Factorization of 277...771

Table of contents 目次

About 277...771 277...771 について
Prime numbers of the form 277...771 277...771 の形の素数
Factor table of 277...771 277...771 の素因数分解表
Related links 関連リンク

1. About 277...771 277...771 について

1.1. Classification 分類

Quasi-repdigit of the form ABB...BBC ABB...BBC の形のクワージレプディジット (Quasi-repdigit)

1.2. Sequence 数列

27w1 = { 21, 271, 2771, 27771, 277771, 2777771, 27777771, 277777771, 2777777771, 27777777771, … }

2. Prime numbers of the form 277...771 277...771 の形の素数

2.2. Known (probable) prime numbers 既知の (おそらく) 素数

25×10²-619 = 271 is prime. は素数です。 (Julien Peter Benney / October 22, 2004 2004 年 10 月 22 日)
25×10⁶-619 = 2777771 is prime. は素数です。 (Julien Peter Benney / October 22, 2004 2004 年 10 月 22 日)
25×10³³-619 = 2(7)₃₂1_<34> is prime. は素数です。 (Julien Peter Benney / October 22, 2004 2004 年 10 月 22 日)
25×10⁶⁹-619 = 2(7)₆₈1_<70> is prime. は素数です。 (Julien Peter Benney / October 22, 2004 2004 年 10 月 22 日)
25×10¹⁵⁰-619 = 2(7)₁₄₉1_<151> is prime. は素数です。 (discovered by:発見: Ray Chandler / November 4, 2004 2004 年 11 月 4 日) (certified by:証明: Ray Chandler / Primo 3.0.9 / February 22, 2011 2011 年 2 月 22 日)
25×10⁹³⁶-619 = 2(7)₉₃₅1_<937> is prime. は素数です。 (discovered by:発見: Sam Handler / November 3, 2004 2004 年 11 月 3 日) (certified by:証明: Tyler Cadigan / PRIMO 2.2.0 beta 6 / May 29, 2006 2006 年 5 月 29 日)
25×10³¹³⁵-619 = 2(7)₃₁₃₄1_<3136> is prime. は素数です。 (discovered by:発見: Sam Handler / November 3, 2004 2004 年 11 月 3 日) (certified by:証明: Ray Chandler / Primo 4.0.1 - LX64 / February 7, 2013 2013 年 2 月 7 日) [certificate証明]
25×10⁵⁸³⁸-619 = 2(7)₅₈₃₇1_<5839> is PRP. はおそらく素数です。 (Sam Handler / November 3, 2004 2004 年 11 月 3 日)
25×10⁶⁹⁹⁰-619 = 2(7)₆₉₈₉1_<6991> is PRP. はおそらく素数です。 (Makoto Kamada / PFGW / December 24, 2004 2004 年 12 月 24 日)
25×10²⁰⁷⁸⁶-619 = 2(7)₂₀₇₈₅1_<20787> is PRP. はおそらく素数です。 (Erik Branger / PFGW / April 29, 2010 2010 年 4 月 29 日)
25×10⁵⁷¹³⁸-619 = 2(7)₅₇₁₃₇1_<57139> is PRP. はおそらく素数です。 (Bob Price / PFGW / February 27, 2015 2015 年 2 月 27 日)

2.3. Range of search 捜索範囲

n≤30000 / Completed 終了
n≤50000 / Completed 終了 / Erik Branger / May 1, 2013 2013 年 5 月 1 日
n≤100000 / Completed 終了 / Bob Price / February 27, 2015 2015 年 2 月 27 日

2.4. Prime factors that appear periodically 周期的に現れる素因数

Cofactors are written verbosely to clarify that they are integers. 補因子はそれらが整数であることを明確にするために冗長に書かれています。

25×10^3k+1-619 = 3×(25×10¹-619×3+25×10×10³-19×3×k-1Σm=010^3m)
25×10^5k+2-619 = 271×(25×10²-619×271+25×10²×10⁵-19×271×k-1Σm=010^5m)
25×10^6k+1-619 = 7×(25×10¹-619×7+25×10×10⁶-19×7×k-1Σm=010^6m)
25×10^6k+5-619 = 13×(25×10⁵-619×13+25×10⁵×10⁶-19×13×k-1Σm=010^6m)
25×10^16k+3-619 = 17×(25×10³-619×17+25×10³×10¹⁶-19×17×k-1Σm=010^16m)
25×10^18k+12-619 = 19×(25×10¹²-619×19+25×10¹²×10¹⁸-19×19×k-1Σm=010^18m)
25×10^22k+5-619 = 23×(25×10⁵-619×23+25×10⁵×10²²-19×23×k-1Σm=010^22m)
25×10^28k+19-619 = 29×(25×10¹⁹-619×29+25×10¹⁹×10²⁸-19×29×k-1Σm=010^28m)
25×10^41k+18-619 = 83×(25×10¹⁸-619×83+25×10¹⁸×10⁴¹-19×83×k-1Σm=010^41m)
25×10^42k+20-619 = 127×(25×10²⁰-619×127+25×10²⁰×10⁴²-19×127×k-1Σm=010^42m)

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2.5. Difficulty of search 捜索難易度

The difficulty of search, percentage of terms that are not divisible by prime factors that appear periodically, is 13.86%. 捜索難易度 (周期的に現れる素因数で割り切れない項の割合) は 13.86% です。

3. Factor table of 277...771 277...771 の素因数分解表

3.2. Range of factorization 分解範囲

n≤100 / Completed 終了 / November 24, 2004 2004 年 11 月 24 日
n≤150 / Completed 終了 / September 3, 2008 2008 年 9 月 3 日
n≤200 / Completed 終了 / July 10, 2021 2021 年 7 月 10 日
n≤300 / Remaining 55 残り 55

3.3. Terms that have not been factored yet まだ分解されていない項

n=212, 213, 215, 217, 226, 229, 231, 232, 233, 234, 236, 239, 240, 245, 246, 248, 249, 250, 251, 254, 256, 257, 258, 259, 261, 262, 265, 266, 267, 268, 269, 270, 271, 272, 275, 279, 280, 282, 283, 284, 285, 286, 287, 288, 289, 290, 292, 293, 294, 295, 296, 297, 298, 299, 300 (55/300)

3.4. Factor table 素因数分解表

25×10¹-619 = 21 = 3 × 7

25×10²-619 = 271 = definitely prime number 素数

25×10³-619 = 2771 = 17 × 163

25×10⁴-619 = 27771 = 3 × 9257

25×10⁵-619 = 277771 = 13 × 23 × 929

25×10⁶-619 = 2777771 = definitely prime number 素数

25×10⁷-619 = 27777771 = 3² × 7 × 271 × 1627

25×10⁸-619 = 277777771 = 131 × 293 × 7237

25×10⁹-619 = 2777777771_<10> = 569 × 4881859

25×10¹⁰-619 = 27777777771_<11> = 3 × 97 × 95456281

25×10¹¹-619 = 277777777771_<12> = 13 × 104381 × 204707

25×10¹²-619 = 2777777777771_<13> = 19 × 271 × 539479079

25×10¹³-619 = 27777777777771_<14> = 3 × 7 × 1322751322751_<13>

25×10¹⁴-619 = 277777777777771_<15> = 263 × 3821 × 276416977

25×10¹⁵-619 = 2777777777777771_<16> = 59 × 47080979284369_<14>

25×10¹⁶-619 = 27777777777777771_<17> = 3² × 536059 × 5757612041_<10>

25×10¹⁷-619 = 277777777777777771_<18> = 13 × 271 × 383 × 4877 × 42211747

25×10¹⁸-619 = 2777777777777777771_<19> = 83 × 1709 × 19582915238093_<14>

25×10¹⁹-619 = 27777777777777777771_<20> = 3 × 7² × 17³ × 29 × 1326280555309_<13>

25×10²⁰-619 = 277777777777777777771_<21> = 127 × 349849 × 6251916102877_<13>

25×10²¹-619 = 2777777777777777777771_<22> = 213281 × 13024028290273291_<17>

25×10²²-619 = 27777777777777777777771_<23> = 3 × 271 × 317 × 1361 × 30259 × 2617188449_<10>

25×10²³-619 = 277777777777777777777771_<24> = 13 × 390984271 × 54650590707577_<14>

25×10²⁴-619 = 2777777777777777777777771_<25> = 113632309487_<12> × 24445316568133_<14>

25×10²⁵-619 = 27777777777777777777777771_<26> = 3⁵ × 7 × 16330263243843490757071_<23>

25×10²⁶-619 = 277777777777777777777777771_<27> = 132190319 × 2101347359467207109_<19>

25×10²⁷-619 = 2777777777777777777777777771_<28> = 23² × 139 × 271 × 46309 × 22778911 × 132147629

25×10²⁸-619 = 27777777777777777777777777771_<29> = 3 × 15031 × 616010861503510029888847_<24>

25×10²⁹-619 = 277777777777777777777777777771_<30> = 13 × 21367521367521367521367521367_<29>

25×10³⁰-619 = 2777777777777777777777777777771_<31> = 19 × 80758537 × 1810320442151604667457_<22>

25×10³¹-619 = 27777777777777777777777777777771_<32> = 3 × 7 × 773 × 2699456339_<10> × 633902410142969633_<18>

25×10³²-619 = 277777777777777777777777777777771_<33> = 271 × 8669048326877_<13> × 118237920871270313_<18>

25×10³³-619 = 2777777777777777777777777777777771_<34> = definitely prime number 素数

25×10³⁴-619 = 27777777777777777777777777777777771_<35> = 3² × 47 × 13591 × 7952412996623_<13> × 607584649513189_<15>

25×10³⁵-619 = 277777777777777777777777777777777771_<36> = 13 × 17 × 231860683 × 5420983865638418618154197_<25>

25×10³⁶-619 = 2777777777777777777777777777777777771_<37> = 227935271 × 12186695659654085645120617501_<29>

25×10³⁷-619 = 27777777777777777777777777777777777771_<38> = 3 × 7 × 271 × 12503 × 390386402540533519578253639127_<30>

25×10³⁸-619 = 277777777777777777777777777777777777771_<39> = 107 × 167 × 367 × 937 × 627859022873_<12> × 71999495848005977_<17>

25×10³⁹-619 = 2777777777777777777777777777777777777771_<40> = 19759 × 140582912990423491967092351727201669_<36>

25×10⁴⁰-619 = 27777777777777777777777777777777777777771_<41> = 3 × 6876887441_<10> × 1346431701652634226859851734377_<31>

25×10⁴¹-619 = 277777777777777777777777777777777777777771_<42> = 13 × 112762719256367_<15> × 189491008273240788060295001_<27>

25×10⁴²-619 = 2777777777777777777777777777777777777777771_<43> = 271 × 487 × 21047438400462033367766942556489219923_<38>

25×10⁴³-619 = 27777777777777777777777777777777777777777771_<44> = 3² × 7 × 3613 × 122036287734230348862695020089613686809_<39>

25×10⁴⁴-619 = 277777777777777777777777777777777777777777771_<45> = 12553 × 15937 × 1388492050918276190962130957050709011_<37>

25×10⁴⁵-619 = 2777777777777777777777777777777777777777777771_<46> = 223 × 1950491761_<10> × 6386288237662409133243036585557957_<34>

25×10⁴⁶-619 = 27777777777777777777777777777777777777777777771_<47> = 3 × 503 × 5417 × 50360256429553084697_<20> × 67477889547185993231_<20>

25×10⁴⁷-619 = 277777777777777777777777777777777777777777777771_<48> = 13 × 29 × 271 × 161159 × 6253693 × 313777661513_<12> × 8597530293621149423_<19>

25×10⁴⁸-619 = 2777777777777777777777777777777777777777777777771_<49> = 19 × 1299797166709_<13> × 112478188254189261460490554750039301_<36>

25×10⁴⁹-619 = 27777777777777777777777777777777777777777777777771_<50> = 3 × 7 × 23 × 14723 × 24558739 × 654093697671377_<15> × 243168898831008971473_<21>

25×10⁵⁰-619 = 277777777777777777777777777777777777777777777777771_<51> = 1021 × 16063 × 145103780867_<12> × 13192839434297_<14> × 8847653219467774123_<19>

25×10⁵¹-619 = 2(7)₅₀1_<52> = 17 × 197 × 15359 × 9109859399_<10> × 1424140836447037_<16> × 4162505279759288387_<19>

25×10⁵²-619 = 2(7)₅₁1_<53> = 3³ × 271 × 3583 × 1188601 × 13170182000888377_<17> × 67684584642545036994193_<23>

