Factorization of 300...001

Table of contents 目次

About 300...001 300...001 について
Prime numbers of the form 300...001 300...001 の形の素数
Factor table of 300...001 300...001 の素因数分解表
Related links 関連リンク

1. About 300...001 300...001 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

30w1 = { 31, 301, 3001, 30001, 300001, 3000001, 30000001, 300000001, 3000000001, 30000000001, … }

1.4. Related sequences 関連する数列

Factorization of 899...99 899...99 の素因数分解

2. Prime numbers of the form 300...001 300...001 の形の素数

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

3×10¹+1 = 31 is prime. は素数です。
3×10³+1 = 3001 is prime. は素数です。
3×10⁷+1 = 30000001 is prime. は素数です。
3×10¹⁰+1 = 30000000001_<11> is prime. は素数です。
3×10²⁸+1 = 3(0)₂₇1_<29> is prime. は素数です。
3×10³⁶+1 = 3(0)₃₅1_<37> is prime. は素数です。
3×10⁶⁷+1 = 3(0)₆₆1_<68> is prime. は素数です。
3×10⁸¹+1 = 3(0)₈₀1_<82> is prime. は素数です。
3×10¹⁴⁷+1 = 3(0)₁₄₆1_<148> is prime. は素数です。
3×10⁴⁸³+1 = 3(0)₄₈₂1_<484> is prime. は素数です。
3×10⁶⁴³+1 = 3(0)₆₄₂1_<644> is prime. は素数です。
3×10¹⁰²⁰+1 = 3(0)₁₀₁₉1_<1021> is prime. は素数です。 (Harvey Dubner / Cruncher / December 31, 1984 1984 年 12 月 31 日)
3×10¹⁹⁰⁰+1 = 3(0)₁₈₉₉1_<1901> is prime. は素数です。 (Harvey Dubner / Cruncher / December 31, 1984 1984 年 12 月 31 日)
3×10²⁶²⁰+1 = 3(0)₂₆₁₉1_<2621> is prime. は素数です。 (Harvey Dubner / Cruncher / December 31, 1984 1984 年 12 月 31 日)
3×10¹⁰⁴⁵³+1 = 3(0)₁₀₄₅₂1_<10454> is prime. は素数です。 (Chris Caldwell / Cruncher / May 1, 1994 1994 年 5 月 1 日)
3×10²⁷⁷²⁰+1 = 3(0)₂₇₇₁₉1_<27721> is prime. は素数です。 (Jim Liddle / Proth.exe / March 13, 2000 2000 年 3 月 13 日)
3×10⁵²⁸²⁴+1 = 3(0)₅₂₈₂₃1_<52825> is prime. は素数です。 (Peter Benson / NewPGen, OpenPFGW / June 9, 2004 2004 年 6 月 9 日)
3×10¹⁰⁵⁵⁸⁹+1 = 3(0)₁₀₅₅₈₈1_<105590> is prime. は素数です。 (Roman Makarchuk / LLR, OpenPFGW / December 5, 2008 2008 年 12 月 5 日)
3×10¹¹¹⁹⁸⁸+1 = 3(0)₁₁₁₉₈₇1_<111989> is prime. は素数です。 (Alexander Gramolin / NewPGen, OpenPFGW / February 24, 2012 2012 年 2 月 24 日)
3×10⁶¹⁸⁸⁵³+1 = 3(0)₆₁₈₈₅₂1_<618854> is prime. は素数です。 (Alexander Gramolin / NewPGen, OpenPFGW / August 6, 2012 2012 年 8 月 6 日)
3×10⁶⁶⁵⁸²⁹+1 = 3(0)₆₆₅₈₂₈1_<665830> is prime. は素数です。 (Alexander Gramolin / NewPGen, OpenPFGW / September 13, 2012 2012 年 9 月 13 日)

2.3. Range of search 捜索範囲

n≤30000 / Completed 終了 / Erik Branger / September 7, 2010 2010 年 9 月 7 日
n≤112000 / Completed 終了 / Ray Chandler / March 2, 2012 2012 年 3 月 2 日
n≤500000 / Completed 終了 / Alexander Gramolin / March 13, 2012 2012 年 3 月 13 日
n≤620000 / Completed 終了 / Alexander Gramolin / August 8, 2012 2012 年 8 月 8 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。

3×10^6k+2+1 = 7×(3×10²+17+27×10²×10⁶-19×7×k-1Σm=010^6m)
3×10^6k+5+1 = 13×(3×10⁵+113+27×10⁵×10⁶-19×13×k-1Σm=010^6m)
3×10^15k+1+1 = 31×(3×10¹+131+27×10×10¹⁵-19×31×k-1Σm=010^15m)
3×10^16k+13+1 = 17×(3×10¹³+117+27×10¹³×10¹⁶-19×17×k-1Σm=010^16m)
3×10^18k+4+1 = 19×(3×10⁴+119+27×10⁴×10¹⁸-19×19×k-1Σm=010^18m)
3×10^21k+2+1 = 43×(3×10²+143+27×10²×10²¹-19×43×k-1Σm=010^21m)
3×10^22k+13+1 = 23×(3×10¹³+123+27×10¹³×10²²-19×23×k-1Σm=010^22m)
3×10^28k+15+1 = 29×(3×10¹⁵+129+27×10¹⁵×10²⁸-19×29×k-1Σm=010^28m)
3×10^33k+12+1 = 67×(3×10¹²+167+27×10¹²×10³³-19×67×k-1Σm=010^33m)
3×10^34k+32+1 = 103×(3×10³²+1103+27×10³²×10³⁴-19×103×k-1Σm=010^34m)

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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 20.74%. 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 20.74% です。

3. Factor table of 300...001 300...001 の素因数分解表

3.2. Range of factorization 分解範囲

n≤100 / Completed 終了 / March 16, 2004 2004 年 3 月 16 日
n≤150 / Completed 終了 / March 25, 2007 2007 年 3 月 25 日
n≤200 / Completed 終了 / April 9, 2010 2010 年 4 月 9 日
n≤300 / Remaining 38 残り 38

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

n=226, 231, 233, 235, 236, 237, 241, 245, 246, 249, 250, 251, 252, 253, 258, 259, 260, 262, 263, 266, 271, 273, 274, 277, 279, 281, 287, 288, 290, 291, 292, 293, 294, 295, 296, 297, 298, 300 (38/300)

3.4. Factor table 素因数分解表

3×10¹+1 = 31 = definitely prime number 素数

3×10²+1 = 301 = 7 × 43

3×10³+1 = 3001 = definitely prime number 素数

3×10⁴+1 = 30001 = 19 × 1579

3×10⁵+1 = 300001 = 13 × 47 × 491

3×10⁶+1 = 3000001 = 853 × 3517

3×10⁷+1 = 30000001 = definitely prime number 素数

3×10⁸+1 = 300000001 = 7² × 6122449

3×10⁹+1 = 3000000001_<10> = 7589 × 395309

3×10¹⁰+1 = 30000000001_<11> = definitely prime number 素数

3×10¹¹+1 = 300000000001_<12> = 13² × 1775147929_<10>

3×10¹²+1 = 3000000000001_<13> = 67 × 44776119403_<11>

3×10¹³+1 = 30000000000001_<14> = 17 × 23 × 62191 × 1233721

3×10¹⁴+1 = 300000000000001_<15> = 7 × 95773 × 447486691

3×10¹⁵+1 = 3000000000000001_<16> = 29 × 103448275862069_<15>

3×10¹⁶+1 = 30000000000000001_<17> = 31 × 379 × 15901 × 160581649

3×10¹⁷+1 = 300000000000000001_<18> = 13 × 2281 × 23911 × 423111547

3×10¹⁸+1 = 3000000000000000001_<19> = 16921 × 5188801 × 34168681

3×10¹⁹+1 = 30000000000000000001_<20> = 163 × 184049079754601227_<18>

3×10²⁰+1 = 300000000000000000001_<21> = 7 × 42857142857142857143_<20>

3×10²¹+1 = 3000000000000000000001_<22> = 263 × 13472579 × 846671161213_<12>

3×10²²+1 = 30000000000000000000001_<23> = 19 × 181 × 1381 × 10452973 × 604304143

3×10²³+1 = 300000000000000000000001_<24> = 13 × 43 × 233 × 2303316007278478583_<19>

3×10²⁴+1 = 3000000000000000000000001_<25> = 6709 × 15056940637_<11> × 29697967297_<11>

3×10²⁵+1 = 30000000000000000000000001_<26> = 2309 × 12992637505413598960589_<23>

3×10²⁶+1 = 300000000000000000000000001_<27> = 7 × 109 × 877 × 17011 × 26355258412811941_<17>

3×10²⁷+1 = 3000000000000000000000000001_<28> = 2069 × 85577 × 4296989 × 3943115191193_<13>

3×10²⁸+1 = 30000000000000000000000000001_<29> = definitely prime number 素数

3×10²⁹+1 = 300000000000000000000000000001_<30> = 13 × 17 × 6389 × 212469253928379447424129_<24>

3×10³⁰+1 = 3000000000000000000000000000001_<31> = 1637539 × 1832017435920610135086859_<25>

3×10³¹+1 = 30000000000000000000000000000001_<32> = 31 × 383 × 2526741345910890255200875937_<28>

3×10³²+1 = 300000000000000000000000000000001_<33> = 7 × 103 × 326707 × 1273583870573108963459083_<25>

3×10³³+1 = 3000000000000000000000000000000001_<34> = 6287 × 42299 × 11281002465075774324342877_<26>

3×10³⁴+1 = 30000000000000000000000000000000001_<35> = 20107 × 28711 × 51966762052062599154639013_<26>

3×10³⁵+1 = 300000000000000000000000000000000001_<36> = 13 × 23 × 2618448681461_<13> × 383182793960858193559_<21>

3×10³⁶+1 = 3000000000000000000000000000000000001_<37> = definitely prime number 素数

3×10³⁷+1 = 30000000000000000000000000000000000001_<38> = 179 × 613 × 1569611 × 3874630228127_<13> × 44955771308579_<14>

3×10³⁸+1 = 300000000000000000000000000000000000001_<39> = 7 × 3571 × 2173333 × 1283942706199_<13> × 4300920803658799_<16>

3×10³⁹+1 = 3000000000000000000000000000000000000001_<40> = 2990993 × 1003011374483323765719277845183857_<34>

3×10⁴⁰+1 = 30000000000000000000000000000000000000001_<41> = 19 × 979150369 × 5634413557_<10> × 286199942061324334063_<21>

3×10⁴¹+1 = 300000000000000000000000000000000000000001_<42> = 13 × 257 × 17107 × 4735035242785279_<16> × 1108530656089810937_<19>

3×10⁴²+1 = 3000000000000000000000000000000000000000001_<43> = 151 × 1669 × 119299 × 39546174097_<11> × 2523171052478922495193_<22>

3×10⁴³+1 = 30000000000000000000000000000000000000000001_<44> = 29 × 12654046331183595167_<20> × 81751143590441508737707_<23>

3×10⁴⁴+1 = 300000000000000000000000000000000000000000001_<45> = 7 × 43 × 37021 × 4191314061691_<13> × 6423273420722757827509291_<25>

3×10⁴⁵+1 = 3000000000000000000000000000000000000000000001_<46> = 17 × 67 × 269 × 1249 × 7839399777505813901392825897156132039_<37>

3×10⁴⁶+1 = 30000000000000000000000000000000000000000000001_<47> = 31 × 97 × 700963 × 77575909 × 968862613 × 189366722010724917133_<21>

3×10⁴⁷+1 = 300000000000000000000000000000000000000000000001_<48> = 13 × 109311862154664874542821_<24> × 211110876917197143984737_<24>

3×10⁴⁸+1 = 3000000000000000000000000000000000000000000000001_<49> = 61 × 8221 × 864195651219961261_<18> × 6922368189145372572420061_<25>

3×10⁴⁹+1 = 30000000000000000000000000000000000000000000000001_<50> = 1879 × 35278466088721848125359_<23> × 452568977610245073188041_<24>

3×10⁵⁰+1 = 300000000000000000000000000000000000000000000000001_<51> = 7² × 586335359385372763185511_<24> × 10441889409517628903684359_<26>

3×10⁵¹+1 = 3(0)₅₀1_<52> = 47 × 994953497 × 64153538257318726918841475967120159360039_<41>

3×10⁵²+1 = 3(0)₅₁1_<53> = 397 × 409369 × 589291 × 313246327159464677685910911080355191527_<39>

3×10⁵³+1 = 3(0)₅₂1_<54> = 13 × 6581 × 3506598249038607646721915070190408284922796395217_<49>

3×10⁵⁴+1 = 3(0)₅₃1_<55> = 1011559 × 754590459935761_<15> × 3930236875017125218405813407578599_<34>

3×10⁵⁵+1 = 3(0)₅₄1_<56> = 59 × 409 × 3299 × 321114319 × 1645263250196710211_<19> × 713293966588391497181_<21>

3×10⁵⁶+1 = 3(0)₅₅1_<57> = 7 × 157 × 272975432211101000909918107370336669699727024567788899_<54>

