Factorization of 644...447

Table of contents 目次

About 644...447 644...447 について
Prime numbers of the form 644...447 644...447 の形の素数
Factor table of 644...447 644...447 の素因数分解表
Related links 関連リンク

1. About 644...447 644...447 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

64w7 = { 67, 647, 6447, 64447, 644447, 6444447, 64444447, 644444447, 6444444447, 64444444447, … }

2. Prime numbers of the form 644...447 644...447 の形の素数

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

58×10¹+239 = 67 is prime. は素数です。
58×10²+239 = 647 is prime. は素数です。
58×10⁵+239 = 644447 is prime. は素数です。
58×10¹⁰+239 = 64444444447_<11> is prime. は素数です。
58×10⁴⁰+239 = 6(4)₃₉7_<41> is prime. は素数です。
58×10⁴⁷+239 = 6(4)₄₆7_<48> is prime. は素数です。
58×10⁵⁸+239 = 6(4)₅₇7_<59> is prime. は素数です。
58×10⁷³+239 = 6(4)₇₂7_<74> is prime. は素数です。
58×10⁹²+239 = 6(4)₉₁7_<93> is prime. は素数です。
58×10¹¹³+239 = 6(4)₁₁₂7_<114> is prime. は素数です。 (discovered by:発見: Makoto Kamada / December 6, 2004 2004 年 12 月 6 日) (certified by:証明: Makoto Kamada / PPSIQS / January 5, 2005 2005 年 1 月 5 日)
58×10¹²⁴+239 = 6(4)₁₂₃7_<125> is prime. は素数です。 (discovered by:発見: Makoto Kamada / December 6, 2004 2004 年 12 月 6 日) (certified by:証明: Makoto Kamada / PPSIQS / January 5, 2005 2005 年 1 月 5 日)
58×10¹³⁰+239 = 6(4)₁₂₉7_<131> is prime. は素数です。 (discovered by:発見: Makoto Kamada / December 6, 2004 2004 年 12 月 6 日) (certified by:証明: Makoto Kamada / PPSIQS / January 5, 2005 2005 年 1 月 5 日)
58×10⁸⁸⁷+239 = 6(4)₈₈₆7_<888> 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: Tyler Cadigan / PRIMO 2.2.0 beta 6 / May 31, 2006 2006 年 5 月 31 日)
58×10¹²³⁴+239 = 6(4)₁₂₃₃7_<1235> 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: Tyler Cadigan / PRIMO 2.2.0 beta 6 / September 12, 2006 2006 年 9 月 12 日) [certificate証明]
58×10¹⁵³⁸+239 = 6(4)₁₅₃₇7_<1539> 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: Tyler Cadigan / PRIMO 2.2.0 beta 6 / August 26, 2006 2006 年 8 月 26 日) [certificate証明]
58×10²⁰⁶³+239 = 6(4)₂₀₆₂7_<2064> 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 3.0.9 / September 1, 2010 2010 年 9 月 1 日) [certificate証明]
58×10²⁵⁹¹+239 = 6(4)₂₅₉₀7_<2592> 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 20, 2012 2012 年 12 月 20 日) [certificate証明]
58×10²⁷⁸⁶+239 = 6(4)₂₇₈₅7_<2787> 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 / January 1, 2013 2013 年 1 月 1 日) [certificate証明]
58×10³¹⁴⁵+239 = 6(4)₃₁₄₄7_<3146> is prime. は素数です。 (discovered by:発見: Makoto Kamada / PFGW / December 18, 2004 2004 年 12 月 18 日) (certified by:証明: Ray Chandler / Primo 4.0.1 - LX64 / February 7, 2013 2013 年 2 月 7 日) [certificate証明]
58×10²¹⁶⁸⁸+239 = 6(4)₂₁₆₈₇7_<21689> is PRP. はおそらく素数です。 (Ray Chandler / srsieve, PFGW / September 16, 2010 2010 年 9 月 16 日)
58×10³²³⁸¹+239 = 6(4)₃₂₃₈₀7_<32382> is PRP. はおそらく素数です。 (Erik Branger / srsieve and PFGW / May 1, 2013 2013 年 5 月 1 日)
58×10³⁹¹⁷⁰+239 = 6(4)₃₉₁₆₉7_<39171> is PRP. はおそらく素数です。 (Erik Branger / srsieve and PFGW / May 1, 2013 2013 年 5 月 1 日)
58×10⁴⁷⁷⁹¹+239 = 6(4)₄₇₇₉₀7_<47792> is PRP. はおそらく素数です。 (Erik Branger / srsieve and PFGW / May 1, 2013 2013 年 5 月 1 日)
58×10⁸³⁸⁷⁸+239 = 6(4)₈₃₈₇₇7_<83879> is PRP. はおそらく素数です。 (Bob Price / September 15, 2015 2015 年 9 月 15 日)

2.3. Range of search 捜索範囲

n≤30000 / Completed 終了 / Ray Chandler / September 19, 2010 2010 年 9 月 19 日
n≤50000 / Completed 終了 / Erik Branger / May 1, 2013 2013 年 5 月 1 日
n≤100000 / Completed 終了 / Bob Price / September 15, 2015 2015 年 9 月 15 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。

58×10^3k+239 = 3×(58×10⁰+239×3+58×10³-19×3×k-1Σm=010^3m)
58×10^6k+3+239 = 7×(58×10³+239×7+58×10³×10⁶-19×7×k-1Σm=010^6m)
58×10^16k+4+239 = 17×(58×10⁴+239×17+58×10⁴×10¹⁶-19×17×k-1Σm=010^16m)
58×10^18k+7+239 = 19×(58×10⁷+239×19+58×10⁷×10¹⁸-19×19×k-1Σm=010^18m)
58×10^33k+1+239 = 67×(58×10¹+239×67+58×10×10³³-19×67×k-1Σm=010^33m)
58×10^35k+24+239 = 71×(58×10²⁴+239×71+58×10²⁴×10³⁵-19×71×k-1Σm=010^35m)
58×10^41k+9+239 = 83×(58×10⁹+239×83+58×10⁹×10⁴¹-19×83×k-1Σm=010^41m)
58×10^44k+31+239 = 89×(58×10³¹+239×89+58×10³¹×10⁴⁴-19×89×k-1Σm=010^44m)
58×10^46k+35+239 = 47×(58×10³⁵+239×47+58×10³⁵×10⁴⁶-19×47×k-1Σm=010^46m)
58×10^53k+26+239 = 107×(58×10²⁶+239×107+58×10²⁶×10⁵³-19×107×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 24.69%. 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 24.69% です。

3. Factor table of 644...447 644...447 の素因数分解表

3.2. Range of factorization 分解範囲

n≤100 / Completed 終了 / January 5, 2005 2005 年 1 月 5 日
n≤150 / Completed 終了 / July 15, 2009 2009 年 7 月 15 日
n≤200 / Completed 終了 / July 2, 2021 2021 年 7 月 2 日
n≤300 / Remaining 50 残り 50

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

n=215, 216, 224, 225, 229, 230, 231, 233, 234, 238, 239, 240, 241, 242, 247, 249, 254, 255, 256, 257, 258, 261, 262, 264, 267, 268, 269, 272, 273, 274, 275, 276, 279, 280, 281, 282, 283, 284, 285, 286, 289, 290, 291, 292, 293, 294, 295, 297, 298, 299 (50/300)

3.4. Factor table 素因数分解表

58×10¹+239 = 67 = definitely prime number 素数

58×10²+239 = 647 = definitely prime number 素数

58×10³+239 = 6447 = 3 × 7 × 307

58×10⁴+239 = 64447 = 17² × 223

58×10⁵+239 = 644447 = definitely prime number 素数

58×10⁶+239 = 6444447 = 3 × 2148149

58×10⁷+239 = 64444447 = 19 × 3391813

58×10⁸+239 = 644444447 = 13591 × 47417

58×10⁹+239 = 6444444447_<10> = 3² × 7 × 83 × 163 × 7561

58×10¹⁰+239 = 64444444447_<11> = definitely prime number 素数

58×10¹¹+239 = 644444444447_<12> = 179 × 389 × 9255137

58×10¹²+239 = 6444444444447_<13> = 3 × 42509 × 50533961

58×10¹³+239 = 64444444444447_<14> = 2251 × 28629251197_<11>

58×10¹⁴+239 = 644444444444447_<15> = 11437 × 56347332731_<11>

58×10¹⁵+239 = 6444444444444447_<16> = 3 × 7 × 439 × 1201 × 1931 × 301423

58×10¹⁶+239 = 64444444444444447_<17> = 167 × 385894876912841_<15>

58×10¹⁷+239 = 644444444444444447_<18> = 881 × 14713 × 49717392199_<11>

58×10¹⁸+239 = 6444444444444444447_<19> = 3⁵ × 3019 × 8784480790991_<13>

58×10¹⁹+239 = 64444444444444444447_<20> = 1687015357_<10> × 38200271371_<11>

58×10²⁰+239 = 644444444444444444447_<21> = 17 × 113 × 709 × 947 × 499645413409_<12>

58×10²¹+239 = 6444444444444444444447_<22> = 3 × 7 × 306878306878306878307_<21>

58×10²²+239 = 64444444444444444444447_<23> = 41761 × 1543172923168612927_<19>

58×10²³+239 = 644444444444444444444447_<24> = 569 × 24061 × 729217 × 64550968099_<11>

58×10²⁴+239 = 6444444444444444444444447_<25> = 3 × 71 × 25439 × 1189339507071679421_<19>

58×10²⁵+239 = 64444444444444444444444447_<26> = 19 × 691 × 40385363 × 121542970132061_<15>

58×10²⁶+239 = 644444444444444444444444447_<27> = 107 × 8805253 × 684005930912118457_<18>

58×10²⁷+239 = 6444444444444444444444444447_<28> = 3² × 7² × 59 × 137142967573_<12> × 1806014946881_<13>

58×10²⁸+239 = 64444444444444444444444444447_<29> = 5101 × 193286397097_<12> × 65362532352451_<14>

58×10²⁹+239 = 644444444444444444444444444447_<30> = 11287 × 57096167665849600819034681_<26>

58×10³⁰+239 = 6444444444444444444444444444447_<31> = 3 × 150061 × 14315166153418597424701609_<26>

58×10³¹+239 = 64444444444444444444444444444447_<32> = 89 × 53897 × 266381 × 10796893 × 4671204093623_<13>

58×10³²+239 = 644444444444444444444444444444447_<33> = 8929 × 117929646076651_<15> × 612011617196093_<15>

58×10³³+239 = 6444444444444444444444444444444447_<34> = 3 × 7 × 151 × 1528010587_<10> × 1330034415571923960911_<22>

58×10³⁴+239 = 64444444444444444444444444444444447_<35> = 67 × 2235427 × 430279038308040266589586183_<27>

58×10³⁵+239 = 644444444444444444444444444444444447_<36> = 47² × 1786217 × 163326084220258266215162599_<27>

58×10³⁶+239 = 6444444444444444444444444444444444447_<37> = 3² × 17 × 1489 × 17431 × 91969 × 17645565795563906586769_<23>

58×10³⁷+239 = 64444444444444444444444444444444444447_<38> = 659 × 6829 × 18911 × 103811 × 1726400503_<10> × 4225163639579_<13>

58×10³⁸+239 = 644444444444444444444444444444444444447_<39> = 191 × 15662201531_<11> × 215426590972985642871047507_<27>

58×10³⁹+239 = 6444444444444444444444444444444444444447_<40> = 3 × 7 × 313 × 101279 × 407137 × 17233261 × 1379730959776950713_<19>

58×10⁴⁰+239 = 64444444444444444444444444444444444444447_<41> = definitely prime number 素数

58×10⁴¹+239 = 644444444444444444444444444444444444444447_<42> = 5660279 × 44028197 × 2585929881523625928209588069_<28>

58×10⁴²+239 = 6444444444444444444444444444444444444444447_<43> = 3 × 330643 × 344681 × 22706675964451_<14> × 830106835356833653_<18>

58×10⁴³+239 = 64444444444444444444444444444444444444444447_<44> = 19 × 1172497 × 2892811551327701498077873858523370229_<37>

58×10⁴⁴+239 = 644444444444444444444444444444444444444444447_<45> = 1019 × 1287934601_<10> × 491040698904780295481955431515013_<33>

58×10⁴⁵+239 = 6444444444444444444444444444444444444444444447_<46> = 3³ × 7 × 1990824348916919_<16> × 17127372222313605986726000717_<29>

58×10⁴⁶+239 = 64444444444444444444444444444444444444444444447_<47> = 1109 × 294563 × 13203979 × 29196726683269_<14> × 511725141057264391_<18>

58×10⁴⁷+239 = 644444444444444444444444444444444444444444444447_<48> = definitely prime number 素数

58×10⁴⁸+239 = 6444444444444444444444444444444444444444444444447_<49> = 3 × 1913 × 900302271521_<12> × 10153576059323_<14> × 122840588127429742631_<21>