25×10⁵³-619 = 2(7)₅₂1_<54> = 13 × 1823 × 11721075900999104509801163668415451191095733059529_<50>

25×10⁵⁴-619 = 2(7)₅₃1_<55> = 479 × 34256711162533_<14> × 169284158846089235461279079078224257553_<39>

25×10⁵⁵-619 = 2(7)₅₄1_<56> = 3 × 7 × 1601 × 885635977 × 135873980873_<12> × 37426966374493_<14> × 183447034431418267_<18>

25×10⁵⁶-619 = 2(7)₅₅1_<57> = 59490513689721113_<17> × 252173621739231791_<18> × 18516125869345033372237_<23>

25×10⁵⁷-619 = 2(7)₅₆1_<58> = 199 × 271 × 661 × 77924436866822845316617132751581280855875633920359_<50>

25×10⁵⁸-619 = 2(7)₅₇1_<59> = 3 × 283 × 4919 × 6217 × 36017 × 694304659 × 17498226727_<11> × 2445009012079623671974433_<25>

25×10⁵⁹-619 = 2(7)₅₈1_<60> = 13² × 83 × 8279916709_<10> × 2391700168788971723369351833821681602613664397_<46>

25×10⁶⁰-619 = 2(7)₅₉1_<61> = 179 × 26459 × 586504085857253961125430021863230109318027359664880011_<54>

25×10⁶¹-619 = 2(7)₆₀1_<62> = 3² × 7² × 62988158226253464348702443940539178634416729654824892920131_<59>

25×10⁶²-619 = 2(7)₆₁1_<63> = 127 × 271 × 22573 × 5401824083633_<13> × 7678563298802196431_<19> × 8620149546931397232697_<22>

25×10⁶³-619 = 2(7)₆₂1_<64> = 49801 × 24226991 × 303037007577747860827_<21> × 7597387694915914216051584268903_<31>

25×10⁶⁴-619 = 2(7)₆₃1_<65> = 3 × 204144023 × 25237327261483790745631_<23> × 1797199197880046551966284367258289_<34>

25×10⁶⁵-619 = 2(7)₆₄1_<66> = 13 × 9679 × 9739 × 655901 × 4597391 × 5650639203908671109_<19> × 13303379451954328878763253_<26>

25×10⁶⁶-619 = 2(7)₆₅1_<67> = 19 × 48311 × 4694413 × 48522485071_<11> × 12181266451279_<14> × 1090639187669025448138292030107_<31>

25×10⁶⁷-619 = 2(7)₆₆1_<68> = 3 × 7 × 17 × 271 × 709 × 25793 × 167441 × 272723491230803878169_<21> × 343817154787789928355161847941_<30>

25×10⁶⁸-619 = 2(7)₆₇1_<69> = 41737 × 90619 × 1829131331317_<13> × 1502716002605071_<16> × 26719923130429841779616695103851_<32>

25×10⁶⁹-619 = 2(7)₆₈1_<70> = definitely prime number 素数

25×10⁷⁰-619 = 2(7)₆₉1_<71> = 3² × 20234390664041_<14> × 152533367786130922405679435253380106244697301092416388059_<57>

25×10⁷¹-619 = 2(7)₇₀1_<72> = 13 × 23 × 719 × 887 × 31973 × 99378693089991038111_<20> × 458455441574940553673621353577732925131_<39>

25×10⁷²-619 = 2(7)₇₁1_<73> = 271 × 463 × 22138450326187927106052917980583693525920140410907348814308877430027_<68>

25×10⁷³-619 = 2(7)₇₂1_<74> = 3 × 7 × 59 × 139 × 108692699 × 1844232039083590759232831_<25> × 804628584708797650607931077829621179_<36>

25×10⁷⁴-619 = 2(7)₇₃1_<75> = 683 × 50033 × 25320392531906574130989133_<26> × 321033103568317112186361023480765044765333_<42>

25×10⁷⁵-619 = 2(7)₇₄1_<76> = 29 × 21221 × 24107 × 510829265443943_<15> × 3461204052787421_<16> × 20594487958531337_<17> × 5142052612004045147_<19>

25×10⁷⁶-619 = 2(7)₇₅1_<77> = 3 × 21214327 × 1304471477_<10> × 3060382874281_<13> × 5078542386099714295801_<22> × 21527696087712307352298643_<26>

25×10⁷⁷-619 = 2(7)₇₆1_<78> = 13 × 271 × 509 × 1092848636420730430513_<22> × 5428390006122467737702673_<25> × 26111752264555734757850797_<26>

25×10⁷⁸-619 = 2(7)₇₇1_<79> = 442367 × 6279351257615911172799457865929822472692985186005687082846997578430981013_<73>

25×10⁷⁹-619 = 2(7)₇₈1_<80> = 3³ × 7 × 3929 × 788189 × 105728303 × 448881839190914658327541223607003232619088195631942772437573_<60>

25×10⁸⁰-619 = 2(7)₇₉1_<81> = 47 × 2549 × 17839 × 27498098275745563_<17> × 103200880379831342985086107_<27> × 45800818407310213986367243543_<29>

25×10⁸¹-619 = 2(7)₈₀1_<82> = 21722381 × 127876303144566784726673276643926730581595902299005701896941121591494863191_<75>

25×10⁸²-619 = 2(7)₈₁1_<83> = 3 × 271 × 16091 × 2043360413_<10> × 620977208843_<12> × 3109797884443_<13> × 130997146295449853239_<21> × 4107799936478544255959_<22>

25×10⁸³-619 = 2(7)₈₂1_<84> = 13 × 17 × 16903 × 2950147 × 41206797476707727560057_<23> × 611686526285114360628602620916302654010857020323_<48>

25×10⁸⁴-619 = 2(7)₈₃1_<85> = 19 × 163 × 2122509563_<10> × 22145100256547_<14> × 24592891956134149_<17> × 775924358149910560727545026445795860041687_<42>

25×10⁸⁵-619 = 2(7)₈₄1_<86> = 3 × 7 × 31944984131848205528623_<23> × 41407167938849553424822707730840585604354747551858727475061937_<62>

25×10⁸⁶-619 = 2(7)₈₅1_<87> = 2851 × 10979 × 1553510082889863893210873_<25> × 5712463267899371555039474209357639546017280456214046763_<55>

25×10⁸⁷-619 = 2(7)₈₆1_<88> = 271 × 1867951 × 1719611336024972249_<19> × 241357379483769953798993_<24> × 13221229604846374932526797609013813043_<38>

25×10⁸⁸-619 = 2(7)₈₇1_<89> = 3² × 174937659193019705935859574424648735149841_<42> × 17642969314462925356588840102748900186645853859_<47> (Makoto Kamada / GGNFS-0.54.5b for P42 x P47)

25×10⁸⁹-619 = 2(7)₈₈1_<90> = 13 × 68777 × 2241118117480351_<16> × 2902273667686201_<16> × 144735111391234579_<18> × 330015175403370101563115808000825299_<36>

25×10⁹⁰-619 = 2(7)₈₉1_<91> = 149 × 301227791489825149_<18> × 2653622907284848927151_<22> × 23322601165328058606800415356152446031181836996421_<50>

25×10⁹¹-619 = 2(7)₉₀1_<92> = 3 × 7 × 107 × 12362161894872175246007021707956287395539731988330119171240666567769371507689264698610493_<89>

25×10⁹²-619 = 2(7)₉₁1_<93> = 271 × 13098084288206201_<17> × 88151800055809579_<17> × 2306859156734747515733066329_<28> × 384829328227249053833012814911_<30>

25×10⁹³-619 = 2(7)₉₂1_<94> = 23 × 499 × 694136325436571436724524252892669533871_<39> × 348677838571318249503874150868299043424006696032113_<51> (Makoto Kamada / GGNFS-0.54.5b for P39 x P51)

25×10⁹⁴-619 = 2(7)₉₃1_<95> = 3 × 14543 × 467141 × 62309002886936227321302094439987_<32> × 21873760512707920483523525167455700444877676660364297_<53> (Makoto Kamada / GGNFS-0.54.5b for P32 x P53)

25×10⁹⁵-619 = 2(7)₉₄1_<96> = 13 × 2417 × 33677756933_<11> × 3476877626522917543396254973074571_<34> × 75499649077652033555837828746779575117741539057_<47> (Makoto Kamada / GGNFS-0.54.5b for P34 x P47)

25×10⁹⁶-619 = 2(7)₉₅1_<97> = 113 × 10151 × 23473 × 19251413 × 27994611558637_<14> × 34652005346029_<14> × 1305568815850268318789767_<25> × 4231325463115995081411203863_<28>

25×10⁹⁷-619 = 2(7)₉₆1_<98> = 3² × 7 × 271 × 51539 × 13623574982357919990311_<23> × 2317184339766234514125705238422540852745814667719870398771757192063_<67>

25×10⁹⁸-619 = 2(7)₉₇1_<99> = 109 × 22697 × 8002911201434173095658614099241570992419_<40> × 14029899031109428050156634825825139128140479032237333_<53> (Makoto Kamada / GGNFS-0.54.5b for P40 x P53)

25×10⁹⁹-619 = 2(7)₉₈1_<100> = 17 × 56131 × 1661327 × 783871427205620557_<18> × 4281198563627485271_<19> × 522132191174002768611147018392034099866597147317717_<51>

25×10¹⁰⁰-619 = 2(7)₉₉1_<101> = 3 × 83 × 421235634571_<12> × 71860332014459_<14> × 3685393192924882402689051623925025981354244999285273386925481523398956011_<73>

25×10¹⁰¹-619 = 2(7)₁₀₀1_<102> = 13 × 317 × 517601989 × 1220440232504536752439016607144455724019_<40> × 106704425575836651096236897680730256801192448458461_<51> (Serge Batalov / Msieve-1.37 snfs for P40 x P51 / 0.30 hours on Opteron-2.8GHz; Linux x86_64 / September 2, 2008 2008 年 9 月 2 日)

25×10¹⁰²-619 = 2(7)₁₀₁1_<103> = 19 × 271 × 78381731 × 244426253 × 302173446045952853_<18> × 93187059856143613056782801238603623529358261764023181767345094301_<65>

25×10¹⁰³-619 = 2(7)₁₀₂1_<104> = 3 × 7² × 29 × 60811 × 268170821 × 118257858949_<12> × 1509714487181123240982120490313510159_<37> × 2238018465077758345663768643045709427777_<40> (Makoto Kamada / Msieve 1.37 for P37 x P40 / 5.6 minutes on Pentium 4 3.06GHz, Windows XP and Cygwin / September 2, 2008 2008 年 9 月 2 日)

25×10¹⁰⁴-619 = 2(7)₁₀₃1_<105> = 127 × 1613 × 11087 × 134471 × 18686779 × 63512737 × 101882248297_<12> × 4325514023849_<13> × 2048726141234308511_<19> × 848792038469954074824755666105597_<33>

25×10¹⁰⁵-619 = 2(7)₁₀₄1_<106> = 52485466756227452149_<20> × 52924703721877289351719154786598511300416533728925980261239587786232075861543761242079_<86>

25×10¹⁰⁶-619 = 2(7)₁₀₅1_<107> = 3⁴ × 97 × 8015863 × 12428525251_<11> × 73523844666642766796346065191_<29> × 482661493301831528872938134782644225949776772109163982441_<57>

25×10¹⁰⁷-619 = 2(7)₁₀₆1_<108> = 13 × 271 × 21263623999_<11> × 103394839337_<12> × 43264992656306563_<17> × 49917945708711378364240816769_<29> × 16605630520446844003756057283552531557_<38>

25×10¹⁰⁸-619 = 2(7)₁₀₇1_<109> = 1483 × 1873080092904772608076721360605379486026822506930396343747658649883869034239904098299243275642466471866337_<106>

25×10¹⁰⁹-619 = 2(7)₁₀₈1_<110> = 3 × 7 × 1322751322751322751322751322751322751322751322751322751322751322751322751322751322751322751322751322751322751_<109>

25×10¹¹⁰-619 = 2(7)₁₀₉1_<111> = 1632663541_<10> × 3978769366799702222011957999_<28> × 42761412163634516826676572890807646577317022583436603070319222548251613969_<74>

25×10¹¹¹-619 = 2(7)₁₁₀1_<112> = 193 × 471353 × 996629 × 15683728051035098557_<20> × 34425835552810260459914769397_<29> × 56744869480826748120867762247211745286359319439639_<50>

