Factorization of 1811...11

Table of contents 目次

About 1811...11 1811...11 について
Prime numbers of the form 1811...11 1811...11 の形の素数
Factor table of 1811...11 1811...11 の素因数分解表
Related links 関連リンク

1. About 1811...11 1811...11 について

1.1. Classification 分類

Near-repdigit of the form ABAA...AA ABAA...AA の形のニアレプディジット (Near-repdigit)

1.2. Sequence 数列

181w = { 18, 181, 1811, 18111, 181111, 1811111, 18111111, 181111111, 1811111111, 18111111111, … }

2. Prime numbers of the form 1811...11 1811...11 の形の素数

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

163×10¹-19 = 181 is prime. は素数です。
163×10²-19 = 1811 is prime. は素数です。
163×10¹¹-19 = 18(1)₁₁_<13> is prime. は素数です。
163×10⁶²-19 = 18(1)₆₂_<64> is prime. は素数です。
163×10¹⁵⁷-19 = 18(1)₁₅₇_<159> is prime. は素数です。 (discovered by:発見: Makoto Kamada / August 24, 2004 2004 年 8 月 24 日) (certified by:証明: Robert Backstrom / APLOG.UB / August 8, 2009 2009 年 8 月 8 日)
163×10¹⁷⁰-19 = 18(1)₁₇₀_<172> is prime. は素数です。 (discovered by:発見: Makoto Kamada / August 24, 2004 2004 年 8 月 24 日) (certified by:証明: Robert Backstrom / APLOG.UB / August 8, 2009 2009 年 8 月 8 日)
163×10²⁵¹-19 = 18(1)₂₅₁_<253> is prime. は素数です。 (discovered by:発見: Makoto Kamada / August 24, 2004 2004 年 8 月 24 日) (certified by:証明: Erik Branger / Primo 3.0.9 / April 10, 2010 2010 年 4 月 10 日)
163×10⁵⁰⁰-19 = 18(1)₅₀₀_<502> is prime. は素数です。 (discovered by:発見: Makoto Kamada / PFGW / December 17, 2004 2004 年 12 月 17 日) (certified by:証明: Erik Branger / Primo 3.0.9 / April 10, 2010 2010 年 4 月 10 日)
163×10²²⁷⁵-19 = 18(1)₂₂₇₅_<2277> is prime. は素数です。 (discovered by:発見: Makoto Kamada / PFGW / December 17, 2004 2004 年 12 月 17 日) (certified by:証明: Ray Chandler / Primo 4.0.1 - LX64 / December 13, 2012 2012 年 12 月 13 日) [certificate証明]
163×10⁷⁵²⁵-19 = 18(1)₇₅₂₅_<7527> is PRP. はおそらく素数です。 (Makoto Kamada / PFGW / June 4, 2005 2005 年 6 月 4 日)
163×10¹²²³⁰-19 = 18(1)₁₂₂₃₀_<12232> is PRP. はおそらく素数です。 (Ray Chandler / srsieve, PFGW / October 25, 2010 2010 年 10 月 25 日)
163×10¹³⁶⁵⁸-19 = 18(1)₁₃₆₅₈_<13660> is PRP. はおそらく素数です。 (Ray Chandler / srsieve, PFGW / October 28, 2010 2010 年 10 月 28 日)
163×10⁵⁴⁷²⁷-19 = 18(1)₅₄₇₂₇_<54729> is PRP. はおそらく素数です。 (Serge Batalov / LLR / December 24, 2014 2014 年 12 月 24 日)
163×10¹⁸³²²⁷-19 = 18(1)₁₈₃₂₂₇_<183229> is PRP. はおそらく素数です。 (Serge Batalov / LLR / December 25, 2014 2014 年 12 月 25 日)
163×10²¹²⁷⁷⁹-19 = 18(1)₂₁₂₇₇₉_<212781> is PRP. はおそらく素数です。 (Serge Batalov / LLR / December 25, 2014 2014 年 12 月 25 日)

2.3. Range of search 捜索範囲

n≤11000 / Completed 終了 / Ray Chandler / October 15, 2010 2010 年 10 月 15 日
n≤20000 / Completed 終了 / Ray Chandler / December 12, 2010 2010 年 12 月 12 日
n≤30000 / Completed 終了 / Ray Chandler / July 11, 2011 2011 年 7 月 11 日
n≤110000 / Completed 終了 / Serge Batalov / December 24, 2014 2014 年 12 月 24 日
n≤250000 / Completed 終了 / Serge Batalov / December 25, 2014 2014 年 12 月 25 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。

163×10^3k-19 = 3×(163×10⁰-19×3+163×10³-19×3×k-1Σm=010^3m)
163×10^6k+4-19 = 7×(163×10⁴-19×7+163×10⁴×10⁶-19×7×k-1Σm=010^6m)
163×10^15k+12-19 = 31×(163×10¹²-19×31+163×10¹²×10¹⁵-19×31×k-1Σm=010^15m)
163×10^16k+15-19 = 17×(163×10¹⁵-19×17+163×10¹⁵×10¹⁶-19×17×k-1Σm=010^16m)
163×10^18k+12-19 = 19×(163×10¹²-19×19+163×10¹²×10¹⁸-19×19×k-1Σm=010^18m)
163×10^22k+14-19 = 23×(163×10¹⁴-19×23+163×10¹⁴×10²²-19×23×k-1Σm=010^22m)
163×10^28k+19-19 = 29×(163×10¹⁹-19×29+163×10¹⁹×10²⁸-19×29×k-1Σm=010^28m)
163×10^33k+22-19 = 67×(163×10²²-19×67+163×10²²×10³³-19×67×k-1Σm=010^33m)
163×10^46k+35-19 = 47×(163×10³⁵-19×47+163×10³⁵×10⁴⁶-19×47×k-1Σm=010^46m)
163×10^53k+41-19 = 107×(163×10⁴¹-19×107+163×10⁴¹×10⁵³-19×107×k-1Σm=010^53m)

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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 20.03%. 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 20.03% です。

3. Factor table of 1811...11 1811...11 の素因数分解表

3.2. Range of factorization 分解範囲

n≤100 / Completed 終了 / November 30, 2014 2014 年 11 月 30 日
n≤150 / Completed 終了 / December 15, 2014 2014 年 12 月 15 日
n≤200 / Completed 終了 / July 29, 2018 2018 年 7 月 29 日
n≤300 / Remaining 53 残り 53

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

n=205, 208, 214, 217, 227, 228, 229, 230, 233, 234, 235, 236, 237, 239, 242, 243, 244, 246, 248, 249, 250, 252, 254, 256, 257, 259, 261, 263, 266, 268, 270, 271, 272, 273, 274, 276, 277, 279, 281, 282, 283, 284, 285, 286, 287, 288, 289, 290, 293, 296, 298, 299, 300 (53/300)

3.4. Factor table 素因数分解表

163×10⁰-19 = 18 = 2 × 3²

163×10¹-19 = 181 = definitely prime number 素数

163×10²-19 = 1811 = definitely prime number 素数

163×10³-19 = 18111 = 3 × 6037

163×10⁴-19 = 181111 = 7 × 25873

163×10⁵-19 = 1811111 = 691 × 2621

163×10⁶-19 = 18111111 = 3 × 683 × 8839

163×10⁷-19 = 181111111 = 541 × 334771

163×10⁸-19 = 1811111111_<10> = 6763 × 267797

163×10⁹-19 = 18111111111_<11> = 3³ × 4549 × 147457

163×10¹⁰-19 = 181111111111_<12> = 7 × 25873015873_<11>

163×10¹¹-19 = 1811111111111_<13> = definitely prime number 素数

163×10¹²-19 = 18111111111111_<14> = 3 × 19 × 31 × 10249638433_<11>

163×10¹³-19 = 181111111111111_<15> = 229 × 8111 × 97506869

163×10¹⁴-19 = 1811111111111111_<16> = 23 × 40361 × 1950991337_<10>

163×10¹⁵-19 = 18111111111111111_<17> = 3 × 17 × 367 × 1559 × 620672837

163×10¹⁶-19 = 181111111111111111_<18> = 7 × 219547 × 117847275859_<12>

163×10¹⁷-19 = 1811111111111111111_<19> = 24943 × 72609995233577_<14>

163×10¹⁸-19 = 18111111111111111111_<20> = 3² × 59 × 18018943 × 1892872067_<10>

163×10¹⁹-19 = 181111111111111111111_<21> = 29 × 6245210727969348659_<19>

163×10²⁰-19 = 1811111111111111111111_<22> = 53646247 × 33760257471713_<14>

163×10²¹-19 = 18111111111111111111111_<23> = 3 × 161896639 × 37289452544083_<14>

163×10²²-19 = 181111111111111111111111_<24> = 7 × 67 × 97 × 643 × 6191409725916889_<16>

163×10²³-19 = 1811111111111111111111111_<25> = 69127 × 4012871 × 6528932617783_<13>

163×10²⁴-19 = 18111111111111111111111111_<26> = 3 × 599 × 39839 × 651811 × 388120787447_<12>

163×10²⁵-19 = 181111111111111111111111111_<27> = 170063 × 10511374763_<11> × 101315464219_<12>

163×10²⁶-19 = 1811111111111111111111111111_<28> = 26765441 × 190718701 × 354794935171_<12>

163×10²⁷-19 = 18111111111111111111111111111_<29> = 3² × 31² × 2094012152978507470356239_<25>

163×10²⁸-19 = 181111111111111111111111111111_<30> = 7 × 118992311 × 217434350636453081543_<21>

163×10²⁹-19 = 1811111111111111111111111111111_<31> = 261189714151967_<15> × 6934082825548633_<16>

163×10³⁰-19 = 18111111111111111111111111111111_<32> = 3 × 19 × 72328757 × 4392980117479441120739_<22>

163×10³¹-19 = 181111111111111111111111111111111_<33> = 17 × 10653594771241830065359477124183_<32>

163×10³²-19 = 1811111111111111111111111111111111_<34> = 1033 × 2617 × 1017703 × 658294150546220115617_<21>

163×10³³-19 = 18111111111111111111111111111111111_<35> = 3 × 6037037037037037037037037037037037_<34>

163×10³⁴-19 = 181111111111111111111111111111111111_<36> = 7² × 311 × 1575307391908409_<16> × 7544375829756361_<16>

163×10³⁵-19 = 1811111111111111111111111111111111111_<37> = 47 × 677 × 2157628575493_<13> × 26380430780027248433_<20>

163×10³⁶-19 = 18111111111111111111111111111111111111_<38> = 3³ × 23 × 14419 × 74441 × 27171033278905181490897929_<26>

163×10³⁷-19 = 181111111111111111111111111111111111111_<39> = 78839 × 3209673407_<10> × 702704506877_<12> × 1018521978491_<13>

163×10³⁸-19 = 1811111111111111111111111111111111111111_<40> = 48476101 × 1685838960107089_<16> × 22161610977609899_<17>

163×10³⁹-19 = 18111111111111111111111111111111111111111_<41> = 3 × 109 × 1531 × 36176133827725699680828846272071603_<35>

163×10⁴⁰-19 = 181111111111111111111111111111111111111111_<42> = 7 × 57803 × 1157591 × 386670940097371499131566062101_<30>

163×10⁴¹-19 = 1811111111111111111111111111111111111111111_<43> = 107 × 30600673 × 553133980630392748121350603058101_<33>

163×10⁴²-19 = 18111111111111111111111111111111111111111111_<44> = 3 × 31 × 61 × 3103829 × 18605927 × 31137221 × 469807027 × 3779060587_<10>

163×10⁴³-19 = 181111111111111111111111111111111111111111111_<45> = 738839 × 4865753807_<10> × 50378490674948556897333562207_<29>

163×10⁴⁴-19 = 1811111111111111111111111111111111111111111111_<46> = 10421112473_<11> × 173792492481345768804189271426080607_<36>

163×10⁴⁵-19 = 18111111111111111111111111111111111111111111111_<47> = 3² × 1889 × 2707 × 102846967 × 3826404539891291184606381301619_<31>

163×10⁴⁶-19 = 181111111111111111111111111111111111111111111111_<48> = 7 × 25873015873015873015873015873015873015873015873_<47>