58×10⁴⁹+239 = 64444444444444444444444444444444444444444444444447_<50> = 9133 × 393487 × 20033796233190648913_<20> × 895114073795675173189_<21>

58×10⁵⁰+239 = 644444444444444444444444444444444444444444444444447_<51> = 83 × 1117 × 1720217 × 4040833754902042666051785389789113733681_<40>

58×10⁵¹+239 = 6(4)₅₀7_<52> = 3 × 7 × 17439448243815774149_<20> × 17596789909172120818546910075143_<32>

58×10⁵²+239 = 6(4)₅₁7_<53> = 17 × 1180956678143767879_<19> × 3209981994564852340924049519840729_<34>

58×10⁵³+239 = 6(4)₅₂7_<54> = 63672997 × 10121157709043355450104609406785806618219092851_<47>

58×10⁵⁴+239 = 6(4)₅₃7_<55> = 3² × 373 × 6229 × 61859071 × 162730303 × 147463261523_<12> × 207615680048563156901_<21>

58×10⁵⁵+239 = 6(4)₅₄7_<56> = 17443 × 14840509747499412276589_<23> × 248951922735640610964726794761_<30>

58×10⁵⁶+239 = 6(4)₅₅7_<57> = 109 × 2729 × 28618260450947_<14> × 75702848068494567012378656352722808641_<38>

58×10⁵⁷+239 = 6(4)₅₆7_<58> = 3 × 7 × 61 × 317 × 3449 × 270866869740588581_<18> × 16987442860028255673835255671719_<32>

58×10⁵⁸+239 = 6(4)₅₇7_<59> = definitely prime number 素数

58×10⁵⁹+239 = 6(4)₅₈7_<60> = 71 × 7219 × 1304611387_<10> × 963760069714422318466129093823667494331302569_<45>

58×10⁶⁰+239 = 6(4)₅₉7_<61> = 3 × 1723755441117571726779991_<25> × 1246202388637814882116244943747363539_<37>

58×10⁶¹+239 = 6(4)₆₀7_<62> = 19 × 11441291 × 3019062829_<10> × 39599582312182159_<17> × 2479671184641642083164799813_<28>

58×10⁶²+239 = 6(4)₆₁7_<63> = 6695198813_<10> × 31907755684909159903_<20> × 3016655717844920172476760136718773_<34>

58×10⁶³+239 = 6(4)₆₂7_<64> = 3² × 7 × 699988923732253876616841556319_<30> × 146134839411491406463939981319551_<33>

58×10⁶⁴+239 = 6(4)₆₃7_<65> = 536441 × 15030902705130508825193_<23> × 7992422929247286578172404271400733119_<37>

58×10⁶⁵+239 = 6(4)₆₄7_<66> = 953 × 94709 × 833710204681_<12> × 8564188449233521385725022137887132331244212931_<46>

58×10⁶⁶+239 = 6(4)₆₅7_<67> = 3 × 1039 × 17351 × 602521084467088331674121_<24> × 197766133578362325741746130870127621_<36>

58×10⁶⁷+239 = 6(4)₆₆7_<68> = 67 × 997 × 126397 × 431887 × 311075292077900177_<18> × 56812396262900129073014414243551451_<35>

58×10⁶⁸+239 = 6(4)₆₇7_<69> = 17 × 227 × 1211904791735153_<16> × 137797774296582631980727682108891433849061718314261_<51>

58×10⁶⁹+239 = 6(4)₆₈7_<70> = 3 × 7² × 12853 × 512709441649206427541_<21> × 6652614019733547090339008718138312302341837_<43>

58×10⁷⁰+239 = 6(4)₆₉7_<71> = 80449183 × 801057786310203354637478971594334829285269987694523192913524609_<63>

58×10⁷¹+239 = 6(4)₇₀7_<72> = 283 × 853 × 3389557 × 787602481633509134852922905053973237950294867519675341991829_<60>

58×10⁷²+239 = 6(4)₇₁7_<73> = 3³ × 1877741 × 321168969293_<12> × 395778732128062920094222613426112458748818160790490597_<54>

58×10⁷³+239 = 6(4)₇₂7_<74> = definitely prime number 素数

58×10⁷⁴+239 = 6(4)₇₃7_<75> = 1567 × 7762237426243_<13> × 301533859530907_<15> × 1705061285093351_<16> × 103051302440371135810140252391_<30>

58×10⁷⁵+239 = 6(4)₇₄7_<76> = 3 × 7 × 89 × 839 × 16493 × 765767 × 1110041 × 4478544402907_<13> × 65454877078804352702320615088677508900861_<41>

58×10⁷⁶+239 = 6(4)₇₅7_<77> = 18143 × 20597041 × 6662499647_<10> × 17264008072673_<14> × 1499314429260766890745436569450081592662799_<43>

58×10⁷⁷+239 = 6(4)₇₆7_<78> = 1787 × 706640749 × 965035727989_<12> × 528833381865291505267712252929796038351657053977912221_<54>

58×10⁷⁸+239 = 6(4)₇₇7_<79> = 3 × 2148148148148148148148148148148148148148148148148148148148148148148148148148149_<79>

58×10⁷⁹+239 = 6(4)₇₈7_<80> = 19 × 107 × 15168983833_<11> × 2089736926865849721728590061267006503849209604576873445894821054823_<67>

58×10⁸⁰+239 = 6(4)₇₉7_<81> = 1013 × 330661 × 68725043 × 791930614157_<12> × 14819877548341_<14> × 2385318060053866781115384961143542257069_<40>

58×10⁸¹+239 = 6(4)₈₀7_<82> = 3² × 7 × 47 × 40408327 × 53861222533512696319700244467273390448044295508503664699569708796120601_<71>

58×10⁸²+239 = 6(4)₈₁7_<83> = 181 × 3643 × 5172262369023571_<16> × 18895882997841577989073795161873302519446357938428969782914979_<62>

58×10⁸³+239 = 6(4)₈₂7_<84> = 769 × 4243 × 27200462371847_<14> × 7261223859601928016891175613380105649012064299833090275553531603_<64>

58×10⁸⁴+239 = 6(4)₈₃7_<85> = 3 × 17 × 1223 × 8179 × 1755707 × 26279992231_<11> × 40843729718503_<14> × 6703258630618969759907952171111886533260053091_<46>

58×10⁸⁵+239 = 6(4)₈₄7_<86> = 59 × 227939225824244137867253_<24> × 112547420431675749317408327_<27> × 42577372596873517851084919204218143_<35>

58×10⁸⁶+239 = 6(4)₈₅7_<87> = 2747176575503_<13> × 234584281982838525989934471493339449898044759334673611396494824113010481649_<75>

58×10⁸⁷+239 = 6(4)₈₆7_<88> = 3 × 7 × 761 × 3463 × 167524481 × 695105556120138864023289368321023705738974930316155004609879548430467629_<72>

58×10⁸⁸+239 = 6(4)₈₇7_<89> = 15643 × 1060680480776618350957008878311_<31> × 3884014673953907538322737468714146785908715314687866539_<55> (Makoto Kamada / GGNFS-0.70.3 / 0.19 hours)

58×10⁸⁹+239 = 6(4)₈₈7_<90> = 516377 × 3707905135988923_<16> × 9942837994362140321_<19> × 33851632413614506772660351491504189082925734645717_<50>

58×10⁹⁰+239 = 6(4)₈₉7_<91> = 3² × 97 × 163 × 5011 × 42381869 × 549508689283924883999072827_<27> × 388065079746674262166466873507286167140084149121_<48>

58×10⁹¹+239 = 6(4)₉₀7_<92> = 83 × 359 × 41519 × 79686199 × 1618575061088633_<16> × 38792370535224348262207811_<26> × 10411271759584206739022963513074817_<35>

58×10⁹²+239 = 6(4)₉₁7_<93> = definitely prime number 素数

58×10⁹³+239 = 6(4)₉₂7_<94> = 3 × 7 × 5231 × 13325461 × 335664032628454258583_<21> × 13115788928120560930516353478715738116161266460260779539253519_<62>

58×10⁹⁴+239 = 6(4)₉₃7_<95> = 71 × 263 × 653 × 21636464844722458659751403133134290781_<38> × 244270995453285535988095567371181706925372950457223_<51> (Makoto Kamada / GGNFS-0.71.1 / 0.40 hours)

58×10⁹⁵+239 = 6(4)₉₄7_<96> = 971 × 220932463429759_<15> × 3004046972454368365301051975366247600831990160082946654731582906264474925560323_<79>

58×10⁹⁶+239 = 6(4)₉₅7_<97> = 3 × 2148148148148148148148148148148148148148148148148148148148148148148148148148148148148148148148149_<97>

58×10⁹⁷+239 = 6(4)₉₆7_<98> = 19 × 846383 × 4007420831345946248201833998907203976677004223261899191491101387311744238000778448405835211_<91>

58×10⁹⁸+239 = 6(4)₉₇7_<99> = 79967 × 792710221347162734174698101869031414448048247_<45> × 10166236824593254511529309325059262437013650244103_<50> (Makoto Kamada / GGNFS-0.71.1 / 0.56 hours)

58×10⁹⁹+239 = 6(4)₉₈7_<100> = 3⁴ × 7 × 719 × 4907431 × 3221212182050162571561865734160285886513883809903485355245756929235006879429212561058769_<88>

58×10¹⁰⁰+239 = 6(4)₉₉7_<101> = 17 × 67 × 176675626703_<12> × 361104370643_<12> × 19648979433622018554761_<23> × 45134888766134011275774308152894190875119413456368417_<53>

58×10¹⁰¹+239 = 6(4)₁₀₀7_<102> = 74892740951916065159_<20> × 8604898635746311244758418813159927708382511486481441188864380259838171494408913833_<82>

58×10¹⁰²+239 = 6(4)₁₀₁7_<103> = 3 × 4255169 × 1272211987_<10> × 396814864969581473223297935337101166253655743082132996770375378492574562660450775450583_<87>

58×10¹⁰³+239 = 6(4)₁₀₂7_<104> = 1847610997_<10> × 34879877067783248555997009171538528380194764798991096524873327783318256816180037298427296838851_<95>

58×10¹⁰⁴+239 = 6(4)₁₀₃7_<105> = 506809 × 53100053 × 77286826000327_<14> × 163897923512372983_<18> × 69615172602452349307391208089_<29> × 27155848883350096318618137500339_<32> (Makoto Kamada / GMP-ECM 6.2.3 B1=1e6, sigma=4107787216 for P32 / July 4, 2009 2009 年 7 月 4 日)

58×10¹⁰⁵+239 = 6(4)₁₀₄7_<106> = 3 × 7 × 120167 × 304798728257921_<15> × 5978131975874559537004027901159_<31> × 1401529751193343301142506954909109099808272119184030739_<55> (Makoto Kamada / GMP-ECM 6.2.3 B1=1e6, sigma=80318575 for P31 / July 4, 2009 2009 年 7 月 4 日)

58×10¹⁰⁶+239 = 6(4)₁₀₅7_<107> = 492161744461753_<15> × 78129326361730982026375097231768957_<35> × 1675959621960563483941991874954435017512192924461523251107_<58> (Jo Yeong Uk / GGNFS-0.77.1-20050930-nocona snfs / 0.43 hours on Core 2 Quad Q6700 / July 13, 2009 2009 年 7 月 13 日)

58×10¹⁰⁷+239 = 6(4)₁₀₆7_<108> = 24671 × 206511599081_<12> × 480607992521_<12> × 953312913809685557_<18> × 23546457116538591460406682287_<29> × 11724713664825132581594694426845923_<35>

58×10¹⁰⁸+239 = 6(4)₁₀₇7_<109> = 3² × 151 × 41461669 × 315513713687_<12> × 362494153751830653158283463841961150021439336635907601181988836338783232956668849941611_<87>

58×10¹⁰⁹+239 = 6(4)₁₀₈7_<110> = 4387099 × 14689535030881328286515632413228979889545333817277532247265093503575926698814967349595813644607619851853_<104>

58×10¹¹⁰+239 = 6(4)₁₀₉7_<111> = 7757707 × 16704887299_<11> × 70510507217_<11> × 509180396670673477949598152869_<30> × 138510611798590873987507466756338302316554847301957923_<54> (Makoto Kamada / GMP-ECM 6.2.3 B1=1e6, sigma=2818296486 for P30 / July 4, 2009 2009 年 7 月 4 日)

58×10¹¹¹+239 = 6(4)₁₁₀7_<112> = 3 × 7² × 32789 × 48039247 × 577672633 × 50196008649124066760669118985278755117_<38> × 959826657005513846552635296036664574714149430138227_<51> (Robert Backstrom / GGNFS-0.77.1-20051202-athlon snfs / 0.65 hours / July 13, 2009 2009 年 7 月 13 日)

