fermat F (2167797),<br />
GF (2167799, 5),<br />
GF (2167799, 10)<br />
186 21 · 2 2160479 − 1 650371 L2074 12<br />
187 102976 · 5 929801 − 1 649909 L3313 13<br />
188 111 · 2 2150802 − 1 647458 L2484 13<br />
189 67 · 2 2148060 + 1 646633 L3276 13<br />
190 3 · 2 2145353 + 1 645817 g245 03 Divides Fermat F (2145351),<br />
GF (2145351, 3),<br />
GF (2145352, 5),<br />
GF (2145348, 6),<br />
GF (2145352, 10),<br />
GF (2145351, 12)<br />
191 25 · 2 2141884 + 1 644773 L1741 11 Divides Fermat F (2141872),<br />
GF (2141871, 5),<br />
GF (2141872, 10); generalized<br />
Fermat<br />
192 23 · 2 2141626 − 1 644696 L545 08<br />
193 7 · 2 2139912 + 1 644179 g279 07 Divides GF (2139911, 12)<br />
194 292402 · 159 292402 + 1 643699 g407 12 Generalized Cullen<br />
195 61 · 2 2134577 − 1 642574 L2055 11<br />
196 75 · 2 2130432 − 1 641326 L2055 11<br />
197 110488 · 5 917100 + 1 641031 L3354 13<br />
198 37 · 2 2128328 + 1 640693 L3422 13<br />
199 8331405 · 2 2120345 − 1 638295 L2055 13<br />
200 254 · 5 911506 − 1 637118 p292 10<br />
201 57 · 2 2103370 − 1 633180 L2055 11<br />
202 35 · 2 2099769 + 1 632095 L3432 13<br />
203 62722 131072 + 1 628808 g308 03 Generalized Fermat<br />
204 563528 · 13 563528 − 1 627745 p262 09 Generalized Woodall<br />
205 437960 · 3 1313880 + 1 626886 L2777 12 Generalized Cullen<br />
206 269328 · 211 269328 + 1 626000 p354 12 Generalized Cullen<br />
5
ank description digits who year comment<br />
207 79 · 2 2078162 + 1 625591 L2117 13<br />
208 1003 · 2 2076535 − 1 625103 L51 08<br />
209 2186 · 7 739474 − 1 624932 p258 11<br />
210 73 · 2 2075936 + 1 624921 L3464 13<br />
211 65 · 2 2073229 + 1 624106 L1480 13<br />
212 73 · 2 2071592 + 1 623614 L1480 13<br />
213 9 · 2 2060941 − 1 620407 L503 08<br />
214 3 · 10 618853 + 1 618854 p300 12<br />
215 71 · 2 2051313 + 1 617509 L1480 13<br />
216 75 · 2 2050637 − 1 617306 L2055 11<br />
217 73 · 2 2048754 + 1 616739 L3432 13<br />
218 121 · 2 2033941 − 1 612280 L162 06<br />
219 57 · 2 2033643 + 1 612190 L3432 13<br />
220 8 · 10 608989 − 1 608990 p297 11 Near-repdigit<br />
221 45 · 2 2014557 + 1 606444 L1349 12 Divides GF (2014552, 10)<br />
222 251749 · 2 2013995 − 1 606279 L436 07 Woodall<br />
223 428551 · 2 2006520 + 1 604029 g411 11<br />
224 8331405 · 2 1993674 − 1 600163 L260 11<br />
225 467917 · 2 1993429 − 1 600088 L160 05<br />
226 137137 · 2 1993201 − 1 600019 L321 07<br />
227 17 · 2 1990299 + 1 599141 g267 06 Divides GF (1990298, 3)<br />
228 101 · 2 1988279 + 1 598534 L3141 13 Divides GF (1988278, 12)<br />
229 162434 · 5 856004 − 1 598327 L3410 13<br />
230 174344 · 5 855138 − 1 597722 L3354 13<br />
231 8331405 · 2 1984565 − 1 597421 L260 11<br />
232 25 · 2 1977369 − 1 595249 L426 08<br />
233 148323 · 2 1973319 − 1 594034 L587 11<br />
234 93 · 2 1965880 + 1 591791 L1210 11<br />
235 253 · 2 1965215 − 1 591592 L3345 12<br />
236 57406 · 5 844253 − 1 590113 L3313 12<br />
237 112 · 113 286643 − 1 588503 L426 12<br />
238 121 · 2 1954243 − 1 588288 L162 06<br />
239 111 · 2 1946322 − 1 585904 L2484 12<br />
240 89 · 2 1943337 + 1 585005 L2413 11<br />
241 182627 · 2 1934664 − 1 582398 L3336 12<br />
242 143 · 2 1932112 − 1 581626 L1828 12<br />
243 48764 · 5 831946 − 1 581510 L3313 12<br />
244 214519 · 2 1929114 + 1 580727 g346 06<br />
245 2 · 47 346759 + 1 579816 g424 11 Divides P hi(47 346759 , 2)<br />
246 243 · 2 1923567 − 1 579054 L2055 11<br />
247 85 · 2 1910520 + 1 575126 L2703 11<br />
248 267 · 2 1909876 − 1 574933 L1828 13<br />
249 291 · 2 1907541 − 1 574230 L2484 13<br />
250 27 · 2 1902689 − 1 572768 L1153 09<br />
251 87 · 2 1891391 + 1 569368 L2673 11<br />
252 85287 · 2 1890011 + 1 568955 p254 11<br />
253 89 · 2 1879132 − 1 565678 L1828 13<br />
254 345067 · 2 1876573 − 1 564911 g59 05<br />
255 71 · 2 1873569 + 1 564003 L1223 11 Divides GF (1873568, 5)<br />
256 21 · 2 1872923 − 1 563808 L2074 12<br />
6
ank description digits who year comment<br />
257 315 · 2 1869119 − 1 562664 L2235 12<br />
258 2 · 3 1175232 + 1 560729 p199 10<br />
259 13 · 2 1861732 + 1 560439 g267 05 Divides GF (1861731, 6)<br />
260 103 · 2 1860103 − 1 559949 L2484 12<br />
261 51 · 2 1859193 + 1 559675 L1204 11<br />
262 8331405 · 2 1858587 − 1 559498 L260 11<br />
263 126072 · 31 374323 − 1 558257 L2054 12<br />
264 333 · 2 1853115 − 1 557846 L1830 12<br />
265 87 · 2 1852590 − 1 557688 L2055 11<br />
266 137 · 2 1849238 − 1 556679 L321 07<br />
267 261 · 2 1848217 + 1 556372 L1983 13<br />
268 261 · 2 1843555 − 1 554968 L1828 13<br />
269 135 · 2 1838124 + 1 553333 L3472 13<br />
270 15 · 2 1837873 − 1 553257 L632 08<br />
271 333 · 2 1837105 + 1 553027 L3470 13<br />
272 309 · 2 1836139 + 1 552736 L3460 13<br />
273 423 · 2 1835585 + 1 552569 L2873 13<br />
274 73 · 2 1834526 + 1 552250 L1513 11<br />
275 309 · 2 1834379 + 1 552206 L3471 13<br />
276 87 · 2 1834098 + 1 552121 L1513 11<br />
277 3 · 2 1832496 + 1 551637 p189 07 Divides GF (1832490, 3),<br />
GF (1832494, 5)<br />
278 21 · 2 1830919 + 1 551163 g279 04<br />
279 197 · 2 1830255 + 1 550964 L1360 13<br />
280 39 · 2 1824871 + 1 549343 L2664 11 Divides GF (1824867, 6)<br />
281 162668 · 5 785748 − 1 549220 L3190 12<br />
282 389 · 2 1824385 + 1 549198 L1487 13<br />
283 1135 · 2 1824103 − 1 549113 L1828 13<br />
284 1387 · 2 1818593 − 1 547455 L1828 12<br />
285 229 · 2 1818078 + 1 547299 L3456 13<br />
286 127 · 2 1817862 + 1 547234 L3452 13<br />
287 35 · 2 1817486 − 1 547120 L2074 11<br />
288 1155 · 2 1816779 − 1 546909 L1828 12<br />
289 69 · 2 1816739 + 1 546895 L1204 11<br />
290 33 · 2 1813526 − 1 545928 L621 08<br />
291 1347 · 2 1813433 − 1 545901 L1828 12<br />
292 1305 · 2 1809766 − 1 544797 L1828 11<br />
293 1185 · 2 1809466 − 1 544707 L1828 11<br />
294 9 · 2 1807574 + 1 544135 L2419 11 Generalized Fermat<br />
295 375 · 2 1806591 + 1 543841 L3233 13<br />
296 385 · 2 1802362 + 1 542568 L3279 13<br />
297 301 · 2 1801207 − 1 542220 p281 10<br />
298 1193 · 2 1801112 − 1 542192 L1828 11<br />
299 417643 · 2 1800787 − 1 542097 L134 05<br />
300 1045 · 2 1800025 − 1 541865 L1828 11<br />
301 43 · 2 1799016 + 1 541560 L2562 11<br />
302 1047 · 2 1797890 + 1 541222 L3473 13<br />
303 1103 · 2 1796969 + 1 540945 L2826 13<br />
304 43 · 2 1795628 + 1 540540 L1129 11<br />
305 423 · 2 1794546 + 1 540215 L3131 13<br />
7
ank description digits who year comment<br />
306 1103 · 2 1792513 + 1 539604 L3262 13<br />
307 431 · 2 1791441 + 1 539281 L3453 13<br />
308 607 · 2 1790196 + 1 538906 L346 13<br />
309 1059 · 2 1789353 + 1 538652 L1130 13<br />
310 975 · 2 1789341 + 1 538649 L2085 13<br />
311 273 · 2 1788926 − 1 538523 L1828 13<br />
312 289184 · 5 770116 − 1 538294 p353 12<br />
313 441 · 2 1787789 + 1 538181 L1209 13<br />
314 565 · 2 1787136 + 1 537985 L1512 13<br />
315 247 · 2 1786968 + 1 537934 L2533 13<br />
316 227 · 2 1786779 + 1 537877 L2058 13<br />
317 11812 · 5 769343 − 1 537752 p341 12<br />
318 933 · 2 1786320 + 1 537739 L1505 13<br />
319 507 · 2 1786194 + 1 537701 L3422 13<br />
320 921 · 2 1785808 + 1 537585 L3262 13<br />
321 1187 · 2 1785707 + 1 537555 L1753 13<br />
322 63 · 2 1784498 + 1 537190 L1415 11<br />
323 231 · 2 1783821 + 1 536986 L3262 13<br />
324 575 · 2 1781313 + 1 536232 L3262 13<br />
325 883 · 2 1780324 + 1 535934 L2963 13<br />
326 45 · 2 1779971 + 1 535827 L1223 11 Divides GF (1779969, 5)<br />
327 357659 · 2 1779748 − 1 535764 L47 05<br />
328 1061 · 2 1779595 + 1 535715 L3445 13<br />
329 455 · 2 1779315 + 1 535630 L2121 13<br />
330 863 · 2 1778737 + 1 535457 L1505 13<br />
331 316594 · 5 766005 − 1 535421 L3157 12<br />
332 99 · 2 1777688 − 1 535140 L1862 11<br />
333 5 · 2 1777515 + 1 535087 p148 05 Divides GF (1777511, 5),<br />
GF (1777514, 6)<br />
334 511 · 2 1777488 + 1 535080 L2873 13<br />
335 243 · 2 1777467 − 1 535074 L2055 11<br />
336 177 · 2 1775674 − 1 534534 L2101 12<br />
337 129 · 2 1774709 + 1 534243 L2526 13 Divides GF (1774705, 12)<br />
338 163 · 2 1771524 + 1 533285 L1741 13<br />
339 381 · 2 1771493 + 1 533276 L3444 13<br />
340 795 · 2 1770840 + 1 533079 L1505 13<br />
341 665 · 2 1769303 + 1 532617 L3441 13<br />
342 473 · 2 1769101 + 1 532556 L3459 13<br />
343 855 · 2 1768644 + 1 532418 L1675 13<br />
344 99 · 2 1768187 + 1 532280 L2517 11<br />
345 273 · 2 1766747 − 1 531847 L1828 13<br />
346 191 · 2 1766221 + 1 531688 L2539 13<br />
347 190088 · 5 760352 − 1 531469 L2841 12 Generalized Woodall<br />
348 35 · 2 1765449 + 1 531455 L1204 11<br />
349 981 · 2 1765221 + 1 531388 L1204 13<br />
350 255 · 2 1765113 + 1 531355 L2085 13<br />
351 65 · 2 1764687 + 1 531226 L1125 11<br />
352 717 · 2 1763367 + 1 530830 L3440 13<br />
353 16193 · 22 395119 − 1 530421 p255 13<br />
354 531 · 2 1761689 + 1 530324 L3458 13<br />
8
ank description digits who year comment<br />
355 963 · 2 1761050 + 1 530132 L1204 13<br />
356 969 · 2 1759430 + 1 529645 L3262 13<br />
357 119 · 2 1759247 + 1 529589 L3035 13<br />
358 2 · 191 232149 + 1 529540 g424 11 Divides P hi(191 232149 , 2)<br />
359 417 · 2 1759055 + 1 529531 L2623 13<br />
360 787 · 2 1757702 + 1 529124 L3436 13<br />
361 57 · 2 1756702 + 1 528822 L1741 11<br />
362 135 · 2 1756478 + 1 528755 L3127 13<br />
363 855 · 2 1756269 + 1 528693 L2636 13<br />
364 603 · 2 1756142 + 1 528655 L3175 13<br />
365 71 · 2 1755965 + 1 528600 L1741 11<br />
366 485 · 2 1755887 + 1 528578 L3262 13<br />
367 31 · 2 1755317 − 1 528405 L330 11<br />
368 955 · 2 1755312 + 1 528405 L1741 13<br />
369 161 · 2 1754223 + 1 528076 L3014 13<br />
370 5077 · 2 1753317 − 1 527805 L251 08<br />
371 387 · 2 1752919 + 1 527684 L2636 13<br />
372 65 · 2 1752885 + 1 527673 L1204 11<br />
373 363 · 2 1752116 + 1 527443 L2085 13<br />
374 641 · 2 1751823 + 1 527355 L3459 13<br />
375 261 · 2 1751160 + 1 527155 L3192 13<br />
376 1179 · 2 1750847 + 1 527061 g387 09<br />
377 340168 · 5 753789 − 1 526882 p323 12<br />
378 183 · 2 1747660 + 1 526101 L2163 13<br />
379 265 · 2 1745450 + 1 525436 L3423 13<br />
380 495 · 2 1744183 + 1 525055 L1933 13<br />
381 327 · 2 1743751 + 1 524924 L1130 13<br />
382 415 · 2 1743176 + 1 524751 L3428 13<br />
383 695 · 2 1742755 + 1 524625 L1741 13<br />
384 243 · 2 1742689 + 1 524605 L1204 13<br />
385 345 · 2 1742652 − 1 524594 L1830 12<br />
386 867 · 2 1742474 + 1 524540 L3188 13<br />
387 91 · 2 1742093 − 1 524425 L2338 12<br />
388 315 · 2 1741334 − 1 524197 L1830 12<br />
389 525 · 2 1740056 + 1 523812 L1204 13<br />
390 357 · 2 1739732 + 1 523715 L3427 13<br />
391 687 · 2 1739343 + 1 523598 L2117 13<br />
392 627 · 2 1738864 + 1 523454 L2117 13<br />
393 95 · 2 1738427 + 1 523321 L2085 11<br />
394 793 · 2 1738400 + 1 523314 L3035 13<br />
395 729 · 2 1737901 + 1 523164 L2603 13<br />
396 1065 · 2 1736222 + 1 522658 L1204 13<br />
397 573 · 2 1735454 + 1 522427 L2675 13<br />
398 545 · 2 1735043 + 1 522303 L2131 13<br />
399 61 · 2 1734983 − 1 522284 L2055 11<br />
400 6 · 10 522127 + 1 522128 p342 12<br />
401 741 · 2 1733507 + 1 521841 L2549 13<br />
402 471 · 2 1732587 + 1 521564 L2085 13<br />
403 547 · 2 1731248 + 1 521161 L2873 13<br />
404 55 · 2 1729777 − 1 520717 L2074 13<br />
9
ank description digits who year comment<br />
405 421 · 2 1729092 + 1 520512 L3234 13<br />
406 193 · 2 1728894 + 1 520452 L3175 13<br />
407 341 · 2 1728697 + 1 520393 L2981 13<br />
408 213 · 2 1728569 + 1 520354 L2520 13<br />
409 277 · 2 1728302 + 1 520274 L1130 13<br />
410 997 · 2 1728146 + 1 520227 L1595 13<br />
411 929 · 2 1728099 + 1 520213 L1745 13<br />
412 879 · 2 1727602 + 1 520063 L1935 13<br />
413 338948 · 5 743996 − 1 520037 p352 12<br />
414 597 · 2 1726268 + 1 519662 L2520 13<br />
415 1151 · 2 1726187 + 1 519638 L3262 13<br />
416 813 · 2 1725925 + 1 519559 L3171 13<br />
417 729 · 2 1724434 + 1 519110 L1484 13 Generalized Fermat<br />
418 615 · 2 1724209 + 1 519042 L2967 13<br />
419 547 · 2 1723020 + 1 518684 L1745 13<br />
420 253 · 2 1722623 − 1 518564 L145 07<br />
421 2 · 3 1086112 + 1 518208 p199 10<br />
422 113 · 2 1721438 − 1 518207 L2484 11<br />
423 1195 · 2 1720342 + 1 517878 L1935 13<br />
424 465 · 2 1720310 + 1 517868 L2938 13<br />
425 1159 · 2 1719862 + 1 517734 L3035 13<br />
426 545 · 2 1719517 + 1 517629 L2583 13<br />
427 897 · 2 1716807 + 1 516814 L2322 13<br />
428 1017 · 2 1715060 + 1 516288 L1204 13<br />
429 423 · 2 1714680 + 1 516173 L1204 13<br />
430 975 · 2 1714004 + 1 515970 L2117 12<br />
431 1101 · 2 1712807 + 1 515610 L1935 12<br />
432 491 · 2 1710497 + 1 514914 L3271 13<br />
433 237 · 2 1710490 + 1 514912 L1408 13<br />
434 833 · 2 1708797 + 1 514403 L1935 12<br />
435 1035 · 2 1708648 + 1 514358 L2973 12<br />
436 333 · 2 1708106 + 1 514194 L3154 13<br />
437 18656 · 5 735326 − 1 513976 p280 12<br />
438 935 · 2 1707129 + 1 513901 L1300 12<br />
439 889 · 2 1707094 + 1 513890 L3262 12<br />
440 267 · 2 1705793 − 1 513498 L1828 13<br />
441 291 · 2 1705173 − 1 513311 L2484 13<br />
442 165 · 2 1705093 + 1 513287 L1158 13<br />
443 109 · 2 1704658 + 1 513156 L1751 12<br />
444 727 · 2 1704196 + 1 513017 L1741 12<br />
445 2 · 3 1074726 + 1 512775 p199 10<br />
446 165 · 2 1703392 + 1 512775 L2131 13<br />
447 313 · 2 1703119 − 1 512693 L1809 13<br />
448 855 · 2 1703065 + 1 512677 L1741 12<br />
449 283 · 2 1702599 − 1 512536 L426 10<br />
450 851 · 2 1702569 + 1 512528 L3344 12<br />
451 1071 · 2 1701792 + 1 512294 L3343 12<br />
452 233 · 2 1700734 − 1 511975 L426 10<br />
453 1642 · 30 346592 − 1 511962 p268 12<br />
454 927 · 2 1699446 + 1 511588 L1741 12<br />
10
ank description digits who year comment<br />
455 657 · 2 1699031 + 1 511463 L3261 12<br />
456 1065 · 2 1698303 + 1 511244 L1741 12<br />
457 561 · 2 1697783 + 1 511087 L1360 12<br />
458 5 · 10 511056 − 1 511057 p297 11 Near-repdigit<br />
459 121 · 2 1695499 − 1 510399 L62 05<br />
460 883 · 2 1694710 + 1 510162 L1204 12<br />
461 985 · 2 1694268 + 1 510029 L3167 12<br />
462 405 · 2 1693765 + 1 509877 L1741 13<br />
463 873 · 2 1692706 + 1 509559 L1980 12<br />
464 299 · 2 1692271 + 1 509427 L1741 13<br />
465 993 · 2 1691212 + 1 509109 L3262 12<br />
466 395 · 2 1690690 − 1 508951 L1819 13<br />
467 217 · 2 1690664 + 1 508943 L3412 13<br />
468 599 · 2 1687659 + 1 508039 L3262 12<br />
469 20049 · 2 1687252 − 1 507918 L1471 11<br />
470 915 · 2 1686699 + 1 507750 L2520 12<br />
471 2 · 3 1063844 − 1 507583 L426 12<br />
472 63 · 2 1686050 + 1 507554 L2085 11 Divides GF (1686047, 12)<br />
473 1191 · 2 1686001 + 1 507540 L1935 12<br />
474 693 · 2 1685544 + 1 507403 L1354 12<br />
475 339 · 2 1685135 + 1 507279 L1595 13<br />
476 19 · 2 1684813 − 1 507181 L503 08<br />
477 133 · 2 1684616 + 1 507123 L2826 13<br />
478 110059! + 1 507082 p312 11 Factorial<br />
479 415 · 2 1684046 + 1 506951 L1990 13<br />
480 249 · 2 1681039 + 1 506046 L1741 13<br />
481 5374 · 5 723697 − 1 505847 p351 12<br />
482 555 · 2 1679952 + 1 505719 L3262 12<br />
483 193 · 2 1679938 + 1 505715 L1741 13<br />
484 357 · 2 1679872 + 1 505695 L3139 13<br />
485 309 · 2 1679867 + 1 505693 L2675 13<br />
486 985 · 2 1679754 + 1 505660 L1741 12<br />
487 1065 · 2 1679402 + 1 505554 L3262 12<br />
488 139 · 666 178851 − 1 504984 L2054 11<br />
489 559 · 2 1677446 + 1 504965 L3262 12<br />
490 411 · 2 1677196 + 1 504889 L2734 13<br />
491 905 · 2 1677085 + 1 504856 L3249 12<br />
492 60357 · 2 1676907 + 1 504805 L587 11<br />
493 567 · 2 1676783 + 1 504765 L1576 12<br />
494 255 · 2 1675403 + 1 504349 L1741 13<br />
495 95 · 2 1674777 + 1 504161 L1224 11<br />
496 1043 · 2 1674573 + 1 504100 L3338 12<br />
497 699 · 2 1674293 + 1 504016 L2366 12<br />
498 93 · 2 1673893 + 1 503894 L2085 11<br />
499 173 · 2 1673881 + 1 503891 L3234 13<br />
500 879 · 2 1672525 + 1 503484 L1741 12<br />
501 987 · 2 1672475 + 1 503469 L1745 12<br />
502 847 · 2 1670014 + 1 502728 L3173 12<br />
503 141 · 2 1669965 + 1 502712 L3294 13<br />
504 55 · 2 1669798 + 1 502662 L2518 11 Divides GF (1669797, 12)<br />
11
ank description digits who year comment<br />
505 1089 · 2 1669361 + 1 502531 L1584 12<br />
506 161 · 2 1668927 + 1 502400 L2520 13<br />
507 525 · 2 1668316 + 1 502216 L3221 12<br />
508 15 · 2 1667744 + 1 502043 g279 07<br />
509 2 1667321 − 2 833661 + 1 501914 L137 11 Gaussian Mersenne norm 38?<br />
510 149183 · 2 1666957 + 1 501810 g346 05<br />
511 99 · 2 1665995 + 1 501517 L2121 11<br />
512 403 · 2 1664194 + 1 500975 L2626 13<br />
513 233 · 2 1662513 + 1 500469 L3035 13<br />
514 441 · 2 1662069 + 1 500336 L3113 13<br />
515 533 · 2 1660425 + 1 499841 L2117 12<br />
516 825 · 2 1660087 + 1 499739 L2366 12<br />
517 63 · 2 1659338 − 1 499513 L503 08<br />
518 521 · 2 1659077 + 1 499435 L3262 12<br />
519 393 · 2 1658625 + 1 499299 L3409 13<br />
520 239 · 30 337990 − 1 499255 p268 12<br />
521 171 · 2 1658303 + 1 499202 L1300 13<br />
522 61 · 2 1654383 − 1 498021 L503 08<br />
523 1047 · 2 1653096 + 1 497635 L1792 12<br />
524 68 · 23 365239 + 1 497358 p261 09<br />
525 499 · 2 1651814 + 1 497249 L1842 13<br />
526 689 · 2 1651563 + 1 497173 L1204 12<br />
527 143 · 2 1650689 + 1 496910 L1751 12<br />
528 785 · 2 1650459 + 1 496841 L2876 12<br />
529 233 · 2 1649741 + 1 496624 L3405 13<br />
530 183 · 2 1649506 + 1 496554 L2520 13<br />
531 69 · 2 1649423 − 1 496528 L621 08<br />
532 925 · 2 1649360 + 1 496510 L3262 12<br />
533 469949 · 2 1649228 − 1 496473 L160 07<br />
534 295 · 2 1648168 + 1 496151 L2826 13<br />
535 309 · 2 1647947 − 1 496084 L2028 12<br />
536 209 · 2 1647640 − 1 495992 L2338 12<br />
537 445 · 2 1646888 + 1 495766 L1300 13<br />
538 331 · 2 1646668 + 1 495699 L2241 13<br />
539 49 · 2 1646042 + 1 495510 L2516 11 Generalized Fermat<br />
540 72532 · 5 708453 − 1 495193 p341 12<br />
541 81 · 2 1643428 + 1 494724 g418 09 Generalized Fermat<br />
542 771 · 2 1643321 + 1 494692 L1741 12<br />
543 933 · 2 1642574 + 1 494468 L2826 12<br />
544 265 · 2 1639448 + 1 493526 L2322 13<br />
545 315 · 2 1639432 − 1 493521 L1827 11<br />
546 251048373 · 2 1638322 + 1 493193 p221 09<br />
547 125522417 · 2 1638323 + 1 493193 p221 09<br />
548 250171825 · 2 1638322 + 1 493193 p221 09<br />
549 1000628481 · 2 1638320 + 1 493193 p221 09<br />
550 531 · 2 1637465 + 1 492929 L2322 12<br />
551 765 · 2 1635531 + 1 492347 L3035 12<br />
552 871 · 2 1635488 + 1 492334 L3108 12<br />
553 169 · 2 1635086 + 1 492213 L1130 13 Generalized Fermat<br />
554 277 · 2 1634878 + 1 492150 L1300 13<br />
12
ank description digits who year comment<br />
555 971 · 2 1633735 + 1 491807 L2735 12<br />
556 645 · 2 1633521 + 1 491742 L3035 12<br />
557 1185 · 2 1632895 + 1 491554 L2989 12<br />
558 267 · 2 1632893 − 1 491553 L1828 13<br />
559 539 · 2 1632705 + 1 491496 L3237 12<br />
560 53 · 2 1632590 − 1 491461 L2055 11<br />
561 675 · 2 1632285 + 1 491370 L3260 12<br />
562 937 · 2 1632080 + 1 491309 L3221 12<br />
563 321 · 2 1629307 + 1 490473 L2981 13<br />
564 267 · 2 1629148 − 1 490425 L1828 13<br />
565 555 · 2 1629059 + 1 490399 L1741 12<br />
566 907 · 2 1628548 + 1 490245 L2826 12<br />
567 69 · 2 1628378 + 1 490193 L2507 11<br />
568 113 · 2 1627496 − 1 489928 L2484 11<br />
569 63 · 2 1626259 − 1 489555 L1828 11<br />
570 63 · 2 1625970 + 1 489468 L1135 11<br />
571 975 · 2 1624794 + 1 489115 L2085 12<br />
572 715 · 2 1624000 + 1 488876 L3335 12<br />
573 897 · 2 1623927 + 1 488854 L3173 12<br />
574 651 · 2 1621489 + 1 488120 L3141 12<br />
575 939 · 2 1621215 + 1 488038 L3312 12<br />
576 913 · 2 1619004 + 1 487372 L3167 12<br />
577 269 · 2 1618877 + 1 487333 L1741 13<br />
578 2 · 626 174203 + 1 487172 L1471 11<br />
579 495 · 2 1616716 + 1 486683 L2967 13<br />
580 825 · 2 1616204 + 1 486529 L3014 12<br />
581 87 · 2 1616138 − 1 486508 L1828 11<br />
582 1039 · 2 1616090 + 1 486495 L3173 12<br />
583 357 · 2 1615655 + 1 486364 L3422 13<br />
584 39 · 2 1612681 + 1 485467 L1379 11<br />
585 395 · 2 1611672 − 1 485165 L1819 13<br />
586 31 · 2 1611311 − 1 485055 L330 10<br />
587 713 · 2 1610773 + 1 484894 L3110 12<br />
588 459 · 2 1609603 + 1 484542 L2787 13<br />
589 569 · 2 1608879 + 1 484324 L333 12<br />
590 521 · 2 1608779 + 1 484294 L2051 12<br />
591 81 · 2 1606848 + 1 483712 gt 07 Generalized Fermat<br />
592 465 · 2 1606272 + 1 483539 L2826 13<br />
593 1109 · 2 1606173 + 1 483510 L1935 12<br />
594 183 · 2 1605657 + 1 483354 L2085 13<br />
595 486 · 187 212627 + 1 483058 p289 12<br />
596 1009 · 2 1602478 + 1 482397 L1300 12<br />
597 2 · 3 1010743 − 1 482248 L426 11<br />
598 959 · 2 1600467 + 1 481792 L1745 12<br />
599 1073 · 2 1600077 + 1 481675 L3110 12<br />
600 555 · 2 1597517 + 1 480904 L2366 12<br />
601 15 · 2 1597510 + 1 480900 g279 06<br />
602 305 · 2 1597089 + 1 480775 L2520 13<br />
603 216290 · 167 216290 − 1 480757 L2777 12 Generalized Woodall<br />
604 235 · 2 1596836 + 1 480698 L2085 13<br />
13
ank description digits who year comment<br />
605 1033 · 2 1596708 + 1 480661 L3173 12<br />
606 135 · 2 1596454 + 1 480583 L2532 13<br />
607 659 · 2 1595363 + 1 480255 L1935 12<br />
608 315 · 2 1595314 + 1 480240 L3397 13<br />
609 69 · 2 1595083 + 1 480170 L2085 11<br />
610 1113 · 2 1594402 + 1 479966 L1300 12<br />
611 58753 · 2 1594323 − 1 479944 p190 06<br />
612 555 · 2 1593788 + 1 479781 L3035 12<br />
613 481 · 2 1593660 + 1 479743 L1204 13<br />
614 1147 · 2 1593256 + 1 479621 L3035 12<br />
615 737 · 2 1592724 − 1 479461 L191 06<br />
616 79 · 2 1592422 + 1 479369 L1885 11<br />
617 853 · 2 1592254 + 1 479320 L3035 12<br />
618 110413 · 2 1591999 − 1 479245 L111 05<br />
619 99 · 2 1591984 − 1 479237 L282 09<br />
620 1179 · 2 1591362 + 1 479051 g387 06<br />
621 875 · 2 1591229 + 1 479011 L3221 12<br />
622 135 · 2 1590711 + 1 478854 L1204 13<br />
623 279 · 2 1590369 − 1 478752 L1828 13<br />
624 121 · 2 1589157 − 1 478387 L65 05<br />
625 285 · 2 1588353 + 1 478145 L1733 13<br />
626 263 · 2 1587302 − 1 477828 L2101 12<br />
627 289 · 2 1587151 − 1 477783 L1828 11<br />
628 1197 · 2 1587140 + 1 477780 L3260 12<br />
629 19502212 65536 + 1 477763 p160 05 Generalized Fermat<br />
630 1191 · 2 1586696 + 1 477647 L2876 12<br />
631 1039 · 2 1586474 + 1 477580 L1502 12<br />
632 261 · 2 1586347 + 1 477541 L3237 13<br />
633 277 · 2 1584740 + 1 477057 L1502 13<br />
634 1908 · 22 355313 + 1 476984 L1471 13<br />
635 763 · 2 1583512 + 1 476688 L1935 12<br />
636 277 · 2 1583097 − 1 476563 L2484 13<br />
637 855 · 2 1582921 + 1 476510 L3035 12<br />
638 1098133# − 1 476311 p346 12 Primorial<br />
639 (2 64 − 189) · 10 476124 + 1 476144 p342 13<br />
640 311 · 2 1581686 − 1 476138 L623 09<br />
641 87 · 2 1580858 + 1 475888 L2487 11 Divides GF (1580856, 6)<br />
642 989 · 2 1580147 + 1 475675 L3333 12<br />
643 159 · 2 1579426 + 1 475457 L3179 13<br />
644 4494381 · 2 1579256 + 1 475411 L2425 11<br />
645 3437965 · 2 1579256 + 1 475410 L2425 11<br />
646 552073 · 2 1579256 + 1 475410 L2425 11<br />
647 396687 · 2 1579256 + 1 475410 L2425 11<br />
648 1167 · 2 1579018 + 1 475335 L1728 12<br />
649 603 · 2 1578398 + 1 475148 L333 12<br />
650 2488 · 5 679769 − 1 475142 p321 11<br />
651 17684828 65536 + 1 474979 g410 07 Generalized Fermat<br />
652 17655444 65536 + 1 474932 g410 07 Generalized Fermat<br />
653 17629398 65536 + 1 474890 g410 07 Generalized Fermat<br />
654 365 · 2 1577413 + 1 474852 L1204 13<br />
14
ank description digits who year comment<br />
655 553 · 2 1577344 + 1 474831 L3260 12<br />
656 909 · 2 1576339 + 1 474529 L2085 12<br />
657 805 · 2 1576258 + 1 474504 L3035 12<br />
658 99 · 2 1575803 + 1 474366 L1500 11<br />
659 373 · 2 1575751 − 1 474351 L1819 12<br />
660 1003 · 2 1575486 + 1 474272 L1484 12<br />
661 29 · 2 1574753 + 1 474050 L391 08<br />
662 67 · 2 1573454 + 1 473659 L1125 11<br />
663 703 · 2 1572182 + 1 473277 L2366 12<br />
664 111 · 2 1570718 − 1 472836 L1862 12<br />
665 26 · 800 162819 + 1 472680 p355 12<br />
666 429 · 2 1569942 + 1 472603 L2675 13<br />
667 197 · 2 1568755 + 1 472245 L1204 13<br />
668 483 · 2 1568404 + 1 472140 L1204 13<br />
669 139 · 2 1567874 + 1 471980 p189 06<br />
670 103040! − 1 471794 p301 10 Factorial<br />
671 331882 · 5 674961 − 1 471784 p333 11<br />
672 191 · 2 1567005 + 1 471718 L3035 13<br />
673 69 · 2 1566375 − 1 471528 L1828 11<br />
674 1079 · 2 1565923 + 1 471393 L1344 12<br />
675 285 · 2 1565353 − 1 471221 L3202 13<br />
676 729 · 366 183817 − 1 471215 L2054 11<br />
677 285 · 2 1563167 − 1 470563 L3202 13<br />
678 1047 · 2 1563150 + 1 470559 L3221 12<br />
679 103 · 2 1562619 − 1 470398 L2484 12<br />
680 149 · 2 1561951 + 1 470197 L2322 13<br />
681 891 · 2 1561849 + 1 470167 L2626 12<br />
682 93 · 2 1561686 + 1 470117 L1741 11<br />
683 931 · 2 1561084 + 1 469937 L1167 12<br />
684 695 · 2 1560515 + 1 469765 L2117 12<br />
685 219 · 2 1560099 + 1 469639 L1505 13<br />
686 371 · 2 1559073 + 1 469331 L1745 13<br />
687 651 · 2 1558979 + 1 469303 L3329 12<br />
688 817 · 2 1554994 + 1 468103 L2085 12<br />
689 1185 · 2 1553995 + 1 467803 L2366 12<br />
690 161 · 2 1553570 − 1 467674 L177 11<br />
691 1071 · 2 1548940 + 1 466281 L1204 12<br />
692 1199 · 2 1548171 + 1 466049 L2981 12<br />
693 409 · 2 1546542 + 1 465559 L3248 13<br />
694 135 · 2 1545961 + 1 465383 L2549 13<br />
695 539 · 2 1545909 + 1 465368 L3327 12<br />
696 477 · 2 1545648 + 1 465290 L1484 13<br />
697 81 · 2 1544545 + 1 464957 gt 07<br />
698 1003 · 2 1544288 + 1 464881 L1129 12<br />
699 5 · 10 464843 − 1 464844 p297 11 Near-repdigit<br />
700 95 · 2 1543676 − 1 464695 L2338 11<br />
701 227 · 2 1542323 + 1 464288 L1204 13<br />
702 703 · 2 1542084 + 1 464217 L2038 12<br />
703 53 · 2 1541133 + 1 463929 L1158 11<br />
704 83 · 2 1540750 − 1 463814 L1959 11<br />
15
ank description digits who year comment<br />
705 1061 · 2 1540377 + 1 463703 L2322 12<br />
706 315 · 2 1539539 − 1 463450 L1827 11<br />
707 395 · 2 1538975 + 1 463281 L2826 13<br />
708 333 · 2 1537644 − 1 462880 L1827 11<br />
709 759 · 2 1537049 + 1 462701 L1484 12<br />
710 699 · 2 1535678 + 1 462288 L1122 12<br />
711 63 · 2 1535612 − 1 462268 L1828 11<br />
712 234847 · 2 1535589 − 1 462264 L73 05<br />
713 8331405 · 2 1534807 − 1 462030 L260 11<br />
714 291 · 2 1534413 − 1 461907 L2484 13<br />
715 393 · 2 1534045 + 1 461797 L2826 13<br />
716 165 · 2 1533368 + 1 461592 L3149 13<br />
717 63 · 2 1530888 + 1 460846 L2487 11<br />
718 41 · 2 1530313 + 1 460672 L2131 11<br />
719 247 · 2 1529485 − 1 460424 L2338 11<br />
720 771 · 2 1529249 + 1 460353 L3271 12<br />
721 941 · 2 1529195 + 1 460337 L3110 12<br />
722 505 · 2 1529188 + 1 460335 L2826 12<br />
723 279 · 2 1526518 + 1 459531 L3173 13<br />
724 1071 · 2 1526401 + 1 459496 L3221 12<br />
725 121 · 2 1526097 − 1 459404 L65 05<br />
726 303 · 2 1523973 + 1 458765 L1300 13<br />
727 289 · 2 1522650 + 1 458366 L1741 13 Generalized Fermat<br />
728 731 · 2 1522457 + 1 458309 L3311 12<br />
729 687 · 2 1522087 + 1 458197 L2606 12<br />
730 165 · 2 1521629 − 1 458059 L2055 11<br />
731 19709699 · 2 1521540 − 1 458037 L421 08<br />
732 731 · 2 1518257 + 1 457044 L1204 12<br />
733 291 · 2 1516592 + 1 456543 L2117 13<br />
734 243 · 2 1516368 + 1 456475 L2038 13<br />
735 135 · 2 1515894 + 1 456332 L1129 13 Divides GF (1515890, 10)<br />
736 825 · 2 1515604 + 1 456246 L3284 12<br />
737 1169 · 2 1515073 + 1 456086 L3110 12<br />
738 301 · 2 1514873 − 1 456025 p281 10<br />
739 37674760044125 · 2 1513679 − 67931 455677 p339 12<br />
740 237 · 2 1512216 − 1 455225 L1828 13<br />
741 93 · 2 1511692 + 1 455067 L1135 11<br />
742 945 · 2 1511373 + 1 454972 L3276 12<br />
743 165 · 2 1510977 + 1 454852 L1349 12<br />
744 735 · 2 1509857 + 1 454516 L3319 12<br />
745 4 · 83 236470 + 1 453805 p286 10 Generalized Fermat<br />
746 143 · 2 1507352 − 1 453761 L1828 12<br />
747 7 · 566 164827 − 1 453740 L1471 11<br />
748 1115 · 2 1505697 + 1 453264 L3173 12<br />
749 65 · 2 1505640 − 1 453245 L2055 11<br />
750 431 · 2 1505493 + 1 453202 L2520 13<br />
751 173 · 2 1504740 − 1 452975 L2074 13<br />
752 237 · 2 1503376 − 1 452564 L1828 13<br />
753 197 · 2 1502095 + 1 452178 L2912 13<br />
754 1137 · 2 1501715 + 1 452065 L1745 12<br />
16
ank description digits who year comment<br />
755 907 · 2 1501169 − 1 451900 L860 10<br />
756 1075 · 2 1500964 + 1 451839 L2066 12<br />
757 579 · 2 1500429 + 1 451677 L1300 12<br />
758 13 · 2 1499876 + 1 451509 g267 04 Divides GF (1499875, 3)<br />
759 429 · 2 1499779 + 1 451482 L2603 12<br />
760 147 · 2 1499333 − 1 451347 L1959 13<br />
761 533 · 2 1499097 + 1 451276 L1741 12<br />
762 95 · 2 1498399 + 1 451066 L2494 11<br />
763 27994 · 5 645221 − 1 450995 p324 11<br />
764 191 · 2 1496507 + 1 450496 L1229 12<br />
765 687 · 2 1496330 + 1 450444 L1745 12<br />
766 32 · 26 318071 + 1 450064 L1471 12<br />
767 283 · 2 1494614 + 1 449927 L2984 12<br />
768 749 · 2 1494203 + 1 449803 L2706 12<br />
769 131 · 2 1494099 + 1 449771 L2959 12 Divides Fermat F (1494096)<br />
770 93 · 2 1493877 + 1 449704 L2085 11<br />
771 262172 · 5 643342 − 1 449683 p323 11<br />
772 651 · 2 1493757 + 1 449669 L2583 12<br />
773 455 · 2 1493715 + 1 449656 L2734 12<br />
774 711 · 2 1493231 + 1 449511 L1842 12<br />
775 673 · 2 1492542 + 1 449303 L2826 12<br />
776 7 · 2 1491852 + 1 449094 p166 05 Divides GF (1491851, 6)<br />
777 357 · 2 1491595 + 1 449018 L2960 12<br />
778 303 · 2 1491450 + 1 448974 L1498 12<br />
779 2232007 · 2 1490605 − 1 448724 L4 03<br />
780 147 · 2 1490274 + 1 448620 L3030 12<br />
781 789 · 2 1489887 + 1 448504 L1214 12<br />
782 877 · 2 1489150 + 1 448282 L3019 12<br />
783 49568 · 5 640900 − 1 447975 p321 11<br />
784 191 · 2 1487775 + 1 447868 L1387 12<br />
785 1181 · 2 1487725 + 1 447853 L1129 12<br />
786 61 · 2 1487125 − 1 447672 L1828 11<br />
787 103 · 2 1486695 − 1 447542 L2484 12<br />
788 1155 · 2 1486428 + 1 447463 L2957 12<br />
789 57 · 2 1486214 − 1 447397 L1828 11<br />
790 1286 · 3 937499 + 1 447304 L2777 12 Generalized Cullen<br />
791 62 · 107 219967 + 1 446400 p289 13<br />
792 8922449 · 2 1482840 − 1 446387 L536 11<br />
793 355 · 2 1482390 + 1 446247 L2734 12<br />
794 9 · 2 1481821 − 1 446074 L503 08<br />
795 503 · 2 1481165 + 1 445878 L1204 12<br />
796 583 · 2 1480974 + 1 445821 L1935 12<br />
797 5 · 10 445773 − 1 445774 p297 11 Near-repdigit<br />
798 395 · 2 1480715 + 1 445743 L1792 12<br />
799 725 · 2 1479843 + 1 445480 L2627 12<br />
800 2421 · 2 1479236 + 1 445298 p335 12<br />
801 1185 · 2 1478556 + 1 445093 L2956 12<br />
802 609 · 2 1478341 + 1 445028 L2987 12<br />
803 29 · 2 1478344 − 1 445028 L10 05<br />
804 705 · 2 1478286 + 1 445012 L1158 12<br />
17
ank description digits who year comment<br />
805 1071 · 2 1478005 − 1 444927 L1828 13<br />
806 847 · 2 1477272 + 1 444707 L2935 12<br />
807 138835 · 2 1476392 + 1 444444 L3494 13<br />
808 27 · 2 1476347 + 1 444427 g279 05<br />
809 1329 · 2 1476061 − 1 444342 L1828 13<br />
810 163 · 2 1475932 + 1 444303 L2955 12<br />
811 371 · 2 1475337 + 1 444124 L2958 12<br />
812 1159 · 2 1475217 − 1 444088 L1828 13<br />
813 333 · 2 1474766 − 1 443952 L1827 11<br />
814 176660 · 18 353320 − 1 443519 p325 11 Generalized Woodall<br />
815 69 · 2 1473217 − 1 443485 L2055 11<br />
816 327 · 2 1473201 − 1 443481 L1827 11<br />
817 1263 · 2 1472875 − 1 443383 L1828 13<br />
818 127 · 2 1472718 + 1 443335 L2954 12<br />
819 43994 · 6 569498 − 1 443161 p267 10<br />
820 325627 · 2 1472117 − 1 443157 L111 05<br />
821 1317 · 2 1471508 − 1 442972 L1828 13<br />
822 133 · 2 1471408 + 1 442941 L2139 12<br />
823 1197 · 2 1471378 − 1 442932 L1828 13<br />
824 207 · 2 1471290 + 1 442905 L1300 12<br />
825 579 · 2 1471002 + 1 442819 L2901 12<br />
826 1291 · 2 1470905 − 1 442790 L1828 13<br />
827 303 · 2 1470065 + 1 442537 L2058 12<br />
828 629 · 2 1469471 + 1 442358 L1999 12<br />
829 1155 · 2 1468763 − 1 442145 L1828 13<br />
830 55 · 2 1468439 − 1 442046 L2074 13<br />
831 1467763 · 2 1467763 − 1 441847 L381 07 Woodall<br />
832 77 · 2 1467554 − 1 441780 L145 06<br />
833 1073 · 2 1467421 + 1 441741 L2121 12<br />
834 105 · 2 1467388 − 1 441730 L384 10<br />
835 1295 · 2 1467128 − 1 441653 L1828 13<br />
836 253 · 2 1465908 + 1 441285 L1498 12<br />
837 279 · 2 1465658 + 1 441210 L2121 12<br />
838 179 · 2 1464720 − 1 440927 L2074 12<br />
839 533 · 2 1462557 + 1 440277 L1186 12<br />
840 165 · 2 1462368 − 1 440219 L2101 11<br />
841 565 · 2 1462336 + 1 440210 L2127 12<br />
842 1193 · 2 1462209 + 1 440172 L2950 12<br />
843 99 · 2 1461496 − 1 439957 L282 09<br />
844 821 · 2 1461453 + 1 439945 L2085 12<br />
845 83 · 2 1461350 − 1 439913 L1959 11<br />
846 647 · 2 1461075 + 1 439831 L2734 12<br />
847 921 · 2 1460168 + 1 439558 L2412 12<br />
848 1035 · 2 1460028 − 1 439516 L1828 12<br />
849 361 · 2 1459308 + 1 439299 L1158 12 Generalized Fermat<br />
850 315 · 2 1459160 + 1 439254 L2127 12<br />
851 1003 · 2 1458560 + 1 439074 L1214 12<br />
852 179 · 2 1457415 + 1 438728 L1224 12<br />
853 505 · 2 1457394 + 1 438723 L2121 12<br />
854 1179 · 2 1456957 − 1 438591 L1828 12<br />
18
ank description digits who year comment<br />
855 313 · 2 1456431 − 1 438432 L1809 13<br />
856 301 · 2 1455620 + 1 438188 L1999 12<br />
857 83 · 2 1455358 − 1 438109 L1959 11<br />
858 701 · 2 1455225 + 1 438070 L2962 12<br />
859 1085 · 2 1453676 − 1 437604 L1828 12<br />
860 379 · 2 1453534 + 1 437560 L2826 12<br />
861 281 · 2 1453426 − 1 437528 L2101 12<br />
862 967 · 2 1453316 + 1 437495 L2856 12<br />
863 21 · 2 1452771 − 1 437329 L503 08<br />
864 911 · 2 1450865 + 1 436757 L1158 12<br />
865 995 · 2 1450439 + 1 436629 L2139 12<br />
866 1101 · 2 1450203 − 1 436558 L1828 12<br />
867 1139 · 2 1450029 + 1 436506 L1509 12<br />
868 1121 · 2 1449665 + 1 436396 L2785 12<br />
869 855 · 2 1449637 + 1 436388 L1336 12<br />
870 77743 · 6 560745 − 1 436350 p267 10<br />
871 909 · 2 1449002 + 1 436197 L2125 12<br />
872 23 · 2 1448461 + 1 436032 L170 08<br />
873 395 · 2 1447971 + 1 435886 L1935 12<br />
874 1051 · 2 1447928 + 1 435873 L2949 12<br />
875 10107 · 6 559967 + 1 435744 p254 12<br />
876 969 · 2 1447062 + 1 435613 L1745 12<br />
877 711 · 2 1446472 + 1 435435 L1224 12<br />
878 1061 · 2 1445645 + 1 435186 L2863 12<br />
879 8331405 · 2 1445428 − 1 435125 L260 10<br />
880 923 · 2 1445405 + 1 435114 L2942 12<br />
881 194 · 165 196199 + 1 435071 p289 12<br />
882 855 · 2 1444094 + 1 434719 L2604 12<br />
883 705 · 2 1442509 + 1 434242 L2085 12<br />
884 345 · 2 1441905 + 1 434060 L2604 12<br />
885 10 · 802 149319 + 1 433650 p268 11<br />
886 589 · 2 1440410 + 1 433610 L1336 12<br />
887 417 · 2 1439196 + 1 433244 L2604 12<br />
888 851 · 2 1438625 + 1 433073 L1728 12<br />
889 581 · 2 1438385 + 1 433000 L2604 12<br />
890 637 · 2 1438112 + 1 432918 L1524 12<br />
891 83 · 2 1437882 − 1 432848 L1959 11<br />
892 969 · 2 1435731 + 1 432202 L1509 12<br />
893 210092 · 5 618136 − 1 432064 L2050 11<br />
894 1135 · 2 1434722 + 1 431898 L1933 12<br />
895 19 · 2 1434165 − 1 431728 L503 08<br />
896 825 · 2 1433899 + 1 431650 L2127 12<br />
897 95 · 2 1433853 + 1 431635 L2503 11 Divides GF (1433852, 3)<br />
898 141 · 2 1433536 + 1 431540 L2560 12<br />
899 987 · 2 1433326 + 1 431478 L1158 12<br />
900 749 · 2 1433277 + 1 431463 L2941 12<br />
901 825 · 2 1433131 + 1 431419 L1991 12<br />
902 3303 · 112 210284 + 1 430922 p271 12<br />
903 243 · 2 1431443 − 1 430910 L2055 11<br />
904 1041 · 2 1431405 + 1 430899 L1229 12<br />
19
ank description digits who year comment<br />
905 729 · 2 1430906 + 1 430749 L2002 11 Generalized Fermat<br />
906 1079 · 2 1430317 + 1 430572 L2940 12<br />
907 1031 · 2 1430239 + 1 430548 L1129 12<br />
908 1193 · 2 1430037 + 1 430488 L1555 12<br />
909 675 · 2 1429386 + 1 430291 L1379 12<br />
910 267 · 2 1429060 − 1 430193 L1828 13<br />
911 45 · 2 1427666 + 1 429772 L1446 10<br />
912 270748 · 5 614625 − 1 429610 L2050 11<br />
913 147 · 2 1426959 + 1 429560 L2922 12<br />
914 19681127 · 2 1426862 − 1 429536 L466 12<br />
915 1023 · 2 1426490 + 1 429420 L1554 12<br />
916 94550! − 1 429390 p290 10 Factorial<br />
917 2018 · 162 194314 − 1 429344 p289 12<br />
918 113 · 2 1425998 − 1 429271 L257 08<br />
919 1129 · 2 1424494 + 1 428819 L2939 12<br />
920 1169 · 2 1423969 + 1 428661 L2948 12<br />
921 561 · 2 1423021 + 1 428375 L2945 12<br />
922 555 · 2 1422674 + 1 428271 L2944 12<br />
923 255 · 2 1422283 − 1 428153 L2074 12<br />
924 21 · 2 1421741 + 1 427989 g279 05<br />
925 537 · 2 1421571 + 1 427939 L2557 12<br />
926 8 · 3 896701 − 1 427837 p258 10<br />
927 65 · 2 1421088 − 1 427792 L1828 11<br />
928 9 · 2 1419855 − 1 427420 L323 09<br />
929 1047 · 2 1418968 + 1 427155 L2093 12<br />
930 273 · 2 1418856 + 1 427121 L2674 12<br />
931 15 · 2 1418605 + 1 427044 g279 06 Divides GF (1418600, 5),<br />
GF (1418601, 6)<br />
932 225 · 2 1417568 + 1 426733 L2947 12 Generalized Fermat<br />
933 303 · 2 1416878 + 1 426526 L2937 12<br />
934 29 · 2 1416873 + 1 426523 g305 07<br />
935 61 · 2 1416365 − 1 426371 L2055 11<br />
936 659 · 2 1414237 + 1 425731 L2453 12<br />
937 149797 · 2 1414137 − 1 425703 L105 05<br />
938 1087 · 2 1413982 + 1 425655 L2934 12<br />
939 1031 · 2 1413801 + 1 425600 L2936 12<br />
940 799 · 2 1413586 + 1 425535 L2142 12<br />
941 266206 · 5 608649 − 1 425433 L2050 11<br />
942 199 · 2 1412913 − 1 425332 L2074 13<br />
943 1083 · 2 1410817 + 1 424702 L1562 12<br />
944 339 · 2 1410789 − 1 424693 L1830 11<br />
945 625 · 2 1410668 + 1 424657 L1498 12 Generalized Fermat<br />
946 445 · 2 1408906 + 1 424126 L2544 12<br />
947 439 · 2 1408326 + 1 423952 L1546 12<br />
948 93 · 2 1408246 + 1 423927 L1207 11<br />
949 165 · 2 1408117 + 1 423888 L2935 12<br />
950 105 · 2 1407665 − 1 423752 L384 09<br />
951 55 · 2 1406997 − 1 423551 L1884 11<br />
952 143 · 2 1406788 − 1 423488 L1828 12<br />
953 141 · 2 1404747 + 1 422874 L1158 12<br />
20
ank description digits who year comment<br />
954 2829122 65536 + 1 422816 p343 12 Generalized Fermat<br />
955 2779470 65536 + 1 422312 p343 12 Generalized Fermat<br />
956 435 · 2 1402809 + 1 422291 L2938 12<br />
957 647 · 2 1402275 + 1 422130 L1158 12<br />
958 1101 · 2 1402221 + 1 422114 L2168 12<br />
959 2744940 65536 + 1 421956 p343 12 Generalized Fermat<br />
960 2738848 65536 + 1 421893 p343 12 Generalized Fermat<br />
961 1131 · 2 1401172 + 1 421798 L1456 12<br />
962 573 · 2 1400092 + 1 421473 L2949 12<br />
963 429 · 2 1400083 + 1 421470 L2930 12<br />
964 881 · 2 1399963 + 1 421434 L1224 12<br />
965 23 · 2 1399841 + 1 421396 L1158 11<br />
966 127 · 2 1398889 − 1 421110 L486 08<br />
967 241 · 2 1398869 − 1 421104 L1828 13<br />
968 125 · 2 1398712 − 1 421057 L2101 12<br />
969 219 · 2 1398411 + 1 420966 L1336 12<br />
970 1564347 · 2 1398269 − 1 420928 L466 08<br />
971 2 1398269 − 1 420921 G1 96 Mersenne 35<br />
972 765 · 2 1398051 + 1 420859 L2932 12<br />
973 192089 · 2 1395688 − 1 420150 L49 04<br />
974 225 · 2 1395649 − 1 420135 L2074 12<br />
975 85 · 2 1395605 − 1 420121 L2338 11<br />
976 935 · 2 1394813 + 1 419884 L2863 12<br />
977 147 · 2 1392930 + 1 419316 L2931 12<br />
978 2484264 65536 + 1 419116 p343 12 Generalized Fermat<br />
979 2483590 65536 + 1 419108 p316 12 Generalized Fermat<br />
980 1151 · 2 1390169 + 1 418486 L1336 12<br />
981 891 · 2 1390163 + 1 418484 L2562 12<br />
982 77 · 2 1390004 − 1 418435 L2074 11<br />
983 869 · 2 1389895 + 1 418404 L1480 12<br />
984 113 · 2 1389674 − 1 418336 L257 08<br />
985 953 · 2 1389449 + 1 418269 L1935 12<br />
986 182402 · 14 364804 − 1 418118 p325 11 Generalized Woodall<br />
987 17 · 2 1388355 + 1 417938 g267 05 Divides GF (1388354, 10)<br />
988 413 · 2 1387625 + 1 417720 L1357 12<br />
989 1169 · 2 1387289 + 1 417619 L2927 12<br />
990 2336976 65536 + 1 417377 p316 12 Generalized Fermat<br />
991 805 · 2 1386368 + 1 417342 L2926 12<br />
992 675 · 2 1386270 + 1 417312 L2093 12<br />
993 771 · 2 1385696 + 1 417139 L2110 12<br />
994 2313394 65536 + 1 417088 p316 11 Generalized Fermat<br />
995 427 · 2 1385238 + 1 417001 L1204 12<br />
996 409 · 2 1384346 + 1 416733 L1357 12<br />
997 89 · 2 1383108 − 1 416359 L1884 11<br />
998 2251082 65536 + 1 416311 p316 11 Generalized Fermat<br />
999 999 · 2 1382497 + 1 416177 L1524 12<br />
1000 491 · 2 1382361 + 1 416135 L2167 12<br />
1001 487 · 2 1382068 + 1 416047 L2925 12<br />
1002 609 · 2 1380766 + 1 415655 L2785 12<br />
1003 2187182 65536 + 1 415491 g260 09 Generalized Fermat<br />
21
ank description digits who year comment<br />
1004 2177038 65536 + 1 415359 g260 08 Generalized Fermat<br />
1005 199 · 2 1379329 − 1 415222 L2074 12<br />
1006 2162068 65536 + 1 415162 g260 08 Generalized Fermat<br />
1007 1209 · 2 1378600 − 1 415004 L1828 13<br />
1008 1041 · 2 1377936 + 1 414804 L1158 12<br />
1009 653 · 2 1377857 + 1 414780 L2887 12<br />
1010 1395 · 2 1377793 − 1 414761 L1828 13<br />
1011 6 · 10 414508 − 1 414509 p297 11 Near-repdigit<br />
1012 139 · 2 1376635 − 1 414411 L384 13<br />
1013 151 · 2 1376256 + 1 414297 L1751 11<br />
1014 129 · 2 1376223 − 1 414287 L1959 11<br />
1015 1005 · 2 1375758 + 1 414148 L2606 12<br />
1016 65 · 2 1374574 − 1 413790 L2055 11<br />
1017 163 · 2 1374474 + 1 413761 L2933 12<br />
1018 147 · 2 1374216 − 1 413683 L1959 11<br />
1019 (2 64 − 189) · 10 413500 + 1 413520 p342 12<br />
1020 981 · 2 1373643 + 1 413511 L2125 12<br />
1021 231 · 2 1372505 + 1 413168 L2169 12<br />
1022 347 · 2 1372215 + 1 413081 L2085 12<br />
1023 321 · 2 1371846 − 1 412970 L1830 11<br />
1024 237 · 2 1371630 − 1 412905 L1828 13<br />
1025 73 · 2 1370742 + 1 412637 g418 09<br />
1026 955 · 2 1369986 + 1 412410 L2928 12<br />
1027 195 · 2 1369746 − 1 412337 L2101 11<br />
1028 771 · 2 1369709 + 1 412327 L2453 12<br />
1029 1169 · 2 1369516 − 1 412269 L1828 13<br />
1030 1235 · 2 1369070 − 1 412135 L1828 13<br />
1031 1055 · 2 1368554 − 1 411979 L1828 13<br />
1032 15 · 2 1368428 + 1 411940 g279 06<br />
1033 609 · 2 1368375 + 1 411925 L2946 12<br />
1034 243 · 2 1368212 − 1 411876 L2055 11<br />
1035 1093 · 2 1367891 − 1 411780 L1828 13<br />
1036 789 · 2 1367445 + 1 411645 L2030 12<br />
1037 245 · 2 1367128 − 1 411549 L1862 11<br />
1038 51017 · 6 528803 − 1 411494 p258 10<br />
1039 237 · 2 1366717 − 1 411426 L1828 13<br />
1040 955 · 2 1366700 + 1 411421 L2929 12<br />
1041 778 · 73 220782 + 1 411392 L587 13<br />
1042 497 · 2 1366295 + 1 411299 L2915 12<br />
1043 1085 · 2 1366270 − 1 411292 L1828 13<br />
1044 1874512 65536 + 1 411101 g413 08 Generalized Fermat<br />
1045 1055 · 2 1365519 + 1 411066 L2453 12<br />
1046 77 · 2 1365452 − 1 411044 L2074 11<br />
1047 45 · 2 1365167 + 1 410958 L1446 10<br />
1048 273 · 2 1365107 − 1 410941 L1828 13<br />
1049 241489 · 2 1365062 + 1 410930 L101 05<br />
1050 19861029 · 2 1365009 − 1 410916 L895 12<br />
1051 869 · 2 1364737 + 1 410830 L2924 12<br />
1052 321 · 2 1363671 − 1 410509 L1830 11<br />
1053 555 · 2 1363577 + 1 410481 L2413 12<br />
22
ank description digits who year comment<br />
1054 1383 · 2 1363428 − 1 410436 L1828 13<br />
1055 1828502 65536 + 1 410393 GF2 05 Generalized Fermat<br />
1056 1035 · 2 1362722 − 1 410224 L1828 13<br />
1057 171 · 2 1362662 − 1 410205 L1959 11<br />
1058 107 · 2 1362654 − 1 410202 L621 09<br />
1059 301016 · 5 586858 − 1 410202 L2050 11<br />
1060 1123 · 2 1361432 + 1 409835 L1300 12<br />
1061 51 · 2 1358372 + 1 408913 L1446 10<br />
1062 87 · 2 1358189 − 1 408858 L2055 11<br />
1063 205 · 2 1358016 + 1 408806 L1745 12<br />
1064 35 · 2 1357881 + 1 408765 g279 06<br />
1065 203 · 2 1357425 + 1 408628 L1201 12<br />
1066 63 · 2 1357156 − 1 408547 L1828 11<br />
1067 1455 · 2 1357070 + 1 408522 L1134 12<br />
1068 63 · 2 1356980 + 1 408494 L181 11<br />
1069 7176 · 29 279240 + 1 408364 g103 11<br />
1070 273 · 2 1356347 − 1 408304 L1828 13<br />
1071 223 · 2 1356316 + 1 408295 L1158 12<br />
1072 4233 · 22 304046 + 1 408162 L1471 13<br />
1073 205 · 2 1355814 + 1 408143 L2413 12<br />
1074 347 · 2 1355595 + 1 408078 L2913 12<br />
1075 357 · 2 1355535 + 1 408060 L2873 12<br />
1076 299 · 2 1355004 − 1 407900 L426 09<br />
1077 771 · 2 1354880 + 1 407863 L2919 12<br />
1078 338707 · 2 1354830 + 1 407850 L124 05 Cullen<br />
1079 199 · 2 1354385 − 1 407713 L2074 12<br />
1080 1343 · 2 1354316 − 1 407693 L1828 13<br />
1081 195 · 2 1354264 + 1 407677 L2413 12<br />
1082 8331405 · 2 1353931 − 1 407581 L260 10<br />
1083 703 · 2 1353866 + 1 407558 L2659 12<br />
1084 99 · 2 1353457 + 1 407434 L1675 11<br />
1085 763 · 2 1352872 + 1 407258 L2121 12<br />
1086 30 · 939 137000 + 1 407257 L1471 13<br />
1087 1155 · 2 1352821 + 1 407243 L2921 12<br />
1088 1345 · 2 1352629 − 1 407186 L1828 13<br />
1089 1085 · 2 1352556 − 1 407163 L1828 13<br />
1090 273 · 2 1352006 − 1 406997 L1828 13<br />
1091 631 · 2 1351932 + 1 406975 L1115 12<br />
1092 709 · 2 1351346 + 1 406799 L2604 12<br />
1093 539 · 2 1350581 + 1 406569 L2951 12<br />
1094 837 · 2 1350463 + 1 406533 L1745 12<br />
1095 1157 · 2 1350311 + 1 406488 L2923 12<br />
1096 1005 · 2 1349820 + 1 406340 L2920 12<br />
1097 195 · 2 1349818 + 1 406338 L1204 12<br />
1098 269 · 2 1348497 + 1 405941 L2916 12<br />
1099 1075 · 2 1348100 + 1 405822 L2453 12<br />
1100 975 · 2 1347675 + 1 405694 L2952 12<br />
1101 1540550 65536 + 1 405516 GF2 03 Generalized Fermat<br />
1102 1191 · 2 1346923 − 1 405468 L1828 13<br />
1103 1087 · 2 1346917 − 1 405466 L121 10<br />
23
ank description digits who year comment<br />
1104 765 · 2 1346535 + 1 405351 L2413 12<br />
1105 1063959 · 2 1346269 − 1 405274 L466 13<br />
1106 721 · 2 1346084 + 1 405215 L1387 12<br />
1107 931 · 2 1344712 + 1 404802 L1115 12<br />
1108 15 · 2 1344313 − 1 404680 L139 07<br />
1109 1169 · 2 1344265 + 1 404668 L2922 12<br />
1110 319 · 2 1344059 − 1 404605 L1819 13<br />
1111 553 · 2 1344056 + 1 404604 L2943 12<br />
1112 1483076 65536 + 1 404434 GF2 03 Generalized Fermat<br />
1113 11 · 2 1343347 + 1 404389 p169 05 Divides GF (1343346, 6)<br />
1114 1321 · 2 1343213 − 1 404351 L1828 13<br />
1115 1478036 65536 + 1 404337 GF2 02 Generalized Fermat<br />
1116 1315 · 2 1342783 − 1 404222 L1828 13<br />
1117 607 · 2 1342336 + 1 404087 L2675 12<br />
1118 941 · 2 1341569 + 1 403856 L1204 12<br />
1119 1079 · 2 1340511 + 1 403538 L1336 12<br />
1120 1197 · 2 1340338 + 1 403486 L2525 12<br />
1121 487 · 2 1340126 + 1 403421 L1158 12<br />
1122 115 · 2 1338620 + 1 402967 L1751 11<br />
1123 921 · 2 1338408 + 1 402904 L1204 12<br />
1124 1261 · 2 1338371 − 1 402893 L1828 12<br />
1125 1099 · 2 1338041 − 1 402794 L1828 12<br />
1126 89 · 2 1338001 + 1 402781 L1223 11<br />
1127 835 · 2 1337808 + 1 402724 L1158 12<br />
1128 1309 · 2 1337417 − 1 402606 L1828 12<br />
1129 54767 · 2 1337287 + 1 402569 SB5 02<br />
1130 403 · 2 1337280 + 1 402564 L1741 12<br />
1131 407 · 2 1337203 + 1 402541 L1972 12<br />
1132 107 · 2 1337019 + 1 402485 L2659 12 Divides GF (1337018, 10)<br />
1133 1295 · 2 1337012 − 1 402484 L1828 12<br />
1134 143 · 2 1336358 − 1 402286 L1828 12<br />
1135 933 · 2 1336282 + 1 402264 L2918 12<br />
1136 1374038 65536 + 1 402260 GF3 03 Generalized Fermat<br />
1137 863 · 2 1336093 + 1 402208 L1480 12<br />
1138 203 · 2 1335989 + 1 402176 L1204 12<br />
1139 345 · 2 1335896 + 1 402148 L1158 12<br />
1140 81 · 2 1335675 − 1 402081 L268 08<br />
1141 739 · 2 1335442 + 1 402011 L2085 12<br />
1142 1361846 65536 + 1 402007 GF3 02 Generalized Fermat<br />
1143 335 · 2 1335337 + 1 401980 L1776 12<br />
1144 1065 · 2 1334660 − 1 401776 L1828 12<br />
1145 177 · 2 1334422 − 1 401704 L2101 12<br />
1146 87 · 2 1332741 − 1 401197 L1828 11<br />
1147 1293 · 2 1332159 − 1 401023 L1828 12<br />
1148 231 · 2 1332103 − 1 401006 L1862 13<br />
1149 8331405 · 2 1331801 − 1 400919 L260 10<br />
1150 261 · 2 1331356 + 1 400781 L2873 12<br />
1151 921 · 2 1330248 + 1 400448 L1204 12<br />
1152 1341 · 2 1328829 − 1 400021 L1828 12<br />
1153 1266062 65536 + 1 399931 g295 02 Generalized Fermat<br />
24
ank description digits who year comment<br />
1154 445 · 2 1328250 + 1 399846 L1533 12<br />
1155 1293 · 2 1327556 − 1 399638 L1828 12<br />
1156 169 · 2 1327114 + 1 399504 L2659 12 Generalized Fermat<br />
1157 957 · 2 1325706 + 1 399081 L1741 12<br />
1158 1275 · 2 1325641 − 1 399061 L1828 12<br />
1159 341 · 2 1325277 + 1 398951 L2879 12<br />
1160 19 · 2 1325245 − 1 398940 L121 10<br />
1161 1089 · 2 1323857 − 1 398524 L1828 12<br />
1162 113966 · 6 511831 + 1 398287 L1471 12<br />
1163 311 · 2 1323071 + 1 398287 L1745 12<br />
1164 897 · 2 1322843 + 1 398219 L2562 12<br />
1165 [ Long prime 1165 ] 398204 p44 13<br />
1166 1221 · 2 1322591 − 1 398143 L1828 12<br />
1167 1371 · 2 1322077 − 1 397988 L1828 12<br />
1168 427 · 2 1321706 + 1 397876 L2879 12<br />
1169 1245 · 2 1321376 − 1 397777 L1828 12<br />
1170 471 · 2 1320865 + 1 397623 L1935 12<br />
1171 5 · 2 1320487 + 1 397507 g55 02 Divides GF (1320486, 12)<br />
1172 363 · 2 1319756 + 1 397289 L2873 12<br />
1173 759 · 2 1319718 + 1 397278 L1209 12<br />
1174 525806!7 + 1 397102 p3 12 Multifactorial<br />
1175 94189 · 2 1318646 + 1 396957 L2777 13 Generalized Cullen<br />
1176 723 · 2 1318416 + 1 396886 L1204 12<br />
1177 289 · 2 1317378 + 1 396573 L1132 12 Generalized Fermat<br />
1178 1225 · 2 1317269 − 1 396541 L1828 12<br />
1179 269 · 2 1317053 + 1 396475 L1519 12<br />