3×10⁵⁷+1 = 3(0)₅₆1_<58> = 23 × 1117 × 23447 × 3339120189577212023_<19> × 1491491939550947497031924913731_<31>

3×10⁵⁸+1 = 3(0)₅₇1_<59> = 19 × 21871 × 72193652252802918548715073312653862721363786220156949_<53>

3×10⁵⁹+1 = 3(0)₅₈1_<60> = 13 × 1039 × 338082920595701_<15> × 17500711862350918541_<20> × 3753906133691874100123_<22>

3×10⁶⁰+1 = 3(0)₅₉1_<61> = 577 × 5199306759098786828422876949740034662045060658578856152513_<58>

3×10⁶¹+1 = 3(0)₆₀1_<62> = 17 × 31 × 10103893 × 392494829757049332889_<21> × 14354496404471703713440320501419_<32>

3×10⁶²+1 = 3(0)₆₁1_<63> = 7 × 14811936975361976113_<20> × 2893419201582547140630722876441221402622311_<43>

3×10⁶³+1 = 3(0)₆₂1_<64> = 389 × 1867 × 4130735009218423628905782065174736975448288016875429424327_<58>

3×10⁶⁴+1 = 3(0)₆₃1_<65> = 7927 × 1026139 × 3688129845545438409852942740111089271467757989074336517_<55>

3×10⁶⁵+1 = 3(0)₆₄1_<66> = 13 × 43 × 1525331 × 1434687874937293_<16> × 1663870743431261569_<19> × 147390107888415272711657_<24>

3×10⁶⁶+1 = 3(0)₆₅1_<67> = 103 × 29126213592233009708737864077669902912621359223300970873786407767_<65>

3×10⁶⁷+1 = 3(0)₆₆1_<68> = definitely prime number 素数

3×10⁶⁸+1 = 3(0)₆₇1_<69> = 7 × 42857142857142857142857142857142857142857142857142857142857142857143_<68>

3×10⁶⁹+1 = 3(0)₆₈1_<70> = 131 × 1193 × 13010688596546599947627907_<26> × 1475398144671508730120834597876984040721_<40>

3×10⁷⁰+1 = 3(0)₆₉1_<71> = 246245887325083_<15> × 121829445867639276545602652290090242139072129211660761747_<57>

3×10⁷¹+1 = 3(0)₇₀1_<72> = 13 × 29 × 199 × 185621 × 736259 × 738845467 × 1270904911_<10> × 31160357553605870175480621392732932109_<38>

3×10⁷²+1 = 3(0)₇₁1_<73> = 294984638384826331048078719260608561_<36> × 10170021111697037216236753300358009041_<38>

3×10⁷³+1 = 3(0)₇₂1_<74> = 22739 × 117485247043_<12> × 11229658739992996031059261706955788780792567645986856808713_<59>

3×10⁷⁴+1 = 3(0)₇₃1_<75> = 7 × 1873 × 22189 × 46861 × 3179107 × 363937864783_<12> × 19019704578369356396789725755065110611923659_<44>

3×10⁷⁵+1 = 3(0)₇₄1_<76> = 5815181 × 242995654571_<12> × 30296635088429_<14> × 558665640875791_<15> × 125433387853024282821592391909_<30>

3×10⁷⁶+1 = 3(0)₇₅1_<77> = 19 × 31 × 1291 × 415543 × 4516945831_<10> × 21019329800602844759367800353109139799041028297946332303_<56>

3×10⁷⁷+1 = 3(0)₇₆1_<78> = 13 × 17 × 40949 × 7243627 × 189330424333774697273_<21> × 24171811200974383408786576437714478568683739_<44>

3×10⁷⁸+1 = 3(0)₇₇1_<79> = 67 × 547 × 1783 × 5851837 × 29488903 × 774480196801059841_<18> × 343515729084853263740131391420318235853_<39>

3×10⁷⁹+1 = 3(0)₇₈1_<80> = 23 × 31588957 × 64560983 × 822776055137967966312899_<24> × 777331654853277695714263410548853568823_<39>

3×10⁸⁰+1 = 3(0)₇₉1_<81> = 7 × 997 × 156742903 × 274245916962662936878665224768927142918789143313534242324532556092973_<69>

3×10⁸¹+1 = 3(0)₈₀1_<82> = definitely prime number 素数

3×10⁸²+1 = 3(0)₈₁1_<83> = 396556147820323_<15> × 7877327463333877_<16> × 9603679718327062465169317706939506976097026342997631_<52>

3×10⁸³+1 = 3(0)₈₂1_<84> = 13 × 9532847 × 2420779760434954733153372027991540924036326511578658182920267479056684422091_<76>

3×10⁸⁴+1 = 3(0)₈₃1_<85> = 367 × 84631 × 440527 × 981319 × 223430768225151152811482584017892586519419195709078993848314952801_<66>

3×10⁸⁵+1 = 3(0)₈₄1_<86> = 1661583485297_<13> × 54023475012308291507621_<23> × 334207792110584172091449693805941060369350577909373_<51>

3×10⁸⁶+1 = 3(0)₈₅1_<87> = 7 × 43 × 147929130938493357761877823_<27> × 6737535295047400422939574997854853936889567773370251541787_<58>

3×10⁸⁷+1 = 3(0)₈₆1_<88> = 57704100757_<11> × 78212992366947111793224659_<26> × 664715300063407687268091985902707716360249006586927_<51>

3×10⁸⁸+1 = 3(0)₈₇1_<89> = 613 × 3751676989_<10> × 13044737394181493541891572756624031685359114648899761380720804186090822001393_<77>

3×10⁸⁹+1 = 3(0)₈₈1_<90> = 13² × 113 × 250451 × 278917 × 4115541273187_<13> × 81816795564710189_<17> × 667865368081651529733187254777823845221359793_<45>

3×10⁹⁰+1 = 3(0)₈₉1_<91> = 3967 × 180331 × 381318197437_<12> × 564094907179255318210761991225027_<33> × 19496154286820318385804086168513204587_<38>

3×10⁹¹+1 = 3(0)₉₀1_<92> = 31 × 283 × 883 × 16347505193_<11> × 52155548314181870086767536446091569_<35> × 4542139018383436278421775174894971465367_<40>

3×10⁹²+1 = 3(0)₉₁1_<93> = 7² × 769 × 17929 × 1795678883533_<13> × 1896995229026274291292255877683_<31> × 130361051090105258563806462474876437765791_<42>

3×10⁹³+1 = 3(0)₉₂1_<94> = 17 × 863 × 9439 × 1290996163_<10> × 16780720353433491782468421724289387703811042473187542015809353308503757977083_<77>

3×10⁹⁴+1 = 3(0)₉₃1_<95> = 19 × 140395141 × 770083117 × 4819894883232336708373_<22> × 1001770522456725752538019_<25> × 3024629329448324924475066105061_<31>

3×10⁹⁵+1 = 3(0)₉₄1_<96> = 13 × 40093 × 6579763843_<10> × 10684622854603_<14> × 8187283801493673414908347666397742188102045797947618728529480372841_<67>

3×10⁹⁶+1 = 3(0)₉₅1_<97> = 2833205979816856630365091_<25> × 1058871123868630697170279213402229282716267254260527378849368062541824011_<73>

3×10⁹⁷+1 = 3(0)₉₆1_<98> = 47 × 199771102072963_<15> × 336014103925942214219_<21> × 9508964463243707970091052874294858739920079951513408696616239_<61>

3×10⁹⁸+1 = 3(0)₉₇1_<99> = 7 × 3756512436102370044614142122779_<31> × 11408758412526373980350866244775600239574193508591183341548280948117_<68>

3×10⁹⁹+1 = 3(0)₉₈1_<100> = 29 × 643 × 160883788276934627554030138896337212420228454979353247171126722797232798841636724406070681610983_<96>

3×10¹⁰⁰+1 = 3(0)₉₉1_<101> = 103 × 163 × 313 × 271975894534095225991176221835439_<33> × 20990446375297618944778008551499605099634313008134910244350187_<62>

3×10¹⁰¹+1 = 3(0)₁₀₀1_<102> = 13 × 23 × 112455688781_<12> × 608906393745935368545043_<24> × 14652714986922379314736190545012031169061014220429491786130421653_<65>

3×10¹⁰²+1 = 3(0)₁₀₁1_<103> = 3184685509_<10> × 4357048548962608484941710525445154377541575699_<46> × 216203292699210532299880330172360087254034249311_<48> (Makoto Kamada / GGNFS-0.77.1-20060722-pentium4 / 0.57 hours on Pentium 4 3.06GHz, Windows XP and Cygwin / March 20, 2007 2007 年 3 月 20 日)

3×10¹⁰³+1 = 3(0)₁₀₂1_<104> = 83301251819_<11> × 1141870773049_<13> × 5959534140575605571563_<22> × 52922512935658165935800313758093233844200674356148904094417_<59>

3×10¹⁰⁴+1 = 3(0)₁₀₃1_<105> = 7 × 32089 × 1335571157005293313685597645833240585336319076853216277941261580514907200064107415536254079056908687_<100>

3×10¹⁰⁵+1 = 3(0)₁₀₄1_<106> = 167 × 3851 × 2172689417_<10> × 522970842054278052596796307_<27> × 4105406260953967323411421624379333441658282336124257972514962287_<64>

3×10¹⁰⁶+1 = 3(0)₁₀₅1_<107> = 31 × 4744051332993243749733574090207_<31> × 203990612149063181178190673768547952947112612321147898789683681650672394753_<75> (Makoto Kamada / GGNFS-0.77.1-20060722-pentium4 / 0.93 hours on Pentium 4 3.06GHz, Windows XP and Cygwin / March 20, 2007 2007 年 3 月 20 日)

3×10¹⁰⁷+1 = 3(0)₁₀₆1_<108> = 13 × 43 × 149 × 319469 × 406859 × 27710893469268378687085304936496533197645542536668954891993497757911796495887926681123282141_<92>

3×10¹⁰⁸+1 = 3(0)₁₀₇1_<109> = 61 × 2050264538747272760451120621063903142800302077_<46> × 23987308437233184406133324376083302948918445967347350246327033_<62> (Makoto Kamada / GGNFS-0.77.1-20060722-pentium4 / 1.33 hours on Pentium 4 3.06GHz, Windows XP and Cygwin / March 20, 2007 2007 年 3 月 20 日)

3×10¹⁰⁹+1 = 3(0)₁₀₈1_<110> = 17 × 470317 × 11861956980462821_<17> × 4194875121286899383_<19> × 2554805335672876431983_<22> × 29515385542052210711260544097911301044937947161_<47>

3×10¹¹⁰+1 = 3(0)₁₀₉1_<111> = 7 × 7482121 × 228966966455977967620471917769017793_<36> × 25016448656495401004069927663455363536577225267399577915957403823231_<68> (Makoto Kamada / GGNFS-0.77.1-20060722-pentium4 / 0.92 hours on Pentium 4 3.06GHz, Windows XP and Cygwin / March 20, 2007 2007 年 3 月 20 日)

3×10¹¹¹+1 = 3(0)₁₁₀1_<112> = 67 × 6883 × 50769977 × 822533722631126307625175578433_<30> × 1934766413697553399092247719779_<31> × 80515494338141194672046088158648781419_<38> (Makoto Kamada / GMP-ECM 6.1.2 B1=50000, sigma=2173873469 for P31 / March 18, 2007 2007 年 3 月 18 日) (Makoto Kamada / Msieve 1.17 for P30 x P38 / March 18, 2007 2007 年 3 月 18 日)

3×10¹¹²+1 = 3(0)₁₁₁1_<113> = 19 × 7807361641_<10> × 8118226003_<10> × 10210034882989784864647209757_<29> × 2439916668000842264184198385585361045416127281052552280029060389_<64>

3×10¹¹³+1 = 3(0)₁₁₂1_<114> = 13 × 59 × 10243 × 47825881 × 319042484686421_<15> × 8860269191229929657_<19> × 831972291458432430035984753_<27> × 339493482302125699689696823651386878401_<39>

3×10¹¹⁴+1 = 3(0)₁₁₃1_<115> = 919 × 967 × 295357 × 11429625511698592200629533241927411979327821030913432739903978629728413991676984595399531610900916380341_<104>

3×10¹¹⁵+1 = 3(0)₁₁₄1_<116> = 832033003 × 403233877351_<12> × 1577831737746491_<16> × 5185040008134360225023375060014351_<34> × 10929766662867956939358630793031023525224309137_<47>

3×10¹¹⁶+1 = 3(0)₁₁₅1_<117> = 7 × 176989 × 805614854347532273657889152825813219506231_<42> × 300572659388749176537866923029182472055638130513953259347940318716277_<69> (Makoto Kamada / GGNFS-0.77.1-20060722-pentium4 / 1.37 hours on Pentium 4 3.06GHz, Windows XP and Cygwin / March 20, 2007 2007 年 3 月 20 日)