58×10¹¹²+239 = 6(4)₁₁₁7_<113> = 367 × 433 × 479 × 559426740713_<12> × 47167710691602378322153_<23> × 32085439322773338694573150904644715702977220577715916835938109552641167_<71>

58×10¹¹³+239 = 6(4)₁₁₂7_<114> = definitely prime number 素数

58×10¹¹⁴+239 = 6(4)₁₁₃7_<115> = 3 × 4335063118793507391728654777432128393_<37> × 495528689959651579368664634248240159079415334936580114911985607106035232953293_<78> (Sinkiti Sibata / Msieve 1.40 snfs / 1.16 hours / July 13, 2009 2009 年 7 月 13 日)

58×10¹¹⁵+239 = 6(4)₁₁₄7_<116> = 19 × 54287 × 1955854867_<10> × 2409095159_<10> × 7925662807_<10> × 1673053655494998247635392744072754454703724628119731895202231223706666845122935769_<82>

58×10¹¹⁶+239 = 6(4)₁₁₅7_<117> = 17 × 7591 × 9173 × 24979 × 755827575413_<12> × 139140350201119489_<18> × 51654257896074362107_<20> × 12421599900987859794148549_<26> × 322991908093238590128039368653_<30>

58×10¹¹⁷+239 = 6(4)₁₁₆7_<118> = 3² × 7 × 61 × 333522290074209467502371_<24> × 3949585256908915681941269_<25> × 1273030305345911801781926497062397073761318446344704655906713793771_<67>

58×10¹¹⁸+239 = 6(4)₁₁₇7_<119> = 9431 × 6833256753731782890938865915008423756170548663391416015740053487906313693610904935260782996972160369467123787980537_<115>

58×10¹¹⁹+239 = 6(4)₁₁₈7_<120> = 89 × 425273 × 17996597 × 10596796586393_<14> × 20335536686739297898769_<23> × 4390429812314010181609446144428107941090052213717017714875034607233499_<70>

58×10¹²⁰+239 = 6(4)₁₁₉7_<121> = 3 × 16481 × 670037 × 3592422000876207144080797101689943790151669878642591_<52> × 54149510756258711112608068985210572030309207474345155051487_<59> (Robert Backstrom / GGNFS-0.77.1-20051202-athlon snfs / 1.72 hours / July 14, 2009 2009 年 7 月 14 日)

58×10¹²¹+239 = 6(4)₁₂₀7_<122> = 190167453708004564154263702851893_<33> × 3418308221500677523253147307603431_<34> × 99137525166156300602029321996108368406137695714824853509_<56> (Makoto Kamada / GMP-ECM 6.2.3 B1=1e6, sigma=900063379 for P33 / July 4, 2009 2009 年 7 月 4 日) (Makoto Kamada / GMP-ECM 6.2.3 B1=1e6, sigma=3379191283 for P34 / July 4, 2009 2009 年 7 月 4 日)

58×10¹²²+239 = 6(4)₁₂₁7_<123> = 24375819547_<11> × 26437857533440676337988663583555714137829330413546339026992159593888235984504945697219000028907805256999773786701_<113>

58×10¹²³+239 = 6(4)₁₂₂7_<124> = 3 × 7 × 24391 × 13990433 × 50773799828332712760339199634604292107704204758339_<50> × 17711924842507332373590758448378995774984298667244766404457271_<62> (JPascoa / Chris Monico ggnfs-0.77.1, Msieve 1.40 snfs / 1.92 hours on Core 2 6600@2.4 GHz , Windows XP 32-bit and Cygwin / July 14, 2009 2009 年 7 月 14 日)

58×10¹²⁴+239 = 6(4)₁₂₃7_<125> = definitely prime number 素数

58×10¹²⁵+239 = 6(4)₁₂₄7_<126> = 974736791340018918589686620786549510151975781_<45> × 661147142664528713748930535458851545304856790693588371526999971594298072964481587_<81> (Sinkiti Sibata / Msieve 1.40 snfs / 2.33 hours / July 13, 2009 2009 年 7 月 13 日)

58×10¹²⁶+239 = 6(4)₁₂₅7_<127> = 3³ × 5010413786929_<13> × 82975754358631_<14> × 574112386425880392293690501287060026304773997005612227494099904536175604492970913426891427120877339_<99>

58×10¹²⁷+239 = 6(4)₁₂₆7_<128> = 47 × 62191 × 22047537303387759959946467058907560492075183774776347690879690276195962008748082672030756466590207327818331941867638522111_<122>

58×10¹²⁸+239 = 6(4)₁₂₇7_<129> = 131 × 41813 × 21245655914760583_<17> × 760985107913167809574082276999951959_<36> × 7277070100650168876742315488211887360553220961176794222662356452710017_<70> (Jo Yeong Uk / GGNFS/Msieve v1.39 snfs / 1.72 hours on Core 2 Quad Q6700 / July 14, 2009 2009 年 7 月 14 日)

58×10¹²⁹+239 = 6(4)₁₂₈7_<130> = 3 × 7 × 71 × 421 × 1390317957013_<13> × 75763157022055757160940379455506947440975308080533513_<53> × 97466091234717045166053084915874283627086578275412208937333_<59> (Jo Yeong Uk / GGNFS/Msieve v1.39 snfs / 1.47 hours on Core 2 Quad Q6700 / July 14, 2009 2009 年 7 月 14 日)

58×10¹³⁰+239 = 6(4)₁₂₉7_<131> = definitely prime number 素数

58×10¹³¹+239 = 6(4)₁₃₀7_<132> = 5350911483326430577_<19> × 51911906917825937868359_<23> × 2320014690674798271610913802689019697454506737753220988970627621500512044468768977448043129_<91>

58×10¹³²+239 = 6(4)₁₃₁7_<133> = 3 × 17 × 83 × 107 × 113 × 9377839 × 54324469205731_<14> × 131229719259439253_<18> × 4760339406616587863684474719485370271377_<40> × 395645847713421982074206853379199386478310056581_<48> (Sinkiti Sibata / Msieve 1.41 for P40 x P48 / 0.93 hours / July 13, 2009 2009 年 7 月 13 日)

58×10¹³³+239 = 6(4)₁₃₂7_<134> = 19 × 67 × 191 × 2351 × 2301149369_<10> × 520474935617479691947199_<24> × 94129652209238713359032997541674914602999496290821244829581510723857914782983842068562152609_<92>

58×10¹³⁴+239 = 6(4)₁₃₃7_<135> = 541 × 739 × 5413 × 20093092051_<11> × 32899582203251_<14> × 1564367318684486358102611_<25> × 287958473312547199315826406872594761956399566447940801498707794933876295279471_<78>

58×10¹³⁵+239 = 6(4)₁₃₄7_<136> = 3² × 7 × 23082255542566823599333086556290313_<35> × 186979259626794060686307795753842713194685315639_<48> × 23701359305376003078608706474526261487024092056393967_<53> (Dmitry Domanov / GGNFS/msieve 1.41 snfs / 3.57 hours / July 13, 2009 2009 年 7 月 13 日)

58×10¹³⁶+239 = 6(4)₁₃₅7_<137> = 317 × 463 × 4231 × 6119790257462840180408171750175750836047_<40> × 16957650012616993070182468852439375057528923539892416047822926309148813178064338505119101_<89> (Jo Yeong Uk / GGNFS/Msieve v1.39 snfs / 2.64 hours on Core 2 Quad Q6700 / July 14, 2009 2009 年 7 月 14 日)

58×10¹³⁷+239 = 6(4)₁₃₆7_<138> = 103387 × 2786783 × 15964468923323_<14> × 120751037427907_<15> × 10914273705227128073_<20> × 12385713093431669653483_<23> × 8583317849502423601366809152021230868217075276136586299393_<58>

58×10¹³⁸+239 = 6(4)₁₃₇7_<139> = 3 × 443 × 1636781 × 7342583 × 55020989785549_<14> × 1844361277958936963_<19> × 2036625514067175091_<19> × 48727559996110881335381_<23> × 40064601203485791869869926078248804298255977816933_<50>

58×10¹³⁹+239 = 6(4)₁₃₈7_<140> = 1938058158904057175420875818268265892536340598520596225753765591909_<67> × 33252069422357691954035197580335551879441443411363876229822358630860524083_<74> (Sinkiti Sibata / Msieve 1.40 snfs / 6.74 hours / July 14, 2009 2009 年 7 月 14 日)

58×10¹⁴⁰+239 = 6(4)₁₃₉7_<141> = 149 × 557 × 7765045780300078855378699943904238242314947579246977991450416835690292487853727958315092169754611165332551473551316911600308995270016079_<136>

58×10¹⁴¹+239 = 6(4)₁₄₀7_<142> = 3 × 7 × 436439 × 103617691367_<12> × 2579254893476128243_<19> × 76186258682820596721818032631403693765457390966091_<50> × 34533278839482980957953122866654334570356354654042530003_<56> (Jo Yeong Uk / GGNFS/Msieve v1.39 snfs / 4.22 hours on Core 2 Quad Q6700 / July 14, 2009 2009 年 7 月 14 日)

58×10¹⁴²+239 = 6(4)₁₄₁7_<143> = 1249 × 2347 × 24919 × 466183 × 15523710638280211453_<20> × 5264538448831778063739858965185820207_<37> × 23156188327031872626489300434370560937362355885611469744116956097040047_<71> (JPascoa / ggnfs, Msieve 1.40 gnfs for P37 x P71 / 10.92 hours on Core 2, Windows XP 32 bit, Cygwin / July 14, 2009 2009 年 7 月 14 日)

58×10¹⁴³+239 = 6(4)₁₄₂7_<144> = 59 × 5099 × 59693 × 1516609 × 3036521 × 15974908379_<11> × 148941536483897_<15> × 5333497182054361093_<19> × 499081496116035611271182301806421779_<36> × 1230374701601159680400591253851230606701511_<43> (Makoto Kamada / Msieve 1.41 for P36 x P43 / July 13, 2009 2009 年 7 月 13 日)

58×10¹⁴⁴+239 = 6(4)₁₄₃7_<145> = 3² × 233 × 419 × 39163 × 118640521 × 162435827 × 9718118915611985971681914312649433793130146260840089162148525744839597035944763208249513903661705914246560969414261949_<118>

58×10¹⁴⁵+239 = 6(4)₁₄₄7_<146> = 318103 × 23255597 × 24166991 × 24837440522145492041_<20> × 155862830136335532804447504661369172098147_<42> × 93114699926353630931013362844178771981034759538690356442350389481_<65> (Jo Yeong Uk / GGNFS/Msieve v1.39 gnfs for P42 x P65 / 6.15 hours on Core 2 Quad Q6700 / July 15, 2009 2009 年 7 月 15 日)

58×10¹⁴⁶+239 = 6(4)₁₄₅7_<147> = 225240727286207539_<18> × 7984979862480793926125756973956199182887_<40> × 358314792650653686950640911375423315769676174740273424441797231618837823936703464982949779_<90> (JPascoa / ggnfs, Msieve 1.40 snfs / 22.89 hours on dual xenon cpu 3.06, windows 2003, cygnus / July 14, 2009 2009 年 7 月 14 日)

58×10¹⁴⁷+239 = 6(4)₁₄₆7_<148> = 3 × 7 × 19448841488893_<14> × 805559364860507_<15> × 117743176838317603744085092073414896474908231317839_<51> × 166356261680136035603069369279866858793166950948301687007455754691363_<69> (Jo Yeong Uk / GGNFS/Msieve v1.39 snfs / 8.55 hours on Core 2 Quad Q6700 / July 15, 2009 2009 年 7 月 15 日)

58×10¹⁴⁸+239 = 6(4)₁₄₇7_<149> = 17 × 15737 × 1600057148951_<13> × 281957788581047651_<18> × 957229269729820319274362209397_<30> × 557800703761628951235813012289882908409521924268072584602236892834526943369023125519_<84> (Jo Yeong Uk / GMP-ECM 6.2.3 B1=1000000, sigma=6037326045 for P30 / July 14, 2009 2009 年 7 月 14 日)

58×10¹⁴⁹+239 = 6(4)₁₄₈7_<150> = 51307 × 814665077 × 125452973878408950737_<21> × 239805938435749179530628678236164969_<36> × 41430417338281880250147847818250316533_<38> × 12369996045565239429686508194506888049892077_<44> (Jo Yeong Uk / GMP-ECM 6.2.3 B1=1000000, sigma=5739799736 for P36, YAFU 1.10 Msieve 1.38 for P38 x P44 / July 14, 2009 2009 年 7 月 14 日)

58×10¹⁵⁰+239 = 6(4)₁₄₉7_<151> = 3 × 2003 × 92551 × 107201 × 3391945245606732612163_<22> × 2399679341298100809951191715143165897321865029_<46> × 13280098068807257841052877871669566506875479890479596261399064850887679_<71> (Jo Yeong Uk / GMP-ECM 6.2.3 B1=1000000, sigma=4284733017 for P46 / July 14, 2009 2009 年 7 月 14 日)