163×10⁴⁷-19 = 1811111111111111111111111111111111111111111111111_<49> = 17 × 29 × 5877761213459_<13> × 11234575427140441_<17> × 55632627588578233_<17>

163×10⁴⁸-19 = 18111111111111111111111111111111111111111111111111_<50> = 3 × 19 × 740549 × 2557861 × 167741104851166185652561184899284407_<36>

163×10⁴⁹-19 = 181111111111111111111111111111111111111111111111111_<51> = 6599 × 1157033 × 7608487 × 11005367 × 74133821389_<11> × 3821219637022493_<16>

163×10⁵⁰-19 = 18(1)₅₀_<52> = 113 × 16027531956735496558505408062930186823992133726647_<50>

163×10⁵¹-19 = 18(1)₅₁_<53> = 3 × 487603 × 12381049823395338086593062464826994577631878879_<47>

163×10⁵²-19 = 18(1)₅₂_<54> = 7 × 3581 × 43787 × 119045321 × 37529927907259897_<17> × 36932395884245690207_<20>

163×10⁵³-19 = 18(1)₅₃_<55> = 349 × 5189430117796879974530404329831263928685132123527539_<52>

163×10⁵⁴-19 = 18(1)₅₄_<56> = 3² × 26557 × 75774585947672767218147594947183254095430420567547_<50>

163×10⁵⁵-19 = 18(1)₅₅_<57> = 67 × 7127 × 1949923124074486469_<19> × 194511840787248316018154324410591_<33>

163×10⁵⁶-19 = 18(1)₅₆_<58> = 8537 × 1094897 × 527871446627179_<15> × 367061112670657316138273257094381_<33>

163×10⁵⁷-19 = 18(1)₅₇_<59> = 3 × 31 × 18839 × 55987 × 13079378327901421_<17> × 14116596496957383614709954167459_<32>

163×10⁵⁸-19 = 18(1)₅₈_<60> = 7 × 23 × 727 × 2141 × 722716784190103727961921647051793954581665336803493_<51>

163×10⁵⁹-19 = 18(1)₅₉_<61> = 11205940129_<11> × 380290835080157_<15> × 424992179090618459147193653130624787_<36>

163×10⁶⁰-19 = 18(1)₆₀_<62> = 3 × 313 × 19287658265294048041651875517690214175837179032067210980949_<59>

163×10⁶¹-19 = 18(1)₆₁_<63> = 6791 × 484369 × 529270135567_<12> × 104029769211286469331660573333092215134527_<42>

163×10⁶²-19 = 18(1)₆₂_<64> = definitely prime number 素数

163×10⁶³-19 = 18(1)₆₃_<65> = 3⁴ × 17 × 44741 × 293971662174193528827771062148453514368369069006516617723_<57>

163×10⁶⁴-19 = 18(1)₆₄_<66> = 7 × 113977009 × 1603111534449868626511403_<25> × 141600915126492795839826337768499_<33>

163×10⁶⁵-19 = 18(1)₆₅_<67> = 172437579934561692618983_<24> × 10502995413171591444159941000407352879094817_<44>

163×10⁶⁶-19 = 18(1)₆₆_<68> = 3 × 19 × 578478220450877391539029_<24> × 549266645121660824336464786705338167517187_<42>

163×10⁶⁷-19 = 18(1)₆₇_<69> = 1171350899_<10> × 37356152245377751_<17> × 4139004923952687171247386209450502203221739_<43>

163×10⁶⁸-19 = 18(1)₆₈_<70> = 18229 × 117478183 × 42468346715485508915249_<23> × 19914053745949276303216946738926477_<35>

163×10⁶⁹-19 = 18(1)₆₉_<71> = 3 × 191² × 197 × 773 × 17341 × 1117072559873_<13> × 5393904970079777_<16> × 10400460594143492404427056697_<29>

163×10⁷⁰-19 = 18(1)₇₀_<72> = 7 × 33563 × 2075164228547_<13> × 371478608032825509152669132992146173746576173170300593_<54>

163×10⁷¹-19 = 18(1)₇₁_<73> = 309629 × 5721631 × 14371032320355743_<17> × 71137017492821810678882955843805562132250323_<44>

163×10⁷²-19 = 18(1)₇₂_<74> = 3² × 31 × 88019 × 16837217 × 43802021333094928766823063817091028923377193402951698045483_<59>

163×10⁷³-19 = 18(1)₇₃_<75> = 245627 × 254753 × 319317952584006911_<18> × 9064134641077053078282773156652964610257710971_<46>

163×10⁷⁴-19 = 18(1)₇₄_<76> = 594607976356963_<15> × 14436377902942083325553_<23> × 210987206524662377530257029552648232349_<39>

163×10⁷⁵-19 = 18(1)₇₅_<77> = 3 × 29 × 5743 × 152576257 × 2649875059207_<13> × 89655032416414754520396748717082826627759446045129_<50>

163×10⁷⁶-19 = 18(1)₇₆_<78> = 7² × 59 × 1277 × 20976262278458659_<17> × 201500572644733445997737687_<27> × 11606511785027057734741054181_<29>

163×10⁷⁷-19 = 18(1)₇₇_<79> = 167 × 31652222595448284692062083721_<29> × 342629231818928791859808821634139200284073541273_<48>

163×10⁷⁸-19 = 18(1)₇₈_<80> = 3 × 823 × 2833 × 2107153141349380028836499131_<28> × 1228800361867966109296278278187180477744863153_<46>

163×10⁷⁹-19 = 18(1)₇₉_<81> = 17 × 5171 × 49409910023_<11> × 2324737788543334993_<19> × 17936330496455420013960254108358199222594590107_<47>

163×10⁸⁰-19 = 18(1)₈₀_<82> = 23 × 78743961352657004830917874396135265700483091787439613526570048309178743961352657_<80>

163×10⁸¹-19 = 18(1)₈₁_<83> = 3² × 47 × 2648417059601174021548630579_<28> × 16166587266036047539459654166074269418281087622589083_<53>

163×10⁸²-19 = 18(1)₈₂_<84> = 7 × 850713233 × 43827192917_<11> × 3960282630128051_<16> × 175224177521053883293718391378648205575091909343_<48>

163×10⁸³-19 = 18(1)₈₃_<85> = 857 × 1515540026728427761_<19> × 629035150580410266991_<21> × 2216776697405948528887706397212124284818273_<43>

163×10⁸⁴-19 = 18(1)₈₄_<86> = 3 × 19 × 13143233 × 1132473015799_<13> × 97502572681249574609400294121_<29> × 218939486236169856644272729677507089_<36>

163×10⁸⁵-19 = 18(1)₈₅_<87> = 467 × 4933 × 62861 × 90513439 × 12655917502493595663986957368973_<32> × 1091764861047472604658911199599173103_<37> (Makoto Kamada / Msieve v. 1.53 (SVN 975M) for P32 x P37 / November 30, 2014 2014 年 11 月 30 日)

163×10⁸⁶-19 = 18(1)₈₆_<88> = 67043 × 471797771442303347221_<21> × 57257946736415730050609922127945147541463871305925173052024537_<62>

163×10⁸⁷-19 = 18(1)₈₇_<89> = 3 × 31 × 194743130227001194743130227001194743130227001194743130227001194743130227001194743130227_<87>

163×10⁸⁸-19 = 18(1)₈₈_<90> = 7 × 67 × 110301399527687_<15> × 3500992894638932423927514309457184930756573494519812093333889091246306237_<73>

163×10⁸⁹-19 = 18(1)₈₉_<91> = 288877 × 213403481 × 950058169 × 3579223331_<10> × 39614622689899_<14> × 1209325840979584061273_<22> × 180340296476093881353451_<24>

163×10⁹⁰-19 = 18(1)₉₀_<92> = 3³ × 28824534227_<11> × 95122973080501050400370819_<26> × 244643463607127127547259512623474651668178182016860461_<54>

163×10⁹¹-19 = 18(1)₉₁_<93> = 34171 × 5300140795151184077466597732320128504027131518278982503032135761643238743704050543183141_<88>

163×10⁹²-19 = 18(1)₉₂_<94> = 3359 × 277872970709_<12> × 99191090434428158249855115165883_<32> × 19562129177858492309506963713131829371237221007_<47> (Makoto Kamada / Msieve v. 1.53 (SVN 975M) for P32 x P47 / November 30, 2014 2014 年 11 月 30 日)

163×10⁹³-19 = 18(1)₉₃_<95> = 3 × 6037037037037037037037037037037037037037037037037037037037037037037037037037037037037037037037_<94>

163×10⁹⁴-19 = 18(1)₉₄_<96> = 7 × 107 × 13883 × 16988077 × 1025264057847432688828944530163127117679402316748525216933903857539695245319630429_<82>

163×10⁹⁵-19 = 18(1)₉₅_<97> = 17 × 8703060059_<10> × 12241205620803162224115219246912250379941578222654264225583970349647060245714182778037_<86>

163×10⁹⁶-19 = 18(1)₉₆_<98> = 3 × 373 × 245321 × 10600207 × 12989148700879376113591_<23> × 9821503637908275247485871_<25> × 48787354083670254583086783986646007_<35>

163×10⁹⁷-19 = 18(1)₉₇_<99> = 44776839103_<11> × 5902322204391698255352369175595155589149_<40> × 685281091453618187152847212990798881950072860813_<48> (Makoto Kamada / Msieve v. 1.53 (SVN 975M) for P40 x P48 / November 30, 2014 2014 年 11 月 30 日)

163×10⁹⁸-19 = 18(1)₉₈_<100> = 1979 × 117571 × 51145021 × 73055279873_<11> × 199413015452034787203297347_<27> × 10446976498896720742343887319293749037784161729_<47>

163×10⁹⁹-19 = 18(1)₉₉_<101> = 3² × 63331 × 270709 × 14221950718016319914902590416714130032730289_<44> × 8253238129829976599502678618642852587019340609_<46> (Makoto Kamada / Msieve v. 1.53 (SVN 975M) for P44 x P46 / November 30, 2014 2014 年 11 月 30 日)

163×10¹⁰⁰-19 = 18(1)₁₀₀_<102> = 7 × 25873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873_<101>

163×10¹⁰¹-19 = 18(1)₁₀₁_<103> = 269 × 820163 × 152707421929609321_<18> × 53756687137981922753990616585276987616372397283418890509139894940045411791353_<77>

163×10¹⁰²-19 = 18(1)₁₀₂_<104> = 3 × 19 × 23 × 31 × 61 × 71631496427_<11> × 376940356187_<12> × 24130889867266907_<17> × 11212459215541529561619747183770628690324680869390664498977_<59>

163×10¹⁰³-19 = 18(1)₁₀₃_<105> = 29 × 6245210727969348659003831417624521072796934865900383141762452107279693486590038314176245210727969348659_<103>

163×10¹⁰⁴-19 = 18(1)₁₀₄_<106> = 18853183 × 584343677 × 271769966105689_<15> × 604909775185289322609210034697098922228672878387517777871113015515319663989_<75>

163×10¹⁰⁵-19 = 18(1)₁₀₅_<107> = 3 × 131 × 797 × 384127979 × 4681480949_<10> × 4308464025059_<13> × 648630670610574606527_<21> × 11505753619609579839812388429944260671992052185297_<50>

163×10¹⁰⁶-19 = 18(1)₁₀₆_<108> = 7 × 39371179 × 4027103999_<10> × 12271598683_<11> × 905966104753793_<15> × 208257410343977273_<18> × 3141721944442682036351_<22> × 22433368301628904928312449_<26>

163×10¹⁰⁷-19 = 18(1)₁₀₇_<109> = 2729 × 823230644003_<12> × 1406093749028181233_<19> × 573331434048206601233518716493777965754834993640243268580797011996615326741_<75>

163×10¹⁰⁸-19 = 18(1)₁₀₈_<110> = 3² × 123911417162116946841677227842484963_<36> × 16240195819724462650666372699381285179876643440292494862390052763637031333_<74> (Dmitry Domanov / Msieve 1.50 snfs for P36 x P74 / December 6, 2014 2014 年 12 月 6 日)

163×10¹⁰⁹-19 = 18(1)₁₀₉_<111> = 345827546881760861_<18> × 118712971677899859187_<21> × 14454673727819898235879981_<26> × 305196143259416570468156411020639970072065386533_<48>