3×10¹¹⁷+1 = 3(0)₁₁₆1_<118> = 151 × 787 × 983 × 5364595726158023_<16> × 4787172289684415190372122785770632962010454236261129833023534339757976679455179640719536246397_<94>

3×10¹¹⁸+1 = 3(0)₁₁₇1_<119> = 229 × 131004366812227074235807860262008733624454148471615720524017467248908296943231441048034934497816593886462882096069869_<117>

3×10¹¹⁹+1 = 3(0)₁₁₈1_<120> = 13 × 1553 × 438721 × 642459091110046921_<18> × 2909223957003733935959638857517450326431467_<43> × 18121551992896711422356563612737888923327762681447_<50> (Makoto Kamada / GGNFS-0.77.1-20060722-pentium4 / 1.78 hours on Pentium 4 3.06GHz, Windows XP and Cygwin / March 20, 2007 2007 年 3 月 20 日)

3×10¹²⁰+1 = 3(0)₁₁₉1_<121> = 129457 × 97356367 × 23194910287_<11> × 14024472877652688033418848086042342088954204619_<47> × 731732109565129767405444811518543619679358772542643_<51> (Makoto Kamada / GGNFS-0.77.1-20060722-pentium4 / 1.54 hours on Pentium 4 3.06GHz, Windows XP and Cygwin / March 20, 2007 2007 年 3 月 20 日)

3×10¹²¹+1 = 3(0)₁₂₀1_<122> = 31 × 2533733441819_<13> × 5680551281721563208659_<22> × 67236972872290888335676434473866511834711951165578089027465183928012262948453258565151_<86>

3×10¹²²+1 = 3(0)₁₂₁1_<123> = 7 × 43711 × 2655233370133_<13> × 92771425356838998606541_<23> × 3980297609513933332382807187105798139082232720008215213498031449569053628602395321_<82>

3×10¹²³+1 = 3(0)₁₂₂1_<124> = 23 × 19553 × 166235481615022500575018646587621550923191_<42> × 40128811045536569808228286660052417775119260016039979721737391386749724030769_<77> (Makoto Kamada / GGNFS-0.77.1-20060722-pentium4 / 3.14 hours on Pentium 4 3.06GHz, Windows XP and Cygwin / March 21, 2007 2007 年 3 月 21 日)

3×10¹²⁴+1 = 3(0)₁₂₃1_<125> = 2767 × 5449 × 17167 × 57571 × 158941 × 64072783 × 197691309554911543479077660268414631217739335706830786585014015880624021918384268676142039645857_<96>

3×10¹²⁵+1 = 3(0)₁₂₄1_<126> = 13 × 17 × 1471 × 7673 × 600701 × 634218826805839667438296844687_<30> × 19233942138039946177234105344928717_<35> × 16412899871082734672605658515241235597824962933_<47> (Makoto Kamada / GMP-ECM 6.1.2 B1=250000, sigma=2146302078 for P30, sigma=1408671498 for P35 / March 18, 2007 2007 年 3 月 18 日)

3×10¹²⁶+1 = 3(0)₁₂₅1_<127> = 3187 × 1775837843273505241987971241538076876967_<40> × 530073245617957365009268096007895652834218165933718492937784526257953798248555640269_<84> (Makoto Kamada / GGNFS-0.77.1-20060722-pentium4 / 2.45 hours on Pentium 4 3.06GHz, Windows XP and Cygwin / March 21, 2007 2007 年 3 月 21 日)

3×10¹²⁷+1 = 3(0)₁₂₆1_<128> = 29 × 19573583 × 103934947 × 322172298116923693_<18> × 1578349333128622133308952388255710631082915998992096274067434685677424530735030916200883893133_<94>

3×10¹²⁸+1 = 3(0)₁₂₇1_<129> = 7 × 43 × 1693 × 3709 × 481153 × 1688691118297_<13> × 330470429522606563_<18> × 591119036400766694459860015179609950216121761960385602854728605249929171033537198231_<84>

3×10¹²⁹+1 = 3(0)₁₂₈1_<130> = 428657 × 1109161 × 4750400686003697_<16> × 30976605475761427_<17> × 42631129647954533977037566338810486942407_<41> × 1005832896845130922388650295627982989490898661_<46>

3×10¹³⁰+1 = 3(0)₁₂₉1_<131> = 19 × 31627 × 273253 × 48049664319064769869_<20> × 15662296387277294671225933171_<29> × 41041333591559226903556091015401_<32> × 5915309275092388734119687813085634306291_<40> (Makoto Kamada / GMP-ECM 6.1.2 B1=250000, sigma=1810344172 for P32 / March 19, 2007 2007 年 3 月 19 日)

3×10¹³¹+1 = 3(0)₁₃₀1_<132> = 13 × 3559 × 10267451 × 885106597 × 3970843397400821_<16> × 14248760853504781734593_<23> × 5960458521395615500271408429_<28> × 2115690668630032081669968821003525873818602277_<46>

3×10¹³²+1 = 3(0)₁₃₁1_<133> = 193 × 13426297 × 297991711 × 3885111721371994174857293714863962860157745941710769201332177744305621026491718623507381980843580642456489942771671_<115>

3×10¹³³+1 = 3(0)₁₃₂1_<134> = 602551 × 49788316673609370825042195598380883941774223260769627799140653654213502259559771703971945943164976906519116224186832317928274951_<128>

3×10¹³⁴+1 = 3(0)₁₃₃1_<135> = 7² × 103 × 109 × 157 × 567979 × 4821502235119_<13> × 19159624248086059537256114689_<29> × 921148200730835944300579540106197_<33> × 71867188082562346821361859984554535876161847527_<47> (Makoto Kamada / GMP-ECM 6.1.2 B1=250000, sigma=3094951228 for P33 / March 19, 2007 2007 年 3 月 19 日)

3×10¹³⁵+1 = 3(0)₁₃₄1_<136> = 523 × 13477 × 1075774213_<10> × 5752978421_<10> × 147095946235219350911667697013541493_<36> × 467532449005166182402814318007788918674002841796260849988478421239468688979_<75> (Jo Yeong Uk / GGNFS-0.77.1-20050930-k8 / 4.34 hours on Core 2 Duo E6300@2.33GHz / March 21, 2007 2007 年 3 月 21 日)

3×10¹³⁶+1 = 3(0)₁₃₅1_<137> = 31 × 631 × 5683 × 21061 × 5619844367191367822413_<22> × 28731552996140783336205349164799_<32> × 79357900169239460936673489505340712129651144134050386938660184759316861_<71> (Makoto Kamada / GMP-ECM 6.1.2 B1=250000, sigma=3689886608 for P32 / March 19, 2007 2007 年 3 月 19 日)

3×10¹³⁷+1 = 3(0)₁₃₆1_<138> = 13 × 182924718029_<12> × 126155302167881834100782103641129548809713983877462483723115599111940271236775421520981050242583796793870945402002290692420313_<126>

3×10¹³⁸+1 = 3(0)₁₃₇1_<139> = 2341 × 30427 × 40687364143_<11> × 296243498740348121248054677331_<30> × 3494236713686476798561678201951209134404038145161222453838652958294043118897029832719756771_<91>

3×10¹³⁹+1 = 3(0)₁₃₈1_<140> = 613 × 701 × 176531 × 13156471 × 5476593989_<10> × 2191957616240599_<16> × 6168537428391373109_<19> × 405935904781531709647711583561114892568580809007984843638690234553821712672323_<78>

3×10¹⁴⁰+1 = 3(0)₁₃₉1_<141> = 7 × 25860237801109_<14> × 12123679087138214273443_<23> × 136696145417512502469827638712574449098511977307412418748966651137389231633470826169247101765890038190889_<105>

3×10¹⁴¹+1 = 3(0)₁₄₀1_<142> = 17 × 32069 × 1247451965855923922740201_<25> × 106149839857628546463274992773903_<33> × 41556957164328385196956218832346458694372291760513828318831460900821120143747579_<80> (Makoto Kamada / GMP-ECM 6.1.2 B1=250000, sigma=662962843 for P33 / March 19, 2007 2007 年 3 月 19 日)

3×10¹⁴²+1 = 3(0)₁₄₁1_<143> = 97 × 203543020951_<12> × 33690430121780543888212711166213824692220327981_<47> × 45101059976427355505564135250839549784926008407968873075769527543445669278405405443_<83> (Jo Yeong Uk / GGNFS-0.77.1-20050930-k8 / 9.87 hours on Core 2 Duo E6300@2.33GHz / March 22, 2007 2007 年 3 月 22 日)

3×10¹⁴³+1 = 3(0)₁₄₂1_<144> = 13 × 47 × 2099 × 4231 × 4259 × 17736799 × 74115735887240684807_<20> × 120940167904876203213061027933433_<33> × 81650848796699811506688800647364367461674661533783095495619303656848309_<71> (Shaopu Lin / GGNFS-0.77.1-20060722-pentium4 gnfs for P33 x P71 / 13.81 hours on Pentium 4 2.80GHz / March 23, 2007 2007 年 3 月 23 日)

3×10¹⁴⁴+1 = 3(0)₁₄₃1_<145> = 67 × 307 × 26505761839_<11> × 5502597989341811453280325654661188430257915760736811008735182048955323276663102194362600358957490858193629421824587327740094756711_<130>

3×10¹⁴⁵+1 = 3(0)₁₄₄1_<146> = 23 × 163365916333_<12> × 1512111483928357227059586147307533255856999_<43> × 5280173022660233758936952412889720282802454835751048118163212654450579862340614890525644261_<91> (Jo Yeong Uk / GGNFS-0.77.1-20050930-k8 / 9.90 hours on Core 2 Duo E6300@2.33Ghz / March 23, 2007 2007 年 3 月 23 日)

3×10¹⁴⁶+1 = 3(0)₁₄₅1_<147> = 7 × 62162502049965253_<17> × 6699066280481465227_<19> × 102915420634079625638666204942525818485234829450766386797107818368315755086070464205897735709733756055701964353_<111>

3×10¹⁴⁷+1 = 3(0)₁₄₆1_<148> = definitely prime number 素数

3×10¹⁴⁸+1 = 3(0)₁₄₇1_<149> = 19 × 61197589 × 97631503 × 108817550461206481_<18> × 2428535299870600499821029291580376841317100236944884307563528984399789039459262784278489760915114603226966299572177_<115>

3×10¹⁴⁹+1 = 3(0)₁₄₈1_<150> = 13 × 43 × 280811 × 18451977947946169372964490164450899739_<38> × 103574394682250651492366474771488310679253472549528420564006228321981430254572052540584974107852577311191_<105> (Robert Backstrom / GGNFS-0.77.1-20051202-athlon / 22.38 hours on Cygwin on AMD XP 2700+ / March 25, 2007 2007 年 3 月 25 日)

3×10¹⁵⁰+1 = 3(0)₁₄₉1_<151> = 3757884014173930271262822327673582373969961097805606684684809_<61> × 798321605638876885936868160206937968803884648888029502380986396890251623546215931267628089_<90> (Jo Yeong Uk / GGNFS-0.77.1-20050930-k8 / 16.21 hours on Core 2 Duo E6300@2.33GHz / March 22, 2007 2007 年 3 月 22 日)

3×10¹⁵¹+1 = 3(0)₁₅₀1_<152> = 31 × 397 × 38197 × 60017 × 2703403 × 2730124326417233_<16> × 373344263955479291_<18> × 62705195924448530372188252023190597_<35> × 6154025449218468087679049299048266043351577284513852625291792459_<64> (Shaopu Lin / Msieve v. 1.17 for P35 x P64 / March 22, 2007 2007 年 3 月 22 日)

3×10¹⁵²+1 = 3(0)₁₅₁1_<153> = 7 × 585049 × 88220869831_<11> × 12289698182411593_<17> × 87212223991413427425069271951_<29> × 28233780160855150696140036523537581907_<38> × 27439236958583695018558967396484435036752651468698597_<53> (Makoto Kamada / GMP-ECM 5.0.3 B1=81740, sigma=2715751568 for P38)

3×10¹⁵³+1 = 3(0)₁₅₂1_<154> = 21391504829_<11> × 120702410173837_<15> × 1161887222229059094198302587921696702480855120609398699198129858656050707831596728698528953452207727214370278996536041206825232937_<130>

3×10¹⁵⁴+1 = 3(0)₁₅₃1_<155> = 709 × 8035475151373083659527183835942623308307448782043954239_<55> × 5265789050328925623147256769024288482438775097245447059422020562309429069222311849609536376272051_<97> (Jo Yeong Uk / GGNFS-0.77.1-20050930-k8 / 25.09 hours on Core 2 Duo E6300@2.33GHz / March 28, 2007 2007 年 3 月 28 日)

3×10¹⁵⁵+1 = 3(0)₁₅₄1_<156> = 13 × 29² × 847002118930358570602520920381717175156063_<42> × 213090300524279549137442960054809434214996463074123_<51> × 152031551632891694465641580404499699339343734544590141354153_<60> (Robert Backstrom / GGNFS-0.77.1-20051202-athlon / 19.48 hours on Cygwin on AMD 64 3200+ / April 1, 2007 2007 年 4 月 1 日)