1180 250463 · 2 1316921 + 1 396439 L764 10<br />
1181 451 · 2 1316832 + 1 396409 L1158 12<br />
1182 69 · 2 1316758 + 1 396386 L1446 11<br />
1183 28 · 731 138318 + 1 396133 L1471 12<br />
1184 431 · 2 1315773 + 1 396090 L1158 12<br />
1185 1105 · 2 1314586 + 1 395733 L2139 12<br />
1186 1087540 65536 + 1 395605 p320 11 Generalized Fermat<br />
1187 987 · 2 1314127 + 1 395595 L2891 12<br />
1188 15266 · 12 366385 − 1 395401 p325 11 Generalized Woodall<br />
1189 1110 · 366 154149 − 1 395162 L2054 11<br />
1190 30994 · 5 565095 − 1 394989 p280 11<br />
1191 357 · 2 1311930 + 1 394933 L2085 12<br />
1192 1097 · 2 1311771 + 1 394886 L2912 12<br />
1193 1057476 65536 + 1 394807 g197 02 Generalized Fermat<br />
1194 1015 · 2 1311187 − 1 394710 L1828 12<br />
1195 639 · 2 1310707 + 1 394565 L2117 12<br />
1196 1001184681 · 2 1310640 + 1 394551 p221 09<br />
1197 250107985 · 2 1310642 + 1 394551 p221 09<br />
1198 395 · 2 1309751 + 1 394277 L2826 12<br />
1199 763 · 2 1309300 + 1 394142 L2413 12<br />
1200 1171 · 2 1309048 + 1 394066 L2705 12<br />
1201 1024390 65536 + 1 393902 g299 03 Generalized Fermat<br />
1202 1157 · 2 1308162 − 1 393800 L1828 12<br />
1203 55 · 2 1308148 + 1 393794 L1446 11<br />
25
ank description digits who year comment<br />
1204 399 · 2 1307450 + 1 393585 L2659 12<br />
1205 351 · 2 1306875 + 1 393412 L2562 12<br />
1206 1329 · 2 1306295 − 1 393238 L1828 12<br />
1207 135 · 2 1306036 + 1 393159 L1130 12<br />
1208 1105 · 2 1305693 − 1 393056 L1828 12<br />
1209 1485 · 2 1305359 − 1 392956 L1134 12<br />
1210 154801 · 2 1305084 + 1 392875 L764 10<br />
1211 945 · 2 1304747 + 1 392771 L1204 12<br />
1212 83 · 500 145465 + 1 392608 p355 12<br />
1213 24217 · 2 1304085 − 1 392574 L2055 12<br />
1214 19581121 · 2 1303821 − 1 392497 p49 09<br />
1215 897 · 2 1303608 + 1 392429 L1158 12<br />
1216 379 · 2 1302991 − 1 392242 L1819 13<br />
1217 609 · 2 1302898 + 1 392215 L1933 12<br />
1218 1695 · 2 1302827 + 1 392194 L527 13<br />
1219 117 · 2 1302764 − 1 392174 L1959 11<br />
1220 1185 · 2 1301930 + 1 391924 L1745 12<br />
1221 429 · 2 1301821 + 1 391890 L2914 12<br />
1222 357 · 2 1301704 − 1 391855 L1819 13<br />
1223 219259 · 2 1300450 + 1 391480 L635 10<br />
1224 205 · 2 1300401 − 1 391463 L384 10<br />
1225 587 · 2 1300051 + 1 391358 L2085 12<br />
1226 93 · 2 1299926 + 1 391319 L1446 11<br />
1227 627 · 2 1299702 + 1 391253 L1415 11<br />
1228 1011 · 2 1299555 + 1 391209 L2805 11<br />
1229 151026 · 5 559670 − 1 391198 p307 10<br />
1230 615 · 2 1298251 + 1 390816 L2826 11<br />
1231 25 · 2 1298186 + 1 390795 g279 05 Generalized Fermat<br />
1232 8331405 · 2 1297878 − 1 390708 L260 10<br />
1233 393 · 2 1297402 − 1 390560 L644 11<br />
1234 3938 · 5 558032 − 1 390052 p304 10<br />
1235 1215 · 2 1295400 − 1 389958 L1828 12<br />
1236 149 · 2 1295061 + 1 389855 L1751 11<br />
1237 1011 · 2 1294485 + 1 389682 L2659 11<br />
1238 18 · 189 171175 + 1 389675 p289 12<br />
1239 125132 · 6 500528 − 1 389492 L2777 12 Generalized Woodall<br />
1240 799 · 2 1293702 + 1 389447 L1793 11<br />
1241 1077 · 2 1293068 + 1 389256 L2826 11<br />
1242 399 · 2 1293056 − 1 389252 L644 10<br />
1243 397 · 2 1293028 + 1 389243 L2127 12<br />
1244 1029 · 2 1292517 − 1 389090 L1828 12<br />
1245 99 · 2 1292395 − 1 389052 L282 08<br />
1246 857678 65536 + 1 388847 GF0 02 Generalized Fermat<br />
1247 141 · 2 1291195 + 1 388691 L2910 12<br />
1248 843832 65536 + 1 388384 GF0 01 Generalized Fermat<br />
1249 622777788717 · 2 1290000 − 1 388341 L927 13<br />
1250 622764665967 · 2 1290000 − 1 388341 L2601 13<br />
1251 622171046565 · 2 1290000 − 1 388341 L3498 13<br />
1252 621652716597 · 2 1290000 − 1 388341 L3522 13<br />
1253 620799233145 · 2 1290000 − 1 388341 L3203 13<br />
26
ank description digits who year comment<br />
1254 620779654995 · 2 1290000 − 1 388341 L1953 13<br />
1255 620441333295 · 2 1290000 − 1 388341 L2133 13<br />
1256 618824753445 · 2 1290000 − 1 388341 L1566 13<br />
1257 617795053785 · 2 1290000 − 1 388341 L2478 13<br />
1258 612917120097 · 2 1290000 − 1 388341 L3521 13<br />
1259 612861781107 · 2 1290000 − 1 388341 L2595 13<br />
1260 612563306175 · 2 1290000 − 1 388341 L2345 13<br />
1261 611251352847 · 2 1290000 − 1 388341 L927 13<br />
1262 608467591587 · 2 1290000 − 1 388341 L927 13<br />
1263 605578149447 · 2 1290000 − 1 388341 L326 13<br />
1264 605500978227 · 2 1290000 − 1 388341 L3520 13<br />
1265 605446960137 · 2 1290000 − 1 388341 L3242 13<br />
1266 602667338535 · 2 1290000 − 1 388341 L3517 13<br />
1267 599798757567 · 2 1290000 − 1 388341 L3515 13<br />
1268 599415204327 · 2 1290000 − 1 388341 L1319 13<br />
1269 598503731577 · 2 1290000 − 1 388341 L1319 13<br />
1270 598076872617 · 2 1290000 − 1 388341 L2457 13<br />
1271 595053598977 · 2 1290000 − 1 388341 L3426 13<br />
1272 594635112225 · 2 1290000 − 1 388341 L2457 13<br />
1273 594411078345 · 2 1290000 − 1 388341 L1319 13<br />
1274 593727284685 · 2 1290000 − 1 388341 L2438 13<br />
1275 591966620325 · 2 1290000 − 1 388341 L3503 13<br />
1276 591088601337 · 2 1290000 − 1 388341 L3394 13<br />
1277 590291881065 · 2 1290000 − 1 388341 L1319 13<br />
1278 590278821135 · 2 1290000 − 1 388341 L1319 13<br />
1279 586478944725 · 2 1290000 − 1 388341 L3347 13<br />
1280 586267773705 · 2 1290000 − 1 388341 L1319 13<br />
1281 585416789085 · 2 1290000 − 1 388341 L3509 13<br />
1282 584315200737 · 2 1290000 − 1 388341 L596 13<br />
1283 583990308807 · 2 1290000 − 1 388341 L3203 13<br />
1284 583861939677 · 2 1290000 − 1 388341 L2511 13<br />
1285 583634035647 · 2 1290000 − 1 388341 L2250 13<br />
1286 582960045915 · 2 1290000 − 1 388341 L3429 13<br />
1287 580814815467 · 2 1290000 − 1 388341 L3203 13<br />
1288 580137887397 · 2 1290000 − 1 388341 L1319 13<br />
1289 580058432985 · 2 1290000 − 1 388341 L3274 13<br />
1290 578882614455 · 2 1290000 − 1 388341 L3506 13<br />
1291 578680361367 · 2 1290000 − 1 388341 L1319 13<br />
1292 577630659525 · 2 1290000 − 1 388341 L3274 13<br />
1293 576462034977 · 2 1290000 − 1 388341 L1319 13<br />
1294 574759579665 · 2 1290000 − 1 388341 L3203 13<br />
1295 572912625477 · 2 1290000 − 1 388341 L3274 13<br />
1296 572811590307 · 2 1290000 − 1 388341 L1617 13<br />
1297 572005945905 · 2 1290000 − 1 388341 L2511 13<br />
1298 571922904705 · 2 1290000 − 1 388341 L3287 13<br />
1299 571510228245 · 2 1290000 − 1 388341 L2511 13<br />
1300 571015401057 · 2 1290000 − 1 388341 L2496 13<br />
1301 570494531505 · 2 1290000 − 1 388341 L596 13<br />
1302 569989094517 · 2 1290000 − 1 388341 L3496 13<br />
1303 569647051785 · 2 1290000 − 1 388341 L3496 13<br />
27
ank description digits who year comment<br />
1304 569544800037 · 2 1290000 − 1 388341 L3496 13<br />
1305 569433388617 · 2 1290000 − 1 388341 L3287 13<br />
1306 568371452337 · 2 1290000 − 1 388341 L3419 13<br />
1307 567325505337 · 2 1290000 − 1 388341 L3401 13<br />
1308 567065977905 · 2 1290000 − 1 388341 L3508 13<br />
1309 566645493027 · 2 1290000 − 1 388341 L350 13<br />
1310 563283929985 · 2 1290000 − 1 388341 L3507 13<br />
1311 562952221197 · 2 1290000 − 1 388341 L3503 13<br />
1312 562423570665 · 2 1290000 − 1 388341 L1319 13<br />
1313 562271489685 · 2 1290000 − 1 388341 L3347 13<br />
1314 558276767097 · 2 1290000 − 1 388341 L3503 13<br />
1315 557527008717 · 2 1290000 − 1 388341 L1319 13<br />
1316 556815267057 · 2 1290000 − 1 388341 L3401 13<br />
1317 555989462955 · 2 1290000 − 1 388341 L3403 13<br />
1318 555736606917 · 2 1290000 − 1 388341 L3504 13<br />
1319 555042149055 · 2 1290000 − 1 388341 L2511 13<br />
1320 552455634117 · 2 1290000 − 1 388341 L596 13<br />
1321 552145774407 · 2 1290000 − 1 388341 L3371 13<br />
1322 551929936467 · 2 1290000 − 1 388341 L2694 13<br />
1323 551474562795 · 2 1290000 − 1 388341 L3401 13<br />
1324 550294305207 · 2 1290000 − 1 388341 L2576 13<br />
1325 549628699977 · 2 1290000 − 1 388341 L3498 13<br />
1326 549591461445 · 2 1290000 − 1 388341 L3499 13<br />
1327 547763257797 · 2 1290000 − 1 388341 L3381 13<br />
1328 546936507507 · 2 1290000 − 1 388341 L2429 13<br />
1329 545735276445 · 2 1290000 − 1 388341 L2457 13<br />
1330 544542834225 · 2 1290000 − 1 388341 L3321 13<br />
1331 543921100065 · 2 1290000 − 1 388341 L3498 13<br />
1332 543713681775 · 2 1290000 − 1 388341 L3331 13<br />
1333 542770459917 · 2 1290000 − 1 388341 L3203 13<br />
1334 542416935777 · 2 1290000 − 1 388341 L3491 13<br />
1335 542283938787 · 2 1290000 − 1 388341 L2078 13<br />
1336 541570384875 · 2 1290000 − 1 388341 L3493 13<br />
1337 541471202085 · 2 1290000 − 1 388341 L3495 13<br />
1338 540975050367 · 2 1290000 − 1 388341 L2511 13<br />
1339 538712617707 · 2 1290000 − 1 388341 L3492 13<br />
1340 538082595237 · 2 1290000 − 1 388341 L2592 13<br />
1341 536358872805 · 2 1290000 − 1 388341 L3414 13<br />
1342 535503468705 · 2 1290000 − 1 388341 L3486 13<br />
1343 534035409477 · 2 1290000 − 1 388341 L3401 13<br />
1344 533170852965 · 2 1290000 − 1 388341 L3484 13<br />
1345 532418746785 · 2 1290000 − 1 388341 L2513 13<br />
1346 532404378525 · 2 1290000 − 1 388341 L3331 13<br />
1347 531855541917 · 2 1290000 − 1 388341 L3203 13<br />
1348 531043987287 · 2 1290000 − 1 388341 L3488 13<br />
1349 530923354617 · 2 1290000 − 1 388341 L3496 13<br />
1350 530777731167 · 2 1290000 − 1 388341 L3274 13<br />
1351 529531285257 · 2 1290000 − 1 388341 L2429 13<br />
1352 529257936177 · 2 1290000 − 1 388341 L2438 13<br />
1353 529057346727 · 2 1290000 − 1 388341 L1319 13<br />
28
ank description digits who year comment<br />
1354 528602512707 · 2 1290000 − 1 388341 L3482 13<br />
1355 526027719045 · 2 1290000 − 1 388341 L3419 13<br />
1356 524341294227 · 2 1290000 − 1 388341 L3480 13<br />
1357 524136855195 · 2 1290000 − 1 388341 L3321 13<br />
1358 523530466587 · 2 1290000 − 1 388341 L3479 13<br />
1359 516998500665 · 2 1290000 − 1 388341 L3274 13<br />
1360 514525069425 · 2 1290000 − 1 388341 L3401 13<br />
1361 514407948465 · 2 1290000 − 1 388341 L3203 13<br />
1362 514090509387 · 2 1290000 − 1 388341 L3274 13<br />
1363 513723027177 · 2 1290000 − 1 388341 L1948 13<br />
1364 513519859785 · 2 1290000 − 1 388341 L1319 13<br />
1365 511783584975 · 2 1290000 − 1 388341 L3478 13<br />
1366 510926069745 · 2 1290000 − 1 388341 L3203 13<br />
1367 510293735415 · 2 1290000 − 1 388341 L3474 13<br />
1368 509489086125 · 2 1290000 − 1 388341 L3274 13<br />
1369 504246821325 · 2 1290000 − 1 388341 L1704 13<br />
1370 502725411867 · 2 1290000 − 1 388341 L324 13<br />
1371 502051417905 · 2 1290000 − 1 388341 L3203 13<br />
1372 501535801035 · 2 1290000 − 1 388341 L1589 13<br />
1373 501099334437 · 2 1290000 − 1 388341 L3394 13<br />
1374 500797558137 · 2 1290000 − 1 388341 L3426 13<br />
1375 498983752545 · 2 1290000 − 1 388341 L3429 13<br />
1376 498742912167 · 2 1290000 − 1 388341 L3433 13<br />
1377 495979824777 · 2 1290000 − 1 388341 L3274 13<br />
1378 495395016165 · 2 1290000 − 1 388341 L3434 13<br />
1379 492105155355 · 2 1290000 − 1 388341 L3429 13<br />
1380 490304446095 · 2 1290000 − 1 388341 L2754 13<br />
1381 490219448607 · 2 1290000 − 1 388341 L3274 13<br />
1382 488346762615 · 2 1290000 − 1 388341 L3274 13<br />
1383 487982955705 · 2 1290000 − 1 388341 L3274 13<br />
1384 487546507035 · 2 1290000 − 1 388341 L3203 13<br />
1385 487181668965 · 2 1290000 − 1 388341 L3370 13<br />
1386 486388606077 · 2 1290000 − 1 388341 L3274 13<br />
1387 483590093385 · 2 1290000 − 1 388341 L3425 13<br />
1388 483037018875 · 2 1290000 − 1 388341 L3364 13<br />
1389 482707780095 · 2 1290000 − 1 388341 L1566 13<br />
1390 481466629917 · 2 1290000 − 1 388341 L2679 13<br />
1391 481206806505 · 2 1290000 − 1 388341 L3274 13<br />
1392 478721887857 · 2 1290000 − 1 388341 L2382 13<br />
1393 478231940697 · 2 1290000 − 1 388341 L3424 13<br />
1394 478122454647 · 2 1290000 − 1 388341 L3274 13<br />
1395 477193095615 · 2 1290000 − 1 388341 L3274 13<br />
1396 476420190477 · 2 1290000 − 1 388341 L3274 13<br />
1397 475923957327 · 2 1290000 − 1 388341 L3408 13<br />
1398 474545076717 · 2 1290000 − 1 388341 L3274 13<br />
1399 472272459375 · 2 1290000 − 1 388341 L3274 13<br />
1400 471930299277 · 2 1290000 − 1 388341 L3274 13<br />
1401 470489079777 · 2 1290000 − 1 388341 L3274 13<br />
1402 468362986905 · 2 1290000 − 1 388341 L3274 13<br />
1403 468131627955 · 2 1290000 − 1 388341 L3274 13<br />
29
ank description digits who year comment<br />
1404 466183143855 · 2 1290000 − 1 388341 L3274 13<br />
1405 466053081195 · 2 1290000 − 1 388341 L3406 13<br />
1406 466012946187 · 2 1290000 − 1 388341 L2511 13<br />
1407 464751767235 · 2 1290000 − 1 388341 L341 13<br />
1408 464642860755 · 2 1290000 − 1 388341 L3408 13<br />
1409 464211505485 · 2 1290000 − 1 388341 L3421 13<br />
1410 462720783765 · 2 1290000 − 1 388341 L3274 13<br />
1411 460079202795 · 2 1290000 − 1 388341 L3274 13<br />
1412 459743401245 · 2 1290000 − 1 388341 L3419 13<br />
1413 458967184485 · 2 1290000 − 1 388341 L3203 13<br />
1414 458423603277 · 2 1290000 − 1 388341 L1709 13<br />
1415 454117301367 · 2 1290000 − 1 388341 L3414 13<br />
1416 453546687195 · 2 1290000 − 1 388341 L3411 13<br />
1417 452727224595 · 2 1290000 − 1 388341 L1591 13<br />
1418 452642177067 · 2 1290000 − 1 388341 L326 13<br />
1419 452177767305 · 2 1290000 − 1 388341 L3274 13<br />
1420 451995338007 · 2 1290000 − 1 388341 L3274 13<br />
1421 450384051945 · 2 1290000 − 1 388341 L3416 13<br />
1422 449590794345 · 2 1290000 − 1 388341 L1920 13<br />
1423 444461468607 · 2 1290000 − 1 388341 L3274 13<br />
1424 441308694687 · 2 1290000 − 1 388341 L3408 13<br />
1425 439341206577 · 2 1290000 − 1 388341 L3420 13<br />
1426 438477490227 · 2 1290000 − 1 388341 L3374 13<br />
1427 438364166205 · 2 1290000 − 1 388341 L1566 13<br />
1428 437917057497 · 2 1290000 − 1 388341 L3407 13<br />
1429 437325048657 · 2 1290000 − 1 388341 L3274 13<br />
1430 436607622117 · 2 1290000 − 1 388341 L3274 13<br />
1431 436478024895 · 2 1290000 − 1 388341 L2511 13<br />
1432 436055812185 · 2 1290000 − 1 388341 L2773 13<br />
1433 435927336225 · 2 1290000 − 1 388341 L3274 13<br />
1434 435912195117 · 2 1290000 − 1 388341 L3203 13<br />
1435 433010529945 · 2 1290000 − 1 388341 L3406 13<br />
1436 428717133117 · 2 1290000 − 1 388341 L1920 13<br />
1437 428274732825 · 2 1290000 − 1 388341 L3351 13<br />
1438 427175730777 · 2 1290000 − 1 388341 L3346 13<br />
1439 426981529275 · 2 1290000 − 1 388341 L3408 13<br />
1440 426737166705 · 2 1290000 − 1 388341 L3274 13<br />
1441 425503288395 · 2 1290000 − 1 388341 L3274 13<br />
1442 425299333305 · 2 1290000 − 1 388341 L3406 13<br />
1443 422035568997 · 2 1290000 − 1 388341 L3274 13<br />
1444 421730567295 · 2 1290000 − 1 388341 L3274 13<br />
1445 421019352015 · 2 1290000 − 1 388341 L3408 13<br />
1446 418900895157 · 2 1290000 − 1 388341 L2511 13<br />
1447 417689147295 · 2 1290000 − 1 388341 L2573 13<br />
1448 416920273425 · 2 1290000 − 1 388341 L3274 13<br />
1449 416910000045 · 2 1290000 − 1 388341 L2414 13<br />
1450 416527998267 · 2 1290000 − 1 388341 L1920 13<br />
1451 415200631965 · 2 1290000 − 1 388341 L3274 13<br />
1452 413741476575 · 2 1290000 − 1 388341 L3402 13<br />
1453 412802577777 · 2 1290000 − 1 388341 L3401 13<br />
30
ank description digits who year comment<br />
1454 411400570875 · 2 1290000 − 1 388341 L3403 13<br />
1455 408052817385 · 2 1290000 − 1 388341 L3274 13<br />
1456 405016485417 · 2 1290000 − 1 388341 L3399 13<br />
1457 404450582655 · 2 1290000 − 1 388341 L3274 13<br />
1458 403975756275 · 2 1290000 − 1 388341 L3274 13<br />
1459 403420675947 · 2 1290000 − 1 388341 L958 13<br />
1460 402776612535 · 2 1290000 − 1 388341 L1878 13<br />
1461 402258232425 · 2 1290000 − 1 388341 L3274 13<br />
1462 402133268805 · 2 1290000 − 1 388341 L3274 13<br />
1463 401208945867 · 2 1290000 − 1 388341 L3382 13<br />
1464 399430753647 · 2 1290000 − 1 388341 L1878 13<br />
1465 398418183117 · 2 1290000 − 1 388341 L1219 13<br />
1466 397630568025 · 2 1290000 − 1 388341 L3382 13<br />
1467 397062502587 · 2 1290000 − 1 388341 L1920 13<br />
1468 395796534105 · 2 1290000 − 1 388341 L3398 13<br />
1469 393755567235 · 2 1290000 − 1 388341 L1921 13<br />
1470 391663070727 · 2 1290000 − 1 388341 L339 13<br />
1471 389472350787 · 2 1290000 − 1 388341 L3203 13<br />
1472 388885035327 · 2 1290000 − 1 388341 L3396 13<br />
1473 388560534435 · 2 1290000 − 1 388341 L2573 13<br />
1474 387306335355 · 2 1290000 − 1 388341 L975 13<br />
1475 385503198645 · 2 1290000 − 1 388341 L3321 13<br />
1476 382888657287 · 2 1290000 − 1 388341 L2265 13<br />
1477 381922845405 · 2 1290000 − 1 388341 L3400 13<br />
1478 380782489155 · 2 1290000 − 1 388341 L3394 13<br />
1479 380775574335 · 2 1290000 − 1 388341 L3393 13<br />
1480 378007820157 · 2 1290000 − 1 388341 L2672 13<br />
1481 374411762805 · 2 1290000 − 1 388341 L3339 13<br />
1482 369122650197 · 2 1290000 − 1 388341 L3274 13<br />
1483 369006330537 · 2 1290000 − 1 388341 L955 13<br />
1484 364461749535 · 2 1290000 − 1 388341 L3274 13<br />
1485 362503367145 · 2 1290000 − 1 388341 L3382 13<br />
1486 361379454135 · 2 1290000 − 1 388341 L3382 13<br />
1487 360149900547 · 2 1290000 − 1 388341 L2600 13<br />
1488 359877353517 · 2 1290000 − 1 388341 L3391 13<br />
1489 359587336335 · 2 1290000 − 1 388341 L1866 13<br />
1490 359064382245 · 2 1290000 − 1 388341 L2472 13<br />
1491 358210953207 · 2 1290000 − 1 388341 L3382 13<br />
1492 355678913445 · 2 1290000 − 1 388341 L2283 13<br />
1493 355665110127 · 2 1290000 − 1 388341 L2379 13<br />
1494 354721848567 · 2 1290000 − 1 388341 L2379 13<br />
1495 351910312257 · 2 1290000 − 1 388341 L1920 13<br />
1496 351809291337 · 2 1290000 − 1 388341 L3388 13<br />
1497 351479778855 · 2 1290000 − 1 388341 L2511 13<br />
1498 349652325447 · 2 1290000 − 1 388341 L3387 13<br />
1499 349574475297 · 2 1290000 − 1 388341 L2379 13<br />
1500 348711084015 · 2 1290000 − 1 388341 L3274 13<br />
1501 347101956357 · 2 1290000 − 1 388341 L3392 13<br />
1502 346864603797 · 2 1290000 − 1 388341 L3384 13<br />
1503 345129242337 · 2 1290000 − 1 388341 L3390 13<br />
31
ank description digits who year comment<br />
1504 343251791157 · 2 1290000 − 1 388341 L3383 13<br />
1505 343057896135 · 2 1290000 − 1 388341 L3382 13<br />
1506 341816713665 · 2 1290000 − 1 388341 L3381 13<br />
1507 341365397037 · 2 1290000 − 1 388341 L3380 13<br />
1508 339806310177 · 2 1290000 − 1 388341 L3274 13<br />
1509 339519840987 · 2 1290000 − 1 388341 L3274 13<br />
1510 336417947565 · 2 1290000 − 1 388341 L3274 13<br />
1511 336094377897 · 2 1290000 − 1 388341 L3379 13<br />
1512 331571640507 · 2 1290000 − 1 388341 L2449 13<br />
1513 329105404995 · 2 1290000 − 1 388341 L2090 13<br />
1514 325627281705 · 2 1290000 − 1 388341 L1814 13<br />
1515 325022118267 · 2 1290000 − 1 388341 L2592 13<br />
1516 324405963567 · 2 1290000 − 1 388341 L975 13<br />
1517 323721714825 · 2 1290000 − 1 388341 L3374 13<br />
1518 323180607615 · 2 1290000 − 1 388341 L324 13<br />
1519 323151630597 · 2 1290000 − 1 388341 L2249 13<br />
1520 323062155117 · 2 1290000 − 1 388341 L2511 13<br />
1521 323032715775 · 2 1290000 − 1 388341 L3321 13<br />
1522 322458158997 · 2 1290000 − 1 388341 L2204 13<br />
1523 321326067837 · 2 1290000 − 1 388341 L2449 13<br />
1524 318109905615 · 2 1290000 − 1 388341 L3373 13<br />
1525 317525245347 · 2 1290000 − 1 388341 L3371 13<br />
1526 315206425035 · 2 1290000 − 1 388341 L3274 13<br />
1527 314138547285 · 2 1290000 − 1 388341 L3274 13<br />
1528 313644839055 · 2 1290000 − 1 388341 L3370 13<br />
1529 312580841685 · 2 1290000 − 1 388341 L3274 13<br />
1530 312435776037 · 2 1290000 − 1 388341 L1704 13<br />
1531 311422843587 · 2 1290000 − 1 388341 L1745 13<br />
1532 310812367497 · 2 1290000 − 1 388341 L3375 13<br />
1533 310491816507 · 2 1290000 − 1 388341 L3346 13<br />
1534 309431698875 · 2 1290000 − 1 388341 L3274 13<br />
1535 309125593227 · 2 1290000 − 1 388341 L3321 13<br />
1536 307795218687 · 2 1290000 − 1 388341 L2379 13<br />
1537 306223342407 · 2 1290000 − 1 388341 L3369 13<br />
1538 303771085455 · 2 1290000 − 1 388341 L2083 13<br />
1539 300377054607 · 2 1290000 − 1 388341 L3364 13<br />
1540 299556989487 · 2 1290000 − 1 388341 L3203 13<br />
1541 297145470657 · 2 1290000 − 1 388341 L3404 13<br />
1542 295499484735 · 2 1290000 − 1 388341 L3274 13<br />
1543 294333095247 · 2 1290000 − 1 388341 L3360 13<br />
1544 294176747907 · 2 1290000 − 1 388341 L3395 13<br />
1545 293988475497 · 2 1290000 − 1 388341 L1697 13<br />
1546 288326168427 · 2 1290000 − 1 388341 L3357 13<br />
1547 287991223887 · 2 1290000 − 1 388341 L1589 13<br />
1548 286852475595 · 2 1290000 − 1 388341 L3255 13<br />
1549 286688330805 · 2 1290000 − 1 388341 L3359 13<br />
1550 286622010675 · 2 1290000 − 1 388341 L2379 13<br />
1551 286371264795 · 2 1290000 − 1 388341 L2249 13<br />
1552 283483489905 · 2 1290000 − 1 388341 L2379 13<br />
1553 283269826017 · 2 1290000 − 1 388341 L1684 13<br />
32
ank description digits who year comment<br />
1554 283141970085 · 2 1290000 − 1 388341 L3355 13<br />
1555 281151438795 · 2 1290000 − 1 388341 L2379 13<br />
1556 281120825067 · 2 1290000 − 1 388341 L3346 13<br />
1557 278822882037 · 2 1290000 − 1 388341 L3203 13<br />
1558 278807949387 · 2 1290000 − 1 388341 L2592 13<br />
1559 278469371715 · 2 1290000 − 1 388341 L3351 13<br />
1560 275590614537 · 2 1290000 − 1 388341 L3365 13<br />
1561 275470214925 · 2 1290000 − 1 388341 L3203 13<br />
1562 272759221245 · 2 1290000 − 1 388341 L3203 13<br />
1563 270952368585 · 2 1290000 − 1 388341 L3349 13<br />
1564 270531056787 · 2 1290000 − 1 388341 L3350 13<br />
1565 270043531455 · 2 1290000 − 1 388341 L3210 13<br />
1566 269009459325 · 2 1290000 − 1 388341 L3274 13<br />
1567 268379334447 · 2 1290000 − 1 388341 L3274 13<br />
1568 268081360785 · 2 1290000 − 1 388341 L3203 13<br />
1569 267934317495 · 2 1290000 − 1 388341 L3332 13<br />
1570 267257797635 · 2 1290000 − 1 388341 L3337 13<br />
1571 263847069405 · 2 1290000 − 1 388341 L3347 13<br />
1572 262612971045 · 2 1290000 − 1 388341 L3274 13<br />
1573 261643415715 · 2 1290000 − 1 388341 L2438 12<br />
1574 260849015397 · 2 1290000 − 1 388341 L3203 12<br />
1575 260715365475 · 2 1290000 − 1 388341 L1929 12<br />
1576 260227577727 · 2 1290000 − 1 388341 L3274 12<br />
1577 260109856197 · 2 1290000 − 1 388341 L3274 12<br />
1578 260093628975 · 2 1290000 − 1 388341 L3346 12<br />
1579 258572084955 · 2 1290000 − 1 388341 L3274 12<br />
1580 252970964277 · 2 1290000 − 1 388341 L3203 12<br />
1581 251309396835 · 2 1290000 − 1 388341 L1319 12<br />
1582 251269114257 · 2 1290000 − 1 388341 L1319 12<br />
1583 250180546665 · 2 1290000 − 1 388341 L1704 12<br />
1584 248186300367 · 2 1290000 − 1 388341 L3274 12<br />
1585 246240340467 · 2 1290000 − 1 388341 L3274 12<br />
1586 244704278205 · 2 1290000 − 1 388341 L3341 12<br />
1587 244623864417 · 2 1290000 − 1 388341 L2354 12<br />
1588 241209176217 · 2 1290000 − 1 388341 L3342 12<br />
1589 239413763685 · 2 1290000 − 1 388341 L2449 12<br />
1590 234475865655 · 2 1290000 − 1 388341 L3274 12<br />
1591 232778043615 · 2 1290000 − 1 388341 L3339 12<br />
1592 232740942315 · 2 1290000 − 1 388341 L3274 12<br />
1593 232328690025 · 2 1290000 − 1 388341 L2457 12<br />
1594 231572092755 · 2 1290000 − 1 388341 L3340 12<br />
1595 230348154045 · 2 1290000 − 1 388341 L955 12<br />
1596 225597278625 · 2 1290000 − 1 388341 L3331 12<br />
1597 223708869267 · 2 1290000 − 1 388341 L3337 12<br />
1598 218503291197 · 2 1290000 − 1 388341 L3274 12<br />
1599 216416889747 · 2 1290000 − 1 388341 L1929 12<br />
1600 214133231697 · 2 1290000 − 1 388341 L927 12<br />
1601 213551907327 · 2 1290000 − 1 388341 L3274 12<br />
1602 213198352425 · 2 1290000 − 1 388341 L3274 12<br />
1603 212135542017 · 2 1290000 − 1 388341 L927 12<br />
33
ank description digits who year comment<br />
1604 206951361687 · 2 1290000 − 1 388341 L1637 12<br />
1605 204320222925 · 2 1290000 − 1 388341 L3330 12<br />
1606 203226067005 · 2 1290000 − 1 388341 L3274 12<br />
1607 201526452825 · 2 1290000 − 1 388340 L3274 12<br />
1608 200476914855 · 2 1290000 − 1 388340 L927 12<br />
1609 199585358175 · 2 1290000 − 1 388340 L3274 12<br />
1610 199394692497 · 2 1290000 − 1 388340 L3274 12<br />
1611 199294582755 · 2 1290000 − 1 388340 L955 12<br />
1612 199069404915 · 2 1290000 − 1 388340 L3274 12<br />
1613 198089444247 · 2 1290000 − 1 388340 L3274 12<br />
1614 197583066117 · 2 1290000 − 1 388340 L955 12<br />
1615 196125259785 · 2 1290000 − 1 388340 L3274 12<br />
1616 192026664657 · 2 1290000 − 1 388340 L3274 12<br />
1617 191408032317 · 2 1290000 − 1 388340 L3274 12<br />
1618 188190677397 · 2 1290000 − 1 388340 L3274 12<br />
1619 188177713677 · 2 1290000 − 1 388340 L3334 12<br />
1620 187663366467 · 2 1290000 − 1 388340 L927 12<br />
1621 180160106877 · 2 1290000 − 1 388340 L3331 12<br />
1622 179253304767 · 2 1290000 − 1 388340 L927 12<br />
1623 179108866545 · 2 1290000 − 1 388340 L3274 12<br />
1624 178994497575 · 2 1290000 − 1 388340 L2368 12<br />
1625 178847912745 · 2 1290000 − 1 388340 L3330 12<br />
1626 177472004367 · 2 1290000 − 1 388340 L2379 12<br />
1627 173890572975 · 2 1290000 − 1 388340 L3274 12<br />
1628 164136998667 · 2 1290000 − 1 388340 L2449 12<br />
1629 164130856365 · 2 1290000 − 1 388340 L3274 12<br />
1630 163354130247 · 2 1290000 − 1 388340 L3274 12<br />
1631 162624326205 · 2 1290000 − 1 388340 L3274 12<br />
1632 162236489067 · 2 1290000 − 1 388340 L3274 12<br />
1633 159234953055 · 2 1290000 − 1 388340 L3332 12<br />
1634 157842034035 · 2 1290000 − 1 388340 L3274 12<br />
1635 157608823797 · 2 1290000 − 1 388340 L3328 12<br />
1636 156343422987 · 2 1290000 − 1 388340 L3274 12<br />
1637 151155604437 · 2 1290000 − 1 388340 L3322 12<br />
1638 151013786217 · 2 1290000 − 1 388340 L2164 12<br />
1639 149875663077 · 2 1290000 − 1 388340 L3274 12<br />
1640 148042284915 · 2 1290000 − 1 388340 L3274 12<br />
1641 145028100747 · 2 1290000 − 1 388340 L3274 12<br />
1642 144643566987 · 2 1290000 − 1 388340 L3274 12<br />
1643 144033075777 · 2 1290000 − 1 388340 L2679 12<br />
1644 143858211957 · 2 1290000 − 1 388340 L3274 12<br />
1645 143727108945 · 2 1290000 − 1 388340 L3274 12<br />
1646 142726671747 · 2 1290000 − 1 388340 L3274 12<br />
1647 142631667285 · 2 1290000 − 1 388340 L2354 12<br />
1648 141451978605 · 2 1290000 − 1 388340 L3321 12<br />
1649 139942421115 · 2 1290000 − 1 388340 L3274 12<br />
1650 139604474667 · 2 1290000 − 1 388340 L3274 12<br />
1651 134368933107 · 2 1290000 − 1 388340 L2753 12<br />
1652 129948302025 · 2 1290000 − 1 388340 L2164 12<br />
1653 128031171567 · 2 1290000 − 1 388340 L3252 12<br />
34
ank description digits who year comment<br />
1654 126206397135 · 2 1290000 − 1 388340 L2164 12<br />
1655 125000856225 · 2 1290000 − 1 388340 L2457 12<br />
1656 124901305767 · 2 1290000 − 1 388340 L3316 12<br />
1657 124490444505 · 2 1290000 − 1 388340 L2679 12<br />
1658 120858765657 · 2 1290000 − 1 388340 L1430 12<br />
1659 120816250005 · 2 1290000 − 1 388340 L3216 12<br />
1660 120238040277 · 2 1290000 − 1 388340 L2457 12<br />
1661 119948786085 · 2 1290000 − 1 388340 L2457 12<br />
1662 119117512797 · 2 1290000 − 1 388340 L1430 12<br />
1663 119033472225 · 2 1290000 − 1 388340 L3252 12<br />
1664 117474057165 · 2 1290000 − 1 388340 L1588 12<br />
1665 116194215975 · 2 1290000 − 1 388340 L2197 12<br />
1666 115619101425 · 2 1290000 − 1 388340 L1126 12<br />
1667 113105840787 · 2 1290000 − 1 388340 L3287 12<br />
1668 113018799645 · 2 1290000 − 1 388340 L3203 12<br />
1669 110657314995 · 2 1290000 − 1 388340 L3235 12<br />
1670 110261397207 · 2 1290000 − 1 388340 L2197 12<br />
1671 109785059895 · 2 1290000 − 1 388340 L1219 12<br />
1672 109728390567 · 2 1290000 − 1 388340 L2430 12<br />
1673 109602297105 · 2 1290000 − 1 388340 L327 12<br />
1674 108456662097 · 2 1290000 − 1 388340 L3274 12<br />
1675 106106030067 · 2 1290000 − 1 388340 L3274 12<br />
1676 104252569725 · 2 1290000 − 1 388340 L3270 12<br />
1677 103809047877 · 2 1290000 − 1 388340 L2679 12<br />
1678 102979478985 · 2 1290000 − 1 388340 L3240 12<br />
1679 102649169667 · 2 1290000 − 1 388340 L3228 12<br />
1680 102249845505 · 2 1290000 − 1 388340 L927 12<br />
1681 100492076865 · 2 1290000 − 1 388340 L2504 12<br />
1682 98571391305 · 2 1290000 − 1 388340 L2679 12<br />
1683 96382357725 · 2 1290000 − 1 388340 L2250 12<br />
1684 95886360717 · 2 1290000 − 1 388340 L2680 12<br />
1685 94451818965 · 2 1290000 − 1 388340 L1637 12<br />
1686 93693950385 · 2 1290000 − 1 388340 L326 12<br />
1687 93083051085 · 2 1290000 − 1 388340 L3235 12<br />
1688 91591849695 · 2 1290000 − 1 388340 L2283 12<br />
1689 90446547765 · 2 1290000 − 1 388340 L3235 12<br />
1690 88769823315 · 2 1290000 − 1 388340 L3235 12<br />
1691 87988707537 · 2 1290000 − 1 388340 L3235 12<br />
1692 86374243377 · 2 1290000 − 1 388340 L2197 12<br />
1693 85794708807 · 2 1290000 − 1 388340 L3252 12<br />
1694 83743656027 · 2 1290000 − 1 388340 L3235 12<br />
1695 80303450925 · 2 1290000 − 1 388340 L2478 12<br />
1696 78681832677 · 2 1290000 − 1 388340 L3228 12<br />
1697 74675041395 · 2 1290000 − 1 388340 L3255 12<br />
1698 74231734815 · 2 1290000 − 1 388340 L3256 12<br />
1699 72835395717 · 2 1290000 − 1 388340 L3252 12<br />
1700 71741989455 · 2 1290000 − 1 388340 L3251 12<br />
1701 71626994637 · 2 1290000 − 1 388340 L3258 12<br />
1702 67762687755 · 2 1290000 − 1 388340 L1684 12<br />
1703 67400286705 · 2 1290000 − 1 388340 L927 12<br />
35
ank description digits who year comment<br />
1704 67157081175 · 2 1290000 − 1 388340 L3203 12<br />
1705 67098088347 · 2 1290000 − 1 388340 L1430 12<br />
1706 66947810457 · 2 1290000 − 1 388340 L324 12<br />
1707 64932421227 · 2 1290000 − 1 388340 L3247 12<br />
1708 61579159647 · 2 1290000 − 1 388340 L324 12<br />
1709 60496370625 · 2 1290000 − 1 388340 L324 12<br />
1710 58109428725 · 2 1290000 − 1 388340 L324 12<br />
1711 57670269765 · 2 1290000 − 1 388340 L1591 12<br />
1712 56617104687 · 2 1290000 − 1 388340 L927 12<br />
1713 55829500977 · 2 1290000 − 1 388340 L3218 12<br />
1714 53955457827 · 2 1290000 − 1 388340 L3242 12<br />
1715 53568698727 · 2 1290000 − 1 388340 L3240 12<br />
1716 48325829277 · 2 1290000 − 1 388340 L3235 12<br />
1717 47104579725 · 2 1290000 − 1 388340 L2407 12<br />
1718 46936849605 · 2 1290000 − 1 388340 L3235 12<br />
1719 46395065715 · 2 1290000 − 1 388340 L3236 12<br />
1720 41291130657 · 2 1290000 − 1 388340 L1866 12<br />
1721 40870411575 · 2 1290000 − 1 388340 L3228 12<br />
1722 37892782587 · 2 1290000 − 1 388340 L990 12<br />
1723 37336992075 · 2 1290000 − 1 388340 L3226 12<br />
1724 35970599667 · 2 1290000 − 1 388340 L3226 12<br />
1725 35783326245 · 2 1290000 − 1 388340 L3226 12<br />
1726 34158740037 · 2 1290000 − 1 388340 L3226 12<br />
1727 31188104787 · 2 1290000 − 1 388340 L3204 12<br />
1728 30185015115 · 2 1290000 − 1 388340 L3226 12<br />
1729 27706601877 · 2 1290000 − 1 388340 L3204 12<br />
1730 26268238845 · 2 1290000 − 1 388340 L3227 12<br />
1731 25940129427 · 2 1290000 − 1 388340 L3226 12<br />
1732 25759355835 · 2 1290000 − 1 388340 L3226 12<br />
1733 24441821505 · 2 1290000 − 1 388340 L3226 12<br />
1734 24291776847 · 2 1290000 − 1 388340 L3226 12<br />
1735 22811654325 · 2 1290000 − 1 388340 L3226 12<br />
1736 22781007375 · 2 1290000 − 1 388340 L1684 12<br />
1737 21141924615 · 2 1290000 − 1 388340 L1684 12<br />
1738 19793417607 · 2 1290000 − 1 388339 L3224 12<br />
1739 15882136965 · 2 1290000 − 1 388339 L3218 12<br />
1740 12814002747 · 2 1290000 − 1 388339 L1603 12<br />
1741 12257525817 · 2 1290000 − 1 388339 L3203 12<br />
1742 11389198515 · 2 1290000 − 1 388339 L3216 12<br />
1743 11340242595 · 2 1290000 − 1 388339 L3214 12<br />
1744 11211544347 · 2 1290000 − 1 388339 L1430 12<br />
1745 8909655825 · 2 1290000 − 1 388339 L3210 12<br />
1746 8575097877 · 2 1290000 − 1 388339 L3208 12<br />
1747 5792192997 · 2 1290000 − 1 388339 L989 12<br />
1748 3347418345 · 2 1290000 − 1 388339 L1433 12<br />
1749 3160221645 · 2 1290000 − 1 388339 L3203 12<br />
1750 2862479727 · 2 1290000 − 1 388339 L3204 12<br />
1751 835738017 · 2 1290000 − 1 388338 L596 12<br />
1752 455 · 2 1289501 + 1 388182 L2909 12<br />
1753 307 · 2 1289306 + 1 388123 L1204 12<br />
36
ank description digits who year comment<br />
1754 665 · 2 1289005 + 1 388032 L2816 11<br />
1755 167 · 2 1288922 − 1 388007 L1862 13<br />
1756 439 · 2 1288818 + 1 387976 L2917 12<br />
1757 2538 · 30 262614 − 1 387917 p268 12<br />
1758 135 · 2 1288177 − 1 387783 L1959 11<br />
1759 1153 · 2 1287198 + 1 387489 L2815 11<br />
1760 603 · 2 1286394 + 1 387246 L2702 11<br />
1761 305 · 2 1285643 + 1 387020 L1209 12<br />
1762 1025 · 2 1285388 − 1 386944 L1828 12<br />
1763 1195 · 2 1284795 − 1 386765 L1828 12<br />
1764 243 · 2 1284429 + 1 386655 L165 11<br />
1765 4 · 257 160422 + 1 386607 p258 11 Generalized Fermat<br />
1766 138847 · 2 1283793 − 1 386466 L2 03<br />
1767 1015 · 2 1283425 − 1 386353 L1828 12<br />
1768 131 · 2 1283258 − 1 386302 L1862 11<br />
1769 5 · 2 1282755 + 1 386149 g55 02 Divides GF (1282754, 3),<br />
GF (1282748, 5)<br />
1770 259 · 2 1282582 + 1 386099 L1818 12<br />
1771 1145 · 2 1282568 − 1 386095 L1828 12<br />
1772 1093 · 2 1282080 + 1 385948 L2322 11<br />
1773 569 · 2 1282077 + 1 385947 L1387 11<br />
1774 1189 · 2 1282034 + 1 385934 L2814 11<br />
1775 1141 · 2 1281659 − 1 385821 L1828 12<br />
1776 181 · 2 1281453 − 1 385759 L2484 11<br />
1777 105782 · 5 551766 − 1 385673 p306 10<br />
1778 2 · 101 192275 + 1 385382 L1471 10<br />
1779 623 · 2 1280125 + 1 385359 L2659 11<br />
1780 381 · 2 1279983 + 1 385316 L2908 12<br />
1781 691 · 2 1279212 + 1 385085 L2626 11<br />
1782 945 · 2 1278825 + 1 384968 L1595 11<br />
1783 349 · 2 1278551 − 1 384885 L579 10<br />
1784 1105 · 2 1278476 + 1 384863 L2724 11<br />
1785 231 · 2 1278235 − 1 384790 L2338 12<br />
1786 141 · 2 1276616 + 1 384302 L2612 12<br />
1787 1981 · 2 1276439 − 1 384250 L1134 12<br />
1788 15 · 2 1276177 + 1 384169 g279 06 Divides GF (1276174, 3),<br />
GF (1276174, 10)<br />
1789 205 · 2 1275889 − 1 384084 L384 10<br />
1790 255 · 2 1275596 + 1 383996 L2533 12<br />
1791 375 · 2 1275345 − 1 383920 L1819 13<br />
1792 975 · 2 1274973 + 1 383809 L2653 11<br />
1793 757 · 2 1274676 + 1 383719 L1935 11<br />
1794 1011 · 2 1274643 + 1 383709 L2736 11<br />
1795 9 · 10 383643 − 1 383644 p297 11 Near-repdigit<br />
1796 1185 · 2 1273795 + 1 383454 L2732 11<br />
1797 147 · 2 1273684 − 1 383420 L1959 11<br />
1798 1155 · 2 1273521 + 1 383372 L1505 11<br />
1799 923 · 2 1273465 + 1 383355 L2542 11<br />
1800 1103 · 2 1273105 + 1 383246 L1121 11<br />
1801 471 · 2 1273000 + 1 383214 L1933 12<br />
37
ank description digits who year comment<br />
1802 643 · 2 1272644 + 1 383107 L2522 11<br />
1803 89 · 2 1272457 + 1 383050 L1204 11<br />
1804 21701 · 2 1272326 − 1 383013 L2055 12<br />
1805 1347 · 2 1271948 − 1 382898 L1828 12<br />
1806 1191 · 2 1271153 − 1 382659 L1828 12<br />
1807 1385 · 2 1270984 − 1 382608 L1828 12<br />
1808 1011 · 2 1270883 + 1 382577 L2813 11<br />
1809 163747 · 6 491241 − 1 382266 L2841 12 Generalized Woodall<br />
1810 475 · 2 1269578 + 1 382184 L2802 12<br />
1811 251 · 2 1269198 − 1 382070 L251 10<br />
1812 781 · 2 1269036 + 1 382021 L1935 11<br />
1813 1268979 · 2 1268979 − 1 382007 L201 07 Woodall<br />
1814 1235 · 2 1268980 − 1 382005 L1828 12<br />
1815 671600 65536 + 1 381886 g55 02 Generalized Fermat<br />
1816 225 · 2 1268579 + 1 381883 L2085 12<br />
1817 193 · 2 1268399 − 1 381829 L1959 11<br />
1818 973 · 2 1267246 + 1 381483 L1745 11<br />
1819 1041 · 2 1267241 − 1 381481 L1828 12<br />
1820 987 · 2 1267175 + 1 381461 L2545 11<br />
1821 813 · 2 1267125 + 1 381446 L2821 11<br />
1822 937 · 2 1267000 + 1 381408 L2503 11<br />
1823 2175 · 2 1266475 − 1 381251 L1862 13<br />
1824 911 · 2 1263831 + 1 380454 L2812 11<br />
1825 733 · 2 1263802 + 1 380446 L2048 11<br />
1826 109988 · 5 544269 + 1 380433 p292 11<br />
1827 1197 · 2 1263698 + 1 380415 L2375 11<br />
1828 1425 · 2 1263665 − 1 380405 L1134 12<br />
1829 481 · 2 1263444 + 1 380338 L2826 12<br />
1830 3954 · 148 175188 − 1 380208 p268 12<br />
1831 789 · 2 1262973 + 1 380196 L2805 11<br />
1832 993 · 2 1262086 + 1 379929 L2711 11<br />
1833 11 · 2 1261478 − 1 379744 L163 06<br />
1834 1035 · 2 1260911 − 1 379576 L1828 12<br />
1835 105 · 2 1260218 + 1 379366 L1751 11<br />
1836 1063 · 2 1260091 − 1 379329 L1828 12<br />
1837 717 · 2 1260087 + 1 379327 L2545 11<br />
1838 291 · 2 1260056 + 1 379318 L2562 12<br />
1839 68492 · 5 542553 + 1 379234 L2342 11<br />
1840 26 · 941 127533 + 1 379233 L1471 12<br />
1841 741 · 2 1259168 + 1 379051 L2659 11<br />
1842 525 · 2 1258688 + 1 378906 L2811 11<br />
1843 25 · 2 1258562 + 1 378867 g279 04 Generalized Fermat<br />
1844 781 · 2 1258420 + 1 378826 L2085 11<br />
1845 571 · 2 1258052 + 1 378715 L1149 11<br />
1846 917 · 2 1258011 + 1 378703 L2702 11<br />
1847 1219 · 2 1257913 − 1 378673 L1828 12<br />
1848 883 · 2 1257858 + 1 378656 L2085 11<br />
1849 321 · 2 1257859 + 1 378656 L2038 12<br />
1850 2084259 · 2 1257787 − 1 378638 L466 08<br />
1851 987537 · 2 1257787 + 1 378638 L466 11<br />
38
ank description digits who year comment<br />
1852 26869 · 2 1257787 − 1 378637 L466 07<br />
1853 2 1257787 − 1 378632 SG 96 Mersenne 34<br />
1854 291 · 2 1257405 − 1 378520 L2338 12<br />
1855 49 · 2 1257295 − 1 378486 L217 08<br />
1856 6201 · 2 1257068 + 1 378419 L667 08<br />
1857 555 · 2 1257047 + 1 378412 L2716 11<br />
1858 119 · 2 1256952 − 1 378383 L2338 11<br />
1859 1485 · 2 1256516 + 1 378253 L1134 12<br />
1860 89725 · 2 1256151 − 1 378145 p260 12 Generalized Woodall<br />
1861 341 · 2 1255881 + 1 378061 L2824 12<br />
1862 579 · 2 1255762 + 1 378025 L2810 11<br />
1863 [ Long prime 1863 ] 377922 x29 12<br />
1864 691 · 2 1255260 + 1 377874 L2820 11<br />
1865 502051!7 + 1 377722 p3 12 Multifactorial<br />
1866 81 · 2 1254155 + 1 377541 gt 07<br />
1867 27 · 2 1253870 − 1 377454 L65 08<br />
1868 745 · 2 1253108 + 1 377226 L2522 11<br />
1869 1041 · 2 1252387 − 1 377010 L1828 12<br />
1870 877 · 2 1251678 + 1 376796 L2655 11<br />
1871 585 · 2 1251530 + 1 376751 L2809 11<br />
1872 1395 · 2 1251292 − 1 376680 L1828 12<br />
1873 80857169 · 2 1251076 − 1 376620 L10 04<br />
1874 1123 · 2 1250755 − 1 376518 L1828 12<br />
1875 181 · 2 1250169 − 1 376341 L2074 11<br />
1876 775 · 2 1250106 + 1 376323 L2549 11<br />
1877 57023 · 6 483561 − 1 376289 p258 09<br />
1878 549868 65536 + 1 376194 g295 03 Generalized Fermat<br />
1879 1043 · 2 1249633 + 1 376181 L2540 11<br />
1880 207 · 2 1249252 + 1 376065 L2906 12<br />
1881 201 · 2 1249030 − 1 375998 L1862 11<br />
1882 544118 65536 + 1 375895 g295 02 Generalized Fermat<br />
1883 821 · 2 1248033 + 1 375699 L2808 11<br />
1884 391 · 2 1247959 − 1 375676 L644 10<br />
1885 43902 · 31 251859 − 1 375618 L2054 11<br />
1886 1269 · 2 1246504 − 1 375239 L1828 12<br />
1887 329 · 2 1246017 + 1 375092 L2085 12 Divides Fermat F (1246013)<br />
1888 2053 · 12 347512 − 1 375032 p255 12<br />
1889 979 · 2 1245698 + 1 374996 L2826 11<br />
1890 22 · 3 785831 − 1 374939 L3326 12<br />
1891 153 · 2 1245154 − 1 374831 L1959 11<br />
1892 1061 · 2 1245114 − 1 374820 L1828 12<br />
1893 165 · 2 1244739 + 1 374706 L1562 12<br />
1894 375 · 2 1244550 + 1 374650 L1158 12<br />
1895 1209 · 2 1244507 − 1 374638 L1828 12<br />
1896 15 · 2 1244377 + 1 374596 g279 06<br />
1897 1167 · 2 1244321 − 1 374582 L1828 12<br />
1898 178602 · 5 535806 − 1 374518 L2777 12 Generalized Woodall<br />
1899 169 · 2 1243903 − 1 374455 L282 10<br />
1900 7 · 362 146341 − 1 374445 L1471 11<br />
1901 1017 · 2 1243364 + 1 374293 L2807 11<br />
39
ank description digits who year comment<br />
1902 1245 · 2 1243197 − 1 374243 L1828 12<br />
1903 825 · 2 1243193 + 1 374242 L2730 11<br />
1904 1041 · 2 1242900 + 1 374154 L2413 11<br />
1905 139 · 2 1242661 − 1 374081 L2074 12<br />
1906 257708 · 5 535176 − 1 374078 p196 07<br />
1907 119 · 2 1242207 + 1 373944 L1751 11<br />
1908 123 · 2 1241690 − 1 373789 L1959 11<br />
1909 707 · 2 1241499 + 1 373732 L2806 11<br />
1910 673 · 2 1241262 + 1 373660 L2805 11<br />
1911 285 · 2 1241173 + 1 373633 L2085 12<br />
1912 1077 · 2 1240976 + 1 373575 L2085 11<br />
1913 27029 · 2 1240648 − 1 373477 L2055 11<br />
1914 369 · 2 1240510 + 1 373434 L2905 12<br />
1915 159 · 2 1240229 − 1 373349 L1959 11<br />
1916 21 · 2 1240067 + 1 373299 g279 04<br />
1917 8579 · 10 373260 − 1 373264 p265 10<br />
1918 315 · 2 1239735 + 1 373200 L2907 12<br />
1919 1345 · 2 1239661 − 1 373179 L1828 12<br />
1920 435 · 2 1239504 + 1 373131 L2805 12<br />
1921 1147 · 2 1237642 + 1 372571 L2659 11<br />
1922 1113 · 2 1236797 + 1 372317 L2829 11<br />
1923 165 · 2 1235490 − 1 371922 L2101 11<br />
1924 43 · 2 1235298 + 1 371864 g279 06<br />
1925 577 · 2 1235058 + 1 371793 L2804 11<br />
1926 615 · 2 1235039 − 1 371787 L1978 12<br />
1927 259738 · 3 779214 + 1 371785 L2777 11 Generalized Cullen<br />
1928 185 · 2 1234730 − 1 371694 L1959 11<br />
1929 19861029 · 2 1234572 − 1 371651 L895 12<br />
1930 13483 · 2 1233619 − 1 371361 L2055 11<br />
1931 705 · 2 1233563 − 1 371343 L2257 12<br />
1932 531 · 2 1233440 + 1 371306 L2803 11 Divides GF (1233439, 5)<br />
1933 145 · 2 1233286 + 1 371259 L1751 11<br />
1934 1045 · 2 1233270 + 1 371255 L2659 11<br />
1935 2 · 170 166428 − 1 371210 L2054 11<br />
1936 1067 · 2 1232654 − 1 371069 L1828 12<br />
1937 711 · 2 1232535 + 1 371033 L1303 11<br />
1938 987 · 2 1232387 + 1 370989 L2619 11<br />
1939 3 · 2 1232255 − 1 370947 L30 04<br />
1940 1157 · 2 1231906 − 1 370844 L1828 12<br />
1941 51 · 2 1231665 − 1 370770 L384 10<br />
1942 957 · 2 1231656 + 1 370769 L1741 11<br />
1943 1119 · 2 1231192 − 1 370629 L1828 12<br />
1944 1129 · 2 1230141 − 1 370313 L1828 12<br />
1945 1075 · 2 1229708 + 1 370183 L2522 11<br />
1946 15 · 2 1229600 + 1 370148 g279 06<br />
1947 19581121 · 2 1229561 − 1 370143 p49 08<br />
1948 513 · 2 1229391 − 1 370087 L2047 13<br />
1949 879 · 2 1229303 − 1 370061 L1817 12<br />
1950 440846 65536 + 1 369904 GC1 02 Generalized Fermat<br />
1951 349 · 2 1228715 − 1 369883 L579 10<br />
40
ank description digits who year comment<br />
1952 1315 · 2 1228613 − 1 369853 L1828 12<br />
1953 613 · 2 1228474 + 1 369811 L2659 11<br />
1954 631 · 2 1228421 − 1 369795 L2257 12<br />
1955 889 · 2 1228285 − 1 369754 L2257 12<br />
1956 1159 · 2 1227650 + 1 369563 L1935 11<br />
1957 1307 · 2 1227482 − 1 369513 L1828 12<br />
1958 593 · 2 1227476 − 1 369510 L1817 13<br />
1959 757 · 2 1227234 + 1 369438 L1210 11<br />
1960 1085 · 2 1226897 + 1 369336 L2655 11<br />
1961 573 · 2 1226854 − 1 369323 L1817 13<br />
1962 919 · 2 1226562 + 1 369235 L2797 11<br />
1963 2145 · 2 1226291 − 1 369154 L1862 13<br />
1964 287 · 2 1226144 − 1 369109 p279 10<br />
1965 86 · 123 176510 − 1 368892 L1471 12<br />
1966 123 · 2 1225115 − 1 368799 L1959 11<br />
1967 8331405 · 2 1224804 − 1 368710 L260 10<br />
1968 4185 · 2 1224663 − 1 368664 L1959 13<br />
1969 179 · 2 1224019 + 1 368469 L2835 12<br />
1970 1023 · 2 1223814 + 1 368408 L2117 11<br />
1971 515 · 2 1223805 + 1 368405 L2322 11<br />
1972 849 · 2 1223571 − 1 368335 L1815 12<br />
1973 1027 · 2 1222565 − 1 368032 L1828 12<br />
1974 141 · 2 1222421 + 1 367988 L1751 11<br />
1975 1027 · 2 1221942 + 1 367845 L2802 11<br />
1976 4135 · 2 1221887 − 1 367829 L1959 13<br />
1977 4175 · 2 1221640 − 1 367754 L1959 13<br />
1978 351 · 2 1221009 + 1 367563 L2861 12<br />
1979 107 · 2 1220391 + 1 367377 L2873 12<br />
1980 1183 · 2 1220323 − 1 367357 L1828 12<br />
1981 128552 · 5 525537 + 1 367340 p292 10<br />
1982 429 · 2 1220185 + 1 367315 L1158 12<br />
1983 913 · 2 1220010 + 1 367263 L2801 11<br />
1984 [ Long prime 1984 ] 367199 p342 12<br />
1985 1277 · 2 1219524 − 1 367117 L1828 12<br />
1986 827 · 2 1219466 − 1 367099 L1815 12<br />
1987 183 · 2 1219415 − 1 367083 L2055 11<br />
1988 177482 · 117 177482 + 1 367072 g407 08 Generalized Cullen<br />
1989 583 · 2 1219350 + 1 367064 L2800 11<br />
1990 4083 · 2 1219134 − 1 367000 L1959 13<br />
1991 1305 · 2 1219127 − 1 366997 L1828 12<br />
1992 122 · 18 292318 + 1 366941 p231 09<br />
1993 621 · 2 1218520 + 1 366814 L2085 11<br />
1994 315 · 2 1218433 + 1 366788 L1568 11<br />
1995 174 · 1021 121880 − 1 366743 L2054 11<br />
1996 347 · 2 1218211 + 1 366721 L2085 12<br />
1997 4179 · 2 1218144 − 1 366702 L1959 13<br />
1998 997 · 2 1216484 + 1 366202 L2539 11<br />
1999 563 · 2 1216134 − 1 366096 L1817 13<br />
2000 553 · 2 1216046 + 1 366070 L2413 11<br />
2001 153 · 2 1215327 − 1 365853 L2055 11<br />
41
ank description digits who year comment<br />
2002 843301# − 1 365851 p302 10 Primorial<br />
2003 1151 · 2 1215135 + 1 365796 L2779 11<br />
2004 1305 · 2 1215064 − 1 365774 L1828 12<br />
2005 143 · 2 1214022 − 1 365460 L1828 12<br />
2006 153 · 2 1214002 + 1 365454 L1751 11<br />
2007 771 · 2 1213789 − 1 365390 L1815 12<br />
2008 1127 · 2 1213307 + 1 365245 L2799 11<br />
2009 4095 · 2 1213247 − 1 365228 L1959 13<br />
2010 1051 · 2 1212772 + 1 365084 L2785 11<br />
2011 883 · 2 1212322 + 1 364949 L2796 11<br />
2012 1121 · 2 1212101 + 1 364882 L2797 11<br />
2013 99 · 2 1211757 + 1 364778 L1446 11 Divides GF (1211755, 5)<br />
2014 25 · 2 1211488 + 1 364696 g279 05 Generalized Fermat, divides<br />
GF (1211487, 12)<br />
2015 595 · 2 1211446 + 1 364685 L2551 11<br />
2016 4031 · 2 1211274 − 1 364634 L1959 13<br />
2017 9 · 10 364521 − 1 364522 p297 10 Near-repdigit<br />
2018 117 · 2 1210282 − 1 364334 L2055 11<br />
2019 108045 · 2 1210075 − 1 364274 L466 12<br />
2020 707 · 2 1209654 − 1 364145 L1815 12<br />
2021 181 · 2 1209572 + 1 364120 L2904 11<br />
2022 1365 · 2 1209522 + 1 364106 L1134 12<br />
2023 369 · 2 1209435 + 1 364079 L1745 11<br />
2024 403 · 2 1209326 + 1 364047 L2903 11<br />
2025 951 · 2 1209290 − 1 364036 L1815 12<br />
2026 333 · 2 1209174 − 1 364001 L1830 10<br />
2027 273 · 2 1209170 − 1 363999 L2338 12<br />
2028 357868 65536 + 1 363969 g266 03 Generalized Fermat<br />
2029 703 · 2 1208892 + 1 363916 L2100 11<br />
2030 1035 · 2 1208884 − 1 363914 L1828 12<br />
2031 1051 · 2 1208312 + 1 363742 L2659 11<br />
2032 241 · 2 1208307 − 1 363740 L2338 12<br />
2033 249 · 2 1208142 + 1 363690 L1158 11<br />
2034 835 · 2 1207821 − 1 363594 L1815 12<br />
2035 155 · 2 1207424 − 1 363474 L1959 11<br />
2036 165 · 2 1207393 + 1 363464 L2884 12<br />
2037 209 · 2 1207276 − 1 363429 L2338 11<br />
2038 154962 · 221 154962 − 1 363297 L3269 12 Generalized Woodall<br />
2039 183916 · 5 519597 − 1 363188 p304 10<br />
2040 69 · 2 1206353 + 1 363151 g246 10<br />
2041 235 · 2 1206136 + 1 363086 L2516 11<br />
2042 973 · 2 1206088 + 1 363072 L2085 11<br />
2043 1097 · 2 1206076 − 1 363069 L1828 12<br />
2044 1119 · 2 1205879 − 1 363009 L1828 12<br />
2045 120585 · 2 1205851 − 1 363003 p260 12 Generalized Woodall<br />
2046 429 · 2 1205440 − 1 362877 L1817 13<br />
2047 921 · 2 1205199 + 1 362805 L2794 11<br />
2048 2 · 698 127558 − 1 362757 L2054 11<br />
2049 269 · 2 1204740 − 1 362666 L282 10<br />
2050 621 · 2 1204299 + 1 362533 L2793 11<br />
42
ank description digits who year comment<br />
2051 475 · 2 1204215 − 1 362508 L1817 13<br />
2052 689 · 2 1204032 − 1 362453 L1815 12<br />
2053 2 1203793 − 2 601897 + 1 362378 L192 06 Gaussian Mersenne norm 37<br />
2054 861 · 2 1203625 − 1 362331 L251 11<br />
2055 1035 · 2 1203377 − 1 362256 L1828 12<br />
2056 25 · 800 124713 − 1 362055 p355 12<br />
2057 945 · 2 1202538 − 1 362003 L1815 12<br />
2058 279 · 2 1202283 − 1 361926 L2338 12<br />
2059 537 · 2 1201791 + 1 361778 L2702 11<br />
2060 927 · 2 1201644 − 1 361734 L1815 12<br />
2061 1107 · 2 1201166 − 1 361591 L1828 12<br />
2062 3 · 2 1201046 − 1 361552 L77 04<br />
2063 1323 · 2 1200980 − 1 361535 L1828 12<br />
2064 545 · 2 1200769 + 1 361471 L1934 11<br />
2065 469 · 2 1200635 − 1 361430 L1817 13<br />
2066 863 · 2 1200565 + 1 361410 L1533 11<br />
2067 6 · 272 148426 − 1 361355 L1471 11<br />
2068 699 · 2 1200343 + 1 361343 L1303 11<br />
2069 183500 · 93 183500 + 1 361222 g157 12 Generalized Cullen<br />
2070 502541 · 2 1199930 − 1 361221 L93 04<br />
2071 1153 · 2 1199835 − 1 361190 L1828 12<br />
2072 155 · 2 1199689 + 1 361145 L1751 11<br />
2073 2611 · 2 1199467 − 1 361079 L2708 11<br />
2074 4179 · 2 1199409 − 1 361062 L1959 13<br />
2075 4021 · 2 1199103 − 1 360970 L1959 13<br />
2076 943 · 2 1198931 − 1 360918 L1815 12<br />
2077 1011 · 2 1198498 − 1 360787 L1828 12<br />
2078 587 · 2 1198111 + 1 360671 L2620 11<br />
2079 4175 · 2 1197888 − 1 360604 L1959 13<br />
2080 9999992 · 10 360403 − 1 360410 L1958 11 Near-repdigit<br />
2081 34693 · 2 1197131 − 1 360377 L2055 11<br />
2082 83 · 706 126486 − 1 360336 L1471 11<br />
2083 1027 · 2 1196957 − 1 360323 L1828 12<br />
2084 1335 · 2 1196731 − 1 360256 L1828 12<br />
2085 1029 · 2 1196674 + 1 360238 L1408 11<br />
2086 163 · 2 1196434 + 1 360165 L1751 11<br />
2087 1019 · 2 1196379 + 1 360149 L1513 11<br />
2088 53542 · 5 515155 − 1 360083 p305 10<br />
2089 843 · 2 1195408 − 1 359857 L1815 12<br />
2090 153222 · 223 153222 − 1 359818 L2777 12 Generalized Woodall<br />