163×10¹¹⁰-19 = 18(1)₁₁₀_<112> = 2042303 × 161073586343_<12> × 767899804040573757661384035785270601940769_<42> × 7169618289493685185645461999369673232909715885859711_<52> (Makoto Kamada / Msieve v. 1.53 (SVN 975M) for P42 x P52 / November 30, 2014 2014 年 11 月 30 日)

163×10¹¹¹-19 = 18(1)₁₁₁_<113> = 3 × 17 × 54426294367141_<14> × 6524784202880784150925199197247167445482657901370367331251509217937350344940554355817640709924121_<97>

163×10¹¹²-19 = 18(1)₁₁₂_<114> = 7 × 3305608476169_<13> × 3507330864223_<13> × 6180250197249736948200327541870937_<34> × 361087826688697106302119695250267748375572865526698367_<54> (Makoto Kamada / Msieve v. 1.53 (SVN 975M) for P34 x P54 / November 30, 2014 2014 年 11 月 30 日)

163×10¹¹³-19 = 18(1)₁₁₃_<115> = 907 × 1065821 × 68295608273_<11> × 893381506723891475620549251844762277_<36> × 30706039152871604895339231687245449378509470538680751675253_<59> (KTakahashi / Msieve 1.51 snfs for P36 x P59 / December 6, 2014 2014 年 12 月 6 日)

163×10¹¹⁴-19 = 18(1)₁₁₄_<116> = 3 × 443 × 5710337 × 5093211551_<10> × 7120655438672696935900153705784258551810099_<43> × 65803150670148381501493090102450772259613963126830643_<53> (KTakahashi / Msieve 1.51 snfs for P43 x P53 / December 6, 2014 2014 年 12 月 6 日)

163×10¹¹⁵-19 = 18(1)₁₁₅_<117> = 2711 × 753272404639_<12> × 43098582509516851513654501003_<29> × 2057787538582202052934754047688706623771482723722374594009848314881789453_<73>

163×10¹¹⁶-19 = 18(1)₁₁₆_<118> = 50194253391521_<14> × 438458340083675437_<18> × 5329716368805293632301911042854670597_<37> × 15440404124578332611318056076740852432075077602119_<50> (Makoto Kamada / Msieve v. 1.53 (SVN 975M) for P37 x P50 / November 30, 2014 2014 年 11 月 30 日)

163×10¹¹⁷-19 = 18(1)₁₁₇_<119> = 3³ × 31 × 233 × 257 × 2129 × 6263 × 21178341313187462704574602948552016478617_<41> × 1279618694628188782681071494469846827695821150100552610370397357_<64> (KTakahashi / Msieve 1.51 snfs for P41 x P64 / December 6, 2014 2014 年 12 月 6 日)

163×10¹¹⁸-19 = 18(1)₁₁₈_<120> = 7² × 97 × 38104588914603642144142880519905556724407976248918811510858638988241344647824765645089650980667180961731771746499287_<116>

163×10¹¹⁹-19 = 18(1)₁₁₉_<121> = 2341 × 1674703 × 14527905199_<11> × 33326408119_<11> × 311557642943_<12> × 3062499085876378817050352001568273257199175422680343048486918199098333300545379_<79>

163×10¹²⁰-19 = 18(1)₁₂₀_<122> = 3 × 19 × 1601 × 64416607 × 4395421249_<10> × 18290003302579_<14> × 640261075784052607_<18> × 5643955229537136031273029364769_<31> × 10605377073077897700666860444755467973_<38> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=2807216110 for P31 x P38 / November 23, 2014 2014 年 11 月 23 日)

163×10¹²¹-19 = 18(1)₁₂₁_<123> = 67 × 3343 × 1023137616217_<13> × 153303207294121_<15> × 38205150698467979_<17> × 1089259573808189179125665262707_<31> × 123878323682976922296522210570394448888292211_<45> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=2436683019 for P31 x P45 / November 23, 2014 2014 年 11 月 23 日)

163×10¹²²-19 = 18(1)₁₂₂_<124> = 11299 × 36151 × 581133529643_<12> × 7629724168763626256696681885393294431317704028157542501722299423185970332466514532814024480350703110673_<103>

163×10¹²³-19 = 18(1)₁₂₃_<125> = 3 × 283 × 172603 × 4440100103966084695501828063_<28> × 27835325438511584269160616977403094834477596137818681417283445590176275523020747936421451_<89>

163×10¹²⁴-19 = 18(1)₁₂₄_<126> = 7 × 23 × 453191956034881206113_<21> × 2482201457085887911612060908907860734853199734140206972753283661270540846155875668440925072068574160327_<103>

163×10¹²⁵-19 = 18(1)₁₂₅_<127> = 10103 × 13535903808715751416819518026554007_<35> × 13243643526903231226058260795993496943898553558352860806153925781256862286199588846313591_<89> (Jo Yeong Uk / GGNFS/Msieve v1.39 snfs for P35 x P89 / December 7, 2014 2014 年 12 月 7 日)

163×10¹²⁶-19 = 18(1)₁₂₆_<128> = 3² × 28074429694373_<14> × 71678951306201712015982383874614505635881234026472473023354283300535228010151080897129169865932896148837890218723_<113>

163×10¹²⁷-19 = 18(1)₁₂₇_<129> = 17 × 47 × 89371 × 576135757276894091_<18> × 3921853368179444544309757539624404171784709890523_<49> × 1122497845413392637806096970928556038729224904933307363_<55> (Jo Yeong Uk / GGNFS/Msieve v1.39 snfs for P49 x P55 / December 9, 2014 2014 年 12 月 9 日)

163×10¹²⁸-19 = 18(1)₁₂₈_<130> = 6490869017_<10> × 26778685937797_<14> × 15458778034234863400799_<23> × 10153780079986078507148174587_<29> × 66381960350821721994655763421056560197506700983681158103_<56>

163×10¹²⁹-19 = 18(1)₁₂₉_<131> = 3 × 263 × 389 × 643 × 478168211797_<12> × 191922908388096269318743313181595477399627492057544340099089828040676614929599175318943200926729554230916125521_<111>

163×10¹³⁰-19 = 18(1)₁₃₀_<132> = 7 × 479 × 991 × 20992703072341699_<17> × 2586774627418249889_<19> × 32335041811676145208386572659_<29> × 31041128717765038857040331783115005066315295675177114644099593_<62>

163×10¹³¹-19 = 18(1)₁₃₁_<133> = 29 × 193 × 1169542328729_<13> × 181474871292139759_<18> × 6816741058125598651_<19> × 223655997819866633183137712744004752439933738535307555557976085673160953512816383_<81>

163×10¹³²-19 = 18(1)₁₃₂_<134> = 3 × 31 × 52081 × 2314156902041_<13> × 41742845794477_<14> × 1978818709442173166045506010927046402743641651171_<49> × 19561491683709155859635543957644256593395944872892461_<53> (Dmitry Domanov / Msieve 1.50 snfs for P49 x P53 / December 8, 2014 2014 年 12 月 8 日)

163×10¹³³-19 = 18(1)₁₃₃_<135> = 11353 × 1345107374609_<13> × 6742424456271017284361_<22> × 12855330178563369325649941_<26> × 13767601076772535973813087513_<29> × 9938478554963080452477492192616378680184211_<43>

163×10¹³⁴-19 = 18(1)₁₃₄_<136> = 59 × 1013 × 882253 × 12877331 × 7165475913265708579260209272104841_<34> × 20638664469560360347655570188264135944311_<41> × 18035907699710697738821491180593462430968281_<44> (Ignacio Santos / GMP-ECM 7.0 B1=11000000, sigma=1:1036670865 for P44 / December 9, 2014 2014 年 12 月 9 日) (Serge Batalov / yafu for P34 x P41 / December 10, 2014 2014 年 12 月 10 日)

163×10¹³⁵-19 = 18(1)₁₃₅_<137> = 3² × 2012345679012345679012345679012345679012345679012345679012345679012345679012345679012345679012345679012345679012345679012345679012345679_<136>

163×10¹³⁶-19 = 18(1)₁₃₆_<138> = 7 × 34487 × 52951 × 360683424424633_<15> × 39281791597794065456685123868256057644012108993941391725373816984632409870382552493646018234518260891316616175513_<113>

163×10¹³⁷-19 = 18(1)₁₃₇_<139> = 4129 × 24419 × 88937 × 149750428879_<12> × 1348719965393800306028295302537084610104753334016770919278912546270615491719253679656045855679837343412029035160907_<115>

163×10¹³⁸-19 = 18(1)₁₃₈_<140> = 3 × 19 × 258936653 × 46111553165253663846731021987935217807406040671223_<50> × 26611353160172403492799678012889014366293695802883485210801581697354422181353117_<80> (Dmitry Domanov / Msieve 1.50 snfs for P50 x P80 / December 12, 2014 2014 年 12 月 12 日)

163×10¹³⁹-19 = 18(1)₁₃₉_<141> = 16981 × 672053071 × 21648415651_<11> × 383584506329_<12> × 133249870471357_<15> × 24105649592593300662241723176555336503538871_<44> × 594984228039934952620063634207525724302040751997_<48> (Makoto Kamada / Msieve v. 1.53 (SVN 975M) for P44 x P48 / November 30, 2014 2014 年 11 月 30 日)

163×10¹⁴⁰-19 = 18(1)₁₄₀_<142> = 33617 × 60811 × 139187 × 107797939554581_<15> × 59046595410185298510524832766454952361827344196997547766294506323320389490013322220511176673120704750677094507499_<113>

163×10¹⁴¹-19 = 18(1)₁₄₁_<143> = 3 × 149 × 3630203 × 1117362415900789_<16> × 9988783526202989776812132671832312436787481626235665854171064923865209419179683817140544629315385857136586742767420239_<118>

163×10¹⁴²-19 = 18(1)₁₄₂_<144> = 7 × 56034959147_<11> × 461729896244620760192110859307946967492290155002151785826357138166932070126686477354127462550945720831648186868856857792898803054659_<132>

163×10¹⁴³-19 = 18(1)₁₄₃_<145> = 17 × 79353126620273629464497858464951594612099635282971_<50> × 1342555136134986712520229431091407060625055945896291673119200548157230689384782632047756256373_<94> (Serge Batalov / Msieve v. 1.52 for P50 x P94 / December 8, 2014 2014 年 12 月 8 日)

163×10¹⁴⁴-19 = 18(1)₁₄₄_<146> = 3⁵ × 5441 × 41057 × 1695281639_<10> × 9891953854067577145003048860661699_<34> × 19895229016526411255852558746049099400676549955005183452566973492988722643656035381707022761_<92> (Cyp / yafu v1.34.3 for P34 x P92 / December 14, 2014 2014 年 12 月 14 日)

163×10¹⁴⁵-19 = 18(1)₁₄₅_<147> = 1413571 × 2218553190989_<13> × 116526478873418233_<18> × 152858793823428101_<18> × 4767143902964154073601731_<25> × 680118062325080495945847059805556278172804667887199762731253238688903_<69>

163×10¹⁴⁶-19 = 18(1)₁₄₆_<148> = 23 × 73379 × 91054942463585049923289030329509_<32> × 1632810159626774911060418447008570708107226014387106651_<55> × 7217823397777202874691949431377089331387514817971383437_<55> (Serge Batalov / GMP-ECM B1=3000000, sigma=1511832029 for P32 / December 11, 2014 2014 年 12 月 11 日) (Dmitry Domanov / Msieve 1.50 snfs for P55(1632...) x P55(7217...) / December 15, 2014 2014 年 12 月 15 日)

163×10¹⁴⁷-19 = 18(1)₁₄₇_<149> = 3 × 31 × 107 × 109 × 17807 × 42083 × 22282012831147662191271157584516254617051924258454684880088149083654720410922020576024268907176894800146964519469868361493134611840209_<134>

163×10¹⁴⁸-19 = 18(1)₁₄₈_<150> = 7 × 25873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873_<149>

163×10¹⁴⁹-19 = 18(1)₁₄₉_<151> = 1657 × 164447 × 17839072381951_<14> × 372584139767004188082616628777104659644590541302088468612046727131279376230944460577805670335825438458843882457872643855276756959_<129>

163×10¹⁵⁰-19 = 18(1)₁₅₀_<152> = 3 × 6037037037037037037037037037037037037037037037037037037037037037037037037037037037037037037037037037037037037037037037037037037037037037037037037037037_<151>