3×10¹⁵⁶+1 = 3(0)₁₅₅1_<157> = 1297177961174555143_<19> × 2667221954249769199_<19> × 14120876924458604253497663539366736456941609_<44> × 61404594566872242448503276730228599364013338843483356019440687469832045039377_<77> (Robert Backstrom / GMP-ECM 5.0 B1=988000, sigma=501477544 for P44 / May 10, 2007 2007 年 5 月 10 日)

3×10¹⁵⁷+1 = 3(0)₁₅₆1_<158> = 17 × 772006355756021_<15> × 7401761985090177770309_<22> × 248529780208636811981353203838303673_<36> × 1242618760787690302557066234608127824342363929964979635799811131131051551936554388849_<85> (Robert Backstrom / GMP-ECM 5.0 B1=618000, sigma=3187509690 for P36 / May 8, 2007 2007 年 5 月 8 日)

3×10¹⁵⁸+1 = 3(0)₁₅₇1_<159> = 7 × 518209 × 1248630547_<10> × 14187037984758391993529228654317591874792986868087928456850474187179_<68> × 4668663539228271717902874354562882580267735906322278836949839530064145731879_<76> (Robert Backstrom / GGNFS-0.77.1-20051202-athlon / 35.69 hours on Cygwin on AMD 64 3400+ / May 18, 2007 2007 年 5 月 18 日)

3×10¹⁵⁹+1 = 3(0)₁₅₈1_<160> = 509 × 55231796185538374229_<20> × 106712256956479168420438191693967482450298743599582395615105036976264392819677967849715055994621546022928882386524388902088895096621815041_<138>

3×10¹⁶⁰+1 = 3(0)₁₅₉1_<161> = 12697 × 44454007667553277_<17> × 29275289584766911761299359521184239465004060018132044373477_<59> × 1815549170260446417865866950799703327121370197342878399772057644753731002595701977_<82> (Robert Backstrom / GGNFS-0.77.1-20051202-athlon snfs / 31.82 hours on Cygwin on AMD 64 3200+ / August 20, 2007 2007 年 8 月 20 日)

3×10¹⁶¹+1 = 3(0)₁₆₀1_<162> = 13 × 16217 × 1423008144349946162858538760370171851950232661831601216197627371087320523097793863040209466798848312075172776905526489296607074247821611699024290749024053581_<157>

3×10¹⁶²+1 = 3(0)₁₆₁1_<163> = 7130941393003213_<16> × 103809697153908617469853075665675511_<36> × 3853176322382181446159610642291595255342267_<43> × 1051762253929606176068974362696177686302006839768383025664246236931321_<70> (Wataru Sakai / GMP-ECM 6.1 B1=11000000, sigma=447522327 for P36 / April 1, 2007 2007 年 4 月 1 日) (Jo Yeong Uk / GGNFS-0.77.1-20050930-k8 gnfs for P43 x P70 / 22.19 hours on Core 2 Duo E6300@2.33GHz / April 11, 2007 2007 年 4 月 11 日)

3×10¹⁶³+1 = 3(0)₁₆₂1_<164> = 2693727049321118094591486398079193352608837_<43> × 11136985838101413491867306813366781640721780664180020279181015243224647866545476655493916704578164265918304339860447237773_<122> (Jo Yeong Uk / GGNFS-0.77.1-20050930-k8 / 69.52 hours on Core 2 Duo E6300@2.33GHz / April 3, 2007 2007 年 4 月 3 日)

3×10¹⁶⁴+1 = 3(0)₁₆₃1_<165> = 7 × 153643579 × 3358957632992895950040793_<25> × 9126754553793380350961701881130062943_<37> × 9098879264948989983429360562774153133639098883364585761384303273204226621258077428446473075683_<94> (Jo Yeong Uk / GMP-ECM 6.1.3 B1=1000000, sigma=1587404188 for P37 / January 14, 2008 2008 年 1 月 14 日)

3×10¹⁶⁵+1 = 3(0)₁₆₄1_<166> = 116891557 × 518126347 × 1922556849772274468793737_<25> × 1996780824920828139624227695148118615121_<40> × 12903063841818771390850986103947680780972868837668201185568690923523136035069365410047_<86> (matsui / GGNFS-0.77.1-20060513-pentium4 snfs / January 3, 2008 2008 年 1 月 3 日)

3×10¹⁶⁶+1 = 3(0)₁₆₅1_<167> = 19² × 31 × 373 × 193939 × 23755628747941_<14> × 447212374355192497_<18> × 625649191871122082626948379908529671729699051_<45> × 5575285937796913330137969587393113913079322142661733106598322245299860531890319_<79> (matsui / GGNFS-0.77.1-20060513-prescott snfs / December 23, 2007 2007 年 12 月 23 日)

3×10¹⁶⁷+1 = 3(0)₁₆₆1_<168> = 13² × 23 × 11240783 × 107653808874199343653823320575009810381715666999_<48> × 63779447095061318423367850224578695523579815789150289866244003646649681085810329261922617536898003393691354119_<110> (Robert Backstrom / GGNFS-0.77.1-20051202-athlon snfs, Msieve 1.32 / January 2, 2008 2008 年 1 月 2 日)

3×10¹⁶⁸+1 = 3(0)₁₆₇1_<169> = 61 × 103 × 3587283476490020290143529_<25> × 133103200368004275753921527821276712486591327532406362051431716830496515837378906946751049169170845802264215168161428832251246693080356564843_<141>

3×10¹⁶⁹+1 = 3(0)₁₆₈1_<170> = 547 × 849763 × 14923933 × 55353326319623081657_<20> × 78128429892476209929315813823129326676823648239826037322173456012994919551810835086092109845502537595408447887249501891256847905505461_<134>

3×10¹⁷⁰+1 = 3(0)₁₆₉1_<171> = 7 × 43 × 199 × 57529 × 1526651229058273_<16> × 261968755177133227477927295381326837835413_<42> × 217683509057887059702713392168572709659690627314116574373411276814837715368246493032016769217598949465919_<105> (Dmitry Domanov / June 14, 2009 2009 年 6 月 14 日)

3×10¹⁷¹+1 = 3(0)₁₇₀1_<172> = 59 × 2421821 × 1600388452377973_<16> × 19226964394318121967711782431_<29> × 454231567465961238949597490091615349190531_<42> × 1502151578223577638654775137097332901436078950967469661170957656557872845681903_<79> (Sinkiti Sibata / GGNFS-0.77.1-20060722-nocona gnfs for P42 x P79 / 72.45 hours on Core 2 Duo E6300 1.86GHz, Windows Vista / December 28, 2007 2007 年 12 月 28 日)

3×10¹⁷²+1 = 3(0)₁₇₁1_<173> = 19055977 × 42387494983_<11> × 170190139057_<12> × 64419666286924261_<17> × 220505600678738400241_<21> × 161183636530960926117651862009_<30> × 43118791680011201738092517077520575807_<38> × 2210508874952327084358149851144464520021_<40> (Makoto Kamada / GMP-ECM 5.0.3 B1=81890, sigma=3324633473 for P30) (Makoto Kamada / Msieve 1.17 for P38 x P40 / March 18, 2007 2007 年 3 月 18 日)

3×10¹⁷³+1 = 3(0)₁₇₂1_<174> = 13 × 17² × 174049 × 774588953 × 12611006885941538144348959163533388476292214481_<47> × 46966420872041728923042134741468255845053552181689376339650679605897258834983257116186121020998659761857245949_<110> (Jo Yeong Uk / GGNFS/Msieve v1.39 snfs / 46.77 hours on Core 2 Quad Q6700 / February 25, 2010 2010 年 2 月 25 日)

3×10¹⁷⁴+1 = 3(0)₁₇₃1_<175> = 695560069 × 1643541565177_<13> × 71351928287190764577186860389973946644375041147413525042917228498224426603_<74> × 36779024533280465224669710936399171144239527439795317971764523788345662032284959_<80> (Sinkiti Sibata / Msieve 1.40 snfs / 107.61 hours on Core i7 2.93GHz,Windows 7 64bit,and Cygwin / February 22, 2010 2010 年 2 月 22 日)

3×10¹⁷⁵+1 = 3(0)₁₇₄1_<176> = 15121 × 219026567 × 1760550942973475119_<19> × 13665215516791006616079599568928505553737443408115338063335149_<62> × 376512035673525912981714375103400745951238068357605716524865327747958279485266707053_<84> (Jo Yeong Uk / GGNFS/Msieve v1.39 snfs / 38.42 hours on Core 2 Quad Q6700 / February 27, 2010 2010 年 2 月 27 日)

3×10¹⁷⁶+1 = 3(0)₁₇₅1_<177> = 7³ × 306883 × 27571321 × 2223696949_<10> × 34295441066827_<14> × 347643917547496021010376334823202287471882962223991221550177697_<63> × 3898971861838388511992153855470451485586777241557337666486351147434474027779_<76> (Jo Yeong Uk / GGNFS/Msieve v1.39 snfs / February 28, 2010 2010 年 2 月 28 日)

3×10¹⁷⁷+1 = 3(0)₁₇₆1_<178> = 67 × 971 × 1181 × 1487 × 230479 × 825733 × 3109400284219346651_<19> × 126785306124523882133503879_<27> × 559219839704943337643116206350631409_<36> × 625845632053760575390249120386323002760427242323498242975273828154385498197_<75> (Jo Yeong Uk / GGNFS-0.77.1-20050930-k8 / 21.23 hours on Core 2 Duo E6300@2.33GHz / March 24, 2007 2007 年 3 月 24 日)

3×10¹⁷⁸+1 = 3(0)₁₇₇1_<179> = 2050459 × 12264541 × 340688242377207018081711127_<27> × 5069346827014420672241942756293_<31> × 690732220068543526727568186205626712603241853899400661384995347253624067067728995244495344555464573552973589_<108> (Wataru Sakai / GMP-ECM 6.1 B1=11000000, sigma=1794784119 for P31 / April 1, 2007 2007 年 4 月 1 日)

3×10¹⁷⁹+1 = 3(0)₁₇₈1_<180> = 13 × 7127 × 5174677 × 1117157777_<10> × 167717010985879_<15> × 3339613976591229119259320197203139774767853553791481874729761460795419995848020835478379082095535623034053752302201130407369915797564759568306961_<145>

3×10¹⁸⁰+1 = 3(0)₁₇₉1_<181> = 661 × 430259544631759600727768857693217721153099730144795861_<54> × 1538326517326993101925943385140082111132168130040478949_<55> × 6857104304052897516728603587977821413916030196167551914714888140645269_<70> (matsui / GGNFS-0.77.1-20060513-prescott snfs / March 2, 2008 2008 年 3 月 2 日)

3×10¹⁸¹+1 = 3(0)₁₈₀1_<182> = 31 × 163 × 45831510539_<11> × 129541161070962276375524706597797231237380084278534888904236011409595074063067722554009382796484727145428087893614131520398789497295078620266068259167231776212559687903_<168>

3×10¹⁸²+1 = 3(0)₁₈₁1_<183> = 7 × 184711 × 7889052315362488613741228856217_<31> × 11735682321665466429260422263096870074719_<41> × 2506093524035973475056243745303107978159574127232539987471423928398343143614831973004552648105617964923431_<106> (Makoto Kamada / GMP-ECM 5.0.3 B1=81970, sigma=4128059153 for P31) (Jo Yeong Uk / GMP-ECM 6.2.3 B1=1000000, sigma=4493511091 for P41 / February 21, 2010 2010 年 2 月 21 日)

3×10¹⁸³+1 = 3(0)₁₈₂1_<184> = 29 × 114790045871334151_<18> × 1101389595565427900135637266257614239472879203677_<49> × 818235010066326138538100859598190229483882089378270186381507788966713023837462117831003813129078116756632188914525247_<117> (Jo Yeong Uk / GGNFS/Msieve v1.39 snfs / March 9, 2010 2010 年 3 月 9 日)

3×10¹⁸⁴+1 = 3(0)₁₈₃1_<185> = 19 × 196797409 × 10762263913_<11> × 745494836636572130172819523037276149944686381269674094578751262163539451085510590830500109309643116762278895320239001816323158684183587595033024231399271515596849987_<165>

3×10¹⁸⁵+1 = 3(0)₁₈₄1_<186> = 13 × 2023746225668777_<16> × 36720090322313647694051_<23> × 310540401257397737348038834696050663179011279285556879255610037091646723630434622079930149152479120433809319536685872800872343331623558391188304351_<147>

3×10¹⁸⁶+1 = 3(0)₁₈₅1_<187> = 439 × 169819005840667_<15> × 40241155283092480818038774787149275870934631476611728723408637074158659177368013036434976879754984472537487184954630114161470383022045784968026778476870122069983476991877_<170>

3×10¹⁸⁷+1 = 3(0)₁₈₆1_<188> = 1990243 × 16565261 × 909948611529811412934384541301540732469732845232998558343616864089988451756330466262286003545679220186522513929107253571677653491327174671386973154651393239832076783199266487_<174>