58×10¹⁵¹+239 = 6(4)₁₅₀7_<152> = 19² × 193 × 2078357 × 20362533309101_<14> × 4925716389556747013_<19> × 4437104063149312787640191147387769956742847777492629514341637629936642153583985944843054803242184989522611979_<109>

58×10¹⁵²+239 = 6(4)₁₅₁7_<153> = 13028076134156851051_<20> × 49465818115296997917013037862556916699931191737134561743173826981152890275760684805728177916724649754636688144243752988330561761517597_<134>

58×10¹⁵³+239 = 6(4)₁₅₂7_<154> = 3³ × 7² × 13386589 × 92319833 × 394377397 × 814705712881851172222015572110575961300237593_<45> × 12267269943728648564005575671767203078380537568076048469810797003362184815778995757_<83> (Jo Yeong Uk / GGNFS/Msieve v1.39 snfs / 12.80 hours on Core 2 Quad Q6700 / July 16, 2009 2009 年 7 月 16 日)

58×10¹⁵⁴+239 = 6(4)₁₅₃7_<155> = 2221 × 64282310843_<11> × 826950947036232072542160696882965155619752449697_<48> × 545840424644446244851714823114328414970104900490414450438285896386706980952189028867721389217_<93> (Dmitry Domanov / GGNFS/msieve 1.41 snfs / 19.28 hours / July 13, 2009 2009 年 7 月 13 日)

58×10¹⁵⁵+239 = 6(4)₁₅₄7_<156> = 5039 × 9349 × 14946877219_<11> × 915219993496024728740660358560541186360768455990400673240530793211600786756528126021810986276947390795552945581796784482180515806796542783_<138>

58×10¹⁵⁶+239 = 6(4)₁₅₅7_<157> = 3 × 307 × 763897 × 120066543180694111133541404474922697213321_<42> × 76290250756513641445476454090142648409983943145226476005174220199825080683439408569647411791219214819389111_<107> (JPascoa / ggnfs, Msieve 1.40 snfs / 59.23 hours on Dual Xeon 3.06, Windows 2005, Cygwin / July 15, 2009 2009 年 7 月 15 日)

58×10¹⁵⁷+239 = 6(4)₁₅₆7_<158> = 3533 × 27409 × 665500913306489160683133612435925500353390737996371787698374649299520760285500488464475090233691139096181809791708391709381010911102040333662743663851_<150>

58×10¹⁵⁸+239 = 6(4)₁₅₇7_<159> = 507258946185199073_<18> × 1278645878079139367561302863672131908561906870215169_<52> × 993586051553808199193408457585820294273094326234517367149202785954627596743988796894988031_<90> (Jo Yeong Uk / GGNFS/Msieve v1.39 snfs / 19.20 hours on Core 2 Quad Q6700 / July 17, 2009 2009 年 7 月 17 日)

58×10¹⁵⁹+239 = 6(4)₁₅₈7_<160> = 3 × 7 × 499 × 619 × 649879 × 1003059847_<10> × 20059838014054639_<17> × 135995251514984260891294994363_<30> × 558681742742766759163940998916031162988864318517096048533861198413220411759286615774844288967_<93> (Makoto Kamada / GMP-ECM 6.2.3 B1=1e6, sigma=2897476486 for P30 / July 5, 2009 2009 年 7 月 5 日)

58×10¹⁶⁰+239 = 6(4)₁₅₉7_<161> = 1642187 × 67538147 × 191584798553051677_<18> × 3032862258054627245298257337447171987397166605898087372017783779349895635623802110021085436600306391491043106957268919653029659499_<130>

58×10¹⁶¹+239 = 6(4)₁₆₀7_<162> = 41119327973436033475483754806134272837_<38> × 26871790039300526486196912904597959855554874021199_<50> × 583234060233196823479456446336892759281171709697223343472935319966425238269_<75> (Jo Yeong Uk / GMP-ECM 6.2.3 B1=1000000, sigma=1512772174 for P38 / July 13, 2009 2009 年 7 月 13 日) (Jo Yeong Uk / GGNFS/Msieve v1.39 snfs / 20.09 hours on Core 2 Quad Q6700 / July 18, 2009 2009 年 7 月 18 日)

58×10¹⁶²+239 = 6(4)₁₆₁7_<163> = 3² × 24247 × 1079831 × 2020506749_<10> × 149341881640836290021255337570732276202949_<42> × 90633185966835800545817749240634207154524406954605664798680122666388901649995696515931063037625341319_<101> (Jo Yeong Uk / GGNFS/Msieve v1.39 snfs / 26.23 hours on Core 2 Quad Q6700 / July 18, 2009 2009 年 7 月 18 日)

58×10¹⁶³+239 = 6(4)₁₆₂7_<164> = 89 × 1361722388871787_<16> × 4310597647035065104719854951_<28> × 1394721122046343598898954744537561461564601370683041_<52> × 88446781495499968050670791016168541995795404733544043226877321557619_<68> (JPascoa / ggnfs, Msieve 1.40 snfs / 122.50 hours on dual core xeon 3.06 4 threads windows 2003 cygwin / July 20, 2009 2009 年 7 月 20 日)

58×10¹⁶⁴+239 = 6(4)₁₆₃7_<165> = 17 × 71 × 109 × 1811 × 11500057744747399273355108662919213155050608195831_<50> × 235197794368519156880312362442167554274367596081043998198046134333506670922483690675068444570466640194016809_<108> (Robert Backstrom / GGNFS-0.77.1-20060513-pentium-m, Msieve 1.39 snfs / 33.45 hours, 0.81 hours / July 18, 2009 2009 年 7 月 18 日)

58×10¹⁶⁵+239 = 6(4)₁₆₄7_<166> = 3 × 7 × 2521 × 6521 × 29605331180473_<14> × 140513717693441_<15> × 4645907577671597_<16> × 965872785151028480289103930447332382834436339351426708907829203162375863814167600921243876452432546831529287961687_<114>

58×10¹⁶⁶+239 = 6(4)₁₆₅7_<167> = 67 × 269 × 24659821 × 359583120536779_<15> × 37955506286865983_<17> × 34290262392024774518344843759406959751_<38> × 309830085865730714982413828543955085580794667849260732917353228988602413576841495364287_<87> (Jo Yeong Uk / GMP-ECM 6.2.3 B1=1000000, sigma=5400989727 for P38 / July 17, 2009 2009 年 7 月 17 日)

58×10¹⁶⁷+239 = 6(4)₁₆₆7_<168> = 383 × 81817 × 116411 × 2539015319297239760208862106037195769_<37> × 374955885683995304806408659651797737916881109_<45> × 185568237447150266710225357815093455211539272721334490104275510776087852567_<75> (Jo Yeong Uk / GMP-ECM 6.2.3 B1=1000000, sigma=4052174073 for P37 / July 17, 2009 2009 年 7 月 17 日) (Jo Yeong Uk / GGNFS/Msieve v1.39 gnfs for P45 x P75 / 26.73 hours on Core 2 Quad Q6700 / July 19, 2009 2009 年 7 月 19 日)

58×10¹⁶⁸+239 = 6(4)₁₆₇7_<169> = 3 × 593 × 1807463629170919_<16> × 2004194975897472144228906825907151849765074990647376163399730243660853199271150842562362712993125051642880816646391150799250578164025829809923340304147_<151>

58×10¹⁶⁹+239 = 6(4)₁₆₈7_<170> = 19 × 595027205653663_<15> × 25375530110051932248409455637683310452044129_<44> × 224636299692188654900752577911302035085906908095641797207881999549460700135118306963468485330593067442061655419_<111> (Andreas Tete / Syd`s Database workers / July 18, 2009 2009 年 7 月 18 日)

58×10¹⁷⁰+239 = 6(4)₁₆₉7_<171> = 1153 × 2213 × 123493 × 466866407317_<12> × 19446241608838036363980356232313_<32> × 225270393946095807438626231453873038111507697639127097761464724268163034474733434977524246262956615989308890849723891_<117> (Serge Batalov / GMP-ECM B1=1000000, sigma=3684692784 for P32 / July 13, 2009 2009 年 7 月 13 日)

58×10¹⁷¹+239 = 6(4)₁₇₀7_<172> = 3² × 7 × 163 × 229 × 43607 × 355636003 × 1269791928287_<13> × 111929378928377_<15> × 29987432328229516862586197167_<29> × 5256085350367721968365243508879_<31> × 14889514327152662463708208717849_<32> × 529786685826043275442599790114501549_<36> (Serge Batalov / GMP-ECM 6.2.3 B1=1000000, sigma=3348063929 for P29 / July 13, 2009 2009 年 7 月 13 日) (Jo Yeong Uk / GGNFS/Msieve v1.39 gnfs for P31 x P32 x P36 / 2.08 hours on Core 2 Quad Q6700 / July 14, 2009 2009 年 7 月 14 日)

58×10¹⁷²+239 = 6(4)₁₇₁7_<173> = 337 × 857 × 223138629490232106494065089538222300705464318786618299445115783941790056557948140274175820159497953472517977086740525553027933493916202211303818248200175356185037323783_<168>

58×10¹⁷³+239 = 6(4)₁₇₂7_<174> = 47 × 83 × 19867 × 363012548911_<12> × 64817667474036623885110791368453242789269613_<44> × 353396468454398901270260455366720681669752503090160153611028365842847449762328056382391366185327241968495980187_<111> (Wataru Sakai / June 1, 2010 2010 年 6 月 1 日)

58×10¹⁷⁴+239 = 6(4)₁₇₃7_<175> = 3 × 85828151 × 304025035046063_<15> × 53729789147902641367609_<23> × 48954775376344162246427537050496650811070193069561318138829_<59> × 31297880436371463437685996006561448225358338539989758707175909032863993_<71> (Warut Roonguthai / Msieve 1.48 snfs / November 12, 2011 2011 年 11 月 12 日)

58×10¹⁷⁵+239 = 6(4)₁₇₄7_<176> = 1613 × 35656160338682906683_<20> × 1247169141570102577601527931_<28> × 1096361019585145532582908854881_<31> × 14983018931158829173921366367260641067839096419_<47> × 54693821851703361473715645811927745590131721657777_<50> (Makoto Kamada / GMP-ECM 6.2.3 B1=1e6, sigma=3042837923 for P31 / July 6, 2009 2009 年 7 月 6 日) (Jo Yeong Uk / GGNFS/Msieve v1.39 gnfs for P47 x P50 / 1.73 hours on Core 2 Quad Q6700 / July 13, 2009 2009 年 7 月 13 日)

58×10¹⁷⁶+239 = 6(4)₁₇₅7_<177> = 8929 × 495108312917_<12> × 11709965533731842879_<20> × 584523038568799821949_<21> × 45945311893089576120617083406295313405032488551893964974131_<59> × 463536555085071903813929644352373972274237777973789300237822779_<63> (Andreas Tete / Msieve v.1.42/GGNFS for P59 x P63 / 2.51 hours on Intel Core 2 T8100 @2.1GHz/Windows Vista 32bit / July 19, 2009 2009 年 7 月 19 日)

58×10¹⁷⁷+239 = 6(4)₁₇₆7_<178> = 3 × 7 × 61 × 308817679 × 3883148160446430059_<19> × 295682622016839769259505068588852387847924647206981945079224937_<63> × 14188106436246056715424661959856357148507973859633279801133559079312957220913681662491_<86> (Erik Branger / GGNFS, Msieve snfs / July 8, 2013 2013 年 7 月 8 日)

58×10¹⁷⁸+239 = 6(4)₁₇₇7_<179> = 9179740957_<10> × 1879648905210242779506742210680008175641391002894787905369910181_<64> × 3734894355985399192947926070678889627596132194943997013702162544043609024082392806121810470762077249450191_<106> (Robert Backstrom / Msieve 1.44 snfs / February 1, 2012 2012 年 2 月 1 日)

58×10¹⁷⁹+239 = 6(4)₁₇₈7_<180> = 672685683356861337041796175253604246571_<39> × 958017184531880621373920860801042598243408868260257248390356768611005235992717460853265486439899270704857151033067923579387134911377797556957_<141> (Dmitry Domanov / ECMNET / July 14, 2009 2009 年 7 月 14 日)

58×10¹⁸⁰+239 = 6(4)₁₇₉7_<181> = 3⁴ × 17 × 12222788001163_<14> × 18722127113932285154908967_<26> × 231628592348506254661758857460099502631830654243675396231_<57> × 88294551982021902487226807303049689337316928324044677832502609137476047298947016461_<83> (Cyp / yafu v1.34.3 / January 20, 2014 2014 年 1 月 20 日)

58×10¹⁸¹+239 = 6(4)₁₈₀7_<182> = 227 × 36781 × 1155939435489478342614814009196096022818687988029804073975439550171_<67> × 6677301926748205736940283621427288768295767598566518429009493289219659912219304187770146575202979645299112811_<109> (Wataru Sakai / September 12, 2010 2010 年 9 月 12 日)