2091 1195203 · 2 1195203 − 1 359799 L124 05 Woodall<br />
2092 142223 · 2 1194492 − 1 359584 L3169 12<br />
2093 5 · 2 1194164 − 1 359480 L478 08<br />
2094 1075 · 2 1194063 − 1 359452 L1828 12<br />
2095 873 · 2 1193802 − 1 359374 L1815 12<br />
2096 1165 · 2 1193202 + 1 359193 L2540 11<br />
2097 105 · 2 1193072 − 1 359153 L384 09<br />
2098 83 · 2 1192950 − 1 359116 L1884 10<br />
2099 8 · 202 155771 − 1 359108 p258 10<br />
2100 103 · 2 1192775 − 1 359064 L2484 12<br />
43
ank description digits who year comment<br />
2101 799 · 2 1192254 + 1 358908 L2749 11<br />
2102 507 · 2 1192088 − 1 358857 L1817 13<br />
2103 4133 · 2 1191148 − 1 358575 L1959 13<br />
2104 825 · 2 1191114 − 1 358564 L1815 12<br />
2105 285 · 2 1190854 − 1 358486 L2338 12<br />
2106 519 · 2 1190660 − 1 358428 L1817 13<br />
2107 478253!7 + 1 358376 p3 11 Multifactorial<br />
2108 292550 65536 + 1 358233 GC2 02 Generalized Fermat<br />
2109 443 · 2 1189865 + 1 358188 L2735 11<br />
2110 633 · 2 1189809 + 1 358171 L2085 11<br />
2111 291726 65536 + 1 358153 GC2 02 Generalized Fermat<br />
2112 1365 · 2 1188377 + 1 357741 L1134 12<br />
2113 4133 · 2 1187560 − 1 357495 L1959 13<br />
2114 249 · 2 1187471 + 1 357467 L2706 11<br />
2115 181 · 2 1186763 − 1 357254 L2074 11<br />
2116 389 · 2 1186577 + 1 357198 L2859 11<br />
2117 789 · 2 1186225 − 1 357093 L1815 12<br />
2118 1153 · 2 1185339 − 1 356826 L1828 12<br />
2119 545 · 2 1185295 + 1 356813 L2724 11<br />
2120 2985 · 2 1185243 − 1 356798 L1959 13<br />
2121 71009 · 2 1185112 − 1 356760 L47 04<br />
2122 1077 · 2 1184936 + 1 356705 L2792 11<br />
2123 655 · 2 1184445 − 1 356557 L1817 12<br />
2124 1049 · 2 1184377 + 1 356537 L2791 11<br />
2125 948 · 112 173968 − 1 356502 L1471 12<br />
2126 78959 · 6 458114 − 1 356487 p256 09<br />
2127 435 · 2 1183997 + 1 356422 L2861 11<br />
2128 201 · 2 1183137 − 1 356163 L282 10<br />
2129 4025 · 2 1182516 − 1 355977 L1959 13<br />
2130 481 · 2 1182519 − 1 355977 L1817 13<br />
2131 983 · 2 1182272 − 1 355903 L1816 12<br />
2132 21 · 2 1182083 − 1 355844 L323 09<br />
2133 1123 · 2 1181503 − 1 355671 L1828 12<br />
2134 57 · 2 1181438 + 1 355651 L1446 10<br />
2135 24161 · 2 1181162 − 1 355570 L2055 11<br />
2136 923 · 2 1181030 − 1 355529 L1815 12<br />
2137 371 · 2 1180806 − 1 355461 L1819 13<br />
2138 711 · 2 1180481 + 1 355364 L2085 11<br />
2139 765 · 2 1179540 + 1 355080 L2714 11<br />
2140 677 · 2 1179464 − 1 355057 L1815 12<br />
2141 1015 · 2 1179433 − 1 355048 L1828 12<br />
2142 813 · 2 1179185 + 1 354973 L2085 11<br />
2143 921 · 2 1178279 − 1 354701 L1815 12<br />
2144 225 · 2 1177945 − 1 354600 L2074 12<br />
2145 55 · 2 1177924 + 1 354593 L669 09<br />
2146 165 · 2 1177856 + 1 354573 L1204 11<br />
2147 1023 · 2 1177850 + 1 354572 L2517 11<br />
2148 243 · 2 1177629 + 1 354505 L165 11<br />
2149 435 · 2 1177574 + 1 354488 L1371 11<br />
2150 1053 · 2 1177312 − 1 354410 L1828 12<br />
44
ank description digits who year comment<br />
2151 821 · 2 1177285 + 1 354402 L1344 11<br />
2152 255694 65536 + 1 354401 g266 02 Generalized Fermat<br />
2153 1135 · 2 1177225 − 1 354384 L1828 12<br />
2154 1215 · 2 1176818 − 1 354261 L1828 12<br />
2155 591 · 2 1176188 + 1 354071 L1595 11<br />
2156 459 · 2 1176058 + 1 354032 L2858 11<br />
2157 2175 · 2 1176013 − 1 354019 L1862 13<br />
2158 345 · 2 1175842 − 1 353967 L536 10<br />
2159 65 · 2 1175747 + 1 353937 L1446 10<br />
2160 879 · 2 1175478 + 1 353858 L2522 11<br />
2161 617 · 2 1175468 − 1 353854 L426 07<br />
2162 651 · 2 1175149 + 1 353758 L1158 11<br />
2163 1075 · 2 1174835 − 1 353664 L1828 12<br />
2164 555 · 2 1174603 + 1 353594 L2543 11<br />
2165 4175 · 2 1174450 − 1 353549 L1959 13<br />
2166 945 · 2 1174442 + 1 353546 L2540 11<br />
2167 891 · 2 1174318 − 1 353508 L1815 12<br />
2168 717 · 2 1174056 + 1 353429 L2447 11<br />
2169 837 · 2 1172532 − 1 352971 L1815 12<br />
2170 1695 · 2 1172501 + 1 352962 L527 12<br />
2171 649 · 2 1172271 − 1 352892 L1815 12<br />
2172 586085 · 2 1172172 − 1 352865 p77 12<br />
2173 209 · 2 1172111 + 1 352843 L1935 11<br />
2174 709 · 2 1171934 + 1 352791 L2748 11<br />
2175 1395 · 2 1171845 + 1 352764 L3432 13<br />
2176 37328 · 5 504675 + 1 352758 p284 10<br />
2177 407 · 2 1171719 + 1 352726 L2550 11<br />
2178 311 · 2 1171199 + 1 352569 L2857 11<br />
2179 251 · 2 1171193 + 1 352567 L1776 11<br />
2180 1191 · 2 1171121 + 1 352546 L1223 11<br />
2181 615 · 2 1171032 − 1 352519 L1815 12<br />
2182 227 · 2 1170724 − 1 352426 L268 10<br />
2183 59 · 2 1170231 + 1 352277 L669 09<br />
2184 21 · 2 1170083 − 1 352232 L503 08<br />
2185 567 · 2 1169602 + 1 352089 L2790 11<br />
2186 819 · 2 1169551 − 1 352073 L1815 12<br />
2187 231 · 2 1169250 − 1 351982 L2338 12<br />
2188 631 · 2 1169088 + 1 351934 L2742 11<br />
2189 849 · 2 1169013 − 1 351911 L1809 12<br />
2190 147 · 2 1168975 + 1 351899 L1751 11<br />
2191 783 · 2 1168583 − 1 351782 L2257 12<br />
2192 321 · 2 1168576 + 1 351779 L1204 11<br />
2193 1013 · 2 1168233 + 1 351677 L2549 11<br />
2194 917 · 2 1167682 − 1 351511 L1815 12<br />
2195 883 · 2 1167442 + 1 351439 L2745 11<br />
2196 651 · 2 1166010 − 1 351007 L1815 12<br />
2197 2611 · 2 1165907 − 1 350977 L2708 11<br />
2198 1235 · 2 1165858 − 1 350962 L1828 12<br />
2199 689 · 2 1165785 + 1 350940 L2741 11<br />
2200 582833 · 2 1165668 − 1 350907 p77 12<br />
45
ank description digits who year comment<br />
2201 877 · 2 1165554 + 1 350870 L2659 11<br />
2202 873 · 2 1165494 − 1 350852 L1815 12<br />
2203 271 · 2 1165420 + 1 350829 L2593 11<br />
2204 505 · 2 1165307 − 1 350796 L2519 12<br />
2205 1005 · 2 1165203 − 1 350765 L1828 12<br />
2206 27 · 2 1164664 + 1 350601 g279 05<br />
2207 383 · 2 1164513 + 1 350556 L2410 11<br />
2208 1389 · 2 1164408 − 1 350525 L1828 12<br />
2209 815 · 2 1164279 + 1 350486 L2789 11<br />
2210 763 · 2 1164124 + 1 350440 L1513 11<br />
2211 875 · 2 1163883 + 1 350367 L2085 11<br />
2212 595 · 2 1163818 + 1 350347 L1158 11<br />
2213 4027 · 2 1163793 − 1 350341 L1959 13<br />
2214 27 · 2 1163629 − 1 350289 L503 08<br />
2215 611 · 2 1163621 + 1 350288 L2740 11<br />
2216 2715 · 2 1163216 − 1 350167 L1959 13<br />
2217 4101 · 2 1162745 − 1 350025 L1959 13<br />
2218 165 · 2 1162671 − 1 350002 L2101 11<br />
2219 1043 · 2 1162641 + 1 349993 L2627 11<br />
2220 315 · 2 1162371 + 1 349912 L1204 11<br />
2221 175 · 2 1162313 − 1 349894 L1959 11<br />
2222 55 · 2 1162155 − 1 349846 L545 08<br />
2223 1155 · 2 1162129 − 1 349839 L1828 12<br />
2224 1281 · 2 1161874 − 1 349763 L1828 12<br />
2225 4025 · 2 1161612 − 1 349684 L1959 13<br />
2226 339 · 2 1161347 − 1 349603 L536 10<br />
2227 1189 · 2 1161169 − 1 349550 L1828 12<br />
2228 865 · 2 1161090 + 1 349526 L2531 11<br />
2229 749 · 2 1160897 + 1 349468 L1741 11<br />
2230 1023 · 2 1159630 − 1 349087 L1828 12<br />
2231 2025 · 2 1159433 + 1 349028 L3432 13<br />
2232 57 · 2 1158942 + 1 348879 L669 10<br />
2233 1303 · 2 1158907 − 1 348869 L1828 12<br />
2234 247 · 2 1158186 + 1 348652 L2352 11<br />
2235 301 · 2 1157561 − 1 348464 p281 10<br />
2236 837 · 2 1157520 + 1 348452 L2711 11<br />
2237 117 · 2 1157460 + 1 348433 L1751 10<br />
2238 69109 · 2 1157446 + 1 348431 SB4 02<br />
2239 113 · 2 1157413 + 1 348419 L1751 10<br />
2240 147 · 2 1157300 + 1 348385 L1751 11<br />
2241 1107 · 2 1157095 + 1 348324 L2730 11<br />
2242 793 · 2 1157055 − 1 348312 L1809 12<br />
2243 174885 · 98 174885 + 1 348241 g157 12 Generalized Cullen<br />
2244 4147 · 2 1156785 − 1 348231 L1959 13<br />
2245 885 · 2 1156603 − 1 348176 L2519 12<br />
2246 265 · 2 1155950 + 1 347979 L1741 11<br />
2247 925 · 2 1155857 − 1 347951 L1809 12<br />
2248 255 · 2 1155630 + 1 347882 L1158 11<br />
2249 417 · 2 1155458 − 1 347831 L1809 12<br />
2250 2295 · 2 1155336 − 1 347795 L1959 13<br />
46
ank description digits who year comment<br />
2251 669 · 2 1155188 − 1 347750 L1815 12<br />
2252 497 · 2 1154735 + 1 347613 L1935 11<br />
2253 152713 · 2 1154707 − 1 347607 g23 04<br />
2254 83 · 2 1154617 + 1 347577 L446 10 Divides GF (1154616, 3)<br />
2255 75 · 2 1154616 + 1 347576 L1446 11<br />
2256 1251 · 2 1154238 − 1 347464 L1828 12<br />
2257 571 · 2 1154111 − 1 347425 L1809 12<br />
2258 14533 · 2 1153951 − 1 347379 L2055 11<br />
2259 1485 · 2 1153738 − 1 347313 L1134 11<br />
2260 851 · 2 1153586 − 1 347267 L1815 12<br />
2261 1023 · 2 1153248 + 1 347166 L2521 11<br />
2262 813 · 2 1152824 + 1 347038 L2737 11<br />
2263 29 · 2 1152765 + 1 347019 g300 05 Divides GF (1152760, 10)<br />
2264 105 · 2 1152715 + 1 347004 L1446 11<br />
2265 1365 · 2 1152143 + 1 346833 L1134 12<br />
2266 1089 · 2 1151702 + 1 346700 L2733 11 Generalized Fermat<br />
2267 4121 · 2 1151458 − 1 346628 L1959 13<br />
2268 461 · 2 1150934 − 1 346469 L1809 12<br />
2269 755 · 2 1150559 + 1 346356 L2736 11<br />
2270 4155 · 2 1150482 − 1 346334 L1959 13<br />
2271 1199 · 2 1150327 + 1 346287 L2532 11<br />
2272 1097 · 2 1150123 + 1 346225 L2734 11<br />
2273 499 · 2 1150034 + 1 346198 L1935 11<br />
2274 939 · 2 1149940 − 1 346170 L1809 12<br />
2275 963 · 2 1149272 − 1 345969 L1809 12<br />
2276 189590 65536 + 1 345887 g262 02 Generalized Fermat<br />
2277 657 · 2 1148795 + 1 345825 L2673 11<br />
2278 2895 · 2 1148691 − 1 345794 L1959 13<br />
2279 565 · 2 1148579 − 1 345760 L1809 12<br />
2280 1089 · 2 1148265 + 1 345666 L1776 11<br />
2281 589 · 2 1148198 + 1 345645 L1158 11<br />
2282 1017 · 2 1147995 + 1 345584 L2713 11<br />
2283 141 · 2 1147747 + 1 345509 L1751 11<br />
2284 905 · 2 1147681 + 1 345490 L2419 11<br />
2285 1139 · 2 1147172 − 1 345337 L1828 11<br />
2286 465 · 2 1146888 + 1 345251 L1129 11<br />
2287 1001155863 · 2 1146800 + 1 345231 p221 09<br />
2288 405 · 2 1146533 − 1 345144 L1862 12<br />
2289 531 · 2 1146439 − 1 345116 L1809 12<br />
2290 8644 · 5 493618 + 1 345029 p280 10<br />
2291 1256 · 148 158963 − 1 344995 p268 12<br />
2292 1001 · 2 1145705 + 1 344895 L2412 11<br />
2293 285 · 2 1145224 − 1 344750 L2338 12<br />
2294 1137 · 2 1145161 − 1 344731 L1828 11<br />
2295 855 · 2 1145019 + 1 344688 L2735 11<br />
2296 413 · 2 1144580 − 1 344556 L1809 12<br />
2297 453 · 2 1144428 − 1 344510 L1809 12<br />
2298 350107 · 2 1144101 − 1 344415 L35 04<br />
2299 4005 · 2 1143994 − 1 344381 L1959 13<br />
2300 619 · 2 1143986 + 1 344377 L1204 11<br />
47
ank description digits who year comment<br />
2301 553 · 2 1143639 − 1 344273 L1809 12<br />
2302 443 · 2 1143154 − 1 344127 L1862 10<br />
2303 699 · 2 1143143 + 1 344124 L1818 11<br />
2304 4095 · 2 1143119 − 1 344117 L1959 13<br />
2305 101 · 2 1142981 + 1 344074 L1446 11 Divides GF (1142980, 3)<br />
2306 31 · 2 1142093 − 1 343806 L503 08<br />
2307 939 · 2 1142083 − 1 343805 L1816 12<br />
2308 1149 · 2 1141946 + 1 343764 L2733 11<br />
2309 1387 · 2 1141865 − 1 343739 L1828 11<br />
2310 115 · 2 1141719 − 1 343694 L1959 11<br />
2311 209826493 · 2 1140855 − 1 343440 L10 04<br />
2312 705 · 2 1140054 − 1 343194 L696 12<br />
2313 48394 · 5 490575 − 1 342902 p284 10<br />
2314 4015 · 2 1138965 − 1 342867 L1959 13<br />
2315 149 · 2 1138804 − 1 342817 L1959 11<br />
2316 445 · 2 1138720 + 1 342792 L2856 11<br />
2317 1023 · 2 1138576 + 1 342749 L2711 11<br />
2318 500621 · 2 1138518 − 1 342734 L73 04<br />
2319 4097 · 2 1138222 − 1 342643 L1959 13<br />
2320 4005 · 2 1138024 − 1 342583 L1959 13<br />
2321 583 · 2 1137603 − 1 342456 L1809 12<br />
2322 627 · 2 1137547 + 1 342439 L2702 11<br />
2323 671 · 2 1137467 + 1 342415 L2147 11<br />
2324 313 · 2 1137387 − 1 342391 L1978 11<br />
2325 843 · 2 1137249 + 1 342349 L1387 11<br />
2326 285 · 2 1136696 − 1 342183 L2338 12<br />
2327 504613 · 2 1136459 − 1 342114 L84 04<br />
2328 807 · 2 1136353 − 1 342080 L2257 12<br />
2329 935 · 2 1136053 + 1 341990 L1125 11<br />
2330 791 · 2 1135983 + 1 341968 L2732 11<br />
2331 19861029 · 2 1135563 − 1 341846 L895 12<br />
2332 861 · 2 1135486 − 1 341819 L696 12<br />
2333 1231 · 2 1135229 − 1 341742 L1828 11<br />
2334 1089 · 2 1135049 − 1 341687 L1828 11<br />
2335 1065 · 2 1135016 − 1 341677 L1828 11<br />
2336 277 · 2 1134740 + 1 341594 L2308 11<br />
2337 1065 · 2 1134545 − 1 341536 L1828 11<br />
2338 45 · 2 1134357 + 1 341478 L669 09<br />
2339 405 · 2 1133886 − 1 341337 L1862 12<br />
2340 2895 · 2 1133841 − 1 341324 L1959 13<br />
2341 1127 · 2 1133758 − 1 341299 L1828 11<br />
2342 2 · 263 140989 + 1 341188 g424 11 Divides P hi(263 140989 , 2)<br />
2343 12927 · 60 191870 + 1 341178 p268 12<br />
2344 4029 · 2 1133153 − 1 341117 L1959 13<br />
2345 551 · 2 1132501 + 1 340920 L1125 11<br />
2346 875 · 2 1132454 − 1 340906 L2519 12<br />
2347 1235 · 2 1132210 − 1 340833 L1828 11<br />
2348 735 · 2 1131883 − 1 340734 L1809 12<br />
2349 1115 · 2 1131709 + 1 340682 L2739 11<br />
2350 1187 · 2 1131403 + 1 340590 L2517 11<br />
48
ank description digits who year comment<br />
2351 33 · 2 1130884 + 1 340432 L165 06 Divides GF (1130881, 12)<br />
2352 541 · 2 1130876 + 1 340431 L2731 11<br />
2353 1095 · 2 1130677 − 1 340371 L1828 11<br />
2354 1087 · 2 1130492 + 1 340316 L2730 11<br />
2355 937 · 2 1130278 + 1 340251 L2659 11<br />
2356 163 · 2 1129934 + 1 340147 L1751 10 Divides GF (1129933, 10)<br />
2357 1035 · 2 1129901 − 1 340138 L1828 11<br />
2358 178192 · 3 712768 + 1 340083 L2777 11 Generalized Cullen<br />
2359 855 · 2 1129695 + 1 340076 L1935 11<br />
2360 701 · 2 1129531 + 1 340026 L2517 11<br />
2361 653 · 2 1129481 + 1 340011 L2730 11<br />
2362 1121 · 2 1129391 + 1 339984 L2659 11<br />
2363 341 · 2 1129218 − 1 339932 L1830 13<br />
2364 583 · 2 1128879 − 1 339830 L3055 12<br />
2365 789 · 2 1128793 − 1 339804 L1815 12<br />
2366 64 · 3 712171 + 1 339794 x28 06<br />
2367 531 · 2 1128640 + 1 339758 L2659 11<br />
2368 573 · 2 1128632 − 1 339755 L2047 12<br />
2369 1287 · 2 1127953 − 1 339551 L1828 11<br />
2370 621 · 2 1127434 − 1 339395 L1809 12<br />
2371 507 · 2 1127304 − 1 339356 L3055 12<br />
2372 851 · 2 1126707 + 1 339176 L2085 11<br />
2373 597 · 2 1126638 + 1 339155 L1223 11<br />
2374 76322 · 5 485176 − 1 339129 p284 10<br />
2375 63 · 2 1126551 − 1 339128 L323 08<br />
2376 1077 · 2 1126434 − 1 339094 L1828 11<br />
2377 842711 · 2 1126138 − 1 339008 L251 09<br />
2378 14521 · 6 435631 + 1 338991 L2777 12 Generalized Cullen<br />
2379 385 · 2 1126083 − 1 338988 L1819 13<br />
2380 1365 · 2 1125937 − 1 338944 L1828 11<br />
2381 355 · 2 1125573 − 1 338834 L1830 13<br />
2382 51176 · 5 484669 + 1 338774 p280 10<br />
2383 247 · 2 1124806 + 1 338603 L1360 11<br />
2384 997 · 2 1124781 − 1 338596 L1817 12<br />
2385 4105 · 2 1124721 − 1 338579 L1959 12<br />
2386 2 · 467 126775 + 1 338403 g425 11 Divides P hi(467 126775 , 2)<br />
2387 61 · 2 1124049 − 1 338375 L121 10<br />
2388 225 · 2 1123975 − 1 338353 L2074 12<br />
2389 4147 · 2 1123873 − 1 338324 L1959 12<br />
2390 685 · 2 1123361 − 1 338169 L1817 12<br />
2391 1113 · 2 1123280 + 1 338145 L2045 11<br />
2392 1425 · 2 1123016 − 1 338065 L1134 12<br />
2393 255 · 2 1122897 + 1 338029 L2085 11<br />
2394 1015 · 2 1122611 − 1 337943 L1828 11<br />
2395 645 · 2 1122571 − 1 337931 L1817 12<br />
2396 463 · 2 1122510 + 1 337912 L2085 11<br />
2397 119 · 2 1122472 − 1 337900 L2338 11<br />
2398 933 · 2 1122372 − 1 337871 L565 12<br />
2399 177 · 2 1121720 + 1 337674 L129 06<br />
2400 585 · 2 1121215 + 1 337523 L1303 11<br />
49
ank description digits who year comment<br />
2401 4005 · 2 1121174 − 1 337511 L1959 12<br />
2402 141146 65536 + 1 337489 g281 02 Generalized Fermat<br />
2403 1107 · 2 1121007 + 1 337460 L2522 11<br />
2404 819 · 2 1120943 − 1 337441 L1817 12<br />
2405 707 · 2 1120218 − 1 337223 L1815 12<br />
2406 87 · 2 1120006 − 1 337158 L121 10<br />
2407 10021 · 2 1119611 − 1 337041 L536 11<br />
2408 1255 · 2 1119475 − 1 336999 L1828 11<br />
2409 4159 · 2 1119283 − 1 336942 L1959 12<br />
2410 1005 · 2 1119171 − 1 336908 L1828 11<br />
2411 627 · 2 1119114 − 1 336890 L1815 12<br />
2412 1095 · 2 1119088 − 1 336883 L1828 11<br />
2413 547 · 2 1118868 + 1 336816 L1820 11<br />
2414 229 · 2 1118806 + 1 336797 L2835 11<br />
2415 517 · 2 1117948 + 1 336539 L1935 11<br />
2416 601 · 2 1117772 + 1 336486 L2727 11<br />
2417 825 · 2 1117738 − 1 336476 L1815 12<br />
2418 165 · 2 1117217 + 1 336319 g196 07<br />
2419 289 · 2 1117182 + 1 336308 L2854 11 Generalized Fermat<br />
2420 777 · 2 1117120 − 1 336290 L1815 12<br />
2421 619 · 2 1117103 − 1 336285 L2257 12<br />
2422 279 · 2 1116600 − 1 336133 L2338 12<br />
2423 315 · 2 1116547 − 1 336117 L536 10<br />
2424 1125 · 2 1116485 − 1 336099 L1828 11<br />
2425 371 · 2 1116274 − 1 336035 L2235 13<br />
2426 897 · 2 1116263 + 1 336032 L1820 11<br />
2427 33 · 2 1115902 − 1 335922 L488 08<br />
2428 9999993 · 10 335905 − 1 335912 L1958 13 Near-repdigit<br />
2429 631 · 2 1115708 + 1 335865 L1314 11<br />
2430 1179 · 2 1115439 + 1 335784 L2726 11<br />
2431 189 · 2 1115090 + 1 335678 L1446 11<br />
2432 789 · 2 1114779 + 1 335585 L1733 11<br />
2433 353 · 2 1114356 − 1 335458 L579 10<br />
2434 663 · 2 1113450 + 1 335185 L1125 11<br />
2435 4159 · 2 1113265 − 1 335130 L1959 12<br />
2436 2565 · 2 1113204 − 1 335112 L2338 12<br />
2437 93 · 2 1112805 + 1 334990 L1446 11<br />
2438 4099 · 2 1112709 − 1 334963 L1959 12<br />
2439 705 · 2 1112418 − 1 334875 L1817 12<br />
2440 439 · 2 1112314 + 1 334843 L1125 11<br />
2441 903 · 2 1111928 + 1 334727 L2725 11<br />
2442 2 1111932 + 2 · V (1, 2, 1111930) + 1 334725 x41 12<br />
2443 1089 · 2 1111763 + 1 334678 L2724 11<br />
2444 45 · 2 1111703 + 1 334658 L669 09<br />
2445 555 · 2 1111663 + 1 334647 L2652 11<br />
2446 813 · 2 1111489 + 1 334595 L1379 11<br />
2447 6040239 · 2 1111111 − 1 334485 p296 12<br />
2448 5834751 · 2 1111111 − 1 334485 p296 12<br />
2449 487419 · 2 1111111 + 1 334484 g412 12<br />
2450 57 · 2 1110980 − 1 334441 L121 10<br />
50
ank description digits who year comment<br />
2451 4155 · 2 1110839 − 1 334400 L1959 12<br />
2452 945 · 2 1110626 − 1 334335 L1817 12<br />
2453 1177 · 2 1110536 + 1 334308 L1513 11<br />
2454 339 · 2 1110323 − 1 334244 L536 10<br />
2455 731 · 2 1110267 + 1 334227 L1847 11<br />
2456 1275 · 2 1110019 − 1 334153 L1828 11<br />
2457 1981 · 2 1109843 − 1 334100 L1134 12<br />
2458 1065 · 2 1109681 − 1 334051 L1828 11<br />
2459 105 · 2 1109585 + 1 334021 L1446 11<br />
2460 1159 · 2 1109421 − 1 333973 L1828 11<br />
2461 1069 · 2 1109262 + 1 333925 L1745 11<br />
2462 1041 · 2 1108857 + 1 333803 L2723 11<br />
2463 1277 · 2 1108678 − 1 333749 L1828 11<br />
2464 4039 · 2 1108465 − 1 333685 L1959 12<br />
2465 1389 · 2 1108211 − 1 333608 L1828 11<br />
2466 27 · 2 1108214 − 1 333608 L590 08<br />
2467 125 · 2 1107425 + 1 333371 L1751 10<br />
2468 4179 · 2 1107188 − 1 333301 L1959 12<br />
2469 123 · 2 1107008 + 1 333245 L1751 10<br />
2470 99 · 2 1106989 − 1 333239 L486 07<br />
2471 11533 · 2 1106943 − 1 333228 L2055 11<br />
2472 305 · 2 1106333 + 1 333042 L2851 11<br />
2473 395 · 2 1106091 + 1 332970 L1158 11<br />
2474 4015 · 2 1105883 − 1 332908 L1959 12<br />
2475 423 · 2 1105874 + 1 332904 L2066 11<br />
2476 847 · 2 1105730 + 1 332861 L1792 11<br />
2477 4113 · 2 1105346 − 1 332746 L1959 12<br />
2478 469 · 2 1105345 − 1 332745 L1816 12<br />
2479 1153 · 2 1105252 + 1 332718 L1741 11<br />
2480 9101981 · 2 1104666 − 1 332545 L1134 12<br />
2481 11 · 2 1104606 − 1 332521 L10 05<br />
2482 417 · 2 1104563 + 1 332510 L2627 11<br />
2483 446236!7 − 1 332466 p3 11 Multifactorial<br />
2484 117 · 2 1104138 − 1 332381 L1959 11<br />
2485 4129 · 2 1104111 − 1 332375 L1959 12<br />
2486 367 · 2 1103912 + 1 332314 L1935 11<br />
2487 49 · 2 1103430 + 1 332168 L669 09 Generalized Fermat<br />
2488 1029 · 2 1103372 − 1 332152 L1828 11<br />
2489 1369 · 2 1103183 − 1 332095 L1828 11<br />
2490 9999993 · 10 331938 − 1 331945 L1958 13 Near-repdigit<br />
2491 573 · 2 1101398 − 1 331557 L1816 12<br />
2492 4079 · 2 1101392 − 1 331556 L1959 12<br />
2493 4155 · 2 1101359 − 1 331546 L1959 12<br />
2494 4045 · 2 1100929 − 1 331417 L1959 12<br />
2495 165 · 2 1100755 + 1 331363 g196 07<br />
2496 191 · 2 1099867 + 1 331096 L669 10<br />
2497 635 · 2 1099854 − 1 331092 L1817 12<br />
2498 1517 · 2 1099851 + 1 331092 L3435 13<br />
2499 173 · 2 1099741 + 1 331058 L669 10<br />
2500 2547 · 2 1099688 − 1 331043 L1959 12<br />
51
ank description digits who year comment<br />
2501 4037 · 2 1099328 − 1 330935 L1959 12<br />
2502 2295 · 2 1099067 − 1 330856 L1959 12<br />
2503 371 · 2 1099061 + 1 330853 L2732 11<br />
2504 173 · 2 1098914 − 1 330809 L2432 11<br />
2505 1059 · 2 1098871 + 1 330797 L2642 11<br />
2506 1731 · 2 1098772 + 1 330767 L2626 13<br />
2507 57 · 2 1098272 − 1 330615 L260 10<br />
2508 289 · 2 1098117 − 1 330569 L6 06<br />
2509 2215 · 2 1097952 + 1 330520 L3262 13<br />
2510 3937 · 2 1097724 + 1 330452 L2626 13<br />
2511 2857 · 2 1097704 + 1 330446 L3262 13<br />
2512 2985 · 2 1097669 + 1 330435 L2949 13<br />
2513 3873 · 2 1097593 + 1 330413 L3378 13<br />
2514 2583 · 2 1097574 + 1 330407 L1935 13<br />
2515 3093 · 2 1097468 + 1 330375 L3469 13<br />
2516 117434 · 5 472635 + 1 330363 p280 10<br />
2517 1151 · 2 1097414 − 1 330358 L1828 11<br />
2518 1297 · 2 1097337 − 1 330335 L1828 11<br />
2519 4065 · 2 1097330 − 1 330333 L1959 12<br />
2520 3633 · 2 1097249 + 1 330309 L1935 13<br />
2521 451 · 2 1096999 − 1 330233 L1816 12<br />
2522 2625 · 2 1096964 + 1 330223 L1741 13<br />
2523 3779 · 2 1096939 + 1 330216 L3262 13<br />
2524 1745 · 2 1096873 + 1 330195 L3385 13<br />
2525 19433 · 2 1096861 + 1 330193 g411 08<br />
2526 52 · 353 129583 − 1 330151 L1471 12<br />
2527 435 · 2 1096682 + 1 330137 L2850 11<br />
2528 5379 · 2 1096551 + 1 330099 L1741 13<br />
2529 4461 · 2 1096539 + 1 330095 L3213 13<br />
2530 2211 · 2 1096505 + 1 330085 L3468 13<br />
2531 6759 · 2 1096423 + 1 330061 L1741 13<br />
2532 3403 · 2 1096286 + 1 330019 L1158 13<br />
2533 4843 · 2 1096258 + 1 330011 L2322 13<br />
2534 465 · 2 1096176 + 1 329985 L1300 11<br />
2535 108368 65536 + 1 329968 g181 01 Generalized Fermat<br />
2536 2391 · 2 1095928 + 1 329911 L3262 13<br />
2537 3075 · 2 1095918 + 1 329908 L2322 13<br />
2538 183 · 2 1095896 − 1 329900 L2444 11<br />
2539 2195 · 2 1095881 + 1 329897 L2064 13<br />
2540 763 · 2 1095860 + 1 329890 L2714 11<br />
2541 4269 · 2 1095778 + 1 329866 L2322 13<br />
2542 3711 · 2 1095767 + 1 329863 L1559 13<br />
2543 4851 · 2 1095744 + 1 329856 L2131 13<br />
2544 6813 · 2 1095741 + 1 329855 L3035 13<br />
2545 393 · 2 1095688 − 1 329838 L644 10<br />
2546 4365 · 2 1095615 + 1 329817 L2719 13<br />
2547 2677 · 2 1095494 + 1 329780 L3466 13<br />
2548 5697 · 2 1095436 + 1 329763 L3180 13<br />
2549 7793 · 2 1095365 + 1 329742 L1158 13<br />
2550 2191 · 2 1095328 + 1 329730 L3262 13<br />
52
ank description digits who year comment<br />
2551 2163 · 2 1095326 + 1 329730 L3011 13<br />
2552 6777 · 2 1095254 + 1 329709 L2125 13<br />
2553 1611 · 2 1095224 + 1 329699 L3262 13<br />
2554 1797 · 2 1095178 + 1 329685 L3431 13<br />
2555 5567 · 2 1095019 + 1 329638 L1741 13<br />
2556 2117 · 2 1094979 + 1 329625 L3262 13<br />
2557 3853 · 2 1094894 + 1 329600 L1158 13<br />
2558 4383 · 2 1094862 + 1 329590 L1792 13<br />
2559 7047 · 2 1094811 + 1 329575 L2107 13<br />
2560 2553 · 2 1094736 + 1 329552 L3262 13<br />
2561 1811 · 2 1094713 + 1 329545 L1204 13<br />
2562 3801 · 2 1094684 + 1 329537 L3477 13<br />
2563 4631 · 2 1094667 + 1 329532 L2626 13<br />
2564 4833 · 2 1094592 + 1 329509 L2626 13<br />
2565 5787 · 2 1094538 + 1 329493 L2520 13<br />
2566 2985 · 2 1094421 + 1 329458 L3467 13<br />
2567 4105 · 2 1094318 + 1 329427 L2826 13<br />
2568 311 · 2 1094135 + 1 329370 L153 10<br />
2569 3171 · 2 1094080 + 1 329355 L3465 13<br />
2570 5457 · 2 1094052 + 1 329347 L3257 13<br />
2571 3039 · 2 1093978 + 1 329324 L1158 13<br />
2572 5289 · 2 1093975 + 1 329324 L3511 13<br />
2573 4149 · 2 1093926 + 1 329309 L2085 13<br />
2574 733 · 2 1093762 + 1 329259 L1885 11<br />
2575 3287 · 2 1093731 + 1 329250 L1546 13<br />
2576 5193 · 2 1093718 + 1 329246 L2085 13<br />
2577 4989 · 2 1093678 + 1 329234 L2520 13<br />
2578 7631 · 2 1093397 + 1 329150 L3262 13<br />
2579 705 · 2 1093359 + 1 329137 L2532 11<br />
2580 1723 · 2 1093224 + 1 329097 L1129 13<br />
2581 7557 · 2 1093187 + 1 329086 L3262 13<br />
2582 4069 · 2 1093101 − 1 329060 L1959 12<br />
2583 449 · 2 1093035 + 1 329039 L2085 11<br />
2584 2189 · 2 1092955 + 1 329016 L1741 13<br />
2585 6837 · 2 1092534 + 1 328890 L3141 13<br />
2586 6343 · 2 1092376 + 1 328842 L1741 13<br />
2587 3335 · 2 1092369 + 1 328840 L2633 13<br />
2588 253 · 2 1092256 + 1 328805 L1446 11<br />
2589 3799 · 2 1092202 + 1 328790 L2085 13<br />
2590 503 · 2 1092022 − 1 328735 L1816 12<br />
2591 1335 · 2 1092015 − 1 328733 L1828 11<br />
2592 4687 · 2 1091954 + 1 328715 L1888 13<br />
2593 6823 · 2 1091800 + 1 328669 L3277 13<br />
2594 4349 · 2 1091639 + 1 328620 L3372 13<br />
2595 6103 · 2 1091626 + 1 328616 L2520 13<br />
2596 651 · 2 1091613 − 1 328612 L1815 12<br />
2597 1661 · 2 1091597 + 1 328607 L3262 13<br />
2598 7337 · 2 1091487 + 1 328575 L3141 13<br />
2599 383 · 2 1091332 − 1 328527 L2235 13<br />
2600 1173 · 2 1091159 − 1 328475 L1828 11<br />
53
ank description digits who year comment<br />
2601 2681 · 2 1091127 + 1 328466 L1531 13<br />
2602 1077 · 2 1091113 − 1 328461 L1828 11<br />
2603 6463 · 2 1091010 + 1 328431 L2626 13<br />
2604 6225 · 2 1091001 + 1 328428 L3510 13<br />
2605 711 · 2 1090974 − 1 328419 L1817 12<br />
2606 2913 · 2 1090941 + 1 328410 L3453 13<br />
2607 813 · 2 1090874 + 1 328389 L1176 11<br />
2608 1353 · 2 1090870 + 1 328388 L3430 13<br />
2609 2365 · 2 1090514 + 1 328281 L3262 13<br />
2610 1941 · 2 1090373 + 1 328239 L1204 13<br />
2611 2145 · 2 1090281 − 1 328211 L1862 11<br />
2612 5503 · 2 1090106 + 1 328159 L3035 13<br />
2613 861 · 2 1089919 − 1 328102 L1815 12<br />
2614 5165 · 2 1089637 + 1 328018 L1752 13<br />
2615 475 · 2 1089627 − 1 328014 L1816 12<br />
2616 1905 · 2 1089609 + 1 328009 L2085 13<br />
2617 853 · 2 1089560 + 1 327994 L2719 11<br />
2618 7385 · 2 1089539 + 1 327988 L2826 13<br />
2619 1595 · 2 1089497 + 1 327975 L3453 13<br />
2620 811 · 2 1089349 − 1 327930 L1817 12<br />
2621 1353 · 2 1089304 + 1 327917 L3438 13<br />
2622 675 · 2 1089273 − 1 327907 L2257 12<br />
2623 7315 · 2 1089268 + 1 327907 L2719 13<br />
2624 87 · 2 1089098 − 1 327854 L121 10<br />
2625 3991 · 2 1089064 + 1 327845 L3171 13<br />
2626 5785 · 2 1089018 + 1 327831 L1741 13<br />
2627 829 · 2 1088963 − 1 327814 L1817 12<br />
2628 4163 · 2 1088845 + 1 327779 L2826 13<br />
2629 2835 · 2 1088812 − 1 327769 L1959 12<br />
2630 3001 · 2 1088788 + 1 327762 L3463 13<br />
2631 5043 · 2 1088729 + 1 327744 L2626 13<br />
2632 4377 · 2 1088683 + 1 327730 L1792 13<br />
2633 3369 · 2 1088630 + 1 327714 L3141 13<br />
2634 4749 · 2 1088625 + 1 327713 L1792 13<br />
2635 1199 · 2 1088471 + 1 327666 L2675 11<br />
2636 5857 · 2 1088386 + 1 327641 L2626 13<br />
2637 693 · 2 1088280 − 1 327608 L1817 12<br />
2638 5233 · 2 1088116 + 1 327560 L1167 13<br />
2639 5835 · 2 1088057 + 1 327542 L3317 13<br />
2640 43 · 2 1087992 + 1 327520 g279 06<br />
2641 7921 · 2 1087884 + 1 327490 L2520 13 Generalized Fermat<br />
2642 1299 · 2 1087823 + 1 327471 L3309 13<br />
2643 6267 · 2 1087651 + 1 327420 L3035 13<br />
2644 5929 · 2 1087546 + 1 327388 L2675 13 Generalized Fermat<br />
2645 7393 · 2 1087518 + 1 327380 L3262 13<br />
2646 2797 · 2 1087354 + 1 327330 L3460 13<br />
2647 4143 · 2 1087276 + 1 327307 L2719 13<br />
2648 93 · 2 1087202 + 1 327283 L669 10 Divides GF (1087199, 12)<br />
2649 1309 · 2 1087166 + 1 327273 L2627 13<br />
2650 5601 · 2 1087020 + 1 327230 L2873 13<br />
54
ank description digits who year comment<br />
2651 3577 · 2 1087018 + 1 327229 L3462 13<br />
2652 6567 · 2 1086947 + 1 327208 L3248 13<br />
2653 6285 · 2 1086895 + 1 327192 L1741 13<br />
2654 170446 · 5 468081 − 1 327180 p280 10<br />
2655 4425 · 2 1086810 + 1 327167 L2826 13<br />
2656 1649 · 2 1086807 + 1 327165 L3262 13<br />
2657 705 · 2 1086798 + 1 327162 L2085 11<br />
2658 6867 · 2 1086772 + 1 327155 L3262 13<br />
2659 4029 · 2 1086759 − 1 327151 L1959 12<br />
2660 7663 · 2 1086754 + 1 327150 L3262 13<br />
2661 7721 · 2 1086727 + 1 327142 L3518 13<br />
2662 7263 · 2 1086712 + 1 327137 L3262 13<br />
2663 7573 · 2 1086634 + 1 327114 L3257 13<br />
2664 4831 · 2 1086532 + 1 327083 L3262 13<br />
2665 4317 · 2 1086375 + 1 327036 L3262 13<br />
2666 6183 · 2 1086354 + 1 327029 L3262 13<br />
2667 6507 · 2 1086328 + 1 327022 L1780 13<br />
2668 7483 · 2 1086238 + 1 326995 L1792 13<br />
2669 7481 · 2 1086127 + 1 326961 L2826 13<br />
2670 5535 · 2 1086103 − 1 326954 L3413 13<br />
2671 253 · 2 1086068 + 1 326942 L1446 11<br />
2672 45 · 2 1086062 + 1 326939 L669 09<br />
2673 975 · 2 1085931 − 1 326901 L2257 12<br />
2674 1603 · 2 1085886 + 1 326888 L334 13<br />
2675 2355 · 2 1085853 − 1 326878 L1959 12<br />
2676 7179 · 2 1085813 + 1 326867 L3262 13<br />
2677 4677 · 2 1085752 + 1 326848 L2826 13<br />
2678 6321 · 2 1085617 + 1 326808 L1741 13<br />
2679 1147 · 2 1085617 − 1 326807 L1828 11<br />
2680 4129 · 2 1085567 − 1 326792 L1959 12<br />
2681 967 · 2 1085534 + 1 326782 L2561 11<br />
2682 7887 · 2 1085443 + 1 326755 L3262 13<br />
2683 2793 · 2 1085305 + 1 326713 L3262 13<br />
2684 1593 · 2 1085125 + 1 326659 L3262 13<br />
2685 157 · 2 1085121 − 1 326657 L1959 11<br />
2686 4789 · 2 1085074 + 1 326644 L1675 13<br />
2687 4417 · 2 1084978 + 1 326615 L3333 13<br />
2688 629 · 2 1084915 + 1 326595 L1223 11<br />
2689 5877 · 2 1084903 + 1 326593 L2626 13<br />
2690 2965 · 2 1084738 + 1 326543 L2167 13<br />
2691 3015 · 2 1084660 + 1 326519 L3097 13<br />
2692 3481 · 2 1084608 + 1 326504 L3452 13 Generalized Fermat<br />
2693 4965 · 2 1084539 + 1 326483 L2085 13<br />
2694 823 · 2 1084526 + 1 326478 L1344 11<br />
2695 412717 · 2 1084409 − 1 326446 L76 04<br />
2696 8635 · 2 1084378 + 1 326435 L2137 13<br />
2697 2923 · 2 1084186 + 1 326376 L2051 13<br />
2698 1029 · 2 1084139 + 1 326362 L2085 11<br />
2699 4501 · 2 1084076 + 1 326344 L1230 13<br />
2700 733 · 2 1084014 + 1 326324 L2718 11<br />
55
ank description digits who year comment<br />
2701 15 · 2 1084010 − 1 326321 L139 06<br />
2702 6957 · 2 1083988 + 1 326317 L1842 13<br />
2703 3741 · 2 1083903 + 1 326291 L1456 13<br />
2704 1919 · 2 1083893 + 1 326288 L2626 13<br />
2705 2985 · 2 1083810 − 1 326263 L1959 12<br />
2706 2719 · 2 1083762 + 1 326249 L3440 13<br />
2707 5979 · 2 1083459 + 1 326158 L3035 13<br />
2708 1187 · 2 1083320 − 1 326115 L1828 11<br />
2709 7557 · 2 1083214 + 1 326084 L2626 13<br />
2710 5535 · 2 1083148 + 1 326064 L2826 13<br />
2711 6555 · 2 1083091 − 1 326047 L2074 13<br />
2712 1563 · 2 1083076 + 1 326042 L1935 13<br />
2713 6175 · 2 1083062 + 1 326038 L2636 13<br />
2714 1645 · 2 1083024 + 1 326026 L3260 13<br />
2715 8931 · 2 1082963 + 1 326009 L2826 13<br />
2716 3455 · 2 1082941 + 1 326002 L1546 13<br />
2717 1155 · 2 1082878 − 1 325982 L1828 11<br />
2718 3937 · 2 1082874 + 1 325982 L1450 13<br />
2719 1095 · 2 1082841 + 1 325971 L1415 11<br />
2720 2223 · 2 1082752 + 1 325945 L3237 13<br />
2721 2103 · 2 1082742 + 1 325942 L1753 13<br />
2722 1311 · 2 1082631 + 1 325908 L2241 13<br />
2723 5799 · 2 1082493 + 1 325867 L1935 13<br />
2724 4467 · 2 1082308 + 1 325811 L1204 13<br />
2725 179 · 2 1082249 + 1 325792 L1446 10<br />
2726 1803 · 2 1082232 + 1 325788 L3186 13<br />
2727 867 · 2 1082206 − 1 325780 L1817 12<br />
2728 5525 · 2 1082135 + 1 325759 L1595 13<br />
2729 2625 · 2 1082117 + 1 325754 L3457 13<br />
2730 849 · 2 1081951 − 1 325703 L1817 12<br />
2731 6779 · 2 1081919 + 1 325694 L1129 13<br />
2732 2381 · 2 1081883 + 1 325683 L2736 13<br />
2733 1625 · 2 1081871 + 1 325679 L1741 13<br />
2734 7179 · 2 1081815 + 1 325663 L1792 13<br />
2735 2981 · 2 1081787 + 1 325654 L3262 13<br />
2736 1695 · 2 1081670 + 1 325619 L527 12<br />
2737 1659 · 2 1081626 + 1 325606 L1204 13<br />
2738 519 · 2 1081499 + 1 325567 L1741 11<br />
2739 5125 · 2 1081264 + 1 325497 L1885 13<br />
2740 5635 · 2 1081206 + 1 325480 L1576 13<br />
2741 4853 · 2 1081141 + 1 325460 L1158 13<br />
2742 7753 · 2 1081080 + 1 325442 L1293 13<br />
2743 7199 · 2 1081047 + 1 325432 L1595 13<br />
2744 3669 · 2 1080930 + 1 325396 L1167 13<br />
2745 675 · 2 1080859 − 1 325374 L2257 12<br />
2746 2545 · 2 1080852 + 1 325373 L3440 13<br />
2747 7259 · 2 1080785 + 1 325353 L3180 13<br />
2748 2745 · 2 1080710 − 1 325330 L2074 11<br />
2749 5355 · 2 1080645 − 1 325311 L3202 12<br />
2750 4781 · 2 1080617 + 1 325302 L1727 13<br />
56
ank description digits who year comment<br />
2751 5445 · 2 1080331 − 1 325216 L3202 12<br />
2752 6555 · 2 1080139 − 1 325159 L3202 12<br />
2753 4027 · 2 1080120 + 1 325153 L3261 13<br />
2754 3411 · 2 1080040 + 1 325128 L2322 13<br />
2755 1837 · 2 1079976 + 1 325109 L2085 13<br />
2756 3637 · 2 1079901 − 1 325087 L2377 13<br />
2757 4405 · 2 1079688 + 1 325023 L1204 13<br />
2758 5361 · 2 1079687 + 1 325022 L2549 13<br />
2759 843 · 2 1079652 + 1 325011 L2683 11<br />
2760 7331 · 2 1079615 + 1 325001 L3171 13<br />
2761 1886 · 67 177962 − 1 324976 p289 12<br />
2762 4079 · 2 1079512 − 1 324970 L1959 12<br />
2763 4025 · 2 1079462 − 1 324955 L1959 12<br />
2764 569 · 2 1079392 − 1 324933 L2255 11<br />
2765 5317 · 2 1079376 + 1 324929 L1312 13<br />
2766 7297 · 2 1079294 + 1 324904 L3141 13<br />
2767 1085 · 2 1079261 + 1 324893 L1415 11<br />
2768 4941 · 2 1079141 + 1 324858 L1204 13<br />
2769 7377 · 2 1079099 + 1 324846 L2809 13<br />
2770 3165 · 2 1079086 + 1 324841 L3453 13<br />
2771 7097 · 2 1078991 + 1 324813 L3262 13<br />
2772 2571 · 2 1078953 + 1 324801 L1300 13<br />
2773 933 · 2 1078926 − 1 324793 L2257 12<br />
2774 4647 · 2 1078904 + 1 324787 L1300 13<br />
2775 1245 · 2 1078901 − 1 324785 L1828 11<br />
2776 5675 · 2 1078801 + 1 324756 L3035 13<br />
2777 957 · 2 1078712 − 1 324728 L1817 12<br />
2778 8743 · 2 1078474 + 1 324657 L3141 13<br />
2779 6559 · 2 1078466 + 1 324655 L2520 13<br />
2780 571 · 2 1078408 + 1 324636 L1415 11<br />
2781 3693 · 2 1078336 + 1 324616 L3262 13<br />
2782 411 · 2 1078339 + 1 324615 L1204 11<br />
2783 5037 · 2 1078314 + 1 324609 L1158 13<br />
2784 3985 · 2 1078200 + 1 324575 L3262 13<br />
2785 5205 · 2 1078176 + 1 324568 L2494 13<br />
2786 99 · 2 1078165 + 1 324563 L669 10<br />
2787 2741 · 2 1078093 + 1 324542 L3305 13<br />
2788 2963 · 2 1078029 + 1 324523 L1406 13<br />
2789 3471 · 2 1078009 + 1 324517 L3035 13<br />
2790 653 · 2 1077990 − 1 324511 L1815 12<br />
2791 7773 · 2 1077885 + 1 324480 L2792 13<br />
2792 8289 · 2 1077769 + 1 324445 L3502 13<br />
2793 103 · 2 1077739 − 1 324434 L621 09<br />
2794 435 · 2 1077677 − 1 324416 L2519 11<br />
2795 747 · 2 1077654 + 1 324410 L1412 11<br />
2796 4743 · 2 1077586 + 1 324390 L1204 13<br />
2797 1925 · 2 1077545 + 1 324377 L2085 13<br />
2798 7729 · 2 1077522 + 1 324371 L1158 13<br />
2799 447 · 2 1077379 + 1 324327 L2522 11<br />
2800 2175 · 2 1077285 − 1 324299 L1862 11<br />
57
ank description digits who year comment<br />
2801 6839 · 2 1077265 + 1 324293 L1158 13<br />
2802 88 · 444 122491 + 1 324283 p355 12<br />
2803 4085 · 2 1077165 + 1 324263 L3049 13<br />
2804 4053 · 2 1077084 − 1 324239 L1959 12<br />
2805 429 · 2 1076923 + 1 324189 L1344 11<br />
2806 3795 · 2 1076800 + 1 324153 L1823 13<br />
2807 5919 · 2 1076743 + 1 324136 L2719 13<br />
2808 1605 · 2 1076736 + 1 324134 L1741 13<br />
2809 5447 · 2 1076683 + 1 324118 L1741 13<br />
2810 4797 · 2 1076584 + 1 324088 L1158 13<br />
2811 8067 · 2 1076571 + 1 324085 L2241 13<br />
2812 4731 · 2 1076503 + 1 324064 L3502 13<br />
2813 4003 · 2 1076499 − 1 324063 L1959 12<br />
2814 2487 · 2 1076486 + 1 324058 L1209 13<br />
2815 273 · 2 1076470 + 1 324053 L1446 11<br />
2816 150847 · 2 1076441 − 1 324047 L73 04<br />
2817 5143 · 2 1076410 + 1 324036 L2912 13<br />
2818 3927 · 2 1076340 + 1 324015 L2873 13<br />
2819 2175 · 2 1076289 − 1 323999 L1862 11<br />
2820 2115 · 2 1076222 + 1 323979 L3461 13<br />
2821 3033 · 2 1076168 + 1 323963 L3490 13<br />
2822 1829 · 2 1076155 + 1 323959 L3278 13<br />
2823 983 · 2 1076124 − 1 323949 L1815 12<br />
2824 8045 · 2 1076077 + 1 323936 L3262 13<br />
2825 1135 · 2 1076065 − 1 323931 L1828 11<br />
2826 6413 · 2 1076061 + 1 323931 L2649 13<br />
2827 247 · 2 1076024 + 1 323918 L1446 11<br />
2828 725 · 2 1076001 + 1 323912 L2702 11<br />
2829 3237 · 2 1075916 + 1 323887 L3453 13<br />
2830 5139 · 2 1075909 + 1 323885 L1204 13<br />
2831 7391 · 2 1075885 + 1 323878 L1595 13<br />
2832 7537 · 2 1075872 + 1 323874 L3262 13<br />
2833 6351 · 2 1075824 + 1 323860 L1741 13<br />
2834 2487 · 2 1075818 + 1 323857 L3303 13<br />
2835 1425 · 2 1075803 − 1 323853 L1134 12<br />
2836 7443 · 2 1075782 + 1 323847 L2241 13<br />
2837 4393 · 2 1075732 + 1 323832 L1675 13<br />
2838 1935 · 2 1075725 + 1 323829 L1741 13<br />
2839 55 · 2 1075711 − 1 323824 L545 08<br />
2840 1851 · 2 1075580 + 1 323786 L1158 13<br />
2841 1299 · 2 1075497 − 1 323760 L1828 11<br />
2842 5041 · 2 1075396 + 1 323731 L1204 13 Generalized Fermat<br />
2843 423 · 2 1075392 + 1 323728 L2085 11<br />
2844 5535 · 2 1075372 + 1 323723 L1204 13<br />
2845 793 · 2 1075356 + 1 323718 L2673 11<br />
2846 5679 · 2 1075342 + 1 323714 L2375 13<br />
2847 3455 · 2 1075303 + 1 323702 L3262 13<br />
2848 4421 · 2 1075133 + 1 323651 L3175 13<br />
2849 73 · 2 1075107 − 1 323642 L1884 10<br />
2850 5853 · 2 1075060 + 1 323630 L1129 13<br />
58
ank description digits who year comment<br />
2851 569 · 2 1075029 + 1 323619 L1360 11<br />
2852 1143 · 2 1074982 + 1 323605 L1204 11<br />
2853 1381 · 2 1074877 − 1 323574 L1828 11<br />
2854 8809 · 2 1074870 + 1 323573 L1158 13<br />
2855 1409 · 2 1074821 + 1 323557 L2826 13<br />
2856 5067 · 2 1074703 + 1 323522 L1158 13<br />
2857 2925 · 2 1074630 − 1 323500 L1959 11<br />
2858 6279 · 2 1074514 + 1 323465 L2826 13<br />
2859 1131 · 2 1074435 + 1 323441 L2744 11<br />
2860 4059 · 2 1074353 + 1 323417 L3505 13<br />
2861 4601 · 2 1074154 − 1 323357 L860 12<br />
2862 7585 · 2 1074148 + 1 323355 L1158 13<br />
2863 603 · 2 1074059 − 1 323327 L3051 12<br />
2864 2105 · 2 1073935 + 1 323290 L3443 13<br />
2865 2475 · 2 1073681 + 1 323214 L1741 13<br />
2866 2605 · 2 1073544 + 1 323173 L3285 13<br />
2867 717 · 2 1073495 + 1 323158 L2659 11<br />
2868 2723 · 2 1073369 + 1 323120 L3448 13<br />
2869 3573 · 2 1073334 + 1 323110 L2736 13<br />
2870 1421 · 2 1073331 + 1 323108 L1204 13<br />
2871 4993 · 2 1073306 + 1 323101 L2826 13<br />
2872 1219 · 2 1073250 + 1 323084 L2826 13<br />
2873 4267 · 2 1073122 + 1 323046 L3035 13<br />
2874 7687 · 2 1073038 + 1 323021 L1203 13<br />
2875 7227 · 2 1072928 + 1 322988 L3514 13<br />
2876 961 · 2 1072768 + 1 322939 L2413 11 Generalized Fermat<br />
2877 2283 · 2 1072710 + 1 322922 L2594 13<br />
2878 7207 · 2 1072658 + 1 322907 L1792 13<br />
2879 7035 · 2 1072638 + 1 322901 L3262 13<br />
2880 1545 · 2 1072569 + 1 322879 L3294 13<br />
2881 5949 · 2 1072505 + 1 322860 L1300 13<br />
2882 2573 · 2 1072457 + 1 322846 L3110 13<br />
2883 1019 · 2 1072448 − 1 322843 L121 10<br />
2884 6549 · 2 1072439 + 1 322841 L2327 13<br />
2885 239 · 2 1072433 + 1 322837 L1446 11<br />
2886 8769 · 2 1072422 + 1 322836 L3260 13<br />
2887 4293 · 2 1072380 + 1 322823 L3500 13<br />
2888 85 · 2 1072368 + 1 322817 g267 06<br />
2889 4113 · 2 1072334 + 1 322809 L3154 13<br />
2890 7127 · 2 1072303 + 1 322800 L3141 13<br />
2891 6151 · 2 1072300 + 1 322799 L1379 13<br />
2892 1307 · 2 1072286 − 1 322794 L1828 11<br />
2893 323 · 2 1072285 + 1 322793 L1204 11<br />
2894 2357 · 2 1072266 − 1 322788 L3489 13<br />
2895 96994 · 5 461748 + 1 322753 p280 10<br />
2896 3995 · 2 1072077 + 1 322731 L3285 13<br />
2897 1371 · 2 1072027 + 1 322716 L3417 13<br />
2898 2427 · 2 1071943 + 1 322691 L1300 13<br />
2899 1609 · 2 1071938 + 1 322689 L3418 13<br />
2900 2405 · 2 1071759 + 1 322635 L3449 13<br />
59
ank description digits who year comment<br />
2901 1357 · 2 1071729 − 1 322626 L1828 11<br />
2902 3843 · 2 1071678 + 1 322611 L2684 13<br />
2903 3469 · 2 1071678 + 1 322611 L1546 13<br />
2904 3537 · 2 1071632 + 1 322597 L2113 13<br />
2905 5045 · 2 1071573 + 1 322580 L1741 13<br />
2906 1335 · 2 1071490 − 1 322554 L1828 11<br />
2907 1307 · 2 1071483 + 1 322552 L1204 13<br />
2908 1755 · 2 1071441 + 1 322540 L1125 13<br />
2909 5549 · 2 1071435 + 1 322538 L2131 13<br />
2910 7683 · 2 1071396 + 1 322527 L3385 13<br />
2911 7841 · 2 1071393 + 1 322526 L1158 13<br />
2912 209826493 · 2 1071303 − 1 322503 L10 04<br />
2913 5709 · 2 1071286 + 1 322493 L1595 13<br />
2914 669 · 2 1071272 − 1 322488 L1817 12<br />
2915 4929 · 2 1071249 + 1 322482 L3141 13<br />
2916 6927 · 2 1071206 + 1 322469 L2327 13<br />
2917 6405 · 2 1071048 + 1 322422 L1204 13<br />
2918 6441 · 2 1071011 + 1 322411 L2322 13<br />
2919 5713 · 2 1070998 + 1 322407 L2809 13<br />
2920 2871 · 2 1070971 + 1 322398 L2564 13<br />
2921 261448 · 5 461217 − 1 322383 p280 10<br />
2922 5535 · 2 1070892 − 1 322375 L3202 12<br />
2923 2077 · 2 1070806 + 1 322349 L3446 13<br />
2924 4335 · 2 1070768 + 1 322337 L1204 13<br />
2925 1335 · 2 1070581 − 1 322281 L1828 11<br />
2926 421 · 2 1070460 + 1 322244 L2890 11<br />
2927 503 · 2 1070448 − 1 322240 L2257 11<br />
2928 63 · 2 1070449 + 1 322240 L669 09<br />
2929 5705 · 2 1070373 + 1 322219 L3049 13<br />
2930 4439 · 2 1070327 + 1 322205 L1741 13<br />
2931 8799 · 2 1070271 + 1 322188 L3430 13<br />
2932 107 · 2 1070256 − 1 322182 L621 08<br />
2933 6789 · 2 1070213 + 1 322171 L2241 13<br />
2934 7809 · 2 1070211 + 1 322170 L1741 13<br />
2935 635 · 2 1070166 − 1 322155 L2257 12<br />
2936 1479 · 2 1070095 + 1 322134 L1130 13<br />
2937 3067 · 2 1070060 + 1 322124 L2964 13<br />
2938 6493 · 2 1070050 + 1 322121 L3430 13<br />
2939 2197 · 2 1070020 + 1 322112 L3171 13<br />
2940 381 · 2 1070022 − 1 322112 L1819 13<br />
2941 3961 · 2 1069988 + 1 322103 L3455 13<br />
2942 3729 · 2 1069978 + 1 322100 L3261 13<br />
2943 250216 · 5 460797 − 1 322089 p284 10<br />
2944 643 · 2 1069859 − 1 322063 L1815 12<br />
2945 7081 · 2 1069684 + 1 322011 L3262 13<br />
2946 2203 · 2 1069647 − 1 322000 L123 06<br />
2947 1555 · 2 1069612 + 1 321989 L3144 13<br />
2948 1347 · 2 1069594 − 1 321984 L1828 11<br />
2949 2577 · 2 1069563 + 1 321974 L3440 13<br />
2950 8909 · 2 1069459 + 1 321944 L1422 13<br />
60
ank description digits who year comment<br />
2951 6577 · 2 1069414 + 1 321930 L1158 13<br />
2952 7497 · 2 1069324 + 1 321903 L3141 13<br />
2953 5167 · 2 1069278 + 1 321889 L2520 13<br />
2954 7445 · 2 1069255 + 1 321882 L2626 13<br />
2955 8811 · 2 1068973 + 1 321797 L2826 13<br />
2956 8403 · 2 1068965 + 1 321795 L2413 13<br />
2957 6247 · 2 1068962 + 1 321794 L1512 13<br />
2958 7929 · 2 1068955 + 1 321792 L3262 13<br />
2959 6105 · 2 1068937 + 1 321786 L2375 13<br />
2960 6555 · 2 1068902 − 1 321776 L3202 12<br />
2961 6149 · 2 1068873 + 1 321767 L2826 13<br />
2962 2409 · 2 1068843 + 1 321758 L2964 13<br />
2963 2097 · 2 1068435 + 1 321635 L1552 13<br />
2964 1023 · 2 1068402 + 1 321625 L1745 11<br />
2965 333 · 2 1068320 + 1 321599 L1547 11<br />
2966 2595 · 2 1068286 + 1 321590 L2618 13<br />
2967 4045 · 2 1068031 − 1 321513 L1959 12<br />
2968 1099 · 2 1067926 + 1 321481 L2419 11<br />
2969 5469 · 2 1067845 + 1 321458 L1158 13<br />
2970 2637 · 2 1067791 + 1 321441 L3309 13<br />
2971 6551 · 2 1067687 + 1 321410 L1300 13<br />
2972 2015 · 2 1067647 + 1 321398 L1990 13<br />
2973 5217 · 2 1067323 + 1 321300 L2070 13<br />
2974 1365 · 2 1067007 − 1 321205 L1828 11<br />
2975 3251 · 2 1066959 + 1 321191 L2919 13<br />
2976 8287 · 2 1066796 + 1 321142 L3262 13<br />
2977 375 · 2 1066662 − 1 321100 L1830 13<br />
2978 4533 · 2 1066560 + 1 321071 L3257 13<br />
2979 871 · 2 1066551 − 1 321067 L565 12<br />
2980 4701 · 2 1066492 + 1 321050 L1158 13<br />
2981 4141 · 2 1066404 + 1 321024 L3497 13<br />
2982 53 · 2 1066381 + 1 321015 L669 09<br />
2983 7353 · 2 1066344 + 1 321006 L3262 13<br />
2984 2153 · 2 1066233 + 1 320972 L3442 13<br />
2985 3667 · 2 1066232 + 1 320972 L2636 13<br />
2986 3755 · 2 1066227 + 1 320970 L2873 13<br />
2987 5427 · 2 1066144 + 1 320946 L2327 13<br />
2988 6641 · 2 1066119 + 1 320938 L3262 13<br />
2989 5607 · 2 1066079 + 1 320926 L3501 13<br />
2990 4119 · 2 1065957 − 1 320889 L1959 12<br />
2991 2399 · 2 1065889 + 1 320868 L1469 13<br />
2992 34 · 1029 106501 + 1 320827 p315 11<br />
2993 133 · 2 1065655 − 1 320797 L632 08<br />
2994 9101981 · 2 1065578 − 1 320778 L1134 11<br />
2995 5667 · 2 1065538 + 1 320763 L2826 13<br />
2996 8589 · 2 1065473 + 1 320744 L1792 13<br />
2997 635 · 2 1065463 + 1 320740 L1513 11<br />
2998 1105 · 2 1065418 + 1 320726 L2538 11<br />
2999 223 · 2 1065400 + 1 320720 L1446 10<br />
3000 5545 · 2 1065320 + 1 320698 L1524 13<br />
61
ank description digits who year comment<br />
3001 6999 · 2 1065254 + 1 320678 L2826 13<br />
3002 1019 · 2 1065255 + 1 320677 L1415 11<br />
3003 175 · 2 1065181 − 1 320654 L1959 11<br />
3004 1873 · 2 1065130 + 1 320640 L2085 13<br />
3005 4011 · 2 1065055 − 1 320618 L1959 12<br />
3006 5415 · 2 1065049 + 1 320616 L2549 13<br />
3007 4697 · 2 1064875 + 1 320563 L1753 13<br />
3008 4123 · 2 1064770 + 1 320532 L1204 13<br />
3009 6163 · 2 1064676 + 1 320504 L3035 13<br />
3010 4137 · 2 1064622 + 1 320487 L2859 13<br />
3011 5409 · 2 1064619 + 1 320486 L1204 13<br />
3012 3669 · 2 1064593 + 1 320478 L3454 13<br />
3013 961 · 2 1064440 + 1 320432 L1303 11 Generalized Fermat<br />
3014 6437 · 2 1064367 + 1 320411 L3141 13<br />
3015 4021 · 2 1064287 − 1 320386 L1959 12<br />
3016 1323 · 2 1064161 + 1 320348 L3415 13<br />
3017 257 · 2 1064062 − 1 320317 L632 08<br />
3018 1179 · 2 1064004 − 1 320301 L1828 11<br />
3019 7527 · 2 1063970 + 1 320291 L3516 13<br />
3020 473 · 2 1063908 − 1 320271 L2255 11<br />
3021 11441 · 60 180105 + 1 320258 p268 12<br />
3022 8475 · 2 1063852 + 1 320256 L1792 13<br />
3023 7845 · 2 1063807 + 1 320242 L3262 13<br />
3024 4671 · 2 1063713 + 1 320214 L1933 13<br />
3025 1845 · 2 1063497 + 1 320148 L1935 13<br />
3026 6975 · 2 1063347 − 1 320104 L2432 12<br />
3027 549 · 2 1063317 − 1 320094 L2255 11<br />
3028 839 · 2 1063280 − 1 320083 L1815 12<br />
3029 5165 · 2 1063249 + 1 320074 L3198 13<br />
3030 2757 · 2 1063147 + 1 320043 L1935 13<br />
3031 1221 · 2 1063076 + 1 320021 L1204 13<br />
3032 4865 · 2 1063003 + 1 320000 L1158 13<br />
3033 5273 · 2 1063001 + 1 319999 L1741 13<br />
3034 523 · 2 1062947 − 1 319982 L2257 11<br />
3035 4875 · 2 1062936 + 1 319980 L3462 13<br />
3036 5863 · 2 1062908 + 1 319971 L2085 13<br />
3037 1127 · 2 1062804 − 1 319939 L1828 11<br />
3038 6081 · 2 1062705 + 1 319910 L1204 13<br />
3039 6 · 10 319889 − 1 319890 p297 10 Near-repdigit<br />
3040 869 · 2 1062609 + 1 319881 L2720 11<br />
3041 8513 · 2 1062601 + 1 319879 L3262 13<br />
3042 1371 · 2 1062571 + 1 319869 L3317 13<br />
3043 2955 · 2 1062549 + 1 319863 L3454 13<br />
3044 7335 · 2 1062523 + 1 319856 L2375 13<br />
3045 2167 · 2 1062468 + 1 319839 L3262 13<br />
3046 559 · 2 1062454 + 1 319834 L1223 11<br />
3047 8323 · 2 1062442 + 1 319831 L2322 13<br />
3048 5709 · 2 1062441 + 1 319831 L1741 13<br />
3049 859 · 2 1062379 − 1 319811 L1815 12<br />
3050 3855 · 2 1062372 + 1 319810 L3262 13<br />
62
ank description digits who year comment<br />
3051 4159 · 2 1062265 − 1 319778 L1959 12<br />
3052 8157 · 2 1062220 + 1 319764 L3262 13<br />
3053 8225 · 2 1062163 + 1 319747 L1792 13<br />
3054 5737 · 2 1062152 + 1 319744 L2826 13<br />
3055 1575 · 2 1061962 + 1 319686 L2070 13<br />
3056 1525 · 2 1061902 + 1 319668 L1204 13<br />
3057 171 · 2 1061853 + 1 319652 L669 10<br />
3058 5415 · 2 1061846 + 1 319652 L1204 13<br />
3059 1235 · 2 1061751 + 1 319622 L1889 13<br />
3060 1469 · 2 1061747 + 1 319621 L1300 13<br />
3061 5217 · 2 1061738 + 1 319619 L3513 13<br />
3062 54321 · 2 1061719 − 1 319615 L637 12<br />
3063 347 · 2 1061675 + 1 319599 L2853 11<br />
3064 1351 · 2 1061672 + 1 319599 L1889 13<br />
3065 675 · 2 1061510 − 1 319550 L1815 12<br />
3066 4633 · 2 1061186 + 1 319453 L2549 13<br />
3067 5289 · 2 1061117 + 1 319432 L1224 13<br />
3068 6545 · 2 1061091 + 1 319425 L2981 13<br />
3069 6775 · 2 1061084 + 1 319422 L1356 13<br />
3070 5701 · 2 1061036 + 1 319408 L1174 13<br />
3071 2543 · 2 1060965 + 1 319386 L3199 13<br />
3072 945 · 2 1060963 − 1 319385 L1816 12<br />
3073 8649 · 2 1060803 + 1 319338 L3249 13<br />
3074 3915 · 2 1060657 + 1 319294 L1204 13<br />
3075 3875 · 2 1060619 + 1 319282 L3451 13<br />
3076 937 · 2 1060546 + 1 319260 L1776 11<br />
3077 6503 · 2 1060513 + 1 319251 L3179 13<br />
3078 6741 · 2 1060467 + 1 319237 L1595 13<br />
3079 5535 · 2 1060390 − 1 319213 L2074 12<br />
3080 5147 · 2 1060303 + 1 319187 L1741 13<br />
3081 4179 · 2 1060109 + 1 319129 L1158 13<br />
3082 217 · 2 1059961 − 1 319083 L639 08<br />
3083 7809 · 2 1059953 + 1 319082 L3262 13<br />
3084 3753 · 2 1059936 + 1 319077 L1931 13<br />
3085 1039 · 2 1059897 − 1 319064 L1828 11<br />
3086 1527 · 2 1059866 + 1 319055 L1204 13<br />