3×10¹⁸⁸+1 = 3(0)₁₈₇1_<189> = 7 × 37135242979_<11> × 9561060331429_<13> × 13649588948170686463_<20> × 8843237995130879985234228749128009724370323877568816254715812236482263635980946446461438878364758061388356047345722471760315601906705188372132071_<145>

3×10¹⁸⁹+1 = 3(0)₁₈₈1_<190> = 17 × 23 × 47 × 163247537682973281819665886706208848016542417151874625891059476519562496599009631604723295423627360287315666322032976002611960602927572509114654187299341568264678674429994014256951624313_<186>

3×10¹⁹⁰+1 = 3(0)₁₈₉1_<191> = 337 × 613 × 71359 × 799217773 × 2546343508839486516207701265886984349789271759336639159658352387359208880453389197974991386928337275420727244285163037733738941426151492090978763689643407394343548617013903_<172>

3×10¹⁹¹+1 = 3(0)₁₉₀1_<192> = 13 × 43 × 41981 × 90059 × 222941 × 1235130679_<10> × 8247897299_<10> × 94927819198801891456854631_<26> × 3509579947593832172401267969183483650808143002961993244596581_<61> × 187600851274178017217228137473536104234402691756912413319983272561371_<69> (matsui / GGNFS-0.77.1-20060513-prescott gnfs for P61 x P69 / 321.19 hours / July 3, 2008 2008 年 7 月 3 日)

3×10¹⁹²+1 = 3(0)₁₉₁1_<193> = 151 × 791442937966190685229637395742267041720820331589_<48> × 95011290548333356448178869786693410025075222062601524884381341878748749_<71> × 264210140483694895177251228728197166603387493603667452462313902636578791_<72> (Robert Backstrom / GGNFS-0.77.1-20060513-athlon-xp, Msieve 1.36 snfs / 179.21 hours, 14.43 hours / September 1, 2008 2008 年 9 月 1 日)

3×10¹⁹³+1 = 3(0)₁₉₂1_<194> = 228341 × 2462075533_<10> × 5473356377065602643_<19> × 1357719580098568998126229180312398158519931326779674308289602420380859_<70> × 7180789172182775973577426596013909673703770702149408919816860214616948145656893782613577841_<91> (Jo Yeong Uk / GGNFS/Msieve v1.39 snfs / March 18, 2010 2010 年 3 月 18 日)

3×10¹⁹⁴+1 = 3(0)₁₉₃1_<195> = 7 × 866651964229863762194029183_<27> × 1540084418980857995257740189234537478220352847657_<49> × 32109530978789813076257271286037083314295510350785006014514115403529785261917835776309897020262345060817683184264865953_<119> (Jo Yeong Uk / GGNFS/Msieve v1.39 snfs / March 19, 2010 2010 年 3 月 19 日)

3×10¹⁹⁵+1 = 3(0)₁₉₄1_<196> = 2365233400223_<13> × 4915625836818566124998293249332798002360191887638124020580909572598083179927780627999_<85> × 258028948925019110925715656428927027410556073088642267531522278297928175897925446469202468246731713_<99> (Jo Yeong Uk / GGNFS/Msieve v1.39 snfs / March 26, 2010 2010 年 3 月 26 日)

3×10¹⁹⁶+1 = 3(0)₁₉₅1_<197> = 31 × 223 × 11497565766727360956446718343_<29> × 407860889630656506903738929464770934061766319_<45> × 925415423037303753227949702423743909751718736584773967255509688489627341939861040910900541585089644524606114420502450681_<120> (Jo Yeong Uk / GGNFS/Msieve v1.39 snfs / March 27, 2010 2010 年 3 月 27 日)

3×10¹⁹⁷+1 = 3(0)₁₉₆1_<198> = 13 × 10902448059185532910215851_<26> × 1519936277907075536773984208930536626555103828499_<49> × 29528257939777274468836163988499378044170730966997_<50> × 47161832259808362402554552344067823944554851805496831500366081091347694209_<74> (Jo Yeong Uk / GMP-ECM v6.2.3 B1=11000000, sigma=8431913116 for P50, GGNFS/Msieve v1.39 gnfs for P49 x P74 / March 28, 2010 2010 年 3 月 28 日)

3×10¹⁹⁸+1 = 3(0)₁₉₇1_<199> = 1833911383348466522566074446250134380140228731863510782284501695384966021186952971_<82> × 1635847853521917851052479217771526282232255683407487990801439756907074080101789715314755512178980013517705612191904931_<118> (Serge Batalov / Msieve-1.37 snfs / 20 CPU-days on Opteron-2.6GHz; Linux x86_64 / September 8, 2008 2008 年 9 月 8 日)

3×10¹⁹⁹+1 = 3(0)₁₉₈1_<200> = 131 × 229007633587786259541984732824427480916030534351145038167938931297709923664122137404580152671755725190839694656488549618320610687022900763358778625954198473282442748091603053435114503816793893129771_<198>

3×10²⁰⁰+1 = 3(0)₁₉₉1_<201> = 7 × 433 × 610447 × 185263117033_<12> × 2828858023360747867_<19> × 71946058619987082202263149427813166064374899283502749388197_<59> × 4300116574491911801115912993309512435558547293389634753775725666616660740182152959048556470675322021079_<103> (Jo Yeong Uk / GGNFS/Msieve v1.39 snfs / April 9, 2010 2010 年 4 月 9 日)

3×10²⁰¹+1 = 3(0)₂₀₀1_<202> = 113 × 13451 × 702444933864903884262888346194011636329_<39> × 39268212194161043319848434642315268248103325709943412853_<56> × 71554149622290690133081789675358640040358607025220302149600293300969912339882841516521514820005043471_<101> (Lionel Debroux / GMP-ECM 6.2.3 B1=11000000, sigma=2501388372 for P39 / May 29, 2010 2010 年 5 月 29 日) (Jo Yeong Uk / GMP-ECM 6.4.4 B1=43000000, sigma=6235567737 for P56 x P101 / May 4, 2020 2020 年 5 月 4 日)

3×10²⁰²+1 = 3(0)₂₀₁1_<203> = 19 × 103 × 181 × 5197 × 16296679981305904562190862947062197744220184304162421569396041818582393538791404826121299082304779195497976533866185806252403688999267702709590692699666280770157346221557626470891550060557946749_<194>

3×10²⁰³+1 = 3(0)₂₀₂1_<204> = 13 × 12839429 × 4286844554107369_<16> × 346645235390226427627656446823050758334993295633263410954724454896882587_<72> × 1209509325941555661371075656781543362373697510401150236482498264155183567018968967131122892078046672849082971_<109> (Jo Yeong Uk / GGNFS/Msieve v1.39 snfs for P72 x P109 / June 10, 2020 2020 年 6 月 10 日)

3×10²⁰⁴+1 = 3(0)₂₀₃1_<205> = 2130343 × 77146733557_<11> × 4508646387888076516159812297104455310980425763_<46> × 136352371861637667035598724582234184278157697550214899_<54> × 29692400293299388694525158836852711772581252961928331541053853915952443958144954689372723_<89> (Dmitry Domanov / GMP-ECM B1=43000000, sigma=4214310264 for P46 / December 21, 2011 2011 年 12 月 21 日) (Erik Branger / GGNFS, Msieve gnfs for P54 x P89 / March 15, 2015 2015 年 3 月 15 日)

3×10²⁰⁵+1 = 3(0)₂₀₄1_<206> = 17 × 1764705882352941176470588235294117647058823529411764705882352941176470588235294117647058823529411764705882352941176470588235294117647058823529411764705882352941176470588235294117647058823529411764705882353_<205>

3×10²⁰⁶+1 = 3(0)₂₀₅1_<207> = 7 × 643 × 115123 × 581863 × 526658621893051_<15> × 238598149130221133501999455213_<30> × 100651789626655200833466878334448081557013_<42> × 78670449498183592681888274570136186746596501478832668972272557256898635392279893433309981142981445435545771_<107> (Makoto Kamada / GMP-ECM 6.2.3 B1=1e6, sigma=4252951790 for P30 / March 31, 2010 2010 年 3 月 31 日) (Dmitry Domanov / GMP-ECM B1=43000000, sigma=502802239 for P42 / December 25, 2011 2011 年 12 月 25 日)

3×10²⁰⁷+1 = 3(0)₂₀₆1_<208> = 70390259 × 4472835397_<10> × 26842753488248560481152841749693_<32> × 354975771965862035298670738788755565144949832032893007546359835559295613218559618642700904670824505996960902329355925213755171413420832648609888076974295662059_<159> (Serge Batalov / GMP-ECM B1=2000000, sigma=3860964342 for P32 / May 29, 2010 2010 年 5 月 29 日)

3×10²⁰⁸+1 = 3(0)₂₀₇1_<209> = 2707 × 19483 × 130045789 × 66548032112661598492136396571008011_<35> × 65727279517384151538281843257462452720273361898184675641627389815155544746740419120885977894330600530517415712079384731477173544924846956670868332339523638399_<158> (Serge Batalov / GMP-ECM B1=2000000, sigma=792812118 for P35 / May 29, 2010 2010 年 5 月 29 日)

3×10²⁰⁹+1 = 3(0)₂₀₈1_<210> = 13 × 11083 × 16127 × 35298027013683753031211625713_<29> × 3657771334602970156065024492045797111272570407882412293127535397434057728384835779976596185051791197131245194540853336974497011665038466298904885432769697762216316205337569_<172>

3×10²¹⁰+1 = 3(0)₂₀₉1_<211> = 67 × 4096744513_<10> × 20058899789060722980163_<23> × 181524284630299701878178130303474629755299_<42> × 3001689241690451329713541597313797470230443615174546667029017955346365264676506259574766350364335443237322238630987275822531966751885363_<136> (Dmitry Domanov / GMP-ECM B1=43000000, sigma=1607468624 for P42 x P136 / September 26, 2016 2016 年 9 月 26 日)

3×10²¹¹+1 = 3(0)₂₁₀1_<212> = 23 × 29 × 31 × 647 × 6354092320620653651496654609613_<31> × 3228069563074556482026347898069185253244041491317_<49> × 109328412202765316382100118216919230803635718488549665063810411956077343868504526039670282237312740949463687045947483385475899_<126> (Serge Batalov / GMP-ECM B1=2000000, sigma=1839554095 for P31 / May 29, 2010 2010 年 5 月 29 日) (Dmitry Domanov / GMP-ECM B1=43000000, sigma=209364710 for P49 / December 25, 2011 2011 年 12 月 25 日)

3×10²¹²+1 = 3(0)₂₁₁1_<213> = 7 × 43 × 157 × 397057 × 3797041 × 4210725817858195841984354613142505480034196400366581412596997183783085151029111166965230959862806245072285808011170431019149616597387393965640268993080842111849428098912232483767613522866982135289_<196>

3×10²¹³+1 = 3(0)₂₁₂1_<214> = 3907 × 457960152641863827659879437_<27> × 58645297242391037198011550024209_<32> × 28590184646172370467664812486509967655698788190054294292691094195932969692558101849300428943530634662469929096108401979987535278174571202772869059312871_<152> (Makoto Kamada / GMP-ECM 6.2.3 B1=1e6, sigma=102929466 for P32 / March 31, 2010 2010 年 3 月 31 日)

3×10²¹⁴+1 = 3(0)₂₁₃1_<215> = 1401042277_<10> × 37393657014313_<14> × 83408005966249_<14> × 514308017056524477462823822833571963454222710200691612622928322674028013023_<75> × 13348763574715472024014827542467909750997674933163231277468843221756132007122910581688801689945758370563_<104> (ebina / Msieve 1.53 snfs for P75 x P104 / July 23, 2023 2023 年 7 月 23 日)

3×10²¹⁵+1 = 3(0)₂₁₄1_<216> = 13 × 179 × 1357351 × 5280129244847_<13> × 17988218368554241499373069710797363782102691003211423884995854866539459028619620393299561990270857378154894825863267181995765955008092419643438214449973174265432834452352613693252841707772726479_<194>

3×10²¹⁶+1 = 3(0)₂₁₅1_<217> = 38803939 × 1567851421_<10> × 1092224389639_<13> × 2355584701403960042576444920681_<31> × 154419355818186202141609592411959998251520841746551389567_<57> × 124116124357667251167562514169508064671260374129586822755977849706100054844717129821648651580756347943_<102> (Makoto Kamada / GMP-ECM 6.2.3 B1=1e6, sigma=652620030 for P31 / March 31, 2010 2010 年 3 月 31 日) (Mehrshad Alipour / yafu 2.11 for P57 x P102 / June 6, 2024 2024 年 6 月 6 日)

3×10²¹⁷+1 = 3(0)₂₁₆1_<218> = 228983 × 850061 × 29696573280804581_<17> × 5189930996508257696989086012241344563360046239190708004723754109142965078261418368068821650599691452443857517166708715017873956056358345575771215116808574474230228850925964707087317714840167_<190>