58×10¹⁸²+239 = 6(4)₁₈₁7_<183> = 167 × 727 × 25703 × 45553117 × 17689233697921_<14> × 14550267537013979161_<20> × 194470287802744540804367511370713884548843108117311385309_<57> × 90573141506072760956506831473261560165563943157710986753540587159303144961577_<77> (Robert Backstrom / Msieve 1.44 gnfs for P57 x P77 / April 27, 2012 2012 年 4 月 27 日)

58×10¹⁸³+239 = 6(4)₁₈₂7_<184> = 3 × 7 × 151 × 1217 × 1423285522531541346532457050112321985109569972530385180892522766751846286798887170597099_<88> × 1173293411845332486380233183241675068190372139264815542320169002008988507586784779730713279_<91> (Ignacio Santos / GGNFS, Msieve snfs / July 10, 2010 2010 年 7 月 10 日)

58×10¹⁸⁴+239 = 6(4)₁₈₃7_<185> = 176588117670435309434329024092440363_<36> × 6460777205181724489503695636181453706364263_<43> × 56485794523779672878545748728908117158801017831287439214842335742232956117924403933229779715664027053403163_<107> (Dmitry Domanov / ECMNET / July 14, 2009 2009 年 7 月 14 日) (Serge Batalov / GMP-ECM B1=3000000, sigma=142168625 for P43 / January 9, 2014 2014 年 1 月 9 日)

58×10¹⁸⁵+239 = 6(4)₁₈₄7_<186> = 107 × 6022845275181723779854620976116303219106957424714434060228452751817237798546209761163032191069574247144340602284527518172377985462097611630321910695742471443406022845275181723779854621_<184>

58×10¹⁸⁶+239 = 6(4)₁₈₅7_<187> = 3 × 97 × 287437 × 124582778769042233_<18> × 1431769295452365516249353_<25> × 431935366941111283471879366989336881802327365621295947582072332612066537270001304091577149547964049528277544062912825119286823817020826409_<138>

58×10¹⁸⁷+239 = 6(4)₁₈₆7_<188> = 19 × 191379776483330109719074784422593962641_<39> × 17722942976644742493298788382265098427947056575301551556533727688497872316694355856538018670950859864388326426079285337993714319660444511908472818293_<149> (Dmitry Domanov / ECMNET / July 13, 2009 2009 年 7 月 13 日)

58×10¹⁸⁸+239 = 6(4)₁₈₇7_<189> = 41880629569_<11> × 4225510255158679922267168868436266349800907032976526469820181398279_<67> × 3641607396613340916595768197129946213530148152110531376295580741540284845634344610869797393934839694639241054697_<112> (Robert Backstrom / Msieve 1.44 snfs / February 6, 2012 2012 年 2 月 6 日)

58×10¹⁸⁹+239 = 6(4)₁₈₈7_<190> = 3² × 7 × 179 × 162292774210478820514930250814611453390259707158129_<51> × 3521216429959262195973433430051628582232354370580431935437012916604679657302826070845079773159399434800276934776651091896669930619816459_<136> (Robert Backstrom / Msieve 1.42 snfs / March 4, 2010 2010 年 3 月 4 日)

58×10¹⁹⁰+239 = 6(4)₁₈₉7_<191> = 230090208780941389_<18> × 19996407991146943442811028118361751679935231655956695184483623345473_<68> × 14006684838048204038014661318359942877579272345402143247561840326308297757719712143342959981090285972245851_<107> (Eric Jeancolas / cado-nfs-3.0.0 for P68 x P107 / December 8, 2020 2020 年 12 月 8 日)

58×10¹⁹¹+239 = 6(4)₁₉₀7_<192> = 85331 × 26532654823119659_<17> × 284641318089204930930563338986853049764388186398264619524129677822301778978228110311280407973336885354282412098500996916749488936773421014434083392682009469393598059120143_<171>

58×10¹⁹²+239 = 6(4)₁₉₁7_<193> = 3 × 1303 × 844121 × 74920053438560987_<17> × 500435215852294301621144780059310029_<36> × 110853244723965251511769767940295089518217912075076943770031108131_<66> × 469916567867206104099875431145452355432619991802889210807387645671_<66> (Ignacio Santos / GMP-ECM 6.3 B1=3000000, sigma=2874597552 for P36 / November 16, 2010 2010 年 11 月 16 日) (Sinkiti Sibata / Msieve 1.42 gnfs for P66(1108...) x P66(4699...) / April 13, 2011 2011 年 4 月 13 日)

58×10¹⁹³+239 = 6(4)₁₉₂7_<194> = 3054838159_<10> × 23404063228800740965529_<23> × 119340956593866348096663759969353729493424219949834201_<54> × 7552948089183145176610981346675555000355412350462313712358947464511128790193951583008476869151383501268496577_<109> (Eric Jeancolas / cado-nfs-3.0.0 for P54 x P109 / June 14, 2021 2021 年 6 月 14 日)

58×10¹⁹⁴+239 = 6(4)₁₉₃7_<195> = 257 × 403464209177_<12> × 277910928745730887156179766492458017_<36> × 3543970882437511879731257595620290877_<37> × 6310322790083620064791690811822998614035354857083272254295215385444318070690134698155017866341817570459038947_<109> (Andreas Tete / Syd`s Database workers http://factorization.ath.cx/search.php / July 23, 2009 2009 年 7 月 23 日) (Andreas Tete / Syd`s Databaseworkers / July 24, 2009 2009 年 7 月 24 日)

58×10¹⁹⁵+239 = 6(4)₁₉₄7_<196> = 3 × 7² × 5981 × 7247 × 25457 × 93578730460656924216568883_<26> × 1448282033455479163496369237030093506773080842734654629659635588103_<67> × 293155853973354021712092634542905963200680896688649439204162477545700855027378674964696651_<90> (Eric Jeancolas / cado-nfs-3.0.0 for P67 x P90 / June 23, 2021 2021 年 6 月 23 日)

58×10¹⁹⁶+239 = 6(4)₁₉₅7_<197> = 17 × 101429 × 5918095508233034813_<19> × 5886327063176966010326707120821214367277577_<43> × 861119274274057957127943162033177354045164774275728642526606457_<63> × 1245904487358643765870415337355731221394354252853504293603953458447_<67> (Dmitry Domanov / GMP-ECM B1=11000000, sigma=2320127345 for P43 / July 16, 2014 2014 年 7 月 16 日) (Erik Branger / GGNFS, Msieve gnfs for P63 x P67 / August 13, 2014 2014 年 8 月 13 日)

58×10¹⁹⁷+239 = 6(4)₁₉₆7_<198> = 27849187 × 23140511945445461098898306957558382025458927919312130887140240196040352791786864171095710781231942047157227406474897972585140257216285863010810493119402173012966031807120417714328409100216981_<191>

58×10¹⁹⁸+239 = 6(4)₁₉₇7_<199> = 3² × 26953 × 120122654799524499176412214703101874912457837887590623290818089496051374264866997231397_<87> × 221162220425611739516129953287180898210393040202298784816406964454293545788847480164075208005108893026032963_<108> (matsui / Msieve 1.42 snfs / 1399.41 hours / September 26, 2009 2009 年 9 月 26 日)

58×10¹⁹⁹+239 = 6(4)₁₉₈7_<200> = 67 × 71 × 108846601 × 4356042923447087_<16> × 27361315595561333_<17> × 1749020963720134439678284939015076333965474921_<46> × 597053598312251989174415515764753723249512036796201120110462504642931818250147240774858633856944388457117747081_<111> (yoyo@Home / GMP-ECM 7.0.5-dev B1=43000000, sigma=0:9009627682744514293 for P46 x P111 / July 2, 2021 2021 年 7 月 2 日)

58×10²⁰⁰+239 = 6(4)₁₉₉7_<201> = 673 × 160723 × 307823 × 685723 × 1945100881_<10> × 68945385822779_<14> × 5413769753917788696452779289_<28> × 38877245631638834693386803532084744788494068931998551860227403348236849588733553010726855370523763397553803419105330299298903468747_<131>

58×10²⁰¹+239 = 6(4)₂₀₀7_<202> = 3 × 7 × 59 × 1077279209_<10> × 1781627747_<10> × 30297092310814121029529794339259_<32> × 89447453611115384235878445655526795835222280743403456616133385462314670368342358184437926433531052514215730265019173286277064719302589369837790759489_<149> (Andreas Tete / Syd`s Databaseworkers with ecm B1 = 1e6 / July 17, 2009 2009 年 7 月 17 日)

58×10²⁰²+239 = 6(4)₂₀₁7_<203> = 122203 × 287922001189726263337_<21> × 900888654245586171146217023177567172781_<39> × 1950658192164034840937176083682793935993601_<43> × 1042260960293763298353046820431621943621881006400454115672730816782770253428395787423306702551417_<97> (Andreas Tete / Sys`s Databaseworkers with ECM B1=3e6 / July 27, 2009 2009 年 7 月 27 日) (Wataru Sakai / GMP-ECM 6.2.3 B1=11000000, sigma=3870121243 for P43 / June 7, 2010 2010 年 6 月 7 日)

58×10²⁰³+239 = 6(4)₂₀₂7_<204> = 1669 × 1777 × 2537159 × 3951055898554283_<16> × 239722190250075819026970418261169800902701_<42> × 69084153322023925395400986644642323352019649601871139714223_<59> × 1308862980965067719470441038585190529201684018358694986115864671295029728549_<76> (yoyo@home, ECM B1=43000000, sigma=2812246986 for P42 / February 7, 2010 2010 年 2 月 7 日) (Sinkiti Sibata / Msieve 1.40 gnfs for P59 x P76 / March 17, 2010 2010 年 3 月 17 日)

58×10²⁰⁴+239 = 6(4)₂₀₃7_<205> = 3 × 28019 × 59207 × 324589 × 33441127568834411_<17> × 63720729576048410488429_<23> × 394192572388787005036717_<24> × 645346875990028767399568299611509239356875110009659787275773_<60> × 7359383641777507577507801687429632652623474921415355967991766418963_<67> (ruffenach timothee / Msieve v 1.43 gnfs for P60 x P67 / 94.47 hours on Linux ubuntu 9.04 32bit quadcore 2.6 Gz / February 10, 2010 2010 年 2 月 10 日)

58×10²⁰⁵+239 = 6(4)₂₀₄7_<206> = 19 × 4673817737_<10> × 5386475191_<10> × 37279635067379744491429662807584297718778261_<44> × 9935572409474223564867729569232433592040322673076559708208575163_<64> × 363739865366018051469705608796722647061493330572375754617033780787398042273773_<78> (Andreas Tete / ECM with Syd`s Databaseworkers / July 17, 2009 2009 年 7 月 17 日) (Erik Branger / GGNFS, Msieve gnfs for P64 x P78 / February 22, 2017 2017 年 2 月 22 日)

58×10²⁰⁶+239 = 6(4)₂₀₅7_<207> = 8663 × 22189 × 26226607812137_<14> × 2437505591050679_<16> × 33899664537156913329826281530987745310950941_<44> × 92386362729361473266195102098856169937502085440966393_<53> × 16745126292435145515194896589426186185119786104145022930819410302326534279_<74> (Bob Backstrom / YAFU, GMP-ECM B1=2000, sigma=3928963425 for P44 x P53 x P74 / August 26, 2024 2024 年 8 月 26 日)

58×10²⁰⁷+239 = 6(4)₂₀₆7_<208> = 3³ × 7 × 89 × 8599 × 18191 × 29387 × 100060176086098220217452539382629740342831922545084511_<54> × 832937921258001122038642168066306369540913154953645779094079827054268285114686766129865973284998761091233681042510087682952566193112738639_<138> (Bob Backstrom / Msieve 1.54 snfs for P54 x P138 / July 27, 2021 2021 年 7 月 27 日)

58×10²⁰⁸+239 = 6(4)₂₀₇7_<209> = 523 × 2329442077_<10> × 133391008559_<12> × 141607309129013267_<18> × 2800397316758688870995893464088643262505148299304917693615514100223019075311417723423981773488958938797164561879950390190035861889528261914726617004284047901560254897269_<169>

58×10²⁰⁹+239 = 6(4)₂₀₈7_<210> = 90677 × 30717391 × 420225032839973858121097161387480170015082658952842350984599161_<63> × 550582109191535944093527941153553759000817086780824469904404728225725356737599376976713024679037159238864773535098341435716720929515061_<135> (Bob Backstrom / Msieve 1.54 snfs for P63 x P135 / June 4, 2021 2021 年 6 月 4 日)

58×10²¹⁰+239 = 6(4)₂₀₉7_<211> = 3 × 632201657 × 7195854979385697191998718762042312552406293449400949246268386242975794991548827727_<82> × 472200233329997408999237767986270510922497745636312090586095051928007348171638514737853656656821000653059544551618243091_<120> (Bob Backstrom / Msieve 1.54 snfs for P82 x P120 / September 20, 2020 2020 年 9 月 20 日)