163×10¹⁵¹-19 = 18(1)₁₅₁_<153> = 3089 × 26921 × 20814911650681_<14> × 76098983494337_<14> × 1374936278184532867023028943619204733458749929409017455345415605211309709485271696651301909985207550629491089711524727_<118>

163×10¹⁵²-19 = 18(1)₁₅₂_<154> = 61843 × 197677 × 142915386283_<12> × 340385945743_<12> × 3045424216792848719832349380065518979242023392154213674217736832622398919772022246120868399850530583497323950215637334429_<121>

163×10¹⁵³-19 = 18(1)₁₅₃_<155> = 3² × 179 × 381555734603_<12> × 29463990740569240294436391753445825723703920692508603031152903376845100376231049935549214407023860421866530869837520543758696668280070008767_<140>

163×10¹⁵⁴-19 = 18(1)₁₅₄_<156> = 7 × 67 × 952753731947913259409167416693199_<33> × 431443760180990665681709671118786688209117_<42> × 939436438329216726661558429707464117793337330074751052582220617478514148007593_<78> (Serge Batalov / GMP-ECM B1=3000000, sigma=1466563458 for P33 / December 8, 2014 2014 年 12 月 8 日) (Cyp / yafu v1.34.3 for P42 x P78 / December 19, 2014 2014 年 12 月 19 日)

163×10¹⁵⁵-19 = 18(1)₁₅₅_<157> = 7787849 × 267320269 × 69084986625826471452939793187770269444206675682601_<50> × 12592501327739963968315026148314123796594369304579261844619424220354895933339607195552843731_<92> (Cyp / yafu v1.34.3 for P50 x P92 / December 17, 2014 2014 年 12 月 17 日)

163×10¹⁵⁶-19 = 18(1)₁₅₆_<158> = 3 × 19 × 317738791423001949317738791423001949317738791423001949317738791423001949317738791423001949317738791423001949317738791423001949317738791423001949317738791423_<156>

163×10¹⁵⁷-19 = 18(1)₁₅₇_<159> = definitely prime number 素数

163×10¹⁵⁸-19 = 18(1)₁₅₈_<160> = 9781 × 11500507 × 29741048989_<11> × 541362996140291419926497198143785934897060984392702256196052283595035290433521132190671244232961424572361468701349483454888166340049563397_<138>

163×10¹⁵⁹-19 = 18(1)₁₅₉_<161> = 3 × 17 × 29 × 398407 × 256399198253977_<15> × 19563334240960347201691_<23> × 456949900096063739939481793_<27> × 13409785657183794966823545103973627474117780704485349393650460310457194917778569611859037_<89>

163×10¹⁶⁰-19 = 18(1)₁₆₀_<162> = 7² × 659 × 17358673 × 3087330330976026590407687472989_<31> × 104655963105047379458433927581569525432724292129296766251744525119536078787708199691513095411608968162664591501132770593_<120> (Serge Batalov / GMP-ECM B1=3000000, sigma=1465889623 for P31 x P120 / December 11, 2014 2014 年 12 月 11 日)

163×10¹⁶¹-19 = 18(1)₁₆₁_<163> = 518617434053977222842452539_<27> × 20273599859081879222512820329546339157_<38> × 8412237635669593599910179837436792618704409_<43> × 20476493121523246866077136146207281010558868493395111673_<56> (Serge Batalov / GMP-ECM B1=3000000, sigma=3015210357 for P38 / December 11, 2014 2014 年 12 月 11 日) (Dmitry Domanov / Msieve 1.50 gnfs for P43 x P56 / December 11, 2014 2014 年 12 月 11 日)

163×10¹⁶²-19 = 18(1)₁₆₂_<164> = 3² × 31 × 61 × 113 × 11483 × 21613 × 6404353 × 186706243 × 3444869760881690345073717701856179941331_<40> × 9212028777150553177398716720048790196357889243657650772802785730443943875538096897137461146403_<94> (Serge Batalov / GMP-ECM B1=3000000, sigma=447636302 for P40 x P94 / December 17, 2014 2014 年 12 月 17 日)

163×10¹⁶³-19 = 18(1)₁₆₃_<165> = 409 × 1889² × 473096700858169147_<18> × 304804976344351878362029800233592631_<36> × 2192614932229408513705162565849442676355599_<43> × 392485422491813667877394598011987277866517107246929886855893_<60> (Serge Batalov / GMP-ECM B1=3000000, sigma=253073635 for P36 / December 11, 2014 2014 年 12 月 11 日) (Cyp / yafu v1.34.3 for P43 x P60 / December 15, 2014 2014 年 12 月 15 日)

163×10¹⁶⁴-19 = 18(1)₁₆₄_<166> = 191 × 2053 × 4584589 × 100900172111302114326191327_<27> × 9984595224398906704871469132385965545336803784399606739049005388321871292678194595957594410758457987398756587020348237002182119_<127>

163×10¹⁶⁵-19 = 18(1)₁₆₅_<167> = 3 × 3996498409_<10> × 5305034288190770609875786697071_<31> × 1062537518421838036655753914411669_<34> × 101912461495100787448954146747551019672929_<42> × 2629568177296650052696867642680926875879985347058783_<52> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=3915379139 for P31 / November 23, 2014 2014 年 11 月 23 日) (Serge Batalov / GMP-ECM 6.4 + yafu B1=3000000, sigma=3206876669 for P34, siqs for P42 x P52 / December 10, 2014 2014 年 12 月 10 日)

163×10¹⁶⁶-19 = 18(1)₁₆₆_<168> = 7 × 2995712361311_<13> × 424983252796750560030043051148389_<33> × 127584123844438684133491446283102809884311393399591_<51> × 159286324703191531602991988985284249855966197839301660088232600771052757_<72> (Serge Batalov / GMP-ECM B1=3000000, sigma=2333389077 for P33 / December 11, 2014 2014 年 12 月 11 日) (Jo Yeong Uk / GGNFS/Msieve v1.39 snfs for P51 x P72 / March 15, 2015 2015 年 3 月 15 日)

163×10¹⁶⁷-19 = 18(1)₁₆₇_<169> = 197 × 433 × 13463 × 711343235033243724862492476548844519903522943_<45> × 2217021582686349913994794071986566032551243201285185883443540169012257337385512946553471609292153733866222462167379_<115> (Cyp / yafu v1.34.3 for P45 x P115 / March 17, 2015 2015 年 3 月 17 日)

163×10¹⁶⁸-19 = 18(1)₁₆₈_<170> = 3 × 23 × 2399 × 3421793 × 897849871 × 2129809963638458405519_<22> × 87022486781848015787723079613504667462589944164577899795393_<59> × 192148037896117598515956442933628657582067247166682935422781293181381_<69> (Jo Yeong Uk / GGNFS/Msieve v1.39 snfs for P59 x P69 / April 2, 2015 2015 年 4 月 2 日)

163×10¹⁶⁹-19 = 18(1)₁₆₉_<171> = 349 × 6763 × 10709 × 1878585739_<10> × 17033600655794465928880352485598798893199992815124674175705662510197227_<71> × 223920512610178645069831415909694266845626003008966691597130778673989147977064189_<81> (Jo Yeong Uk / GGNFS/Msieve v1.39 snfs for P71 x P81 / April 7, 2015 2015 年 4 月 7 日)

163×10¹⁷⁰-19 = 18(1)₁₇₀_<172> = definitely prime number 素数

163×10¹⁷¹-19 = 18(1)₁₇₁_<173> = 3³ × 231643 × 8064997620571_<13> × 3345000080582829312151684615838032683967_<40> × 107340045196660534199989409113360663264087724490976986763055695545532729093768060103860213403142101549280090045043_<114> (Ignacio Santos / GMP-ECM 7.0 B1=3000000, sigma=1:1678771659 for P40 x P114 / March 3, 2015 2015 年 3 月 3 日)

163×10¹⁷²-19 = 18(1)₁₇₂_<174> = 7 × 27487 × 28349 × 12705822807818107166083_<23> × 2613239259442843859555679835470860384793749504950604617679422285549495105008384966592152860856464929944325560236441784810003225896805505040537_<142>

163×10¹⁷³-19 = 18(1)₁₇₃_<175> = 47 × 936737 × 21333866538577321_<17> × 70932733269632169563_<20> × 27183995742460961019230239946769468181803203868098132283165359934665536747423325251074746787537161604489183699705877688647932742963_<131>

163×10¹⁷⁴-19 = 18(1)₁₇₄_<176> = 3 × 19 × 106149434179512552971_<21> × 2993315921832085947259207877153717871003264618395789699585534218983942590659981129232673223735683251624467212021348123489447963679277032070445585637406813_<154>

163×10¹⁷⁵-19 = 18(1)₁₇₅_<177> = 17 × 208553549 × 12903881587_<11> × 341335043660956564802628702874015399483633589528235571940199863_<63> × 11597846106582612374398656937900249501523927124461149083802582573208334990441239844289756177607_<95> (Jo Yeong Uk / GGNFS/Msieve v1.39 snfs for P63 x P95 / May 26, 2015 2015 年 5 月 26 日)

163×10¹⁷⁶-19 = 18(1)₁₇₆_<178> = 11810594636221_<14> × 153346310401404718612713266632657417638365708262636225963607655323575176108059339984550291611119646648844114067155302704630882161231402214851104235428524877117915091_<165>

163×10¹⁷⁷-19 = 18(1)₁₇₇_<179> = 3 × 31 × 223 × 10949 × 50047 × 372979 × 2813038901221848570146388323037732206463208807_<46> × 1518954133126328295586239793621165525940593190219852011086397668646698879762545290113345525643414529156039439526411_<115> (Jo Yeong Uk / GMP-ECM 6.4.4 B1=11000000, sigma=3221522666 for P46 x P115 / October 19, 2015 2015 年 10 月 19 日)

163×10¹⁷⁸-19 = 18(1)₁₇₈_<180> = 7 × 468142135650107_<15> × 55267436752058486492147367583277724656019446166846397892988215380354479905118786210813547617797002766804395716600281209218678852292345401442348751576345190921193139_<164>

163×10¹⁷⁹-19 = 18(1)₁₇₉_<181> = 992643785297_<12> × 4583221673077_<13> × 518722951917922696230215721904981529_<36> × 120491750222217356028163461096635027833657759_<45> × 6369246053325303692300374709502795849284626932784546443914271083778950367629_<76> (KTakahashi / GMP-ECM 6.4.4 B1=11000000, sigma=4163338771 for P36 / May 17, 2015 2015 年 5 月 17 日) (Dmitry Domanov / Msieve 1.50 gnfs for P45 x P76 / May 18, 2015 2015 年 5 月 18 日)

163×10¹⁸⁰-19 = 18(1)₁₈₀_<182> = 3² × 5581 × 24097 × 1971122379654749_<16> × 7591262277207667333948729034067148510750312802113080130894388218811515804133537266520650201344832285378381050406360646198649205482559171204308000679507326503_<157>

163×10¹⁸¹-19 = 18(1)₁₈₁_<183> = 181 × 383 × 431 × 4139 × 4757119 × 4910141 × 31548002191_<11> × 134921700583_<12> × 554040294525772249871747_<24> × 21282565456649720276334699231362011_<35> × 1063248939412363437895832691785211743_<37> × 1174905980075866160887413300016806702050509_<43> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=4002852021 for P37 / November 23, 2014 2014 年 11 月 23 日) (Makoto Kamada / Msieve v. 1.53 (SVN 975M) for P35 x P43 / November 30, 2014 2014 年 11 月 30 日)

163×10¹⁸²-19 = 18(1)₁₈₂_<184> = 114264853617019947138547_<24> × 121299206100330333699229085358792740387192675088906312363326895931758226528507_<78> × 130669572100561868816052907755734190177145033376068882401078823337393341034839428359_<84> (Dmitry Domanov / Msieve 1.52 snfs for P78 x P84 / January 18, 2016 2016 年 1 月 18 日)

163×10¹⁸³-19 = 18(1)₁₈₃_<185> = 3 × 719 × 132637 × 236659 × 16918903187_<11> × 15810115005470647411017889495997892026912778063790593724488843267574486466421234190936672508671510997705221150710838899856859352966422701890392559937901264569063_<161>