3×10²¹⁸+1 = 3(0)₂₁₇1_<219> = 7² × 6122448979591836734693877551020408163265306122448979591836734693877551020408163265306122448979591836734693877551020408163265306122448979591836734693877551020408163265306122448979591836734693877551020408163265306122449_<217>

3×10²¹⁹+1 = 3(0)₂₁₈1_<220> = 853 × 18199 × 1218866044969_<13> × 158550903017141020943362316384739584015996693990746807863308542029991380818515930134971417578743780393338596589867294092742426923402137478964602129674663856340802029884572819811278200411715709522706707_<201>

3×10²²⁰+1 = 3(0)₂₁₉1_<221> = 19 × 21642949 × 4926428083_<10> × 9850669309731121_<16> × 200479287844425914803906947933089393470609_<42> × 7498662712740437292546816503977186364696999749983462768757854303271779365656586356910927642878046520830449531708674198093542604799135158948444133_<145> (Dmitry Domanov / GMP-ECM B1=11000000, sigma=228017553 for P42 / May 28, 2011 2011 年 5 月 28 日)

3×10²²¹+1 = 3(0)₂₂₀1_<222> = 13 × 17 × 593 × 31564114277992745624998768949_<29> × 404917363462999968564349353305299564112803082465059884730965812621_<66> × 179107709596378932032148246745547015966122670423116279595620027505396385199905215228932100625320728925115861645934994352373_<123> (Erik Branger / GGNFS, NFS_factory, Msieve snfs for P66 x P123 / December 9, 2020 2020 年 12 月 9 日)

3×10²²²+1 = 3(0)₂₂₁1_<223> = 48892312325764339_<17> × 128139147449078459635133210843458643862484006059591927932575795273918987_<72> × 478849289283419904472940675571223329949374433640940235904185109004500352198460712109478259986784462472678992754772996012401647577357457_<135> (Erik Branger / GGNFS, NFS_factory, Msieve snfs for P72 x P135 / December 13, 2020 2020 年 12 月 13 日)

3×10²²³+1 = 3(0)₂₂₂1_<224> = 360953 × 10585064621_<11> × 7851942042646234145655277745479334676995008397978476915318273720122737763299398587054708767635236390815808939125499343020823317053320765524830566867992347300204715193721075011019714108916277721770015071252877_<208>

3×10²²⁴+1 = 3(0)₂₂₃1_<225> = 7 × 423420739381_<12> × 101216447072941769175048199047825792268610432902773527602058313068974734049523656384422738585773616194938220474329862374604139496655513864466393934699185265987804051600291391213943639176895231427150429878680419003_<213>

3×10²²⁵+1 = 3(0)₂₂₄1_<226> = 3420023 × 17709622882130900231686107278159413_<35> × 49531663609271321240731339281949464597288511551906465831875979553492634979397909534653881559914860856742042902698120119288261704497859065964974235553379418986054947130675219844282623499_<185> (Ignacio Santos / GMP-ECM 6.2.3 B1=3000000, sigma=1705652662 for P35 / May 29, 2010 2010 年 5 月 29 日)

3×10²²⁶+1 = 3(0)₂₂₅1_<227> = 31 × 5725037010657586005784923241_<28> × [169036799881353908256619389179847443093187167657478943750698415850411287771572363864945503376709142857534554461238682494958900816774621899245113926846138828944586842398837961305009062707068487687431_<198>] (Serge Batalov / GMP-ECM B1=2000000, sigma=3753751540 for P28 / May 29, 2010 2010 年 5 月 29 日) Free to factor

3×10²²⁷+1 = 3(0)₂₂₆1_<228> = 13 × 196477 × 169489433 × 414912078193217092793_<21> × 1670196156214918175868922203327155764167445597680333096186951423945293867015486247244213279773288478881675847618811134681353114644649619221498112923194247290277102620738452851533722933077251929_<193>

3×10²²⁸+1 = 3(0)₂₂₇1_<229> = 61 × 619 × 8191 × 5445202831_<10> × 83917541711533_<14> × 55343003957923963_<17> × 228822563610033969085327093_<27> × 1676237123171481182917902856170098984196930458501396706472766143949602671721074163084770363214205366192013833964535989177794169605699761628965771797441997_<154>

3×10²²⁹+1 = 3(0)₂₂₈1_<230> = 59 × 810224431 × 169438278481_<12> × 55114163146995985285657076449211_<32> × 37861965412109558108754843302777207_<35> × 1774949521185831307048020576588298519169517077148634277149576533232187739150660110778384833934723350126669327337055798316483342855926094782337_<142> (Makoto Kamada / GMP-ECM 6.2.3 B1=1e6, sigma=1756314111 for P32 / April 1, 2010 2010 年 4 月 1 日) (Dmitry Domanov / GMP-ECM B1=11000000, sigma=1763971781 for P35 / May 23, 2011 2011 年 5 月 23 日)

3×10²³⁰+1 = 3(0)₂₂₉1_<231> = 7 × 9802519 × 1483588383538821672841_<22> × 41293479384736954180562583661_<29> × 2825447634704980727833836014391810801063991009_<46> × 9510140573584241263382623159573589012647961495675617_<52> × 2655928752548787092486729682033752870280277264518405968052615927000842616349_<76> (Dmitry Domanov / GMP-ECM B1=43000000, sigma=3449506571 for P46 / December 22, 2011 2011 年 12 月 22 日) (Warut Roonguthai / Msieve 1.48 gnfs for P52 x P76 / December 25, 2011 2011 年 12 月 25 日)

3×10²³¹+1 = 3(0)₂₃₀1_<232> = 3596842811_<10> × 34444004789909479_<17> × 296884667473161175833778413493640397233142013_<45> × [81563975569354948054017619896132578313813596405288388606947608743573301361487411642603760416319469991417709573137957547720476997629430605508649166449044809373433_<161>] (Dmitry Domanov / GMP-ECM B1=43000000, sigma=2551558429 for P45 / November 17, 2011 2011 年 11 月 17 日) Free to factor

3×10²³²+1 = 3(0)₂₃₁1_<233> = 283 × 1636011547_<10> × 188379773774699791609038100624118443_<36> × 52213801379936356632670975526388402493461661_<44> × 6587625026680440949779084779344205291581932919180897405552876854199114576538377048263941820793750032274820071795086856470338416131923453135287_<142> (Dmitry Domanov / May 31, 2011 2011 年 5 月 31 日) (Dmitry Domanov / GMP-ECM B1=43000000, sigma=2366215269 for P44 / November 17, 2011 2011 年 11 月 17 日)

3×10²³³+1 = 3(0)₂₃₂1_<234> = 13 × 23 × 43 × 9906271 × 31051173148619645635150291901_<29> × [75856603527707462533597216608203050887982264928059751909406233807250262372918346402268499717026111465843867204537852493713612015549600176802184209964589035039966380906766892883608549057263686883_<194>] (Serge Batalov / GMP-ECM B1=2000000, sigma=3128375383 for P29 / May 29, 2010 2010 年 5 月 29 日) Free to factor

3×10²³⁴+1 = 3(0)₂₃₃1_<235> = 770239 × 3894894961174388728693301689475604325410684216197829504867969552307790179411844894896259472709120156211253909500817278792686425901570811137841630974282008571365511224438128944392584639313252120445731779356797046111661445343588159_<229>

3×10²³⁵+1 = 3(0)₂₃₄1_<236> = 47 × 57601 × 6361879 × 208766209 × 88595079564318036149591187074095414249_<38> × [94175549172779417357018598509228787610601452340729790228375896061607583717356272715758574055019478531906785624345499242650209133877264896007123950409420960025311160302154571297_<176>] (Dmitry Domanov / GMP-ECM B1=11000000, sigma=947518513 for P38 / May 30, 2011 2011 年 5 月 30 日) Free to factor

3×10²³⁶+1 = 3(0)₂₃₅1_<237> = 7 × 103 × 30091 × 486360307 × 73138918988341_<14> × 148320878148563284112654936869_<30> × [2620839467600335581619534769497130842506747729508160701527575059944051429500879686436064878786590137750833813882180130655491766660070330053368837276759260368486158747898386017497_<178>] (Serge Batalov / GMP-ECM B1=2000000, sigma=1069467428 for P30 / May 29, 2010 2010 年 5 月 29 日) Free to factor

3×10²³⁷+1 = 3(0)₂₃₆1_<238> = 17 × 2667134504288670839385615754878397519979079571003_<49> × [66164862683728473559694505736308364670744706279515302935257066704999251211418310410157365822911722064474139927143839635522136212415560416164300604994170561187178134927330013719469433120451_<188>] (Dmitry Domanov / GMP-ECM B1=110000000, sigma=264913779 for P49 / April 20, 2011 2011 年 4 月 20 日) Free to factor

3×10²³⁸+1 = 3(0)₂₃₇1_<239> = 19 × 97 × 41876475285637_<14> × 112704069315477840223357_<24> × 16148085928627688816266155319833319_<35> × 213582246612729634050398264948490534941455006982589151030227365428330659487400296784840486683195867288290975896875903690907973969079798705939833650466235855835074717_<165> (Dmitry Domanov / GMP-ECM B1=3000000, sigma=2672111448 for P35 / March 15, 2011 2011 年 3 月 15 日)

3×10²³⁹+1 = 3(0)₂₃₈1_<240> = 13 × 29 × 1259 × 24517 × 799238177 × 205029801637_<12> × 157323512904309133040178948468579460755074286526751693673571928587061099197798748936246532222545495382946169374225886635575365877484252884661681497293367191894095815403816969173179025849821190832476854393853779_<210>

3×10²⁴⁰+1 = 3(0)₂₃₉1_<241> = 1021 × 21517 × 58771 × 48326347 × 203489833 × 24202428447700806869862211_<26> × 317008955546132999609695735876891746340489381_<45> × 30795946249333219676327887613371784972635456114149816941349495621056119910546387848010198620990679661736104974435876379297406992953662319096863_<143> (Dmitry Domanov / GMP-ECM B1=43000000, sigma=494451458 for P45 / November 15, 2011 2011 年 11 月 15 日)

3×10²⁴¹+1 = 3(0)₂₄₀1_<242> = 31 × 613 × 3316823 × [475966941950159124878533163036082507348133251352662442728703178084257627746841694944490832075955055145404635711879658217155068716446972308201384652156305548038775789056243616710065762654912482844700307901994591745691376198780178629_<231>] Free to factor

3×10²⁴²+1 = 3(0)₂₄₁1_<243> = 7 × 109 × 17509909 × 45137623 × 103181587 × 785705389233977380843_<21> × 6136379458894908694050113270559941361253200574052967147373551598308712113300798585525353622301487685749018417101851164311286655957748352967339103228525587616407228534143053090353264148966126038721_<196>

3×10²⁴³+1 = 3(0)₂₄₂1_<244> = 67 × 70849 × 623727802744831_<15> × 65775715912534631119_<20> × 1422516421325769746021_<22> × 10335043661306300080219068335412751_<35> × 15362462111559108825378114313005550690302039112110780250843_<59> × 68205847759228348444419650372582604823854447998571803551124002373054777312568104814975491_<89> (Dmitry Domanov / GMP-ECM B1=3000000, sigma=1941766168 for P35 / March 15, 2011 2011 年 3 月 15 日) (Lionel Debroux / ggnfs-lasieve4I14e driven by YAFU for P59 x P89 / November 1, 2021 2021 年 11 月 1 日)

3×10²⁴⁴+1 = 3(0)₂₄₃1_<245> = 3319 × 70900382372572643536543_<23> × 127486860101192294193224925234476870619945535375061090686099582237642817581891477013776789890690940380738887345721712168354414858986019385139767472715937575987173836031450279407128834215462875890941926113344187946766553_<219>

3×10²⁴⁵+1 = 3(0)₂₄₄1_<246> = 13² × 2281 × 5497433 × 1446434809_<10> × 4702201735367_<13> × [20813695545456884431341364826343817956218338814073250475963784574551016611746660584682829696896576668646252008369278651603546762270830279377114030526084559487015217498237239572119195788987340252000783421712213591_<212>] Free to factor

3×10²⁴⁶+1 = 3(0)₂₄₅1_<247> = 991 × 997 × 13295257 × 636706789 × 668599510824467436163_<21> × [536475841964916331754190105958057471518855027124270932416616259883834417254764400198353111625806958475783538545614520505233103487370783522642693041118544449889534702159361370160528689793749445774080676037_<204>] Free to factor

3×10²⁴⁷+1 = 3(0)₂₄₆1_<248> = 413704583 × 7466749431529_<13> × 401922978396271_<15> × 24959054610976291683350605218137_<32> × 72956298068347930372910547505391587_<35> × 13269837017974873953241877266863948728915789327924537640284631876889654984503605449785766525841407995703223267663489194716347118620716851916944307_<146> (Makoto Kamada / GMP-ECM 6.3 B1=1e6, sigma=4100507988 for P32 / May 20, 2010 2010 年 5 月 20 日) (Dmitry Domanov / GMP-ECM B1=11000000, sigma=835559662 for P35 / May 26, 2011 2011 年 5 月 26 日)