58×10²¹¹+239 = 6(4)₂₁₀7_<212> = 9360679 × 11986283722052198108261970350421144743_<38> × 574372420261646299689788137084514331533645326778613379383038447027373288480902167033978109838615468400953168807380171045418109072634683571649088694271390185452212830351_<168> (Serge Batalov / GMP-ECM B1=11000000, sigma=1866525161 for P38 / May 19, 2014 2014 年 5 月 19 日)

58×10²¹²+239 = 6(4)₂₁₁7_<213> = 17 × 283 × 14243743 × 5302793584233130213_<19> × 37874850861272840610077532173092367_<35> × 4353738899782153871185770093670515179_<37> × 2994333041185488006354173291589019312864308841_<46> × 3591764566842755824773584620708962806577150882071624943903571198531_<67> (Cyp / GMP-ECM 6.4.4 B1=3000000, sigma=2738661526 for P37 / January 3, 2014 2014 年 1 月 3 日) (Serge Batalov / GMP-ECM B1=11000000, sigma=1936422998 for P35, Msieve 1.51 gnfs for P46 x P67 / January 5, 2014 2014 年 1 月 5 日)

58×10²¹³+239 = 6(4)₂₁₂7_<214> = 3 × 7 × 9281 × 31019 × 2043617473_<10> × 10540543712587229808409_<23> × 492470433071142149231081_<24> × 175268358377639395574229066610117598829594778590791_<51> × 573320304199250810806615448357757109304486457522825955681466982703831699409833417249991633340102479_<99> (Bob Backstrom / for P51 x P99 / March 23, 2024 2024 年 3 月 23 日)

58×10²¹⁴+239 = 6(4)₂₁₃7_<215> = 83 × 1559 × 49112747789507658838381_<23> × 10140679189138524047913920092721031770309710714014163775690255170003239454037274090405693564564771515845058381497512398074664004343156506284583605230749079328618401407552920194995098738671_<188>

58×10²¹⁵+239 = 6(4)₂₁₄7_<216> = 317 × 1201 × 599561 × 207636440621_<12> × 210643406805569382163_<21> × [64550319118693134947471878843514488000430541432615812063300220202550716954423403531113927321387126880188528818674761751883836075416093289074513886195423400588683738834310997_<173>] Free to factor

58×10²¹⁶+239 = 6(4)₂₁₅7_<217> = 3² × 929 × 103069 × 768799 × 614120051282948580608509_<24> × [15839195198299038880209820569600153177769303685462087853910742142715869072097896057619424063277702532730418503779136591574603678037931028096366532761662953397813318260927028400113_<179>] Free to factor

58×10²¹⁷+239 = 6(4)₂₁₆7_<218> = 4265757193_<10> × 15107386925396539897352860056337586405247712945588753870840497330773520293151960570214396739679703669538990669984072026962282014827383646738293021368514737318862781425179078270253635705337353561005750484693479_<209>

58×10²¹⁸+239 = 6(4)₂₁₇7_<219> = 280138174647347_<15> × 53209825456535983307_<20> × 387172462300211660988247164853896455183_<39> × 111664954893043328026854750405556748955715258801796670946918741767278563566707759200245948510908774857176703119587073970806753803514117754861595521_<147> (Serge Batalov / GMP-ECM B1=11000000, sigma=1594631580 for P39 / May 19, 2014 2014 年 5 月 19 日)

58×10²¹⁹+239 = 6(4)₂₁₈7_<220> = 3 × 7 × 47 × 1367 × 1721 × 8269 × 399675626747_<12> × 593669177732575656209455667495859941601085974517528759567100513179_<66> × 1414535294890389755529713759444335677473987799709547138541490007430733176468985195153138839566093934128970413854654757724454754839_<130> (Erik Branger / GGNFS, NFS_factory, Msieve snfs for P66 x P130 / April 2, 2021 2021 年 4 月 2 日)

58×10²²⁰+239 = 6(4)₂₁₉7_<221> = 665723321 × 486174603009320207173677164043877_<33> × 956196168429120005453975100651548970257997935693087_<51> × 208234385558814502637362526263585583209413182987085103158434182479285094981832671761338705631790200472178536378708679980142884693_<129> (Serge Batalov / GMP-ECM B1=3000000, sigma=1085683726 for P33 / January 9, 2014 2014 年 1 月 9 日) (Erik Branger / GGNFS, NFS_factory, Msieve snfs for P51 x P129 / March 31, 2019 2019 年 3 月 31 日)

58×10²²¹+239 = 6(4)₂₂₀7_<222> = 151303 × 49498831 × 58366934749789402923811854999637357783058575057_<47> × 1474266904871833097811510945351892956251882703990859537690125345462774572654319708790702334975710648603941099400779201020823205628327753522491654747947246377241047_<163> (Erik Branger / GGNFS, NFS_factory, Msieve snfs for P47 x P163 / November 27, 2021 2021 年 11 月 27 日)

58×10²²²+239 = 6(4)₂₂₁7_<223> = 3 × 4574597 × 390906781867943166238079_<24> × 1201263229186360521507458098195047747592392356237265571782472615216472258085091384732505048748555860901835782026445001527587504168552793634071248802951339937703594945770517773930537836324919823_<193>

58×10²²³+239 = 6(4)₂₂₂7_<224> = 19 × 436556641569870400156680131557268572555185673152605289916690228311211661179454802703_<84> × 7769468019774062202294246755445833884398348920236137202324462193900451938164708420876638475249868431410515796373383333852294088056517163371_<139> (Bob Backstrom / Msieve 1.54 snfs for P84 x P139 / August 27, 2018 2018 年 8 月 27 日)

58×10²²⁴+239 = 6(4)₂₂₃7_<225> = 89688107123_<11> × 1336782156533102022467_<22> × 1760720388002006742756103772942777297_<37> × [3052808714827299474913563042768663387446103747677187192092256054878499303741346332759423101801264392420724180666344408744793985066320550196201898450311255111_<157>] (Serge Batalov / GMP-ECM B1=1000000, sigma=1684131789 for P37 / January 6, 2014 2014 年 1 月 6 日) Free to factor

58×10²²⁵+239 = 6(4)₂₂₄7_<226> = 3² × 7 × 46798256692929289_<17> × 510968610867050229363343893983109343_<36> × [4277805529114261672040101534534118361356626830169530557904204960349964903218140049068481939335330827264952559205612398980722662368817907552727180617507270432642501322101447_<172>] (Serge Batalov / GMP-ECM B1=2000000, sigma=4127801406 for P36 / November 10, 2013 2013 年 11 月 10 日) Free to factor

58×10²²⁶+239 = 6(4)₂₂₅7_<227> = 223 × 1607 × 5541931 × 53540847397_<11> × 169512806392269533_<18> × 3575327880393646981754706539022933104417965229455649822186988782569004337171415228113812331982880020323545169680693427295068052821449956010065474524977385869421432719390766641725800361717_<187>

58×10²²⁷+239 = 6(4)₂₂₆7_<228> = 1203622019_<10> × 535420949659815457766600101094066512291384430417639646424949994575036471183437567574479911906999139440339903290224241439740929535491028969323337415983617398781107247627084532793383904058043361904003556156647915598197813_<219>

58×10²²⁸+239 = 6(4)₂₂₇7_<229> = 3 × 17 × 191 × 23156099 × 54002621 × 529056073557768009402099746568159127440758879740620282901839331648241552540340110678743083835674827780088031267542200032651113146618146640388423033174486341855652072296532000501915396595025980813390301923538173_<210>

58×10²²⁹+239 = 6(4)₂₂₈7_<230> = 2657 × 7906031099_<10> × 796544901760419547583013406297693032997_<39> × [3851457847639557715521533216180006410476608283465196132107842968118790263785498228692540513179156021013265539939183333775722555382891406735852020973681980223062974683147965262857_<178>] (Serge Batalov / GMP-ECM B1=3000000, sigma=2369248905 for P39 / May 27, 2014 2014 年 5 月 27 日) Free to factor

58×10²³⁰+239 = 6(4)₂₂₉7_<231> = 161947 × 5464553 × 979838709828864113_<18> × 5044404393423450962547743693592838631364165961_<46> × [147330765796470413531548358823068829142473532930150288698303698604797978969416252279324245768946481453992954020913085804706121261024083362991501475946594669_<156>] (Thomas Kozlowski / GMP-ECM 7.0.6 B1=11000000 for P46 / September 20, 2024 2024 年 9 月 20 日) Free to factor

58×10²³¹+239 = 6(4)₂₃₀7_<232> = 3 × 7 × 216119 × 115101231445333546333_<21> × 9103480563544123769354599_<25> × [1355145104853587237214291996462792741674954382711694117410215485557012866703516416395341321775493444904118118580918819907719977273805999459677154130036496823870604841576751124110559_<181>] Free to factor

58×10²³²+239 = 6(4)₂₃₁7_<233> = 67 × 1723901939671073_<16> × 4335070688235760805183_<22> × 19507782753241396505587760809879007474879_<41> × 6597722255867917951143323272772254140110385472001993811160097436142071969491645682606247234129456157168118434264385635466378092802430319377922643271357781_<154> (Cyp / GMP-ECM 6.4.4 B1=3000000, sigma=2448333714 for P41 / January 6, 2014 2014 年 1 月 6 日)

58×10²³³+239 = 6(4)₂₃₂7_<234> = 997 × 2948213 × 7138920350615439959638674466279918987_<37> × [30711351765865166217302363393715289121796422143837855378756714908423270493124917429087495352517558298606979816539838431022005274447091802526817855310357341881539001472209628497291868124021_<188>] (Cyp / GMP-ECM 6.4.4 B1=3000000, sigma=1944265126 for P37 / December 31, 2013 2013 年 12 月 31 日) Free to factor

58×10²³⁴+239 = 6(4)₂₃₃7_<235> = 3³ × 71 × 439 × 14994209 × [510711092774496019883699786470474759770140360302799563460894177120514363400084269194489573034142835816045301675136509297113093852688892718418230720800182396816411715956644070388491303186528706496357384450412235126037967341_<222>] Free to factor

58×10²³⁵+239 = 6(4)₂₃₄7_<236> = 787 × 638839 × 198625409 × 172845864081724934809_<21> × 130986380327197713523069_<24> × 4580748206431933312044837706717631_<34> × 390672291278483143878269504658586253_<36> × 76386549414470400959748083130113061551168594352827_<50> × 208513160414270493459579094880158450380706383696801789751_<57> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=949456196 for P34 / October 24, 2013 2013 年 10 月 24 日) (Serge Batalov / GMP-ECM B1=3000000, sigma=4186361542 for P36 / November 20, 2013 2013 年 11 月 20 日) (Dmitry Domanov / Msieve 1.50 gnfs for P50 x P57 / November 21, 2013 2013 年 11 月 21 日)

58×10²³⁶+239 = 6(4)₂₃₅7_<237> = 23251 × 25537 × 1226819903231640920913930198239798925628064771_<46> × 884694155783846341503150370087450667387548571330643243152014019407158025175814339606346491724524457109200540959127776997884112542869514343091886420799548329075253411487508063701234711_<183> (Serge Batalov / GMP-ECM B1=11000000, sigma=2992732747 for P46 / May 19, 2014 2014 年 5 月 19 日)

58×10²³⁷+239 = 6(4)₂₃₆7_<238> = 3 × 7² × 61 × 31957 × 102077 × 32321605333_<11> × 6816343860152304655687997421558844267766477952826721947210102593618880348491467310289604881586028612119801597348936483758270411300400577700207387744669244266067235272215669069161042850303494124534091563151689591493_<214>

58×10²³⁸+239 = 6(4)₂₃₇7_<239> = 107 × 42841 × 221957 × 203563576219_<12> × 6725800970081_<13> × 461450961348232762073_<21> × [100254441510391807182918941509166337015805397862490167374504141819759132069025428089314187698464399556134814788081841587193380975202322477391157045474999529540889402358291466253947339_<183>] Free to factor

58×10²³⁹+239 = 6(4)₂₃₈7_<240> = 140003923 × 419082611220804713443_<21> × [10983623505283869190740902332754555042191291546233415440299248380386810013352342532723645393307749904885732545038357721711377477833608476282175531323780792491283125579350511973593000202001653281899275355008764023_<212>] Free to factor

58×10²⁴⁰+239 = 6(4)₂₃₉7_<241> = 3 × 373 × 247808616119_<12> × [23240153659489745650447555219692968172255790427495361730458422916446398960126848692761481482533946010991200152667327815596814362684942364332120261659918292464934495440883059320366527299769683398111382628625205571405876728925127_<227>] Free to factor