163×10¹⁸⁴-19 = 18(1)₁₈₄_<186> = 7 × 143821 × 7627326912077_<13> × 645288970007242943821_<21> × 36550906146913379446394338310438206406919923893208799482862398754678384443356426103255436314759588526450333200264972237341657983904851873767321789_<146>

163×10¹⁸⁵-19 = 18(1)₁₈₅_<187> = 10979 × 307757929 × 2239467192098029_<16> × 629334404585663551_<18> × 13254463371167126298206075341_<29> × 28693579586969568327479636172537422354513048610506329224363711435346789482327369144368734645824937757531693803939_<113>

163×10¹⁸⁶-19 = 18(1)₁₈₆_<188> = 3 × 2213928499_<10> × 10205281283_<11> × 267199271657387493952489824648066893290874711973925411378769090866061014851664578879299329212422728584904542275497948914234847796498119744346441465477843493832212089461_<168>

163×10¹⁸⁷-19 = 18(1)₁₈₇_<189> = 29 × 67 × 48989 × 13414175063_<11> × 257354488003086975765559_<24> × 3301069636796970688530823300543276308640541_<43> × 166964183440896632082185203567950955068756012690123240638460415326039630979819375496582956979633396641369_<105> (Dmitry Domanov / Msieve 1.52 snfs for P43 x P105 / February 4, 2016 2016 年 2 月 4 日)

163×10¹⁸⁸-19 = 18(1)₁₈₈_<190> = 9787 × 199414922694496202902784756499308146571_<39> × 927978367177301100699484092527474871295235937419539843795222271290508083322706506725767497803985704496143298513301177361475837413670564578582193743_<147> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=755902937 for P39 x P147 / November 23, 2014 2014 年 11 月 23 日)

163×10¹⁸⁹-19 = 18(1)₁₈₉_<191> = 3² × 311 × 5171 × 78072286177458108813813793535494690296439_<41> × 16027683647919746715747486769330248152848155778212687680516655794438784046382651943774546348106466616293974126577388652158855189656655675228581_<143> (Dmitry Domanov / GMP-ECM B1=11000000, sigma=288777846 for P41 x P143 / December 21, 2015 2015 年 12 月 21 日)

163×10¹⁹⁰-19 = 18(1)₁₉₀_<192> = 7 × 23 × 1613 × 5557 × 15991 × 63488609731158511_<17> × 24539076647937661089838109161275077_<35> × 1007945160223561957741109352663132978798581368365103407777123097_<64> × 4997788730614981734078698570026235921416061578990344326274296219_<64> (Cyp / GMP-ECM 6.4.4 B1=11000000, sigma=3091273511 for P35 / January 31, 2015 2015 年 1 月 31 日) (Erik Branger / GGNFS, Msieve gnfs for P64(1007...) x P64(4997...) / February 9, 2015 2015 年 2 月 9 日)

163×10¹⁹¹-19 = 18(1)₁₉₁_<193> = 17² × 503 × 9161 × 149525351 × 36608222017_<11> × 52130423597034262212653_<23> × 687061058428107501108527580376001890141_<39> × 6936754567916729988296813389548054389140120038373651349731269661502508049621829172892374814123556500583_<103> (Cyp / GMP-ECM 6.4.4 B1=11000000, sigma=2975635402 for P39 x P103 / January 25, 2015 2015 年 1 月 25 日)

163×10¹⁹²-19 = 18(1)₁₉₂_<194> = 3 × 19 × 31 × 59 × 32479 × 56778699479_<11> × 177275510897667483825501465105001_<33> × 25001032975992325184112589847003827351_<38> × 371916018985212099935762771758483323591231469606873_<51> × 57150082381283001308978831855028490054767842567773309_<53> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=662783247 for P33 / November 23, 2014 2014 年 11 月 23 日) (Cyp / GMP-ECM 6.4.4 B1=11000000, sigma=2145491828 for P38 / June 14, 2015 2015 年 6 月 14 日) (Dmitry Domanov / Msieve 1.50 gnfs for P51 x P53 / June 14, 2015 2015 年 6 月 14 日)

163×10¹⁹³-19 = 18(1)₁₉₃_<195> = 276047 × 783121 × 17509995450122121809_<20> × 34705389680116638274617074059217155417_<38> × 35225916385893687602904529887950030931718103872928136829309_<59> × 39137036285598197848107831692676833173375971147263214824955842933989_<68> (Jo Yeong Uk / GMP-ECM v6.4.4 B1=11000000, sigma=543319479 for P38, GGNFS/Msieve v1.39 gnfs for P59 x P68 / February 14, 2017 2017 年 2 月 14 日)

163×10¹⁹⁴-19 = 18(1)₁₉₄_<196> = 2366034619159_<13> × 51849395255837227_<17> × 514483135526722169034443273_<27> × 296066062274674902772579496478019_<33> × 1184141893908172533767133081416988070343_<40> × 81849642618998652101559262225965752159368263285104497253337453537647_<68> (Cyp / GMP-ECM 6.4.4 B1=3000000, sigma=2033648182 for P33 / December 10, 2014 2014 年 12 月 10 日) (Cyp / yafu v1.34.3 for P40 x P68 / December 10, 2014 2014 年 12 月 10 日)

163×10¹⁹⁵-19 = 18(1)₁₉₅_<197> = 3 × 245602884861376705815293957048582773426478203998832489157332457_<63> × 1591160460293384864826547814277145056886117807377268713610464023_<64> × 15448147174002290616002901648394587483275719451191936205443467351536867_<71> (Robert Backstrom / GGNFS-0.77.1-20060513-nocona, Msieve 1.44 snfs for P63 x P64 x P71 / January 7, 2015 2015 年 1 月 7 日)

163×10¹⁹⁶-19 = 18(1)₁₉₆_<198> = 7 × 46693004440329138782101_<23> × 2748813901511325446687468324435129719073_<40> × 201581140092415585846910852035107332930896103345787445336810450254016951024006534823764905199358263861893505008443598840089033810129501_<135> (Cyp / GMP-ECM 6.4.4 B1=11000000, sigma=3414978871 for P40 x P135 / May 10, 2015 2015 年 5 月 10 日)

163×10¹⁹⁷-19 = 18(1)₁₉₇_<199> = 647 × 384679227775878350744071111809701_<33> × 1609689347615085241373929154279299441_<37> × 4520640887017467037123983150579158671917098047639684870739703552310042428355122663173444861169252606570341474677107233087180093_<127> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=3917978328 for P33 / November 23, 2014 2014 年 11 月 23 日) (Serge Batalov / GMP-ECM B1=2000000, sigma=3367054961 for P37 x P127 / June 10, 2015 2015 年 6 月 10 日)

163×10¹⁹⁸-19 = 18(1)₁₉₈_<200> = 3³ × 571 × 174077 × 90876319 × 11687735496521428801_<20> × 139730689612164399816869_<24> × 222083896564904023960771167033253670454806619709_<48> × 204745259795710337853027612542353900978854736017195639094814627261961165618438590688615213221_<93> (Jo Yeong Uk / GMP-ECM 6.4.4 B1=11000000, sigma=1323891218 for P48 x P93 / February 19, 2018 2018 年 2 月 19 日)

163×10¹⁹⁹-19 = 18(1)₁₉₉_<201> = 560123286940400029007534643179101_<33> × 422943409625474559851908884108758278933004495388704442734038050426983157471555569_<81> × 764503017950192393057234059453063149573606591440928178521183456579091138087500476870819_<87> (Robert Backstrom / GMP-ECM 7.0 B1=10122000, sigma=1:1197798783 for P33, GGNFS-0.77.1-20060513-nocona, Msieve 1.44 snfs for P81 x P87 / December 11, 2014 2014 年 12 月 11 日)

163×10²⁰⁰-19 = 18(1)₂₀₀_<202> = 107 × 5164261 × 23994718715989509119597794354874070781_<38> × 27744891303278611397766041330221088515987591560466494916623004761303077129_<74> × 4923278947951580319802043345868589892495678754451896125373442386526987903840172957_<82> (Cyp / GMP-ECM 6.4.4 B1=11000000, sigma=1966922097 for P38 / July 28, 2015 2015 年 7 月 28 日) (Jo Yeong Uk / GGNFS/Msieve v1.39 snfs for P74 x P82 / July 29, 2018 2018 年 7 月 29 日)

163×10²⁰¹-19 = 18(1)₂₀₁_<203> = 3 × 1429 × 7754505050999957_<16> × 84687187849269516317360300486197_<32> × 123242425163345827251233321457537067761681282035045725007_<57> × 52198687211657010234742356295370819319420994395989667678453845971639100165548643366031226078351_<95> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=3322605865 for P32 / November 23, 2014 2014 年 11 月 23 日) (ebina / Msieve 1.53 snfs for P57 x P95 / March 2, 2023 2023 年 3 月 2 日)

163×10²⁰²-19 = 18(1)₂₀₂_<204> = 7² × 3696145124716553287981859410430839002267573696145124716553287981859410430839002267573696145124716553287981859410430839002267573696145124716553287981859410430839002267573696145124716553287981859410430839_<202>

163×10²⁰³-19 = 18(1)₂₀₃_<205> = 499 × 228307 × 18769140211_<11> × 2471528521895963133039832166333679039558253273_<46> × 342700956580581731360747797211808620583477610044879687739145098517059669519214554858274619376295649337715006794503331942907742835005966845309_<141> (Dmitry Domanov / GMP-ECM B1=43000000, sigma=2271902212 for P46 x P141 / February 4, 2016 2016 年 2 月 4 日)

163×10²⁰⁴-19 = 18(1)₂₀₄_<206> = 3 × 164191 × 646941073 × 3042163050225811123989300911308162212682582696794793630058852350321_<67> × 18682168322812487515149715674584028818879067807479029004298097425034555590598717253092678904630161797295171115284038109526579_<125> (Bob Backstrom / Msieve 1.54 snfs for P67 x P125 / July 29, 2021 2021 年 7 月 29 日)

163×10²⁰⁵-19 = 18(1)₂₀₅_<207> = 877 × 111773 × 169276097 × 203664951096987588349_<21> × [53591592165524589422182020050675385810474566709844706034237183530848856659335327001445769960884538325783552655477972573366158784232405302215151825600341549922963357227147_<170>] Free to factor

163×10²⁰⁶-19 = 18(1)₂₀₆_<208> = 15110089 × 123662214696899877306785059161575927195137970448091890443190889_<63> × 969261700805893672184370694026644505371025820614755459811268121190526144583477879334231917822272847937989266391089692109650910095983019191_<138> (Bob Backstrom / Msieve 1.54 snfs for P63 x P138 / September 21, 2020 2020 年 9 月 21 日)

163×10²⁰⁷-19 = 18(1)₂₀₇_<209> = 3² × 17 × 31 × 379 × 4021 × 32301255846689213826842159405022247500843029_<44> × 77570980247718619460599941584571673636990188115265494977136673979188943483533350184175009405864078785437087721265842002883966790724679365543984961176961707_<155> (Bob Backstrom / GMP-ECM 7.0.4 B1=45570000, sigma=1:2413199208 for P44 x P155 / April 17, 2021 2021 年 4 月 17 日)

163×10²⁰⁸-19 = 18(1)₂₀₈_<210> = 7 × 2917 × 533963 × 2449487 × 22324381 × 280796285702224905299988853_<27> × [1081816342728209944130073332982802760389076606136775085356766062221428602896659851500812989173811631928681574345896147536661567293902912714454293828619356199593_<160>] Free to factor

163×10²⁰⁹-19 = 18(1)₂₀₉_<211> = 3253 × 258124990237756110984912923341897827705750719653482451088110821365079990897146292221_<84> × 2156904810810693567258949522537189926635912538201962831720993635278739120134337198625878728484222251619374236439958923745447_<124> (Bob Backstrom / Msieve 1.54 snfs for P84 x P124 / November 10, 2019 2019 年 11 月 10 日)

163×10²¹⁰-19 = 18(1)₂₁₀_<212> = 3 × 19 × 86861 × 541763 × 851465987044837_<15> × 7929919321581164431853105246388417830749730324813442733641006952010495801462700752549757688059319346854616444728146318514839198470587886892514195411838669874153910127437046760728288053_<184>