3087 3327 · 2 1059839 + 1 319047 L3450 13<br />
3088 3793 · 2 1059814 + 1 319040 L3446 13<br />
3089 41 · 2 1059562 − 1 318962 L282 09<br />
3090 1641 · 2 1059495 + 1 318943 L2887 13<br />
3091 8265 · 2 1059439 + 1 318927 L1158 13<br />
3092 1017 · 2 1059383 + 1 318910 L2620 11<br />
3093 1125 · 2 1059317 − 1 318890 L1828 11<br />
3094 1983 · 2 1059248 + 1 318869 L1158 13<br />
3095 6513 · 2 1059216 + 1 318860 L1512 13<br />
3096 927 · 2 1059198 + 1 318854 L1820 11<br />
3097 5173 · 2 1059174 + 1 318847 L1792 13<br />
3098 2173 · 2 1059144 + 1 318838 L1531 13<br />
3099 1467 · 2 1059136 + 1 318835 L3317 13<br />
3100 5847 · 2 1059055 + 1 318812 L1741 13<br />
63
ank description digits who year comment<br />
3101 553 · 2 1058992 + 1 318792 L2716 11<br />
3102 3967 · 2 1058886 + 1 318761 L2520 13<br />
3103 7229 · 2 1058835 + 1 318745 L3213 13<br />
3104 6113 · 2 1058825 + 1 318742 L1595 13<br />
3105 6309 · 2 1058631 + 1 318684 L1204 13<br />
3106 5537 · 2 1058615 + 1 318679 L3179 13<br />
3107 1639 · 2 1058414 + 1 318618 L1741 13<br />
3108 907 · 366 124278 − 1 318588 L2054 11<br />
3109 819 · 2 1058286 + 1 318579 L2715 11<br />
3110 4209 · 2 1058143 + 1 318537 L3475 13<br />
3111 1233 · 2 1058123 − 1 318530 L1828 11<br />
3112 5713 · 2 1058082 + 1 318519 L3449 13<br />
3113 4163 · 2 1057885 + 1 318459 L2520 13<br />
3114 6791 · 2 1057877 + 1 318457 L2085 13<br />
3115 6329 · 2 1057845 + 1 318447 L3175 13<br />
3116 161 · 2 1057743 + 1 318415 L669 10<br />
3117 6545 · 2 1057713 + 1 318408 L3457 13<br />
3118 8055 · 2 1057602 + 1 318374 L3262 13<br />
3119 5095 · 2 1057502 + 1 318344 L2100 13<br />
3120 1239 · 2 1057457 + 1 318330 L2981 13<br />
3121 1241 · 2 1057451 + 1 318328 L1935 13<br />
3122 1657 · 2 1057434 + 1 318323 L1158 13<br />
3123 1293 · 2 1057224 + 1 318260 L1158 13<br />
3124 8479 · 2 1057210 + 1 318256 L2719 13<br />
3125 117 · 2 1057032 + 1 318201 L669 09<br />
3126 7239 · 2 1056979 + 1 318187 L2520 13<br />
3127 7529 · 2 1056969 + 1 318184 L2626 13<br />
3128 2871 · 2 1056936 + 1 318173 L1505 13<br />
3129 3129 · 2 1056845 + 1 318146 L2520 13<br />
3130 5733 · 2 1056798 + 1 318132 L1186 13<br />
3131 7513 · 2 1056788 + 1 318129 L2626 13<br />
3132 1443 · 2 1056737 + 1 318113 L1935 13<br />
3133 6483 · 2 1056600 + 1 318073 L3483 13<br />
3134 4955 · 2 1056527 + 1 318051 L1780 13<br />
3135 6883 · 2 1056148 + 1 317937 L3141 13<br />
3136 4967 · 2 1056047 + 1 317906 L3141 13<br />
3137 3883 · 2 1056004 + 1 317893 L1741 13<br />
3138 7115 · 2 1056003 + 1 317893 L3262 13<br />
3139 511 · 2 1055989 − 1 317888 L2255 11<br />
3140 7533 · 2 1055985 + 1 317888 L1595 13<br />
3141 6837 · 2 1055971 + 1 317883 L1512 13<br />
3142 653 · 2 1055929 + 1 317870 L2593 11<br />
3143 1185 · 2 1055908 + 1 317864 L2714 11<br />
3144 7589 · 2 1055759 + 1 317820 L1741 13<br />
3145 415 · 2 1055734 + 1 317811 L2848 11<br />
3146 4177 · 2 1055580 + 1 317765 L1660 13<br />
3147 7057 · 2 1055578 + 1 317765 L3180 13<br />
3148 4043 · 2 1055557 + 1 317758 L3405 13<br />
3149 3651 · 2 1055484 + 1 317736 L2058 13<br />
3150 2825 · 2 1055417 + 1 317716 L3294 13<br />
64
ank description digits who year comment<br />
3151 473 · 2 1055381 + 1 317705 L1341 11<br />
3152 4119 · 2 1055228 − 1 317659 L1959 12<br />
3153 1053 · 2 1055210 − 1 317653 L1828 11<br />
3154 864316301 · 2 1055106 − 1 317628 L426 07<br />
3155 8145 · 2 1055113 + 1 317625 L3262 13<br />
3156 2667 · 2 1055026 + 1 317598 L2976 13<br />
3157 1129 · 2 1055002 + 1 317591 L2713 11<br />
3158 575 · 2 1054995 + 1 317588 L2704 11<br />
3159 6043 · 2 1054918 + 1 317566 L3485 13<br />
3160 833 · 2 1054916 − 1 317565 L1817 12<br />
3161 2881 · 2 1054796 + 1 317529 L1224 13<br />
3162 5513 · 2 1054793 + 1 317529 L3261 13<br />
3163 4719 · 2 1054693 + 1 317498 L3475 13<br />
3164 4579 · 2 1054666 + 1 317490 L1204 13<br />
3165 10963 · 2 1054519 − 1 317446 L2055 11<br />
3166 895 · 2 1054515 − 1 317444 L1815 12<br />
3167 7221 · 2 1054488 + 1 317437 L3378 13<br />
3168 7935 · 2 1054458 + 1 317428 L2530 13<br />
3169 5853 · 2 1054456 + 1 317427 L3430 13<br />
3170 1425 · 2 1054094 − 1 317318 L1134 12<br />
3171 149 · 2 1054092 − 1 317316 L1959 11<br />
3172 5081 · 2 1054075 + 1 317312 L3141 13<br />
3173 3939 · 2 1053871 + 1 317251 L3446 13<br />
3174 8137 · 2 1053764 + 1 317219 L3262 13<br />
3175 3595 · 2 1053646 + 1 317183 L3449 13<br />
3176 3543 · 2 1053641 + 1 317182 L3445 13<br />
3177 5279 · 2 1053639 + 1 317181 L1448 13<br />
3178 4809 · 2 1053619 + 1 317175 L1204 13<br />
3179 7515 · 2 1053579 + 1 317163 L3262 13<br />
3180 8647 · 2 1053506 + 1 317141 L3277 13<br />
3181 6561 · 2 1053481 − 1 317134 L466 11<br />
3182 648 · 43 194123 + 1 317097 p261 10<br />
3183 2007 · 2 1053358 + 1 317096 L1480 13<br />
3184 5903 · 2 1053349 + 1 317094 L3481 13<br />
3185 7961 · 2 1053317 + 1 317084 L3262 13<br />
3186 267 · 2 1053203 + 1 317049 L1446 10<br />
3187 525 · 2 1053162 − 1 317037 L2257 11<br />
3188 4725 · 2 1053124 + 1 317026 L1204 13<br />
3189 6649 · 2 1053098 + 1 317018 L3141 13<br />
3190 8855 · 2 1053069 + 1 317010 L1158 13<br />
3191 6493 · 2 1053042 + 1 317002 L3262 13<br />
3192 5583 · 2 1053009 + 1 316992 L3378 13<br />
3193 7653 · 2 1052985 + 1 316984 L3514 13<br />
3194 705 · 2 1052759 − 1 316915 L2257 12<br />
3195 7331 · 2 1052755 + 1 316915 L3500 13<br />
3196 881 · 2 1052749 + 1 316912 L2413 11<br />
3197 8609 · 2 1052473 + 1 316830 L1158 13<br />
3198 8895 · 2 1052470 + 1 316829 L1158 13<br />
3199 7303 · 2 1052464 + 1 316828 L3430 13<br />
3200 7695 · 2 1052444 + 1 316822 L2859 13<br />
65
ank description digits who year comment<br />
3201 6449 · 2 1052359 + 1 316796 L3261 13<br />
3202 4105 · 2 1052262 + 1 316767 L1204 13<br />
3203 2103 · 2 1052190 + 1 316745 L3127 13<br />
3204 7941 · 2 1051985 + 1 316683 L1174 13<br />
3205 4639 · 2 1051950 + 1 316673 L2327 13<br />
3206 2647 · 2 1051930 + 1 316666 L3439 13<br />
3207 2493 · 2 1051884 + 1 316653 L1546 13<br />
3208 5145 · 2 1051791 + 1 316625 L1935 13<br />
3209 357 · 2 1051783 + 1 316621 L1303 11<br />
3210 3397 · 2 1051562 + 1 316556 L3445 13<br />
3211 511 · 2 1051499 − 1 316536 L2255 11<br />
3212 915 · 2 1051477 + 1 316530 L1224 11<br />
3213 1323 · 2 1051465 + 1 316526 L2549 13<br />
3214 5443 · 2 1051422 + 1 316514 L2085 13<br />
3215 5053 · 2 1051312 + 1 316481 L3294 13<br />
3216 2593 · 2 1051308 + 1 316479 L3262 13<br />
3217 8605 · 2 1051286 + 1 316473 L1303 13<br />
3218 345 · 2 1051282 + 1 316470 L1129 11<br />
3219 8457 · 2 1051215 + 1 316452 L3262 13<br />
3220 6641 · 2 1051207 + 1 316449 L1158 13<br />
3221 8623 · 2 1051112 + 1 316421 L3262 13<br />
3222 7307 · 2 1051111 + 1 316420 L1741 13<br />
3223 9 · 2 1051026 + 1 316392 p156 04 Generalized Fermat<br />
3224 4641 · 2 1051005 + 1 316388 L1675 13<br />
3225 7603 · 2 1050875 − 1 316349 L2377 11<br />
3226 6117 · 2 1050836 + 1 316337 L3378 13<br />
3227 1491 · 2 1050764 + 1 316315 L2826 13 Divides GF (1050763, 10)<br />
3228 1679 · 2 1050575 + 1 316258 L2085 13<br />
3229 2587 · 2 1050536 + 1 316247 L3437 13<br />
3230 7191 · 2 1050516 + 1 316241 L2826 13<br />
3231 2865 · 2 1050462 + 1 316225 L3237 13<br />
3232 3453 · 2 1050393 + 1 316204 L3447 13<br />
3233 2383 · 2 1050354 + 1 316192 L1224 13<br />
3234 1527 · 2 1050335 + 1 316186 L1158 13<br />
3235 4665 · 2 1050332 + 1 316186 L3476 13<br />
3236 7457 · 2 1050119 + 1 316122 L2912 13<br />
3237 7217 · 2 1049947 + 1 316070 L3294 13<br />
3238 1813 · 2 1049920 + 1 316061 L3262 13<br />
3239 7069 · 2 1049854 + 1 316042 L3237 13<br />
3240 6875 · 2 1049833 + 1 316036 L3262 13<br />
3241 9069 · 2 1049686 + 1 315991 L3262 13<br />
3242 293 · 2 1049569 + 1 315955 L1446 10<br />
3243 8465 · 2 1049563 + 1 315954 L1753 13<br />
3244 3395 · 2 1049445 + 1 315918 L1502 13<br />
3245 4797 · 2 1049423 + 1 315912 L2549 13<br />
3246 4079 · 2 1049200 − 1 315845 L1959 12<br />
3247 6221 · 2 1049151 + 1 315830 L3366 13<br />
3248 4935 · 2 1049124 − 1 315822 L2055 11<br />
3249 8073 · 2 1049054 + 1 315801 L3389 13<br />
3250 2611 · 2 1049040 + 1 315796 L1125 13<br />
66
ank description digits who year comment<br />
3251 2039 · 2 1048875 + 1 315747 L1741 13<br />
3252 2073 · 2 1048786 + 1 315720 L3167 13<br />
3253 1979 · 2 1048783 + 1 315719 L2131 13<br />
3254 5565 · 2 1048767 + 1 315715 L1204 13<br />
3255 2679 · 2 1048687 + 1 315690 L3262 13<br />
3256 9755 · 2 1048657 + 1 315682 L2549 13<br />
3257 4019 · 2 1048655 + 1 315681 L1842 13<br />
3258 4821 · 2 1048653 + 1 315680 L2521 13<br />
3259 927 · 2 1048583 + 1 315658 L1935 11<br />
3260 2 1048576 − 2 891232 − 1 315653 p269 11<br />
3261 425 · 2 1048563 + 1 315652 L1776 11<br />
3262 8357 · 2 1048315 + 1 315579 L1300 13<br />
3263 8019 · 2 1048289 + 1 315571 L2085 13<br />
3264 2295 · 2 1048273 + 1 315565 L3386 13<br />
3265 5099 · 2 1048247 + 1 315558 L3262 13<br />
3266 5181 · 2 1047951 + 1 315469 L1502 13<br />
3267 1035 · 2 1047941 − 1 315465 L1828 11<br />
3268 12345 · 2 1047788 − 1 315420 L426 09<br />
3269 6155 · 2 1047677 + 1 315386 L1502 13<br />
3270 4585 · 2 1047662 + 1 315382 L2826 13<br />
3271 106 · 405 120952 + 1 315379 L1471 12<br />
3272 7501 · 2 1047608 + 1 315366 L3173 13<br />
3273 5313 · 2 1047593 + 1 315361 L1745 13<br />
3274 2619 · 2 1047583 + 1 315358 L3385 13<br />
3275 9199 · 2 1047570 + 1 315354 L2543 13<br />
3276 6129 · 2 1047490 + 1 315330 L2659 13<br />
3277 3789 · 2 1047483 + 1 315328 L1741 13<br />
3278 317 · 2 1047471 + 1 315323 L1751 11<br />
3279 6321 · 2 1047419 + 1 315309 L3262 13<br />
3280 954793 · 2 1047382 + 1 315300 g356 10<br />
3281 638289 · 2 1047382 + 1 315300 L74 10<br />
3282 265827 · 2 1047382 + 1 315299 g356 10<br />
3283 993 · 2 1047352 + 1 315288 L1492 11<br />
3284 9639 · 2 1047291 + 1 315270 L2516 13<br />
3285 3735 · 2 1047283 + 1 315268 L1935 13<br />
3286 4725 · 2 1047189 + 1 315239 L2539 13<br />
3287 4867 · 2 1047112 + 1 315216 L2826 13<br />
3288 1293 · 2 1047087 − 1 315208 L1828 11<br />
3289 5307 · 2 1047047 + 1 315197 L2997 13<br />
3290 8961 · 2 1046829 + 1 315131 L3205 13<br />
3291 6313 · 2 1046828 + 1 315131 L2516 13<br />
3292 9405 · 2 1046604 + 1 315064 L2539 13<br />
3293 7445 · 2 1046595 + 1 315061 L3101 13<br />
3294 2045 · 2 1046567 + 1 315052 L1741 13<br />
3295 9733 · 2 1046432 + 1 315012 L3262 13<br />
3296 9387 · 2 1046428 + 1 315011 L2526 13<br />
3297 8457 · 2 1046378 + 1 314996 L2826 13<br />
3298 1859 · 2 1046333 + 1 314981 L3262 13<br />
3299 4895 · 2 1046249 + 1 314957 L3173 13<br />
3300 4571 · 2 1046131 + 1 314921 L2521 13<br />
67
ank description digits who year comment<br />
3301 4123 · 2 1046068 + 1 314902 L3377 13<br />
3302 7401 · 2 1045944 + 1 314865 L2543 13<br />
3303 1221 · 2 1045870 − 1 314842 L1828 11<br />
3304 5859 · 2 1045867 + 1 314842 L1733 13<br />
3305 8909 · 2 1045795 + 1 314820 L3093 13<br />
3306 2879 · 2 1045739 + 1 314803 L3271 13<br />
3307 6671 · 2 1045627 + 1 314769 L2019 13<br />
3308 657 · 2 1045595 + 1 314759 L2528 11<br />
3309 3037 · 2 1045588 + 1 314757 L3173 13<br />
3310 8023 · 2 1045542 + 1 314744 L1204 13<br />
3311 1119 · 2 1045491 − 1 314728 L1828 11<br />
3312 10 314727 − 8 · 10 157363 − 1 314727 p235 13 Near-repdigit, palindrome<br />
3313 1003205 · 10 314705 − 1 314712 L1958 12<br />
3314 3297 · 2 1045346 + 1 314685 L3173 13<br />
3315 9089 · 2 1045319 + 1 314677 L2613 13<br />
3316 1175 · 2 1045302 − 1 314671 L1828 11<br />
3317 98749 · 2 1045226 + 1 314650 L764 10<br />
3318 5025 · 2 1045211 + 1 314644 L1745 13<br />
3319 3937 · 2 1045206 + 1 314642 L1741 13<br />
3320 5271 · 2 1044867 + 1 314541 L3378 13<br />
3321 2283 · 2 1044780 + 1 314514 L3173 13<br />
3322 1791 · 2 1044683 + 1 314485 L3035 13<br />
3323 9525 · 2 1044624 + 1 314468 L1741 13<br />
3324 1965 · 2 1044532 + 1 314439 L2787 13<br />
3325 3633 · 2 1044430 + 1 314409 L337 13<br />
3326 1933 · 2 1044366 + 1 314389 L1204 13<br />
3327 3261 · 2 1044352 + 1 314385 L3179 13<br />
3328 1491 · 2 1044292 + 1 314367 L3262 13<br />
3329 4557 · 2 1044198 + 1 314339 L3376 13<br />
3330 4967 · 2 1044171 + 1 314331 L2826 13<br />
3331 5721 · 2 1044148 + 1 314324 L3173 13<br />
3332 11 · 2 1044086 − 1 314303 L10 05<br />
3333 8759 · 2 1044073 + 1 314302 L1753 13<br />
3334 7687 · 2 1044038 + 1 314291 L3175 13<br />
3335 1405 · 2 1044034 + 1 314289 L1935 13<br />
3336 2269 · 2 1044030 + 1 314288 L3173 13<br />
3337 303 · 2 1044010 + 1 314281 L153 10<br />
3338 6225 · 2 1043892 + 1 314247 L1204 13<br />
3339 9341 · 2 1043717 + 1 314195 L1129 13<br />
3340 5109 · 2 1043699 + 1 314189 L3262 13<br />
3341 9163 · 2 1043608 + 1 314162 L2322 13<br />
3342 711127 · 2 1043594 + 1 314159 L1141 13<br />
3343 288895 · 2 1043595 − 1 314159 L1141 13<br />
3344 429865 · 2 1043594 + 1 314159 L1141 12<br />
3345 12661 · 2 1043596 + 1 314158 L1141 12<br />
3346 9319 · 2 1043562 + 1 314148 L3173 13<br />
3347 3443 · 2 1043489 + 1 314126 L2520 13<br />
3348 8891 · 2 1043485 + 1 314125 L3175 13<br />
3349 6597 · 2 1043454 + 1 314115 L2997 13<br />
3350 2949 · 2 1043227 + 1 314047 L2322 13<br />
68
ank description digits who year comment<br />
3351 629 · 2 1043191 + 1 314035 L1745 11<br />
3352 9809 · 2 1043163 + 1 314028 L2520 13<br />
3353 2973 · 2 1043124 + 1 314016 L2520 13<br />
3354 361 · 2 1043099 − 1 314007 L1819 13<br />
3355 105 · 2 1043063 − 1 313996 L384 09<br />
3356 151515 · 2 1043018 − 1 313985 L426 07<br />
3357 7989 · 2 1042911 + 1 313952 L2520 13<br />
3358 6693 · 2 1042784 + 1 313914 L1204 13<br />
3359 7723 · 2 1042750 + 1 313903 L3309 13<br />
3360 7731 · 2 1042508 + 1 313831 L2826 13<br />
3361 6035 · 2 1042457 + 1 313815 L2967 13<br />
3362 4389 · 2 1042379 + 1 313791 L1745 13<br />
3363 7653 · 2 1042346 + 1 313782 L2967 13<br />
3364 7267 · 2 1042290 + 1 313765 L3035 13<br />
3365 465 · 2 1042293 + 1 313765 L2673 11<br />
3366 9515 · 2 1042257 + 1 313755 L2085 13<br />
3367 9573 · 2 1042202 + 1 313739 L1505 13<br />
3368 1845 · 2 1042137 + 1 313718 L3260 13<br />
3369 7495 · 2 1042104 + 1 313709 L1745 13<br />
3370 6001 · 2 1042048 + 1 313692 L2826 13<br />
3371 3461 · 2 1042041 + 1 313690 L2085 13<br />
3372 7687 · 2 1041996 + 1 313676 L1889 13<br />
3373 615 · 2 1041857 + 1 313633 L1402 11<br />
3374 7161 · 2 1041792 + 1 313615 L2826 13<br />
3375 1589 · 2 1041755 + 1 313603 L2117 13<br />
3376 1851 · 2 1041740 + 1 313599 L1300 13<br />
3377 37714 · 5 448636 + 1 313588 p280 10<br />
3378 7143 · 2 1041686 + 1 313583 L2826 13<br />
3379 1115 · 2 1041684 − 1 313582 L1828 11<br />
3380 3171 · 2 1041656 + 1 313574 L2826 13<br />
3381 281 · 2 1041641 + 1 313568 L1446 10<br />
3382 489 · 2 1041511 − 1 313529 L1827 11<br />
3383 192 · 501 116124 + 1 313519 L1471 12<br />
3384 1109 · 2 1041443 + 1 313509 L2702 11<br />
3385 1057 · 2 1041396 + 1 313495 L2700 11<br />
3386 6507 · 2 1041275 + 1 313459 L3254 13<br />
3387 1049 · 2 1041275 + 1 313459 L1745 11<br />
3388 347 · 2 1041223 + 1 313442 L2550 11<br />
3389 615 · 2 1041203 + 1 313437 L2652 11<br />
3390 2015 · 2 1041139 + 1 313418 L1745 13<br />
3391 1185 · 2 1041045 + 1 313389 L1780 11<br />
3392 1869 · 2 1040941 + 1 313358 L3372 13<br />
3393 4743 · 2 1040893 + 1 313344 L1935 13<br />
3394 3351 · 2 1040832 + 1 313326 L1354 13<br />
3395 2745 · 2 1040743 − 1 313299 L1959 11<br />
3396 593 · 2 1040744 − 1 313298 L1827 11<br />
3397 1077 · 2 1040457 − 1 313212 L1828 11<br />
3398 5593 · 2 1040268 + 1 313156 L3262 13<br />
3399 1081 · 2 1040241 − 1 313147 L1828 11<br />
3400 1521 · 2 1040109 + 1 313108 L1204 13<br />
69
ank description digits who year comment<br />
3401 795 · 2 1040096 + 1 313103 L1204 11<br />
3402 4431 · 2 1040085 + 1 313101 L1204 13<br />
3403 5007 · 2 1040078 + 1 313099 L1204 13<br />
3404 7285 · 2 1040062 + 1 313094 L1741 13<br />
3405 1649 · 2 1040007 + 1 313077 L2826 13<br />
3406 35 · 2 1040005 + 1 313075 g279 06<br />
3407 1895 · 2 1039999 + 1 313075 L1935 13<br />
3408 573 · 2 1039963 − 1 313063 L1827 11<br />
3409 121 · 2 1039965 − 1 313063 L65 04<br />
3410 9427 · 2 1039920 + 1 313052 L3262 13<br />
3411 9819 · 2 1039915 + 1 313050 L1204 13<br />
3412 9997 · 2 1039832 + 1 313025 L1300 13<br />
3413 5643 · 2 1039754 + 1 313001 L2583 13<br />
3414 958 · 11 300544 + 1 312988 p217 08<br />
3415 8721 · 2 1039603 + 1 312956 L2117 13<br />
3416 6439 · 2 1039594 + 1 312953 L1935 13<br />
3417 5175 · 2 1039582 + 1 312950 L1741 13<br />
3418 345 · 2 1039566 + 1 312944 L1209 11<br />
3419 7723 · 2 1039380 + 1 312889 L1204 13<br />
3420 5551 · 2 1039300 + 1 312865 L1741 13<br />
3421 2069 · 2 1039251 + 1 312850 L1204 13<br />
3422 19861029 · 2 1039167 − 1 312828 L895 12<br />
3423 9477 · 2 1039127 + 1 312813 L1741 13<br />
3424 2709 · 2 1039071 + 1 312795 L3368 13<br />
3425 4223 · 2 1039021 + 1 312781 L1741 13<br />
3426 2017 · 2 1038936 + 1 312755 L3262 13<br />
3427 13 · 2 1038896 + 1 312740 g267 04<br />
3428 9175 · 2 1038858 + 1 312732 L2085 13<br />
3429 4269 · 2 1038847 + 1 312728 L1300 13<br />
3430 7077 · 2 1038834 + 1 312725 L1745 13<br />
3431 5833 · 2 1038788 + 1 312711 L2520 13<br />
3432 7317 · 2 1038622 + 1 312661 L3262 13<br />
3433 5005 · 2 1038562 + 1 312643 L1685 13<br />
3434 513 · 2 1038382 − 1 312587 L1827 11<br />
3435 8265 · 2 1038244 + 1 312547 L1745 13<br />
3436 6341 · 2 1038227 + 1 312542 L3366 13<br />
3437 8259 · 2 1038121 + 1 312510 L2117 13<br />
3438 4595 · 2 1038063 + 1 312492 L1741 13<br />
3439 6679 · 2 1038062 + 1 312492 L3367 13<br />
3440 1809 · 2 1037973 + 1 312465 L2734 13<br />
3441 9195 · 2 1037856 + 1 312430 L1204 13<br />
3442 8865 · 2 1037846 + 1 312427 L2322 13<br />
3443 2555 · 2 1037795 + 1 312411 L1745 13<br />
3444 5445 · 2 1037660 − 1 312371 L2055 11<br />
3445 4629 · 2 1037613 + 1 312357 L3262 13<br />
3446 5729 · 2 1037567 + 1 312343 L2887 13<br />
3447 6093 · 2 1037546 + 1 312337 L3171 13<br />
3448 9783 · 2 1037524 + 1 312330 L2826 13<br />
3449 8443 · 2 1037490 + 1 312320 L1935 13<br />
3450 255 · 2 1037444 − 1 312305 L2074 12<br />
70
ank description digits who year comment<br />
3451 4317 · 2 1037422 + 1 312299 L3363 13<br />
3452 8775 · 2 1037344 + 1 312276 L1935 13<br />
3453 3145 · 2 1037194 + 1 312231 L1745 13<br />
3454 9169 · 2 1037138 + 1 312214 L2583 13<br />
3455 627 · 2 1037086 + 1 312197 L1741 11<br />
3456 2023 · 2 1037064 + 1 312191 L1733 13<br />
3457 9365 · 2 1037041 + 1 312185 L1204 13<br />
3458 6821 · 2 1037003 + 1 312173 L2126 13<br />
3459 4107 · 2 1036993 − 1 312170 L1959 12<br />
3460 453 · 2 1036971 − 1 312163 L1827 11<br />
3461 3975 · 2 1036955 + 1 312159 L2071 13<br />
3462 845 · 2 1036957 + 1 312159 L1486 11<br />
3463 165 · 2 1036898 − 1 312140 L2101 11<br />
3464 1575 · 2 1036893 + 1 312140 L3362 13<br />
3465 992 · 10 312136 − 1 312139 p356 13 Near-repdigit<br />
3466 8379 · 2 1036870 + 1 312133 L3361 13<br />
3467 8031 · 2 1036847 + 1 312126 L3261 13<br />
3468 3761 · 2 1036813 + 1 312116 L2967 13<br />
3469 2819 · 2 1036773 + 1 312104 L2520 13<br />
3470 2035 · 2 1036632 + 1 312061 L3262 13<br />
3471 2835 · 2 1036588 − 1 312048 L1959 11<br />
3472 6923 · 2 1036581 + 1 312046 L1745 13<br />
3473 8397 · 2 1036562 + 1 312041 L3317 13<br />
3474 7179 · 2 1036501 + 1 312022 L2826 13<br />
3475 7409 · 2 1036427 + 1 312000 L3173 13<br />
3476 8515 · 2 1036404 + 1 311993 L1741 13<br />
3477 4103 · 2 1036397 + 1 311991 L3171 13<br />
3478 9711 · 2 1036360 + 1 311980 L3311 13<br />
3479 2799 · 2 1036207 + 1 311933 L2627 13<br />
3480 581 · 2 1035962 − 1 311859 L1827 11<br />
3481 8885 · 2 1035911 + 1 311845 L1204 13<br />
3482 5259 · 2 1035589 + 1 311748 L1741 13<br />
3483 3963 · 2 1035566 + 1 311741 L2787 13<br />
3484 4873 · 2 1035526 + 1 311729 L3262 13<br />
3485 4933 · 2 1035502 + 1 311721 L1745 13<br />
3486 7315 · 2 1035462 + 1 311709 L2454 13<br />
3487 4477 · 2 1035364 + 1 311680 L2117 13<br />
3488 4153 · 2 1035292 + 1 311658 L3173 13<br />
3489 1193 · 2 1035269 + 1 311651 L2520 11<br />
3490 8403 · 2 1035252 + 1 311646 L1204 13<br />
3491 519 · 2 1035179 + 1 311623 L1204 11<br />
3492 117 · 2 1035072 + 1 311590 L669 09<br />
3493 6839 · 2 1035063 + 1 311589 L1204 13<br />
3494 4977 · 2 1035048 + 1 311585 L2322 13<br />
3495 2775 · 2 1035040 − 1 311582 L1959 11<br />
3496 4697 · 2 1035031 + 1 311580 L1935 13<br />
3497 8619 · 2 1034987 + 1 311567 L1935 13<br />
3498 7491 · 2 1034985 + 1 311566 L3173 13<br />
3499 2021 · 2 1034947 + 1 311554 L1745 13<br />
3500 8575 · 2 1034892 + 1 311538 L1741 13<br />
71
ank description digits who year comment<br />
3501 2557 · 2 1034850 + 1 311525 L2675 13<br />
3502 5883 · 2 1034846 + 1 311524 L1745 13<br />
3503 7311 · 2 1034823 + 1 311517 L1204 13<br />
3504 8409 · 2 1034805 + 1 311512 L3261 13<br />
3505 3105 · 2 1034782 + 1 311504 L1129 13<br />
3506 783 · 2 1034775 − 1 311502 L1809 12<br />
3507 6123 · 2 1034689 + 1 311477 L1204 13<br />
3508 3705 · 2 1034686 + 1 311476 L2366 13<br />
3509 5327 · 2 1034683 + 1 311475 L1354 13<br />
3510 135 · 2 1034550 + 1 311433 L1446 10<br />
3511 9539 · 2 1034437 + 1 311401 L1502 13 Divides GF (1034434, 10)<br />
3512 1035 · 2 1034236 + 1 311340 L1158 11<br />
3513 8633 · 2 1034105 + 1 311301 L1741 13<br />
3514 5785 · 2 1034078 + 1 311293 L1204 13<br />
3515 85 · 2 1034069 − 1 311288 L323 07<br />
3516 8437 · 2 1034062 + 1 311288 L1204 13<br />
3517 2037 · 2 1033983 + 1 311264 L3356 13<br />
3518 361 · 2 1033973 − 1 311260 L1819 13<br />
3519 9117 · 2 1033952 + 1 311255 L3173 13<br />
3520 10021 · 2 1033905 − 1 311241 L536 11<br />
3521 31333 · 2 1033819 − 1 311216 L282 11<br />
3522 1159 · 2 1033794 + 1 311207 L1204 11<br />
3523 7449 · 2 1033647 + 1 311163 L2520 13<br />
3524 7351 · 2 1033540 + 1 311131 L3353 13<br />
3525 9959 · 2 1033417 + 1 311094 L1745 13<br />
3526 6157 · 2 1033364 + 1 311078 L1741 13<br />
3527 4405 · 2 1033362 + 1 311077 L3352 13<br />
3528 3357 · 2 1033323 + 1 311065 L2659 13<br />
3529 1127 · 2 1033282 − 1 311052 L1828 11<br />
3530 549 · 2 1033187 + 1 311024 L1224 11 Divides GF (1033186, 5)<br />
3531 343 · 2 1033126 + 1 311005 L1446 11<br />
3532 5995 · 2 1033044 + 1 310982 L3173 13<br />
3533 7919 · 2 1032959 + 1 310956 L2826 13<br />
3534 3993 · 2 1032897 + 1 310937 L3219 13<br />
3535 9233 · 2 1032829 + 1 310917 L3173 13<br />
3536 7197 · 2 1032708 + 1 310880 L2520 13<br />
3537 8373 · 2 1032688 + 1 310874 L2997 13<br />
3538 4011 · 2 1032666 − 1 310868 L1959 12<br />
3539 9797 · 2 1032623 + 1 310855 L2793 13<br />
3540 6707 · 2 1032527 + 1 310826 L3358 13<br />
3541 7117 · 2 1032504 + 1 310819 L1204 13<br />
3542 6255 · 2 1032457 + 1 310805 L1269 13<br />
3543 6295 · 2 1032452 + 1 310803 L2783 13<br />
3544 5819 · 2 1032407 + 1 310790 L3262 13<br />
3545 3745 · 2 1032404 + 1 310789 L1745 13<br />
3546 317 · 2 1032378 − 1 310780 L1978 10<br />
3547 2937 · 2 1032314 + 1 310761 L3262 13<br />
3548 8993 · 2 1032189 + 1 310724 L3268 13<br />
3549 7407 · 2 1032180 + 1 310722 L3093 13<br />
3550 4455 · 2 1032146 + 1 310711 L3348 13<br />
72
ank description digits who year comment<br />
3551 8331405 · 2 1032051 − 1 310686 L260 10<br />
3552 3607 · 2 1032046 + 1 310681 L2719 13<br />
3553 4985 · 2 1032021 + 1 310673 L3317 13<br />
3554 181 · 2 1032023 − 1 310673 L323 10<br />
3555 531 · 2 1031987 − 1 310662 L2257 11<br />
3556 3201 · 2 1031944 + 1 310650 L2520 13<br />
3557 9203 · 2 1031917 + 1 310642 L3262 13<br />
3558 4825 · 2 1031816 + 1 310612 L1741 13<br />
3559 7459 · 2 1031770 + 1 310598 L334 13<br />
3560 6025 · 2 1031614 + 1 310551 L3309 13<br />
3561 2669 · 2 1031535 + 1 310527 L1204 13<br />
3562 9987 · 2 1031383 + 1 310482 L2583 13<br />
3563 727 · 2 1031225 − 1 310433 L1809 12<br />
3564 703 · 2 1031219 − 1 310431 L2519 12<br />
3565 1863 · 2 1031161 + 1 310414 L1741 13<br />
3566 1755 · 2 1031100 + 1 310396 L3249 12<br />
3567 7127 · 2 1031059 + 1 310384 L3262 12<br />
3568 3029 · 2 1030719 + 1 310281 L3262 12<br />
3569 7677 · 2 1030506 + 1 310218 L1745 12<br />
3570 8691 · 2 1030332 + 1 310165 L1792 12<br />
3571 2789 · 2 1030209 + 1 310128 L3175 12<br />
3572 1253 · 2 1030090 − 1 310092 L1828 11<br />
3573 3923 · 2 1030001 + 1 310065 L1935 12<br />
3574 1677 · 2 1029848 + 1 310019 L1741 12<br />
3575 725 · 2 1029787 + 1 310000 L2019 11<br />
3576 7513 · 2 1029748 + 1 309989 L3110 12<br />
3577 809 · 2 1029731 + 1 309983 L2721 11<br />
3578 7087 · 2 1029666 + 1 309965 L3004 12<br />
3579 7735 · 2 1029658 + 1 309962 L2322 12<br />
3580 219 · 2 1029643 + 1 309956 L1446 10<br />
3581 5763 · 2 1029594 + 1 309943 L3110 12<br />
3582 6217 · 2 1029476 + 1 309907 L3261 12<br />
3583 9411 · 2 1029315 + 1 309859 L3110 12<br />
3584 6013 · 2 1029212 + 1 309828 L1209 12<br />
3585 1845 · 2 1029174 + 1 309816 L1935 12<br />
3586 1451 · 2 1029163 + 1 309813 L3110 12<br />
3587 3225 · 2 1029157 + 1 309811 L1741 12<br />
3588 3255 · 2 1029112 + 1 309798 L3173 12<br />
3589 7485 · 2 1029058 + 1 309782 L1562 12<br />
3590 555 · 2 1029045 − 1 309777 L2519 11<br />
3591 3615 · 2 1029002 + 1 309765 L2322 12<br />
3592 4667 · 2 1028919 + 1 309740 L2322 12<br />
3593 8167 · 2 1028902 + 1 309735 L2085 12<br />
3594 1257 · 2 1028769 − 1 309694 L1828 11<br />
3595 2949 · 2 1028727 + 1 309682 L2571 12<br />
3596 539 · 2 1028727 + 1 309681 L2698 11<br />
3597 1819 · 2 1028510 + 1 309616 L1980 12<br />
3598 9777 · 2 1028487 + 1 309610 L3207 12<br />
3599 3087 · 2 1028455 + 1 309600 L3311 12<br />
3600 7221 · 2 1028285 + 1 309549 L3324 12<br />
73
ank description digits who year comment<br />
3601 3669 · 2 1028242 + 1 309536 L3185 12<br />
3602 1345 · 2 1028197 − 1 309522 L1828 11<br />
3603 6063 · 2 1028100 + 1 309493 L2322 12<br />
3604 7169 · 2 1028025 + 1 309471 L2131 12<br />
3605 8285 · 2 1028023 + 1 309470 L3035 12<br />
3606 7605 · 2 1027719 − 1 309379 L2074 12<br />
3607 741 · 2 1027639 − 1 309354 L2995 12<br />
3608 2401 · 2 1027632 + 1 309352 L3276 12 Generalized Fermat<br />
3609 51 · 2 1027635 − 1 309351 L260 10<br />
3610 1215 · 2 1027598 − 1 309341 L1828 11<br />
3611 163 · 2 1027592 + 1 309339 L669 10<br />
3612 9021 · 2 1027513 + 1 309317 L2037 12<br />
3613 6627 · 2 1027512 + 1 309316 L3272 12<br />
3614 9669 · 2 1027473 + 1 309305 L1620 12<br />
3615 3081 · 2 1027253 + 1 309238 L1204 12<br />
3616 9525 · 2 1027203 + 1 309223 L1741 12<br />
3617 2699 · 2 1027195 + 1 309220 L2085 12<br />
3618 2993 · 2 1027189 + 1 309219 L3141 12<br />
3619 7227 · 2 1027151 + 1 309208 L1972 12<br />
3620 133 · 2 1027150 + 1 309206 L669 09<br />
3621 3155 · 2 1027123 + 1 309199 L3004 12<br />
3622 3841 · 2 1027108 + 1 309194 L3311 12<br />
3623 6729 · 2 1027090 + 1 309189 L3110 12<br />
3624 4715 · 2 1027055 + 1 309179 L3141 12<br />
3625 2927 · 2 1027047 + 1 309176 L1792 12<br />
3626 2955 · 2 1027046 + 1 309176 L3110 12<br />
3627 4455 · 2 1027041 + 1 309174 L1408 12<br />
3628 9009 · 2 1027019 + 1 309168 L2520 12<br />
3629 8949 · 2 1026971 + 1 309154 L1935 12<br />
3630 9569 · 2 1026913 + 1 309136 L3141 12<br />
3631 51 · 2 1026910 − 1 309133 L260 10<br />
3632 217 · 2 1026869 − 1 309121 L632 08<br />
3633 7225 · 2 1026844 + 1 309115 L2085 12 Generalized Fermat<br />
3634 8913 · 2 1026750 + 1 309087 L1204 12<br />
3635 6633 · 2 1026693 + 1 309070 L3110 12<br />
3636 8211 · 2 1026685 + 1 309067 L3310 12<br />
3637 2981 · 2 1026677 + 1 309065 L3276 12<br />
3638 3045 · 2 1026607 + 1 309043 L2085 12<br />
3639 8883 · 2 1026548 + 1 309026 L3221 12<br />
3640 91 · 2 1026521 − 1 309016 L323 08<br />
3641 3529 · 2 1026266 + 1 308941 L3309 12<br />
3642 1321 · 2 1026255 − 1 308937 L1828 11<br />
3643 2025 · 2 1026221 + 1 308927 L1741 12<br />
3644 3791 · 2 1026179 + 1 308915 L1745 12<br />
3645 3839 · 2 1026005 + 1 308862 L1204 12<br />
3646 4349 · 2 1025961 + 1 308849 L3315 12<br />
3647 47 · 2 1025950 − 1 308844 L2074 11<br />
3648 1001 · 2 1025929 + 1 308839 L1223 11<br />
3649 1321 · 2 1025815 − 1 308805 L1828 11<br />
3650 6259 · 2 1025798 + 1 308800 L1980 12<br />
74
ank description digits who year comment<br />
3651 1517 · 2 1025791 + 1 308798 L3085 12<br />
3652 4809 · 2 1025750 + 1 308786 L3110 12<br />
3653 7495 · 2 1025638 + 1 308752 L2826 12<br />
3654 8663 · 2 1025621 + 1 308747 L3173 12<br />
3655 221 · 2 1025619 + 1 308745 L1446 10<br />
3656 31838235 · 2 1025596 + 1 308743 p190 06<br />
3657 5187 · 2 1025570 + 1 308732 L3221 12<br />
3658 1017 · 2 1025572 + 1 308731 L2593 11<br />
3659 3285 · 2 1025526 + 1 308718 L1204 12<br />
3660 4257 · 2 1025471 + 1 308702 L3159 12<br />
3661 411 · 2 1025451 − 1 308695 L1827 11<br />
3662 1687 · 2 1025428 + 1 308688 L3198 12<br />
3663 4877 · 2 1025395 + 1 308679 L1595 12<br />
3664 5817 · 2 1025392 + 1 308678 L3205 12<br />
3665 4263 · 2 1025289 + 1 308647 L1935 12<br />
3666 6219 · 2 1025235 + 1 308631 L2826 12<br />
3667 8135 · 2 1025159 + 1 308608 L1300 12<br />
3668 5173 · 2 1025102 + 1 308591 L1935 12<br />
3669 6727 · 2 1025072 + 1 308582 L1204 12<br />
3670 407 · 2 1025072 − 1 308581 L1827 11<br />
3671 3087 · 2 1025050 + 1 308575 L1595 12<br />
3672 7689 · 2 1024946 + 1 308544 L2549 12<br />
3673 6801 · 2 1024705 + 1 308471 L1562 12<br />
3674 4135 · 2 1024697 − 1 308469 L1959 12<br />
3675 8817 · 2 1024662 + 1 308458 L2912 12<br />
3676 9179 · 2 1024649 + 1 308455 L2790 12<br />
3677 2077 · 2 1024582 + 1 308434 L1745 12<br />
3678 8161 · 2 1024432 + 1 308389 L1595 12<br />
3679 117 · 2 1024380 + 1 308372 L669 09<br />
3680 1341 · 2 1024352 + 1 308364 L1300 12<br />
3681 9261 · 2 1024223 + 1 308326 L3105 12<br />
3682 305 · 2 1024223 + 1 308325 L1751 11<br />
3683 4287 · 2 1024154 + 1 308305 L1842 12<br />
3684 1729 · 2 1024146 + 1 308302 L2520 12<br />
3685 6499 · 2 1024098 + 1 308289 L1204 12<br />
3686 978847155 · 2 1024053 − 1 308280 L58 12<br />
3687 8967 · 2 1024050 + 1 308274 L3312 12<br />
3688 9493 · 2 1024040 + 1 308271 L1745 12<br />
3689 7905 · 2 1024025 + 1 308267 L2038 12<br />
3690 7245 · 2 1023857 + 1 308216 L3317 12<br />
3691 4511 · 2 1023849 + 1 308213 L1620 12<br />
3692 823 · 2 1023818 + 1 308203 L1330 11<br />
3693 9785 · 2 1023775 + 1 308191 L2967 12<br />
3694 4021 · 2 1023743 − 1 308181 L1959 12<br />
3695 4113 · 2 1023694 + 1 308167 L1125 12<br />
3696 437 · 2 1023678 − 1 308161 L1827 11<br />
3697 3507 · 2 1023638 + 1 308150 L3166 12<br />
3698 5137 · 2 1023518 + 1 308114 L1356 12<br />
3699 7845 · 2 1023501 + 1 308109 L2037 12<br />
3700 3433 · 2 1023470 + 1 308099 L3035 12<br />
75
ank description digits who year comment<br />
3701 7693 · 2 1023438 + 1 308090 L2169 12<br />
3702 2419 · 2 1023346 + 1 308062 L1204 12<br />
3703 2981 · 2 1023323 + 1 308055 L2826 12<br />
3704 1383 · 2 1023308 − 1 308050 L1828 11<br />
3705 1017 · 2 1023237 − 1 308029 L1828 11<br />
3706 1455 · 2 1023228 − 1 308026 L1134 11<br />
3707 471 · 2 1023095 + 1 307985 L1330 11<br />
3708 1287 · 2 1022990 + 1 307954 L1204 12<br />
3709 6311 · 2 1022921 + 1 307934 L3110 12<br />
3710 4185 · 2 1022913 − 1 307932 L1959 12<br />
3711 2163 · 2 1022870 + 1 307918 L3113 12<br />
3712 3717 · 2 1022839 + 1 307909 L2826 12<br />
3713 8291 · 2 1022811 + 1 307901 L3308 12<br />
3714 431 · 2 1022695 + 1 307865 L2502 11<br />
3715 3563 · 2 1022681 + 1 307862 L1562 12<br />
3716 4171 · 2 1022647 − 1 307852 L1959 12<br />
3717 175 · 2 1022634 + 1 307846 L669 09<br />
3718 2271 · 2 1022559 + 1 307825 L3110 12<br />
3719 5631 · 2 1022472 + 1 307799 L1741 12<br />
3720 8455 · 2 1022426 + 1 307785 L2085 12<br />
3721 5925 · 2 1022202 + 1 307718 L3308 12<br />
3722 4965 · 2 1022194 + 1 307715 L1204 12<br />
3723 21 · 2 1022168 + 1 307705 g279 04<br />
3724 605 · 2 1022087 + 1 307682 L1158 11<br />
3725 1575 · 2 1022070 + 1 307677 L3110 12<br />
3726 5487 · 2 1022063 + 1 307676 L1745 12<br />
3727 7995 · 2 1021987 + 1 307653 L3110 12<br />
3728 2591 · 2 1021761 + 1 307585 L3286 12<br />
3729 1681 · 2 1021712 + 1 307570 L2790 12 Generalized Fermat<br />
3730 441 · 2 1021669 − 1 307556 L1827 11<br />
3731 9651 · 2 1021660 + 1 307555 L3206 12<br />
3732 3049 · 2 1021646 + 1 307550 L3141 12<br />
3733 3459 · 2 1021622 + 1 307543 L3306 12<br />
3734 9235 · 2 1021504 + 1 307508 L1478 12<br />
3735 549 · 2 1021391 − 1 307473 L1827 11<br />
3736 1857 · 2 1021326 + 1 307454 L2037 12<br />
3737 6015 · 2 1021304 + 1 307447 L3286 12<br />
3738 5119 · 2 1021234 + 1 307426 L2922 12<br />
3739 9223 · 2 1021224 + 1 307424 L2085 12<br />
3740 8199 · 2 1021218 + 1 307422 L2117 12<br />
3741 6251 · 2 1021215 + 1 307421 L1595 12<br />
3742 5367 · 2 1021144 + 1 307399 L1484 12<br />
3743 6839 · 2 1020925 + 1 307333 L3304 12<br />
3744 3765 · 2 1020925 + 1 307333 L3110 12<br />
3745 3297 · 2 1020910 + 1 307329 L2826 12<br />
3746 6627 · 2 1020826 + 1 307304 L1224 12<br />
3747 343 · 2 1020791 − 1 307292 L1809 12<br />
3748 8099 · 2 1020713 + 1 307270 L2085 12<br />
3749 6187 · 2 1020710 + 1 307269 L2922 12<br />
3750 5961 · 2 1020671 + 1 307257 L2117 12<br />
76
ank description digits who year comment<br />
3751 3299 · 2 1020651 + 1 307251 L2922 12<br />
3752 2437 · 2 1020644 + 1 307248 L2922 12<br />
3753 7247 · 2 1020603 + 1 307236 L3307 12<br />
3754 1341 · 2 1020441 + 1 307187 L3221 12<br />
3755 5411 · 2 1020421 + 1 307182 L2922 12<br />
3756 5219 · 2 1020363 + 1 307164 L1860 12<br />
3757 48594 65536 + 1 307140 g141 00 Generalized Fermat<br />
3758 8499 · 2 1020239 + 1 307127 L3221 12<br />
3759 5131 · 2 1020216 + 1 307120 L3110 12<br />
3760 5579 · 2 1020139 + 1 307097 L1792 12<br />
3761 863 · 2 1020077 + 1 307077 L1300 11<br />
3762 8653 · 2 1019982 + 1 307050 L1741 12<br />
3763 1323 · 2 1019980 + 1 307048 L2967 12<br />
3764 7819 · 2 1019954 + 1 307041 L3110 12<br />
3765 3099 · 2 1019923 + 1 307031 L1745 12<br />
3766 205 · 2 1019679 − 1 306957 L632 08<br />
3767 5207 · 2 1019567 + 1 306924 L1204 12<br />
3768 1555 · 2 1019526 + 1 306912 L2922 12<br />
3769 6783 · 2 1019449 + 1 306889 L3262 12<br />
3770 7861 · 2 1019436 + 1 306885 L3303 12<br />
3771 5337 · 2 1019426 + 1 306882 L2187 12<br />
3772 5073 · 2 1019380 + 1 306868 L2085 12<br />
3773 6427 · 2 1019360 + 1 306862 L2946 12<br />
3774 6255 · 2 1019335 + 1 306855 L3282 12<br />
3775 6449 · 2 1019325 + 1 306852 L2100 12<br />
3776 8615 · 2 1019175 + 1 306807 L2549 12<br />
3777 329 · 2 1019093 + 1 306781 L1956 11<br />
3778 2279 · 2 1019029 + 1 306762 L3262 12<br />
3779 2745 · 2 1019018 − 1 306759 L1959 11<br />
3780 357 · 2 1019004 − 1 306754 p291 10<br />
3781 2871 · 2 1019000 + 1 306754 L2922 12<br />
3782 3405 · 2 1018995 + 1 306752 L3299 12<br />
3783 641 · 2 1018986 − 1 306749 L1809 12<br />
3784 7865 · 2 1018981 + 1 306748 L2922 12<br />
3785 2857 · 2 1018960 + 1 306741 L3014 12<br />
3786 1345 · 2 1018956 + 1 306740 L2922 12<br />
3787 1227 · 2 1018955 + 1 306740 L2922 12<br />
3788 9779 · 2 1018897 + 1 306723 L2594 12<br />
3789 1151 · 2 1018847 + 1 306707 L2375 11<br />
3790 41 · 2 1018778 − 1 306685 L282 09<br />
3791 7695 · 2 1018753 + 1 306680 L1745 12<br />
3792 4077 · 2 1018708 − 1 306666 L1959 12<br />
3793 727 · 2 1018709 − 1 306665 L1809 12<br />
3794 3063 · 2 1018660 + 1 306651 L2322 12<br />
3795 90 · 588 110728 + 1 306650 p268 11<br />
3796 9059 · 2 1018577 + 1 306627 L3110 12<br />
3797 2215 · 2 1018472 + 1 306594 L2521 12<br />
3798 5617 · 2 1018442 + 1 306586 L2922 12<br />
3799 5617 · 2 1018346 + 1 306557 L3314 12<br />
3800 9555 · 2 1018312 + 1 306547 L3262 12<br />
77
ank description digits who year comment<br />
3801 4349 · 2 1018305 + 1 306544 L2922 12<br />
3802 5841 · 2 1018167 + 1 306503 L1745 12<br />
3803 2127 · 2 1018006 + 1 306454 L3298 12<br />
3804 2681 · 2 1017995 + 1 306451 L3297 12<br />
3805 9003 · 2 1017814 + 1 306397 L3110 12<br />
3806 7035 · 2 1017807 + 1 306395 L3262 12<br />
3807 1217 · 2 1017754 − 1 306378 L1828 11<br />
3808 829 · 2 1017747 − 1 306376 L1817 12<br />
3809 6467 · 2 1017679 + 1 306356 L3278 12<br />
3810 5125 · 2 1017656 + 1 306349 L2790 12<br />
3811 882 · 10 306343 − 1 306346 L1958 12<br />
3812 6671 · 2 1017527 + 1 306310 L2736 12<br />
3813 4281 · 2 1017443 + 1 306285 L329 12<br />
3814 5545 · 2 1017434 + 1 306282 L3320 12<br />
3815 5051 · 2 1017423 + 1 306279 L1823 12<br />
3816 2765 · 2 1017409 + 1 306275 L3262 12<br />
3817 9939 · 2 1017335 + 1 306253 L3305 12<br />
3818 471 · 2 1017306 − 1 306243 L1827 11<br />
3819 875 · 2 1017103 + 1 306182 L1758 11<br />
3820 4039 · 2 1017027 − 1 306160 L1959 12<br />
3821 2265 · 2 1016996 + 1 306150 L2122 12<br />
3822 425 · 2 1016928 − 1 306129 L2519 11<br />
3823 4091 · 2 1016874 − 1 306114 L1959 12<br />
3824 3191 · 2 1016867 + 1 306111 L3293 12<br />
3825 7871 · 2 1016727 + 1 306070 L1741 12<br />
3826 5583 · 2 1016620 + 1 306037 L2612 12<br />
3827 139 · 2 1016619 − 1 306035 L323 10<br />
3828 151 · 2 1016600 + 1 306030 L669 10 Divides GF (1016599, 5)<br />
3829 5475 · 2 1016560 + 1 306019 L1415 12<br />
3830 2775 · 2 1016504 − 1 306002 L1959 11<br />
3831 1085 · 2 1016477 + 1 305994 L1486 11<br />
3832 7605 · 2 1016474 − 1 305994 L2074 12<br />
3833 585 · 2 1016441 − 1 305982 L2519 11<br />
3834 1491 · 2 1016199 + 1 305910 L2058 12<br />
3835 1999 · 2 1016098 + 1 305880 L3185 12<br />
3836 1025 · 2 1016086 − 1 305876 L1828 11<br />
3837 385 · 2 1016080 + 1 305874 L1486 11<br />
3838 5407 · 2 1016022 + 1 305857 L3294 12<br />
3839 9671 · 2 1016011 + 1 305854 L3262 12<br />
3840 1253 · 2 1015966 − 1 305840 L1828 11<br />
3841 8595 · 2 1015898 + 1 305820 L3292 12<br />
3842 3063 · 2 1015794 + 1 305788 L3302 12<br />
3843 1119 · 2 1015731 − 1 305769 L1828 11<br />
3844 219 · 2 1015602 + 1 305730 L1446 10<br />
3845 4193 · 2 1015596 − 1 305729 L1959 12<br />
3846 3713 · 2 1015589 + 1 305727 L1745 12<br />
3847 6777 · 2 1015567 + 1 305720 L3288 12<br />
3848 3665 · 2 1015561 + 1 305718 L3012 12<br />
3849 3575 · 2 1015495 + 1 305699 L2080 12<br />
3850 6433 · 2 1015456 + 1 305687 L3289 12<br />
78
ank description digits who year comment<br />
3851 4081 · 2 1015419 − 1 305676 L1959 12<br />
3852 6881 · 2 1015377 + 1 305663 L1484 12<br />
3853 4533 · 2 1015273 + 1 305632 L3286 12<br />
3854 3133 · 2 1015072 + 1 305571 L2549 12<br />
3855 8817 · 2 1015023 + 1 305557 L2922 12<br />
3856 8853 · 2 1015012 + 1 305554 L1204 12<br />
3857 2113 · 2 1014875 − 1 305512 L2484 13<br />
3858 9037 · 2 1014814 + 1 305494 L3285 12<br />
3859 5003 · 2 1014721 + 1 305466 L2125 12<br />
3860 6171 · 2 1014705 + 1 305461 L3282 12<br />
3861 8909 · 2 1014633 + 1 305439 L2919 12<br />
3862 6609 · 2 1014602 + 1 305430 L3301 12<br />
3863 2565 · 2 1014584 − 1 305424 L1959 11<br />
3864 189 · 2 1014433 + 1 305378 L669 10<br />
3865 5635 · 2 1014358 + 1 305356 L2922 12<br />
3866 3483 · 2 1014265 + 1 305328 L1505 12<br />
3867 2473 · 2 1014208 + 1 305311 L1595 12<br />
3868 166585 · 68 166585 − 1 305274 p357 13 Generalized Woodall<br />
3869 812 · 10 305256 − 1 305259 L1958 12<br />
3870 9715 · 2 1013998 + 1 305248 L3284 12<br />
3871 3033 · 2 1013936 + 1 305229 L3296 12<br />
3872 4257 · 2 1013918 + 1 305224 L2998 12<br />
3873 691 · 2 1013875 − 1 305210 L1809 12<br />
3874 65567 · 2 1013803 + 1 305190 SB2 02<br />
3875 6193 · 2 1013752 + 1 305174 L1492 12<br />
3876 8857 · 2 1013732 + 1 305168 L328 12<br />
3877 7179 · 2 1013673 + 1 305150 L3286 12<br />
3878 407 · 2 1013603 + 1 305128 L1224 11<br />
3879 669 · 2 1013592 − 1 305125 L1809 12<br />
3880 5793 · 2 1013586 + 1 305124 L3262 12<br />
3881 8529 · 2 1013535 + 1 305109 L3286 12<br />
3882 4895 · 2 1013513 + 1 305102 L1404 12<br />
3883 3483 · 2 1013510 + 1 305101 L3281 12<br />
3884 7809 · 2 1013277 + 1 305031 L3282 12<br />
3885 2025 · 2 1013272 + 1 305029 L1158 12 Generalized Fermat<br />
3886 6105 · 2 1013207 + 1 305010 L1562 12<br />
3887 8827 · 2 1013136 + 1 304989 L3283 12<br />
3888 7261 · 2 1013136 + 1 304989 L3280 12<br />
3889 6415 · 2 1013118 + 1 304983 L3279 12<br />
3890 6999 · 2 1013045 + 1 304961 L2914 12<br />
3891 139948 · 151 139948 + 1 304949 g407 10 Generalized Cullen<br />
3892 947 · 2 1012854 − 1 304903 L1809 12<br />
3893 6657 · 2 1012706 + 1 304859 L1204 12<br />
3894 7063 · 2 1012652 + 1 304843 L3291 12<br />
3895 997 · 2 1012580 + 1 304820 L1733 11<br />
3896 6119 · 2 1012493 + 1 304795 L2125 12<br />
3897 3883 · 2 1012386 + 1 304763 L1440 12<br />
3898 469 · 2 1012299 − 1 304736 L1827 11<br />
3899 2703 · 2 1012225 + 1 304714 L3290 12<br />
3900 8277 · 2 1012130 + 1 304686 L3278 12<br />
79
ank description digits who year comment<br />
3901 4091 · 2 1012110 − 1 304680 L1959 12<br />
3902 309 · 2 1012107 + 1 304678 L153 10<br />
3903 9669 · 2 1012041 + 1 304659 L1741 12<br />
3904 7599 · 2 1011975 + 1 304639 L2974 12<br />
3905 7369 · 2 1011954 + 1 304633 L1158 12<br />
3906 3459 · 2 1011923 + 1 304623 L2549 12<br />
3907 4179 · 2 1011862 + 1 304605 L2454 12<br />
3908 9171 · 2 1011844 + 1 304600 L2626 12<br />
3909 6189 · 2 1011790 + 1 304583 L2322 12<br />
3910 1151 · 2 1011729 + 1 304564 L1224 11<br />
3911 2625 · 2 1011681 + 1 304550 L2085 12<br />
3912 513 · 2 1011678 − 1 304549 L1827 11<br />
3913 2025 · 2 1011577 + 1 304519 L3262 12<br />
3914 2715 · 2 1011505 + 1 304497 L3300 12<br />
3915 6119 · 2 1011416 − 1 304471 L251 07<br />
3916 8711 · 2 1011329 + 1 304445 L3035 12<br />
3917 4603 · 2 1011304 + 1 304437 L3262 12<br />
3918 2271 · 2 1011288 + 1 304432 L3110 12<br />
3919 6813 · 2 1011250 + 1 304421 L2125 12<br />
3920 1241 · 2 1011237 + 1 304416 L1745 12<br />
3921 285 · 2 1011134 − 1 304385 L2338 11<br />
3922 269 · 2 1011107 + 1 304376 L1446 10<br />
3923 109 · 2 1011102 + 1 304375 g423 09<br />
3924 1271 · 2 1011049 + 1 304360 L3110 12<br />
3925 8451 · 2 1011028 + 1 304354 L2085 12<br />
3926 2937 · 2 1011015 + 1 304350 L1480 12<br />
3927 1491 · 2 1010981 + 1 304339 L2659 12<br />
3928 8469 · 2 1010933 + 1 304326 L3277 12<br />
3929 4049 · 2 1010903 + 1 304316 L3035 12<br />
3930 7701 · 2 1010864 + 1 304305 L2085 12<br />
3931 1291 · 2 1010863 − 1 304304 L1828 11<br />
3932 1431 · 2 1010832 + 1 304294 L3318 12<br />
3933 5485 · 2 1010826 + 1 304293 L3110 12<br />
3934 2963 · 2 1010741 + 1 304267 L1204 12<br />
3935 5877 · 2 1010720 + 1 304261 L3262 12<br />
3936 351 · 2 1010661 + 1 304242 L2246 11<br />
3937 6603 · 2 1010624 + 1 304232 L3141 12<br />
3938 1841 · 2 1010567 + 1 304215 L3262 12<br />
3939 899 · 2 1010544 − 1 304208 L1809 12<br />
3940 9387 · 2 1010460 + 1 304183 L2643 12<br />
3941 3535 · 2 1010442 + 1 304177 L1204 12<br />
3942 667 · 2 1010424 + 1 304171 L1462 11<br />
3943 811 · 2 1010419 − 1 304170 L2995 12<br />
3944 345 · 2 1010394 + 1 304162 L1224 11<br />
3945 4579 · 2 1010314 + 1 304139 L2794 12<br />
3946 4053 · 2 1010296 + 1 304134 L3110 12<br />
3947 9071 · 2 1010273 + 1 304127 L3110 12<br />
3948 9 · 2 1010277 − 1 304125 L80 07<br />
3949 1129 · 2 1010266 + 1 304124 L1224 11<br />
3950 9457 · 2 1010214 + 1 304109 L3035 12<br />
80
ank description digits who year comment<br />
3951 4015 · 2 1010210 + 1 304108 L3110 12<br />
3952 2651 · 2 1010205 + 1 304106 L3141 12<br />
3953 6249 · 2 1010203 + 1 304106 L1204 12<br />
3954 935 · 2 1010191 + 1 304101 L1167 11<br />
3955 165 · 2 1010133 + 1 304083 g196 07<br />
3956 3337 · 2 1010080 + 1 304068 L3205 12<br />
3957 3927 · 2 1010026 + 1 304052 L3295 12<br />
3958 [ Long prime 3958 ] 304031 p269 10 Generalized Fermat<br />
3959 7435 · 2 1009862 + 1 304003 L3014 12<br />
3960 8751 · 2 1009813 + 1 303988 L3262 12<br />
3961 2533 · 2 1009786 + 1 303980 L2117 12<br />
3962 2755 · 2 1009670 + 1 303945 L2855 12<br />
3963 7689 · 2 1009643 + 1 303937 L1846 12<br />
3964 905 · 2 1009613 + 1 303927 L2071 11<br />
3965 1305 · 2 1009610 + 1 303927 L3237 12<br />
3966 2435 · 2 1009565 + 1 303913 L1685 12<br />
3967 931 · 2 1009552 + 1 303909 L2071 11<br />
3968 6467 · 2 1009519 + 1 303900 L3141 12<br />
3969 281 · 2 1009502 − 1 303893 L282 10<br />
3970 735 · 2 1009476 + 1 303886 L2071 11<br />
3971 1281 · 2 1009377 − 1 303856 L1828 11<br />
3972 4541 · 2 1009327 + 1 303842 L2790 12<br />
3973 8551 · 2 1009272 + 1 303826 L3267 12<br />
3974 663 · 2 1009098 − 1 303772 L1809 12<br />
3975 5349 · 2 1009001 + 1 303744 L1741 12<br />
3976 1203 · 2 1008782 − 1 303677 L1828 11<br />
3977 3627 · 2 1008724 + 1 303660 L3249 12<br />
3978 9275 · 2 1008571 + 1 303615 L3262 12<br />
3979 695 · 2 1008532 − 1 303602 L1809 12<br />
3980 8235 · 2 1008473 + 1 303585 L2981 12<br />
3981 8569 · 2 1008470 + 1 303584 L3262 12<br />
3982 7539 · 2 1008405 + 1 303565 L3110 12<br />
3983 657 · 2 1008364 + 1 303551 L1124 11<br />
3984 2735 · 2 1008235 + 1 303513 L2117 12<br />
3985 48 · 724 106132 − 1 303512 L1471 13<br />
3986 38 · 200 131900 − 1 303508 p271 11<br />
3987 6555 · 2 1008197 − 1 303502 L2055 11<br />
3988 5647 · 2 1008136 + 1 303483 L3262 12<br />
3989 7113 · 2 1007922 + 1 303419 L3276 12<br />
3990 107929 · 2 1007898 + 1 303413 L1201 10<br />
3991 2799 · 2 1007885 + 1 303408 L3249 12<br />
3992 6221 · 2 1007721 + 1 303359 L3173 12<br />
3993 7987 · 2 1007660 + 1 303340 L1889 12<br />
3994 7405 · 2 1007566 + 1 303312 L1300 12<br />
3995 1417 · 2 1007460 + 1 303279 L2455 12<br />
3996 3969 · 2 1007374 + 1 303254 L1204 12 Generalized Fermat<br />
3997 7047 · 2 1007311 + 1 303235 L3110 12<br />
3998 4137 · 2 1007281 − 1 303226 L1959 12<br />
3999 4443 · 2 1007232 + 1 303211 L3035 12<br />
4000 7611 · 2 1007199 + 1 303201 L1129 12<br />
81
ank description digits who year comment<br />
4001 2209 · 2 1007189 − 1 303198 L2338 13<br />
4002 88 · 208 130796 + 1 303196 L1471 11<br />
4003 1857 · 2 1007163 + 1 303190 L3105 12<br />
4004 7011 · 2 1007155 + 1 303188 L1745 12<br />
4005 6839 · 2 1007111 + 1 303175 L1745 12<br />
4006 4089 · 2 1007074 + 1 303164 L3141 12<br />
4007 4503 · 2 1007064 + 1 303161 L1204 12<br />
4008 2139 · 2 1007065 + 1 303161 L1745 12<br />
4009 2703 · 2 1007001 + 1 303141 L2322 12<br />
4010 9585 · 2 1006994 + 1 303140 L2117 12<br />
4011 1037 · 2 1006979 + 1 303134 L1124 11<br />
4012 921 · 2 1006898 − 1 303110 L1817 12<br />
4013 109 · 2 1006883 − 1 303105 L282 10<br />
4014 993 · 2 1006834 − 1 303091 L1817 12<br />
4015 903 · 2 1006812 − 1 303084 L2257 12<br />
4016 4537 · 2 1006766 + 1 303071 L2308 12<br />
4017 7041 · 2 1006748 + 1 303066 L2117 12<br />
4018 9401 · 2 1006675 + 1 303044 L3105 12<br />
4019 9585 · 2 1006607 + 1 303023 L1741 12<br />
4020 357 · 2 1006483 + 1 302985 L1124 11<br />
4021 765 · 2 1006459 + 1 302978 L1728 11<br />
4022 9209 · 2 1006421 + 1 302967 L3261 12<br />
4023 1211 · 2 1006346 − 1 302944 L121 10<br />
4024 4405 · 2 1006340 + 1 302943 L3262 12<br />
4025 6855 · 2 1006303 + 1 302932 L2715 12<br />
4026 8643 · 2 1006260 + 1 302919 L1745 12<br />
4027 9193 · 2 1006176 + 1 302894 L1300 12<br />
4028 5261 · 2 1006171 + 1 302892 L2085 12<br />
4029 1065 · 2 1006151 + 1 302885 L1124 11<br />
4030 9885 · 2 1006120 + 1 302877 L1365 12<br />
4031 9135 · 2 1005940 + 1 302823 L2366 12<br />
4032 487 · 2 1005892 + 1 302807 L1293 11<br />
4033 8847 · 2 1005656 + 1 302737 L3141 12<br />
4034 4197 · 2 1005618 + 1 302725 L3262 12<br />
4035 1640 · 29 207001 + 1 302722 g103 11<br />
4036 2011 · 2 1005475 − 1 302682 L2338 13<br />
4037 1087 · 2 1005452 + 1 302675 L1124 11<br />
4038 3465 · 2 1005348 + 1 302644 L2826 12<br />
4039 1719 · 2 1005322 + 1 302636 L3275 12<br />
4040 5299 · 2 1005278 + 1 302623 L1741 12<br />
4041 4537 · 2 1005258 + 1 302617 L2549 12<br />
4042 8901 · 2 1005183 + 1 302595 L2742 12<br />
4043 1155 · 2 1005098 + 1 302568 L1969 11<br />
4044 4155 · 2 1005074 + 1 302562 L2085 12<br />
4045 4299 · 2 1005050 + 1 302554 L1312 12<br />
4046 3999 · 2 1005011 + 1 302543 L1741 12<br />
4047 159 · 2 1004981 − 1 302532 L2074 11<br />
4048 6315 · 2 1004959 + 1 302527 L1204 12<br />
4049 2601 · 2 1004897 + 1 302508 L1520 12<br />
4050 9009 · 2 1004615 + 1 302424 L3262 12<br />
82
ank description digits who year comment<br />
4051 271 · 2 1004527 − 1 302396 L2338 11<br />
4052 5415 · 2 1004272 + 1 302320 L3192 12<br />
4053 1411 · 2 1004240 + 1 302310 L2117 12<br />
4054 1113 · 2 1004211 − 1 302301 L1828 11<br />
4055 8391 · 2 1004121 + 1 302275 L3173 12<br />
4056 4085 · 2 1004094 − 1 302267 L1959 12<br />
4057 5423 · 2 1004085 + 1 302264 L3262 12<br />
4058 8921 · 2 1003983 + 1 302233 L3273 12<br />
4059 2147 · 2 1003540 − 1 302099 L2338 13<br />
4060 1385 · 2 1003506 − 1 302089 L1828 11<br />
4061 8795 · 2 1003439 + 1 302070 L2931 12<br />
4062 4557 · 2 1003430 + 1 302067 L1344 12<br />
4063 3485 · 2 1003423 + 1 302064 L3110 12<br />
4064 729 · 2 1003373 − 1 302049 L466 08<br />
4065 279 · 2 1003356 − 1 302043 L2338 11<br />
4066 9653 · 2 1003301 + 1 302028 L2516 12<br />
4067 6947 · 2 1003155 + 1 301984 L2520 12<br />
4068 9635 · 2 1003127 + 1 301976 L2715 12<br />
4069 853 · 2 1003063 − 1 301955 L2257 12<br />
4070 9629 · 2 1002925 + 1 301915 L3267 12<br />
4071 1011 · 2 1002851 − 1 301892 L1828 11<br />
4072 4149 · 2 1002845 − 1 301891 L1959 12<br />
4073 4699 · 2 1002802 + 1 301878 L3110 12<br />
4074 1369 · 2 1002747 − 1 301861 L1828 11<br />
4075 4294967295 · 2 1002700 − 1 301853 p140 13<br />
4076 603 · 2 1002662 + 1 301835 p219 07<br />
4077 1545 · 2 1002648 + 1 301831 L3264 12<br />
4078 8465 · 2 1002625 + 1 301825 L3110 12<br />
4079 3287 · 2 1002607 + 1 301819 L3173 12<br />
4080 6813 · 2 1002601 + 1 301817 L3221 12<br />
4081 735 · 2 1002509 − 1 301789 L2257 12<br />
4082 [ Long prime 4082 ] 301779 x29 12<br />