25×10¹¹²-619 = 2(7)₁₁₁1_<113> = 3 × 271 × 22739 × 17890559 × 43792388223044168979319_<23> × 27617109970572949515317687_<26> × 69444014964365487393187182738044327898303548321539_<50>

25×10¹¹³-619 = 2(7)₁₁₂1_<114> = 13 × 15217 × 107828585550083_<15> × 13022405002039822524176084786254034314965859055515458881768624307368074075268072695210629196397_<95>

25×10¹¹⁴-619 = 2(7)₁₁₃1_<115> = 195746064893183460995149_<24> × 14190720918418367553222427950304611894021279120079850790541153753825422314431621072324189079_<92>

25×10¹¹⁵-619 = 2(7)₁₁₄1_<116> = 3² × 7 × 17 × 23 × 2063 × 3381939851_<10> × 6308022709_<10> × 14755675031_<11> × 417008006969_<12> × 25305266660189012489_<20> × 164553620815202126411274376405964287039583885741_<48>

25×10¹¹⁶-619 = 2(7)₁₁₅1_<117> = 456883580957_<12> × 271522884041529636765863_<24> × 2239161973868478061728238898339359732377949928054919219249697765416314373836311681_<82>

25×10¹¹⁷-619 = 2(7)₁₁₆1_<118> = 271 × 39064037 × 35586743578678280759909_<23> × 619747506717711772232144970127654889620759_<42> × 11897290019020184431574871639392025782656283_<44> (Serge Batalov / Msieve v. 1.37/QS for P42 x P44 / 0.49 hours on Opteron-2.8GHz; Linux x86_64 / September 2, 2008 2008 年 9 月 2 日)

25×10¹¹⁸-619 = 2(7)₁₁₇1_<119> = 3 × 533327 × 14198462317038871_<17> × 4876767437337696087113_<22> × 838931544335384514648491635447_<30> × 298870321497084635419226924597470907175505711_<45> (Makoto Kamada / GMP-ECM 6.2.1 B1=250000, sigma=4235806827 for P30 x P45 / August 25, 2008 2008 年 8 月 25 日)

25×10¹¹⁹-619 = 2(7)₁₁₈1_<120> = 13 × 139 × 751 × 5987 × 4349412541261_<13> × 732180989812420030622943010667_<30> × 10735965330307739241904667664591285857785306163923861025980535696887_<68> (Makoto Kamada / GMP-ECM 6.2.1 B1=250000, sigma=3859384349 for P30 x P68 / August 25, 2008 2008 年 8 月 25 日)

25×10¹²⁰-619 = 2(7)₁₁₉1_<121> = 19 × 731683 × 1060777 × 2077909526098467227127095357094899_<34> × 90650500191125839001849566503209300133757025311439466547532183753689765801_<74> (Sinkiti Sibata / GGNFS-0.77.1-20050930-pentium4 snfs for P34 x P74 / 2.05 hours on Pentium 4 2.4GHz, Windows XP and Cygwin / September 2, 2008 2008 年 9 月 2 日)

25×10¹²¹-619 = 2(7)₁₂₀1_<122> = 3 × 7 × 49627 × 151751901518049889837708613154968992021300406120197_<51> × 175641056329064573758109081077588831777126235148165732731308152329_<66> (Sinkiti Sibata / GGNFS-0.77.1-20050930-nocona snfs for P51 x P66 / 2.43 hours on Core 2 Duo E6300 1.86GHz, Windows Vista / September 2, 2008 2008 年 9 月 2 日)

25×10¹²²-619 = 2(7)₁₂₁1_<123> = 271 × 13672418575679_<14> × 346890973077667763_<18> × 30180735151553459806103_<23> × 7160775361520615492130134041471602752266606370439515122422514487471_<67>

25×10¹²³-619 = 2(7)₁₂₂1_<124> = 114043853467_<12> × 3988933109216724093661_<22> × 6106169592044259868052049818971552912673011386571713032145498788166392609106109489857479333_<91>

25×10¹²⁴-619 = 2(7)₁₂₃1_<125> = 3² × 502027579 × 7574678889386110163953_<22> × 70362686316521436307034813012932569418787_<41> × 11535084375410612732158710144999540847723947258858451_<53> (Sinkiti Sibata / Msieve 1.36 for P41 x P53 / 4.83 hours / September 2, 2008 2008 年 9 月 2 日)

25×10¹²⁵-619 = 2(7)₁₂₄1_<126> = 13 × 107197 × 197347 × 296119511 × 120733955495519_<15> × 28251696618550359749238950085464983411446282607526367351685215139385082853024568264151625657_<92>

25×10¹²⁶-619 = 2(7)₁₂₅1_<127> = 47 × 3670754084735512223989_<22> × 16100684895265636335791177190436998199517932451449270726897607631021055521393826279715924744160236352337_<104>

25×10¹²⁷-619 = 2(7)₁₂₆1_<128> = 3 × 7 × 271 × 4881001190964290595286905250004881001190964290595286905250004881001190964290595286905250004881001190964290595286905250004881_<124>

25×10¹²⁸-619 = 2(7)₁₂₇1_<129> = 1033 × 103991 × 3293281 × 4903693 × 1879602147636001_<16> × 72959641804010831_<17> × 332445014609975237_<18> × 3512213528013526651405005810698065565519508161696863156907_<58>

25×10¹²⁹-619 = 2(7)₁₂₈1_<130> = 153151 × 4673772755787217_<16> × 20453259670836204190673329947267817129_<38> × 189735037545599924396551452154414396763586188577807393187978065955851197_<72> (Sinkiti Sibata / GGNFS-0.77.1-20050930-nocona snfs for P38 x P72 / 5.11 hours on Core 2 Duo E6300 1.86GHz, Windows Vista / September 2, 2008 2008 年 9 月 2 日)

25×10¹³⁰-619 = 2(7)₁₂₉1_<131> = 3 × 58495944249857_<14> × 72325146532934744296452924098623296259_<38> × 2188573651977845386131277387482593882061834489364029224669677420951255801033939_<79> (Sinkiti Sibata / GGNFS-0.77.1-20050930-nocona snfs for P38 x P79 / 3.74 hours on Core 2 Duo E6300 1.86GHz, Windows Vista / September 3, 2008 2008 年 9 月 3 日)

25×10¹³¹-619 = 2(7)₁₃₀1_<132> = 13 × 17 × 29 × 59 × 734607259859090573842868682487756300799928537405760907668976565734567591067058182951881167578901961959685341264740996579962441_<126>

25×10¹³²-619 = 2(7)₁₃₁1_<133> = 257 × 271 × 6042107 × 6600953495057843895876213023123690086481102365423974916916712685275940415743979921868035013759236019583864771119131075999_<121>

25×10¹³³-619 = 2(7)₁₃₂1_<134> = 3³ × 7 × 24977 × 17801116284109626465401_<23> × 330558389571404893301858184684159547915004422565977795693502877810874213168957576139864687729964228726607_<105>

25×10¹³⁴-619 = 2(7)₁₃₃1_<135> = 154682376054408611_<18> × 4819569705512101509596789_<25> × 2285341270841103220316892131357527_<34> × 163041189884638045718398236420560827643537175317697019375987_<60> (Serge Batalov / Msieve v. 1.36/QS for P34 x P60 / 2.3 hours on Opteron-2.8GHz; Linux x86_64 / September 2, 2008 2008 年 9 月 2 日)

25×10¹³⁵-619 = 2(7)₁₃₄1_<136> = 1657 × 1456703 × 16836491418973_<14> × 77480279515387043_<17> × 882188117977655357774150904144674725145605945137330733937630380359586502565655416410063646159659_<96>

25×10¹³⁶-619 = 2(7)₁₃₅1_<137> = 3 × 1901077818633176986641273760618004825731_<40> × 4870531426176132915928552436849317829157610124238343115163233836263288860176292922476799468932947_<97> (Serge Batalov / Msieve-1.37 snfs for P40 x P97 / 5.10 hours on Opteron-2.2GHz; Linux x86_64 / September 2, 2008 2008 年 9 月 2 日)

25×10¹³⁷-619 = 2(7)₁₃₆1_<138> = 13² × 23 × 271 × 1117 × 793253153879_<12> × 1582781918870346766095661645393_<31> × 188030199457481189093216987973755516187806839344092645428320791821437267639739499335777_<87> (Makoto Kamada / GMP-ECM 6.2.1 B1=250000, sigma=410614251 for P31 x P87 / August 26, 2008 2008 年 8 月 26 日)

25×10¹³⁸-619 = 2(7)₁₃₇1_<139> = 19 × 131 × 10099 × 110508130129547045430542084061952113122982345322797983283205298392748979867403416413654987491164819742077648944305445108204897579761_<132>

25×10¹³⁹-619 = 2(7)₁₃₈1_<140> = 3 × 7 × 80084639981_<11> × 6190455589244173649468957716997216405600058094976893_<52> × 2668126182700760482119033930880089627186177930718096494876239686787844595447_<76> (Sinkiti Sibata / GGNFS-0.77.1-20050930-nocona snfs for P52 x P76 / 16.63 hours on Core 2 Duo E6300 1.86GHz, Windows Vista / September 2, 2008 2008 年 9 月 2 日)

25×10¹⁴⁰-619 = 2(7)₁₃₉1_<141> = 168696481 × 2441850857_<10> × 329896065220070943866660293_<27> × 2044067370661258243423045835261038146055923336596522878652392910577934134746113164052016387047991_<97>

25×10¹⁴¹-619 = 2(7)₁₄₀1_<142> = 83 × 6011 × 881209853081267_<15> × 247083612667423010386358912029_<30> × 25571098890555796578185168881727911744457954089212571602943549369171005018858052836950815069_<92> (Makoto Kamada / GMP-ECM 6.2.1 B1=250000, sigma=1439912033 for P30 x P92 / August 26, 2008 2008 年 8 月 26 日)

25×10¹⁴²-619 = 2(7)₁₄₁1_<143> = 3² × 271 × 13907 × 8197537 × 4493806896529693_<16> × 2901173421641272627502030357866773367220862841_<46> × 7662681283468009442196894266756698463559266727460022585926879778867_<67> (Sinkiti Sibata / GGNFS-0.77.1-20050930-nocona snfs for P46 x P67 / 16.27 hours on Core 2 Quad Q6600 2.4GHz, Windows Vista and Cygwin / September 2, 2008 2008 年 9 月 2 日)

25×10¹⁴³-619 = 2(7)₁₄₂1_<144> = 13 × 2171111317_<10> × 9299223345239532250199_<22> × 1309143485309777583241846470683317_<34> × 484378549302141911629687706665230167387_<39> × 1668988046339800108673532942790290417931_<40> (Sinkiti Sibata / GMP-ECM 6.2.1 B1=1000000, sigma=2624782773 for P34, Msieve 1.36 for P39 x P40 / 0.11 hours / September 2, 2008 2008 年 9 月 2 日)

25×10¹⁴⁴-619 = 2(7)₁₄₃1_<145> = 107 × 6381204345253_<13> × 18991837447417_<14> × 214212142443018437489659579312278934120001492925876004056614997852551782179821801350781913274328881877990670225360853_<117>

25×10¹⁴⁵-619 = 2(7)₁₄₄1_<146> = 3 × 7² × 9828296418549422058299450666557398619289_<40> × 87046340760163089105257888142997578027021705923_<47> × 220877459896081835011433334820685258323697425657910538619_<57> (Serge Batalov / Msieve-1.37 snfs for P40 x P47 x P57 / 5.00 hours on Opteron-2.6GHz; Linux x86_64 / September 2, 2008 2008 年 9 月 2 日)

25×10¹⁴⁶-619 = 2(7)₁₄₅1_<147> = 127 × 456028730302078284597481_<24> × 4796247366315217455995988156472913638500148758414151869520124565358528953992956026872914090195111788758215278385730502733_<121>

25×10¹⁴⁷-619 = 2(7)₁₄₆1_<148> = 17 × 271 × 3309855891091_<13> × 9229490189668026616203266998176737_<34> × 19737515731549627398346041144166461110062712518326895924348032317964415590287193972630324247892759_<98> (Sinkiti Sibata / GMP-ECM 6.2.1 B1=1000000, sigma=4055225039 for P34 x P98 / September 2, 2008 2008 年 9 月 2 日)