163×10²¹¹-19 = 18(1)₂₁₁_<213> = 2452723985567_<13> × 19085883038187510352168413368688788449315697209771187119_<56> × 3868870193910733274050860371875625833490143501562943710656337276016726096098978483916802511356513059043133650695150973900149330632044808852239607_<145> (Bob Backstrom / Msieve 1.44 snfs for P56 x P145 / October 13, 2020 2020 年 10 月 13 日)

163×10²¹²-19 = 18(1)₂₁₂_<214> = 23 × 808711942877_<12> × 84048477058766779480035201376507667447881815029509155400429499_<62> × 1158493372716830475632216841234256673226258554030602904728947484671264745753598209204652285039062023287425086218924737654207897842061799359_<139> (Bob Backstrom / Msieve 1.54 snfs for P62 x P139 / October 16, 2020 2020 年 10 月 16 日)

163×10²¹³-19 = 18(1)₂₁₃_<215> = 3 × 2281099 × 12470677 × 8134697686693727623400354439621370607557817797822771618143560100337_<67> × 26088448834299834291252287970514139267631531743593816766134348371281092930801750754963221023194167227418982875738651241499133660441787_<134> (Bob Backstrom / Msieve 1.44 snfs for P67 x P134 / October 5, 2020 2020 年 10 月 5 日)

163×10²¹⁴-19 = 18(1)₂₁₄_<216> = 7 × 97 × 73211807031726817_<17> × [3643293796677295227046976315116030794292991442835624815087526023346871296446889316236988240287037474725675556576979112334608495990742372154401618528442825006589482014362061618900611575278851205377_<196>] Free to factor

163×10²¹⁵-19 = 18(1)₂₁₅_<217> = 29 × 18803190209_<11> × 55492010491_<11> × 47383914881119447_<17> × 21109310698599180767046312813473882209_<38> × 59838418449118134832854882305920793971930415146758381065099727183299256472186580156101794890753366151628210235650272197019854770447736805407_<140> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=830616352 for P38 x P140 / November 23, 2014 2014 年 11 月 23 日)

163×10²¹⁶-19 = 18(1)₂₁₆_<218> = 3² × 1451 × 14826344130133_<14> × 634593881597650919491_<21> × 147402624549149646982906634905504380314259005584972400444465828899381240843921430777083109161294828026189762417872325029678059191000301120450361825455221424842781711876591182988243_<180>

163×10²¹⁷-19 = 18(1)₂₁₇_<219> = 6529 × 6917 × 26683 × 9815297 × [15312374740244410148553999963586855327647034864183617376771509532959484966481968912880570916747076700018096184990174509550645425167541200169750442963100313346218224998146911641403903006528685995927777_<200>] Free to factor

163×10²¹⁸-19 = 18(1)₂₁₈_<220> = 114430722181_<12> × 245588050907457641_<18> × 26845037485487467440499_<23> × 145834413037352227581813798400398517690500945151718567694541354764023993_<72> × 16461567647484507139980195619852916680069990080029645317177406220318217461523137628186081029081113_<98> (Erik Branger / GGNFS, NFS_factory, Msieve snfs for P72 x P98 / December 6, 2019 2019 年 12 月 6 日)

163×10²¹⁹-19 = 18(1)₂₁₉_<221> = 3 × 47 × 128447596532702915681639085894405043341213553979511426319936958234830575256107171000788022064617809298660362490149724192277383766745468873128447596532702915681639085894405043341213553979511426319936958234830575256107171_<219>

163×10²²⁰-19 = 18(1)₂₂₀_<222> = 7 × 67 × 319218607 × 1209717753123214035637340641959147048964792110154149331008523024381176390560513793244574243245509446984958184876259415870186171901221241042556191476281390452395873918063550417439945780180396948555603421214152517_<211>

163×10²²¹-19 = 18(1)₂₂₁_<223> = 598541 × 1480291 × 189016873 × 3070079570044456712295789688272845794135392079_<46> × 114411905788442538637691878777617632097366798683533_<51> × 30788084213750824056448542359182756864086725142254320550316821698953264920498865536964524782733073075805171_<107> (Erik Branger / GGNFS, NFS_factory, Msieve snfs for P46 x P51 x P107 / January 23, 2020 2020 年 1 月 23 日)

163×10²²²-19 = 18(1)₂₂₂_<224> = 3 × 31 × 61 × 12685333 × 447768361 × 562052696519589023654240424547010424540646671967102407862609838605865684565298959307687803645679239970553113080170169826677216654400588497871568877965884852696221235535902648518167103989723519516008692539_<204>

163×10²²³-19 = 18(1)₂₂₃_<225> = 17 × 81532059294024987137752154461770867367379421629_<47> × 845128445457972832484891699633683791331234355541533697680006734756138641815359703_<81> × 154612656612846614385013866253646349434261541572260528322301990532558665140676646195030315455509_<96> (Bob Backstrom / Msieve 1.54 snfs for P47 x P81 x P96 / September 13, 2018 2018 年 9 月 13 日)

163×10²²⁴-19 = 18(1)₂₂₄_<226> = 559781 × 37704332930092225080142950837472366118474763827368802585809026952378746612132810302731_<86> × 85809560922251109445459445884559862074052635008612751980782918877747422760978806462945405803887653233725855637863191698646882777397201_<134> (Bob Backstrom / Msieve 1.54 snfs for P86 x P134 / October 22, 2019 2019 年 10 月 22 日)

163×10²²⁵-19 = 18(1)₂₂₅_<227> = 3⁴ × 31231 × 5128037 × 82492582740211141871552627371541_<32> × 16924199444229197178320091640048165602830993036146602897046082460604353682803230513786018226549916236704078984622837744764109584154375710378905913882978818010739520643318702821899553_<182> (Serge Batalov / GMP-ECM B1=3000000, sigma=1467376015 for P32 x P182 / December 11, 2014 2014 年 12 月 11 日)

163×10²²⁶-19 = 18(1)₂₂₆_<228> = 7 × 40214779753_<11> × 92313132643_<11> × 8234519238585240081910689223005327797336599_<43> × 846368756104720349886014395739544157465991020030590357209796926086458857808022666881680780625971887954244276258865120254467768372959443053382751769214072602431013_<162> (Dmitry Domanov / GMP-ECM B1=11000000, sigma=1088099130 for P43 x P162 / October 27, 2015 2015 年 10 月 27 日)

163×10²²⁷-19 = 18(1)₂₂₇_<229> = 2089 × 14347 × 88337 × 706049 × 49501721 × [19572566178858545041936993864873317226952349085192840454980611627411620361104071156438057754500893924556382952438507381909797402620235845390005576757006863199108550146958436678625795228842494154421545829_<203>] Free to factor

163×10²²⁸-19 = 18(1)₂₂₈_<230> = 3 × 19 × 321284141 × 3381909041689_<13> × 9082525796021087_<16> × [32196776117605224424909797479536656476706074452197115468959081423900629399619827193873974891238481207131640005771101200190685666899641497536458893673865121001653723567419793519186780402009421_<191>] Free to factor

163×10²²⁹-19 = 18(1)₂₂₉_<231> = 2237 × 91757 × 1317079481_<10> × [669927678256670594467567310080303282560530432705079619721814753779406782043561127962598094148681845738262993178826493925040096378029603605643389769679475824206333988329744654132507415625290314589662658852160171959_<213>] Free to factor

163×10²³⁰-19 = 18(1)₂₃₀_<232> = 653 × 14946256337_<11> × 1213208109386936694816943298499113_<34> × [152955177632462088642504878161322260404420970472995757992810471862740850808002128102620937377260903701151108969083382299259740282400180880401320668419570944797613265802317155233942988027_<186>] (Cyp / GMP-ECM 6.4.4 B1=3000000, sigma=2492484017 for P34 / December 10, 2014 2014 年 12 月 10 日) Free to factor

163×10²³¹-19 = 18(1)₂₃₁_<233> = 3 × 19357127 × 161002226062700579524937697978360712812052289_<45> × 542165440648052366228651988339418708920320221_<45> × 3572886574675467974048227451760805652335650976670881145061580307656810098480580495727416614013360987393281373374429015103529492695645799_<136> (Bob Backstrom / GMP-ECM 7.0.4 B1=25100000, sigma=1:4087522834 for P45(1610...), B1=49210000, sigma=1:2813684789 for P45(5421...) x P136 / November 17, 2020 2020 年 11 月 17 日)

163×10²³²-19 = 18(1)₂₃₂_<234> = 7 × 29746945743361471_<17> × 1005941189240192212782673691249_<31> × 864633548476494994278346543139095608182666829217766673902099514257214284482703702767178355680505792539404726005314601122078783498099793100153525591965810749588272008427601373401852869487_<186> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=886403367 for P31 x P186 / November 24, 2014 2014 年 11 月 24 日)

163×10²³³-19 = 18(1)₂₃₃_<235> = 152953 × 10796713 × 147229236317_<12> × 3250571623547_<13> × 51115278018689_<14> × [44832299186414028975422742394201902271213590560519033297675015677012727973701645523372244379830926039621979482248031134453187657223206540223702848275654419787068941182030675826945971209_<185>] Free to factor

163×10²³⁴-19 = 18(1)₂₃₄_<236> = 3² × 23 × 577 × 209427085363864553_<18> × [724045881839541061251786541662251494319320301862370869154716041577507677600851332809229848801968895799676264600271779499140560603173197161443907486733755873701000680386191476517495357996137472064635132183493582433_<213>] Free to factor

163×10²³⁵-19 = 18(1)₂₃₅_<237> = 131 × 419 × 691 × 815139512715891751617964349_<27> × 5977833161035588655728680329_<28> × [979954685214803534432268230568428650328411630234715002838767862650994034206459559978443012137491725465239906013347037326379324174059725496247998383882636942957252048845356209_<174>] Free to factor

163×10²³⁶-19 = 18(1)₂₃₆_<238> = 643 × 61657 × 70199 × [650759934444019875165334255682875562299481199996716897398425549108065402325795673990333238148680425923817074433506396456046313507950042662352463118646499702736253223670582717865870689359841812782643423175299251330139422689139_<225>] Free to factor

163×10²³⁷-19 = 18(1)₂₃₇_<239> = 3 × 31 × [194743130227001194743130227001194743130227001194743130227001194743130227001194743130227001194743130227001194743130227001194743130227001194743130227001194743130227001194743130227001194743130227001194743130227001194743130227001194743130227_<237>] Free to factor

163×10²³⁸-19 = 18(1)₂₃₈_<240> = 7 × 2437 × 10616748409116074278158808318841146087760777953638027499332382385316320482508418495287596641720564576535032013078791905217838742664347916707375057805915417733226514514983944610534680292579348796008623665578938455425940038168187532159629_<236>

163×10²³⁹-19 = 18(1)₂₃₉_<241> = 17 × 18267467236319069667281_<23> × [5832004313143385838659497579133535242972550314898071117871846991916813574994605872988808906103940786793845735596939755046394958510213506261345697571277019613148107313486288926308842922577304014811542737801924596063143_<217>] Free to factor

163×10²⁴⁰-19 = 18(1)₂₄₀_<242> = 3 × 184772479 × 2434185769_<10> × 478005448932175279101211_<24> × 289564815811770015590916436411_<30> × 96973751616275275932041696410300088458634388390521002745512266242215825341894835027832007610093270252697823066089921690440780455565413345815820652424397854032938367085747_<170> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=1699773491 for P30 x P170 / November 24, 2014 2014 年 11 月 24 日)

163×10²⁴¹-19 = 18(1)₂₄₁_<243> = 229 × 4906834437499819884781366189163_<31> × 161178907609928812882540197776830831930172094544206975360488498172090586140362342350128461222183281549171551713403760653732764470268634841836753269752183274017888882298235313118096312058008673706773020961262193_<210> (Cyp / GMP-ECM 6.4.4 B1=3000000, sigma=1621564888 for P31 x P210 / December 8, 2014 2014 年 12 月 8 日)

163×10²⁴²-19 = 18(1)₂₄₂_<244> = 760746832409_<12> × 19269193861853144293809412946007507769981_<41> × [123549614932689409399104988931713348580505677583174767747348123661649406526913984546622100358684083010570828142670127142681096399472265958801485773464300853649697666422389013625124759704920459_<192>] (Dmitry Domanov / GMP-ECM B1=11000000, sigma=1141462575 for P41 / December 22, 2015 2015 年 12 月 22 日) Free to factor