4083 3903 · 2 1002237 + 1 301707 L1792 12<br />
4084 819 · 2 1002205 − 1 301697 L2257 12<br />
4085 4313 · 2 1002193 + 1 301694 L2520 12<br />
4086 8053 · 2 1002140 + 1 301679 L3262 12<br />
4087 4945 · 2 1002108 + 1 301669 L3272 12<br />
4088 7431 · 2 1001868 + 1 301597 L2549 12<br />
4089 6669 · 2 1001794 + 1 301574 L2549 12<br />
4090 945 · 2 1001719 + 1 301551 p219 07<br />
4091 8515 · 2 1001712 + 1 301550 L2968 12<br />
4092 9423 · 2 1001652 + 1 301532 L3110 12<br />
4093 3273 · 2 1001617 + 1 301521 L3149 12<br />
4094 3791 · 2 1001609 + 1 301518 L2085 12<br />
4095 8379 · 2 1001429 + 1 301465 L3271 12<br />
4096 7065 · 2 1001355 + 1 301442 L1204 12<br />
4097 4043 · 2 1001354 − 1 301442 L1959 12<br />
4098 7837 · 2 1001292 + 1 301423 L3110 12<br />
4099 3261 · 2 1001257 + 1 301412 L1792 12<br />
4100 103 · 2 1001214 + 1 301398 p219 07<br />
83
ank description digits who year comment<br />
4101 6065 · 2 1001159 + 1 301383 L1741 12<br />
4102 9695 · 2 1001141 + 1 301378 L2038 12<br />
4103 4235 · 2 1001129 + 1 301374 L3264 12<br />
4104 4053 · 2 1000834 + 1 301285 L3110 12<br />
4105 869 · 2 1000725 + 1 301252 p114 05<br />
4106 7287 · 2 1000650 + 1 301230 L3221 12<br />
4107 6897 · 2 1000650 + 1 301230 L3110 12<br />
4108 1905 · 2 1000625 + 1 301222 L327 12<br />
4109 9445 · 2 1000622 + 1 301222 L3262 12<br />
4110 4 · 934 101403 + 1 301203 L1471 13<br />
4111 7899 · 2 1000499 + 1 301185 L3173 12<br />
4112 497 · 2 1000426 − 1 301161 L1809 11<br />
4113 5015 · 2 1000421 + 1 301161 L1584 12<br />
4114 1345 · 2 1000345 − 1 301137 L121 10<br />
4115 345 · 2 1000251 − 1 301109 L536 10<br />
4116 5759 · 2 1000227 + 1 301103 L1761 10<br />
4117 1295 · 2 1000217 + 1 301099 L1330 10<br />
4118 2053 · 2 1000170 + 1 301085 L1224 10<br />
4119 4037 · 2 1000136 − 1 301075 L1959 12<br />
4120 6501 · 2 1000123 + 1 301071 L1224 10<br />
4121 1213 · 2 1000099 − 1 301063 L121 10<br />
4122 7471 · 2 1000072 + 1 301056 L1224 10<br />
4123 1310025736935 · 2 1000000 − 1 301043 L3196 13<br />
4124 1295694422685 · 2 1000000 − 1 301043 L3196 13<br />
4125 1280542586895 · 2 1000000 − 1 301043 L3196 13<br />
4126 1280068024485 · 2 1000000 − 1 301043 L3196 13<br />
4127 1252834830735 · 2 1000000 − 1 301043 L3196 13<br />
4128 1237329107385 · 2 1000000 − 1 301043 L2832 13<br />
4129 1219466337885 · 2 1000000 − 1 301043 L3196 13<br />
4130 1180361260155 · 2 1000000 − 1 301043 L3196 13<br />
4131 1180053656235 · 2 1000000 − 1 301043 L3196 13<br />
4132 1120778829225 · 2 1000000 − 1 301043 L2832 13<br />
4133 1115974735665 · 2 1000000 − 1 301043 L3196 13<br />
4134 1061212477905 · 2 1000000 − 1 301043 L3196 13<br />
4135 1059515290875 · 2 1000000 − 1 301043 L3196 13<br />
4136 1058979345345 · 2 1000000 − 1 301043 L3196 13<br />
4137 1019096717415 · 2 1000000 − 1 301043 L3196 13<br />
4138 982900094715 · 2 1000000 − 1 301042 L2832 12<br />
4139 980634386235 · 2 1000000 − 1 301042 L2832 12<br />
4140 881456340765 · 2 1000000 − 1 301042 L2832 12<br />
4141 874241908875 · 2 1000000 − 1 301042 L2832 12<br />
4142 863813287785 · 2 1000000 − 1 301042 L3196 12<br />
4143 825802266975 · 2 1000000 − 1 301042 L2832 12<br />
4144 822336644115 · 2 1000000 − 1 301042 L2832 12<br />
4145 803961085095 · 2 1000000 − 1 301042 L2832 12<br />
4146 798556091655 · 2 1000000 − 1 301042 L2832 12<br />
4147 794547294555 · 2 1000000 − 1 301042 L2832 12<br />
4148 762475628535 · 2 1000000 − 1 301042 L3196 12<br />
4149 755892137055 · 2 1000000 − 1 301042 L2832 12<br />
4150 727970821065 · 2 1000000 − 1 301042 L2832 12<br />
84
ank description digits who year comment<br />
4151 725360016465 · 2 1000000 − 1 301042 L2832 12<br />
4152 720998314545 · 2 1000000 − 1 301042 L2832 12<br />
4153 677232030825 · 2 1000000 − 1 301042 L3196 12<br />
4154 674261358225 · 2 1000000 − 1 301042 L3196 12<br />
4155 656824069515 · 2 1000000 − 1 301042 L3196 12<br />
4156 655839908955 · 2 1000000 − 1 301042 L3196 12<br />
4157 604410782925 · 2 1000000 − 1 301042 L3196 12<br />
4158 596748534375 · 2 1000000 − 1 301042 L3196 12<br />
4159 568486032735 · 2 1000000 − 1 301042 L3196 12<br />
4160 547410060315 · 2 1000000 − 1 301042 L3196 12<br />
4161 537137152215 · 2 1000000 − 1 301042 L3196 12<br />
4162 529607909325 · 2 1000000 − 1 301042 L3196 12<br />
4163 520440176535 · 2 1000000 − 1 301042 L3196 12<br />
4164 472940821785 · 2 1000000 − 1 301042 L2832 12<br />
4165 450874960695 · 2 1000000 − 1 301042 L3196 12<br />
4166 448937885415 · 2 1000000 − 1 301042 L3196 12<br />
4167 424745859615 · 2 1000000 − 1 301042 L3196 12<br />
4168 400142585715 · 2 1000000 − 1 301042 L2832 12<br />
4169 396431486955 · 2 1000000 − 1 301042 L2832 12<br />
4170 303676611705 · 2 1000000 − 1 301042 L3196 12<br />
4171 293785725945 · 2 1000000 − 1 301042 L3196 12<br />
4172 276244842795 · 2 1000000 − 1 301042 L3196 12<br />
4173 258937461585 · 2 1000000 − 1 301042 L3196 12<br />
4174 202344306135 · 2 1000000 − 1 301042 L3196 12<br />
4175 193771120815 · 2 1000000 − 1 301042 L3196 12<br />
4176 164613198225 · 2 1000000 − 1 301042 L3196 12<br />
4177 163319273775 · 2 1000000 − 1 301042 L3196 12<br />
4178 147256144545 · 2 1000000 − 1 301042 L3196 12<br />
4179 135882407955 · 2 1000000 − 1 301042 L2900 12<br />
4180 120617642145 · 2 1000000 − 1 301042 L3196 12<br />
4181 91452556965 · 2 1000000 − 1 301041 L2832 12<br />
4182 77522904885 · 2 1000000 − 1 301041 L2832 12<br />
4183 66708604185 · 2 1000000 − 1 301041 L2832 12<br />
4184 48487212045 · 2 1000000 − 1 301041 L2900 11<br />
4185 26983775475 · 2 1000000 − 1 301041 L2828 11<br />
4186 24335320035 · 2 1000000 − 1 301041 L2828 11<br />
4187 20667679305 · 2 1000000 − 1 301041 L2832 11<br />
4188 888890079 · 2 999999 − 1 301039 g208 12<br />
4189 8009271 · 2 1000005 − 1 301039 g396 09<br />
4190 1611111 · 2 1000000 + 1 301037 p197 07<br />
4191 1089927 · 2 1000000 + 1 301037 p197 06<br />
4192 1064099 · 2 999999 + 1 301036 g412 12<br />
4193 32883 · 2 1000004 + 1 301036 p86 02<br />
4194 2043 · 2 999925 + 1 301011 L2998 12<br />
4195 851 · 2 999854 − 1 300989 L1809 11<br />
4196 5339 · 2 999849 + 1 300989 L1300 12<br />
4197 7617 · 2 999712 + 1 300948 L3262 12<br />
4198 825 · 2 999698 − 1 300943 L1809 11<br />
4199 5107 · 2 999676 + 1 300937 L3097 12<br />
4200 6987 · 2 999648 + 1 300928 L1180 12<br />
85
ank description digits who year comment<br />
4201 18975 · 2 999636 − 1 300925 L2515 11<br />
4202 178032 · 7 356064 − 1 300915 L2777 12 Generalized Woodall<br />
4203 21 · 2 999599 − 1 300911 L56 05<br />
4204 4203 · 2 999501 + 1 300884 L3207 12<br />
4205 8253 · 2 999404 + 1 300855 L1204 12<br />
4206 2011 · 2 999391 − 1 300850 L1828 12<br />
4207 1115 · 2 999382 − 1 300848 L1828 11<br />
4208 2993 · 2 999349 + 1 300838 L1129 12<br />
4209 9277 · 2 999313 − 1 300828 L251 10<br />
4210 8839 · 2 999190 + 1 300791 L2549 12<br />
4211 215 · 2 999170 − 1 300783 L323 08<br />
4212 2835 · 2 999089 + 1 300760 L1204 12<br />
4213 3507 · 2 999066 + 1 300753 L3110 12<br />
4214 1863 · 2 999024 + 1 300740 L2117 12<br />
4215 8247 · 2 998930 + 1 300712 L1741 12<br />
4216 17295 · 2 998917 − 1 300709 L1828 11<br />
4217 6579 · 2 998902 + 1 300704 L2545 12<br />
4218 28665 · 2 998816 − 1 300679 L1828 11<br />
4219 4379 · 2 998681 + 1 300637 L1204 12<br />
4220 9765 · 2 998679 + 1 300637 L3035 12<br />
4221 2211 · 2 998593 − 1 300610 L1828 12<br />
4222 6099 · 2 998559 + 1 300600 L3266 12<br />
4223 2009 · 2 998528 − 1 300591 L1828 12<br />
4224 1359 · 2 998329 + 1 300531 L2279 12<br />
4225 409 · 2 998261 − 1 300510 L1817 10<br />
4226 8441 · 2 998251 + 1 300508 L2117 12<br />
4227 9217 · 2 998238 + 1 300504 L3265 12<br />
4228 8835 · 2 998230 + 1 300502 L1733 12<br />
4229 8173 · 2 998216 + 1 300497 L1125 12<br />
4230 5577 · 2 998202 + 1 300493 L326 12<br />
4231 2021 · 2 998170 − 1 300483 L1828 12<br />
4232 6881 · 2 998141 + 1 300475 L3268 12<br />
4233 29025 · 2 998089 − 1 300460 L1828 11<br />
4234 9765 · 2 998075 + 1 300455 L3264 12<br />
4235 81 · 2 998065 + 1 300450 gt 07<br />
4236 8895 · 2 997963 + 1 300421 L3213 12<br />
4237 7085 · 2 997929 + 1 300411 L3110 12<br />
4238 335 · 2 997912 − 1 300404 L769 09<br />
4239 2273 · 2 997828 − 1 300380 L2055 12<br />
4240 7453 · 2 997810 + 1 300375 L2626 12<br />
4241 2121 · 2 997781 − 1 300366 L2055 12<br />
4242 7807 · 2 997664 + 1 300331 L3263 12<br />
4243 3835 · 2 997646 + 1 300325 L3262 12<br />
4244 243 · 2 997537 + 1 300291 L165 08<br />
4245 7991 · 2 997477 + 1 300275 L2520 12<br />
4246 4329 · 2 997422 + 1 300258 L1379 12<br />
4247 8301 · 2 997412 + 1 300255 L3110 12<br />
4248 537 · 2 997366 + 1 300240 L1207 11<br />
4249 8727 · 2 997332 + 1 300231 L3261 12<br />
4250 2685 · 2 997294 + 1 300219 L3035 12<br />
86
ank description digits who year comment<br />
4251 3949 · 2 997254 + 1 300207 L2085 12<br />
4252 1309 · 2 997219 − 1 300196 L1828 11<br />
4253 8845 · 2 997032 + 1 300141 L2038 12<br />
4254 6899 · 2 996903 + 1 300102 L3110 12<br />
4255 1515 · 2 996848 − 1 300085 L200 07<br />
4256 919 · 2 996819 − 1 300076 L1817 11<br />
4257 4217 · 2 996759 + 1 300058 L2794 12<br />
4258 8555 · 2 996739 + 1 300053 L2066 12<br />
4259 351351 · 2 996709 − 1 300045 L80 06<br />
4260 2145 · 2 996686 + 1 300036 L1741 12<br />
4261 1737 · 2 996637 − 1 300021 L1809 13<br />
4262 8821 · 2 996628 + 1 300019 L3262 12<br />
4263 7455 · 2 996610 + 1 300014 L3198 12<br />
4264 490359 · 2 996559 − 1 300000 L466 10<br />
4265 53355 · 2 996559 − 1 299999 L466 09<br />
4266 3299 · 2 996545 + 1 299994 L1204 12<br />
4267 2205 · 2 996432 + 1 299960 L1125 12<br />
4268 291 · 2 996371 − 1 299941 L261 08<br />
4269 2047 · 2 996273 − 1 299912 L2055 12<br />
4270 7671 · 2 996260 + 1 299909 L3211 12<br />
4271 1873 · 2 996180 + 1 299884 L1745 12<br />
4272 3231 · 2 996160 + 1 299878 L3110 12<br />
4273 4923 · 2 996152 + 1 299876 L3198 12<br />
4274 44131 · 2 995972 + 1 299823 SB3 02<br />
4275 1731 · 2 995923 − 1 299806 L1809 13<br />
4276 6795 · 2 995895 + 1 299799 L1129 12<br />
4277 9607 · 2 995858 + 1 299788 L1808 12<br />
4278 375 · 2 995829 + 1 299777 L1446 11<br />
4279 75 · 2 995721 − 1 299744 L257 08<br />
4280 9101 · 2 995671 + 1 299731 L3219 12<br />
4281 2769 · 2 995633 + 1 299719 L2520 12<br />
4282 21639 · 2 995627 + 1 299718 L1927 12<br />
4283 1495 · 2 995529 − 1 299688 L1809 13<br />
4284 1263 · 2 995491 − 1 299676 L1828 11<br />
4285 2425 · 2 995444 + 1 299662 L1204 12<br />
4286 1999 · 2 995331 − 1 299628 L1809 13<br />
4287 75 · 2 995208 + 1 299590 L669 09<br />
4288 871 · 2 995093 − 1 299556 L1817 11<br />
4289 8823 · 2 995060 + 1 299547 L1741 12<br />
4290 4611 · 2 995049 + 1 299544 L3110 12<br />
4291 9913 · 2 995016 + 1 299534 L2085 12<br />
4292 9405 · 2 995003 − 1 299530 L644 09<br />
4293 3965 · 2 994937 + 1 299510 L1204 12<br />
4294 1377 · 2 994905 − 1 299500 L121 10<br />
4295 9603 · 2 994877 + 1 299492 L3262 12<br />
4296 6659 · 2 994799 + 1 299469 L1129 12<br />
4297 4535 · 2 994759 + 1 299456 L1484 12<br />
4298 3015 · 2 994723 + 1 299445 L3035 12<br />
4299 6255 · 2 994711 + 1 299442 L1224 12<br />
4300 5957 · 2 994691 + 1 299436 L2279 12<br />
87
ank description digits who year comment<br />
4301 4975 · 2 994680 + 1 299433 L3035 12<br />
4302 1695 · 2 994681 − 1 299433 L1809 13<br />
4303 5245 · 2 994648 + 1 299423 L3262 12<br />
4304 2859 · 2 994622 + 1 299415 L3262 12<br />
4305 7245 · 2 994567 − 1 299399 L1828 11<br />
4306 2235 · 2 994452 − 1 299364 L323 10<br />
4307 2271 · 2 994134 − 1 299268 L1828 12<br />
4308 9945 · 2 994111 − 1 299262 L644 09<br />
4309 4229 · 2 994055 + 1 299244 L2085 12<br />
4310 561 · 2 994052 + 1 299243 L2442 11<br />
4311 1897 · 2 994042 + 1 299240 L2117 12<br />
4312 18525 · 2 993993 − 1 299226 L1828 11<br />
4313 7945 · 2 993914 + 1 299202 L1741 12<br />
4314 1435 · 2 993755 − 1 299154 L1809 13<br />
4315 162941 · 2 993718 − 1 299145 L849 12<br />
4316 6123 · 2 993642 + 1 299120 L2117 12<br />
4317 9705 · 2 993456 + 1 299065 L1741 12<br />
4318 1491 · 2 993334 − 1 299027 L1809 13<br />
4319 3987 · 2 993330 + 1 299026 L2715 12<br />
4320 371 · 2 993238 − 1 298998 L644 09<br />
4321 5517 · 2 993159 + 1 298975 L3174 12<br />
4322 6435 · 2 993067 + 1 298947 L3035 12<br />
4323 6957 · 2 992867 + 1 298887 L1741 12<br />
4324 2273 · 2 992830 − 1 298875 L1828 12<br />
4325 403 · 2 992780 + 1 298860 L1446 11<br />
4326 3 · 2 992700 − 1 298833 L59 04<br />
4327 8733 · 2 992664 + 1 298826 L1741 12<br />
4328 5886 · 28 206482 − 1 298816 p293 10<br />
4329 2187 · 2 992632 − 1 298816 L466 10<br />
4330 7665 · 2 992605 + 1 298808 L1745 12<br />
4331 1007 · 2 992588 − 1 298802 L1828 11<br />
4332 341552 · 5 427478 − 1 298800 p285 10<br />
4333 9231 · 2 992569 + 1 298798 L2542 12<br />
4334 1167 · 2 992544 − 1 298789 L1828 11<br />
4335 8089 · 2 992538 + 1 298788 L3187 12<br />
4336 1089 · 2 992397 − 1 298745 L1828 11<br />
4337 6035 · 2 992295 + 1 298715 L3110 12<br />
4338 1977 · 2 992243 + 1 298699 L2998 12<br />
4339 7323 · 2 992178 + 1 298680 L2117 12<br />
4340 30021 · 2 992173 + 1 298679 L1927 12<br />
4341 1617 · 2 992159 + 1 298673 L1204 12<br />
4342 2 991961 − 2 495981 + 1 298611 x28 05 Gaussian Mersenne norm 36<br />
4343 8415 · 2 991663 + 1 298525 L2974 12<br />
4344 2757 · 2 991655 + 1 298522 L1492 12<br />
4345 19861029 · 2 991533 − 1 298489 L895 09<br />
4346 2289 · 2 991529 + 1 298484 L3035 12<br />
4347 9951 · 2 991481 + 1 298470 L3262 12<br />
4348 3053 · 2 991373 + 1 298437 L1130 12<br />
4349 845 · 2 991358 − 1 298432 L1809 11<br />
4350 9615 · 2 991347 − 1 298430 L644 09<br />
88
ank description digits who year comment<br />
4351 417 · 2 991349 − 1 298429 L1827 10<br />
4352 1995 · 2 991276 + 1 298408 L2520 12<br />
4353 31627 · 2 991213 − 1 298390 L2055 11<br />
4354 9441 · 2 991067 − 1 298345 L1828 11<br />
4355 5079 · 2 991027 + 1 298333 L2520 12<br />
4356 9615 · 2 990922 + 1 298302 L3035 12<br />
4357 4887 · 2 990919 + 1 298301 L2066 12<br />
4358 5723 · 2 990805 + 1 298266 L3171 12<br />
4359 8127 · 2 990767 + 1 298255 L3035 12<br />
4360 717 · 2 990747 + 1 298248 L1218 11<br />
4361 93 · 2 990684 − 1 298228 L282 08<br />
4362 993 · 2 990604 + 1 298205 L2066 11<br />
4363 4617 · 2 990511 + 1 298178 L326 12<br />
4364 6087 · 2 990432 + 1 298154 L3262 12<br />
4365 4515 · 2 990377 + 1 298137 L3141 12<br />
4366 7721 · 2 990321 + 1 298121 L2959 12<br />
4367 3543 · 2 990321 + 1 298120 L2967 12<br />
4368 121 · 2 990219 − 1 298088 L66 04<br />
4369 4889 · 2 990209 + 1 298087 L3171 12<br />
4370 1189 · 2 990173 − 1 298075 L1828 11<br />
4371 4251 · 2 990160 + 1 298072 L2744 12<br />
4372 8685 · 2 990148 + 1 298069 L2038 12<br />
4373 1705 · 2 990034 + 1 298034 L3261 12<br />
4374 9483 · 2 989826 + 1 297972 L3260 12<br />
4375 4227 · 2 989723 + 1 297940 L3110 12<br />
4376 6397 · 2 989684 + 1 297929 L3141 12<br />
4377 2845 · 2 989676 + 1 297926 L3171 12<br />
4378 6839 · 2 989459 + 1 297861 L3260 12<br />
4379 431 · 2 989383 + 1 297837 L1446 11<br />
4380 2127 · 2 989300 + 1 297813 L1224 12<br />
4381 631 · 2 989268 + 1 297803 L1158 11<br />
4382 3335 · 2 989236 − 1 297794 L1959 12<br />
4383 4813 · 2 989194 + 1 297781 L1513 12<br />
4384 289 · 2 989182 + 1 297776 L1446 10 Generalized Fermat<br />
4385 503 · 2 989052 − 1 297738 L1830 10<br />
4386 4513 · 2 988830 + 1 297672 L2038 12<br />
4387 3813 · 2 988797 + 1 297662 L3110 12<br />
4388 7543 · 2 988770 + 1 297654 L1733 12<br />
4389 225 · 2 988695 + 1 297630 L1446 10 Divides GF (988693, 6)<br />
4390 2035 · 2 988684 + 1 297627 L3262 12<br />
4391 4883 · 2 988673 + 1 297624 L1513 12<br />
4392 3027 · 2 988658 + 1 297620 L1745 12<br />
4393 6165 · 2 988573 − 1 297594 L1828 11<br />
4394 761 · 2 988549 + 1 297586 L2327 11<br />
4395 7801 · 2 988463 − 1 297561 L862 11<br />
4396 21885 · 2 988449 − 1 297558 L1828 11<br />
4397 5069 · 2 988437 + 1 297553 L3110 12<br />
4398 5467 · 2 988416 + 1 297547 L2819 12<br />
4399 3861 · 2 988415 + 1 297547 L2081 12<br />
4400 7269 · 2 988365 + 1 297532 L3221 12<br />
89
ank description digits who year comment<br />
4401 1079 · 2 988339 + 1 297523 L1524 11<br />
4402 2895 · 2 988301 − 1 297512 L121 10<br />
4403 1089 · 2 988226 + 1 297489 L2434 11 Generalized Fermat<br />
4404 1353 · 2 988123 − 1 297458 L1828 11<br />
4405 4095 · 2 987999 − 1 297421 L1959 12<br />
4406 4823 · 2 987965 + 1 297411 L2826 12<br />
4407 5527 · 2 987964 + 1 297411 L3223 12<br />
4408 7947 · 2 987912 + 1 297396 L3110 12<br />
4409 2067 · 2 987898 + 1 297391 L2826 12<br />
4410 1307 · 2 987892 − 1 297389 L1828 11<br />
4411 2607 · 2 987864 − 1 297381 L2953 12<br />
4412 2153 · 2 987854 − 1 297378 L1959 11<br />
4413 765 · 2 987829 − 1 297370 L2017 11<br />
4414 2607 · 2 987824 − 1 297369 L2953 12<br />
4415 1483 · 2 987800 + 1 297361 L3035 12<br />
4416 4469 · 2 987789 + 1 297358 L3257 12<br />
4417 2781 · 2 987748 + 1 297346 L3035 12<br />
4418 1293 · 2 987742 − 1 297344 L1828 11<br />
4419 6247 · 2 987738 + 1 297343 L2520 12<br />
4420 3063 · 2 987716 + 1 297336 L3262 12<br />
4421 5751 · 2 987641 + 1 297314 L3259 12<br />
4422 9765 · 2 987619 + 1 297307 L1513 12<br />
4423 5805 · 2 987605 + 1 297303 L2085 12<br />
4424 3699 · 2 987453 + 1 297257 L3141 12<br />
4425 6735 · 2 987392 + 1 297239 L3187 12<br />
4426 1163 · 2 987393 + 1 297238 L1524 11<br />
4427 825 · 2 987356 − 1 297227 L1809 11<br />
4428 7953 · 2 987301 + 1 297212 L2659 12<br />
4429 8611 · 2 987244 + 1 297194 L2279 12<br />
4430 6253 · 2 987194 + 1 297179 L2520 12<br />
4431 1235 · 2 987146 − 1 297164 L1828 11<br />
4432 5145 · 2 987098 + 1 297150 L3192 12<br />
4433 2877 · 2 987011 + 1 297124 L3110 12<br />
4434 1329 · 2 987012 − 1 297124 L1828 11<br />
4435 1441 · 2 986944 + 1 297103 L3035 12<br />
4436 4251 · 2 986899 + 1 297090 L2322 12<br />
4437 1947 · 2 986802 + 1 297061 L1745 12<br />
4438 1423 · 2 986667 − 1 297020 L1809 13<br />
4439 9045 · 2 986592 + 1 296998 L324 12<br />
4440 2071 · 2 986585 − 1 296995 L1828 12<br />
4441 4073 · 2 986584 − 1 296995 L1959 12<br />
4442 593 · 2 986574 − 1 296992 L1827 10<br />
4443 573 · 2 986514 − 1 296974 L1817 10<br />
4444 9305 · 2 986487 + 1 296967 L3035 12<br />
4445 891 · 2 986476 + 1 296962 L1158 11<br />
4446 1197 · 2 986320 − 1 296915 L1828 11<br />
4447 7761 · 2 986307 + 1 296912 L3141 12<br />
4448 2585 · 2 986281 + 1 296904 L2520 12<br />
4449 873 · 10 296896 − 1 296899 L1958 12<br />
4450 543 · 2 986194 + 1 296877 L1158 11<br />
90
ank description digits who year comment<br />
4451 1299 · 2 986184 − 1 296875 L1828 11<br />
4452 4585 · 2 986136 + 1 296861 L2967 12<br />
4453 21 · 2 986130 − 1 296857 L56 05<br />
4454 1189 · 2 986122 + 1 296856 L2433 11<br />
4455 5945 · 2 986109 + 1 296853 L1484 12<br />
4456 5915 · 2 986077 + 1 296843 L2038 12<br />
4457 3693 · 2 986069 + 1 296840 L1129 12<br />
4458 2663 · 2 986061 + 1 296838 L2085 12<br />
4459 3655 · 2 986030 + 1 296829 L3187 12<br />
4460 6839 · 2 985985 + 1 296815 L2038 12<br />
4461 2079 · 2 985934 + 1 296800 L1303 12<br />
4462 7549 · 2 985898 + 1 296789 L3141 12<br />
4463 3523 · 2 985878 + 1 296783 L3141 12<br />
4464 6273 · 2 985821 + 1 296766 L1513 12<br />
4465 351 · 2 985817 − 1 296764 L536 09<br />
4466 4737 · 2 985810 + 1 296763 L3253 12<br />
4467 1887 · 2 985751 + 1 296744 L3141 12<br />
4468 5343 · 2 985746 + 1 296743 L3254 12<br />
4469 1707 · 2 985681 − 1 296723 L1809 13<br />
4470 29577 · 2 985671 + 1 296722 L1927 12<br />
4471 6423 · 2 985654 + 1 296716 L3035 12<br />
4472 1675 · 2 985506 + 1 296671 L2967 12<br />
4473 7375 · 2 985448 + 1 296654 L1204 12<br />
4474 6839 · 2 985429 + 1 296648 L2085 12<br />
4475 576 · 172 132695 − 1 296647 p289 11<br />
4476 2457 · 2 985416 + 1 296644 L1204 12<br />
4477 5789 · 2 985401 + 1 296640 L3110 12<br />
4478 6057 · 2 985350 + 1 296624 L3035 12<br />
4479 8945 · 2 985081 + 1 296543 L3035 12<br />
4480 1137 · 2 984977 − 1 296511 L1828 11<br />
4481 10109 · 2 984941 + 1 296501 p344 13<br />
4482 7723 · 2 984922 + 1 296495 L1224 12<br />
4483 7867 · 2 984866 + 1 296479 L3110 12<br />
4484 5443 · 2 984734 + 1 296439 L3250 12<br />
4485 9801 · 2 984699 + 1 296428 L3067 12<br />
4486 189 · 2 984683 − 1 296422 L384 09<br />
4487 103 · 2 984667 − 1 296417 L621 09<br />
4488 2857 · 2 984638 + 1 296410 L3110 12<br />
4489 4185 · 2 984551 − 1 296384 L1959 12<br />
4490 8217 · 2 984548 + 1 296383 L2131 12<br />
4491 6285 · 2 984518 + 1 296374 L3035 12<br />
4492 7803 · 2 984503 − 1 296369 L2247 11<br />
4493 7601 · 2 984497 + 1 296368 L3141 12<br />
4494 5139 · 2 984465 + 1 296358 L1745 12<br />
4495 7725 · 2 984458 − 1 296356 L862 11<br />
4496 471 · 2 984442 − 1 296350 L1817 10<br />
4497 1281 · 2 984382 − 1 296332 L1828 11<br />
4498 15051 · 2 984372 + 1 296330 L1927 12<br />
4499 1907 · 2 984254 − 1 296294 L1809 13<br />
4500 9855 · 2 984233 + 1 296288 L3249 12<br />
91
ank description digits who year comment<br />
4501 5889 · 2 984226 + 1 296286 L3141 12<br />
4502 7991 · 2 984189 + 1 296275 L1792 12<br />
4503 9987 · 2 984174 + 1 296270 L2085 12<br />
4504 3937 · 2 984032 + 1 296227 L3141 12<br />
4505 1167 · 2 983912 − 1 296191 L1828 11<br />
4506 4687 · 2 983834 + 1 296168 L2967 12<br />
4507 4733 · 2 983833 + 1 296167 L1224 12<br />
4508 2209 · 2 983781 − 1 296151 L1828 12<br />
4509 24599 · 2 983644 − 1 296111 L2055 11<br />
4510 8325 · 2 983522 + 1 296074 L2826 12<br />
4511 7919 · 2 983491 + 1 296065 L324 12<br />
4512 9265 · 2 983456 + 1 296054 L2549 12<br />
4513 765 · 2 983445 + 1 296050 L1158 11<br />
4514 7619 · 2 983427 + 1 296045 L2742 12<br />
4515 8159 · 2 983329 + 1 296016 L2685 12<br />
4516 729 · 2 983299 + 1 296006 L2002 10<br />
4517 9071 · 2 983279 + 1 296001 L2085 12<br />
4518 927 · 2 983250 + 1 295991 L1524 11<br />
4519 4137 · 2 983226 + 1 295985 L1745 12<br />
4520 5317 · 2 983218 + 1 295982 L1513 12<br />
4521 1365 · 2 983164 − 1 295965 L1828 11<br />
4522 6989 · 2 983159 + 1 295965 L3110 12<br />
4523 395 · 2 983160 − 1 295964 L644 09<br />
4524 7473 · 2 983075 − 1 295939 L862 11<br />
4525 1009568601 · 2 982960 + 1 295910 p221 09<br />
4526 1217 · 2 982848 − 1 295870 L1828 11<br />
4527 1677 · 2 982795 + 1 295854 L2520 12<br />
4528 3109 · 2 982630 + 1 295805 L2399 12<br />
4529 1047 · 2 982606 + 1 295797 L1324 11<br />
4530 983 · 2 982604 − 1 295797 L1809 11<br />
4531 1255 · 2 982578 + 1 295789 L3248 12<br />
4532 2781 · 2 982483 + 1 295761 L2117 12<br />
4533 1775 · 2 982466 − 1 295755 L1819 13<br />
4534 1421 · 2 982453 + 1 295751 L1186 12<br />
4535 1775 · 2 982446 − 1 295749 L1819 13<br />
4536 30393 · 2 982421 + 1 295743 L1927 12<br />
4537 9667 · 2 982410 + 1 295739 L1484 12<br />
4538 6643 · 2 982378 + 1 295730 L3110 12<br />
4539 1623 · 2 982378 + 1 295729 L3173 12<br />
4540 6771 · 2 982347 + 1 295720 L3110 12<br />
4541 8327 · 2 982295 + 1 295705 L3141 12<br />
4542 1485 · 2 982274 − 1 295698 L1134 10<br />
4543 447 · 2 982256 + 1 295692 L1446 11<br />
4544 1215 · 2 982159 + 1 295663 L2279 12<br />
4545 6297 · 2 982082 + 1 295640 L2085 12<br />
4546 333 · 2 982086 − 1 295640 L536 09<br />
4547 1535 · 2 982051 + 1 295630 L3110 12<br />
4548 2895 · 2 982050 − 1 295630 L121 10<br />
4549 545 · 2 982037 + 1 295626 L1204 11<br />
4550 5003 · 2 981921 + 1 295592 L2085 12<br />
92
ank description digits who year comment<br />
4551 1387 · 2 981913 − 1 295589 L1828 11<br />
4552 5377 · 2 981838 + 1 295567 L2085 12<br />
4553 403 · 2 981831 − 1 295564 L284 08<br />
4554 5863 · 2 981818 + 1 295561 L1584 12<br />
4555 5733 · 2 981716 + 1 295530 L2785 12<br />
4556 2457 · 2 981695 + 1 295524 L2616 12<br />
4557 3699 · 2 981683 + 1 295520 L3110 12<br />
4558 5979 · 2 981682 + 1 295520 L3172 12<br />
4559 4853 · 2 981677 + 1 295518 L3110 12<br />
4560 54321 · 2 981617 − 1 295501 L637 11<br />
4561 603 · 2 981619 − 1 295500 L1817 11<br />
4562 1353 · 2 981544 + 1 295478 L1204 12<br />
4563 3547 · 2 981496 + 1 295464 L3141 12<br />
4564 2141 · 2 981462 − 1 295453 L1828 12<br />
4565 6721 · 2 981440 + 1 295447 L2085 12<br />
4566 9295 · 2 981416 + 1 295440 L1204 12<br />
4567 7495 · 2 981414 + 1 295439 L2626 12<br />
4568 317 · 2 981378 − 1 295427 L623 08<br />
4569 6633 · 2 981361 + 1 295423 L3034 12<br />
4570 1551 · 2 981306 − 1 295406 L1809 13<br />
4571 2057 · 2 981262 − 1 295393 L1828 12<br />
4572 4641 · 2 981229 + 1 295384 L1513 12<br />
4573 1995 · 2 981097 − 1 295343 L1809 13<br />
4574 665 · 2 981093 + 1 295342 L2085 11<br />
4575 4211 · 2 981057 + 1 295332 L3035 12<br />
4576 4197 · 2 981024 − 1 295322 L1959 12<br />
4577 819 · 2 981008 − 1 295316 L1838 11<br />
4578 2503 · 2 980888 + 1 295281 L1513 12<br />
4579 3467 · 2 980855 + 1 295271 L3110 12<br />
4580 4717 · 2 980762 + 1 295243 L2117 12<br />
4581 7503 · 2 980744 − 1 295238 L862 11<br />
4582 969 · 2 980699 + 1 295223 L1204 11<br />
4583 9519 · 2 980599 + 1 295194 L2966 12<br />
4584 7689 · 2 980505 + 1 295166 L1620 12<br />
4585 1867 · 2 980476 + 1 295156 L3141 12<br />
4586 9155 · 2 980471 + 1 295156 L1125 12<br />
4587 6553 · 2 980288 + 1 295100 L1204 12<br />
4588 8799 · 2 980137 + 1 295055 L3246 12<br />
4589 1313 · 2 980136 − 1 295054 L1828 11<br />
4590 111546435 · 2 980039 − 1 295030 L466 11<br />
4591 3341 · 2 980031 + 1 295023 L3110 12<br />
4592 1975 · 2 980012 + 1 295017 L3223 12<br />
4593 8997 · 2 980008 + 1 295016 L2520 12<br />
4594 2775 · 2 979925 + 1 294991 L2279 12<br />
4595 1431 · 2 979918 − 1 294988 L1809 13<br />
4596 7045 · 2 979844 + 1 294967 L1224 12<br />
4597 8997 · 2 979808 + 1 294956 L3141 12<br />
4598 6625 · 2 979746 + 1 294937 L1745 12<br />
4599 8953 · 2 979688 + 1 294920 L324 12<br />
4600 2247 · 2 979665 − 1 294912 L2055 12<br />
93
ank description digits who year comment<br />
4601 7037 · 2 979623 + 1 294900 L3035 12<br />
4602 5349 · 2 979613 + 1 294897 L2735 12<br />
4603 5035 · 2 979526 + 1 294871 L1957 12<br />
4604 6579 · 2 979257 − 1 294790 L862 11<br />
4605 11355 · 2 979242 + 1 294786 L1927 12<br />
4606 16665 · 2 979166 − 1 294763 L1828 11<br />
4607 4533 · 2 979077 + 1 294736 L2826 12<br />
4608 2505 · 2 979009 − 1 294715 L121 10<br />
4609 7473 · 2 979006 + 1 294715 L3245 12<br />
4610 55940 · 31 197599 − 1 294697 p293 10<br />
4611 1055 · 2 978942 − 1 294694 L1828 11<br />
4612 5197 · 2 978938 + 1 294694 L2719 12<br />
4613 16573 · 2 978935 − 1 294694 L2055 11<br />
4614 5815 · 2 978912 + 1 294686 L3223 12<br />
4615 22785 · 2 978903 − 1 294684 L1828 11<br />
4616 213 · 2 978900 + 1 294681 L669 10<br />
4617 7281 · 2 978777 + 1 294646 L1132 12<br />
4618 303 · 2 978724 − 1 294628 L548 08<br />
4619 3325 · 2 978712 + 1 294626 L3149 12<br />
4620 8195 · 2 978687 + 1 294619 L1513 12<br />
4621 477 · 2 978625 − 1 294599 L1815 10<br />
4622 5957 · 2 978611 + 1 294596 L1408 12<br />
4623 6663 · 2 978605 + 1 294594 L3110 12<br />
4624 781 · 2 978597 − 1 294590 L1815 11<br />
4625 28605 · 2 978525 − 1 294570 L1828 11<br />
4626 7503 · 2 978410 + 1 294535 L3141 12<br />
4627 1667 · 2 978371 + 1 294523 L2594 12<br />
4628 16887 · 2 978362 − 1 294521 L1828 11<br />
4629 437 · 2 978340 − 1 294513 L1816 10<br />
4630 6105 · 2 978332 + 1 294512 L2279 12<br />
4631 137137 · 2 978229 − 1 294482 L321 07<br />
4632 249 · 30 199355 − 1 294474 L1471 11<br />
4633 8563 · 2 978208 + 1 294474 L3198 12<br />
4634 69 · 2 978209 − 1 294473 L260 07<br />
4635 3657 · 2 978126 + 1 294449 L3222 12<br />
4636 669 · 2 978128 − 1 294449 L2017 11<br />
4637 5455 · 2 978004 + 1 294413 L2085 12<br />
4638 103 · 2 977951 − 1 294395 L621 09<br />
4639 2353 · 2 977936 + 1 294392 L3110 12<br />
4640 4527 · 2 977892 + 1 294379 L3221 12<br />
4641 1095 · 2 977781 + 1 294345 L1524 11<br />
4642 18093 · 2 977758 + 1 294339 L1927 12<br />
4643 3201 · 2 977681 + 1 294315 L3206 12<br />
4644 2895 · 2 977676 − 1 294314 L121 10<br />
4645 1071 · 2 977640 + 1 294302 L1524 11<br />
4646 1537 · 2 977584 + 1 294286 L3080 12<br />
4647 923 · 2 977574 − 1 294283 L1817 11<br />
4648 5231 · 2 977561 + 1 294279 L3047 12<br />
4649 3077 · 2 977547 + 1 294275 L3171 12<br />
4650 23 · 2 977541 + 1 294271 g267 04<br />
94
ank description digits who year comment<br />
4651 9957 · 2 977495 + 1 294260 L1745 12<br />
4652 9779 · 2 977493 + 1 294259 L3110 12<br />
4653 1011 · 2 977446 − 1 294244 L1828 11<br />
4654 2129 · 2 977428 − 1 294239 L2055 12<br />
4655 8269 · 2 977290 + 1 294198 L2085 12<br />
4656 93 · 2 977284 + 1 294194 L669 09<br />
4657 1593 · 2 977270 + 1 294191 L1957 12<br />
4658 9427 · 2 977218 + 1 294176 L2085 12<br />
4659 1699 · 2 977205 − 1 294172 L1809 13<br />
4660 4531 · 2 977192 + 1 294168 L2826 12<br />
4661 1059 · 2 977082 + 1 294135 L1820 11<br />
4662 6225 · 2 977073 + 1 294133 L2997 12<br />
4663 5595 · 2 977060 + 1 294129 L2890 12<br />
4664 6853 · 2 977046 + 1 294124 L3141 12<br />
4665 1279 · 2 977033 − 1 294120 L1828 11<br />
4666 3165 · 2 977031 + 1 294120 L1792 12<br />
4667 6899 · 2 977025 + 1 294118 L3198 12<br />
4668 627 · 2 977002 + 1 294110 L2085 11<br />
4669 791 · 2 976970 − 1 294101 L2017 11<br />
4670 4839 · 2 976938 + 1 294092 L3141 12<br />
4671 405405 · 2 976891 − 1 294080 L466 10<br />
4672 1493 · 2 976813 + 1 294054 L1745 12<br />
4673 9579 · 2 976742 + 1 294033 L3171 12<br />
4674 1737 · 2 976699 + 1 294019 L3110 12<br />
4675 735 · 2 976588 + 1 293986 L1524 11<br />
4676 4333 · 2 976584 + 1 293985 L2107 12<br />
4677 1127 · 2 976584 − 1 293985 L1828 11<br />
4678 9629 · 2 976531 + 1 293970 L2749 12<br />
4679 375 · 2 976533 − 1 293969 L644 09<br />
4680 2079 · 2 976473 − 1 293951 L2055 12<br />
4681 22927 · 2 976453 − 1 293947 L2055 11<br />
4682 2625 · 2 976413 + 1 293934 L2279 12<br />
4683 3879 · 2 976410 + 1 293933 L2549 12<br />
4684 3267 · 2 976387 + 1 293926 L1158 12<br />
4685 8323 · 2 976324 + 1 293907 L2549 12<br />
4686 451 · 2 976320 + 1 293905 L1446 11<br />
4687 1807 · 2 976297 − 1 293898 L1809 13<br />
4688 9055 · 2 976276 + 1 293893 L2063 12<br />
4689 755 · 2 976273 + 1 293891 L1449 11<br />
4690 1703 · 2 976168 − 1 293860 L1809 13<br />
4691 389 · 2 976169 + 1 293859 L1446 11<br />
4692 1845 · 2 976154 + 1 293855 L1224 12<br />
4693 99 · 2 976049 + 1 293823 p76 05<br />
4694 7521 · 2 975815 + 1 293754 L2674 12<br />
4695 1071 · 2 975760 + 1 293737 L2066 11<br />
4696 6721 · 2 975740 + 1 293731 L2826 12<br />
4697 8441 · 2 975721 + 1 293726 L3223 12<br />
4698 6681 · 2 975711 + 1 293723 L1728 12<br />
4699 909 · 2 975659 − 1 293706 L1817 11<br />
4700 5261 · 2 975631 + 1 293698 L1129 12<br />
95
ank description digits who year comment<br />
4701 8005 · 2 975616 + 1 293694 L1513 12<br />
4702 593 · 2 975577 + 1 293681 L1360 11<br />
4703 3899 · 2 975315 + 1 293603 L3171 12<br />
4704 5205 · 2 975290 + 1 293596 L2085 12<br />
4705 305 · 2 975215 + 1 293572 L153 10<br />
4706 4893 · 2 975190 + 1 293566 L1129 12<br />
4707 7581 · 2 975083 + 1 293534 L2826 12<br />
4708 57 · 2 975036 + 1 293517 p241 09<br />
4709 5819 · 2 975025 + 1 293516 L2790 12<br />
4710 8115 · 2 975001 + 1 293509 L1224 12<br />
4711 765 · 2 974997 + 1 293507 L1204 11<br />
4712 6975 · 2 974757 − 1 293435 L1828 11<br />
4713 27 · 2 974752 + 1 293432 L57 05<br />
4714 8355 · 2 974635 + 1 293399 L3244 12<br />
4715 9683 · 2 974573 + 1 293380 L1204 12<br />
4716 4689 · 2 974425 + 1 293335 L3110 12<br />
4717 723 · 2 974395 − 1 293325 L1815 11<br />
4718 3251 · 2 974379 + 1 293321 L1204 12<br />
4719 1647 · 2 974289 − 1 293294 L1809 13<br />
4720 1447 · 2 973977 − 1 293200 L1809 13<br />
4721 7267 · 2 973974 + 1 293200 L3171 12<br />
4722 3935 · 2 973947 + 1 293191 L3110 12<br />
4723 1461 · 2 973877 − 1 293170 L1809 13<br />
4724 882 · 10 293158 − 1 293161 L1958 12<br />
4725 4785 · 2 973803 + 1 293148 L2719 12<br />
4726 6 · 10 293134 − 1 293135 p297 10 Near-repdigit<br />
4727 3003 · 2 973751 − 1 293132 L615 09<br />
4728 7915 · 2 973740 + 1 293129 L3243 12<br />
4729 6511 · 2 973684 + 1 293112 L3080 12<br />
4730 9625 · 2 973610 + 1 293090 L3110 12<br />
4731 9911 · 2 973553 + 1 293073 L1158 12<br />
4732 885 · 2 973523 − 1 293063 L1817 11<br />
4733 6465 · 2 973477 + 1 293050 L2826 12<br />
4734 2547 · 2 973390 + 1 293023 L1484 12<br />
4735 7959 · 2 973378 + 1 293020 L1158 12<br />
4736 7397 · 2 973263 + 1 292986 L3239 12<br />
4737 1395 · 2 973213 + 1 292970 L1204 12<br />
4738 9795 · 2 973073 + 1 292929 L3221 12<br />
4739 4019 · 2 972976 − 1 292899 L1959 12<br />
4740 1863 · 2 972926 + 1 292884 L1204 12<br />
4741 1689 · 2 972924 − 1 292883 L1809 13<br />
4742 145 · 2 972835 − 1 292855 L639 08<br />
4743 6789 · 2 972766 + 1 292836 L3241 12<br />
4744 339 · 2 972755 + 1 292831 L1446 10<br />
4745 3213 · 2 972741 + 1 292828 L2117 12<br />
4746 1839 · 2 972724 − 1 292823 L1809 13<br />
4747 8345 · 2 972661 + 1 292805 L3110 12<br />
4748 7049 · 2 972527 + 1 292764 L3110 12<br />
4749 2093 · 2 972520 − 1 292762 L1959 11<br />
4750 3269 · 2 972487 + 1 292752 L3110 12<br />
96
ank description digits who year comment<br />
4751 7593 · 2 972321 + 1 292702 L3141 12<br />
4752 4639 · 2 972318 + 1 292701 L3238 12<br />
4753 1839 · 2 972319 + 1 292701 L3110 12<br />
4754 1157 · 2 972310 − 1 292698 L1828 11<br />
4755 2801 · 2 972269 + 1 292686 L3141 12<br />
4756 3947 · 2 972235 + 1 292676 L3110 12<br />
4757 1371 · 2 972151 + 1 292650 L3035 12<br />
4758 865 · 2 972132 + 1 292644 L1464 11<br />
4759 9583 · 2 972070 + 1 292627 L3237 12<br />
4760 6925 · 2 971932 + 1 292585 L1176 12<br />
4761 3231 · 2 971843 + 1 292558 L3022 12<br />
4762 1155 · 2 971743 + 1 292527 L2085 11<br />
4763 693 · 2 971735 − 1 292525 L565 11<br />
4764 6025 · 2 971686 + 1 292511 L3141 12<br />
4765 1533 · 2 971674 − 1 292507 L1809 13<br />
4766 61 · 2 971585 − 1 292479 L80 08<br />
4767 2625 · 2 971577 − 1 292478 L2953 12<br />
4768 2863 · 2 971434 + 1 292435 L3110 12<br />
4769 1939 · 2 971329 − 1 292403 L1819 13<br />
4770 6517 · 2 971214 + 1 292369 L1158 12<br />
4771 9275 · 2 971093 + 1 292333 L1741 12<br />
4772 585 · 2 971070 + 1 292324 L2419 11<br />
4773 1295 · 2 971034 − 1 292314 L1828 11<br />
4774 5223 · 2 970984 + 1 292300 L1158 12<br />
4775 3615 · 2 970934 − 1 292284 L862 11<br />
4776 2031 · 2 970895 + 1 292272 L2038 12<br />
4777 8073 · 2 970884 + 1 292270 L2912 12<br />
4778 28 · 898 98959 + 1 292255 p258 10<br />
4779 833 · 2 970796 − 1 292242 L1817 11<br />
4780 1933 · 2 970638 + 1 292195 L1204 12<br />
4781 9101981 · 2 970623 + 1 292194 L1134 11<br />
4782 1177 · 2 970588 + 1 292180 L1524 11<br />
4783 1655 · 2 970569 + 1 292174 L3173 12<br />
4784 7425 · 2 970512 + 1 292158 L3141 12<br />
4785 5947 · 2 970494 + 1 292152 L1158 12<br />
4786 6633 · 2 970457 + 1 292141 L2413 12<br />
4787 9537 · 2 970448 + 1 292138 L1745 12<br />
4788 31503 · 2 970446 + 1 292138 L1927 12<br />
4789 2001 · 2 970439 + 1 292135 L1745 12<br />
4790 4559 · 2 970405 + 1 292125 L1158 12<br />
4791 413 · 2 970353 + 1 292108 L1446 11<br />
4792 1779 · 2 970305 + 1 292095 L3110 12<br />
4793 6871 · 2 970052 + 1 292019 L1204 12<br />
4794 657 · 2 970025 − 1 292010 L1815 11<br />
4795 28215 · 2 969997 − 1 292003 L1828 11<br />
4796 7483 · 2 969984 + 1 291999 L2413 12<br />
4797 5977 · 2 969982 + 1 291998 L3221 12<br />
4798 4419 · 2 969971 + 1 291995 L2826 12<br />
4799 79 · 2 969795 − 1 291940 L80 08<br />
4800 1679 · 2 969772 − 1 291934 L1809 13<br />
97
ank description digits who year comment<br />
4801 8075 · 2 969729 + 1 291922 L2834 12<br />
4802 1909 · 2 969667 − 1 291903 L1809 13<br />
4803 9463 · 2 969634 + 1 291893 L1745 12<br />
4804 8991 · 2 969609 + 1 291886 L3085 12<br />
4805 3951 · 2 969603 + 1 291884 L2322 12<br />
4806 1181 · 2 969571 + 1 291874 L1524 11<br />
4807 5939 · 2 969273 + 1 291785 L2675 12<br />
4808 3321 · 2 969236 + 1 291773 L1186 12<br />
4809 5975 · 2 969199 + 1 291762 L3223 12<br />
4810 2871 · 2 969188 + 1 291759 L2910 12<br />
4811 7893 · 2 969117 + 1 291738 L2626 12<br />
4812 229 · 2 969073 − 1 291723 L268 08<br />
4813 2383 · 2 969066 + 1 291722 L3152 12<br />
4814 4035 · 2 969017 − 1 291707 L1959 12<br />
4815 5145 · 2 968979 + 1 291696 L3110 12<br />
4816 1003205 · 10 291677 − 1 291684 L1958 12<br />
4817 123 · 2 968927 − 1 291679 L384 09<br />
4818 605 · 2 968871 + 1 291663 L1173 11<br />
4819 1603 · 2 968823 − 1 291648 L1809 13<br />
4820 4257 · 2 968754 + 1 291628 L3110 12<br />
4821 2593 · 2 968660 + 1 291600 L3234 12<br />
4822 95 · 2 968636 − 1 291591 L80 08<br />
4823 143 · 2 968622 − 1 291587 L621 08<br />
4824 7777 · 2 968586 + 1 291578 L2827 12<br />
4825 141 · 2 968467 + 1 291540 L669 09<br />
4826 1683 · 2 968370 + 1 291512 L3166 12<br />
4827 23241 · 2 968357 + 1 291509 L1927 12<br />
4828 4117 · 2 968357 − 1 291509 L1959 12<br />
4829 9507 · 2 968318 + 1 291497 L1218 12<br />
4830 8675 · 2 968301 + 1 291492 L3035 12<br />
4831 9355 · 2 968276 + 1 291485 L1125 12<br />
4832 7509 · 2 968197 + 1 291461 L3110 12<br />
4833 1555 · 2 968195 − 1 291459 L1819 13<br />
4834 6915 · 2 968161 + 1 291450 L3110 12<br />
4835 5679 · 2 968073 + 1 291423 L1584 12<br />
4836 8819 · 2 968065 + 1 291421 L1745 12<br />
4837 5793 · 2 968009 + 1 291404 L1204 12<br />
4838 4017 · 2 967996 + 1 291400 L2038 12<br />
4839 1767 · 2 967994 − 1 291399 L1809 13<br />
4840 5233 · 2 967930 + 1 291380 L2998 12<br />
4841 1433 · 2 967914 − 1 291375 L1809 13<br />
4842 1725 · 2 967890 − 1 291368 L1809 13<br />
4843 5587 · 2 967782 + 1 291336 L1379 12<br />
4844 5705 · 2 967779 + 1 291335 L3187 12<br />
4845 14 · 953 97789 + 1 291324 L1471 11<br />
4846 111546435 · 2 967673 − 1 291307 L466 11<br />
4847 8305 · 2 967680 + 1 291305 L3141 12<br />
4848 7755 · 2 967652 + 1 291297 L3141 12<br />
4849 6721 · 2 967604 + 1 291282 L2279 12<br />
4850 2021 · 2 967473 + 1 291242 L3035 12<br />
98
ank description digits who year comment<br />
4851 7165 · 2 967462 + 1 291239 L2085 12<br />
4852 2613 · 2 967460 + 1 291238 L3232 12<br />
4853 2835 · 2 967424 − 1 291228 L282 10<br />
4854 8001 · 2 967392 + 1 291218 L2279 12<br />
4855 2275 · 2 967389 − 1 291217 L1828 12<br />
4856 7641 · 2 967384 + 1 291216 L2849 12<br />
4857 7999 · 2 967362 + 1 291209 L1218 12<br />
4858 8961 · 2 967287 + 1 291187 L3187 12<br />
4859 987 · 2 967188 − 1 291156 L1827 11<br />
4860 2039 · 2 967177 + 1 291153 L1792 12<br />
4861 3777 · 2 967076 + 1 291123 L1745 12<br />
4862 4317 · 2 967063 + 1 291119 L3141 12<br />
4863 9489 · 2 967033 + 1 291110 L2826 12<br />
4864 2407 · 2 966958 + 1 291087 L1218 12<br />
4865 95 · 2 966925 + 1 291076 p241 09<br />
4866 4931 · 2 966755 + 1 291026 L3231 12<br />
4867 3001 · 2 966755 − 1 291026 L615 09<br />
4868 1325 · 2 966589 + 1 290976 L2826 12<br />
4869 6665 · 2 966575 + 1 290972 L1741 12<br />
4870 2031 · 2 966575 − 1 290972 L1828 12<br />
4871 4719 · 2 966535 + 1 290960 L1745 12<br />
4872 2559 · 2 966441 + 1 290932 L1478 12<br />
4873 19861029 · 2 966404 − 1 290924 L895 09<br />
4874 25 · 2 966414 + 1 290922 g279 04 Generalized Fermat<br />
4875 6915 · 2 966401 + 1 290920 L1728 12<br />
4876 1203 · 2 966383 − 1 290914 L1828 11<br />
4877 236418 · 17 236418 + 1 290906 g157 12 Generalized Cullen<br />
4878 5599 · 2 966242 + 1 290872 L2826 12<br />
4879 4349 · 2 966141 + 1 290842 L1204 12<br />
4880 8595 · 2 966034 + 1 290810 L3187 12<br />
4881 2625 · 2 965943 + 1 290782 L3221 12<br />
4882 3903 · 2 965921 + 1 290775 L1741 12<br />
4883 715 · 2 965837 − 1 290749 L2047 11<br />
4884 2487 · 2 965772 + 1 290730 L3187 12<br />
4885 5385 · 2 965685 + 1 290704 L2862 12<br />
4886 6629 · 2 965677 + 1 290702 L2826 12<br />
4887 453 · 2 965572 + 1 290669 L1446 11<br />
4888 27345 · 2 965562 + 1 290668 L1927 12<br />
4889 599 · 2 965537 + 1 290659 L2419 11<br />
4890 6763 · 2 965508 + 1 290651 L2517 12<br />
4891 5303 · 2 965417 + 1 290624 L3233 12<br />
4892 1527 · 2 965418 + 1 290623 L3221 12<br />
4893 6251 · 2 965379 + 1 290612 L2516 12<br />
4894 8925 · 2 965300 + 1 290589 L3035 12<br />
4895 4119 · 70 157484 + 1 290578 p255 11<br />
4896 9999 · 2 965251 − 1 290574 L1959 11<br />
4897 5957 · 2 965147 + 1 290542 L2038 12<br />
4898 1747 · 2 965098 + 1 290527 L1792 12<br />
4899 537 · 2 965096 − 1 290526 L1819 10<br />
4900 7335 · 2 965015 + 1 290503 L3110 12<br />
99
ank description digits who year comment<br />
4901 8723 · 2 964929 + 1 290477 L1741 12<br />
4902 7639 · 2 964918 + 1 290474 L2413 12<br />
4903 8695 · 2 964892 + 1 290466 L1741 12<br />
4904 3063 · 2 964826 + 1 290446 L3198 12<br />
4905 6893 · 2 964774 − 1 290430 L862 11<br />
4906 9165 · 2 964772 + 1 290430 L1792 12<br />
4907 7125 · 2 964631 + 1 290387 L2413 12<br />
4908 5585 · 2 964471 + 1 290339 L3022 12<br />
4909 247 · 2 964444 + 1 290329 L1446 10<br />
4910 1237 · 2 964437 − 1 290328 L1828 11<br />
4911 4935 · 2 964405 + 1 290319 L3141 12<br />
4912 7161 · 2 964387 + 1 290314 L1741 12<br />
4913 7693 · 2 964370 + 1 290309 L1745 12<br />
4914 1713 · 2 964268 − 1 290277 L1817 12<br />
4915 5043 · 2 964242 + 1 290270 L1741 12<br />
4916 2035 · 2 964236 + 1 290268 L3141 12<br />
4917 10 290253 − 2 · 10 145126 − 1 290253 p235 12 Near-repdigit, Palindrome<br />
4918 3103 · 2 964120 + 1 290233 L1741 12<br />
4919 1473 · 2 964061 + 1 290215 L1745 12<br />
4920 2139 · 2 963998 + 1 290196 L2533 12<br />
4921 2291 · 2 963971 + 1 290188 L1933 12<br />
4922 5355 · 2 963837 − 1 290148 L1828 11<br />
4923 1099 · 2 963838 + 1 290148 L2176 11<br />
4924 4327 · 2 963814 + 1 290141 L2931 12<br />
4925 829 · 2 963783 − 1 290131 L1827 11<br />
4926 1557 · 2 963773 − 1 290128 L1817 12<br />
4927 1015 · 2 963736 + 1 290117 L1132 11<br />
4928 22911 · 2 963712 + 1 290111 L1927 12<br />
4929 3471 · 2 963701 + 1 290107 L1204 12<br />
4930 195 · 2 963608 − 1 290078 L323 09<br />
4931 157 · 2 963590 + 1 290072 L669 09<br />
4932 665 · 2 963554 − 1 290062 L2028 11<br />
4933 4145 · 2 963525 + 1 290054 L2959 12<br />
4934 3441 · 2 963420 + 1 290022 L2997 12<br />
4935 491 · 2 963373 + 1 290007 L1820 11<br />
4936 2337 · 2 963347 + 1 290000 L2413 12<br />
4937 8429 · 2 963331 + 1 289996 L1741 12<br />
4938 5445 · 2 963302 + 1 289987 L2823 12<br />
4939 8053 · 2 963300 + 1 289987 L2085 12<br />
4940 6519 · 2 963269 + 1 289977 L2038 12<br />
4941 3825 · 2 963209 + 1 289959 L2085 12<br />
4942 28665 · 2 963173 − 1 289949 L1828 11<br />
4943 705 · 2 963099 − 1 289925 L696 11<br />
4944 6735 · 2 963094 + 1 289925 L1218 12<br />
4945 515 · 2 963097 + 1 289924 L203 11<br />
4946 6619 · 2 963086 + 1 289922 L2826 12<br />
4947 4749 · 2 963078 + 1 289920 L2974 12<br />
4948 813 · 2 963061 + 1 289914 L1393 11<br />
4949 9867 · 2 962999 + 1 289896 L2826 12<br />
4950 9245 · 2 962937 + 1 289877 L2085 12<br />
100
ank description digits who year comment<br />
4951 2383 · 2 962876 + 1 289858 L3110 12<br />
4952 2557 · 2 962792 + 1 289833 L3093 12<br />
4953 2985 · 2 962780 + 1 289830 L3141 12<br />
4954 1293 · 2 962742 − 1 289818 L1828 11<br />
4955 1251 · 2 962729 − 1 289814 L1828 11<br />
4956 27615 · 2 962661 − 1 289795 L1828 11<br />
4957 4263 · 2 962618 + 1 289781 L1745 12<br />
4958 255 · 2 962590 − 1 289771 g320 08<br />
4959 11961 · 2 962562 − 1 289765 L1828 11<br />
4960 4047 · 2 962519 + 1 289751 L3110 12<br />
4961 18975 · 2 962429 − 1 289725 L1828 11<br />
4962 7721 · 2 962393 + 1 289714 L2117 12<br />
4963 549 · 2 962377 − 1 289708 L1817 10<br />
4964 1797 · 2 962338 + 1 289696 L3187 12<br />
4965 1945 · 2 962287 − 1 289681 L1819 12<br />
4966 9123 · 2 962210 + 1 289659 L2085 12<br />
4967 1227 · 2 962139 + 1 289636 L3049 12<br />
4968 2801 · 2 962023 + 1 289602 L2997 12<br />
4969 135 · 2 961897 − 1 289562 L323 08<br />
4970 6741 · 2 961888 + 1 289561 L3187 12<br />
4971 9711 · 2 961876 + 1 289558 L3141 12<br />
4972 6723 · 2 961834 − 1 289545 L862 11<br />
4973 9491 · 2 961825 + 1 289543 L2117 12<br />
4974 3603 · 2 961825 + 1 289542 L2085 12<br />
4975 1817 · 2 961820 − 1 289540 L1819 12<br />
4976 1405 · 2 961819 − 1 289540 L1817 12<br />
4977 1561 · 2 961803 − 1 289535 L1819 12<br />
4978 1699 · 2 961715 − 1 289509 L1817 12<br />
4979 709 · 2 961674 + 1 289496 L1820 11<br />
4980 2465 · 2 961613 + 1 289478 L3110 12<br />
4981 4151 · 2 961565 + 1 289464 L3110 12<br />
4982 9321 · 2 961365 + 1 289404 L3167 12<br />
4983 9997 · 2 961352 + 1 289400 L3110 12<br />
4984 7707 · 2 961297 − 1 289384 L862 11<br />
4985 3459 · 2 961235 + 1 289365 L1728 12<br />
4986 3211 · 2 961224 + 1 289361 L3141 12<br />
4987 7995 · 2 961213 + 1 289358 L1745 12<br />
4988 1065 · 2 961019 − 1 289299 L121 10<br />
4989 1433 · 2 960990 − 1 289290 L1817 12<br />
4990 7133 · 2 960897 + 1 289263 L3110 12<br />
4991 11 · 2 960901 + 1 289262 g277 05 Divides Fermat F (960897)<br />
4992 9423 · 2 960762 + 1 289223 L3110 12<br />
4993 4635 · 2 960685 + 1 289199 L3035 12<br />
4994 1463 · 2 960642 − 1 289186 L1817 12<br />
4995 5831 · 2 960633 + 1 289184 L1130 12<br />
4996 7587 · 2 960536 + 1 289155 L2222 12<br />
4997 7205 · 2 960481 + 1 289138 L2085 12<br />
4998 6207 · 2 960351 + 1 289099 L1408 12<br />
4999 1145 · 2 960321 + 1 289089 L2356 11<br />
5000 2947 · 2 960292 + 1 289081 L2322 12<br />
101
ank description digits who year comment<br />
5116 148306 · 87 148306 − 1 287648 L2911 12 Generalized Woodall<br />
5139 2 · 827 98511 + 1 287407 g404 09 Divides P hi(827 98511 , 2)<br />
5192 102498 · 5 409992 − 1 286578 L2841 11 Generalized Woodall<br />
5305 143717 · 96 143717 + 1 284892 g157 09 Generalized Cullen<br />
5618 122095 · 198 122095 + 1 280417 g407 12 Generalized Cullen<br />
5695 2 · 131 131925 + 1 279322 g424 10 Divides P hi(131 131925 , 2)<br />
5829 873 · 2 922545 + 1 277717 L153 10 Divides GF (922543, 3)<br />
5867 138846 · 99 138846 + 1 277092 g157 10 Generalized Cullen<br />
5965 113 · 2 916801 + 1 275987 L153 09 Divides GF (916800, 5),<br />
GF (916800, 12)<br />
5966 3 · 2 916773 + 1 275977 g245 01 Divides GF (916771, 3),<br />
GF (916772, 10)<br />
6009 [ Long prime 6009 ] 275495 p44 12 Palindrome<br />
6186 1705 · 2 906110 + 1 272770 L3174 12 Divides Fermat F (906108)<br />
6371 6 · 10 270658 − 1 270659 p297 10 Near-repdigit<br />
6450 10 269479 − 7 · 10 134739 − 1 269479 p235 12 Near-repdigit, Palindrome<br />
6459 43 · 2 894766 + 1 269354 g279 06 Divides GF (894765, 5)<br />
6594 6 · 10 267598 − 1 267599 p297 10 Near-repdigit<br />
6648 11 · 2 886071 + 1 266735 g277 05 Divides GF (886070, 12)<br />
7139 9 · 10 260253 − 1 260254 p297 10 Near-repdigit<br />
7271 2 859433 − 1 258716 SG 94 Mersenne 33<br />
7549 P hi(3, −3 267414 + 1)/3 255178 x28 05 Generalized unique<br />
7914 249 · 2 832207 + 1 250522 L669 10 Divides GF (832206, 5)<br />
7936 35 · 2 831411 + 1 250282 g279 06 Divides GF (831410, 3)<br />
8025 2 · 239 104781 + 1 249212 g424 11 Divides P hi(239 104781 , 2)<br />
8137 1815 · 2 823632 + 1 247942 L1741 12 Divides GF (823629, 12)<br />
8343 459 · 2 816031 + 1 245653 L1498 11 Divides GF (816030, 5)<br />
8485 7 · 2 811230 + 1 244206 g148 02 Divides GF (811228, 5)<br />
8659 7 · 2 804534 + 1 242190 g196 03 Divides GF (804533, 12)<br />
8819 42014 · 3 504169 + 1 240555 L2777 11 Generalized Cullen<br />
9040 129897 · 68 129897 + 1 238043 p277 10 Generalized Cullen<br />
9058 5215 · 2 789906 + 1 237790 L2659 12 Divides GF (789905, 6)<br />
9470 136628 · 51 136628 + 1 233308 g157 12 Generalized Cullen<br />
9949 2 756839 − 1 227832 SG 92 Mersenne 32<br />
10581 [ Long prime 10581 ] 221071 x34 08 Generalized unique<br />
10787 59 · 2 727815 + 1 219096 p227 08 Divides GF (727814, 12)<br />
10858 2 · 83 113849 + 1 218486 g424 10 Divides P hi(83 113849 , 2)<br />
11512 75 · 2 705688 + 1 212436 p227 08 Divides GF (705684, 12)<br />
11980 P hi(3, −2322573 16384 ) 208601 p72 08 Generalized unique<br />
11985 P hi(3, −2313516 16384 ) 208545 p72 08 Generalized unique<br />
12093 P hi(3, −2182528 16384 ) 207716 f7 07 Generalized unique<br />
12096 P hi(3, −2178996 16384 ) 207692 f7 07 Generalized unique<br />
12109 2 · 683 73237 + 1 207585 g404 08 Divides P hi(683 73237 , 2)<br />
12152 P hi(3, −2115084 16384 ) 207269 f7 07 Generalized unique<br />
12160 P hi(3, −2110199 16384 ) 207236 f7 07 Generalized unique<br />
12184 P hi(3, −2074507 16384 ) 206993 f7 07 Generalized unique<br />
12222 P hi(3, −2029827 16384 ) 206683 f7 06 Generalized unique<br />
12260 P hi(3, −1989801 16384 ) 206400 f7 06 Generalized unique<br />
12265 P hi(3, −3898771219232 8192 ) 206290 f14 07 Generalized unique<br />
12280 P hi(3, −3824990769800 8192 ) 206154 f14 07 Generalized unique<br />
102
ank description digits who year comment<br />
12286 P hi(3, −3804263911368 8192 ) 206116 f14 07 Generalized unique<br />
12288 P hi(3, −1949616 16384 ) 206110 f7 06 Generalized unique<br />
12292 13 · 2 684560 + 1 206075 g267 03 Divides GF (684557, 10),<br />
GF (684559, 6)<br />
12294 P hi(3, −3775889401250 8192 ) 206062 f14 07 Generalized unique<br />
12297 P hi(3, −3757143544200 8192 ) 206027 f14 07 Generalized unique<br />
12303 P hi(3, −1932045 16384 ) 205981 f7 06 Generalized unique<br />
12312 P hi(3, −1925507 16384 ) 205932 f7 06 Generalized unique<br />
12325 P hi(3, −1910944 16384 ) 205824 f7 06 Generalized unique<br />
12421 10 205030 + 7047407 · 10 102512 + 1 205031 D 11 Palindrome<br />
12747 27 · 2 672007 + 1 202296 g279 05 Divides Fermat F (672005)<br />
12946 667071 · 2 667071 − 1 200815 g55 00 Woodall<br />