25×10¹⁴⁸-619 = 2(7)₁₄₇1_<149> = 3 × 1733 × 653993 × 9457181 × 80593319 × 54411533567_<11> × 196993943020261267964670269838808765565939812493427690678912067404387216416212313720493113625288183751611437608681_<114>

25×10¹⁴⁹-619 = 2(7)₁₄₈1_<150> = 13 × 181 × 197 × 1690007339_<10> × 470636525232146442959347571682077326597_<39> × 753416498702436697593695957452689801144133736876627078063382917767291118360831661478156933806457_<96> (Sinkiti Sibata / GGNFS-0.77.1-20050930-nocona snfs for P39 x P96 / 29.16 hours on Core 2 Quad Q6600 2.4GHz, Windows Vista and Cygwin / September 3, 2008 2008 年 9 月 3 日)

25×10¹⁵⁰-619 = 2(7)₁₄₉1_<151> = definitely prime number 素数

25×10¹⁵¹-619 = 2(7)₁₅₀1_<152> = 3² × 7 × 439 × 10988762033_<11> × 1921139818288877111_<19> × 47575645281935932579428480533590643109645776166368299710582029631282332720948261156968581844372077703891681984015040981_<119>

25×10¹⁵²-619 = 2(7)₁₅₁1_<153> = 271 × 251197 × 23650616473873_<14> × 1649194932995458194552098353071508753_<37> × 40462912832676719001557694003003432413533_<41> × 2585485814085485481752663875511265877142630193494391229_<55> (Sinkiti Sibata / GGNFS-0.77.1-20050930-nocona snfs for P37 x P41 x P55 / 30.42 hours on Core 2 Duo E6300 1.86GHz, Windows Vista / September 3, 2008 2008 年 9 月 3 日)

25×10¹⁵³-619 = 2(7)₁₅₂1_<154> = 109597476817915399648783767470638342286678753105441_<51> × 25345271245548484326118620469718080997667197757537826608184756610171014468393711341782508146039235365131_<104> (Serge Batalov / Msieve 1.37 snfs for P51 x P104 / 11.50 hours on Opteron-2.6GHz; Linux x86_64 / September 3, 2008 2008 年 9 月 3 日)

25×10¹⁵⁴-619 = 2(7)₁₅₃1_<155> = 3 × 293 × 26557 × 49256293730178799051846621_<26> × 5301064110976528276021825235523818767679_<40> × 4557270671561061255123982087138571971565022174347192982395270017827900110497448323_<82> (Sinkiti Sibata / GGNFS-0.77.1-20050930-nocona snfs for P26 x P40 x P82 / 32.40 hours on Core 2 Quad Q6600 2.4GHz, Windows Vista and Cygwin / September 3, 2008 2008 年 9 月 3 日)

25×10¹⁵⁵-619 = 2(7)₁₅₄1_<156> = 13 × 17029 × 141266471 × 91202078799989_<14> × 97391525358216802352514108198930301435519170717579551293408175167558556951078884537831938892608442663661395524621427489874252617_<128>

25×10¹⁵⁶-619 = 2(7)₁₅₅1_<157> = 19 × 199 × 734667489494254900232154926680184548473360956830938317317582062358576508272355931705310176614064474418878015810044373916365452995974022157571483146727791_<153>

25×10¹⁵⁷-619 = 2(7)₁₅₆1_<158> = 3 × 7 × 271 × 3096349 × 23837571371_<11> × 53476976743_<11> × 251111527431617622010853018800610054904163_<42> × 4924515457609151256111451286897140203112085825934235152907008026879826815789247413971_<85> (Sinkiti Sibata / GGNFS-0.77.1-20050930-nocona snfs for P42 x P85 / 43.89 hours on Core 2 Quad Q6600 2.4GHz, Windows Vista and Cygwin / September 4, 2008 2008 年 9 月 4 日)

25×10¹⁵⁸-619 = 2(7)₁₅₇1_<159> = 3772501858702369950013123_<25> × 73632244113280620194880444322906951968929268052293963453804933950221191733871197659325181615916871791129016052386634297318030370085177_<134>

25×10¹⁵⁹-619 = 2(7)₁₅₈1_<160> = 23 × 29 × 1448387 × 439692763 × 961430228377_<12> × 40938435274311943365251489605994903_<35> × 166145551502820974033100434453141488073658394935290823556214125540250731272635492119584942449183_<96> (Serge Batalov / GMP-ECM 6.2.1 B1=1000000, sigma=232563863 for P35 x P96 / September 2, 2008 2008 年 9 月 2 日)

25×10¹⁶⁰-619 = 2(7)₁₅₉1_<161> = 3³ × 2734786412203065205551953831_<28> × 376192663445831204885227632625216743674419091832626055922300638588728556287739848640906401047705710259394196823517242951005787452583_<132>

25×10¹⁶¹-619 = 2(7)₁₆₀1_<162> = 13 × 984211 × 17915596918681641487769_<23> × 253653749852508153250333883090711675749451709540031375104589078333_<66> × 4777419331469809285428949137256054363568169465244600000364285743961_<67> (Robert Backstrom / GGNFS-0.77.1-20050930-k8, Msieve 1.36 snfs for P66 x P67 / 15.24 hours, 1.76 hours / September 4, 2008 2008 年 9 月 4 日)

25×10¹⁶²-619 = 2(7)₁₆₁1_<163> = 271 × 563 × 1879 × 1373431 × 1359263813985643_<16> × 151483474336947757_<18> × 23620461886232346133505839_<26> × 518359647652198152916575830119_<30> × 2798321461530763710270557913472221025759214843794041462439153_<61> (Serge Batalov / Msieve 1.37 for P30 x P61 / 1.68 hours on Opteron-2.8GHz; Linux x86_64 / September 2, 2008 2008 年 9 月 2 日)

25×10¹⁶³-619 = 2(7)₁₆₂1_<164> = 3 × 7 × 17 × 739 × 11492161 × 4402226051_<10> × 343669074489795639277832878263307_<33> × 6055783638574069034440712866051481024164387943862544584024154281615135516630551624273818820529570512643159301_<109> (Serge Batalov / GMP-ECM 6.2.1 B1=1000000, sigma=1462551368 for P33 x P109 / September 2, 2008 2008 年 9 月 2 日)

25×10¹⁶⁴-619 = 2(7)₁₆₃1_<165> = 3299 × 659829942255417221379291150281179_<33> × 248570702244139474826035756339690768851787296439_<48> × 513373237714119628900245111388942430675374787557277953916106237311225424401827709_<81> (Serge Batalov / GMP-ECM B1=3000000, sigma=3546418022 for P33, Msieve 1.37 snfs for P48 x P81 / 31.00 hours on Opteron-2.6GHz; Linux x86_64 / September 3, 2008 2008 年 9 月 3 日)

25×10¹⁶⁵-619 = 2(7)₁₆₄1_<166> = 139 × 163 × 1399 × 17783920837_<11> × 5046891031387_<13> × 28368734240391359_<17> × 80362373512148298738695020240543_<32> × 1311733054597632858229417944775231493_<37> × 326503438371259342587167097723316440052457045232143_<51> (Serge Batalov / GMP-ECM 6.2.1 B1=1000000, sigma=4222096588 for P32, Msieve 1.37/QS for P37 x P51 / 0.69 hours on Opteron-2.6GHz; Linux x86_64 / September 3, 2008 2008 年 9 月 3 日)

25×10¹⁶⁶-619 = 2(7)₁₆₅1_<167> = 3 × 347 × 443 × 128591 × 17994103323059_<14> × 26031683774729203985326228501685256955872156949326100004167072415704300049710586898290064196053676114551670472980668374353159432190889934287893_<143>

25×10¹⁶⁷-619 = 2(7)₁₆₆1_<168> = 13 × 271 × 2803 × 885825149921_<12> × 31755119535413467976996409781952745117279541675138373671402395134668291769369307569605181315812089168591945643028345168382195004416131351198764155779_<149>

25×10¹⁶⁸-619 = 2(7)₁₆₇1_<169> = 1229 × 6791 × 332821892587432078207393595742627552426071238183042216020818462019117795399498831468991563377722055405233219549515983112404164102440395226796220117802708267592689_<162>

25×10¹⁶⁹-619 = 2(7)₁₆₈1_<170> = 3² × 7 × 743 × 8251399313549821862049949_<25> × 71918485200250007648836472190278376534924013698741673242216133733978155087297905444090629061027386961731827034036834802717699845299240040831_<140>

25×10¹⁷⁰-619 = 2(7)₁₆₉1_<171> = 131909045573_<12> × 123310363949659_<15> × 51349565953817840490156245892197350453929733234153814020952530482561583_<71> × 332572675808658297792850706653907384324838226345820816882845634793838252691_<75> (Sinkiti Sibata / GGNFS-0.77.1-20050930-nocona snfs for P71 x P75 / 170.65 hours on Core 2 Quad Q6600 2.4GHz, Windows Vista and Cygwin / September 6, 2008 2008 年 9 月 6 日)

25×10¹⁷¹-619 = 2(7)₁₇₀1_<172> = 1777 × 11110598531288144356616827185083_<32> × 44512398379504795249333730316447728566719025499_<47> × 3160760731055610510155798731208531392799859145056964147663316803202246756868891237027738419_<91> (Makoto Kamada / GMP-ECM 6.2.1 B1=250000, sigma=164451410 for P32 / August 28, 2008 2008 年 8 月 28 日) (Serge Batalov / GMP-ECM 6.2.1 B1=3000000, sigma=3132305148 for P47 x P91 / September 4, 2008 2008 年 9 月 4 日)

25×10¹⁷²-619 = 2(7)₁₇₁1_<173> = 3 × 47 × 271 × 57935341 × 12956265741884479104103362197_<29> × 323491665334534849464472655197_<30> × 1419307810265852610333835137969799236391677581_<46> × 2109337107130584539479018932845314440549663990721314805649_<58> (Makoto Kamada / GMP-ECM 6.2.1 B1=250000, sigma=1985991546 for P30 / August 28, 2008 2008 年 8 月 28 日) (Sinkiti Sibata / Msieve 1.36 for P46 x P58 / 34.97 hours / September 4, 2008 2008 年 9 月 4 日)

25×10¹⁷³-619 = 2(7)₁₇₂1_<174> = 13 × 134777 × 7526092283_<10> × 11274927591168886452320053_<26> × 1868336339713179906520082573574612639467110604678406428892645795360380482234322179248991612143918588759021148719648233445334415060329_<133>

25×10¹⁷⁴-619 = 2(7)₁₇₃1_<175> = 19 × 403409639 × 66522182025933914980141308358046139455527739_<44> × 5447925262173541576005437341883756530635970709270997946040684543445936204837528913808007878742336075875516134731712620029_<121> (matsui / Msieve 1.42 snfs for P44 x P121 / 144.27 hours / October 4, 2009 2009 年 10 月 4 日)

25×10¹⁷⁵-619 = 2(7)₁₇₄1_<176> = 3 × 7 × 3733 × 689411 × 2417557 × 3975217 × 4669869399548990849_<19> × 325357900102713751078335624642068978594422001_<45> × 35199650481187855151220231434203930641589700515520621743884025357824851988375481446116317_<89> (Wataru Sakai / GMP-ECM 6.2.3 B1=11000000, sigma=1023625928 for P45 x P89 / September 3, 2011 2011 年 9 月 3 日)

25×10¹⁷⁶-619 = 2(7)₁₇₅1_<177> = 221147674888207_<15> × 63635378501743197244993_<23> × 14344981459401114281441547188409204249146069939_<47> × 1375993868655558348978891915700067652067302194536892775483245969319727867058872581465851194439_<94> (Markus Tervooren / Msieve 1.50 for P47 x P94 / September 14, 2012 2012 年 9 月 14 日)

25×10¹⁷⁷-619 = 2(7)₁₇₆1_<178> = 271 × 419 × 66821 × 141356306265971_<15> × 127353589502138899_<18> × 71134251631905636534346663289671327_<35> × 285888094063953311988136712438838290992815309587898590647604791112176558836528871352247718253340599053_<102> (Serge Batalov / GMP-ECM 6.2.1 B1=11000000, sigma=1489180364 for P35 x P102 / September 5, 2008 2008 年 9 月 5 日)

25×10¹⁷⁸-619 = 2(7)₁₇₇1_<179> = 3² × 95092308287_<11> × 28253400138993218282660105411_<29> × 3033609681640163118211947707190263880163644662540933727443_<58> × 378685937779697714288980705899283428904149075269378180789618703955829338929302869_<81> (Dmitry Domanov / Msieve 1.50 snfs for P58 x P81 / May 23, 2013 2013 年 5 月 23 日)