163×10²⁴³-19 = 18(1)₂₄₃_<245> = 3² × 29 × 167 × [415516349166290662608372017140686698123548560605481246956916307869573751602796960357700945490882857528875837087000966139241313031663365478493842455574164569966070413451513320740383855532867853055064838394730334987751189829791247645194923053_<240>] Free to factor

163×10²⁴⁴-19 = 18(1)₂₄₄_<246> = 7⁴ × 14792789529154226839_<20> × [5099209517502913725210574503768348262900805805591286499109692662217719434358111036766925118784376028018979808887340409677310222367173902207922054239236563822133044479181359784974760321089013203698836645764685228122904286449_<223>] Free to factor

163×10²⁴⁵-19 = 18(1)₂₄₅_<247> = 141268475324147465483430889118302739841915908831961841_<54> × 12820348679742083858120965867504452759342596639912218577605977465043021193581299676404321626125195693193239502278071076713491377148147883285283585898361377069457850445552398418401803754676924471_<194> (NFS@home + Rich Smith / GGNFS-lasieve4I14e + Msieve for P54 x P194 / February 17, 2020 2020 年 2 月 17 日)

163×10²⁴⁶-19 = 18(1)₂₄₆_<248> = 3 × 19 × 863 × [368179364337198087274320731660488933160763373607186499788805088555042814968411114047510949383243095507534124354274381718426360738978900837777461550102886932794842778376351590964020066904740930477345675247730501740381596452828995367264562849121_<243>] Free to factor

163×10²⁴⁷-19 = 18(1)₂₄₇_<249> = 89917 × 50073641 × 24345181609845073_<17> × 135218585127989095394059_<24> × 551666987121475335981383388893_<30> × 25232270230729317398503304322581_<32> × 877831955169776944542769276122252481024748394275361208023830874766422734413241550990649199908733348390605752543253915164523760633505473_<135> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=2833837834 for P32 / November 24, 2014 2014 年 11 月 24 日) (Serge Batalov / GMP-ECM B1=3000000, sigma=1416054127 for P30 x P135 / December 9, 2014 2014 年 12 月 9 日)

163×10²⁴⁸-19 = 18(1)₂₄₈_<250> = 5659 × 14869 × 109987 × 70763101 × 501112604687317198029187957567_<30> × 792750349103887844589446846603_<30> × [6961513311599546844368623790120095235621393399945332510332132188635454173335227449294627730012171266103163861566822995754309925953911612741666435750714303498142747487643_<169>] (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=2194280862 for P30(5011...), B1=1e6, sigma=338291618 for P30(7927...) / November 24, 2014 2014 年 11 月 24 日) Free to factor

163×10²⁴⁹-19 = 18(1)₂₄₉_<251> = 3 × 86291 × 271289 × [257885042563006107967839977960548880361710832341092062997590145916059022606182727114613288763834386165273474012953426458494915639644765369929287535276897125200614564959579324283761852587654154179592732652568119206525149386846390596486726263_<240>] Free to factor

163×10²⁵⁰-19 = 18(1)₂₅₀_<252> = 7 × 59 × 3257 × 65802757039_<11> × 467232015867311_<15> × 83740501542621874555088681_<26> × 39936628967470447324768988546812423988135377003_<47> × [1309464229273948161581942072072739582340326399068669712888270907650025836273721367626995238973765767747595355717211990099732178527717237138062595993_<148>] (Dmitry Domanov / GMP-ECM B1=110000000, sigma=1907674387 for P47 / September 4, 2018 2018 年 9 月 4 日) Free to factor

163×10²⁵¹-19 = 18(1)₂₅₁_<253> = definitely prime number 素数

163×10²⁵²-19 = 18(1)₂₅₂_<254> = 3³ × 31 × 10093 × 457889 × [4682083485288649525075390722992408792066469599477238837347721020824746836152126063494448062171978679456025788448476107187994968361666386623914461122637814174976132142408804064806899538420166023716852965456441236824677477270927009427801207239_<241>] Free to factor

163×10²⁵³-19 = 18(1)₂₅₃_<255> = 67 × 107 × 4153 × 15161580164675658361974274094527_<32> × 301005357337506004469994154586297_<33> × 22648145620157117377461218731688656837801987_<44> × 58853628412427632774908083772604103100611928285245076134263800918212623728901069501038449045573425585295970835422011619312658756191217175491_<140> (Makoto Kamada / GMP-ECM 6.4.4 B1=25e4, sigma=2895145477 for P32, B1=1e6, sigma=165489595 for P33 / December 19, 2015 2015 年 12 月 19 日) (Dmitry Domanov / GMP-ECM B1=11000000, sigma=3322954392 for P44 x P140 / January 17, 2016 2016 年 1 月 17 日)

163×10²⁵⁴-19 = 18(1)₂₅₄_<256> = 5153 × 18401 × 1485017702573_<13> × 78194841463042798293022839047_<29> × [164487838205782038290438557199327469617764315146700168040748569555090314612280647747239837946707972673712897421596076293867838964413909042195156511817388975406307002880665396854059391088336911277692069970277_<207>] Free to factor

163×10²⁵⁵-19 = 18(1)₂₅₅_<257> = 3 × 17 × 109 × 3257980052367532130079350802502448481941196458195918530511083128460354580160300613619555875357278487337850532669744758249885071255821390737742599588255281725330295216965481401531050748535907737202934180807899102556415022685934720473306549939037796566129_<253>

163×10²⁵⁶-19 = 18(1)₂₅₆_<258> = 7 × 23 × 108380882873_<12> × 629036194151_<12> × 26393202614394203747_<20> × [625170976388439502451738671097856079872811375293095478195535157623396824300599397298923654801302977283086681232276523563392096805965766632892315070817329868908670109591843206310626784876134790782948941602816865571_<213>] Free to factor

163×10²⁵⁷-19 = 18(1)₂₅₇_<259> = 2251 × 77929 × 7154549 × 8600623185331_<13> × 18170972182153268369_<20> × 15479241770647966412193840755581507_<35> × [596527495992624971793054505720538035976778269566848291432548806267178078224361162783687760190011961455581730117939072126469613538774016290578708439868170432800221915102695036017_<177>] (KTakahashi / GMP-ECM 6.4.4 B1=1000000, sigma=1319166371 for P35 / January 1, 2016 2016 年 1 月 1 日) Free to factor

163×10²⁵⁸-19 = 18(1)₂₅₈_<260> = 3 × 6643223177537911_<16> × 12975033159681590483_<20> × 70038449166546452462633567711640919854768033379262468328726789410941109204804750221526642128153921256078444648112253882548255704856616103094457957944886437611676182899548411156247523545863926411858371630202322308267554729849_<224>

163×10²⁵⁹-19 = 18(1)₂₅₉_<261> = 191 × 4007 × 1532803 × 5270747 × 4605796246549_<13> × 39194623606807_<14> × 66908396217013996422567027930326325221_<38> × [2425057461105565986433583668260319656880755081149702981600643100935582737298339847951422775229835838598098796984135384134548742940493094451341305424097514869423543359912496883361_<178>] (Dmitry Domanov / GMP-ECM B1=3000000, sigma=1399140844 for P38 / January 4, 2016 2016 年 1 月 4 日) Free to factor

163×10²⁶⁰-19 = 18(1)₂₆₀_<262> = 827 × 8369 × 12577 × 257620194108582075943_<21> × 80762369727197456006294344288115642852989935443031306216823503146085030462238473225494990519887069846497852675762090512140944518318615509685994884529682668322373046789057616314598519205393676647933530262361986381042714133518424227_<230>

163×10²⁶¹-19 = 18(1)₂₆₁_<263> = 3² × 2356149594514770843841276055527053860317_<40> × [854082306020459331510633641107873638687711707023256370525975674868769890845539838064938162897407756651484185545693760517943972959948909236786907430946004866451850593431258925570317546626539905694644780986624622573834159387_<222>] (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=3633691131 for P40 / December 19, 2015 2015 年 12 月 19 日) Free to factor

163×10²⁶²-19 = 18(1)₂₆₂_<264> = 7 × 773 × 1907 × 103046047547192021994186779_<27> × 170327797034821432353017783297878540317249970017458128568479636023068763950487127285320677296458154355614435236189741068319023208083930591822451630465291426653819240927442546938831301518008460937932163873005015203467157107825515117_<231>

163×10²⁶³-19 = 18(1)₂₆₃_<265> = 10007 × 517639 × 38576891404373406823385622688217_<32> × [9063312971057135360389354607768742479230512454587325806492579749881627349909713389416708215108130075993532463205064500445814920436965972027842527987802072926299806746172208929898831684236572933033982455074498216147558084671_<223>] (Makoto Kamada / GMP-ECM 6.4.4 B1=25e4, sigma=853401831 for P32 / November 22, 2015 2015 年 11 月 22 日) Free to factor

163×10²⁶⁴-19 = 18(1)₂₆₄_<266> = 3 × 19 × 283 × 907 × 18108169 × 45594949 × 6825171496474972013_<19> × 219670467869722018864866912818006504117387034495996338054578311411181231438985717830776724041180408938760678648395970722254877470400809902866456661621748543067412291980279276112020708540801772593815315908192353761182860146511_<225>

163×10²⁶⁵-19 = 18(1)₂₆₅_<267> = 47 × 197 × 1481 × 10529 × 14427241 × 200346301 × 433984492965363887411654489109371507753416593443733759485342697602111432344935219592616988044607645436753159190712695460166159746578475017089533087512144901660061726355119167320953004670243253408041090005226540200704677625867237069099394281_<240>

163×10²⁶⁶-19 = 18(1)₂₆₆_<268> = 2843 × 5147 × 96553 × 269541145604472853_<18> × [4755796083000021545253912700602243144483364852280081932107928669406633257689638250233326225617298613970411979258890021872048038891074451214293445139093678118322383331138745761122057104944517519345559389712256877547929988182426981535833899_<238>] Free to factor

163×10²⁶⁷-19 = 18(1)₂₆₇_<269> = 3 × 31 × 9974268077_<10> × 19524553453307107733468053146772740699239880796593024058441014643197084685815462580555924754772673454283095136739047063131662320391732257904013243717952533143071947653522359826884487971751375958249647427260240981664476494800070004488032270199302678139457951_<257>

163×10²⁶⁸-19 = 18(1)₂₆₈_<270> = 7 × 28879 × 164932003 × 242759100047_<12> × 198324080455772731054037_<24> × [112825950995737825374845473786433881616245362587759653542746456419396797784515756125009613818146306391555469901603336601089548817293166106061273665502448706581774850298987242744308454566305968648249595303685634779503230911_<222>] Free to factor

163×10²⁶⁹-19 = 18(1)₂₆₉_<271> = 1093 × 632774328255233995956573884873388087847_<39> × 2618641712846914727149171937541105387390597982036501669497887118488916097852334194537486378731288644861826907345343987681936285763914373295729868546861467283170955298410695063454427405482793955045082519510546156417229245920978541_<229> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=2842106366 for P39 x P229 / December 19, 2015 2015 年 12 月 19 日)

163×10²⁷⁰-19 = 18(1)₂₇₀_<272> = 3² × 821 × 739957 × 62283885234393622844267_<23> × 4924107468339878951004572608718902106915257223_<46> × [10800645872686156180599609970125119598202890118767701035449855586594121171371603032401494432053172463624479411628032858105675803582487619542471499097738842256995252359337531684894636781026045827_<194>] (Dmitry Domanov / GMP-ECM B1=11000000, sigma=4257834643 for P46 / January 17, 2016 2016 年 1 月 17 日) Free to factor

163×10²⁷¹-19 = 18(1)₂₇₁_<273> = 17 × 29 × 44279074729_<11> × 101423491251727635540983802779_<30> × [81801465181397855074916445010300141138961746479091621758851791662761511803404222008578718581770253454356077531876145390422062070974446628550560533149850742699992321228754837371908941994864962782587665222565198473143248879776593297_<230>] (Makoto Kamada / GMP-ECM 6.4.4 B1=25e4, sigma=1728373525 for P30 / December 19, 2015 2015 年 12 月 19 日) Free to factor