12969 18543637900515 · 2 666668 − 1 200701 L2429 12 Sophie Germain (2p + 1)<br />
12970 9094283341425 · 2 666669 − 1 200701 p199 11 Arithmetic progression (3, d =<br />
32289415560495 · 2 666666 )<br />
13016 40464851170905 · 2 666666 − 1 200701 L1008 11 Arithmetic progression (2, d =<br />
32289415560495 · 2 666666 ) [p199]<br />
13069 18543637900515 · 2 666667 − 1 200701 L2429 12 Sophie Germain (p)<br />
13070 3756801695685 · 2 666669 + 1 200700 L1921 11 Twin (p + 2)<br />
13071 3756801695685 · 2 666669 − 1 200700 L1921 11 Twin (p)<br />
13192 26767338410445 · 2 666666 − 1 200700 p199 11 Arithmetic progression (3, d =<br />
12521740750545 · 2 666666 )<br />
13493 23716957113345 · 2 666666 − 1 200700 p199 11 Arithmetic progression (3, d =<br />
2697434638065 · 2 666668 )<br />
13543 11638738675125 · 2 666667 − 1 200700 p199 11 Arithmetic progression (3, d =<br />
9571322415225 · 2 666666 )<br />
14344 14646182194005 · 2 666666 − 1 200700 p199 11 Arithmetic progression (3, d =<br />
3388839720735 · 2 666666 )<br />
14386 3561399414975 · 2 666668 − 1 200700 L1661 11 Arithmetic progression (2, d =<br />
12521740750545 · 2 666666 ) [p199]<br />
14446 13706154935025 · 2 666666 − 1 200700 L967 11 Arithmetic progression (2, d =<br />
9571322415225 · 2 666666 ) [p199]<br />
14546 12927218561085 · 2 666666 − 1 200700 L2078 11 Arithmetic progression (2, d =<br />
2697434638065 · 2 666668 ) [p199]<br />
14713 5628671236635 · 2 666667 − 1 200700 L1945 11 Arithmetic progression (2, d =<br />
3388839720735 · 2 666666 ) [p199]<br />
15021 4087717805205 · 2 666667 − 1 200700 L1633 10 Arithmetic progression (1, d =<br />
32289415560495 · 2 666666 ) [p199]<br />
15068 7868502752535 · 2 666666 − 1 200700 L1183 10 Arithmetic progression (1, d =<br />
3388839720735 · 2 666666 ) [p199]<br />
15438 516854064975 · 2 666669 − 1 200700 L1286 10 Arithmetic progression (1, d =<br />
9571322415225 · 2 666666 ) [p199]<br />
15628 2137480008825 · 2 666666 − 1 200699 L1706 10 Arithmetic progression (1, d =<br />
2697434638065 · 2 666668 ) [p199]<br />
15673 1723856909355 · 2 666666 − 1 200699 L934 10 Arithmetic progression (1, d =<br />
12521740750545 · 2 666666 ) [p199]<br />
15919 2 · 419 76419 + 1 200388 g404 07 Divides P hi(419 76419 , 2)<br />
15989 10 200000 +47960506974·10 99995 +1 200001 p288 10 Palindrome<br />
16486 2 · 7919 50227 + 1 195819 g428 12 Divides P hi(7919 50227 , 2)<br />
16943 2 · 11987 47063 + 1 191957 g426 11 Divides P hi(11987 47063 , 2)<br />
103
ank description digits who year comment<br />
17152 10190004 + 214757412 · 1094998 + 1 190005 D 10 Palindrome<br />
17232 2 · 19183009 + 1 189347 g404 06 Divides P hi(19183009 , 2)<br />
17620 659 · 2617815 + 1 185984 L732 09 Divides Fermat F (617813)<br />
17730 10185008 + 130525031 · 1092500 + 1 185009 D 10 Palindrome<br />
17974 2 · 13186365 + 1 182859 g404 07 Divides P hi(13186365 , 2)<br />
18358 10180054 +8·R(58567)·1060744 +1 180055 p235 09 Tetradic palindrome<br />
18366 10180004 + 248797842 · 1089998 + 1 180005 D 07 Palindrome<br />
18748 351 · 2588325 + 1 177107 L651 09 Divides GF (588323, 6)<br />
18896 151 · 2585044 + 1 176118 L446 07 Divides Fermat F (585042)<br />
19019 10175108 + 230767032 · 1087550 + 1 175109 D 07 Palindrome<br />
19640 519 · 2567235 + 1 170758 L656 09 Divides Fermat F (567233)<br />
19748 10170006 + 3880883 · 1085000 + 1 170007 D 06 Palindrome<br />
19752 392113# + 1 169966 p16 01 Primorial<br />
19858 7 · 2561816 + 1 169125 g148 03 Divides GF (561815, 5);<br />
GF (561815, 6) [p149]<br />
21212 2 · 103153111 + 1 160038 g404 09 Divides P hi(103153111 , 2)<br />
21217 10160016 + 8231328 · 1080005 + 1 160017 D 06 Palindrome<br />
21391 366439# + 1 158936 p16 01 Primorial<br />
21484 345 · 2525977 + 1 158338 g258 07 Divides GF (525974, 6)<br />
21509 11 · 2525589 + 1 158220 p116 03 Divides GF (525588, 6)<br />
22135 39 · 2512997 + 1 154430 g267 05 Divides GF (512994, 5),<br />
GF (512995, 6)<br />
22415 2 · 19166971 + 1 152764 g404 06 Divides P hi(19166971 , 2)<br />
22855 2 · 43156947 + 1 150026 g404 07 Divides P hi(43156947 , 2)<br />
22858 10150008 + 4798974 · 1075001 + 1 150009 D 06 Palindrome<br />
22860 10150006 + 7426247 · 1075000 + 1 150007 p5 05 Palindrome<br />
22891 2 · 193145605 + 1 149849 g404 07 Divides P hi(193145605 , 2)<br />
22990 243 · 2495732 + 1 149233 L165 07 Divides Fermat F (495728),<br />
GF (495726, 3), GF (495728, 6),<br />
GF (495727, 12)<br />
23667 9265 · 2482072 + 1 145123 L635 09 Divides GF (482070, 10)<br />
23672 481899 · 2481899 + 1 145072 gm 98 Cullen<br />
23782 2 · 59951983 + 1 144380 g404 08 Divides P hi(59951983 , 2)<br />
23935 651 · 2476632 + 1 143484 L668 08 Divides Fermat F (476624)<br />
24020 34790! − 1 142891 p85 02 Factorial<br />
24028 6841 · 2474348 + 1 142797 L1065 09 Divides GF (474347, 10)<br />
24155 89 · 2472099 + 1 142118 p114 04 Divides Fermat F (472097)<br />
24526 10140008 + 4546454 · 1070001 + 1 140009 D 05 Palindrome<br />
24670 3911 · 2462579 + 1 139254 L679 09 Divides GF (462577, 10)<br />
24741 9 · 2461081 + 1 138801 g122 03 Divides Fermat F (461076),<br />
GF (461077, 3), GF (461077, 6),<br />
GF (461077, 12)<br />
25008 4377 · 2456708 + 1 137487 L872 09 Divides GF (456707, 10)<br />
25443 10134809 − 1067404 − 1 134809 p235 10 Near-repdigit, palindrome<br />
25793 9 · 2435743 + 1 131173 g122 03 Divides GF (435742, 10)<br />
25942 10130048 + (9 · 1037077 − 2)/11 ·<br />
130049 p235 08 Tetradic palindrome<br />
10 46486 + 1<br />
25947 10 130036 + 116010611 · 10 65014 + 1 130037 D 04 Palindrome<br />
25949 10 130022 + 3761673 · 10 65008 + 1 130023 D 04 Palindrome<br />
26594 1207 · 2 410108 + 1 123458 g380 05 Divides Fermat F (410105)<br />
104
ank description digits who year comment<br />
26793 15 · 2 403929 + 1 121596 p114 02 Divides GF (403927, 10)<br />
27486 3 · 2 382449 + 1 115130 g132 99 Divides Fermat F (382447),<br />
GF (382447, 3), GF (382447, 12),<br />
GF (382443, 6)<br />
28198 2 364289 − 2 182145 + 1 109662 p58 01 Gaussian Mersenne norm 35<br />
28332 361275 · 2 361275 + 1 108761 DS 98 Cullen<br />
28499 26951! + 1 107707 p65 02 Factorial<br />
30000 65516468355 · 2 333333 + 1 100355 L923 09 Twin (p + 2)<br />
30001 65516468355 · 2 333333 − 1 100355 L923 09 Twin (p)<br />
34870 21480! − 1 83727 p65 01 Factorial<br />
35279 183027 · 2 265441 − 1 79911 L983 10 Sophie Germain (2p + 1)<br />
35280 183027 · 2 265440 − 1 79911 L983 10 Sophie Germain (p)<br />
35355 262419 · 2 262419 + 1 79002 DS 98 Cullen<br />
35690 648621027630345 · 2 253825 − 1 76424 x24 09 Sophie Germain (2p + 1)<br />
35691 620366307356565 · 2 253825 − 1 76424 x24 09 Sophie Germain (2p + 1)<br />
35692 648621027630345 · 2 253824 − 1 76424 x24 09 Sophie Germain (p)<br />
35693 620366307356565 · 2 253824 − 1 76424 x24 09 Sophie Germain (p)<br />
37550 2 216091 − 1 65050 S 85 Mersenne 31<br />
37773 (63847 13339 − 1)/63846 64091 p170 13 Generalized repunit<br />
37931 145823# + 1 63142 p21 00 Primorial<br />
38206 2 203789 + 2 101895 + 1 61347 O 00 Gaussian Mersenne norm 34<br />
38464 (26371 13681 − 1)/26370 60482 p170 12 Generalized repunit<br />
39134 (4529 16381 − 1)/4528 59886 CH2 12 Generalized repunit<br />
39496 2003663613 · 2 195000 + 1 58711 L202 07 Twin (p + 2)<br />
39497 2003663613 · 2 195000 − 1 58711 L202 07 Twin (p)<br />
39754 primV (27655, 1, 19926) 57566 x25 13 Generalized Lucas primitive part<br />
41413 607095 · 2 176312 − 1 53081 L983 09 Sophie Germain (2p + 1)<br />
41414 607095 · 2 176311 − 1 53081 L983 09 Sophie Germain (p)<br />
41563 (38284 11491 − 1)/38283 52659 CH2 13 Generalized repunit<br />
41910 48047305725 · 2 172404 − 1 51910 L99 07 Sophie Germain (2p + 1)<br />
41911 48047305725 · 2 172403 − 1 51910 L99 07 Sophie Germain (p)<br />
42009 137211941292195 · 2 171961 − 1 51780 x24 06 Sophie Germain (2p + 1)<br />
42010 194772106074315 · 2 171960 + 1 51780 x24 07 Twin (p + 2)<br />
42011 194772106074315 · 2 171960 − 1 51780 x24 07 Twin (p)<br />
42012 137211941292195 · 2 171960 − 1 51780 x24 06 Sophie Germain (p)<br />
42013 100314512544015 · 2 171960 + 1 51780 x24 06 Twin (p + 2)<br />
42014 100314512544015 · 2 171960 − 1 51780 x24 06 Twin (p)<br />
42015 16869987339975 · 2 171960 + 1 51779 x24 05 Twin (p + 2)<br />
42016 16869987339975 · 2 171960 − 1 51779 x24 05 Twin (p)<br />
42230 (34120 11311 − 1)/34119 51269 CH2 11 Generalized repunit<br />
42828 33218925 · 2 169690 + 1 51090 g259 02 Twin (p + 2)<br />
42829 33218925 · 2 169690 − 1 51090 g259 02 Twin (p)<br />
43560 2 160423 − 2 80212 + 1 48293 O 00 Gaussian Mersenne norm 33<br />
43684 primV (40395, −1, 15588) 47759 x23 07 Generalized Lucas primitive part<br />
43753 primV (53394, −1, 15264) 47200 CH4 07 Generalized Lucas primitive part<br />
43961 22835841624 · 7 54321 + 1 45917 p296 10 Twin (p + 2)<br />
43962 22835841624 · 7 54321 − 1 45917 p296 10 Twin (p)<br />
43998 1679081223 · 2 151618 + 1 45651 L527 12 Twin (p + 2)<br />
43999 1679081223 · 2 151618 − 1 45651 L527 12 Twin (p)<br />
44026 151023 · 2 151023 − 1 45468 g25 98 Woodall<br />
105
ank description digits who year comment<br />
44599 648309 · 2 148311 + 1 44652 L983 10 Cunningham chain 2nd kind<br />
(2p − 1)<br />
44600 648309 · 2 148310 + 1 44652 L983 10 Cunningham chain 2nd kind (p)<br />
44798 71509 · 2 143019 − 1 43058 g23 98 Woodall, arithmetic progression<br />
(2, d = (143018 · 2 83969 − 80047) ·<br />
2 59049 ) [x12]<br />
44901 84966861 · 2 140219 + 1 42219 L3121 12 Twin (p + 2)<br />
44902 84966861 · 2 140219 − 1 42219 L3121 12 Twin (p)<br />
44910 31737014565 · 2 140004 − 1 42156 L95 10 Sophie Germain (2p + 1)<br />
44911 31737014565 · 2 140003 − 1 42156 L95 10 Sophie Germain (p)<br />
44912 14962863771 · 2 140002 − 1 42155 L95 10 Sophie Germain (2p + 1)<br />
44913 12378188145 · 2 140002 + 1 42155 L95 10 Twin (p + 2)<br />
44914 12378188145 · 2 140002 − 1 42155 L95 10 Twin (p)<br />
44915 23272426305 · 2 140001 + 1 42155 L95 10 Twin (p + 2)<br />
44916 23272426305 · 2 140001 − 1 42155 L95 10 Twin (p)<br />
44917 14962863771 · 2 140001 − 1 42155 L95 10 Sophie Germain (p)<br />
44958 (32556 9283 − 1)/32555 41887 CH2 11 Generalized repunit<br />
45227 (1549 12973 − 1)/1548 41382 p170 10 Generalized repunit<br />
45276 552903 · 2 136157 + 1 40994 L983 10 Cunningham chain 2nd kind<br />
(2p − 1)<br />
45277 552903 · 2 136156 + 1 40993 L983 10 Cunningham chain 2nd kind (p)<br />
46117 2 132049 − 1 39751 S 83 Mersenne 30<br />
46130 primV (4836, 1, 16704) 39616 x25 13 Generalized Lucas primitive part<br />
46621 8151728061 · 2 125987 + 1 37936 p35 10 Twin (p + 2)<br />
46622 8151728061 · 2 125987 − 1 37936 p35 10 Twin (p)<br />
46719 163221 · 2 124601 + 1 37514 L983 09 Cunningham chain 2nd kind<br />
(2p − 1)<br />
46720 163221 · 2 124600 + 1 37514 L983 09 Cunningham chain 2nd kind (p)<br />
46771 33759183 · 2 123459 − 1 37173 L527 09 Sophie Germain (2p + 1)<br />
46772 33759183 · 2 123458 − 1 37173 L527 09 Sophie Germain (p)<br />
46795 (28839 8317 − 1)/28838 37090 CH6 06 Generalized repunit<br />
46951 (4366 10099 − 1)/4365 36758 x14 11 Generalized repunit<br />
46990 7068555 · 2 121302 − 1 36523 L100 05 Sophie Germain (2p + 1)<br />
46991 7068555 · 2 121301 − 1 36523 L100 05 Sophie Germain (p)<br />
47148 598899 · 2 118987 + 1 35825 L983 10 Twin (p + 2)<br />
47149 598899 · 2 118987 − 1 35825 L983 10 Twin (p)<br />
47151 441797560 · 3 75001 + 1 35794 L3323 12 Cunningham chain 2nd kind<br />
(2p − 1)<br />
47153 220898780 · 3 75001 + 1 35793 L3323 12 Cunningham chain 2nd kind (p)<br />
47305 307259241 · 2 115599 + 1 34808 g336 09 Twin (p + 2)<br />
47306 307259241 · 2 115599 − 1 34808 g336 09 Twin (p)<br />
47339 primV (38513, −1, 11502) 34668 x23 06 Generalized Lucas primitive part<br />
47384 2540041185 · 2 114730 − 1 34547 g294 03 Sophie Germain (2p + 1)<br />
47392 2540041185 · 2 114729 − 1 34547 g294 03 Sophie Germain (p)<br />
47498 60194061 · 2 114689 + 1 34533 g294 02 Twin (p + 2)<br />
47499 60194061 · 2 114689 − 1 34533 g294 02 Twin (p)<br />
47552 primV (9008, 1, 16200) 34168 x23 05 Generalized Lucas primitive part<br />
47683 5558745 · 10 33334 + 1 33341 p311 11 Twin (p + 2)<br />
47684 5558745 · 10 33334 − 1 33341 p311 11 Twin (p)<br />
47780 2 110503 − 1 33265 WC 88 Mersenne 29<br />
106
ank description digits who year comment<br />
47786 108615 · 2110342 + 1 33222 L113 08 Twin (p + 2)<br />
47787 108615 · 2110342 − 1 33222 L113 08 Twin (p)<br />
47830 primV (6586, 1, 16200) 32993 x25 13 Generalized Lucas primitive part<br />
48182 1124044292325 · 2108000 − 1 32524 L99 06 Sophie Germain (2p + 1)<br />
48183 1124044292325 · 2107999 − 1 32523 L99 06 Sophie Germain (p)<br />
48184 112886032245 · 2108001 − 1 32523 L99 06 Sophie Germain (2p + 1)<br />
48185 112886032245 · 2108000 − 1 32523 L99 06 Sophie Germain (p)<br />
48267 1765199373 · 2107520 + 1 32376 g182 02 Twin (p + 2)<br />
48268 1765199373 · 2107520 − 1 32376 g182 02 Twin (p)<br />
49119 318032361 · 2107001 + 1 32220 p100 01 Twin (p + 2)<br />
49120 318032361 · 2107001 − 1 32220 p100 01 Twin (p)<br />
49157 2106693 + 253347 + 1 32118 O 00 Gaussian Mersenne norm 32<br />
49260 170152540 · 366215 − 1 31601 L3323 12 Sophie Germain (2p + 1)<br />
49261 85076270 · 366215 − 1 31601 L3323 12 Sophie Germain (p)<br />
49303 2243973027 · 2104568 + 1 31488 L99 12 Cunningham chain 2nd kind<br />
(2p − 1)<br />
49304 2243973027 · 2104567 + 1 31488 L99 12 Cunningham chain 2nd kind (p)<br />
49319 (V (77786, 1, 6453) +<br />
31429 x25 12 Lehmer primitive part<br />
1)/(V (77786, 1, 27) + 1)<br />
49401 primV (10987, 1, 14400) 31034 x25 05 Generalized Lucas primitive part<br />
49634 133603707 · 2100014 − 1 30116 L167 12 Sophie Germain (2p + 1)<br />
49635 133603707 · 2100013 − 1 30116 L167 12 Sophie Germain (p)<br />
49636 38588805195 · 2100003 − 1 30115 L95 09 Sophie Germain (2p + 1)<br />
49639 38588805195 · 2100002 − 1 30115 L95 09 Sophie Germain (p)<br />
49640 15744710163 · 2100003 − 1 30115 L95 09 Sophie Germain (2p + 1)<br />
49641 35909079387 · 2100001 − 1 30114 L95 09 Sophie Germain (2p + 1)<br />
49644 15744710163 · 2100002 − 1 30114 L95 09 Sophie Germain (p)<br />
49645 35909079387 · 2100000 − 1 30114 L95 09 Sophie Germain (p)<br />
49726 (113797411 − 1)/11378 30056 x14 09 Generalized repunit<br />
49793 49363 · 298727 − 1 29725 Y 97 Woodall<br />
49797 U(2341, −1, 8819) 29712 x25 08 Generalized Lucas number<br />
50306 18912879 · 298396 − 1 29628 p94 02 Sophie Germain (2p + 1)<br />
50307 18912879 · 298395 − 1 29628 p94 02 Sophie Germain (p)<br />
51315 primV (24127, −1, 6718) 29433 CH3 05 Generalized Lucas primitive part<br />
51449 (133206997 − 1)/13319 28856 x14 10 Generalized repunit<br />
51496 primV (45922, 1, 11520) 28644 x25 11 Generalized Lucas primitive part<br />
51508 primV (205011) 28552 x39 09 Lucas primitive part<br />
51539 U(16531, 1, 6721) −<br />
28347 x36 07 Lehmer number<br />
U(16531, 1, 6720)<br />
51719 90825 · 2 90825 + 1 27347 Y 97 Cullen<br />
51882 primV (5673, 1, 13500) 27028 CH3 05 Generalized Lucas primitive part<br />
51998 primV (44368, 1, 9504) 26768 CH3 05 Generalized Lucas primitive part<br />
52045 (3429 7549 − 1)/3428 26684 x14 09 Generalized repunit<br />
52059 ” tau;(157 2006 )” 26642 FE1 11<br />
ECPP<br />
52250 primV (10986, −1, 9756) 26185 x23 05 Generalized Lucas primitive part<br />
52351 primV (11076, −1, 12000) 25885 x25 05 Generalized Lucas primitive part<br />
52431 2 85237 + 2 42619 + 1 25659 x16 00 Gaussian Mersenne norm 31<br />
52509 primV (17505, 1, 11250) 25459 x25 11 Generalized Lucas primitive part<br />
52565 primV (42, −1, 23376) 25249 x23 07 Generalized Lucas primitive part<br />
107
ank description digits who year comment<br />
52601 primV (7577, −1, 10692) 25140 x33 07 Generalized Lucas primitive part<br />
52607 primV (44573, −1, 10125) 25105 CH4 07 Generalized Lucas primitive part<br />
52625 6753 5122 + 5122 6753 25050 FE1 10 ECPP<br />
52692 primV (13896, 1, 11250) 24858 x25 11 Generalized Lucas primitive part<br />
52729 primV (19285, 1, 10800) 24683 x25 05 Generalized Lucas primitive part<br />
52772 (13096 5953 − 1)/13095 24506 CH6 07 Generalized repunit<br />
53427 492590931 · 2 80000 − 1631979959 ·<br />
2 25001 − 1<br />
24092 p199 10 Arithmetic progression (4, d =<br />
164196977 · 2 80000 − 1631979959 ·<br />
2 25000 )<br />
53619 6917! − 1 23560 g1 98 Factorial<br />
53655 (89 11971 − 1)/88 23335 CH2 09 Generalized repunit<br />
53657 (23151 5347 − 1)/23150 23333 x14 08 Generalized repunit<br />
53672 2 77291 + 2 38646 + 1 23267 O 00 Gaussian Mersenne norm 30<br />
53678 (V (59936, 1, 4863) +<br />
1)/(V (59936, 1, 3) + 1)<br />
23220 x25 13 Lehmer primitive part<br />
53714 (58556121 − 1)/5854 23058 CH1 05 Generalized repunit<br />
53815 (V (45366, 1, 4857) +<br />
1)/(V (45366, 1, 3) + 1)<br />
22604 x25 13 Lehmer primitive part<br />
53857 (20086781 − 1)/2007 22393 CH6 10 Generalized repunit<br />
54041 U(19258, −1, 5039) 21586 x23 07 Generalized Lucas number<br />
54068 6380! + 1 21507 g1 98 Factorial<br />
54151 (V (23354, 1, 4869) −<br />
1)/(V (23354, 1, 9) − 1)<br />
21231 x25 13 Lehmer primitive part<br />
54152 (199794933 − 1)/19978 21211 x14 11 Generalized repunit<br />
54181 U(15631, 1, 5040) −<br />
U(15631, 1, 5039)<br />
21134 x25 03 Lehmer number<br />
54337 [ Long prime 54337 ] 20562 FE1 06 ECPP, Mills’ prime<br />
54396 U(11200, −1, 5039) 20400 x25 04 Generalized Lucas number, cyclotomy<br />
54625 U(8454, −1, 5039) 19785 x25 13 Generalized Lucas number<br />
54634 (94734969 − 1)/9472 19756 CH2 08 Generalized repunit<br />
55520 (142614663 − 1)/14260 19367 x14 07 Generalized repunit<br />
55691 U(6584, −1, 5039) 19238 x23 07 Generalized Lucas number<br />
55870 P hi(741, −638479 )/44250132909040111 18666 c54 13 ECPP<br />
55895 261792 + 21661 18602 c61 12 ECPP<br />
56098 42209# + 1 18241 p8 99 Primorial<br />
56600 (V (46662, 1, 3879) −<br />
1)/(V (46662, 1, 9) − 1)<br />
18069 x25 12 Lehmer primitive part<br />
56639 7457 · 259659 + 1 17964 Y 97 Cullen<br />
56937 U(9657, 1, 4321) −<br />
U(9657, 1, 4320)<br />
17215 x23 05 Lehmer number<br />
56987 U(81839) 17103 p54 01 Fibonacci number<br />
57035 256366 + 39079 16968 c61 12 ECPP<br />
57055 39161#/2310 − 510478 16901 c35 13 ECPP<br />
57148 6521953289619 · 255555 + 1 16737 p296 13 Triplet (3)<br />
57149 6521953289619 · 255555 − 1 16737 p296 13 Triplet (2)<br />
57150 6521953289619 · 255555 − 5 16737 c58 13 Triplet (3), ECPP<br />
57194 U(15823, 1, 3960) −<br />
U(15823, 1, 3959)<br />
16625 x25 02 Lehmer number, cyclotomy<br />
57259 U(10803, 1, 4081) −<br />
U(10803, 1, 4080)<br />
16457 x25 05 Lehmer number, cyclotomy<br />
108
ank description digits who year comment<br />
57296 U(11091, −1, 4049) 16375 CH3 05 Generalized Lucas number<br />
57343 (V (21151, 1, 3777) −<br />
1)/(V (21151, 1, 3) − 1)<br />
16324 x25 11 Lehmer primitive part<br />
57379 U(2554, −1, 4751) 16185 CH3 05 Generalized Lucas number<br />
57403 U(1599, −1, 5039) 16141 x23 07 Generalized Lucas number<br />
57464 U(2878, 1, 4620) −<br />
U(2878, 1, 4619)<br />
15978 x25 13 Lehmer number<br />
57465 U(10853, 1, 3960) +<br />
U(10853, 1, 3959)<br />
15977 x25 02 Lehmer number, cyclotomy<br />
57655 U(9667, 1, 3960) −<br />
U(9667, 1, 3959)<br />
15778 x25 02 Lehmer number, cyclotomy<br />
57673 P hi(2949, −100000000) 15713 c47 13 Unique, ECPP<br />
57677 U(14257, −1, 3779) 15694 x25 04 Generalized Lucas number, cyclotomy<br />
57745 [ Long prime 57745 ] 15537 x38 09 Lehmer primitive part<br />
57824 (V (824, 1, 5277) −<br />
1)/(V (824, 1, 3) − 1)<br />
15379 x25 13 Lehmer primitive part<br />
57854 P hi(285, −2637124 )/13082397832081 15267 c54 12 ECPP<br />
57867 U(13283, 1, 3697) +<br />
U(13283, 1, 3696)<br />
15240 x25 11 Lehmer number<br />
57880 728192 + 438192 15216 c60 12 ECPP<br />
58060 26384405 + 44052638 15071 FE3 04 ECPP<br />
58790 1008075799 · 34687# + 1 15004 p252 10 Arithmetic progression (4, d =<br />
2571033 · 34687#)<br />
58826 (V (42995, 1, 3231) +<br />
1)/(V (42995, 1, 9) + 1)<br />
14929 x25 12 Lehmer primitive part<br />
58839 U(8747, 1, 3780) +<br />
U(8747, 1, 3779)<br />
14897 x25 05 Lehmer number<br />
58844 (21474836471597 −<br />
14885 FE7 09 ECPP<br />
58861<br />
1)/1361551397315358942<br />
P hi(5015, −10000) 14848 c47 13 Unique, ECPP<br />
58871 U(25700, 1, 3360) +<br />
U(25700, 1, 3359)<br />
14813 x25 04 Lehmer number, cyclotomy<br />
58872 249207 − 224604 + 1 14813 x16 00 Gaussian Mersenne norm 29<br />
58931 ” tau;(643952 ECPP<br />
)” 14703 FE1 11<br />
58941 (V (8003, 1, 3771) +<br />
1)/(V (8003, 1, 9) + 1)<br />
14685 x25 13 Lehmer primitive part<br />
58952 U(1493, −1, 4621) 14665 CH3 05 Generalized Lucas number<br />
58966 U(7431, 1, 3781) −<br />
U(7431, 1, 3780)<br />
14633 x25 13 Lehmer number<br />
58968 U(4951, 1, 3960) −<br />
U(4951, 1, 3959)<br />
14628 CH3 05 Lehmer number<br />
59043 U(6571, 1, 3781) −<br />
U(6571, 1, 3780)<br />
14431 x25 13 Lehmer number<br />
59144 U(6396, 1, 3781) +<br />
U(6396, 1, 3780)<br />
14387 x25 13 Lehmer number<br />
59147 U(12924, −12925, 3499) 14382 x25 05 Generalized Lucas number<br />
59202 U(12113, −1, 3499) 14284 CH3 05 Generalized Lucas number<br />
59209 U(5192, 1, 3841) −<br />
U(5192, 1, 3840)<br />
14267 x23 05 Lehmer number<br />
109
ank description digits who year comment<br />
59226 U(2441, −1, 4201) 14228 CH3 05 Generalized Lucas number<br />
59232 U(3865, 1, 3960) +<br />
U(3865, 1, 3959)<br />
14202 x25 02 Lehmer number, cyclotomy<br />
59331 (V (5111, 1, 3789) +<br />
1)/(V (5111, 1, 9) + 1)<br />
14019 x25 13 Lehmer primitive part<br />
59335 (V (5763, 1, 3753) +<br />
1)/(V (5763, 1, 27) + 1)<br />
14013 x25 11 Lehmer primitive part<br />
59402 [ Long prime 59402 ] 13956 c54 13 ECPP<br />
59499 (V (5132, 1, 3753) +<br />
1)/(V (5132, 1, 27) + 1)<br />
13825 x25 11 Lehmer primitive part<br />
59538 U(4432, 1, 3780) −<br />
U(4432, 1, 3779)<br />
13781 x25 13 Lehmer number<br />
59571 (V (4527, 1, 3771) +<br />
1)/(V (4527, 1, 9) + 1)<br />
13754 x25 13 Lehmer primitive part<br />
59669 U(3645, 1, 3841) −<br />
U(3645, 1, 3840)<br />
13677 x25 05 Lehmer number<br />
59691 [ Long prime 59691 ] 13657 c64 13 Irregular, ECPP<br />
59805 U(13373, 1, 3300) −<br />
U(13373, 1, 3299)<br />
13613 x25 11 Lehmer number<br />
59819 U(11194, −11195, 3361) 13605 x25 04 Generalized Lucas number<br />
59920 263821581 · 245001 − 487069965 ·<br />
225002 13556 p199 10 Arithmetic progression (4, d =<br />
− 1<br />
87940527 · 245001 − 487069965 ·<br />
225001 )<br />
59921 4103163 · 245007 − 183009063 ·<br />
225003 13556 p199 10 Arithmetic progression (4, d =<br />
− 1<br />
1367721 · 245007 − 183009063 ·<br />
225002 )<br />
59938 664227·245001−21037539·225006− 13553 p199 10 Arithmetic progression (4, d =<br />
1<br />
221409·2 45001 −21037539·2 25005 )<br />
59946 U(2219, −1, 4049) 13546 CH3 05 Generalized Lucas number<br />
60026 U(475, −1, 5039) 13486 x25 03 Generalized Lucas number, cyclotomy<br />
60043 (V (3813, 1, 3771) −<br />
1)/(V (3813, 1, 9) − 1)<br />
13473 x25 11 Lehmer primitive part<br />
60283 (V (3476, 1, 3771) −<br />
1)/(V (3476, 1, 9) − 1)<br />
13322 x25 11 Lehmer primitive part<br />
60288 (V (3755, 1, 3753) −<br />
1)/(V (3755, 1, 27) − 1)<br />
13319 x25 11 Lehmer primitive part<br />
60481 (V (3177, 1, 3771) −<br />
1)/(V (3177, 1, 9) − 1)<br />
13175 x25 11 Lehmer primitive part<br />
60541 (V (3088, 1, 3771) +<br />
1)/(V (3088, 1, 9) + 1)<br />
13129 x25 11 Lehmer primitive part<br />
60667 U(7537, −7538, 3361) 13028 x23 07 Generalized Lucas number<br />
60673 U(7512, −7513, 3361) 13023 x25 04 Generalized Lucas number<br />
60689 U(2783, −1, 3779) 13014 CH3 05 Generalized Lucas number<br />
60762 U(7128, −1, 3361) 12946 x25 04 Generalized Lucas number, cyclotomy<br />
60803 P hi(3243, −2399401)/33320592661 12903 c54 10 ECPP<br />
60839 (242737 + 1)/3 12865 M 07 ECPP, generalized Lucas number,<br />
Wagstaff<br />
61022 (V (49596, 1, 3375) +<br />
1)/(V (49596, 1, 675) + 1)<br />
12678 x25 06 Lehmer primitive part<br />
110
ank description digits who year comment<br />
61201 [ Long prime 61201 ] 12533 c63 13 Irregular, ECPP<br />
61278 [ Long prime 61278 ] 12459 c54 12 Mersenne c<strong>of</strong>actor, ECPP<br />
61388 [ Long prime 61388 ] 12395 c59 12 Mersenne c<strong>of</strong>actor, ECPP<br />
61638 p(120052058) 12198 c59 12 Partitions, ECPP<br />
62214 primV (57724) 12063 p54 01 Lucas primitive part, cyclotomy<br />
62644 V (56003) 11704 p193 06 Lucas number<br />
62867 primU(67825) 11336 x23 07 Fibonacci primitive part<br />
62905 3610! − 1 11277 C 93 Factorial<br />
62999 p(100077222) 11136 c59 12 Partitions, ECPP<br />
63110 3507! − 1 10912 C 92 Factorial<br />
63177 [ Long prime 63177 ] 10763 c64 13 Irregular, ECPP<br />
63200 primV (77058) 10729 CH3 05 Lucas primitive part<br />
63215 V (51169) 10694 p54 01 Lucas number<br />
63256 P hi(13285, −10) 10625 c47 12 Unique, ECPP<br />
63257 U(50833) 10624 CH4 05 Fibonacci number<br />
63289 p(90048122) 10563 c59 12 Partitions, ECPP<br />
63354 primV (77841) 10496 x25 05 Lucas primitive part<br />
63363 914546877 · 2 34774 − 1 10477 L983 10 Cunningham chain (4p + 3)<br />
63364 914546877 · 2 34773 − 1 10477 L983 10 Cunningham chain (2p + 1)<br />
63365 914546877 · 2 34772 − 1 10477 L983 10 Cunningham chain (p)<br />
63418 24029# + 1 10387 C 93 Primorial<br />
63444 6 · Bern(4306)/2153 10342 FE8 09 Irregular, ECPP<br />
63480 23801# + 1 10273 C 93 Primorial<br />
63589 p(82479677) 10109 c59 12 Partitions, ECPP<br />
63598 p(82352631) 10101 c56 12 Partitions,ECPP<br />
63608 81505264551807 · 2 33444 + 5 10082 c58 12 Triplet (3), ECPP<br />
63609 81505264551807 · 2 33444 + 1 10082 p296 12 Triplet (2)<br />
63610 81505264551807 · 2 33444 − 1 10082 p296 12 Triplet (1)<br />
63616 P hi(427, −10 28 ) 10081 FE9 09 Unique, ECPP<br />
63638 2072644824759 · 2 33333 + 5 10047 FE5 08 Triplet (3), ECPP<br />
63639 2072644824759 · 2 33333 + 1 10047 L645 08 Triplet (2)<br />
63640 2072644824759 · 2 33333 − 1 10047 L645 08 Triplet (1)<br />
63969 p(80036992) 9958 c46 11 Partitions, ECPP<br />
64079 32469 · 2 32469 + 1 9779 MM 97 Cullen<br />
64081 (2 32531 −1)/(65063·25225122959) 9778 c60 12 Mersenne c<strong>of</strong>actor, ECPP<br />
64107 8073 · 2 32294 + 1 9726 MM 97 Cullen<br />
64183 V (45953)/4561241750239 9591 c56 12 Lucas c<strong>of</strong>actor, ECPP<br />
64239 P hi(5161, −100) 9505 c47 12 Unique, ECPP<br />
64393 V (44507) 9302 CH3 05 Lucas number<br />
64547 p(67230446) 9126 c56 11 Partitions,ECPP<br />
64882 [ Long prime 64882 ] 8835 c59 12 Mersenne c<strong>of</strong>actor, ECPP<br />
64925 U(42043)/1681721 8780 c56 12 Fibonacci c<strong>of</strong>actor, ECPP<br />
65008 (2 28771 − 1)/104726441 8653 c56 12 Mersenne c<strong>of</strong>actor, ECPP<br />
65011 (2 28759 − 1)/226160777 8649 c60 12 Mersenne c<strong>of</strong>actor, ECPP<br />
65099 P hi(6105, −1000) 8641 c47 10 Unique, ECPP<br />
65115 p(60016427) 8622 c46 11 Partitions, ECPP<br />
65282 P hi(4667, −100) 8593 c47 09 Unique, ECPP<br />
65559 2 27529 − 2 13765 + 1 8288 O 00 Gaussian Mersenne norm 28<br />
65567 V (39607)/158429 8273 c46 11 Lucas c<strong>of</strong>actor, ECPP<br />
65608 p(54534155) 8219 c56 11 Partitions,ECPP<br />
111
ank description digits who year comment<br />
65637 primV (39124) 8176 CH3 05 Lucas primitive part<br />
65638 379185609 · 2 27129 − 1 8176 L983 09 Cunningham chain (4p + 3)<br />
65640 379185609 · 2 27128 − 1 8175 L983 09 Cunningham chain (2p + 1)<br />
65641 379185609 · 2 27127 − 1 8175 L983 09 Cunningham chain (p)<br />
65679 82659189 · 2 26999 + 1 8136 L983 10 Cunningham chain 2nd kind<br />
(4p − 3)<br />
65682 173028555 · 2 26995 + 1 8135 L983 10 Cunningham chain 2nd kind<br />
(4p − 3)<br />
65733 [ Long prime 65733 ] 8063 c55 11 Mersenne c<strong>of</strong>actor, ECPP<br />
65783 p(51831641) 8012 c56 11 Partitions,ECPP<br />
65794 18523# + 1 8002 D 89 Primorial<br />
65805 42989535 · 2 26545 + 1 7999 L983 10 Cunningham chain 2nd kind<br />
(4p − 3)<br />
65839 [ Long prime 65839 ] 7945 c8 13 Irregular, ECPP<br />
65847 164210699973 · 2 26328 − 1 7937 p158 06 Cunningham chain (4p + 3)<br />
65849 164210699973 · 2 26327 − 1 7937 p158 06 Cunningham chain (2p + 1)<br />
65850 164210699973 · 2 26326 − 1 7937 p158 06 Cunningham chain (p)<br />
65866 [ Long prime 65866 ] 7906 c39 12 Fibonacci c<strong>of</strong>actor, ECPP<br />
65894 p(50001890) 7869 c46 11 Partitions, ECPP<br />
65910 U(37511) 7839 x13 05 Fibonacci number<br />
65972 U(37217)/4466041 7771 c46 11 Fibonacci c<strong>of</strong>actor, ECPP<br />
65984 −E(2762)/2670541 7760 c11 04 Euler irregular, ECPP<br />
66068 V (36779) 7687 CH3 05 Lucas number<br />
66492 197418203 · 2 25000 + 6089 7535 FE4 05 ECPP, consecutive primes arithmetic<br />
progression (3, d = 6090)<br />
66493 197418203 · 2 25000 − 1 7535 p164 05 Consecutive primes arithmetic<br />
progression (2, d = 6090)<br />
66494 197418203 · 2 25000 − 6091 7535 FE4 05 ECPP, consecutive primes arithmetic<br />
progression (1, d = 6090)<br />
66546 U(35999) 7523 p54 01 Fibonacci number, cyclotomy<br />
66565 P hi(4029, −1000) 7488 c47 09 Unique, ECPP<br />
66656 V (35449) 7409 p12 01 Lucas number<br />
66661 87 · 2 24582 + 2579 7402 c31 04 ECPP, consecutive primes arithmetic<br />
progression (3, d = 1290)<br />
66662 87 · 2 24582 + 1289 7402 c31 04 ECPP, consecutive primes arithmetic<br />
progression (2, d = 1290)<br />
66663 87 · 2 24582 − 1 7402 g106 99 Consecutive primes arithmetic<br />
progression (1, d = 1290) [c31]<br />
66912 V (34759)/27112021 7257 c33 05 Lucas c<strong>of</strong>actor, ECPP<br />
67103 P hi(9455, −10) 7200 c33 05 Unique, ECPP<br />
67148 P hi(1479, −100000000) 7168 c47 09 Unique, ECPP<br />
67167 primB(134415) 7163 c8 13 Lucas Aurifeuillian primitive<br />
part, ECPP<br />
67200 p(41197951) 7142 c56 11 Partitions,ECPP<br />
67610 primV (36647) 7067 c8 13 Lucas primitive part, ECPP<br />
67620 primV (34532) 7063 c8 13 Lucas primitive part, ECPP<br />
67636 [ Long prime 67636 ] 7053 c8 13 Fibonacci c<strong>of</strong>actor, ECPP<br />
67645 p(40100918) 7047 c46 11 Partitions, ECPP<br />
67791 primU(48965) 7012 c8 13 Fibonacci primitive part, ECPP<br />
67795 164084347 · 16229# + 1 7009 p155 09 Arithmetic progression (5, d =<br />
20333209 · 16229#)<br />
112
ank description digits who year comment<br />
67811 p(39576498) 7000 c56 11 Partitions,ECPP<br />
67893 V (33353)/279902102741094707003083072429 6941 c8 13 Lucas c<strong>of</strong>actor, ECPP<br />
67902 primA(82975) 6935 p54 01 Lucas Aurifeuillian primitive<br />
part<br />
67913 23005 · 2 23005 − 1 6930 Y 97 Woodall<br />
67926 22971 · 2 22971 − 1 6920 Y 97 Woodall<br />
67932 2852851249 · 16001#/5 + 1 6913 p199 08 Arithmetic progression (5, d =<br />
2653152 · 16001#)<br />
67937 2399771561 · 16001#/5 + 1 6913 p199 08 Arithmetic progression (5, d =<br />
86574302 · 16001#)<br />
67939 1638535589 · 16001#/5 + 1 6913 p199 08 Arithmetic progression (5, d =<br />
2003735 · 16001#)<br />
67946 P hi(2405, −10000) 6912 c47 09 Unique,ECPP<br />
68016 15877# − 1 6845 CD 92 Primorial<br />
68021 P hi(10887, 10) 6841 c33 05 Unique, ECPP<br />
68036 primU(58773) 6822 c8 13 Fibonacci primitive part, ECPP<br />
68050 primV (33142) 6802 c8 13 Lucas primitive part, ECPP<br />
68101 primV (48381) 6741 x23 05 Lucas primitive part<br />
68104 primU(40295) 6737 p12 01 Fibonacci primitive part<br />
68178 [ Long prime 68178 ] 6669 c8 13 Fibonacci c<strong>of</strong>actor, ECPP<br />
68205 [ Long prime 68205 ] 6637 c8 13 Irregular, ECPP<br />
68236 primV (39700) 6621 p54 01 Lucas primitive part<br />
68275 primV (50046) 6591 c8 13 Lucas primitive part, ECPP<br />
68430 primA(123405) 6502 c8 13 Lucas Aurifeuillian primitive<br />
part, ECPP<br />
68485 1797706581 · 2 21355 − 1 6438 L100 12 Cunningham chain (4p + 3)<br />
68487 1797706581 · 2 21354 − 1 6438 L100 12 Cunningham chain (2p + 1)<br />
68488 1797706581 · 2 21353 − 1 6438 L100 12 Cunningham chain (p)<br />
68499 U(30757) 6428 p54 01 Fibonacci number, cyclotomy<br />
68543 U(30727)/2281521813578534245193 6400 c8 13 Fibonacci c<strong>of</strong>actor, ECPP<br />
68547 U(30671)/1141737296775689 6395 c41 05 Fibonacci c<strong>of</strong>actor, ECPP<br />
68630 primV (53256) 6340 c8 13 Lucas primitive part, ECPP<br />
68704 P hi(7357, −10) 6301 c33 04 Unique, ECPP<br />
68749 primV (60333) 6260 c8 13 Lucas primitive part, ECPP<br />
68767 P hi(6437, 10) 6240 c47 08 Unique, ECPP<br />
68779 [ Long prime 68779 ] 6229 c4 09 Mersenne c<strong>of</strong>actor, ECPP<br />
68786 5612052289 · 14489#/5 + 5 6223 c18 08 Triplet (3), ECPP<br />
68787 5612052289 · 14489#/5 + 1 6223 p41 08 Triplet (2)<br />
68788 5612052289 · 14489#/5 − 1 6223 p41 08 Triplet (1)<br />
68840 primA(118275) 6170 c8 13 Lucas Aurifeuillian primitive<br />
part, ECPP<br />
68875 primV (35483) 6140 c8 13 Lucas primitive part, ECPP<br />
68894 p(30248445) 6119 c46 11 Partitions, ECPP<br />
68895 p(30245335) 6119 c46 11 Partitions, ECPP<br />
68896 p(30244992) 6119 c46 11 Partitions, ECPP<br />
68900 p(30191251) 6113 c46 11 Partitions, ECPP<br />
68905 p(30158067) 6110 c46 11 Partitions, ECPP<br />
68907 p(30147428) 6109 c46 11 Partitions, ECPP<br />
68923 primV (43773) 6099 c8 13 Lucas primitive part, ECPP<br />
68936 4811 · 2 20219 + 1 6091 DM 96 Consecutive primes arithmetic<br />
progression (3, d = 3738) [c36]<br />
113
ank description digits who year comment<br />
68937 4811 · 2 20219 − 3737 6091 c36 04 ECPP, consecutive primes arithmetic<br />
progression (2, d = 3738)<br />
68938 4811 · 2 20219 − 7475 6091 c36 04 ECPP, consecutive primes arithmetic<br />
progression (1, d = 3738)<br />
68955 primU(43653) 6082 CH7 10 Fibonacci primitive part<br />
69022 primV (29657) 6057 c11 09 Lucas primitive part, ECPP<br />
69080 3020255265 · 2 20025 − 1 6038 p133 05 Cunningham chain (4p + 3)<br />
69082 3020255265 · 2 20024 − 1 6038 p133 05 Cunningham chain (2p + 1)<br />
69083 3020255265 · 2 20023 − 1 6038 p133 05 Cunningham chain (p)<br />
69122 primV (57270) 6033 c8 13 Lucas primitive part, ECPP<br />
69214 primV (28844) 6028 p12 01 Lucas primitive part<br />
69274 primU(70455) 6019 c8 13 Fibonacci primitive part, ECPP<br />
69280 E(2220)/392431891068600713525 6011 c8 13 Euler irregular, ECPP<br />
69310 primB(83825) 5994 c8 13 Lucas Aurifeuillian primitive<br />
part, ECPP<br />
69354 primV (37490) 5959 c8 13 Lucas primitive part, ECPP<br />
69372 primU(43359) 5939 c8 13 Fibonacci primitive part, ECPP<br />
69374 [ Long prime 69374 ] 5938 c8 13 Euler irregular, ECPP<br />
69413 primU(28667) 5914 c8 13 Fibonacci primitive part, ECPP<br />
69482 U(28277)/347428330081374457 5892 c8 13 Fibonacci c<strong>of</strong>actor, ECPP<br />
69499 primV (44082) 5869 c8 13 Lucas primitive part, ECPP<br />
69505 13649# + 1 5862 D 87 Primorial<br />
69519 55339803 · 2 19402 + 1 5849 L983 09 Cunningham chain 2nd kind<br />
(4p − 3)<br />
69553 primB(104385) 5816 c8 13 Lucas Aurifeuillian primitive<br />
part, ECPP<br />
69575 V (27827)/3579579016301 5803 c4 11 Lucas c<strong>of</strong>actor, ECPP<br />
69685 [ Long prime 69685 ] 5701 c8 13 Irregular, ECPP<br />
69687 primB(72505) 5699 c8 13 Lucas Aurifeuillian primitive<br />
part, ECPP<br />
69698 18885 · 2 18885 − 1 5690 K 87 Woodall<br />
69840 1963! − 1 5614 CD 92 Factorial<br />
69845 13033# − 1 5610 CD 92 Primorial<br />
69880 289 · 2 18502 + 1 5573 K 84 Cullen, generalized Fermat<br />
69944 [ Long prime 69944 ] 5521 c8 13 Fibonacci c<strong>of</strong>actor, ECPP<br />
69970 primU(39489) 5502 c8 13 Fibonacci primitive part, ECPP<br />
69982 primU(27721) 5485 c8 13 Fibonacci primitive part, ECPP<br />
69986 V (26309)/42316339086094085101 5479 c8 13 Lucas c<strong>of</strong>actor, ECPP<br />
70097 E(2028)/11246153954845684745 5412 c55 11 Euler irregular, ECPP<br />
70144 387977793 · 2 17866 + 1 5387 L983 09 Cunningham chain 2nd kind<br />
(4p − 3)<br />
70360 [ Long prime 70360 ] 5364 c8 13 Lucas c<strong>of</strong>actor, ECPP<br />
70422 [ Long prime 70422 ] 5354 c63 13 Irregular ECPP<br />
70493 U(25561) 5342 p54 01 Fibonacci number<br />
70531 [ Long prime 70531 ] 5338 c8 13 Lucas c<strong>of</strong>actor, ECPP<br />
70550 V (25577)/147374713548027019 5329 c4 11 Lucas c<strong>of</strong>actor, ECPP<br />
70590 primB(65305) 5298 c8 13 Lucas Aurifeuillian primitive<br />
part, ECPP<br />
70599 primB(63235) 5287 c8 13 Lucas Aurifeuillian primitive<br />
part, ECPP<br />
114
ank description digits who year comment<br />
70612 [ Long prime 70612 ] 5274 c4 09 Mersenne c<strong>of</strong>actor, ECPP<br />
70629 [ Long prime 70629 ] 5258 c8 13 Euler irregular, ECPP<br />
70850 primB(108465) 5177 c8 13 Lucas Aurifeuillian primitive<br />
part, ECPP<br />
70884 primA(92445) 5151 c8 13 Lucas Aurifeuillian primitive<br />
part, ECPP<br />
70905 primA(65365) 5137 c8 13 Lucas Aurifeuillian primitive<br />
part, ECPP<br />
70916 primA(92145) 5134 c8 13 Lucas Aurifeuillian primitive<br />
part, ECPP<br />
70924 [ Long prime 70924 ] 5132 p179 06 Triplet (2)<br />
70925 [ Long prime 70925 ] 5132 p179 06 Triplet (1)<br />
70928 [ Long prime 70928 ] 5132 p179 06 Triplet (1)<br />
70929 [ Long prime 70929 ] 5132 p179 06 Consecutive primes arithmetic<br />
progression (3, d = 6)<br />
70930 [ Long prime 70930 ] 5132 p179 06 Consecutive primes arithmetic<br />
progression (2, d = 6)<br />
70931 [ Long prime 70931 ] 5132 p179 06 Consecutive primes arithmetic<br />
progression (1, d = 6)<br />
70938 [ Long prime 70938 ] 5132 p179 05 Consecutive primes arithmetic<br />
progression (3, d = 6)<br />
70939 [ Long prime 70939 ] 5132 p179 05 Consecutive primes arithmetic<br />
progression (2, d = 6)<br />
70940 [ Long prime 70940 ] 5132 p179 05 Consecutive primes arithmetic<br />
progression (1, d = 6)<br />
70941 [ Long prime 70941 ] 5132 p179 07 Arithmetic progression (5, d =<br />
(681402540 · 205881 · 4001# ·<br />
(205881 · 4001# + 1) · (205881 ·<br />
4001# − 1)/35))<br />
71035 (217029 − 1)/418879343 5118 c8 06 Mersenne c<strong>of</strong>actor, ECPP<br />
71163 33957462 · Bern(2370)/40685 5083 c11 03 Irregular, ECPP<br />
71175 primB(70265) 5077 c8 13 Lucas Aurifeuillian primitive<br />
part, ECPP<br />
71434 primA(98085) 5035 c8 13 Lucas Aurifeuillian primitive<br />
part, ECPP<br />
71910 primA(95475) 4966 c4 09 Lucas Aurifeuillian primitive<br />
part, ECPP<br />
71922 11549# + 1 4951 D 86 Primorial<br />
72347 [ Long prime 72347 ] 4896 c8 13 Lucas c<strong>of</strong>actor, ECPP<br />
72436 [ Long prime 72436 ] 4812 c4 11 Euler irregular, ECPP<br />
72470 7911 · 215823 − 1 4768 K 87 Woodall<br />
72488 V (22811)/(2469062641 ·<br />
4741 c8 04 Lucas c<strong>of</strong>actor, ECPP<br />
84961206854418761)<br />
72526 primU(25493) 4695 c8 07 Fibonacci primitive part, ECPP<br />
72863 primB(95655) 4564 c4 09 Lucas Aurifeuillian primitive<br />
part, ECPP<br />
72867 P hi(6685, −10) 4560 c8 03 Unique, ECPP<br />
73055 [ Long prime 73055 ] 4498 c4 04 Euler irregular, ECPP<br />
73078 [ Long prime 73078 ] 4479 c8 04 Fibonacci c<strong>of</strong>actor, ECPP<br />
73103 primU(34593) 4444 c8 07 Fibonacci primitive part, ECPP<br />
115
ank description digits who year comment<br />
73104 primA(53155) 4444 x25 02 Lucas Aurifeuillian primitive<br />
part, cyclotomy<br />
73116 2 14699 + 2 7350 + 1 4425 O 00 Gaussian Mersenne norm 27<br />
73125 primU(38181) 4414 c8 07 Fibonacci primitive part, ECPP<br />
73128 primA(52825) 4414 x25 03 Lucas Aurifeuillian primitive<br />
part<br />
73156 primB(79125) 4389 c4 09 Lucas Aurifeuillian primitive<br />
73175 (2<br />
part, ECPP<br />
14561 −<br />
4365 c8 04 Mersenne c<strong>of</strong>actor, ECPP<br />
73176<br />
1)/8074991336582835391<br />
[ Long prime 73176 ] 4365 c4 08 Mersenne c<strong>of</strong>actor, ECPP<br />
73180 P hi(3273, −100) 4361 c8 03 Unique, ECPP<br />
73182 (214479 + 1)/3 4359 c4 04 Generalized Lucas number,<br />
Wagstaff, ECPP<br />
73201 P hi(1087, −10000) 4344 c8 02 Unique, ECPP<br />
73355 U(20749)/40143391315257666998313330569 4308 c8 13 Fibonacci c<strong>of</strong>actor, ECPP<br />
73395 primU(21053) 4274 c8 07 Fibonacci primitive part, ECPP<br />
73402 primU(31209) 4264 c8 07 Fibonacci primitive part, ECPP<br />
73447 P hi(483, −1016 ) 4224 c8 02 Unique, ECPP<br />
73463 [ Long prime 73463 ] 4200 c8 03 Irregular, ECPP<br />
73464 primU(25115) 4199 CH3 05 Fibonacci primitive part<br />
73493 primU(30687) 4173 c8 07 Fibonacci primitive part, ECPP<br />
73594 [ Long prime 73594 ] 4099 c8 13 Fibonacci c<strong>of</strong>actor, ECPP<br />
73595 U(19709)/5442947509995472691549 4097 c8 13 Fibonacci c<strong>of</strong>actor, ECPP<br />
73628 V (19469) 4069 x25 02 Lucas number, cyclotomy, APR-<br />
CL assisted<br />
73671 1477! + 1 4042 D 84 Factorial<br />
73898 [ Long prime 73898 ] 4002 c8 04 Fibonacci c<strong>of</strong>actor, ECPP<br />
73917 U(19051)/44198321 3974 c8 04 Fibonacci c<strong>of</strong>actor, ECPP<br />
73942 U(18919)/1497228584233 3942 c8 04 Fibonacci c<strong>of</strong>actor, ECPP<br />
73946 primU(22939) 3933 c8 07 Fibonacci primitive part, ECPP<br />
73962 P hi(1959, 1000) 3912 c8 02 Unique, ECPP<br />
73981 primU(23009) 3883 c8 07 Fibonacci primitive part, ECPP<br />
73995 −2730 ·<br />
3844 c8 03 Irregular, ECPP<br />
74013<br />
Bern(1884)/100983617849<br />
2840178 · Bern(1870)/85 3821 c8 03 Irregular, ECPP<br />
74019 [ Long prime 74019 ] 3815 c8 04 Fibonacci c<strong>of</strong>actor, ECPP<br />
74075 P hi(955, −100000) 3801 c8 02 Unique, ECPP<br />
74101 [ Long prime 74101 ] 3734 c8 03 Irregular, ECPP<br />
74103 12379 · 212379 − 1 3731 K 84 Woodall<br />
74104 (212391 + 1)/3 3730 M 96 Generalized Lucas number,<br />
Wagstaff<br />
74191 [ Long prime 74191 ] 3708 c4 08 Mersenne c<strong>of</strong>actor, ECPP<br />
74219 [ Long prime 74219 ] 3682 c8 13 Euler irregular, ECPP<br />
74224 primU(32985) 3672 x23 07 Fibonacci primitive part<br />
74227 [ Long prime 74227 ] 3671 c4 03 Euler irregular, ECPP<br />
74250 642 · Bern(1802)/15720728189 3641 c8 03 Irregular, ECPP<br />
74331 U(17137)/328335144266897 3567 c8 04 Fibonacci c<strong>of</strong>actor, ECPP<br />
74346 U(17011)/42109783293497 3542 c8 04 Fibonacci c<strong>of</strong>actor<br />
74347 V (17029)/(9570299 ·<br />
495749440031)<br />
3541 c8 04 Lucas c<strong>of</strong>actor, ECPP<br />
116
ank description digits who year comment<br />
74368 (211813 − 1)/(70879 ·<br />
3537 c8 02 Mersenne c<strong>of</strong>actor, ECPP<br />
74394<br />
207971134271377)<br />
[ Long prime 74394 ] 3534 c8 13 Fibonacci c<strong>of</strong>actor, ECPP<br />
75309 (211279 + 1)/3 3395 PM 98 Cyclotomy, generalized Lucas<br />
number, Wagstaff<br />
75508 722047383902589 · 211111 + 7 3360 c26 13 Quadruplet (4)<br />
75509 722047383902589 · 211111 + 5 3360 c26 13 Quadruplet (3)<br />
75510 722047383902589 · 211111 + 1 3360 L165 13 Quadruplet (2)<br />
75511 722047383902589 · 211111 − 1 3360 L165 13 Quadruplet (1)<br />
75596 [ Long prime 75596 ] 3284 c4 11 Mersenne c<strong>of</strong>actor, ECPP<br />
75626 V (15511)/394599841 3234 c8 04 Lucas c<strong>of</strong>actor, ECPP<br />
75642 (210691 + 1)/3 3218 c4 04 Generalized Lucas number,<br />
Wagstaff, ECPP<br />
75698 (210501 + 1)/3 3161 M 96 Generalized Lucas number,<br />
Wagstaff<br />
75758 V (14887)/1256071867381 3100 c8 04 Lucas c<strong>of</strong>actor<br />
75814 210141 + 25071 + 1 3053 O 00 Gaussian Mersenne norm 26<br />
75873 [ Long prime 75873 ] 3030 c4 10 Mersenne c<strong>of</strong>actor, ECPP<br />
75879 43697976428649 · 29999 + 7 3024 c58 12 Quadruplet (4)<br />
75880 43697976428649 · 29999 + 5 3024 c58 12 Quadruplet (3)<br />
75881 43697976428649 · 29999 + 1 3024 p349 12 Quadruplet (2)<br />
75882 43697976428649 · 29999 − 1 3024 p349 12 Quadruplet (1)<br />
75885 [ Long prime 75885 ] 3022 c8 02 Mersenne c<strong>of</strong>actor, ECPP<br />
75892 V (14449) 3020 DK 95 Lucas number<br />
75896 3124777373 · 7001# + 1 3019 p155 12 Arithmetic progression (7, d =<br />
481789017 · 7001#)<br />
75897 2996180304 · 7001# + 1 3019 p155 12 Arithmetic progression (6, d =<br />
46793757 · 7001#)<br />
75899 2946259686 · 7001# + 1 3019 p155 12 Arithmetic progression (6, d =<br />
313558156 · 7001#)<br />
75900 2915000572 · 7001# + 1 3019 p155 12 Arithmetic progression (6, d =<br />
3093612 · 7001#)<br />
75904 2903168860 · 7001# + 1 3019 p155 12 Arithmetic progression (6, d =<br />
370654742 · 7001#)<br />
75908 2884761225 · 7001# + 1 3019 p155 12 Arithmetic progression (6, d =<br />
46112185 · 7001#)<br />
76413 U(14431) 3016 p54 01 Fibonacci number<br />
76643 [ Long prime 76643 ] 2979 c8 02 Mersenne c<strong>of</strong>actor, ECPP<br />
76760 V (13963) 2919 c11 02 Lucas number, ECPP<br />
76799 [ Long prime 76799 ] 2888 c8 02 Mersenne c<strong>of</strong>actor, ECPP<br />
76819 [ Long prime 76819 ] 2876 c4 01 Mersenne c<strong>of</strong>actor, ECPP<br />
76822 9531 · 29531 − 1 2874 K 84 Woodall<br />
76855 9992783016 · 6599# − 1 2836 p295 11 Cunningham chain (8p + 7)<br />
76867 [ Long prime 76867 ] 2829 c8 13 Euler irregular, ECPP<br />
76883 6569# − 1 2811 D 92 Primorial<br />
77213 V (12503)/4954888889 2604 c8 04 Lucas c<strong>of</strong>actor<br />
77452 [ Long prime 77452 ] 2586 c8 13 Lucas c<strong>of</strong>actor, ECPP<br />
77509 V (12457)/(1420099 ·<br />
81953391325049801)<br />
2581 c8 04 Lucas c<strong>of</strong>actor, ECPP<br />
77531 −E(1078)/361898544439043 2578 c4 02 Euler irregular, ECPP<br />
117
ank description digits who year comment<br />
77755 V (12251) 2561 p54 01 Lucas number<br />
78429 46359065729523 · 28258 + 7 2500 c26 11 Quadruplet (4)<br />
78430 46359065729523 · 28258 + 5 2500 c26 11 Quadruplet (3)<br />
78431 46359065729523 · 28258 + 1 2500 L165 11 Quadruplet (2)<br />
78432 46359065729523 · 28258 − 1 2500 L165 11 Quadruplet (1)<br />
78507 974! − 1 2490 CD 92 Factorial<br />
78988 E(1028)/(6415 · 56837916301577) 2433 c4 02 Euler irregular, ECPP<br />
78997 V (11657)/69172639 2429 c8 04 Lucas c<strong>of</strong>actor<br />
79149 1367848532291 · 5591#/35 + 7 2401 c18 11 Quadruplet (4), ECPP<br />
79150 1367848532291 · 5591#/35 + 5 2401 c18 11 Quadruplet (3), ECPP<br />
79151 1367848532291 · 5591#/35 + 1 2401 p41 11 Quadruplet (2)<br />
79152 1367848532291 · 5591#/35 − 1 2401 p41 11 Quadruplet (1)<br />
79216 E(1004)/(579851915 ·<br />
80533376783)<br />
2364 c4 02 Euler irregular, ECPP<br />
79217 V (11393)/(3076111 ·<br />
2362 c8 04 Lucas c<strong>of</strong>actor<br />
5299498382701)<br />
79227 953477584 · 5501# − 1 2355 p133 05 Cunningham chain (8p + 7)<br />
79405 V (11261)/16823009787209 2341 c8 04 Lucas c<strong>of</strong>actor<br />
79453 7755 · 27755 − 1 2339 K 84 Woodall<br />
79975 [ Long prime 79975 ] 2276 c4 02 Irregular, ECPP<br />
79997 −36870 ·<br />
2272 c4 02 Irregular, ECPP<br />
Bern(1228)/1043706675925609<br />
80217 V (10691) 2235 DK 95 Lucas number<br />
80783 872! + 1 2188 D 83 Factorial<br />
81043 25885133741·5003#+3399421607 2148 c14 12 Consecutive primes arithmetic<br />
progression (4, d = 30)<br />
81137 25796119248 · 4987#/35 + 7 2135 c37 11 Quadruplet (4), ECPP<br />
81138 25796119248 · 4987#/35 + 5 2135 c37 11 Quadruplet (3), ECPP<br />
81139 25796119248 · 4987#/35 + 1 2135 p80 11 Quadruplet (2)<br />
81140 25796119248 · 4987#/35 − 1 2135 p80 11 Quadruplet (1)<br />
81619 5045589688 · 4933# + 1 2106 p295 10 Cunningham chain 2nd kind<br />
(8p − 7)<br />
81947 [ Long prime 81947 ] 2069 c4 02 Euler irregular, ECPP<br />
82102 −E(886)/68689 2051 c4 02 Euler irregular, ECPP<br />
82212 4787# + 1 2038 D 84 Primorial<br />
82480 U(9677) 2023 c2 00 Fibonacci number, ECPP<br />
84316 6611 · 2 6611 + 1 1994 K 84 Cullen<br />
84387 4583# − 1 1953 D 92 Primorial<br />
84409 U(9311) 1946 DK 95 Fibonacci number<br />
84429 4547# + 1 1939 D 84 Primorial<br />
84678 4297# − 1 1844 D 92 Primorial<br />
84728 125848198864 · 4253# + 1 1829 p199 10 Cunningham chain 2nd kind<br />
(8p − 7)<br />
84729 113419228920 · 4253# + 1 1829 p199 10 Cunningham chain 2nd kind<br />
(8p − 7)<br />
84732 45912427272 · 4253# + 1 1829 p199 10 Cunningham chain 2nd kind<br />
(8p − 7)<br />
84947 2 5900 + 469721940591 1777 c45 07 Consecutive primes arithmetic<br />
progression (4, d = 2880), ECPP<br />
84977 11628008104 · 4127# + 1 1770 p133 05 Cunningham chain 2nd kind<br />
(8p − 7)<br />
118
ank description digits who year comment<br />
84982 V (8467) 1770 c2 00 Lucas number, ECPP<br />
85014 18672891658·4099#+1591789579 1763 c14 03 ECPP, consecutive primes arithmetic<br />
progression (4, d = 210)<br />
85065 4093# − 1 1750 CD 92 Primorial<br />
85077 5795 · 25795 + 1 1749 K 84 Cullen<br />
85083 (25807 + 1)/3 1748 PM 98 Cyclotomy, generalized Lucas<br />
number, Wagstaff<br />
85462 [ Long prime 85462 ] 1640 c62 13 Irregular,ECPP<br />
85535 V (7741) 1618 DK 95 Lucas number<br />
85593 20438086160 · 3733# − 1 1605 p295 10 Cunningham chain (8p + 7)<br />
85597 17758152104 · 3733# − 1 1605 p295 10 Cunningham chain (8p + 7)<br />
85611 83 · 25318 − 1 1603 K 84 Woodall<br />
87103 4713 · 24713 + 1 1423 K 84 Cullen<br />