25×10¹⁷⁹-619 = 2(7)₁₇₈1_<180> = 13 × 17 × 131888249 × 984130649265727_<15> × 46205555207059443940132915017451119439632045524572814917095001_<62> × 209581127553592842313039179332680997588112827178274595514135243096222019311597164216419092937_<93> (Dmitry Domanov / Msieve 1.50 snfs for P62 x P93 / May 27, 2013 2013 年 5 月 27 日)

25×10¹⁸⁰-619 = 2(7)₁₇₉1_<181> = 317 × 6905645673920040607184717_<25> × 43952400331059530094446521726274677395012244991_<47> × 28870303413820983247599551062169424987701202250805189914283964624648114109735130174345717592163756000956829_<107> (Dmitry Domanov / Msieve 1.50 snfs for P47 x P107 / May 28, 2013 2013 年 5 月 28 日)

25×10¹⁸¹-619 = 2(7)₁₈₀1_<182> = 3 × 7 × 23 × 75510615435433520332094734482048406815014663397888447357329506169_<65> × 761627047329789607062080654255561176112224466344542541980790154090969468251343258094559369704529752173237377695073_<114> (Ignacio Santos / GGNFS, Msieve snfs for P65 x P114 / 164.24 hours / March 30, 2009 2009 年 3 月 30 日)

25×10¹⁸²-619 = 2(7)₁₈₁1_<183> = 83 × 271 × 6287204798115739499_<19> × 1964230764245730304517019115887240175807306186345460436934766240461119648446560766920456437586593307889813024774337186247737424492191098901373182874379409339253_<160>

25×10¹⁸³-619 = 2(7)₁₈₂1_<184> = 911 × 36295896389_<11> × 2729885466653_<13> × 8669632016123061916796275866681188298080002637458820578788528466567_<67> × 3549576211229971902588534703314750688553380340638757643423328560633508371570386185671820099_<91> (Dmitry Domanov / Msieve 1.50 snfs for P67 x P91 / July 5, 2013 2013 年 7 月 5 日)

25×10¹⁸⁴-619 = 2(7)₁₈₃1_<185> = 3 × 269 × 509575232245114400105218066214409542599718583695395748663216501642189269183_<75> × 67548491293142657192636214891586037775613013390913300305025073464846830376816916705229553974495985164761891_<107> (Wataru Sakai / GGNFS-0.77.1-20060722-nocona snfs for P75 x P107 / 835.22 hours / September 14, 2008 2008 年 9 月 14 日)

25×10¹⁸⁵-619 = 2(7)₁₈₄1_<186> = 13 × 115458191 × 1994694985680728222135191_<25> × 92779686840268383942430205925006238772750817091966518901728649194541815418869173041170920523807904274891843977628137965577832236170829759306787636425007_<152>

25×10¹⁸⁶-619 = 2(7)₁₈₅1_<187> = 14713 × 6788861 × 5414636935281406913349458857105484780449526483_<46> × 15009116190485478016577138811493608631091125451562089_<53> × 342195966763892628879123527833453886016064164105727964142669362057924357193181_<78> (Robert Backstrom / Msieve 1.44 snfs for P46 x P53 x P78 / February 10, 2012 2012 年 2 月 10 日)

25×10¹⁸⁷-619 = 2(7)₁₈₆1_<188> = 3⁴ × 7² × 29 × 271 × 12937653204611_<14> × 17043884266883_<14> × 156036180637286656358135333912367766215147691292844319_<54> × 25882112345423881351610615434392599822326561460281122965970297545272282068953055151269841206206365183_<101> (Ben Meekins / Msieve 1.53 snfs for P54 x P101 / October 16, 2014 2014 年 10 月 16 日)

25×10¹⁸⁸-619 = 2(7)₁₈₇1_<189> = 127 × 238247 × 344559956490953332823434154872725361_<36> × 28172895250639690909327135764207491675262223241158622239_<56> × 945736287647390219553620749930045228824681773074517917625096785519367406134505825203895821_<90> (Dmitry Domanov / GMP-ECM B1=11000000, sigma=1737892046 for P36 / June 19, 2010 2010 年 6 月 19 日) (Daniel Morel / GGNFS-0.77.1 for P56 x P90 / December 17, 2014 2014 年 12 月 17 日)

25×10¹⁸⁹-619 = 2(7)₁₈₈1_<190> = 59 × 1447 × 1549 × 55837 × 18626559023_<11> × 1680493671035288368696859_<25> × 2016363122734122769308758804969621922733_<40> × 5960259958234267822953007523507500830294029263387822644819553059732204123759026007056155922498545778959_<103> (Serge Batalov / GMP-ECM 6.2.1 B1=3000000, sigma=2931673241 for P40 x P103 / September 4, 2008 2008 年 9 月 4 日)

25×10¹⁹⁰-619 = 2(7)₁₈₉1_<191> = 3 × 619 × 2858827 × 3617101 × 220477529829865223482993_<24> × 26459747372041207956272582179_<29> × 2976504347692375718574208936493265731_<37> × 83306815908902703939279567118759249527571709871356299315811741626793814308282721962477_<86> (Serge Batalov / GMP-ECM 6.2.1 B1=1000000, sigma=2641304095 for P37 x P86 / September 2, 2008 2008 年 9 月 2 日)

25×10¹⁹¹-619 = 2(7)₁₉₀1_<192> = 13 × 2011 × 10625321415972833178203640660129968931560179695435786932554709779970844118034570545759009210028603365251798866915724200657069876363760003740113138422437278727681512365749063909183252793397_<188>

25×10¹⁹²-619 = 2(7)₁₉₁1_<193> = 19 × 271 × 100134159334747975966518733103_<30> × 496093373143380719981737319156524836583893154653244252197487651_<63> × 10859977502558799554831501293698993080104954165745623932818716497804653112611321607530774181324643_<98> (Makoto Kamada / GMP-ECM 6.2.1 B1=250000, sigma=3207927696 for P30 / August 31, 2008 2008 年 8 月 31 日) (Edwin Hall / CADO-NFS/Msieve for P63 x P98 / January 8, 2021 2021 年 1 月 8 日)

25×10¹⁹³-619 = 2(7)₁₉₂1_<194> = 3 × 7 × 73883 × 26925317 × 19159973142181_<14> × 284017799510891_<15> × 80485311297327121853982640517_<29> × 128613570680091058920064785055072809139946797083167593_<54> × 11803993992833193782465781270323656372348977417985328398765195618890491_<71> (Serge Batalov / GMP-ECM 6.2.1 B1=3000000, sigma=1712037598 for P29 / September 4, 2008 2008 年 9 月 4 日) (Justin Card / GGNFS, Msieve 1.40 gnfs for P54 x P71 / 58.22 hours on Athlon 64X2 3600 1 GB RAM, Debian Linux / July 29, 2009 2009 年 7 月 29 日)

25×10¹⁹⁴-619 = 2(7)₁₉₃1_<195> = 1093 × 6702335444087_<13> × 37918502475309813042965633562604077787176625221894467377313351088159999815622002422592185757529194832354219326037679922623593878026065975186449718611948787371190440409071361457481_<179>

25×10¹⁹⁵-619 = 2(7)₁₉₄1_<196> = 17 × 119509737931441137246596335232308772579390887315656085068081433412471176766596851200060667993821_<96> × 1367241662802357158967844931268345670438128299143736962843556968202636908577271893194737300367939703_<100> (Tyler Cadigan / GGNFS + Msieve 1.38 snfs for P96 x P100 / 1129.81 hours on C2Q Q6600 2.4 Ghz, 4 Gb RAM, windows vista / October 8, 2008 2008 年 10 月 8 日)

25×10¹⁹⁶-619 = 2(7)₁₉₅1_<197> = 3² × 229 × 3041 × 11395265296651_<14> × 4839338850833497_<16> × 4913250201327494465171_<22> × 5235279709425520941623081_<25> × 3124523846584201722025619971541084112770374663841086114345137224199715106214553464641537497783309774445646994428743_<115>

25×10¹⁹⁷-619 = 2(7)₁₉₆1_<198> = 13 × 107 × 271 × 736887311360532728260424228972699504133790439270316498995327839691049678289737606218621496063990115098850485269770023365222868619771747681531452266355877074227248383195550143855140923803199211_<192>

25×10¹⁹⁸-619 = 2(7)₁₉₇1_<199> = 868493 × 265867759 × 23408684089014109411061_<23> × 40364346656855192366420299812847579509343004727296983344121_<59> × 12731822459484220963285560129738834479492246021968866514515522217719997082702314137316765011124564570493_<104> (Eric Jeancolas / cado-nfs-3.0.0 for P59 x P104 / July 10, 2021 2021 年 7 月 10 日)

25×10¹⁹⁹-619 = 2(7)₁₉₈1_<200> = 3 × 7 × 283 × 1391259626479767819093311_<25> × 4950310741210515424439214523_<28> × 8137130775905265500667125642011561_<34> × 21631834288992712007555427246085799_<35> × 3855551265441025333983640384610406523731030541038891638539125959121664278391_<76> (Serge Batalov / GMP-ECM 6.2.1 B1=3000000, sigma=1435650970 for P35 / September 4, 2008 2008 年 9 月 4 日) (Serge Batalov / GMP-ECM 6.2.1 B1=11000000, sigma=2054967644 for P34 x P76 / September 5, 2008 2008 年 9 月 5 日)

25×10²⁰⁰-619 = 2(7)₁₉₉1_<201> = 2122587289_<10> × 7498687211437_<13> × 2123029431849520083370025081872906316520466909901590897129673989708817592997_<76> × 8220357148950829383638963294593126926885203322122284737267580040273679737822235876513934924236194863651_<103> (Robert Backstrom / GGNFS-0.77.1-20060513-nocona, Msieve 1.44 snfs for P76 x P103 / September 26, 2012 2012 年 9 月 26 日)

25×10²⁰¹-619 = 2(7)₂₀₀1_<202> = 433 × 517511 × 451555028887_<12> × 189255117135734141_<18> × 15380197515662085863_<20> × 8484086097696052854549061216517464333438459696322114897169668129_<64> × 1111641427661270004441284104674198649150814132732184065064316330593982466208441713_<82> (Eric Jeancolas / cado-nfs-3.0.0 for P64 x P82 / June 16, 2020 2020 年 6 月 16 日)

25×10²⁰²-619 = 2(7)₂₀₁1_<203> = 3 × 97 × 271 × 863 × 977 × 1223 × 21701 × 212281 × 115247201445497903_<18> × 69340245335519755209008970683_<29> × 9278905869723239348341497650346667914003447780906352333573733969832000969813719934328229629719703971498901897964380948294297745851103_<133>

25×10²⁰³-619 = 2(7)₂₀₂1_<204> = 13 × 23 × 15817 × 14462404523074931_<17> × 495974662509355543_<18> × 8188459414830070505993096302794147636677760332932176785983740103873024888783483408967574574822698389832986900812111168791574197365703978380126044633182909917339989_<163>

25×10²⁰⁴-619 = 2(7)₂₀₃1_<205> = 167 × 2245301 × 6256584287843_<13> × 4373316329777205659_<19> × 270743642095587045817102919087652566570422381774350354657942067622544029879870613502120802679247984845347645257001491212017124542598954391522047436503996610700645849_<165>

25×10²⁰⁵-619 = 2(7)₂₀₄1_<206> = 3² × 7 × 431 × 5460017 × 187363799482086741452862192219513295626917573561235378695638138005633497005976621704812481102754505537642324322687163872638193663629235261878197334491402465205029569051211997630497183593926464171_<195>

25×10²⁰⁶-619 = 2(7)₂₀₅1_<207> = 109 × 2548419979612640163098878695208970438328236493374108053007135575942915392456676860346585117227319062181447502548419979612640163098878695208970438328236493374108053007135575942915392456676860346585117227319_<205>

25×10²⁰⁷-619 = 2(7)₂₀₆1_<208> = 271 × 175919789 × 4129639867_<10> × 1843472008384855063_<19> × 42841271031691822669770731_<26> × 14650084403256770867793492899611862338323788582587021_<53> × 12194452644555211204478071363747344297957512556438962313872523580734686328405808105336864979_<92> (Jason Parker-Burlingham / CADO-NFS-3.0.0-dev for P53 x P92 / November 28, 2019 2019 年 11 月 28 日)