163×10²⁷²-19 = 18(1)₂₇₂_<274> = 22861 × 54089579377_<11> × 6733169479185682896359_<22> × 124396865500244280961030723219483_<33> × [1748667681786641912133482383095390457184117348180606389456096241644619233384407807488276069844151990280829343320889905857039707591587060857576933430331467363602245706333699444016116897734988534952016005679_<205>] (Makoto Kamada / GMP-ECM 6.4.4 B1=25e4, sigma=3472724736 for P33 / December 20, 2015 2015 年 12 月 20 日) Free to factor

163×10²⁷³-19 = 18(1)₂₇₃_<275> = 3 × 1633573 × 8536361 × 11937988588095231702455469232120639_<35> × [36264472210274960929141442413778475141974162095484532216756912421189351444193662330129106973556850006349034191509279168166845873094887725540299765451059124642590895814521312446129051271884890455248829766078212140146931946974911_<227>] (Makoto Kamada / GMP-ECM 6.4.4 B1=25e4, sigma=679267392 for P35 / December 20, 2015 2015 年 12 月 20 日) Free to factor

163×10²⁷⁴-19 = 18(1)₂₇₄_<276> = 7 × 113 × 1086985788227921_<16> × 88724650395621931_<17> × 3394874697576026764333883201523287_<34> × [699321208409109741025657521551131849269583108231738679422786248572121508935700456645135787413376995436147115305356287749301406484189625153413558176982963400696984400947184415702232358428306849738522037889333_<207>] (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=690645044 for P34 / December 20, 2015 2015 年 12 月 20 日) Free to factor

163×10²⁷⁵-19 = 18(1)₂₇₅_<277> = 80671 × 1165791890408569_<16> × 141323844332753399_<18> × 531749257475485211_<18> × 256262046262957891507166034265353504898389859996047596880368247030897028389205271538731959790175018951701468614699310504774422576150218761679380858869082481617059601193964899574269649667419046398123949039229968085749400101_<222>

163×10²⁷⁶-19 = 18(1)₂₇₆_<278> = 3 × 1359310448779_<13> × 7486978890254861988360144262141_<31> × [593196495138180301494312361918055673175015834897340058283459873712463379163462875648284529323106767006970081098158821352821564012185152377146590062153666451020481714681467200275613334271731300862620911302631163761710714038925502501683_<234>] (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=677383934 for P31 / December 20, 2015 2015 年 12 月 20 日) Free to factor

163×10²⁷⁷-19 = 18(1)₂₇₇_<279> = 13499 × 2268920189_<10> × 39738328413546392431_<20> × [148804026671837627358649807911189193528299713699882267856124205778002874607828498592436552768620465085307655585167837949949828700077208146113391205496892984048543714764070109928179962766097255753314779612742463986421960414626986366848278067883271_<246>] Free to factor

163×10²⁷⁸-19 = 18(1)₂₇₈_<280> = 23 × 1759 × 4723 × 5229375898002001379_<19> × 1812523362048596463782079381686544948994786467991081111506098686976343947012265490191069513705594374228112273302410584961060433599632852795834100985409689808889586755064018410864427430493736862447846194986515637301418379841260539087088654373227199120519_<253>

163×10²⁷⁹-19 = 18(1)₂₇₉_<281> = 3³ × 19035101 × 228292764503109554299_<21> × [154359725675694139579900140119782545504121607351022385881676769253870306614856598871779814718955898871704817534049970944290098224114937371759095027529274136713919121828873447927309503824717169918477923352166477981191025384335033437230552521447989362507_<252>] Free to factor

163×10²⁸⁰-19 = 18(1)₂₈₀_<282> = 7 × 19031 × 1060163009_<10> × 1231977367394993063623_<22> × 1177657362992169448285292388791089_<34> × 883875544156178146127512022562043691745572929527336107929552584455338627048601894987948689947825577514017581620893482640167517355104836915917500692754595664759829139173369892257184142587023553328566549504657350321_<213> (Dmitry Domanov / GMP-ECM B1=3000000, sigma=4070789221 for P34 x P213 / January 4, 2016 2016 年 1 月 4 日)

163×10²⁸¹-19 = 18(1)₂₈₁_<283> = 509 × 1259 × 1889 × 40933901 × 175736046264143569_<18> × [207981946464931320178236359685821462247804890493450143369411348220567991231302691770437063970865004468983386472241433440749472359378996886346274773033645074675796926598951073275771221114760605977202947306137800859499274421637426747870359728127898541_<249>] Free to factor

163×10²⁸²-19 = 18(1)₂₈₂_<284> = 3 × 19 × 31 × 61 × 373 × 587 × 7411 × 174013523 × [595075355164406949662124262978616511061891235597807828168938265170119588247629781495203273096432317910546877554094692821638231938067949653882435995437222008027108469978390321673045153853382520519131105155966810729403185839824884335646359380094230563268827456651_<261>] Free to factor

163×10²⁸³-19 = 18(1)₂₈₃_<285> = 32779 × [5525217703746639955798258370026880353613933039784957171088535681720342631291714546237258949666283630101928402669730959184572778642152326523417770862781387812657833097748897498737335218008820010101318255929439919189453952564480646484368379484154828125052964126761374999576286985909_<280>] Free to factor

163×10²⁸⁴-19 = 18(1)₂₈₄_<286> = 8889971 × 53846130307_<11> × 24579990959807_<14> × [153924777338089493337187498403706362391775412442466790783486215717498723156474470502386430173182718368067029476758690649003063252871474628172658860279677285453408679272007436551123485406152779528830460417450381594005411391505840878423381336330513822725409_<255>] Free to factor

163×10²⁸⁵-19 = 18(1)₂₈₅_<287> = 3 × 349 × 10567 × 11887 × 2911169046767_<13> × 1255132343077003_<16> × [37689250178434471535478815673127187301521507316212151689470365951244436986063124628568879155774552944610400303291051013977972395487957757382804651477460427009715554033719977269547949042824796247252662076923444904569242956916267465440231416064236597_<248>] Free to factor

163×10²⁸⁶-19 = 18(1)₂₈₆_<288> = 7² × 67 × 165541 × 703762693 × 11155575472837_<14> × [42447333969777673235973442131781011039902101423295977666797402645010542008135013211485915961516157404602354296651835018458157206784919758470916394251638703103528464342521322662915621439929850147993002761154098867715124680587435429206930952318716527723765857_<257>] Free to factor

163×10²⁸⁷-19 = 18(1)₂₈₇_<289> = 17 × 2699 × 14461 × 26887380972383_<14> × [101518796853146137691435216329407691548735287891735333396575847644115503371733028618456839851759759912503576741728372825205774447376794994461574505740857513819745307210152115239694098810712247911133540720686734753834194825842325127713720225535770704951973762680929559_<267>] Free to factor

163×10²⁸⁸-19 = 18(1)₂₈₈_<290> = 3² × 37461276234290772354792439_<26> × 13638244352256846294734083014179_<32> × [3938778415754101363801112533600685545799929166104006103601409505880165819472547334441762214033442142579783071749523385722387011362880733387180978443985551329088042643607455330324000428937081344584660598790091992925255986902171571459_<232>] (Makoto Kamada / GMP-ECM 6.4.4 B1=25e4, sigma=1411734959 for P32 / December 21, 2015 2015 年 12 月 21 日) Free to factor

163×10²⁸⁹-19 = 18(1)₂₈₉_<291> = 149 × 1721 × 349558515908709695503_<21> × 6053038952769571281397900039867_<31> × [333798669042575991930191970688392959991096903286077449582206838307518082966240500060457061578627852215900450724144133895764319599261736521807831858064259370755460691588998271524779919903611486365942965747174802815946344123531805126359_<234>] (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=2153852081 for P31 / December 21, 2015 2015 年 12 月 21 日) Free to factor

163×10²⁹⁰-19 = 18(1)₂₉₀_<292> = 26464993 × 670298832419_<12> × 1180928553672883732765147923111517405957551997_<46> × [86453230273168278146494048687102813495497242648832592794468449370262873553203560534871864758823321440204481984053186330731669172893852956015712886599379215351895028376973626343858654841896977821515268758159413122854655772111089_<227>] (Dmitry Domanov / GMP-ECM B1=43000000, sigma=2199039218 for P46 / January 27, 2016 2016 年 1 月 27 日) Free to factor

163×10²⁹¹-19 = 18(1)₂₉₁_<293> = 3 × 98849 × 98116765507529_<14> × 664641249872071_<15> × 936528602307687984242590987490363113746674779711375484507663853694871243544531913965085350143196914521266305025544926424155419091703317058118762073860225234615688741427721709876705480743443622252815899995274338688100654020175971472018923864205098747670593907_<258>

163×10²⁹²-19 = 18(1)₂₉₂_<294> = 7 × 25873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873_<293>

163×10²⁹³-19 = 18(1)₂₉₃_<295> = 305243 × 15445513 × [384146644837284847555316227415152283013755225675261966994988236730556490744090651573191817802506326931142214542321856391545341646934921901657168038522052291600836784348547056224799187870014178919192079323293833789075633729649310681841110406197784444398193670592560095476574614944029_<282>] Free to factor

163×10²⁹⁴-19 = 18(1)₂₉₄_<296> = 3 × 2797 × 9049 × 128237 × 1860019238228124071100570918125989592475895004311875241330955047275483813197151389426628129373496270620376790784928084091901097431139683824835674751251196486648226910374550697521918656584627904181101453350664815110053272725519144972456733797025163984863688271593647465099901898225517_<283>

163×10²⁹⁵-19 = 18(1)₂₉₅_<297> = 131889574421117_<15> × 3510362578914142899091_<22> × 36472262000840102019399293443245779_<35> × 10725559410119663553404062649385173326822558771463280892010442245634101723727719073873778156436769063170601901098264042356289165691042780065491946052310502225112048420641247952914979500285979509312549258827263638668717823443547_<227> (KTakahashi / GMP-ECM 6.4.4 B1=1000000, sigma=3110084274 for P35 x P227 / January 1, 2016 2016 年 1 月 1 日)

163×10²⁹⁶-19 = 18(1)₂₉₆_<298> = 137485351 × 877754340261382827879486397_<27> × 36376361896801170816523952713372981080299_<41> × [412568836875683557892851384660206560356326759356295756764358132438259252252551743306515669985458621552746168551986419835023043094105585906931673802016344134649781046749487386049122347192818654831752675868302730945417568287_<222>] (Dmitry Domanov / GMP-ECM B1=11000000, sigma=4150330294 for P41 / January 17, 2016 2016 年 1 月 17 日) Free to factor

163×10²⁹⁷-19 = 18(1)₂₉₇_<299> = 3² × 31 × 6660503 × 14657777 × 548299819 × 3633136150288822901352709334106913_<34> × 333784355647632627797011232265888668887727917086743777503626837897233897123754512197804383977686428655891271581833948426692419140407684775147850356418815138829209340871339801358481075968154334004462969451759710806590303843384525861316237237_<240> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=3230176917 for P34 x P240 / December 21, 2015 2015 年 12 月 21 日)

163×10²⁹⁸-19 = 18(1)₂₉₈_<300> = 7 × [25873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873015873_<299>] Free to factor

163×10²⁹⁹-19 = 18(1)₂₉₉_<301> = 29 × 631 × 5171 × 553276142992935402879774311983_<30> × [34594037830475947585607696403517340368965308714520765899566114092727574931808208565734994697079624168000779774363340316390664492885607986913104893830308879587843023304141386318518621555176534402046157600769373992177783573434880995451973221689368068589358753581673_<263>] (Makoto Kamada / GMP-ECM 6.4.4 B1=25e4, sigma=3289005352 for P30 / December 21, 2015 2015 年 12 月 21 日) Free to factor

163×10³⁰⁰-19 = 18(1)₃₀₀_<302> = 3 × 19² × 23 × 78437 × 220141 × 1136153 × 1195751059_<10> × 350882898303089466962293806982909_<33> × [88333837357881448943385955292062477720511057289008605130948766958011197924646564696877612004832828962828363103032523082446534527661705220836781787915927088372523903567204246471735194095543289141156987376266158179912825889373937940204274509_<239>] (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=4242659620 for P33 / December 21, 2015 2015 年 12 月 21 日) Free to factor

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4. Related links 関連リンク

A256933 - OEIS (The OEIS Foundation Inc.)