87177 [ Long prime 87177 ] 1418 c4 02 Irregular, ECPP<br />
87367 460226463 · 3301# + 1 1402 p252 10 Arithmetic progression (7, d =<br />
30017636 · 3301#)<br />
87489 [ Long prime 87489 ] 1391 c8 13 Euler irregular, ECPP<br />
87871 3229# + 1 1368 D 84 Primorial<br />
87903 580182204072 · 3203# − 1 1366 p295 11 Cunningham chain (8p + 7)<br />
88479 [ Long prime 88479 ] 1343 c4 02 Euler irregular, ECPP<br />
88804 1233917739 · 3121# + 1 1335 p155 10 Arithmetic progression (7, d =<br />
5893725 · 3121#)<br />
89078 1461401630 · 3109# + 1 1328 p252 09 Arithmetic progression (7, d =<br />
35777939 · 3109#)<br />
89564 23963 + 1031392866 1312 c32 05 Consecutive primes arithmetic<br />
progression (4, d = 1500)<br />
89628 [ Long prime 89628 ] 1311 c4 02 Irregular, ECPP<br />
90575 833000864 · 3011# + 1 1290 p155 06 Arithmetic progression (7, d =<br />
114858412 · 3011#)<br />
91053 4919761805 · 2999# + 6763 1284 c23 03 Consecutive primes arithmetic<br />
progression (4, d = 30)<br />
92288 546! − 1 1260 D 92 Factorial<br />
93498 354 · Bern(754)/(377 ·<br />
1225 c4 02 Irregular, ECPP<br />
883462452530494157)<br />
93573 V (5851) 1223 DK 95 Lucas number<br />
95386 68002763264 · 2749# − 1 1185 p35 12 Cunningham chain (16p + 15)<br />
97597 [ Long prime 97597 ] 1143 c8 13 Euler irregular, ECPP<br />
98074 1290733709840 · 2677# + 1 1141 p295 11 Cunningham chain 2nd kind<br />
(16p − 15)<br />
98591 U(5387) 1126 WM 90 Fibonacci number<br />
99082 720128166480 · 2621# + 1 1117 p199 10 Cunningham chain 2nd kind<br />
(16p − 15)<br />
99818 424232794973 · 2593# + 43789 1107 c18 09 Quintuplet (5) , ECPP<br />
99819 424232794973 · 2593# + 43787 1107 c18 09 Quintuplet (4) , ECPP<br />
99820 424232794973 · 2593# + 43783 1107 c18 09 Quintuplet (3) , ECPP<br />
99821 424232794973 · 2593# + 43781 1107 c18 09 Quintuplet (2) , ECPP<br />
99822 424232794973 · 2593# + 43777 1107 c18 09 Quintuplet (1) , ECPP<br />
101630 283534892623 · 2477# + 1091273 1069 c18 06 Quintuplet (5), ECPP<br />
101631 283534892623 · 2477# + 1091269 1069 c18 06 Quintuplet (4), ECPP<br />
101632 283534892623 · 2477# + 1091267 1069 c18 06 Quintuplet (3), ECPP<br />
119
ank description digits who year comment<br />
101633 283534892623 · 2477# + 1091263 1069 c18 06 Quintuplet (2), ECPP<br />
101634 283534892623 · 2477# + 1091261 1069 c18 06 Quintuplet (1), ECPP<br />
101849 (2 3539 + 1)/3 1065 M 89 First titanic by ECPP, generalized<br />
Lucas number, Wagstaff<br />
102066 −E(510) 1062 c4 02 Euler irregular, ECPP<br />
102116 [ Long prime 102116 ] 1060 c4 02 Euler irregular, ECPP<br />
102324 2968802755 · 2459# + 1 1057 p155 09 Arithmetic progression (8, d =<br />
359463429 · 2459#)<br />
102518 469! − 1 1051 BC 81 Factorial<br />
103031 142661157626 · 2411# + 71427877 1038 c14 02 Consecutive primes arithmetic<br />
progression (5, d = 30)<br />
103058 45385928981256 · 2399# + 19429 1037 c18 11 Quintuplet (5), ECPP<br />
103059 45385928981256 · 2399# + 19427 1037 c18 11 Quintuplet (4), ECPP<br />
103060 45385928981256 · 2399# + 19423 1037 c18 11 Quintuplet (3), ECPP<br />
103061 45385928981256 · 2399# + 19421 1037 c18 11 Quintuplet (2), ECPP<br />
103062 45385928981256 · 2399# + 19417 1037 c18 11 Quintuplet (1), ECPP<br />
103097 21917202736992 · 2399# + 19429 1037 c18 11 Quintuplet (5), ECPP<br />
103098 21917202736992 · 2399# + 19427 1037 c18 11 Quintuplet (4), ECPP<br />
103099 21917202736992 · 2399# + 19423 1037 c18 11 Quintuplet (3), ECPP<br />
103100 21917202736992 · 2399# + 19421 1037 c18 11 Quintuplet (2), ECPP<br />
103101 21917202736992 · 2399# + 19417 1037 c18 11 Quintuplet (1), ECPP<br />
103102 21618999972620 · 2399# + 19429 1037 c18 11 Quintuplet (5), ECPP<br />
103103 21618999972620 · 2399# + 19427 1037 c18 11 Quintuplet (4), ECPP<br />
103104 21618999972620 · 2399# + 19423 1037 c18 11 Quintuplet (3), ECPP<br />
103105 21618999972620 · 2399# + 19421 1037 c18 11 Quintuplet (2), ECPP<br />
103106 21618999972620 · 2399# + 19417 1037 c18 11 Quintuplet (1), ECPP<br />
103149 6179783529 · 2411# + 1 1037 p102 03 Arithmetic progression (8, d =<br />
176836494 · 2411#)<br />
103482 R(1031) 1031 WD 85 Repunit<br />
103823 51800236080 · 2377# − 1 1017 p295 11 Cunningham chain (16p + 15)<br />
103904 418059269664 · 2371# + 1 1015 p308 11 Cunningham chain 2nd kind<br />
(16p − 15)<br />
103929 116040452086 · 2371# + 1 1014 p308 12 Arithmetic progression (9, d =<br />
6317280828 · 2371#)<br />
103930 115248484057 · 2371# + 1 1014 p308 13 Arithmetic progression (8, d =<br />
7327002535 · 2371#)<br />
103932 113236255068 · 2371# + 1 1014 p308 13 Arithmetic progression (8, d =<br />
6601354956 · 2371#)<br />
103933 112929231161 · 2371# + 1 1014 p308 13 Arithmetic progression (8, d =<br />
6982118533 · 2371#)<br />
104079 97336164242 · 2371# + 1 1014 p308 13 Arithmetic progression (9, d =<br />
6350457699 · 2371#)<br />
104203 93537753980 · 2371# + 1 1014 p308 13 Arithmetic progression (9, d =<br />
3388165411 · 2371#)<br />
104235 92836168856 · 2371# + 1 1014 p308 13 Arithmetic progression (9, d =<br />
127155673 · 2371#)<br />
105848 69318339141 · 2371# + 1 1014 p308 11 Arithmetic progression (9, d =<br />
1298717501 · 2371#)<br />
109087 V (4793) 1002 DK 95 Lucas number<br />
109130 V (4787) 1001 DK 95 Lucas number<br />
120
2 <strong>The</strong> Long <strong><strong>Prime</strong>s</strong><br />
<strong>The</strong>se are the primes that were too long to fit above.<br />
<strong>Prime</strong> with rank 1165 (398204 digits by p44) See on-line version for the rest <strong>of</strong> the digits<br />
“15238445279350815802...(398164 other digits)...70851559196354845061”<br />
<strong>Prime</strong> with rank 1863 (377922 digits by x29)<br />
(935695 · 2 627694 + 3) 2 + (1123581 · 2 313839 ) 2<br />
<strong>Prime</strong> with rank 1984 (367199 digits by p342)<br />
79916753563828279896266938611356192810163128144777193765 · 2 1219621 + 1<br />
<strong>Prime</strong> with rank 3958 (304031 digits by p269)<br />
(124812 · ((599098 · ((135704 · ((25370 · ((50352 · ((58764 · ((2380 · ((1680 · ((5010 · ((1056 · ((1870 ·<br />
((170 · ((60 · ((2 · (97929696 2 + 1)) 2 + 1)) 2 + 1)) 2 + 1)) 2 + 1)) 2 + 1)) 2 + 1)) 2 + 1)) 2 + 1)) 2 + 1)) 2 +<br />
1)) 2 + 1)) 2 + 1)) 2 + 1)) 2 + 1<br />
<strong>Prime</strong> with rank 4082 (301779 digits by x29)<br />
(730443 · 2 501223 + 3) 2 + (813155 · 2 250604 ) 2<br />
<strong>Prime</strong> with rank 6009 (275495 digits by p44)<br />
P hi(3, 10 137747 ) + (137 · 10 137748 + 731 · 10 129293 ) · (10 8454 − 1)/999<br />
<strong>Prime</strong> with rank 10581 (221071 digits by x34)<br />
P hi(5, (3668 · 16001# − 1) · (378266 · 16001#/5 + 1) 7 )<br />
<strong>Prime</strong> with rank 54337 (20562 digits by FE1)<br />
((((((2521008887 3 + 80) 3 + 12) 3 + 450) 3 + 894) 3 + 3636) 3 + 70756) 3 + 97220<br />
<strong>Prime</strong> with rank 57745 (15537 digits by x38)<br />
(U(9275, 1, 3961) + U(9275, 1, 3960))/(U(9275, 1, 45) + U(9275, 1, 44))<br />
<strong>Prime</strong> with rank 59402 (13956 digits by c54)<br />
P hi(5745, −38284)/(106238573731 · 139897540591 · 17964554195439674794086479311)<br />
<strong>Prime</strong> with rank 59691 (13657 digits by c64)<br />
6 · Bern(5462)/(724389557 · 8572589 · 3742097186099)<br />
<strong>Prime</strong> with rank 61201 (12533 digits by c63)<br />
6 · Bern(5078)/(64424527603 · 9985070580644364287)<br />
<strong>Prime</strong> with rank 61278 (12459 digits by c54)<br />
(2 41521 − 1)/41602235382028197528613357724450752065089<br />
<strong>Prime</strong> with rank 61388 (12395 digits by c59)<br />
(2 41263 − 1)/(1402943 · 983437775590306674647)<br />
<strong>Prime</strong> with rank 63177 (10763 digits by c64)<br />
121
1258566 · Bern(4462)/(2231 · 596141126178107 · 4970022131749)<br />
<strong>Prime</strong> with rank 64882 (8835 digits by c59)<br />
(2 29473 − 1)/(5613392570256862943 · 24876264677503329001)<br />
<strong>Prime</strong> with rank 65733 (8063 digits by c55)<br />
(2 26903 − 1)/1113285395642134415541632833178044793<br />
<strong>Prime</strong> with rank 65839 (7945 digits by c8)<br />
6 · Bern(3458)/28329084584758278770932715893606309<br />
<strong>Prime</strong> with rank 65866 (7906 digits by c39)<br />
U(37987)/(16117960073 · 94533840409 · 1202815961509)<br />
<strong>Prime</strong> with rank 67636 (7053 digits by c8)<br />
U(33997)/8119544695419968014626314520991088099382355441843013<br />
<strong>Prime</strong> with rank 68178 (6669 digits by c8)<br />
U(32077)/153087505413829037510511957221947361<br />
<strong>Prime</strong> with rank 68205 (6637 digits by c8)<br />
6 · Bern(2974)/19622040971147542470479091157507<br />
<strong>Prime</strong> with rank 68779 (6229 digits by c4)<br />
(2 20887 − 1)/(694257144641 · 3156563122511 · 28533972487913 · 1893804442513836092687)<br />
<strong>Prime</strong> with rank 69374 (5938 digits by c8)<br />
−E(2202)/53781055550934778283104432814129020709<br />
<strong>Prime</strong> with rank 69685 (5701 digits by c8)<br />
274386 · Bern(2622)/8518594882415401157891061256276973722693<br />
<strong>Prime</strong> with rank 69944 (5521 digits by c8)<br />
U(26591)/1929661069931436974692472737757606381<br />
<strong>Prime</strong> with rank 70360 (5364 digits by c8)<br />
V (25873)/34396575615094965590217427573609664640790259<br />
<strong>Prime</strong> with rank 70422 (5354 digits by c63)<br />
−30 · Bern(2504)/(313 · 424524649821233650433 · 117180678030577350578887 ·<br />
8016621720796146291948744439)<br />
<strong>Prime</strong> with rank 70531 (5338 digits by c8)<br />
V (25763)/92864275685263243511877732271066626563444291249<br />
<strong>Prime</strong> with rank 70612 (5274 digits by c4)<br />
(2 17683 − 1)/(234000819833373807217 · 62265855698776681155719328257)<br />
122
<strong>Prime</strong> with rank 70629 (5258 digits by c8)<br />
−E(1990)/8338208577950624722417016286765473477033741642105671913<br />
<strong>Prime</strong> with rank 70924 (5132 digits by p179)<br />
(99241437759 · 205881 · 4001# · (205881 · 4001# + 1) + 210) · (205881 · 4001# − 1)/35 + 5<br />
<strong>Prime</strong> with rank 70925 (5132 digits by p179)<br />
(99241437759 · 205881 · 4001# · (205881 · 4001# + 1) + 210) · (205881 · 4001# − 1)/35 + 1<br />
<strong>Prime</strong> with rank 70928 (5132 digits by p179)<br />
(91456744909 · 205881 · 4001# · (205881 · 4001# + 1) + 210) · (205881 · 4001# − 1)/35 + 5<br />
<strong>Prime</strong> with rank 70929 (5132 digits by p179)<br />
(84055657369 · 205881 · 4001# · (205881 · 4001# + 1) + 210) · (205881 · 4001# − 1)/35 + 13<br />
<strong>Prime</strong> with rank 70930 (5132 digits by p179)<br />
(84055657369 · 205881 · 4001# · (205881 · 4001# + 1) + 210) · (205881 · 4001# − 1)/35 + 7<br />
<strong>Prime</strong> with rank 70931 (5132 digits by p179)<br />
(84055657369 · 205881 · 4001# · (205881 · 4001# + 1) + 210) · (205881 · 4001# − 1)/35 + 1<br />
<strong>Prime</strong> with rank 70938 (5132 digits by p179)<br />
(61310346529 · 205881 · 4001# · (205881 · 4001# + 1) + 210) · (205881 · 4001# − 1)/35 + 13<br />
<strong>Prime</strong> with rank 70939 (5132 digits by p179)<br />
(61310346529 · 205881 · 4001# · (205881 · 4001# + 1) + 210) · (205881 · 4001# − 1)/35 + 7<br />
<strong>Prime</strong> with rank 70940 (5132 digits by p179)<br />
(61310346529 · 205881 · 4001# · (205881 · 4001# + 1) + 210) · (205881 · 4001# − 1)/35 + 1<br />
<strong>Prime</strong> with rank 70941 (5132 digits by p179)<br />
(51803036889 · 205881 · 4001# · (205881 · 4001# + 1) + 210) · (205881 · 4001# − 1)/35 + 7<br />
<strong>Prime</strong> with rank 72347 (4896 digits by c8)<br />
V (23663)/102462573963822806622784417315446994815407287584779<br />
<strong>Prime</strong> with rank 72436 (4812 digits by c4)<br />
E(1840)/31237282053878368942060412182384934425<br />
<strong>Prime</strong> with rank 73055 (4498 digits by c4)<br />
E(1736)/(55695515 · 75284987831 · 3222089324971117)<br />
<strong>Prime</strong> with rank 73078 (4479 digits by c8)<br />
U(21577)/(8626362776257 · 608114436652075009)<br />
<strong>Prime</strong> with rank 73176 (4365 digits by c4)<br />
(2 14621 − 1)/(1958650799081 · 9787919624201558678734079)<br />
123
<strong>Prime</strong> with rank 73463 (4200 digits by c8)<br />
276474 · Bern(2030)/(19426085 · 24191786327543)<br />
<strong>Prime</strong> with rank 73594 (4099 digits by c8)<br />
U(19777)/38707773384498015680717776815690169<br />
<strong>Prime</strong> with rank 73898 (4002 digits by c8)<br />
U(19433)/(8200903423639793 · 124790158973035710313 · 163702910239586286961573)<br />
<strong>Prime</strong> with rank 74019 (3815 digits by c8)<br />
U(18427)/(1828363793 · 23130933997 · 11364458229549793)<br />
<strong>Prime</strong> with rank 74101 (3734 digits by c8)<br />
−197676570 · 18851280661 · Bern(1836)/(59789 · 3927024469727)<br />
<strong>Prime</strong> with rank 74191 (3708 digits by c4)<br />
(2 12451 − 1)/(4980401 · 15289230353 · 1143390212315192593598809)<br />
<strong>Prime</strong> with rank 74219 (3682 digits by c8)<br />
−E(1466)/167900532276654417372106952612534399239<br />
<strong>Prime</strong> with rank 74227 (3671 digits by c4)<br />
E(1468)/(95 · 217158949445380764696306893 · 597712879321361736404369071)<br />
<strong>Prime</strong> with rank 74394 (3534 digits by c8)<br />
U(17107)/443919134681243021973608341513641044831429<br />
<strong>Prime</strong> with rank 75596 (3284 digits by c4)<br />
(2 11117 − 1)/358196436964270608221221853970927519972222557196875442622337153<br />
<strong>Prime</strong> with rank 75873 (3030 digits by c4)<br />
(2 10211 − 1)/306772303457009724362047724636324707614338377<br />
<strong>Prime</strong> with rank 75885 (3022 digits by c8)<br />
(2 10169 − 1)/10402314702094700470118039921523041260063<br />
<strong>Prime</strong> with rank 76643 (2979 digits by c8)<br />
(2 10007 − 1)/(14477908246561 · 136255313 · 10368448917257)<br />
<strong>Prime</strong> with rank 76799 (2888 digits by c8)<br />
(2 9697 − 1)/(724126946527 · 19092282046942032847)<br />
<strong>Prime</strong> with rank 76819 (2876 digits by c4)<br />
(2 9733 − 1)/(2932747561 · 353435802999708808999 · 4424579967215442704801447)<br />
<strong>Prime</strong> with rank 76867 (2829 digits by c8)<br />
−E(1174)/50550511342697072710795058639332351763<br />
124
<strong>Prime</strong> with rank 77452 (2586 digits by c8)<br />
V (12671)/276519937834929602436333890914844306370626390513950299706293091<br />
<strong>Prime</strong> with rank 79975 (2276 digits by c4)<br />
−2090369190 · Bern(1236)/(103 · 939551962476779 · 157517441360851951)<br />
<strong>Prime</strong> with rank 81947 (2069 digits by c4)<br />
−E(902)/(9756496279 · 314344516832998594237)<br />
<strong>Prime</strong> with rank 85462 (1640 digits by c62)<br />
6 · Bern(998)/(11511758102983 · 55034215982714323 · 70834556505031411 ·<br />
38698489087506303607099 · 4712129605357293035277301907 · 362429490639499678761278968817)<br />
<strong>Prime</strong> with rank 87177 (1418 digits by c4)<br />
−54570 · Bern(848)/(428478023 · 5051145078213134269)<br />
<strong>Prime</strong> with rank 87489 (1391 digits by c8)<br />
E(676)/878618128969410121818976030235415\<br />
<strong>Prime</strong> with rank 88479 (1343 digits by c4)<br />
67004933531313911504892717789158174298202475475590955674162377015<br />
−E(638)/(7235862947323 · 11411779188663863 · 526900327479624797)<br />
<strong>Prime</strong> with rank 89628 (1311 digits by c4)<br />
138·Bern(814)/(28409964671·335055893·351085907·520460183·30348030379·17043083582983)<br />
<strong>Prime</strong> with rank 97597 (1143 digits by c8)<br />
E(576)/1035784073998708077865\<br />
<strong>Prime</strong> with rank 102116 (1060 digits by c4)<br />
03857073455806041088176158903345179750769398899240791530780628185<br />
−E(526)/(5062100689 · 71096484738291757946225730043997)<br />
3 Table <strong>of</strong> Pro<strong>of</strong>-Codes<br />
Key to Pro<strong>of</strong>-Codes (primality provers):<br />
code description<br />
BC Penk, Buhler, Crandall<br />
C Caldwell, Cruncher<br />
c2 Water, Primo<br />
c4 Broadhurst, Primo<br />
c8 Water, Broadhurst, Primo<br />
c11 Oakes, Primo<br />
c14 Fougeron, Primo<br />
c18 Luhn, Primo<br />
c23 Andersen, Alm, OpenPFGW, Primo<br />
125
code description<br />
c26 Keiser, OpenPFGW, Primo<br />
c31 Andersen, Alm, Rosenthal, OpenPFGW, Primo<br />
c32 DavisK, OpenPFGW, Primo<br />
c33 Chaglassian, Primo<br />
c35 Cami, Primo<br />
c36 Andersen, Willegen, Rosenthal, OpenPFGW, Primo<br />
c37 Chaffey, Primo<br />
c39 Minovic, OpenPFGW, Primo<br />
c41 Andersen, Rosenthal, Primo<br />
c45 DavisK, NewPGen, Primo<br />
c46 Boncompagni, Primo<br />
c47 Chandler, Primo<br />
c54 WuT , P rimo<br />
c55 Gramolin, Primo<br />
c56 Soule, Minovic, OpenPFGW, Primo<br />
c58 Kaiser1, OpenPFGW, NewPGen, Primo<br />
c59 Metcalfe, OpenPFGW, Primo<br />
c60 Lemsafer, Primo<br />
c61 Kaiser1, Broadhurst, OpenPFGW, NewPGen, Primo<br />
c62 Minovic, TOPS, Primo<br />
c63 Ritschel, TOPS, Primo<br />
c64 Metcalfe, Minovic, Ritschel, TOPS, Primo<br />
CD Dubner, Caldwell, Cruncher<br />
CH1 Soule, Minovic, CHG, Primo, OpenPFGW<br />
CH2 WuT , CHG, P rimo, OpenP F GW<br />
CH3 Water, Broadhurst, CHG, Primo, OpenPFGW<br />
CH4 Irvine, Water, Broadhurst, CHG, Primo, OpenPFGW<br />
CH6 Steward, CHG, Primo, OpenPFGW<br />
CH7 Broadhurst, CHG, OpenPFGW<br />
D Dubner, Cruncher<br />
DK Dubner, Keller, Cruncher<br />
DM Demichel<br />
DS SmithDarren, P roth.exe<br />
f7 Heuer, ForEis, PhiSieve, OpenPFGW, PIES<br />
f14 Hillegas, ForEis, PhiSieve, PIES<br />
FE1 Morain, FastECPP<br />
FE3 Wirth, Kleinjung, Franke, Morain, FastECPP<br />
FE4 Morain, Broadhurst, FastECPP, OpenPFGW<br />
FE5 Luhn, Morain, FastECPP<br />
FE7 Deng, Morain, FastECPP<br />
FE8 Oakes, Morain, Water, Broadhurst, FastECPP<br />
FE9 Morain, Water, Broadhurst, FastECPP<br />
g0 Gallot, Proth.exe<br />
g1 Caldwell, Proth.exe<br />
G1 Armengaud, GIMPS, <strong>Prime</strong>95<br />
G2 Spence, GIMPS, <strong>Prime</strong>95<br />
G3 Clarkson, Kurowski, GIMPS, <strong>Prime</strong>95<br />
G4 Hajratwala, Kurowski, GIMPS, <strong>Prime</strong>95<br />
G5 Cameron, Kurowski, GIMPS, <strong>Prime</strong>95<br />
G6 Shafer, GIMPS, <strong>Prime</strong>95<br />
126
code description<br />
G7 FindleyJ, GIMP S, P rime95<br />
G8 Nowak, GIMPS, <strong>Prime</strong>95<br />
G9 Boone, Cooper, GIMPS, <strong>Prime</strong>95<br />
G10 SmithE, GIMP S, P rime95<br />
G11 Elvenich, GIMPS, <strong>Prime</strong>95<br />
G12 Strindmo, GIMPS, <strong>Prime</strong>95<br />
G13 Cooper, GIMPS, <strong>Prime</strong>95<br />
g23 Ballinger, Proth.exe<br />
g25 OHare, Proth.exe<br />
g55 Toplic, Proth.exe<br />
g59 Linton, Proth.exe<br />
g103 DallOsto, Proth.exe<br />
g106 Kuechler, Proth.exe<br />
g122 Nohara, Proth.exe<br />
g124 Crickman, Proth.exe<br />
g132 Cosgrave, Proth.exe<br />
g141 Scott, Proth.exe<br />
g148 Samidoost, Proth.exe<br />
g157 Loeh, Proth.exe<br />
g181 Bodenstein, Proth.exe<br />
g182 McElhatton, Proth.exe<br />
g196 Odermatt, Proth.exe<br />
g197 Muischnek, Proth.exe<br />
g208 Tawaris, Proth.exe<br />
g236 Heuer, GFNSearch, GFN17Sieve, Proth.exe<br />
g245 Cosgrave, PRP, NewPGen, Proth.exe<br />
g246 Choliy, Proth.exe<br />
g258 Neves, PRP, NewPGen, Proth.exe<br />
g259 Papp, Proth.exe<br />
g260 AYENI, Proth.exe<br />
g262 Kapek, Proth.exe<br />
g266 Hagel, Proth.exe<br />
g267 Grobstich, PRP, NewPGen, Proth.exe<br />
g277 Eaton, PRP, NewPGen, Proth.exe<br />
g279 Cooper, PRP, NewPGen, Proth.exe<br />
g281 Berndt, Proth.exe<br />
g294 Underbakke, TwinGen, PRP, Proth.exe<br />
g295 Underbakke, AthGFNSieve, Proth.exe<br />
g299 Dowd, Scott, Proth.exe<br />
g300 Zilmer, Proth.exe<br />
g305 Berg2, Proth.exe<br />
g308 Angel, GFNSearch, GFN17Sieve, Proth.exe<br />
g320 Griffin, PRP, NewPGen, NPLB, Proth.exe<br />
g336 Tornberg, PRP, NewPGen, Proth.exe<br />
g346 Dausch, ProthSieve, PRP, <strong>Prime</strong>Sierpinski, Proth.exe<br />
g356 Hughes1, Proth.exe<br />
g380 Tajima, PRP, NewPGen, Proth.exe<br />
g387 Muzik, Proth.exe<br />
g396 Boncompagni, PRP, NewPGen, Proth.exe<br />
g403 Yoshimura, ProthSieve, LLR, <strong>Prime</strong>Sierpinski, Proth.exe<br />
127
code description<br />
g404 Taniguchi, Proth.exe<br />
g407 HermleGC, MultiSieve, PRP, Proth.exe<br />
g410 Anonymous, AthGFNSieve, GFNSearch, GFN16Sieve, Proth.exe<br />
g411 Brittenham, PRP, NewPGen, Proth.exe<br />
g412 Kamenyuk, Proth.exe<br />
g413 Scott, AthGFNSieve, Proth.exe<br />
g414 Gilvey, Srsieve, LLR, <strong>Prime</strong>Grid, <strong>Prime</strong>Sierpinski, Proth.exe<br />
g418 Taura, PRP, NewPGen, Proth.exe<br />
g423 Ballinger, PRP, NewPGen, Proth.exe<br />
g424 Broadhurst, OpenPFGW, NewPGen, Proth.exe<br />
g425 Buechel, Keller, Broadhurst, PRP, OpenPFGW, Proth.exe<br />
g426 Nemeth, OpenPFGW, NewPGen, Proth.exe<br />
g428 Peets, OpenPFGW, NewPGen, Proth.exe<br />
g429 Underbakke, GenefX64, AthGFNSieve, <strong>Prime</strong>Grid, Proth.exe<br />
GC1 Angel, GFNSearch, GFN16Sieve, Proth.exe<br />
GC2 Hluchan, GFNSearch, GFN16Sieve, Proth.exe<br />
GF0 Gallot, Proth.exe, GFNSieve, GFNSearch<br />
GF2 Heuer, Proth.exe, GFNSieve, GFNSearch<br />
GF3 Penrose, Proth.exe, GFNSieve, GFNSearch<br />
gm Morii, Proth.exe<br />
gt Taura, Proth.exe<br />
K Keller<br />
L2 Penne, NewPGen, LLR<br />
L4 Sun, NewPGen, LLR<br />
L6 Xiao, LLR<br />
L10 Ritschel, NewPGen, LLR<br />
L30 Ritschel, NewPGen, 321search, LLR<br />
L35 Faith, RieselSieve, LLR<br />
L47 BishopD, P rothSieve, RieselSieve, LLR<br />
L49 Stolz, ProthSieve, RieselSieve, LLR<br />
L51 Hedges, PRP, NewPGen, LLR<br />
L53 Zaveri, ProthSieve, PRP, RieselSieve, LLR<br />
L56 Minovic, Ksieve, NewPGen, LLR<br />
L57 Rodenkirch, NewPGen, LLR<br />
L58 NilssonR, 15k, LLR<br />
L59 Kowzun, NewPGen, 321search, LLR<br />
L62 Ewing, NewPGen, 12121search, LLR<br />
L65 Clowes, NewPGen, 12121search, LLR<br />
L66 Haas, NewPGen, 12121search, LLR<br />
L73 Wallace, ProthSieve, NewPGen, RieselSieve, LLR<br />
L74 Hughes1, LLR<br />
L76 Meissner, ProthSieve, RieselSieve, LLR<br />
L77 Depereyra, 321search, LLR<br />
L80 Benson, NewPGen, LLR<br />
L84 Mischel, RieselSieve, LLR<br />
L93 Sefko, ProthSieve, RieselSieve, LLR<br />
L95 Urushi, LLR<br />
L99 Underbakke, TwinGen, LLR<br />
L100 Minovic, TwinGen, LLR<br />
L101 Aggarwal, ProthSieve, <strong>Prime</strong>Sierpinski, LLR<br />
128
code description<br />
L105 Ho<strong>of</strong>, ProthSieve, RieselSieve, LLR<br />
L111 Fisher, ProthSieve, RieselSieve, LLR<br />
L113 Chatfield, NewPGen, LLR<br />
L121 Benson, Srsieve, Rieselprime, LLR<br />
L123 Gillion, NewPGen, LLR<br />
L124 Rodenkirch, MultiSieve, LLR<br />
L129 Snyder, LLR<br />
L134 Childers, ProthSieve, RieselSieve, LLR<br />
L137 Jaworski, Rieselprime, LLR<br />
L139 Metcalfe, NewPGen, Rieselprime, LLR<br />
L145 Minovic, Ksieve, NewPGen, Rieselprime, LLR<br />
L153 Eckhard, LLR<br />
L158 Underwood, NewPGen, 321search, LLR<br />
L160 Wong, ProthSieve, RieselSieve, LLR<br />
L162 Banka, NewPGen, 12121search, LLR<br />
L163 Ritschel, NewPGen, Rieselprime, LLR<br />
L165 Keiser, OpenPFGW, NewPGen, LLR<br />
L167 Curtis, NewPGen, Rieselprime, LLR<br />
L170 Crosa, LLR<br />
L172 Smith, ProthSieve, RieselSieve, LLR<br />
L175 Duggan, ProthSieve, RieselSieve, LLR<br />
L177 Kwok, Rieselprime, LLR<br />
L179 White, ProthSieve, RieselSieve, LLR<br />
L181 Siegert, LLR<br />
L185 Hassler, NewPGen, LLR<br />
L191 Banka, NewPGen, LLR<br />
L192 Jaworski, LLR<br />
L193 Rosink, ProthSieve, RieselSieve, LLR<br />
L197 DaltonJ, ProthSieve, RieselSieve, LLR<br />
L200 Jaworski, Ksieve, NewPGen, Rieselprime, LLR<br />
L201 Siemelink, LLR<br />
L202 Vautier, McKibbon, Gribenko, NewPGen, <strong>Prime</strong>Grid, TPS, LLR<br />
L203 Murata, LLR<br />
L217 Lehmann, Rieselprime, LLR<br />
L251 Burt, NewPGen, Rieselprime, LLR<br />
L256 Underwood, Srsieve, NewPGen, 321search, LLR<br />
L257 Ritschel, Srsieve, Rieselprime, LLR<br />
L260 Soule, Srsieve, Rieselprime, LLR<br />
L261 Metcalfe, Srsieve, ProthSieve, Rieselprime, LLR<br />
L268 Metcalfe, Srsieve, Rieselprime, LLR<br />
L282 Curtis, Srsieve, Rieselprime, LLR<br />
L284 Burt, NewPGen, LLR<br />
L321 Broadhurst, OpenPFGW, NewPGen, LLR<br />
L323 Minovic, Srsieve, NewPGen, Rieselprime, LLR<br />
L324 Doorn, NewPGen, <strong>Prime</strong>Grid, TPS, LLR<br />
L326 Green, NewPGen, <strong>Prime</strong>Grid, TPS, LLR<br />
L327 Ziersch, NewPGen, <strong>Prime</strong>Grid, TPS, LLR<br />
L328 AverayJones, NewPGen, <strong>Prime</strong>Grid, TPS, LLR<br />
L329 Schoenrogge, NewPGen, <strong>Prime</strong>Grid, TPS, LLR<br />
L330 Tjung, Srsieve, Rieselprime, LLR<br />
129
code description<br />
L333 Jogibhai, NewPGen, <strong>Prime</strong>Grid, TPS, LLR<br />
L334 Saksanen, NewPGen, <strong>Prime</strong>Grid, TPS, LLR<br />
L337 ClarkR, NewP Gen, P rimeGrid, T P S, LLR<br />
L339 Vandenberg, NewPGen, <strong>Prime</strong>Grid, TPS, LLR<br />
L341 Kaehler, NewPGen, <strong>Prime</strong>Grid, TPS, LLR<br />
L346 MorenoA, NewP Gen, P rimeGrid, T P S, LLR<br />
L350 Laurijssens, NewPGen, <strong>Prime</strong>Grid, TPS, LLR<br />
L381 Mate, Siemelink, Rodenkirch, MultiSieve, LLR<br />
L384 Pinho, Srsieve, Rieselprime, LLR<br />
L391 Rodenkirch, Srsieve, LLR<br />
L421 Bonath, Srsieve, Rieselprime, LLR<br />
L426 Jaworski, Srsieve, Rieselprime, LLR<br />
L436 Andersen2, Gcwsieve, MultiSieve, <strong>Prime</strong>Grid, LLR<br />
L446 Saridis, NewPGen, Proth.exe, LLR<br />
L447 Kohlman, Gcwsieve, MultiSieve, <strong>Prime</strong>Grid, LLR<br />
L466 Zhou, NewPGen, LLR<br />
L478 Sutton1, G<strong>of</strong>orth, Srsieve, Rieselprime, LLR<br />
L486 G<strong>of</strong>orth, Curtis, Srsieve, Rieselprime, LLR<br />
L488 Sutton1, Srsieve, NewPGen, Rieselprime, LLR<br />
L503 Benson, Srsieve, LLR<br />
L521 Thompson1, Gcwsieve, MultiSieve, <strong>Prime</strong>Grid, LLR<br />
L527 Tornberg, TwinGen, LLR<br />
L536 Bonath, Srsieve, NPLB, LLR<br />
L545 AndersonM, NewPGen, Rieselprime, LLR<br />
L548 Barnes, Srsieve, NPLB, LLR<br />
L565 Burt, Srsieve, NPLB, LLR<br />
L579 Sorbera, Srsieve, NPLB, LLR<br />
L587 Dettweiler, Srsieve, CRUS, LLR<br />
L590 Padro, NewPGen, 12121search, LLR<br />
L596 Vogel, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L606 Bennett, Srsieve, NewPGen, <strong>Prime</strong>Grid, 321search, LLR<br />
L613 Keogh, Srsieve, ProthSieve, RieselSieve, LLR<br />
L615 Vogel, Srsieve, NPLB, LLR<br />
L621 Sutton1, Srsieve, Rieselprime, LLR<br />
L622 Cardall, Srsieve, ProthSieve, RieselSieve, LLR<br />
L623 Jaworski, Srsieve, NPLB, LLR<br />
L632 Stokkedalen, Rieselprime, LLR<br />
L635 Vogel, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L637 DeTroia, PRP, OpenPFGW, NewPGen, LLR<br />
L639 Depereyra, Srsieve, Rieselprime, LLR<br />
L644 Gunn, Srsieve, NPLB, LLR<br />
L645 Luhn, LLR<br />
L651 Courty, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L656 Yama, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L667 Riesen, NewPGen, LLR<br />
L668 Ueda, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L669 Harvey, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L679 Foody, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L689 Brown1, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L690 Cholt, Srsieve, <strong>Prime</strong>Grid, LLR<br />
130
code description<br />
L696 Nicol, Srsieve, NPLB, LLR<br />
L732 Embling, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L753 Wolfram, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L764 Ewing, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L769 Chu, Srsieve, NPLB, LLR<br />
L780 Brady, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L801 Gesker, Gcwsieve, MultiSieve, <strong>Prime</strong>Grid, LLR<br />
L849 Domanov1, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L860 Burt, Srsieve, FreeDC<strong>Prime</strong>Search, LLR<br />
L862 Lody, Srsieve, FreeDC<strong>Prime</strong>Search, LLR<br />
L872 Gronow, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L895 Dinkel, Srsieve, LLR<br />
L917 Bergman1, Gcwsieve, MultiSieve, <strong>Prime</strong>Grid, LLR<br />
L923 Kaiser1, Klahn, NewPGen, <strong>Prime</strong>Grid, TPS, SunGard, LLR<br />
L927 Brown1, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L934 Desmond, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L955 Domanov1, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L958 Schoefer, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L967 Courty, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L975 Hnizdil, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L983 WuT , LLR<br />
L989 Cavecchia, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L990 Uehara1, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L1008 Fries, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L1065 Gockel, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1115 Splain, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1121 VanGorp, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1122 Parker, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1124 Snow, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1125 Laluk, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1126 Morris, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L1129 Slomma, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1130 Adolfsson, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1132 Rickard, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1134 Ogawa, Srsieve, NewPGen, LLR<br />
L1135 Frith, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1141 Ogawa, NewPGen, LLR<br />
L1149 Gallagher, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1153 Kaiser1, Srsieve, <strong>Prime</strong>Grid, 12121search, LLR<br />
L1158 Vogel, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1167 Chambers, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1173 MacIain, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1174 Brazier, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1176 Dunn, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1180 Morris1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1183 Gaster, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L1186 Richard1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1201 Carpenter1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1203 Mauno, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1204 Brown1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
131
code description<br />
L1207 Storch, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1209 Wong, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1210 Rhodes, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1214 Patterson, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1218 Winslow, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1219 Ohyanagi1, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L1223 Courty, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1224 Domanov1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1229 Gordon1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1230 Yooil1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1269 Timm, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1286 Scullin, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L1293 Ueda, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1300 Yama, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1303 Koval, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1312 Nye, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1314 Ajayi, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1319 Cholt, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L1324 Southey, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1330 Winskill1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1336 Burt, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1341 DUrso, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1344 Kobara, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1349 Wallace, Srsieve, NewPGen, <strong>Prime</strong>Grid, LLR<br />
L1353 Mumper, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1354 Vynogradov, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1356 Gockel, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1357 Schulz1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1360 Tatterson, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1365 Hidy, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1371 AhKit, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1379 Uehara1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1387 Anonymous, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1393 Hurd, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1402 Roberts1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1404 Klein, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1406 Lovov, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1408 Emery, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1412 JonesM , P Sieve, Srsieve, P rimeGrid, LLR<br />
L1415 Englund, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1422 Steichen, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1430 Schwieger, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L1433 Webster, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L1440 Sherman, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1446 Harvey, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1448 Hron, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1449 Pine, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1450 VanderVeen, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1456 Webster, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1460 Salah, Srsieve, <strong>Prime</strong>Grid, <strong>Prime</strong>Sierpinski, LLR<br />
132
code description<br />
L1462 Glogau, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1464 Wunder, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1469 Cushing, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1471 Gunn, Srsieve, CRUS, LLR<br />
L1478 Ohyanagi1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1480 Goudie, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1484 Morris, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1486 Dinkel, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1487 Krompolc, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1492 Eiterig, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1498 Goral, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1500 Melvold, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1502 Champ, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1505 Watanabe, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1509 Wallin, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1512 Obara, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1513 Miller1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1519 Castigliola, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1520 Leavitt, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1524 Bohl, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1531 Skvor, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1533 Heinicken, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1546 Franke1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1547 Shewbridge, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1552 Futaba, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1554 Melcher, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1555 Walczak, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1559 Smith1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1562 Myllyvirta, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1566 Watanabe, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L1568 Pyke, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1576 Craig, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1584 ODonnell, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1588 Chambers, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L1589 Myllyvirta, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L1591 Tatterson, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L1595 Cilliers, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1603 Fukui, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L1617 Seager, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L1620 Herman, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1633 Gott, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L1637 Baerwolf, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L1660 Smith6, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1661 Mitchell1, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L1675 Schwieger, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1684 Lovov, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L1685 Kemp1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1697 Lachance, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L1704 Romelard, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L1706 Brand, TwinGen, <strong>Prime</strong>Grid, LLR<br />
133
code description<br />
L1709 Rickard, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L1727 Osychenko, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1728 Gasewicz, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1733 Murphy, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1741 Granowski, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1745 Cholt, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1751 Eckhard, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1752 Takeuchi, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1753 Iwasaki, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1758 Micheli, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1761 Dhuyvetters, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1776 Hittle, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1780 Ming, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1792 Tang, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1793 Corsello, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1808 Reynolds1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1809 Vogel, PSieve, Srsieve, NPLB, LLR<br />
L1814 Melvold, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L1815 Lody, PSieve, Srsieve, NPLB, LLR<br />
L1816 Davies, PSieve, Srsieve, NPLB, LLR<br />
L1817 Barnes, PSieve, Srsieve, NPLB, LLR<br />
L1818 Khadjiyev, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1819 Gunn, PSieve, Srsieve, NPLB, LLR<br />
L1820 Gledhill, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1823 Larsson, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1827 Chatfield, PSieve, Srsieve, NPLB, LLR<br />
L1828 Benson, PSieve, Srsieve, Rieselprime, LLR<br />
L1830 Bonath, PSieve, Srsieve, NPLB, LLR<br />
L1838 Gilvey, PSieve, Srsieve, NPLB, LLR<br />
L1842 Ohlsson, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1846 Marshall1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1847 Liu1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1860 Bartholomew1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1862 Curtis, PSieve, Srsieve, Rieselprime, LLR<br />
L1866 Cilliers, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L1878 Gordon1, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L1884 Jaworski, PSieve, Srsieve, Rieselprime, LLR<br />
L1885 Ostaszewski, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1888 Gremont, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1889 Bard, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1920 Iwasaki, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L1921 Winslow, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L1927 Harvey, Srsieve, LLR<br />
L1929 Kennedy1, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L1931 Lee3, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1933 Ingram, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1934 Schmidt, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1935 Channing, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1945 Clark2, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L1948 Miller1, TwinGen, <strong>Prime</strong>Grid, LLR<br />
134
code description<br />
L1949 Pritchard, Srsieve, <strong>Prime</strong>Grid, RieselSieve, LLR<br />
L1953 Reynolds1, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L1956 Reinman, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1957 Hemsley, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1958 DUrso, Srsieve, OpenPFGW, NewPGen, LLR<br />
L1959 Metcalfe, PSieve, Srsieve, Rieselprime, LLR<br />
L1969 Bower, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1972 Jarrett, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1978 Chu, PSieve, Srsieve, NPLB, LLR<br />
L1980 Mueller3, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1983 Safford, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1990 Makowski, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1991 Shaw, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L1999 Obermeyer, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2002 Gramolin, NewPGen, LLR<br />
L2017 Hubbard, PSieve, Srsieve, NPLB, LLR<br />
L2019 WoodD, P Sieve, Srsieve, P rimeGrid, LLR<br />
L2028 Klein, PSieve, Srsieve, NPLB, LLR<br />
L2030 Tonner, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2037 Jagsz, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2038 Siegert, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2045 Tanaka, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2046 Melvold, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2047 Stevens, PSieve, Srsieve, NPLB, LLR<br />
L2048 Chadwick, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2050 Kaiser1, Srsieve, <strong>Prime</strong>Grid, SierpinskiRiesel, LLR<br />
L2051 Reich, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2054 Kaiser1, Srsieve, CRUS, LLR<br />
L2055 Soule, PSieve, Srsieve, Rieselprime, LLR<br />
L2058 Sas, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2063 Dahlman, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2064 Belogourov, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2066 Harste, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2070 Schemmel, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2071 Yamamura, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2074 Minovic, PSieve, Srsieve, Rieselprime, LLR<br />
L2078 Dahlman, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2080 Schick, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2081 Reder, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2083 Yamamura, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2085 Dodson1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2090 Craig, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2093 McNeill, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2100 Christensen, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2101 Tutusaus, PSieve, Srsieve, Rieselprime, LLR<br />
L2107 Hebr, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2110 Sattler, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2113 Kliber, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2117 Karlsteen, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2121 VanRangelrooij, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
135
code description<br />
L2122 Megele, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2125 Greer, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2126 Senftleben, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2127 Scherbakov, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2131 Johnson4, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2133 VanRangelrooij, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2137 Hayashi1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2139 Hagerty, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2142 Hajek, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2147 Dulaurens, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2163 VanRooijen1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2164 Dodson1, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2167 Miyakoshi, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2168 Butler, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2169 Michaud, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2176 Baumgartner, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2187 Phillips, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2197 Herman, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2204 Parker1, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2222 Johnson5, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2233 Herder, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2235 Mullage, PSieve, Srsieve, NPLB, LLR<br />
L2241 Wintrip, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2246 Antonides, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2247 Lody, PSieve, Srsieve, FreeDC<strong>Prime</strong>Search, LLR<br />
L2249 Tikkenei1, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2250 Hebr, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2255 Dinkel, PSieve, Srsieve, NPLB, LLR<br />
L2257 Dettweiler, PSieve, Srsieve, NPLB, LLR<br />
L2265 Miyakoshi, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2269 Schori, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2279 Millerick, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2283 Eiterig, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2308 Hutchinson, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2322 Szafranski, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2327 Oh, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2338 Burt, PSieve, Srsieve, Rieselprime, LLR<br />
L2342 Marafuga, Srsieve, SierpinskiRiesel, LLR<br />
L2345 Boerner, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2352 Doom, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2354 Sheridan, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2356 Schmitt, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2366 Satoh, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2368 Telegd, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2371 Luszczek, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2373 Tarasov1, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2375 Manz, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2377 Nicol, Srsieve, FreeDC<strong>Prime</strong>Search, LLR<br />
L2379 Doom, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2382 Matillek, TwinGen, <strong>Prime</strong>Grid, LLR<br />
136
code description<br />
L2399 Bouch, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2407 Sas, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2408 Reinman, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2410 Smukler, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2412 Ahn, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2413 Blyth, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2414 Carper, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2419 Gathright, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2425 DallOsto, LLR<br />
L2429 Bliedung, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2430 Hayase, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2432 Sutton1, PSieve, Srsieve, Rieselprime, LLR<br />
L2433 Hatoum, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2434 Wakayama, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2438 Tonner, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2442 Zou, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2444 Batalov, PSieve, Srsieve, Rieselprime, LLR<br />
L2447 Chagas, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2449 Satoh, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2453 Bogachov, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2454 Koscak, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2455 Kleemann, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2457 Zhuravlev, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2472 Berker, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2478 VanRooijen1, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2484 Ritschel, PSieve, Srsieve, Rieselprime, LLR<br />
L2487 Liao, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2494 Javtokas, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2496 Ji, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2502 Schimmel, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2503 Zhan1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2504 Corsello, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2507 Geis, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2511 Johnson6, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2513 Ilves, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2515 Trice, NewPGen, LLR<br />
L2516 Koschewski, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2517 McPherson, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2518 Karevik, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2519 Schmidt2, PSieve, Srsieve, NPLB, LLR<br />