58×10²⁴¹+239 = 6(4)₂₄₀7_<242> = 19 × 1087 × 11808993391799_<14> × 2524849175653688773_<19> × 1946540981997146731267834308723757_<34> × [53763863228278445996102592512768717351306956111545044255039693426096946717218224440881680531001041608490337104320480771077475990962527279600356419627690055822115465182388541_<173>] (Serge Batalov / GMP-ECM B1=2000000, sigma=3812927484 for P34 / November 10, 2013 2013 年 11 月 10 日) Free to factor

58×10²⁴²+239 = 6(4)₂₄₁7_<243> = 6569 × 15619 × 72198125127705193359931075163_<29> × [86997561070847239108212776728501897069862851627963099877996004578510784961871360119150867321909893795723118540898303293632727543722887012314993570253723347077821694978024590850718771668728928072507341177879_<206>] (Cyp / GMP-ECM 6.4.4 B1=3000000, sigma=2169737951 for P29 / January 5, 2014 2014 年 1 月 5 日) Free to factor

58×10²⁴³+239 = 6(4)₂₄₂7_<244> = 3² × 7 × 377327 × 1214845259593245629235598538650076081_<37> × 223154725894750110766574971243144163390139771940162393105041754955347231766278520420816711361364802508313487956126348038984324947834641242973668347598858608346856369543724982833282937273053533468304287_<201> (Cyp / GMP-ECM 6.4.4 B1=3000000, sigma=1974842242 for P37 / January 6, 2014 2014 年 1 月 6 日)

58×10²⁴⁴+239 = 6(4)₂₄₃7_<245> = 17 × 113 × 54973487 × 193916794702546680294714988581733808956177_<42> × 3146946863604947551864618461528472459821244325714290404159619396335690440339579413038164915147184667196008761860135258213612981706711435142189085605069639190673776306026773131301821614597854593_<193> (Serge Batalov / GMP-ECM B1=3000000, sigma=2138663731 for P42 / May 27, 2014 2014 年 5 月 27 日)

58×10²⁴⁵+239 = 6(4)₂₄₄7_<246> = 8369 × 310567 × 3791341 × 195312947006629_<15> × 10244703633412575707_<20> × 1339349866117999855378061931881_<31> × 725474108572121281680911927859517_<33> × 9140462732335848628912514714497292754467998862246461022849_<58> × 3680011630546441169893573652545578469554291579752981458749413081206813255391_<76> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=2164828367 for P33, B1=1e6, sigma=705990465 for P31 / October 24, 2013 2013 年 10 月 24 日) (Erik Branger / GGNFS, Msieve gnfs for P58 x P76 / May 12, 2014 2014 年 5 月 12 日)

58×10²⁴⁶+239 = 6(4)₂₄₅7_<247> = 3 × 609443083 × 3524772383294320116433494985040544217889085711631824604937140862009173296578621023003961385756097174620239554262277430997027409281709983979173569762458273971661678779194788478956529806325077526801872240049934487726638367882088421615818303_<238>

58×10²⁴⁷+239 = 6(4)₂₄₆7_<248> = 7752847 × 7959087252237870132389_<22> × 7459480454264589954689348701577224677137_<40> × [140007862307747358460976166802227613500688827110639657281081458726829510423335646001275206468334699939742513485006587748089738534774762368525289715194955807644008636520504732927757_<180>] (Cyp / GMP-ECM 6.4.4 B1=43000000, sigma=3854630972 for P40 / January 24, 2014 2014 年 1 月 24 日) Free to factor

58×10²⁴⁸+239 = 6(4)₂₄₇7_<249> = 14480009083_<11> × 2612625320886353861659_<22> × 321679779579950909531319217119151963679_<39> × 52956070994844088573966122887777327948047203013859481386699005844027677774191277380882963657375281547325302318232764088337094315702148720198187106236036102165793769959166589412169_<179> (Serge Batalov / GMP-ECM B1=11000000, sigma=3194112244 for P39 / May 27, 2014 2014 年 5 月 27 日)

58×10²⁴⁹+239 = 6(4)₂₄₈7_<250> = 3 × 7 × 1682101 × 397681307313382267613379493_<27> × [458753026677688489998638523263660013482009327433484269920793818189498754039299020950826652960541541059751878978289943499550020468328814975604715694036616637924453399513939844486648395293014771769585019218432386246699_<216>] Free to factor

58×10²⁵⁰+239 = 6(4)₂₄₉7_<251> = 382508541809941_<15> × 193391232218167877_<18> × 68032593114510917777151112121319888942457_<41> × 12805323101000227651440774526715556322431487033237904191487891597146112917610683296933953818177680482024395333063131478070989991701196688362226914483146923485989912290261288059903_<179> (Cyp / GMP-ECM 6.4.4 B1=11000000, sigma=1859569323 for P41 / February 18, 2014 2014 年 2 月 18 日)

58×10²⁵¹+239 = 6(4)₂₅₀7_<252> = 89 × 2704103 × 2677763685030681837078834281175573881219148113962185663721100297179460309868791458484910051168495208300935566817795632404270803528640455244794293161853557496521482248589985789029637365196453396367262589539783480359018654512825466115104411617841_<244>

58×10²⁵²+239 = 6(4)₂₅₁7_<253> = 3² × 163 × 16889 × 1612331804907761576839_<22> × 1622530504779432709080773_<25> × 99426955885206103478488649357706862842311359029352150692983771379932703527416542038396585164401371292130161519308298565590998392080040187094814863452094899900473456534758430123179956704110680851801127_<200>

58×10²⁵³+239 = 6(4)₂₅₂7_<254> = 2549 × 60107 × 1788021839_<10> × 222953609089_<12> × 11988525081769_<14> × 373939637473420938739_<21> × 600792607758717206484433_<24> × 4791582774493608640402552432123_<31> × 81758409831899130362963607793937518489929552639261538653083619133683571641282674566052404976322826839159752698001809780878225409143718271_<137> (Jason Parker-Burlingham / GMP-ECM for P31 x P137 / January 2, 2021 2021 年 1 月 2 日)

58×10²⁵⁴+239 = 6(4)₂₅₃7_<255> = 12697 × 2246591 × 2289923 × 386808226781491_<15> × [25506082986450312387810351448398744062522669017985805728947937132094970648818233759358958139812715965678358682942226520295265088266653122075023755924983693723824260315310972013219591139300938129712786301867086035874840195377_<224>] Free to factor

58×10²⁵⁵+239 = 6(4)₂₅₄7_<256> = 3 × 7 × 83 × 691 × 214309 × 9982973933_<10> × 481617064961_<12> × 1126029769373011710023_<22> × [4611667249960374584786203309369297549590288150042074790216662996007198016491430828326193872552606416569147858004022524542729772764914299110207359449879714459641457204150323293524505766982411054466898909_<202>] Free to factor

58×10²⁵⁶+239 = 6(4)₂₅₅7_<257> = 7673 × 10477 × 69709 × 383310853 × 98070662089_<11> × 6198242223721_<13> × [49355518858089679800081339084758750534978302507113030139833943399091039972977943540801448142004235248071044527839473254601477504899456387859533548298088151699002957235561788572889191249835618133454701776553156739_<212>] Free to factor

58×10²⁵⁷+239 = 6(4)₂₅₆7_<258> = 128053 × 40071347219_<11> × 47450998010856470168797601_<26> × 6392629370606482849155252413369_<31> × [414034857500356456496308611932851974039800620827516024707757689281484662058534359935730414637831270176282824046369983288912454650293277363347236100150577430503814995788678628529643594809_<186>] (Jason Parker-Burlingham / GMP-ECM for P31 / January 2, 2021 2021 年 1 月 2 日) Free to factor

58×10²⁵⁸+239 = 6(4)₂₅₇7_<259> = 3 × 131 × 151 × 330265173759339340977809_<24> × [328816200264066749515999462783464138126003762639835166804659670262591572244334297974524384103573464212429355880263880027310873691160829103134916854238054510873012606768487619520592231734310009142944355188627356541701755853234018081_<231>] Free to factor

58×10²⁵⁹+239 = 6(4)₂₅₈7_<260> = 19 × 59 × 661597100369_<12> × 318454044499052251_<18> × 272859770438789345469588268281161101043010846499376333394045028121677738147090873808156185662415572960135953433983245789388054860894311359956423616282400468608677743093146799974631168011740452854553907544396533017362358552852253_<228>

58×10²⁶⁰+239 = 6(4)₂₅₉7_<261> = 17 × 58567843 × 549678257 × 195225519186338977552456343_<27> × 6031595217836745884659321913104007661554357531193251635821408011318454444417920627094150138584069197288110952529851329893462864272822319006028027273299049307051609419520641251372579401280941490218321159048753988619187_<217>

58×10²⁶¹+239 = 6(4)₂₆₀7_<262> = 3⁶ × 7 × 3671 × [344013536054816113287975385855220349359150529036174844215397859632002670588942929263515596390436786691269328511734512274838914623770456327490494742888939197902902974238421795909972060940669308109359317079037768279326796589784327060027046462829986903108119_<255>] Free to factor

58×10²⁶²+239 = 6(4)₂₆₁7_<263> = 181 × 24169507 × 1156339032873847_<16> × [12739545421612736843859639559422513531058392167301933919791082056735466138240153919911387172043192901972659159923983615539604613154731197974066126262216284930479329019072149946374479174492724962170441755272655857816546604882450922388782503_<239>] Free to factor

58×10²⁶³+239 = 6(4)₂₆₂7_<264> = 379 × 78520655750002156451_<20> × 161766596850351124907554571293_<30> × 133866992694703664507692924665487191424677618657840644748014475435615176189118368554167470363016279102657356285038901349386300055661948754674332714988494343186269991985903792029146440827034855737265669200534976251_<213> (Jason Parker-Burlingham / GMP-ECM for P30 x P213 / January 2, 2021 2021 年 1 月 2 日)

58×10²⁶⁴+239 = 6(4)₂₆₃7_<265> = 3 × 137958337847416996519_<21> × [15570991805685690741198334631316761088479888449550039639099838527227015404132845909133747300492553934607256997883719714165455972134748693147758470356266394553590365364375050006681352139130278409492365840303330912859190713944647205860128062728771_<245>] Free to factor

58×10²⁶⁵+239 = 6(4)₂₆₄7_<266> = 47 × 67 × 941043375221_<12> × 21747191651555809717463617530073464638244930665844399794089951790801546686992049945133419369958198225840401132979030073894256771845022592738426680119931809448561656052040119566476034998478836974176742739603373890681504202746245447857880178214432670543_<251>

58×10²⁶⁶+239 = 6(4)₂₆₅7_<267> = 138450597443135977_<18> × 4654688794023650024953106771585644343827019387775801999932673228167628336471806920335096509886413022449001434901600755935503077672006998523471427161187149939031611950118067378532137288702171223698491796388048285740086741697733077290182133011987463111_<250>

58×10²⁶⁷+239 = 6(4)₂₆₆7_<268> = 3 × 7 × 473694771810728722291_<21> × [647839759145419357237539126898528290014235256793131951979048046840623635444944330196990462895879043936539922765845022188014654469273507953603554734273963179199341664375780796531402263718272871506993930849521809644282271287853821996133334357200977_<246>] Free to factor

58×10²⁶⁸+239 = 6(4)₂₆₇7_<269> = 1250111365916112313545057617_<28> × [51550962739401999360093664670467396022983918493261275613870201464196830059877741863131436164171858197460315824126540903436825132408920569837771167419608372376407559311716704640925838519896643644897633177344045180115736224131385342171763738991_<242>] Free to factor

58×10²⁶⁹+239 = 6(4)₂₆₈7_<270> = 71 × 421 × 696608610307_<12> × 678329028446983_<15> × 8825580904766264985531019_<25> × [5169785191457221996498486043032230782350439066822641047594331012562294011106866696606326752337826338674174306027270672771858268914666936813890640026266471803497153516390941452248140828621288481226983356174482987203_<214>] Free to factor

58×10²⁷⁰+239 = 6(4)₂₆₉7_<271> = 3² × 359 × 1429 × 108929 × 227371 × 47725043 × 53499780980837_<14> × 22071882540250489304420900344531158965295963673414311599399304381302593751006607836535306631540734976865726321160109442531127668930718512042094938087140184660801612495971050865112154096673847676541454782953473359575994746689691485737_<233>

58×10²⁷¹+239 = 6(4)₂₇₀7_<272> = 811 × 3179516827_<10> × 24781549468774019852141917359435771887_<38> × 1008498008571072921067217489387490751127749377311783059429763943309140147197395251832090381180928242302437542947931561933910417892218636560175043034492440245641217306337014219227519372937260078383065852056929299336747144073_<223> (Eric Jeancolas / GMP-ECM 7.0.4 B1=1000000, sigma=1:4177747896 for P38 x P223 / May 15, 2021 2021 年 5 月 15 日)

58×10²⁷²+239 = 6(4)₂₇₁7_<273> = 109 × 31817 × [185823124515237928729591054244108854289263873546466690227757316409075768001366889273158294998503322885908734510240888603618354288254661749530484235519020166198280258244163063380070732611192632997374735750706360152063548176583357994945418782367064299318506506228262499_<267>] Free to factor