3×10²⁴⁸+1 = 3(0)₂₄₇1_<249> = 7 × 1741 × 4441 × 2883313 × 6785978918485807_<16> × 148308294897417575430637827379_<30> × 49519853466820491274637255083159_<32> × 38573991591189199743616066646959896782134957943494859969290630955917249474940668923604109337677322883874076383475936537677869571836050686327341619488477443553_<158> (Makoto Kamada / GMP-ECM 6.3 B1=1e6, sigma=1608926838 for P30 / May 20, 2010 2010 年 5 月 20 日) (Dmitry Domanov / GMP-ECM B1=3000000, sigma=1884966465 for P32 / March 15, 2011 2011 年 3 月 15 日)

3×10²⁴⁹+1 = 3(0)₂₄₈1_<250> = 2861 × 9277 × 71671 × 1000847 × 127689613 × 95805397904451481_<17> × [128806901978980359409738747388806547013898035251822831114062354854548937963049409767595401352140833214846337696977400063172044390444414858743945998394647971068384994921191809082292693741847522943989103759453_<207>] Free to factor

3×10²⁵⁰+1 = 3(0)₂₄₉1_<251> = 397 × 1153 × 27962809848703099_<17> × 293227611564297957512888497_<27> × [7993109606128662973266651333876029762859054831259374862240374941861670854158938665127501128334136125132561237821940015288266159519736262144626461199658916400914008194805022793627386971595885452076421487_<202>] Free to factor

3×10²⁵¹+1 = 3(0)₂₅₀1_<252> = 13 × 659 × [35018092681218629625306408310960663009221431072720905801330687521886307925761643515816505194350414380763394420450566125831679701178942453601027197385315746469008987977121512781603828644799813236839033500641998365822341543130617485700945488502392903_<248>] Free to factor

3×10²⁵²+1 = 3(0)₂₅₁1_<253> = 12938080798470947705749052103360944725831_<41> × [231873648551842939046611413051851698482017757979169036049236109359505393630745844670462927956546698253549359385145483775614051114255389273927428379215080571212836637409007942644958126151974837809969547239713086071_<213>] (Serge Batalov / GMP-ECM 6.2.3 B1=11000000, sigma=990941280 for P41 / May 30, 2010 2010 年 5 月 30 日) Free to factor

3×10²⁵³+1 = 3(0)₂₅₂1_<254> = 17 × 1249 × 53925306199_<11> × 3077327770739_<13> × 1508282125501437885266222651_<28> × [5644960857073993641072851777527068718794146356864889512851514025946918142282636970399881527019550577723926166207818641929417483422712969233280359100584921332150916092367931366448422914731253966608727_<199>] (Serge Batalov / GMP-ECM B1=1500000, sigma=3820304387 for P28 / May 30, 2010 2010 年 5 月 30 日) Free to factor

3×10²⁵⁴+1 = 3(0)₂₅₃1_<255> = 7 × 43 × 10861 × 3273366076862041_<16> × 28034342061398860440157467846211482230090049902713473325394592092619533260392247661843991893208723338266433484665206749998537974900418362140832610160965010004662091955202305669635873212044576015554450021974164046616177248397106942401_<233>

3×10²⁵⁵+1 = 3(0)₂₅₄1_<256> = 23 × 149 × 233 × 6043 × 1041614209_<10> × 596886476624441888490161864666258366204448569211039704103725967854196506914204692544563011008192525869003393669702176468677222214040664904378298726396960610677796804420469518237288465300215428311445542877649780298144352944092113559630953_<237>

3×10²⁵⁶+1 = 3(0)₂₅₅1_<257> = 19 × 31 × 1279 × 280321443907_<12> × 121170363995690892398461170637091496989198314304767_<51> × 1172418550583598280746508399055638757195321311347641842030083500449969545610957092537652644960131593336022151349167272644256170151146080641826935392165692199616789294122084012139602109399959_<190> (vanos0512 / GMP-ECM B1=110000000, sigma=2021938529 for P51 / February 23, 2013 2013 年 2 月 23 日)

3×10²⁵⁷+1 = 3(0)₂₅₆1_<258> = 13 × 27631 × 17787271 × 3696755072545627_<16> × 605779845717838470216592120293159678987915522774228269_<54> × 20967008920303438602237113913846126438807567401067291765131557207858733453800061717125038711577338452207750068457171887294998735442441880760423901550198457691792987459724626979_<176> (MarcinGorecki / GMP-ECM B1=110000000, sigma=390679050 for P54 / December 17, 2011 2011 年 12 月 17 日)

3×10²⁵⁸+1 = 3(0)₂₅₇1_<259> = 7369 × 13200283763129851_<17> × 7529192032761485431_<19> × [4096199092030108689027396413261396247268527980024021048198182524032481442629859115030285500847730683654624793159820718062972108147404555458005220930156188761387794045743384915318584822821948243287406616286943541409539709_<220>] Free to factor

3×10²⁵⁹+1 = 3(0)₂₅₈1_<260> = 409 × 1123 × 15241 × 5025857 × [852696734598692919636690222383258195692453084808166984639682171296665832258040671506746325952590075623875048891910281837727427556939084473950469883060956742895334893372592147501199503507370695053511302048271210464931213185143332529621238914539_<243>] Free to factor

3×10²⁶⁰+1 = 3(0)₂₅₉1_<261> = 7² × 547 × 11113 × 463033 × [2175176938007639028199773101096420168885973882450078144189966802807305134415090808275143263619558107633191232974185729442563392913385690734700522734706997163480165924458936818596825552597458188772315336433021901578154760175831781236072976769199323_<247>] Free to factor

3×10²⁶¹+1 = 3(0)₂₆₀1_<262> = 995863431769667443336990081330167014392385069_<45> × 3012461251508096244574336726991311286454428373180167054554775172659618286079599901521371639106392399618853565916455447037504613089904933947635790029291756053245784457959207979705517161548329550867558313109271785157029_<217> (Wataru Sakai / GMP-ECM 6.2.3 B1=43000000, sigma=2062534725 for P45 / July 5, 2010 2010 年 7 月 5 日)

3×10²⁶²+1 = 3(0)₂₆₁1_<263> = 163 × [184049079754601226993865030674846625766871165644171779141104294478527607361963190184049079754601226993865030674846625766871165644171779141104294478527607361963190184049079754601226993865030674846625766871165644171779141104294478527607361963190184049079754601227_<261>] Free to factor

3×10²⁶³+1 = 3(0)₂₆₂1_<264> = 13 × 9409198081_<10> × 4194071823049_<13> × 97457104250633_<14> × 576802340910031_<15> × 1257535432763607762277_<22> × [8272345783747049643823846570564397295878452540592213642883044871173872589470625525805440774811265099636434589014732389710183570328895868566237951265712128308703683816457894747109105550313823_<190>] Free to factor

3×10²⁶⁴+1 = 3(0)₂₆₃1_<265> = 456193 × 365309294121229_<15> × 81124487796131374933953256217822203_<35> × 3336432524667045190403367271440308587_<37> × 66508568773973659966913682194011151884691539379982370563533521940785287925984075375919796364361550889477036062046085713393857626272320141337067981806434268229771085609917053_<173> (Serge Batalov / GMP-ECM B1=2000000, sigma=122502563 for P35 / May 29, 2010 2010 年 5 月 29 日) (Serge Batalov / GMP-ECM B1=6000000, sigma=2544205403 for P37 / May 30, 2010 2010 年 5 月 30 日)

3×10²⁶⁵+1 = 3(0)₂₆₄1_<266> = 857 × 887 × 39465427627641059304698096056219817169828943681519261101953670218993657905780238081769735015963765475380808488750379854740916045195807719174541115740259603582934622888106304075857813957343134791537033699528651242700540281704222406101881316935009649297054958239_<260>

3×10²⁶⁶+1 = 3(0)₂₆₅1_<267> = 7 × 24781 × 90901828797363532862887_<23> × [19025311071937463686416066516162133952856804184621001113981066024382212544394654099181492243223818548893988699916389805184919492810219408157000155932646210153055004391504693446587329695677673463732554473187471052151366988785040529028610869_<239>] Free to factor

3×10²⁶⁷+1 = 3(0)₂₆₆1_<268> = 29 × 151 × 1889183021021281_<16> × 60551292405574961408598307111_<29> × 1095859333660423976064955560344327_<34> × 27862282737290655054973624447312377192764612797301_<50> × 196145050069417527721491788279730723443696233903980326594082215831159349951043138463750634388076980064826730571420098330684294341016071767_<138> (Makoto Kamada / GMP-ECM 6.3 B1=1e6, sigma=2701436481 for P34 / May 24, 2010 2010 年 5 月 24 日) ([AF>France] intello222222 / GMP-ECM B1=110000000, sigma=2974508238 for P50 / December 21, 2011 2011 年 12 月 21 日)

3×10²⁶⁸+1 = 3(0)₂₆₇1_<269> = 2437 × 1239822140193241537989469519_<28> × 2111358305276849849527821549308423484012312811_<46> × 4702668841008920492170175909917886453687111593022828176799287978610229362708443854575376214581288395226233196000246355095218547951953873911534852816727314764266762161487137630700784785737561897_<193> (Dmitry Domanov / GMP-ECM B1=43000000, sigma=3883293123 for P46 / October 24, 2011 2011 年 10 月 24 日)

3×10²⁶⁹+1 = 3(0)₂₆₈1_<270> = 13 × 17 × 199 × 6101 × 35381 × 5489740642917722529459594079502078563_<37> × 5756426302938983720160829130986979084026383460075716045927443671593639203682554501398569708265773159494460460605107609046969295596935695085593920532025825692329299885309955247924804077786358932253582231682677335418780073_<220> (Ignacio Santos / GMP-ECM 6.3 B1=3000000, sigma=272020628 for P37 / June 18, 2010 2010 年 6 月 18 日)

3×10²⁷⁰+1 = 3(0)₂₆₉1_<271> = 103 × 2497721256180943286569_<22> × 160373663103015337247527779487969063694544048771427_<51> × 72712154154959470713399170878250703414599069707954289650093268017944827787689846273362564231827636405220015694788961174887668091960682698867638388416091446164778746160733358645706529976201806566709_<197> (Dmitry Domanov / GMP-ECM B1=11000000, sigma=796250227 for P51 / May 20, 2011 2011 年 5 月 20 日)

3×10²⁷¹+1 = 3(0)₂₇₀1_<272> = 31 × 167 × 261407 × 20436038468831475601_<20> × 113309604551471709859266017_<27> × [9573317031800315424877126540248655962241191133253887071723976705238847276510200341547929087806126099307553924951449221754828761460154270087058270566413115436554468072063735455431403201765205885625451859746394121027527_<217>] Free to factor

3×10²⁷²+1 = 3(0)₂₇₁1_<273> = 7 × 449011 × 1425738908541502279741_<22> × 203562626166203345686482619687_<30> × 233573179265757988538055341875342618729310094135577_<51> × 1408008300830900148789511765862776008469769697407661776957286619121283939599358477651528003975444272474502791269815721706085832174250339872071035674318014289537140607_<166> (Makoto Kamada / GMP-ECM 6.3 B1=1e6, sigma=3724094261 for P30 / May 25, 2010 2010 年 5 月 25 日) (Mr. Hankey / GMP-ECM B1=110000000, sigma=3238627378 for P51 / December 22, 2011 2011 年 12 月 22 日)

3×10²⁷³+1 = 3(0)₂₇₂1_<274> = 18133 × 118007505179_<12> × [1401980471272873883769402744804350434108910384144617046522644822910461561611258796556087689657217407769871149253916414239473539404266931442993393579069083650886638060942294169326399550655505657058200368835215095159586571307252319315562702991698247256814287943_<259>] Free to factor

3×10²⁷⁴+1 = 3(0)₂₇₃1_<275> = 19 × 6037 × 10981823581_<11> × 12306640869577_<14> × 92913806868936457_<17> × 168797818590160201531282269164086483207_<39> × [123391545471527948399894858190375947877065306336434077097491713391762409500088288001266308749433759893489400825111047552459669920134326897542050404183622566874090098006564696542585776181426909_<192>] (Dmitry Domanov / GMP-ECM B1=11000000, sigma=2313278193 for P39 / May 14, 2011 2011 年 5 月 14 日) Free to factor

3×10²⁷⁵+1 = 3(0)₂₇₄1_<276> = 13 × 43 × 44580128531831665779997688108049277_<35> × 12038382287585459703839432541116837354433232334250492231456338768652490571833935651521884124821554321358326418869145481047809407759985133341905470662958583084863869395699060355892411768241000421659559205945593692022074858120613188556923707_<239> (Serge Batalov / Prime95-ECM, GMP-ECM B1=3000000, sigma=8194046207800848 for P35 / May 29, 2010 2010 年 5 月 29 日)

3×10²⁷⁶+1 = 3(0)₂₇₅1_<277> = 67 × 36062360775416078848118422441405728135745511279089_<50> × 1241630288206456404038894605201664381057098003244799990825828710652382391581704177985876415989050916401184457833671478786896751273678685232199635154782865113751989177703431054191433682016359606334550323003418240637090963456027_<226> (Grubix / GMP-ECM B1=110000000, sigma=2532303676 for P50 / April 26, 2011 2011 年 4 月 26 日)