25×10²⁰⁸-619 = 2(7)₂₀₇1_<209> = 3 × 113 × 11037467219_<11> × 1460463368033_<13> × 217591987934598749815308665647_<30> × 23361181632584641686162419927936103219804059052954483860900403745230948115584510150646684852276288394748400015544326826042593850271629197881300323159045981_<155> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=427398266 for P30 x P155 / April 21, 2013 2013 年 4 月 21 日)

25×10²⁰⁹-619 = 2(7)₂₀₈1_<210> = 13 × 1439 × 10797497019304693_<17> × 96539385167814987081389944836641029033897_<41> × 716796376493902162025851341423097009763249167_<45> × 19873297336199609238648492739386573166526670336142562314305768380151472452971983412867033494494937843379_<104> (Dmitry Domanov / GMP-ECM B1=3000000, sigma=357789799 for P41 / April 29, 2013 2013 年 4 月 29 日) (Bob Backstrom / GMP-ECM 7.0.4 B1=45580000, sigma=1:1111055606 for P45 x P104 / November 2, 2021 2021 年 11 月 2 日)

25×10²¹⁰-619 = 2(7)₂₀₉1_<211> = 19 × 3049 × 18646550050407271_<17> × 38654928602419054645987669371783995383_<38> × 66524727956537544114603109945094913928627693845559494520806633234056735712970622062792300872689926063360048586578124993507615796990232330126834192251137_<152> (Dmitry Domanov / GMP-ECM B1=3000000, sigma=369651913 for P38 x P152 / April 29, 2013 2013 年 4 月 29 日)

25×10²¹¹-619 = 2(7)₂₁₀1_<212> = 3 × 7 × 17 × 139 × 2287 × 6203 × 255839 × 476181465068584360513476091_<27> × 323897280298433619033501619418187618228519744866598785345353079416076816992774528071131789760045489631142459181459354357647690939815130369689843359978124820925502990693_<168>

25×10²¹²-619 = 2(7)₂₁₁1_<213> = 271 × 11887050349_<11> × 3624654588463511_<16> × 9584360234227468525601_<22> × [2482129011952065900663214166239375081470396604224099317043122565414809271066796629735619505774677560854974745168253451780221063000124528068878503357227627615082159_<163>] Free to factor

25×10²¹³-619 = 2(7)₂₁₂1_<214> = 64138500370564772977457533_<26> × [43309054027284205341390324690651572813827850735314784374779314939942363375244285411463053283444620013528610814948637325685808732313848299784363736729824359284264184553158107716399762362887_<188>] Free to factor

25×10²¹⁴-619 = 2(7)₂₁₃1_<215> = 3³ × 4261 × 120097913853917887_<18> × 2010419727909458154219064360529345364775526030281402082866197970019256421513159369578077293527747986003225257194182752699724727056511898169074884199051118023535640415598256337007421629875143139_<193>

25×10²¹⁵-619 = 2(7)₂₁₄1_<216> = 13³ × 29 × 34183 × 173362514970937181_<18> × 10626364401157404139_<20> × [69233990796137831968147199739843997699826855762094106694368763615984118043904984084038131677568010643528702930737451536719350592286139136295769845188860171137039869563011_<170>] Free to factor

25×10²¹⁶-619 = 2(7)₂₁₅1_<217> = 571 × 109961 × 976637 × 4829899153450651559041746548398635972306771031_<46> × 9378890680185727796855844738758915812580068998403305595406947275438382083694361639998631473917520499059762858377831242287418284318851766713791251709316513803_<157> (Bob Backstrom / Msieve 1.54 snfs for P46 x P157 / September 21, 2019 2019 年 9 月 21 日)

25×10²¹⁷-619 = 2(7)₂₁₆1_<218> = 3 × 7 × 271 × 4931 × 62021051 × 1835899033_<10> × 5473577453_<10> × 256334405453003_<15> × 133409412093282851_<18> × [46443116719324239451395756342079675183876267741680294205195923231771728696028517332384007131142630405408604169079217535103002802782762507352948082504333_<152>] Free to factor

25×10²¹⁸-619 = 2(7)₂₁₇1_<219> = 47 × 314139097 × 33393213421_<11> × 563403365810818151189915181228350188582487277798477030116691203279150597581428497169668799777304089150526867139352247986440741046293248511629692300834164848577249167050435674338547187220549838579489_<198>

25×10²¹⁹-619 = 2(7)₂₁₈1_<220> = 6069121 × 8843706865505371_<16> × 8475483387259299728681557_<25> × 6106226184119305393828583079988418634955346545946867877533478302857732043871420423547890206058673617793689197476408768299134746966002384211411944560502506416491024491453933_<172>

25×10²²⁰-619 = 2(7)₂₁₉1_<221> = 3 × 12907 × 515714439928022723072711152873_<30> × 1953788967063114940651281248994131773268796369000827850593_<58> × 711973763246064752313612279194631320003319506682437943504848751628954828359731807316403768433689622875607833795433314508768408659_<129> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=2736789505 for P30 / April 21, 2013 2013 年 4 月 21 日) (Erik Branger / GGNFs, NFS_factory, Msieve snfs for P58 x P129 / December 9, 2018 2018 年 12 月 9 日)

25×10²²¹-619 = 2(7)₂₂₀1_<222> = 13 × 20641851454212191912363_<23> × 1035155272525764390887261201789221620886506588584049070395634324232759080735032259061636550939435738848480388243235463719539209814641622093597148159090934851166329439560501320163793121643729959112709_<199>

25×10²²²-619 = 2(7)₂₂₁1_<223> = 271 × 4707585671_<10> × 3140586769382762880906227058395114267258183986382663815182142791808719811_<73> × 693296773916507136923292570780067171898121033082161388517110706419743705420214573710862242525586533835010553027873305470360589924556864721_<138> (Bob Backstrom / Msieve 1.54 snfs for P73 x P138 / April 16, 2020 2020 年 4 月 16 日)

25×10²²³-619 = 2(7)₂₂₂1_<224> = 3² × 7 × 83 × 233 × 1825406047_<10> × 8068569479_<10> × 12445001395471_<14> × 3722487460787687_<16> × 33414788397803719298932275829318533112071864932258639295036748436814523749027740820043917671692883411001382421622633179492708108114551680395663525103655421678642013759103_<170>

25×10²²⁴-619 = 2(7)₂₂₃1_<225> = 773 × 1341883 × 38818453 × 6898666183101398834236441609484405017348929575239627707354333326265020298129745740513213766942302437611896738954014297681309483286813182796206077927175171023768627290664622829270769209526912240440180659965673_<208>

25×10²²⁵-619 = 2(7)₂₂₄1_<226> = 23 × 826963 × 4516929422256102982201304369962603_<34> × 195346265564818520836589252919312943561_<39> × 547448786241376739924150848961974790499829122395242757402074636931111_<69> × 302337257514420741266186823291110987007728598682947390526500483724330554951683_<78> (Dmitry Domanov / GMP-ECM B1=3000000, sigma=3605982086 for P34 / April 29, 2013 2013 年 4 月 29 日) (Dmitry Domanov / GMP-ECM B1=11000000, sigma=3779503544 for P39 / June 6, 2013 2013 年 6 月 6 日) (ebina / yafu v1.34.5 for P69 x P78 / September 25, 2021 2021 年 9 月 25 日)

25×10²²⁶-619 = 2(7)₂₂₅1_<227> = 3 × 463 × 1123 × [17808014361522494050876642246180412423640124818509621634543501880490700548052326784471667912159191111549900584979025364524711576056996473229603786639188188186262997446401972615120443080493008466713580099700661524994296093_<221>] Free to factor

25×10²²⁷-619 = 2(7)₂₂₆1_<228> = 13 × 17 × 271 × 41281 × 213828707 × 518522041 × 1013333718179344004006058762815443127465008481855394777831804254036156754522507849795886344339672575059155822444914630827888480161874842850805251747127467629648446096697330089992972741538604688380844123_<202>

25×10²²⁸-619 = 2(7)₂₂₇1_<229> = 19 × 1115774792366954090239141243_<28> × 131028977719793391632804820342093300107193809465830485736968735518740340083822503585936273687935952761062633698538429052299669949668907207971203583303167817108274366389703810540107094899381639902634763_<201>

25×10²²⁹-619 = 2(7)₂₂₈1_<230> = 3 × 7³ × 3126603636542033353187_<22> × [8633945358025785019707334473506629773014104228166535911910403003261901493125949404324713422112085844382100073319533296112851989768439692362002374720652759068045892910249822158802424656975221092888254241477_<205>] Free to factor

25×10²³⁰-619 = 2(7)₂₂₉1_<231> = 127 × 2974137511_<10> × 300766191461_<12> × 80199867886133961716861947310005958782491629093_<47> × 30488079233604249425820626469055138201920459887651100527802415501606400603327138001005421583160650501670847443090883437385298045145531418313269202393295046038491_<161> (Dmitry Domanov / GMP-ECM B1=11000000, sigma=924741585 for P47 x P161 / June 10, 2013 2013 年 6 月 10 日)

25×10²³¹-619 = 2(7)₂₃₀1_<232> = 262889213330467_<15> × [10566343679860116135405847857510279259156701579239160630722988552689850837417284371759293384531526483255887016694194154827864762995345089130739922021865339780898520687509480815930557717404913683469120383964890837305113_<218>] Free to factor

25×10²³²-619 = 2(7)₂₃₁1_<233> = 3² × 271 × 2349959 × [4846468716652791838355241765215785609924364642697597183149441354368074329528609791112206643345268057407247554391138561713086201126168589064321028118651455480476716123439743464566833459223237050807293092962721198421902727771_<223>] Free to factor

25×10²³³-619 = 2(7)₂₃₂1_<234> = 13 × 1236616225225661991521_<22> × [17279023945866591364029870030319622537861172485798994845310257917591726076983677099010505370488092073283575690020350331026453660390862361832221088257078834849107049901090868439936755580720148553553712085215014327_<212>] Free to factor

25×10²³⁴-619 = 2(7)₂₃₃1_<235> = 3812838721726319_<16> × [728532723387811665758486141988521806562616632574064920125745732809600855621724392869609272537891864468748584309370470949636615035862845556101063225725673078300636737899813623651857328706714110882227869474028275807911109_<219>] Free to factor

25×10²³⁵-619 = 2(7)₂₃₄1_<236> = 3 × 7 × 26652650614963713338637393616055537096643812123838342932868793948113312702068856959000917600141726276401358614637_<113> × 49629259838369874322842581997404831258085804484906314797325286628980122800924811784359721405911530950190290718487424535323_<122> (matsui / Msieve 1.53 snfs for P113 x P122 / June 14, 2014 2014 年 6 月 14 日)

25×10²³⁶-619 = 2(7)₂₃₅1_<237> = 134342657 × [2067681137032876890158408715839063520812885052420675123150034004298260810620842326929545377219819150798675790503218778662221767563952362336988599070046513802222757718553815544810743007545085086249096426444638338348316110628791403_<229>] Free to factor

25×10²³⁷-619 = 2(7)₂₃₆1_<238> = 271 × 313 × 8725681 × 74259611066079291082356173_<26> × 15787653232541801388202134567457_<32> × 3201210922786777575722211746408326175329360693249547651549595748086817755401373285335408609187460835308655425161995954243437316608902117788680025466289003912368177872497_<169> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=4033246522 for P32 x P169 / April 22, 2013 2013 年 4 月 22 日)

25×10²³⁸-619 = 2(7)₂₃₇1_<239> = 3 × 149 × 179 × 844297 × 1512561267196486962403314818813_<31> × 274235423210869950531290937790937377_<36> × 991300149600597775974807670757893270891008451713000118080507080130582909855013154024999054615739600841808704181989244699829424148174564863146149580788420290416811_<162> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=1446752224 for P31 / April 22, 2013 2013 年 4 月 22 日) (Dmitry Domanov / GMP-ECM B1=3000000, sigma=328408207 for P36 x P162 / April 29, 2013 2013 年 4 月 29 日)

25×10²³⁹-619 = 2(7)₂₃₈1_<240> = 13 × 1069 × 145996954443839_<15> × 164946337413375490993_<21> × [830022697878271666440471919787007642391331130526101988476352996786025878036103318674245687437821624564963687888953967824651939520010651579370712152881502429861197113245689268649216843090753339099272509_<201>] Free to factor