58×10²⁷³+239 = 6(4)₂₇₂7_<274> = 3 × 7 × 4283 × [71650316805581806749212773027855913683604554489448255500088327545717225847975322642611925824627202166310268108073384748612392787036728199464599184421738706118813520167711155336651484211605621832098600718726798577370606322275712889768458295191893137258535343989464932729_<269>] Free to factor

58×10²⁷⁴+239 = 6(4)₂₇₃7_<275> = 3093973 × 63530188933_<11> × [327860289320503006208916228641325265878512660506082498664930902582081693081311671153875628560797209261159735675751729561780084318109001054961088568803652319122785417950014136847159093683476963552171239032805877626530679868885537764185968623098849950657979783_<258>] Free to factor

58×10²⁷⁵+239 = 6(4)₂₇₄7_<276> = 769 × 47624491 × 425990685347_<12> × 1041582532397584332673800166987_<31> × [39658383326045302079753484400573426916948236608867853737338799328138992746549244773553290375059001390224772881899870501141042207483837202629525332384338294471116822295229530745610708584646375647706549046261475763579089604637_<224>] (Jason Parker-Burlingham / GMP-ECM for P31 / January 2, 2021 2021 年 1 月 2 日) Free to factor

58×10²⁷⁶+239 = 6(4)₂₇₅7_<277> = 3 × 17² × 58345643 × 49403518847956886108647_<23> × [2578695562499917431015461970849725657333645875868429518013575613617102962873635317281156481616796124881247189917504127359742420620358375689111306489944456530682442707835761387985080033903166103719647094212800915976129027555912466351985615225321_<244>] Free to factor

58×10²⁷⁷+239 = 6(4)₂₇₆7_<278> = 19 × 51913 × 2315846201_<10> × 28212790393773064089668272566656028538906163019775333855783332306354331750564318774440653749430137068390623628608506382562962426975295856406137343229523202345670067474894372440921778924101871989786819196761253189826354043417954332301044595162305469364230349716101_<263>

58×10²⁷⁸+239 = 6(4)₂₇₇7_<279> = 571 × 28837 × 737641362918953393_<18> × 5631007730264311379_<19> × 9422538340948000283521167867747196890744209975286991233644481263530341015424019725819304631431794720563333828182646503787590097431619754433574539365764534370553492773070529852469213387053236335447500781137275514346750850413559893295363_<235>

58×10²⁷⁹+239 = 6(4)₂₇₈7_<280> = 3² × 7³ × 1547603831334682171_<19> × [1348928897380674732123903610930976497865829874254112138769800925111300489424406057860395231788484697745538248914081570254433225145899164766493087580390009289122685765282731070362099612847972815765456017554394607726762023032360039762153213856199503939720169411_<259>] Free to factor

58×10²⁸⁰+239 = 6(4)₂₇₉7_<281> = 1553 × 4001399 × 26438317188058903_<17> × 215711279817109996884419949010184597_<36> × [1818425466766149365282379964061358042568412839247072219891136212634899061914773476085750658065780173641881215169655708383837048987333394222539729802530028913092865312275573542400708464118031552339398694490984683975605411_<220>] (Jason Parker-Burlingham / GMP-ECM for P36 / January 2, 2021 2021 年 1 月 2 日) Free to factor

58×10²⁸¹+239 = 6(4)₂₈₀7_<282> = 1151 × 11082125518819_<14> × [50522763278408333390761972143464194062010974583056410215190948025307028661244456822014814506302264543058632123747887360407650850127537377118565015792958617907684710441313931028980971132114091291552203797638909671535006357394088320465859769969321829263908055449366763_<266>] Free to factor

58×10²⁸²+239 = 6(4)₂₈₁7_<283> = 3 × 97 × 3709 × 484840608289792343483_<21> × 50720524647687650869093895685179_<32> × [242802378722164968987783583537853074436233769280427386125293548402934003690755551135755343012113842706531740557929913140428525910437296911725951211592196284291916070200570276271774083561142062352047525848468770159427020907809_<225>] (Jason Parker-Burlingham / GMP-ECM for P32 / January 2, 2021 2021 年 1 月 2 日) Free to factor

58×10²⁸³+239 = 6(4)₂₈₂7_<284> = 7627537 × 638071099 × 4321710328811781721_<19> × 7674548114545370153_<19> × 11388072621641895043_<20> × [35056890480675115170651036402579010671359575530388898518995545449467972720517219468164105644926580477524869616657376782912051730079928789674467583075012091469601176023053798384259735251451411455247811325335839391_<212>] Free to factor

58×10²⁸⁴+239 = 6(4)₂₈₃7_<285> = 853 × 1489 × 30591419 × 162860138212440835158320679307902997_<36> × [101842097134082358370527604175897550864583851495930567587890157553436422829548854086108243741120723946980279179313697982138604913150860328442472354786756609589806873109818792243959747389834985538474622662515383177571751551490233114780037_<237>] (Jason Parker-Burlingham / GMP-ECM for P36 / January 2, 2021 2021 年 1 月 2 日) Free to factor

58×10²⁸⁵+239 = 6(4)₂₈₄7_<286> = 3 × 7 × 3301 × [92965255037354401183543867579008445412565376212755794700659893025842738051159741556590996154764709748048130356521753068254128538890732165497388157188217775918472677030689754106900426197608869526470253522661883764579917260923016754582946645957854682483582816815170647342716412695207_<281>] Free to factor

58×10²⁸⁶+239 = 6(4)₂₈₅7_<287> = 5273 × 274103 × 127816843840849_<15> × 1105064679702812673200160086377_<31> × 789183335469317649736321114440372659_<36> × [400000220204115416815763654412868400796443854061223861289083882387110561621402654059047845177980650794027744730080829095556845711312145027170001341528510910099215025561848338893807275379105225245459_<198>] (Jason Parker-Burlingham / GMP-ECM for P31 x P36 / January 2, 2021 2021 年 1 月 2 日) Free to factor

58×10²⁸⁷+239 = 6(4)₂₈₆7_<288> = 8761 × 178567 × 18193129 × 33240553 × 21769259669_<11> × 84709615336723331_<17> × 31140628800964821311_<20> × 1316752680827902662983_<22> × 6099591323328605658890584134214102517_<37> × 1476883593359329445158351378956901994128805248853777878611097592901917842346520706473969238220368059485271163091437058192348130012509286074523671904668828257627_<160> (Dmitry Domanov / GMP-ECM B1=3000000, sigma=1:1879077299 for P37 x P160 / January 16, 2021 2021 年 1 月 16 日)

58×10²⁸⁸+239 = 6(4)₂₈₇7_<289> = 3³ × 149 × 3467 × 920291 × 11054011789_<11> × 12158036669_<11> × 13050713957_<11> × 1432145597582476920683087478781683979_<37> × 6992642224519033645232644135367306761091_<40> × 28583164655565589607484776616877189004501082138915112293161752996970871752397913112590941142936406383890956114835724278964992025283111576535992931825093672747796100200909_<170> (Jason Parker-Burlingham / GMP-ECM for P37 / January 2, 2021 2021 年 1 月 2 日) (Ignacio Santos / GMP-ECM B1=3000000 for P40 x P170 / June 29, 2024 2024 年 6 月 29 日)

58×10²⁸⁹+239 = 6(4)₂₈₈7_<290> = 911 × 24181 × 643025447 × [4549510693099485916375848772623340283391441951528597418394259825715049429649621598607273793992877497617700465487642977854321106724371156253559590061608090075038034140508419701932507674091190666031792359045029202498881786150182851900349546129827106425088854582119113477991211_<274>] Free to factor

58×10²⁹⁰+239 = 6(4)₂₈₉7_<291> = 463 × 1867 × 204797 × 392893 × 843283817 × 11257528688829079416723385992039628348837_<41> × [975990217952823947469043865722960989661888388930371991737999548546955578988661049727891965901317576484152016418589341387774179253992303742099685441542223733051990767844584064756744361304407276403257582518244492100714865270823_<225>] (Ignacio Santos / GMP-ECM B1=3000000 for P41 / June 29, 2024 2024 年 6 月 29 日) Free to factor

58×10²⁹¹+239 = 6(4)₂₉₀7_<292> = 3 × 7 × 107 × 204081281 × 535677526043117986075333379238192647545594781_<45> × [26234682573284172834708789371864154364524803005051455777203433889499221654283950870481320082221611821132683278918247217129953209736158031965796501815338176856247906984710780943346017981623380653339104839998297963346868968296814516487741_<236>] (Marlon Trifunovic / GMP-ECM 7.0.5-dev B1=3000000, sigma=1:2341673332 for P45 / April 15, 2022 2022 年 4 月 15 日) Free to factor

58×10²⁹²+239 = 6(4)₂₉₁7_<293> = 17 × 36864646513_<11> × 51770021987783802049298256450091019_<35> × 24110110002510801863997157200710499463_<38> × [82385152045974338292141171237105875099366117613558487000336322726955514114248059432031786937979897629934827447103065147702221339826708375389927700815294843785076159192661974150066934509755217647841298167695131_<209>] (Jason Parker-Burlingham / GMP-ECM for P35 x P38 / January 2, 2021 2021 年 1 月 2 日) Free to factor

58×10²⁹³+239 = 6(4)₂₉₂7_<294> = 1471 × 2371 × 1326092478510671096065979_<25> × [139337317604772680562422245229846880452916094054504726970292183652840328220543609273828082671665131391334015308548992653052959323538476801288194751411791846478141954892603520269203125655994718935089494300126811980001987284058696363829616996446321514291102163050673_<264>] Free to factor

58×10²⁹⁴+239 = 6(4)₂₉₃7_<295> = 3 × 227 × 317 × 1522004261_<10> × 7842727531_<10> × 1896726344184163_<16> × 4481744566722697_<16> × 1484937042503165493743_<22> × 305339424512600621602446320230061_<33> × [648863603030000191126529410303138967095839554763598492054319480714336087193121285634717673542555860244806806053115474849673741659013714060442549355168807527291643855971175485660324206357_<186>] (Jason Parker-Burlingham / GMP-ECM for P33 / January 2, 2021 2021 年 1 月 2 日) Free to factor

58×10²⁹⁵+239 = 6(4)₂₉₄7_<296> = 19 × 89 × 172987 × 1120878061_<10> × 2418583109_<10> × [81266026449116039141688456015308453777623657955305351098593953294014727940413902325172102403236964818627324938720288399950109314146027749151226408837258653829998497571029184202207823943995556009091575185595549267550107991873019486341218292648929280888435502576658541559_<269>] Free to factor

58×10²⁹⁶+239 = 6(4)₂₉₅7_<297> = 83 × 3259 × 4153 × 37100870687_<11> × 312391105619073212085683026829_<30> × 49496938562565980971307431461690805427272147315941871113773475518038443684968897004180999454769110169656392165348983616725484094276097966434497050362874118133625214488636191385188173351646600881028576709154662780786620694734634295435002162362929229_<248> (Jason Parker-Burlingham / GMP-ECM for P30 x P248 / January 2, 2021 2021 年 1 月 2 日)

58×10²⁹⁷+239 = 6(4)₂₉₆7_<298> = 3² × 7 × 61² × 44555341 × 1197377205785331376763_<22> × [515293312832160172754214733885901033645958592932489742438539530920144576023314304656938697135846655405575083717054948861487010140412159091007675531432168562222356193148909949626922431469848435429685003790769940916898093348988419380210665468459579740052654992780583_<264>] Free to factor

58×10²⁹⁸+239 = 6(4)₂₉₇7_<299> = 67 × 4977014527841438514906493_<25> × 2709655820885033412751598369831_<31> × [71322678149810764051269412268020534899693148956470147822753539105719091350375682176240045650352019088458596808450379922466194478049321036342637156779137275208305357697465528844342099660042321569309393010352413500178960171320068007779327356927_<242>] (Jason Parker-Burlingham / GMP-ECM for P31 / January 2, 2021 2021 年 1 月 2 日) Free to factor

58×10²⁹⁹+239 = 6(4)₂₉₈7_<300> = 991 × 1259 × 5626871 × 1097498658749_<13> × 866145448429434082489892027_<27> × [96566016197810836069260065937015245798424902449744579078719769930159746492550359340781282117595461338691100507462001602420136798558271679893299152964072122265081117220808986121020338168929231387786457103976182449091593503551385397499053607391512411_<248>] Free to factor

58×10³⁰⁰+239 = 6(4)₂₉₉7_<301> = 3 × 2802193 × 85122892441_<11> × 9005748474662837690527588280407471383369635538897383597413285099927597600264760356330839980709077918269591951755960907278944767659570586750097570137495945621866073350328025694692911317792660557917698962323333086263790874068858179576723275659148584983001465312600319733809482011379373_<283>

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4. Related links 関連リンク

A103036 - OEIS (The OEIS Foundation Inc.)