L2520 Mamanakis, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2521 Matillek, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2522 Foody, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2525 Bliedung, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2526 Martinik, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2528 Long, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2530 Matsumoto1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2531 Sasahara, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2532 Papp2, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2533 Yoshikawa, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
137
code description<br />
L2538 Wilcoxen, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2539 Gielkens, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2540 Bourghol, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2542 Appenzeller, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2543 Hartel, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2544 Tarasov1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2545 Nose, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2549 McKay, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2550 GurneyChampion, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2551 HinWai, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2557 Clark3, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2560 Grube, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2561 Vinklat, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2562 Jones3, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2564 Bravin, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2571 Carper, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2573 McKay, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2576 Tyler, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2583 Nakamura, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2592 Watanabe1, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2593 Johnson6, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2594 Sheridan, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2595 Out, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2600 Phillips, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2601 Paul, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2603 H<strong>of</strong>fman, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2604 Nobis, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2606 Slakans, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2612 Xu1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2613 Schmidt2, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2616 Groger, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2618 Mohr, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2619 Krawczyk, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2620 Droniou, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2623 Pabis, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2626 DeKlerk, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2627 Graham2, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2633 Burtner, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2636 Fick, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2642 Reich1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2643 Jesus, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2649 Brandstaetter, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2652 Chang1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2653 Heinz, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2655 Schaap, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2659 Reber, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2664 Koluvere, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2672 Salte, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2673 Burningham, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2674 Michalowski, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
138
code description<br />
L2675 Ling, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2679 DeKlerk, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2680 Kurtovic, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2683 Utsey, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2684 Hirai, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2685 Yang, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2691 Pettersen, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2694 Baudouin, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2698 Beranek, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2700 Romig, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2702 Maruska, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2703 Armstrong, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2704 Blazek, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2705 Dily1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2706 Lane, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2708 Klein, Srsieve, NewPGen, LLR<br />
L2711 Astrom, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2713 Demizu, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2714 Piortowski, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2715 Donovan, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2716 Almeida, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2718 Katsavounidis, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2719 Yost, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2720 Aguirre, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2721 Cooper1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2723 Paul, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2724 AverayJones, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2725 Grimm, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2726 Hauswald, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2727 Johnston, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2730 Gwiazda, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2731 Pohorily, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2732 Williams4, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2733 Sch<strong>of</strong>ield, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2734 Mamonov, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2735 Kenney, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2736 Ketamino, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2737 Baris, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2739 Olson1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2740 Gearreald, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2741 Gordini, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2742 Fluttert, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2744 LeCoadou, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2745 Ishikawa, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2748 Weezepoel, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2749 Brooks, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2753 Ketamino, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2754 Nakamura, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2773 Derrera, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L2777 Ritschel, Gcwsieve, TOPS, LLR<br />
139
code description<br />
L2779 Perry, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2783 Kohn, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2785 Meili, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2787 Kapicioglu, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2789 Ueta, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2790 Szymeczko, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2791 Safwat, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2792 Mahe, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2793 Drusc, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2794 Krawiec, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2796 Thanry, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2797 Mark, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2799 Goninan, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2800 Luedemann, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2801 Dejong, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2802 Day, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2803 Barbyshev, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2804 Krapp, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2805 Barr, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2806 Tatsuta, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2807 Andersen1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2808 Ferrandis, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2809 Sander, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2810 Skoog, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2811 Martinez1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2812 Letzin, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2813 Sumi, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2814 Metrock, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2815 Suchomsky, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2816 Pecio, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2819 Stefko, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2820 Fomenko, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2821 Dejong1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2823 Loureiro, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2824 Hippeau, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2826 Jeudy, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2827 Melzer, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2828 Vogel, NewPGen, TPS, LLR<br />
L2829 WongC, P Sieve, Srsieve, P rimeGrid, LLR<br />
L2832 Schmidt2, NewPGen, TPS, LLR<br />
L2834 Finkel, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2835 Pinnock, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2841 Minovic, Gcwsieve, MultiSieve, TOPS, LLR<br />
L2842 English1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2848 Goldbach, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2849 Poplaski, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2850 Baron, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2851 Aston, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2853 Weetman, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2854 Bowler, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
140
code description<br />
L2855 Gerlach, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2856 Charette, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2857 Ball, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2858 Hunger, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2859 Keenan, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2861 Gatewood, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2862 Koepke, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2863 Orr, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2873 Jurach, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2876 Pryazhentsev, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2879 Longden, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2884 Andersen2, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2887 Harper, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2890 Smelser, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2891 Lacroix, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2900 Bower, NewPGen, TPS, LLR<br />
L2901 Leschek, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2903 Netzeband, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2904 Webster1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2905 Cannell, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2906 Dreher, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2907 Holmes1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2908 Wild, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2909 Brys, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2910 Kiesanowski, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2911 Burt, Gcwsieve, MultiSieve, GenWoodall, LLR<br />
L2912 Lantinga, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2913 Cioca, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2914 Merrylees, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2915 Li1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2916 Chism, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2917 Wiegers, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2918 Basson, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2919 Marsh1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2920 Husu, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2921 Takeda, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2922 Pepper, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2923 Lannigan, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2924 Derkach, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2925 Szumlakowski, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2926 Oelrich, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2927 Harris, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2928 Kozlowski, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2929 Utiuzh, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2930 Ruber, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2931 Lewis1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2932 Savchenko, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2933 Winkler1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2934 VanWeers, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2935 Bamber, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
141
code description<br />
L2936 Preusch, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2937 Chi, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2938 VanLeeuwen, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2939 Brouwer, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2940 Revol, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2941 Thompson4, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2942 Grant1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2943 Ying, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2944 Stahl, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2945 Schaefer1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2946 Sanny, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2947 Si, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2948 Plentner, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2949 Kostal, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2950 Harlass, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2951 Fiedler, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2952 Dovgiy, PSieve, Srsieve, <strong>Prime</strong>Grid, Ukraine, LLR<br />
L2953 Klein, PSieve, Srsieve, LLR<br />
L2954 Lee4, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2955 Hollings, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2956 Ensink, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2957 Fitch, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2958 Hsu1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2959 Derrera, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2960 Huenicke, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2962 Nagasawa, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2963 Newberry, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2964 Darimont, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2966 Lawson1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2967 Ryjkov, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2968 Matsuo, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2973 Kurtovic, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2974 Marini, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2975 Loureiro, GeneferCUDA, AthGFNSieve, <strong>Prime</strong>Grid, LLR<br />
L2976 Lavrinenko, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2981 Yoshigoe, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2984 Sey, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2987 Isetti, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2989 Jurka, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2995 Snow, PSieve, Srsieve, NPLB, LLR<br />
L2997 Williams2, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L2998 Ekstrom, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3004 Baumgaertner, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3011 Kravtsov, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3012 May, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3014 Janda, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3019 Pozharski, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3022 Kim2, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3023 Winslow, PSieve, Srsieve, <strong>Prime</strong>Grid, 12121search, LLR<br />
L3030 Harder, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
142
code description<br />
L3033 Snow, PSieve, Srsieve, <strong>Prime</strong>Grid, 12121search, LLR<br />
L3034 Wakolbinger, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3035 Scalise, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3047 PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3049 Tardy, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3051 Bower, NPLB, LLR<br />
L3054 Winslow, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3055 Heino, PSieve, Srsieve, NPLB, LLR<br />
L3067 Widman, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3080 Deutschmann, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3085 Sainson, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3093 Almond, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3097 Schoneweis, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3101 Reichard, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3105 Eldredge, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3108 Horotan, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3110 Ruge, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3113 Utendorf, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3118 Yama, GeneferCUDA, AthGFNSieve, <strong>Prime</strong>Grid, LLR<br />
L3121 Kwok, NewPGen, TPS, LLR<br />
L3127 Gilles, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3131 Kopp, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3139 Berker, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3141 Kus, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3144 Miskovetz, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3149 Gordiani, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3152 Kelava, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3154 Hentrich, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3157 Becker2, Srsieve, <strong>Prime</strong>Grid, SierpinskiRiesel, LLR<br />
L3159 Meredith, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3166 Jackson1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3167 Delisle, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3169 Siemelink, Srsieve, CRUS, LLR<br />
L3171 Bergelt, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3172 Ikegami, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3173 Zhou2, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3174 Boniecki, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3175 Watanabe1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3179 Hamada, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3180 Poon, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3183 Haller, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3184 Hayslette, GeneferCUDA, AthGFNSieve, <strong>Prime</strong>Grid, LLR<br />
L3185 Sanchez1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3186 Dike, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3187 Bergman1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3188 Oenen, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3190 Vogel, Srsieve, <strong>Prime</strong>Grid, SierpinskiRiesel, LLR<br />
L3192 Gundermann, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3196 Metcalfe, NewPGen, TPS, LLR<br />
L3198 Braaten, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
143
code description<br />
L3199 Henderson2, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3202 Sharma, PSieve, Rieselprime, LLR<br />
L3203 Scalise, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3204 Ryjkov, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3205 Yoshida1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3206 Chang2, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3207 Elliott2, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3208 Lewis1, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3209 McArdle, GenefX64, AthGFNSieve, <strong>Prime</strong>Grid, LLR<br />
L3210 DeVries, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3211 Shyjak, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3213 OBrien1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3214 Deutschmann, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3216 Lind, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3218 Kim3, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3219 Szajerski, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3221 Vicena, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3222 Yamamoto, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3223 Yurgandzhiev, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3224 Criado, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3226 Pepper, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3227 Hoorn, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3228 Meditz, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3230 Kumagai, GeneferCUDA, AthGFNSieve, <strong>Prime</strong>Grid, LLR<br />
L3231 RubelGratza, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3232 Yoshihito, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3233 Nadeau, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3234 Parangalan, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3235 Ruge, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3236 Larsson1, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3237 Reifschneider, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3238 Rolland, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3239 Markovi, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3240 Vogt, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3241 Wilke, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3242 Jevtic, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3243 Dyer1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3244 Sliwicki, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3245 Sderholm, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3246 Beard, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3247 Elliott2, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3248 Kumagai, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3249 Lind, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3250 Deller, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3251 Delisle, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3252 Bergman1, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3253 Perretta, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3254 Parviainen, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3255 Eldredge, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3256 Harris1, TwinGen, <strong>Prime</strong>Grid, LLR<br />
144
code description<br />
L3257 Ksiazek1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3258 Molder, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3259 Bosch, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3260 Stanko, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3261 Batalov, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3262 Molder, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3263 Gaillard1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3264 Washio, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3265 Kozinski, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3266 Chan, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3267 Cain, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3268 Dorovskikh, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3269 Ritschel, Gcwsieve, GenWoodall, LLR<br />
L3270 Heidotting, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3271 Hedlund, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3272 Vassalli, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3273 Embrey, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3274 Schouten, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3275 Delis, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3276 Jeka, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3277 Wijnen, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3278 Fischer1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3279 Hollander, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3280 Lord, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3281 Orler, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3282 Belansky, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3283 Anwander, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3284 Bosma, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3285 Bird1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3286 Vasku, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3287 Jarlsson, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3288 Barker1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3289 Evans1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3290 Bednar1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3291 Laqua, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3292 Saharov, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3293 Wong4, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3294 Bartlett, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3295 Bassen, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3296 Obermeier, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3297 DroppaSR, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3298 Grajeda, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3299 Haller, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3300 Errington, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3301 Hoopoe, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3302 Randal, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3303 Kirkhan, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3304 Stern, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3305 Kampik, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3306 Gubaev, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
145
code description<br />
L3307 Nabok, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3308 Rodriguez1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3309 Everett1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3310 Cisler, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3311 Noon, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3312 Perchenko, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3313 Yost, Srsieve, <strong>Prime</strong>Grid, SierpinskiRiesel, LLR<br />
L3314 Siemieczuk, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3315 Rachow, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3316 Shay, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3317 Ryabchikov, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3318 Wyn, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3319 Kusig, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3320 Matsumura, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3321 Stanko, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3322 Kelava, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3323 Ritschel, NewPGen, TOPS, LLR<br />
L3324 , PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3325 Elvy, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3326 Ritschel, Srsieve, TOPS, LLR<br />
L3327 Mierzejowski, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3328 Ferrell, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3329 Tatearka, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3330 Wilson3, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3331 Farrow, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3332 Bergelt, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3333 Romer, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3334 Michelot, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3335 Kramer2, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3336 Dongen, Siemelink, Srsieve, LLR<br />
L3337 Ryabchikov, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3338 DeJesus, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3339 Jurach, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3340 Baltat, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3341 Botting, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3342 Boulay, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3343 Woerner, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3344 Fausten, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3345 Domanov1, PSieve, Rieselprime, LLR<br />
L3346 Rassokhin, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3347 Bryniarski, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3348 Francke, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3349 Belogourov, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3350 Prange, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3351 Szajerski, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3352 Guder1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3353 Holmes2, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3354 Willig, Srsieve, <strong>Prime</strong>Grid, SierpinskiRiesel, LLR<br />
L3355 Liskay, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3356 Samidoost, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
146
code description<br />
L3357 Yoshida1, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3358 Grabowski, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3359 Brittain, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3360 Kaczala, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3361 Pennington, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3362 Elmir, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3363 Oshima, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3364 Combe, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3365 Hamada, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3366 Muzia, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3367 Irran, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3368 Karpin, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3369 Kim2, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3370 Utendorf, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3371 Glasgow, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3372 Ryan, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3373 Simpson1, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3374 Burningham, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3375 Maj, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3376 Messinger, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3377 Ollivier, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3378 Glasgow, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3379 Almond, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3380 Yoshigoe, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3381 Andersen3, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3382 Reifschneider, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3383 Everett1, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3384 Makowski, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3385 Rassokhin, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3386 Proulx, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3387 Vicena, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3388 Tardy, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3389 Beauchamp, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3390 Nadeau, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3391 Bangma, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3392 Notte, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3393 Tanaka1, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3394 Paloheimo, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3395 Marini, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3396 Marques, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3397 Volf, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3398 Sylvain, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3399 Senftleben, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3400 Wyn, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3401 Bartlett, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3402 Echtelt, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3403 Hedlund, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3404 Francony, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3405 Odom, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3406 Vanco, TwinGen, <strong>Prime</strong>Grid, LLR<br />
147
code description<br />
L3407 Zhuang, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3408 Guman, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3409 Rehnberg, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3410 Kurtovic, Srsieve, <strong>Prime</strong>Grid, SierpinskiRiesel, LLR<br />
L3411 Lechoczak, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3412 Niermann, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3413 Rajh, PSieve, Srsieve, Rieselprime, LLR<br />
L3414 Elmir, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3415 Johnston1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3416 Giebel, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3417 Laan, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3418 Stein, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3419 WongC, T winGen, P rimeGrid, LLR<br />
L3420 Landwehr, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3421 Handa, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3422 Micom, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3423 Collins, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3424 Petrov, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3425 Fluttert, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3426 Fick, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3427 Pasanen, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3428 Cristian, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3429 Redding, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3430 Durstewitz, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3431 Gahan, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3432 Batalov, Srsieve, LLR<br />
L3433 Ferrandis, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3434 H<strong>of</strong>f, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3435 Walling, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3436 Linder, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3437 Salte, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3438 Guman, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3439 Huang, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3440 Pelikan, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3441 Ilves, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3442 Fenchenko, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3443 Trzcionka, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3444 Crane, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3445 Bishopp, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3446 Marshall3, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3447 Wilson3, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3448 Urbaniak, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3449 Shcherbina, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3450 Trautner, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3451 Vanco, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3452 Resto, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3453 Benes, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3454 Korczyk, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3455 Pilet, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3456 Murai, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
148
code description<br />
L3457 Sveen1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3458 Jia, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3459 Boruvka, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3460 Ottusch, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3461 Staszek, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3462 Maj, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3463 Redus, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3464 Ferrell, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3465 Sekanina, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3466 Paloheimo, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3467 Dodson2, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3468 Francony, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3469 Putz, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3470 Fisan, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3471 Gieorgijewski, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3472 Hernas, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3473 Mizelle, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3474 Perretta, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3475 Fernandez, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3476 Gasuen, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3477 Chang3, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3478 Stirling1, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3479 Lee5, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3480 Anwander, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3481 Mugford, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3482 Eckford, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3483 Farrow, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3484 Horta, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3485 Annaert, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3486 Maurice, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3487 Ziemann, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3488 Skinner, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3489 Key1, PSieve, Srsieve, Rieselprime, LLR<br />
L3490 McAdams, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3491 Lanting, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3492 Mazzucato, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3493 Patrick, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3494 Batalov, NewPGen, LLR<br />
L3495 Oliveira1, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3496 Benes, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3497 Cook1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3498 Keenan, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3499 Matsumoto1, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3500 Stirling1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3501 Schiavo, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3502 Ristic, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3503 Durstewitz, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3504 Kr<strong>of</strong>chik, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3505 Guenther, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3506 Wang1, TwinGen, <strong>Prime</strong>Grid, LLR<br />
149
code description<br />
L3507 Badis, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3508 Poon, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3509 McLean1, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3510 TomasiIII, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3511 Hayslette, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3512 Tsuji, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3513 Palmer, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3514 Bishop1, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3515 Liu3, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3516 Hipp, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3517 Leamon, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3518 Papendick, PSieve, Srsieve, <strong>Prime</strong>Grid, LLR<br />
L3519 Kurtovic, PSieve, Srsieve, Rieselprime, LLR<br />
L3520 Lester, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3521 Cervelle, TwinGen, <strong>Prime</strong>Grid, LLR<br />
L3522 Jhkel, TwinGen, <strong>Prime</strong>Grid, LLR<br />
M Morain<br />
MM Morii<br />
O Oakes<br />
p3 Dohmen, OpenPFGW<br />
p5 Jobling, OpenPFGW<br />
p8 Caldwell, OpenPFGW<br />
p12 Water, OpenPFGW<br />
p16 Heuer, OpenPFGW<br />
p21 Anderson, Robinson, OpenPFGW<br />
p35 Augustin, NewPGen, OpenPFGW<br />
p41 Luhn, OpenPFGW<br />
p44 Broadhurst, OpenPFGW<br />
p49 Berg, OpenPFGW<br />
p54 Water, Broadhurst, OpenPFGW<br />
p58 Glover, Oakes, OpenPFGW<br />
p65 DavisK, Kuosa, OpenPFGW<br />
p72 Caldwell, ForEis, PhiSieve, PIES, OpenPFGW<br />
p76 Samidoost, PRP, NewPGen, OpenPFGW<br />
p77 Harvey, MultiSieve, GenWoodall, OpenPFGW<br />
p80 Chaffey, OpenPFGW<br />
p85 Marchal, Carmody, Kuosa, OpenPFGW<br />
p86 Cousins, TwinGen, PRP, PSearch, OpenPFGW<br />
p94 Angel, Jobling, Augustin, NewPGen, OpenPFGW<br />
p100 Underbakke, Carmody, PRP, NewPGen, OpenPFGW<br />
p102 Underwood, Frind, OpenPFGW<br />
p114 Samidoost, FermFact, PRP, OpenPFGW<br />
p116 Eaton, NewPGen, OpenPFGW<br />
p133 Sun, NewPGen, OpenPFGW<br />
p140 Ulyanov, OpenPFGW<br />
p148 Yama, Noda, Nohara, PRP, NewPGen, MatGFN, OpenPFGW<br />
p155 DavisK, NewPGen, OpenPFGW<br />
p156 Murata, Noda, Nohara, PRP, NewPGen, MatGFN, OpenPFGW<br />
p158 Paridon, NewPGen, OpenPFGW<br />
p160 Ayuchan, AthGFNSieve, OpenPFGW<br />
150
code description<br />
p164 Morain, Broadhurst, OpenPFGW<br />
p166 Yamada, Noda, Nohara, PRP, NewPGen, MatGFN, OpenPFGW<br />
p169 Eaton, PRP, NewPGen, OpenPFGW<br />
p170 WuT , P rimo, OpenP F GW<br />
p179 DavisK, APTreeSieve, OpenPFGW<br />
p189 Bohanon, LLR, OpenPFGW<br />
p190 DiMaria, NewPGen, OpenPFGW<br />
p193 Irvine, Broadhurst, Primo, OpenPFGW<br />
p196 Masser, Srsieve, PRP, SierpinskiRiesel, OpenPFGW<br />
p197 Sakai, PRP, NewPGen, OpenPFGW<br />
p199 Broadhurst, NewPGen, OpenPFGW<br />
p217 Rodenkirch, 3Ps, Srsieve, CRUS, OpenPFGW<br />
p219 Samidoost, FermFact, LLR, OpenPFGW<br />
p221 AndersonLee, NewPGen, OpenPFGW<br />
p227 Harvey, Srsieve, PRP, OpenPFGW<br />
p231 Petat, Srsieve, PRP, CRUS, OpenPFGW<br />
p235 Bedwell, OpenPFGW<br />
p236 Cooper, PRP, NewPGen, OpenPFGW<br />
p241 Harvey, Srsieve, LLR, <strong>Prime</strong>Grid, OpenPFGW<br />
p252 Oakes, NewPGen, OpenPFGW<br />
p254 Vogel, Srsieve, CRUS, OpenPFGW<br />
p255 Siemelink, Srsieve, CRUS, OpenPFGW<br />
p256 Chatfield, Srsieve, CRUS, OpenPFGW<br />
p258 Batalov, Srsieve, CRUS, OpenPFGW<br />
p259 Underbakke, GenefX64, AthGFNSieve, OpenPFGW<br />
p260 Harvey, Gcwsieve, MultiSieve, GenWoodall, OpenPFGW<br />
p261 Gunn, Srsieve, CRUS, OpenPFGW<br />
p262 Vogel, Gcwsieve, MultiSieve, <strong>Prime</strong>Grid, OpenPFGW<br />
p265 Jaworski, Srsieve, <strong>Prime</strong>95, CRUS, OpenPFGW<br />
p267 Domanov1, Srsieve, <strong>Prime</strong>95, CRUS, OpenPFGW<br />
p268 Rodenkirch, Srsieve, CRUS, OpenPFGW<br />
p269 Zhou, OpenPFGW<br />
p271 Dettweiler, Srsieve, CRUS, OpenPFGW<br />
p277 Kaiser1, Gcwsieve, MultiSieve, <strong>Prime</strong>Grid, OpenPFGW<br />
p279 Domanov1, Srsieve, <strong>Prime</strong>95, Rieselprime, OpenPFGW<br />
p280 Vogel, Srsieve, SierpinskiRiesel, OpenPFGW<br />
p281 Domanov1, Srsieve, <strong>Prime</strong>95, NPLB, OpenPFGW<br />
p284 Fredriksen, Srsieve, SierpinskiRiesel, OpenPFGW<br />
p285 DUrso, Srsieve, SierpinskiRiesel, OpenPFGW<br />
p286 Batalov, Srsieve, OpenPFGW<br />
p288 Boncompagni, OpenPFGW<br />
p289 Steine, Srsieve, CRUS, OpenPFGW<br />
p290 Domanov1, Fpsieve, <strong>Prime</strong>Grid, OpenPFGW<br />
p291 Batalov, Srsieve, <strong>Prime</strong>95, NPLB, OpenPFGW<br />
p292 Dausch, Srsieve, SierpinskiRiesel, OpenPFGW<br />
p293 Barnes, Srsieve, CRUS, OpenPFGW<br />
p294 Domanov1, Srsieve, <strong>Prime</strong>95, Rieselprime, OpenPFGW<br />
p295 Angel, NewPGen, OpenPFGW<br />
p296 Kaiser1, Srsieve, LLR, OpenPFGW<br />
p297 Broadhurst, Srsieve, LLR, NewPGen, OpenPFGW<br />
151
code description<br />
p300 Gramolin, NewPGen, OpenPFGW<br />
p301 Winskill1, Fpsieve, <strong>Prime</strong>Grid, OpenPFGW<br />
p302 Gasewicz, Fpsieve, <strong>Prime</strong>Grid, OpenPFGW<br />
p304 Babb, Srsieve, SierpinskiRiesel, OpenPFGW<br />
p305 Gasewicz, Srsieve, SierpinskiRiesel, OpenPFGW<br />
p306 Poulter, Srsieve, SierpinskiRiesel, OpenPFGW<br />
p307 Dinkel, Srsieve, SierpinskiRiesel, OpenPFGW<br />
p308 DavisK, Underwood, NewPGen, <strong>Prime</strong>Formegroup, OpenP F GW<br />
p309 Yama, GenefX64, AthGFNSieve, <strong>Prime</strong>Grid, OpenPFGW<br />
p310 Hubbard, Gcwsieve, MultiSieve, <strong>Prime</strong>Grid, OpenPFGW<br />
p311 DUrso, NewPGen, OpenPFGW<br />
p312 Doggart, Fpsieve, <strong>Prime</strong>Grid, OpenPFGW<br />
p314 Hubbard, GenefX64, AthGFNSieve, <strong>Prime</strong>Grid, OpenPFGW<br />
p315 Poulter, Srsieve, CRUS, OpenPFGW<br />
p316 Yama, GeneFer, AthGFNSieve, <strong>Prime</strong>Grid, OpenPFGW<br />
p320 Hron, GenefX64, AthGFNSieve, <strong>Prime</strong>Grid, OpenPFGW<br />
p321 Dinkel, Srsieve, <strong>Prime</strong>Grid, SierpinskiRiesel, OpenPFGW<br />
p323 Myllyvirta, Srsieve, <strong>Prime</strong>Grid, SierpinskiRiesel, OpenPFGW<br />
p324 Bliedung, Srsieve, <strong>Prime</strong>Grid, SierpinskiRiesel, OpenPFGW<br />
p325 Broadhurst, Gcwsieve, MultiSieve, OpenPFGW<br />
p332 Johnson6, GeneferCUDA, AthGFNSieve, <strong>Prime</strong>Grid, OpenPFGW<br />
p333 Willig, Srsieve, <strong>Prime</strong>Grid, SierpinskiRiesel, OpenPFGW<br />
p334 Goetz, GeneferCUDA, AthGFNSieve, <strong>Prime</strong>Grid, OpenPFGW<br />
p335 Tervooren, OpenPFGW<br />
p338 Tomecko, GeneferCUDA, AthGFNSieve, <strong>Prime</strong>Grid, OpenPFGW<br />
p339 Zhou, LLR, OpenPFGW<br />
p341 Schmidt2, Srsieve, <strong>Prime</strong>Grid, SierpinskiRiesel, OpenPFGW<br />
p342 Trice, OpenPFGW<br />
p343 Brown1, GeneFer, AthGFNSieve, <strong>Prime</strong>Grid, OpenPFGW<br />
p344 Tajima, Srsieve, OpenPFGW<br />
p346 Burt, Fpsieve, <strong>Prime</strong>Grid, OpenPFGW<br />
p349 Kaiser1, NewPGen, OpenPFGW<br />
p350 Koen, Gcwsieve, GenWoodall, OpenPFGW<br />
p351 Lewis1, Srsieve, <strong>Prime</strong>Grid, SierpinskiRiesel, OpenPFGW<br />
p352 Hubbard, Srsieve, <strong>Prime</strong>Grid, SierpinskiRiesel, OpenPFGW<br />
p353 Yost, Srsieve, <strong>Prime</strong>Grid, SierpinskiRiesel, OpenPFGW<br />
p354 Koen, Gcwsieve, OpenPFGW<br />
p355 Domanov1, Srsieve, CRUS, OpenPFGW<br />
p356 Rajala, Srsieve, NewPGen, OpenPFGW<br />
p357 Gruenewald, Gcwsieve, GenWoodall, OpenPFGW<br />
PM Mihailescu<br />
S Slowinski<br />
SB10 Agafonov, SoBSieve, ProthSieve, Ksieve, Proth.exe, SB, PRP<br />
SB11 Sunde, SoBSieve, ProthSieve, Ksieve, Proth.exe, SB, PRP<br />
SB2 Burt, Proth.exe, SB, PRP<br />
SB3 Anonymous, Proth.exe, SB, PRP<br />
SB4 DiMichele, Proth.exe, SB, PRP<br />
SB5 Coels, Proth.exe, SB, PRP<br />
SB6 Sundquist, SoBSieve, ProthSieve, Ksieve, Proth.exe, SB, PRP<br />
SB7 TeamP rimeRib, SoBSieve, P rothSieve, Ksieve, SB, P RP<br />
152
code description<br />
SB8 Gordon, SoBSieve, ProthSieve, Ksieve, Proth.exe, SB, PRP<br />
SB9 Hassler, SoBSieve, ProthSieve, Ksieve, Proth.exe, SB, PRP<br />
SG Slowinski, Gage<br />
WC Colquitt, Welsh<br />
WD Dubner, Williams, Cruncher<br />
WM Morain, Williams<br />
x13 Renze<br />
x14 Steward, Primo, OpenPFGW<br />
x16 Doumen, Beelen<br />
x23 Water, Renze, Broadhurst, Primo, OpenPFGW<br />
x24 JaraiZ, F arkas, Csajbok, Kasza, Jarai<br />
x25 Water, Broadhurst, Primo, OpenPFGW<br />
x28 Iskra<br />
x29 Broadhurst, OpenPFGW<br />
x33 Carmody, Water, Renze, Broadhurst, Primo, OpenPFGW<br />
x34 Caldwell, Broadhurst, OpenPFGW<br />
x36 Irvine, Carmody, Water, Renze, Broadhurst, Primo, OpenPFGW<br />
x38 Broadhurst, Primo, OpenPFGW<br />
x39 Dubner, Keller, Broadhurst, Primo, OpenPFGW<br />
x41 Abatzoglou, Wong3, Silverberg, Sutherland<br />
Y Young<br />
153