25×10²⁴⁰-619 = 2(7)₂₃₉1_<241> = 1170233 × 27353299 × 373403399 × 2116610705947_<13> × 1933964959556339340142387_<25> × [56773751057571394927762010132568247118603005738105996347032022497984695656622466033402339880681823101978921241682715110861443686407195823268946596402453071403280896558644844919354183_<182>] Free to factor

25×10²⁴¹-619 = 2(7)₂₄₀1_<242> = 3³ × 7 × 70160639 × 142674576710748512959531512869457685241_<39> × 14682349793346602873290710688674491910144474678401696515810983655136620817390092646589666016375789923416137917615736004046997765543142105422457223129626914383192216163790004781905964214142055361_<194> (Dmitry Domanov / GMP-ECM B1=11000000, sigma=3679054576 for P39 x P194 / June 3, 2013 2013 年 6 月 3 日)

25×10²⁴²-619 = 2(7)₂₄₁1_<243> = 271 × 659 × 73659647 × 353074774763_<12> × 2517056934520979240573_<22> × 355659960331536714503178390111081101_<36> × 66806459278517464850717572677891394584364118338510037122125713087660368151907514468430812617449144797341267181132929985267154290548809718484710494832902222231363_<161> (Dmitry Domanov / GMP-ECM B1=3000000, sigma=2626778076 for P36 x P161 / April 29, 2013 2013 年 4 月 29 日)

25×10²⁴³-619 = 2(7)₂₄₂1_<244> = 17 × 29 × 250695744070452431069193919814308690986951173_<45> × 22475202776221809441714654500019436502157298167656465589482466715397341122137965274527343736509113468015152266381648421260974411235571430349032849284436145087024987101205917428851739135116528870539_<197> (Dmitry Domanov / GMP-ECM B1=3000000, sigma=3799521970 for P45 x P197 / April 29, 2013 2013 年 4 月 29 日)

25×10²⁴⁴-619 = 2(7)₂₄₃1_<245> = 3 × 751 × 3769 × 2847599921_<10> × 95781089821853_<14> × 671087627870087_<15> × 17871960311535475568846819661610400843537564781010606621811695221483214469278704237377172090366390534744093471910155922330208341938065275930014215957895714482455461693155997085762995757820529512602013_<200>

25×10²⁴⁵-619 = 2(7)₂₄₄1_<246> = 13 × 337 × 2967911445589277963_<19> × [21363544390693438041316670216575014346315006468020025981420752642278924269621473430555515003329570911767898649916859552207862198504427975004644806099364070100178414772173339246864714982055485473265399475108499815914417267157_<224>] Free to factor

25×10²⁴⁶-619 = 2(7)₂₄₅1_<247> = 19 × 163 × 41761039 × 131025219555346496747_<21> × 348384939360696359327_<21> × [470512028267255915941261084864702806369636557782332800673843641416459063436252055676659787044209708249450219023872044372801149496461048214078869697777631540750817284721467721833669729790107226073_<195>] Free to factor

25×10²⁴⁷-619 = 2(7)₂₄₆1_<248> = 3 × 7 × 23 × 59 × 197 × 271 × 577 × 2338627 × 13530880771611773558922894327035706128017910642860663150042983215571431554691046283597452087241065136219397114205000600709937233084344400602057139376654009849448305817138428211449987825238185738023246725893399646754949512302110491_<230>

25×10²⁴⁸-619 = 2(7)₂₄₇1_<249> = 6007627 × 919318999 × 32868633292934638285811_<23> × 67281996249496000253046689458569970643_<38> × [22743001955501695611850622070364501049440767305657711848356831620997565661171600239325103382195956567511267496637426872398602578035872421310133844319467218370932625955646799_<173>] (Dmitry Domanov / GMP-ECM B1=3000000, sigma=1502153175 for P38 / April 29, 2013 2013 年 4 月 29 日) Free to factor

25×10²⁴⁹-619 = 2(7)₂₄₈1_<250> = 40819 × 82249332871_<11> × 158405916470051_<15> × [5223136259395323506866600100646588094995313491344577018920139063679140618924326424672337376776749434345644559604895528068253608175914903390706749434870670510937763789140404554133278332175443430687450825227854381336547429_<220>] Free to factor

25×10²⁵⁰-619 = 2(7)₂₄₉1_<251> = 3² × 107 × 16273 × 110629 × 496371679 × 114028750321_<12> × 55004555291009884768291_<23> × [5146530892122154846045712485855261270587275171593319632281781032250314084512826074593983453417869380405899433496827539575601878274982796454598424279132721720723367181325260227129750472723089970729_<196>] Free to factor

25×10²⁵¹-619 = 2(7)₂₅₀1_<252> = 13 × 93127571 × 391131945997692458567183251_<27> × [586614214811978001449826046263894396182966886739127428140011279722012229382984113545203168124642493295974084124099156812426130955152023460680800283744908342446879478982593692527919758045038305124477459428740479297727_<216>] Free to factor

25×10²⁵²-619 = 2(7)₂₅₁1_<253> = 271 × 10250102501025010250102501025010250102501025010250102501025010250102501025010250102501025010250102501025010250102501025010250102501025010250102501025010250102501025010250102501025010250102501025010250102501025010250102501025010250102501025010250102501_<251>

25×10²⁵³-619 = 2(7)₂₅₂1_<254> = 3 × 7 × 599817107 × 2205257748261125789002799019453979580016798891918437316798220832923531057814180219356969342527857116871664601127742298205780835328445080095594458133304495350651530055062805588375376767557452727540749054947048636481705618895132231236531442827493_<244>

25×10²⁵⁴-619 = 2(7)₂₅₃1_<255> = 60661 × 7082495721233_<13> × 914543568478136625738226999_<27> × [706963859785165136623694131824201148371787253362803486769801289729478676087025452863078898081039848546228804169149456961214980397500377649002574968273428765044493051677008184639902756518003957677343780543354633_<210>] Free to factor

25×10²⁵⁵-619 = 2(7)₂₅₄1_<256> = 199 × 1559 × 1601 × 42579140147_<11> × 192475686377944491299_<21> × 39239284634976321332618370909794118901_<38> × 17390542517563452262308939291524159007644442212621963924575175175848185025167041143059465338990111222450660870349745094014725599194521752688124920918417273895644853998010776780727_<179> (ivelive / GMP-ECM 6.3 B1=3 for P38 x P179 / July 17, 2020 2020 年 7 月 17 日)

25×10²⁵⁶-619 = 2(7)₂₅₅1_<257> = 3 × 379 × 839 × 140929 × [206621116242033509280073644240878385380567250276869653700111515552815518981088128298046254057576045625887567514823421582616880745485433319701266913793922245537572873614843276896388126163838644383829126136593961699555078040178414944574526469585293_<246>] Free to factor

25×10²⁵⁷-619 = 2(7)₂₅₆1_<258> = 13 × 139 × 271 × 833783 × 117263117047_<12> × 2514248970980597_<16> × [2307529726185351565352001003960907837447950769736981348678365577410798760112332064574328881580238260528936752902423191679199862727837387584446739303237221736131728005298946581801031407476992650748281505864136794792751119_<220>] Free to factor

25×10²⁵⁸-619 = 2(7)₂₅₇1_<259> = 34637557 × 97437007 × 1967115892991504994669906584627_<31> × [418404516010589981290956898484738147887200073567907686521900000881258988866272939741275900616871824510842356612614851718537050802012040571274687702259592160095461817924019726450175591978175301171916478610131521227_<213>] (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=3575548142 for P31 / March 22, 2016 2016 年 3 月 22 日) Free to factor

25×10²⁵⁹-619 = 2(7)₂₅₈1_<260> = 3² × 7 × 17 × 317 × 47144682086149_<14> × 448845060826057139_<18> × 159289414785500221891972656751_<30> × [24273515966368211398713881912100837291219847935814407224565162552511952992042051198955780654000945877796141264046439631569613267726334515903938932375205470606638736514926539591370405709271203673_<194>] (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=1602641840 for P30 / March 22, 2016 2016 年 3 月 22 日) Free to factor

25×10²⁶⁰-619 = 2(7)₂₅₉1_<261> = 521503 × 958549 × 555682051965858644271092274127321318641741331154990388518011398482033451460795159157702756534093879333411171417416474679964208411977397641188035975931906069593069476616989174079726595497768239436773559167700182765256750399744569591341564272075159393_<249>

25×10²⁶¹-619 = 2(7)₂₆₀1_<262> = 34261 × 85331 × 110946487413923662624757_<24> × [8564008155982297675439984629881576877750665376464706620640899635177205915141471965345391655481818330728264594065750208647580647819187946641270525256676328039938383957026854246395408435955403241289808777153370857309469218598883633_<229>] Free to factor

25×10²⁶²-619 = 2(7)₂₆₁1_<263> = 3 × 271 × 827 × 4229 × 5197 × 3913092219335564761814081504663014484723_<40> × [480386682440913044296965514037973526564919631070287729184078648488107816147329322614007072411606595805357581745645602261233358404290838576381965420057565299510923705258042198173221595759596398307698618247589879_<210>] (ivelive / GMP-ECM B1=11, sigma=2321867756 for P40 / July 18, 2020 2020 年 7 月 18 日) Free to factor

25×10²⁶³-619 = 2(7)₂₆₂1_<264> = 13 × 3259 × 39041 × 220101857 × 763001069224015645837091168035313721788288592068676922950095740446272731391106694895808754904126467214167064626123040980443850363615242863233499702195610331691999389141114128351392250951132258795744919457800044653591554994077832614479629322000949_<246>

25×10²⁶⁴-619 = 2(7)₂₆₃1_<265> = 19 × 47 × 83 × 26479 × 17135814437927_<14> × 4473349273234829731_<19> × 18464128296220252518862851032490501426828865891971311952063724918234083732726749619157304399715589116379641958790549683707007983528020768336600019410104225734193843576368510143434553743171009591716252984505793760266169403783_<224>

25×10²⁶⁵-619 = 2(7)₂₆₄1_<266> = 3 × 7 × 1511 × 187631 × 92193799 × 27992063573_<11> × 12017342214130868973923_<23> × [150440265556444774275925609554844479366135957270172297721819221707440259012775012470811440068831885889804941577344663614585052966382005005973710906030563906432344615943446603502516354088468765251062740314273718305791_<216>] Free to factor

25×10²⁶⁶-619 = 2(7)₂₆₅1_<267> = 509887712026125637_<18> × [544782255438124765650677328324551020154493818508106718909694180043864386849430748254082217208351241857025257875839788801739541401983944164088963518145189349447341942489977816083180567443711686206098154276170025083461046325757267470354060342084492783_<249>] Free to factor

25×10²⁶⁷-619 = 2(7)₂₆₆1_<268> = 223 × 271 × 77899 × 28366309339_<11> × 422910218682188957869651993_<27> × [49185880355697948791538438907212344906250718656768005856089272199257523101568912490453700313769076444101671456704414815442983847925574722464570517732485456858272840366766858365597779597166282620129976250742285092475929019_<221>] Free to factor

25×10²⁶⁸-619 = 2(7)₂₆₇1_<269> = 3⁵ × 131 × 140780071 × [6198387883411762149957178117791711549500823176550626909209568267106466724530699656310028028176011651970970147966759221479674714602808262498309966555598375830049548680668830619281905730379454082813676425394140570722706764719209468364925212587704492289047397_<256>] Free to factor

25×10²⁶⁹-619 = 2(7)₂₆₈1_<270> = 13 × 23 × 217855213 × 646237069775503_<15> × [6598823126522135610580897777432171322571074390949498094831068893388286943709362322852632662250309473894860626475370234157087735131585589539594782458790464952538912156749181184742936628256471574443179926337193775910671122526512902486435667241611_<244>] Free to factor

25×10²⁷⁰-619 = 2(7)₂₆₉1_<271> = 58427761189120521071710276808997181293371759_<44> × [47542088234163093774817542242681934210306250292851107081173205500317847131337537201915037918169216727499429913176029973172914489964896490239469519271383548326209706527068517161485521571740512806151031749206955884038296787369669_<227>] (Dmitry Domanov / GMP-ECM B1=43000000, sigma=3258934975 for P44 / May 7, 2016 2016 年 5 月 7 日) Free to factor

25×10²⁷¹-619 = 2(7)₂₇₀1_<272> = 3 × 7² × 29 × 20063 × 284093 × 101088947 × 28482795883_<11> × 1897391058803_<13> × [209258265167240030627669608459895504520246182583362911762401707775353745413909337704869395235520411238497675458125947789791244766418843933445519987114744195715036571208662808946602582089421932529942763185493167145415487179743221_<228>] Free to factor