3×10²⁷⁷+1 = 3(0)₂₇₆1_<278> = 23 × 12757 × 14923 × 1118850578960063_<16> × 1739160682129458449683_<22> × 19719469844614430686573_<23> × [178558977305554370892270499947060154776506565654981139645949472833031735496936490234865719069453058890184242606518631072932319369658953103380653895017970567893768869425114486103720717767924943556672198299178201_<210>] Free to factor

3×10²⁷⁸+1 = 3(0)₂₇₇1_<279> = 7 × 601 × 1047480289_<10> × 24521561397666811964281_<23> × 94334098721000996950744300639_<29> × 626115805699450185469519554311884183_<36> × 47003629177431291093023220945166238521421617154032067261832992440160505648986037394897154046043643065681786137904834565616161585076229547587351810036482389503561740830634773239471_<179> (Dmitry Domanov / GMP-ECM B1=11000000, sigma=3903547347 for P36 / May 9, 2011 2011 年 5 月 9 日)

3×10²⁷⁹+1 = 3(0)₂₇₈1_<280> = 1518060001_<10> × [1976206472750611653853858441791590291693615343468890990165809658270549478762005797687834606215937047141788172310851894977239440485066834983421712591451120119460943494024647580448304032483364272503481896299565302886865273515628319357845988065131820833740549890162081940001_<271>] Free to factor

3×10²⁸⁰+1 = 3(0)₂₇₉1_<281> = 11091219297373_<14> × 3655852816142757196069_<22> × 40049069614558054280307962562823_<32> × 179806994415353386413053301196877491806559_<42> × 1685830117608555878024162213368547954955073252471586323_<55> × 60945330750594823707608076202355403412583227422527742597800756810342955043031815781887020703344858474019501282956807043_<119> (Makoto Kamada / GMP-ECM 6.3 B1=1e6, sigma=2048388426 for P32 / May 26, 2010 2010 年 5 月 26 日) (Dmitry Domanov / GMP-ECM B1=43000000, sigma=3683190088 for P42 / October 30, 2011 2011 年 10 月 30 日) (Lionel Debroux / GMP-ECM 6.3 + ECMNet 2.7.3 B1=43000000, sigma=2745925504 for P55 / November 1, 2011 2011 年 11 月 1 日)

3×10²⁸¹+1 = 3(0)₂₈₀1_<282> = 13 × 47 × 1619 × [303272614786157424770700630503766140421286098286610817329805935853798337863889228666540640046744419025706397737990657181647154443600897282576280644434088246265450476087459778469463985871539785828879438015626626931214738240351634487757389995440801691048100047613800521426715689_<276>] Free to factor

3×10²⁸²+1 = 3(0)₂₈₁1_<283> = 80987827 × 25248366440491_<14> × 15074985786601825640976385847887_<32> × 3446483892133820284482754061777078017_<37> × 10176715588975981464587005586971581625287961_<44> × 111792808381176064199306739195975917326906699_<45> × 24820673140548908191619076499350337902784096889404228421270215684937658959560883931632207868893267127806053_<107> (Serge Batalov / GMP-ECM B1=2000000, sigma=4036774683 for P32 / May 29, 2010 2010 年 5 月 29 日) (Serge Batalov / GMP-ECM B1=2000000, sigma=570903822 for P44 / May 29, 2010 2010 年 5 月 29 日) (Ignacio Santos / GMP-ECM 6.2.3 B1=11000000, sigma=946848283 for P37 / May 29, 2010 2010 年 5 月 29 日) (Wataru Sakai / GMP-ECM 6.2.3 B1=11000000, sigma=232213904 for P45 / July 19, 2010 2010 年 7 月 19 日)

3×10²⁸³+1 = 3(0)₂₈₂1_<284> = 263 × 49367 × 1754317418317_<13> × 21437157501257_<14> × 3123960118524643_<16> × 253901065132752025451_<21> × 30679747053280703459636449_<26> × 247214911349201948573383056821_<30> × 20847759846550308773998563980449_<32> × 9288960575905414053187770562617622461157_<40> × 52738823769926066112592116216231434219581962873358438237235460121624242028433108165762069_<89> (Serge Batalov / GMP-ECM B1=2000000, sigma=3300553058 for P30 / May 29, 2010 2010 年 5 月 29 日) (Ignacio Santos / GMP-ECM 6.2.3 B1=1000000, sigma=3039296181 for P32 / May 29, 2010 2010 年 5 月 29 日) (Erik Branger / GGNFS, Msieve gnfs for P40 x P89 / October 29, 2010 2010 年 10 月 29 日)

3×10²⁸⁴+1 = 3(0)₂₈₃1_<285> = 7 × 769 × 9540571 × 1155101141584929738692179_<25> × 1463735960835112950721857721485040651220234929_<46> × 3454933967548500437503482599692093090773890478165487838892470126206276436786854033692433869103022190992789276177400800578463982928770815450746781036939774434173305688668369074186257543786151303715492490727_<205> (Dmitry Domanov / GMP-ECM B1=43000000, sigma=586748838 for P46 / October 24, 2011 2011 年 10 月 24 日)

3×10²⁸⁵+1 = 3(0)₂₈₄1_<286> = 17 × 2755237 × 4433057 × 3695964384983780574217033267_<28> × 81781675729707054708819370524269_<32> × 47799821319647034112480467544549072521616563349535754108301950869062354531814701594105726123834744325266830361747877433944602725765460013949191250233063117616362601780236100846431607482766320869926238873775787179_<212> (Makoto Kamada / GMP-ECM 6.3 B1=1e6, sigma=1947032832 for P32 / May 27, 2010 2010 年 5 月 27 日)

3×10²⁸⁶+1 = 3(0)₂₈₅1_<287> = 31 × 187887865009106329_<18> × 5150635648752342706993174953903155427577411151625392925556428324988131295646511802463296215496025513521638351808476276104271087313614107763034293031853459143330085698831694210331862808890070372295468024463468430640784296917431602707134204019611842555814677425455263799_<268>

3×10²⁸⁷+1 = 3(0)₂₈₆1_<288> = 13 × 59 × 356338115053_<12> × 12535184880998365929862861503445027_<35> × 76685281895886958149967438434707339200038671689_<47> × [1141881009476402943384664970640345762740311709101434279378516652956613440999316653196852867022726591486426721016674887641744244854049225652005215371158434470969799706025387831009853725497797217_<193>] (Serge Batalov / GMP-ECM B1=2000000, sigma=619037551 for P35 / May 29, 2010 2010 年 5 月 29 日) (Makso / GMP-ECM B1=110000000, sigma=1130791073 for P47 / December 21, 2011 2011 年 12 月 21 日) Free to factor

3×10²⁸⁸+1 = 3(0)₂₈₇1_<289> = 61 × 29179 × 35249999016000540600754850359_<29> × [47814751881663037669911697805465074290217828629898987858417013706249202194353307717138662534238566687653459572453471019967112289372582560259170648717032748145426107033100016342757792429405208619850451218034379326141337566556504811107344690050947149377481_<254>] Free to factor

3×10²⁸⁹+1 = 3(0)₂₈₈1_<290> = 96263 × 616156733162904270381047_<24> × 5124305024667687158500295402029823_<34> × 98704213118703015315968955442582137514456930117898499138463321330095300533252025313207406762471000972570368239776194000632524213542796394700297097996251779836226502895497902347815903570427686207150283169237399414972679770264767_<227> (Dmitry Domanov / GMP-ECM B1=11000000, sigma=508110751 for P34 / May 8, 2011 2011 年 5 月 8 日)

3×10²⁹⁰+1 = 3(0)₂₈₉1_<291> = 7 × 157 × 5653 × 1378843 × 1608474085717_<13> × 22753177123514018788963_<23> × 5974977314559185228171779_<25> × [160153849334008325060127089845049336708076607181708266147881131828776752909266991290020555600697088354755790773728502564521427956265380623481958777170567906203549965746322622222393918951789197088787774616562987618233209_<219>] Free to factor

3×10²⁹¹+1 = 3(0)₂₉₀1_<292> = 27407 × 14936801007013_<14> × [7328281774144694546043563500738474702321623928745070535827902335389971130011794997923474060908623041297142082837890294473523981914059415796780827702586418987073438465674982695971589914161551320590655964811115397705463670502331797527378804161465998463633431698285819187799811_<274>] Free to factor

3×10²⁹²+1 = 3(0)₂₉₁1_<293> = 19 × 613 × 1029171564312851501005530601_<28> × [2502761127509086669132792978670314284246265039873761428436897992771163392853488943104486977719705456495226858564931723926515081168184534703179672381773247733925216072538548420074818166685483244465982870657169578175494574401783087060927066531366853949874816134183_<262>] Free to factor

3×10²⁹³+1 = 3(0)₂₉₂1_<294> = 13 × 16811 × 69389 × 24629504974103_<14> × 121479408873068145993360410900009780225327_<42> × [6612038482485724152368814538072191217832677221074962349095446629996561479778741030092233342130465736190656430270540423301598712541748167603296481194643296399404821904165492251046375297882985467061843591203095423974236656533855523_<229>] (Dmitry Domanov / GMP-ECM B1=43000000, sigma=3230870182 for P42 / October 14, 2011 2011 年 10 月 14 日) Free to factor

3×10²⁹⁴+1 = 3(0)₂₉₃1_<295> = 499 × 84163 × 415213 × 555049039063849963_<18> × [309953970443144435498213987719435781091129786806315781099272465063167094933370228912609686917066227046638901371459415904026843233711464532679840923911853090576545252653997696164073750953817786028749537710184108087891286191628770508463811184229183661033050914029767_<264>] Free to factor

3×10²⁹⁵+1 = 3(0)₂₉₄1_<296> = 29 × 10402673 × 254240706351833_<15> × [391140893383953653853755792040765335356706252950271149442135423321804247839651144185729158709779521553859513324931823783240946958437991434855623070705282873195063074715418885014445177346803212506600693008944725918701948973425047546987925597260490500050725100238652314620941_<273>] Free to factor

3×10²⁹⁶+1 = 3(0)₂₉₅1_<297> = 7 × 43 × 4007116618048254572444635886065060772611_<40> × [248726911608886238967982250133017013314878464176228415474782933610001552135995589627028573822748792306060308844738357025795559798355100251007582682885698844744976887728022759966325736797094443600638476728600692159952365528634251529711784873493159098811191_<255>] (Dmitry Domanov / ECMNET/GMP-ECM 6.2.3 B1=11000000, sigma=2222750386 for P40 / June 5, 2010 2010 年 6 月 5 日) Free to factor

3×10²⁹⁷+1 = 3(0)₂₉₆1_<298> = 257 × 307 × 386297 × 3503939689721772138561271952468298459303188533_<46> × [28091297430382950889427302845165580753513899671715896039639017203474521637671901009675168954884009770287727633281130194801599419050549088808998669378251757821722485982120926831177733450616970273119353622348668916182887611413182137196910623399_<242>] (Dmitry Domanov / GMP-ECM B1=43000000, sigma=2328726034 for P46 / December 24, 2010 2010 年 12 月 24 日) Free to factor

3×10²⁹⁸+1 = 3(0)₂₉₇1_<299> = 280005331 × 118693332957739_<15> × 10056791215154855325270948342691987_<35> × [89757179211382084550314110864172149901723629213163094868472385284949212017096802229421037625343512910887675293137263889954981829832362846921768921788385488232432728510507265445363590322373453469250696515597864830202792227464507524126338508747_<242>] (Serge Batalov / GMP-ECM B1=3000000, sigma=3528964167 for P35 / May 30, 2010 2010 年 5 月 30 日) Free to factor

3×10²⁹⁹+1 = 3(0)₂₉₈1_<300> = 13 × 23 × 4139 × 24115835683_<11> × 41195338338523_<14> × 649246457151365359213753339534758908964845356301_<48> × 375832784322408936300885472372711200454922479672254517005359195806723598907646694626646362197279079270603265356642180457974471760652997209781691846924046629612518387128025129425821538893950717848170163819208972030445327549_<222> ([SG]marodeur6 / GMP-ECM B1=110000000, sigma=2911128451 for P48 / December 29, 2011 2011 年 12 月 29 日)

3×10³⁰⁰+1 = 3(0)₂₉₉1_<301> = 1549 × 114319033399_<12> × 171075172359981103969606910676242501541629863365403_<51> × [99029436318040208068993088380803051255111531076439116970281800232416389795182251096910432391708894368210759137712164695871647868352889176511845117608519628044190420472117996566711036095111573214605783976699985346765174684826769047200217_<236>] (Dmitry Domanov / ECMNET/GMP-ECM 6.2.3 B1=11000000, sigma=968510242 for P51 / August 14, 2010 2010 年 8 月 14 日) Free to factor

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4. Related links 関連リンク

A056807 - OEIS (The OEIS Foundation Inc.)