25×10²⁷²-619 = 2(7)₂₇₁1_<273> = 127 × 271 × 31063 × [259825092592498968950895095464113953393193690198053245132891227406596374120317082365784571670580121551933960222126712388925886267228449631574301274575348652699987275294736363844394722589487329027552847325032997716606472369082042060382266696770168182492856408657501_<264>] Free to factor

25×10²⁷³-619 = 2(7)₂₇₂1_<274> = 396700747 × 72461537488563187_<17> × 96633327921465832602043111987329619611990163584799118647031909488679906927674985339880865422284044173141912944527054697069895254723943477013543123319407411414834544167280614290836448135696061019645095621693940875442589302932482693099585484643938139_<248>

25×10²⁷⁴-619 = 2(7)₂₇₃1_<275> = 3 × 24044539 × 385087826356714897268741948400809816285488328940690410377976440274411551798071872339047933472929518809208995824759179589979215623941022918312522409319607219720838035583017801225436647350953963361878522988494778762830897246949058131630606819255684596791781254748084763_<267>

25×10²⁷⁵-619 = 2(7)₂₇₄1_<276> = 13 × 17 × 5492737 × 16256809 × 487543337 × 3317078011241249_<16> × 557960092760790607_<18> × [15599442177794488782677916888560166247067184526479624676304185354627581921311841565679323757745028946675925893353640606215940465243534593684124549362694964112349163903501765990706998992742572826604664772464721658905017_<218>] Free to factor

25×10²⁷⁶-619 = 2(7)₂₇₅1_<277> = 263 × 34570986011_<11> × 2156825607909059897903866316987_<31> × 141649469746773115866640759230787291578939695741248587706779064131021726338735601273017759118149583388373499386730634530729857735367256580572123752905795131643718352951875829926759338862757237063241984291359473803712766764319434558181_<234> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=2290587290 for P31 x P234 / March 23, 2016 2016 年 3 月 23 日)

25×10²⁷⁷-619 = 2(7)₂₇₆1_<278> = 3² × 7 × 271 × 661 × 1091 × 352872853709_<12> × 500983118004106054803791_<24> × 1546859576885624459044669_<25> × 3517143657514121083636340350193037317_<37> × 99575996025857934949781353168664466101_<38> × 23557242398019161338291546781391751370564091138053601164876881881164284435018351226642289628224540031364612458209394005132909148654571_<134> (ivelive / GMP-ECM B1=3000000, sigma=1393137324 for P37, B1=3000000, sigma=2605022686 for P38 x P134 / August 28, 2020 2020 年 8 月 28 日)

25×10²⁷⁸-619 = 2(7)₂₇₇1_<279> = 1627 × 3447878741267_<13> × 1891824641586799_<16> × 913994146836962049743803840613_<30> × 28637405565988830277784304643153531334331162244739358442710819142655796457488193470847394261236787646860880821772617418519259148342052755265433679644776883971820224908206022727445872864622044344392754021276962446920737_<218> (Makoto Kamada / GMP-ECM 6.4.4 B1=25e4, sigma=1665786388 for P30 x P218 / March 23, 2016 2016 年 3 月 23 日)

25×10²⁷⁹-619 = 2(7)₂₇₈1_<280> = 541 × 59034321361_<11> × 5479057774109483_<16> × 687933823920540138306934678633_<30> × [23075074721488875372184906366657125661410664990878573031465911161348439457771192507494633117096796236960707625304253848560592961671660904639479691302405527348778088078620239389741510890735015866725243850569416113343631389_<221>] (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=2043099964 for P30 / March 23, 2016 2016 年 3 月 23 日) Free to factor

25×10²⁸⁰-619 = 2(7)₂₇₉1_<281> = 3 × 36108463 × 94399263799_<11> × 129616931343332152259974883_<27> × 10637157969136481272929329136172739_<35> × [1970204425996146123003261379940463633106562105781289272092304212192554965955021488056407203829371351768667186709257925011170726694363369481294399707068793115308580632204577611071316703217482773686781753_<202>] (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=2783155279 for P35 / March 23, 2016 2016 年 3 月 23 日) Free to factor

25×10²⁸¹-619 = 2(7)₂₈₀1_<282> = 13 × 6569 × 124123 × 15993053 × 1638593564420423299486341673496999406848143622392953017595442436530014733506588911893022804466444272688049267950284643201947128301775844661085071251227430569219003422954360709147581097811330662969119478571868586761819313655195765915509851509857436785259306528225297_<265>

25×10²⁸²-619 = 2(7)₂₈₁1_<283> = 19 × 271 × 2813409764857017108302048618239_<31> × [191752757006846349891963466421111572695591032658044550022131442495204283596873234138586903450780448250001150998804036665349577561885450392445902343380105831228519501390661955201564659523906385799394460693523106139210740951299437012701934699178873561_<249>] (Makoto Kamada / GMP-ECM 6.4.4 B1=25e4, sigma=849253483 for P31 / March 23, 2016 2016 年 3 月 23 日) Free to factor

25×10²⁸³-619 = 2(7)₂₈₂1_<284> = 3 × 7 × 1111897 × 25162367 × [47278332829704091642209989022599472403257939982223765707766321219426834194411900970267754129604927250938203337316135704928639273363304531776717517852448826910166423153545106032321711603299179835127595028931567881217863842831004695919436884156270414405534480167708707049_<269>] Free to factor

25×10²⁸⁴-619 = 2(7)₂₈₃1_<285> = 2879 × 3994170588489575633_<19> × [24156233835407072580483219743255173594019488132720301567666052107628702532245812547015220385984262158723014559822243621058364819501658495918757747473083555643143109322733431796716425749837666297732520369343083530799268220984316777629224457381608975170477030003653_<263>] Free to factor

25×10²⁸⁵-619 = 2(7)₂₈₄1_<286> = 29537591 × [94042123400577175632832676766963757395712391636060563563825424279785639180181544858474673096319120194256118509386150609837402710931225832796512680325818641668434564544474116991388288157208818341948663917032969201103020817702356897614899528461132046204369807198487438524616911981_<278>] Free to factor

25×10²⁸⁶-619 = 2(7)₂₈₅1_<287> = 3² × [3086419753086419753086419753086419753086419753086419753086419753086419753086419753086419753086419753086419753086419753086419753086419753086419753086419753086419753086419753086419753086419753086419753086419753086419753086419753086419753086419753086419753086419753086419753086419753086419_<286>] Free to factor

25×10²⁸⁷-619 = 2(7)₂₈₆1_<288> = 13 × 271 × 7347881 × 98853217 × 6627842841229_<13> × 407474807349113454702643_<24> × [40193790968864913965639831322317666545404037861700416257354676186402202298495135423127293155508695883121321088810226617454929117477382319488823129877765890862529002155119299486116934876520694047970843395919650785081890856094333176183_<233>] Free to factor

25×10²⁸⁸-619 = 2(7)₂₈₇1_<289> = 1450903634078441_<16> × [1914515693898662640080390605477821732641336787256029905876317858840605487526445772711267359690501164473818649168320278063598513839128647984158738071816272123753215147104974325554495431573891558417373258880376201454839135208519810746360206099685416358335728059258251835822131_<274>] Free to factor

25×10²⁸⁹-619 = 2(7)₂₈₈1_<290> = 3 × 7 × 1087 × 793601 × 36981767 × 1628360655101_<13> × 2654826841332692730026244328391_<31> × [9591178989257003707710820797731919872766340980667249298744670187515909648807476291847803239193319989395513176494421264474511298620715814320382162131468621630946910089914882213168892677339786297511047502868644266679714754921966309_<229>] (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=977594679 for P31 / March 24, 2016 2016 年 3 月 24 日) Free to factor

25×10²⁹⁰-619 = 2(7)₂₈₉1_<291> = 3907 × 57884513 × 59723722402123560241_<20> × [20565763442829873974225333286464567081571965756014816344746973424955855850068739706224083588398437675432832494942453367633493406136838500138838990336251688210625597729738259332529157742949820886671587282777720591099338797723496589255791929332371268339838198441_<260>] Free to factor

25×10²⁹¹-619 = 2(7)₂₉₀1_<292> = 17² × 23 × 5387 × 12379806054596437_<17> × 19356640197223324283_<20> × 323728568252499850452098133399574005968120618650992598163052134550359763607244308923980694957769178833420033692977458701499369303957743754598402836054913806938590330044344483983300256261371320083373334667639815099864380887064618487254022813719551409_<249>

25×10²⁹²-619 = 2(7)₂₉₁1_<293> = 3 × 271 × 2521 × 145157354263_<12> × 1817457889510634827_<19> × 271747656710225777434172287602702747979_<39> × [189044871114953873370939072795811381116865130173780627087230853925086992204647032562121017065936130162632596619876411367578672026109757263214542060802804618542531895049079478498732584037873454028356159998986977978660113_<219>] (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=2512993319 for P39 / March 25, 2016 2016 年 3 月 25 日) Free to factor

25×10²⁹³-619 = 2(7)₂₉₂1_<294> = 13² × 479 × 569 × 601 × 1214715928046455278571273567453779806117_<40> × [8260642294148175238019317286990204490693950674132287479489542869963768730607052611950447253166123780954858554722866720085751348197333384435490775222420379704643318607205529444946607053079019431651134125686821507185773985814671625952441403010777_<244>] (ivelive / GMP-ECM 6.3 B1=3000000, sigma=1872206252 for P40 / July 16, 2020 2020 年 7 月 16 日) Free to factor

25×10²⁹⁴-619 = 2(7)₂₉₃1_<295> = 11972491506316619903691929203207_<32> × [232013342946389870295628111621756989959078436628070222376605350727540761671604480166282958851248206524894650162393285140826705706760856893727516298222310115342025238119404493015089572408332426997194259983627818967178947039565552040849284609948987949600337612675453_<264>] (Makoto Kamada / GMP-ECM 6.4.4 B1=25e4, sigma=2098285794 for P32 / March 25, 2016 2016 年 3 月 25 日) Free to factor

25×10²⁹⁵-619 = 2(7)₂₉₄1_<296> = 3³ × 7 × 18639592691_<11> × 93460089310675303502800658189_<29> × [84367093056469548830335127924440181269185499857856406816720804418797720619439851266252859363551268541532997194622524652450968060266832347651732041240840278353336165223518476301793337143078095955769327827480618787361079978529784392358078684545924584418961_<254>] Free to factor

25×10²⁹⁶-619 = 2(7)₂₉₅1_<297> = 75323 × 57839994943_<11> × [63759021581386584840193026966536456778269227295528051518614120035086506492363026672314703606800787021862625922399794843543455414924306284039771279141995489630449599106714714306619224564226061951952117703045486256570529221051025083093846535084941730348308322912646427823275488392239_<281>] Free to factor

25×10²⁹⁷-619 = 2(7)₂₉₆1_<298> = 271 × 42227 × [242738117816207882399945556753031238366472281010966976129609260665036612238857842198143960268314171052289062687439340351203024190707959605231309376110314493156061880082650969782959013193040022379289319688848959439460593957065627444585242262302557664551708865183472683946533026322045729278663_<291>] Free to factor

25×10²⁹⁸-619 = 2(7)₂₉₇1_<299> = 3 × 97 × 172166118349_<12> × [554442894680303834963956419953558354682056468121528091560796022130904482603102779526855967678712269834709528148964503916482191553046988122475750177552876996100479921869730301244282898941245328915191438723672217869961388746571773798809258750479114726086261847604758895977104391327039869_<285>] Free to factor

25×10²⁹⁹-619 = 2(7)₂₉₈1_<300> = 13 × 29 × 51189609714169368291217645286500254377_<38> × [14393762440324238777135030691543422345191448233047710752775232959279247584435593349297446121510075655288508188287971977344396252296981717682355958048031356003557272267451089089136880703711991644447309808698321157392036168916910106348370475299929542859746385099_<260>] (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=3782640417 for P38 / March 25, 2016 2016 年 3 月 25 日) Free to factor

25×10³⁰⁰-619 = 2(7)₂₉₉1_<301> = 19 × 293 × 7022403307_<10> × [71054323658781786943860382693904640938661368094299824572236474348031044269828724636280508952319617958909152459188930831277992942601369757593301219817704829563346018224442731462497022147790309543423465091677614233482187595516510255144054854180573575384804586390649176131861386657375527359_<287>] Free to factor

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4. Related links 関連リンク

A098960 - OEIS (The OEIS Foundation Inc.)