Factorization of 411...113

Table of contents 目次

About 411...113 411...113 について
Prime numbers of the form 411...113 411...113 の形の素数
Factor table of 411...113 411...113 の素因数分解表
Related links 関連リンク

1. About 411...113 411...113 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

41w3 = { 43, 413, 4113, 41113, 411113, 4111113, 41111113, 411111113, 4111111113, 41111111113, … }

2. Prime numbers of the form 411...113 411...113 の形の素数

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

37×10¹+179 = 43 is prime. は素数です。
37×10⁴+179 = 41113 is prime. は素数です。
37×10⁵+179 = 411113 is prime. は素数です。
37×10¹³+179 = 4(1)₁₂3_<14> is prime. は素数です。
37×10³¹+179 = 4(1)₃₀3_<32> is prime. は素数です。
37×10⁵⁵+179 = 4(1)₅₄3_<56> is prime. は素数です。
37×10⁵⁸+179 = 4(1)₅₇3_<59> is prime. は素数です。
37×10⁵⁹+179 = 4(1)₅₈3_<60> is prime. は素数です。
37×10⁶¹+179 = 4(1)₆₀3_<62> is prime. は素数です。
37×10⁷⁹+179 = 4(1)₇₈3_<80> is prime. は素数です。
37×10⁹¹+179 = 4(1)₉₀3_<92> is prime. は素数です。
37×10¹⁰³+179 = 4(1)₁₀₂3_<104> 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: Makoto Kamada / PPSIQS / January 2, 2005 2005 年 1 月 2 日)
37×10¹²¹+179 = 4(1)₁₂₀3_<122> 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: Makoto Kamada / PPSIQS / January 2, 2005 2005 年 1 月 2 日)
37×10¹⁹⁶+179 = 4(1)₁₉₅3_<197> 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: Makoto Kamada / PPSIQS / January 2, 2005 2005 年 1 月 2 日)
37×10²²⁹+179 = 4(1)₂₂₈3_<230> 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: Makoto Kamada / PPSIQS / January 2, 2005 2005 年 1 月 2 日)
37×10⁹⁴³⁹+179 = 4(1)₉₄₃₈3_<9440> is PRP. はおそらく素数です。 (Makoto Kamada / PFGW / January 4, 2005 2005 年 1 月 4 日)
37×10¹³⁰⁵¹+179 = 4(1)₁₃₀₅₀3_<13052> is PRP. はおそらく素数です。 (Erik Branger / PFGW / September 7, 2010 2010 年 9 月 7 日)
37×10²²⁹⁶⁰+179 = 4(1)₂₂₉₅₉3_<22961> is PRP. はおそらく素数です。 (Erik Branger / PFGW / September 7, 2010 2010 年 9 月 7 日)
37×10³¹²⁹⁷+179 = 4(1)₃₁₂₉₆3_<31298> 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)

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≤50000 / Completed 終了 / Erik Branger / May 1, 2013 2013 年 5 月 1 日
n≤100000 / Completed 終了 / Bob Price / May 11, 2015 2015 年 5 月 11 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。

37×10^3k+179 = 3×(37×10⁰+179×3+37×10³-19×3×k-1Σm=010^3m)
37×10^6k+2+179 = 7×(37×10²+179×7+37×10²×10⁶-19×7×k-1Σm=010^6m)
37×10^18k+8+179 = 19×(37×10⁸+179×19+37×10⁸×10¹⁸-19×19×k-1Σm=010^18m)
37×10^21k+1+179 = 43×(37×10¹+179×43+37×10×10²¹-19×43×k-1Σm=010^21m)
37×10^22k+21+179 = 23×(37×10²¹+179×23+37×10²¹×10²²-19×23×k-1Σm=010^22m)
37×10^28k+16+179 = 29×(37×10¹⁶+179×29+37×10¹⁶×10²⁸-19×29×k-1Σm=010^28m)
37×10^32k+17+179 = 353×(37×10¹⁷+179×353+37×10¹⁷×10³²-19×353×k-1Σm=010^32m)
37×10^35k+6+179 = 71×(37×10⁶+179×71+37×10⁶×10³⁵-19×71×k-1Σm=010^35m)
37×10^42k+23+179 = 127×(37×10²³+179×127+37×10²³×10⁴²-19×127×k-1Σm=010^42m)
37×10^46k+36+179 = 139×(37×10³⁶+179×139+37×10³⁶×10⁴⁶-19×139×k-1Σm=010^46m)

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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 16.22%. 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 16.22% です。

3. Factor table of 411...113 411...113 の素因数分解表

3.2. Range of factorization 分解範囲

n≤100 / Completed 終了 / December 1, 2004 2004 年 12 月 1 日
n≤150 / Completed 終了 / December 12, 2008 2008 年 12 月 12 日
n≤200 / Completed 終了 / March 6, 2021 2021 年 3 月 6 日
n≤300 / Remaining 42 残り 42

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

n=208, 210, 211, 213, 223, 231, 234, 236, 244, 245, 248, 249, 252, 255, 257, 260, 261, 262, 263, 265, 267, 268, 269, 270, 274, 278, 280, 283, 284, 285, 286, 287, 289, 290, 291, 292, 293, 294, 296, 297, 298, 300 (42/300)

3.4. Factor table 素因数分解表

37×10¹+179 = 43 = definitely prime number 素数

37×10²+179 = 413 = 7 × 59

37×10³+179 = 4113 = 3² × 457

37×10⁴+179 = 41113 = definitely prime number 素数

37×10⁵+179 = 411113 = definitely prime number 素数

37×10⁶+179 = 4111113 = 3 × 71 × 19301

37×10⁷+179 = 41111113 = 499 × 82387

37×10⁸+179 = 411111113 = 7 × 19 × 733 × 4217

37×10⁹+179 = 4111111113_<10> = 3 × 1370370371_<10>

37×10¹⁰+179 = 41111111113_<11> = 109 × 523 × 721159

37×10¹¹+179 = 411111111113_<12> = 157 × 6473 × 404533

37×10¹²+179 = 4111111111113_<13> = 3² × 191 × 1847 × 1294841

37×10¹³+179 = 41111111111113_<14> = definitely prime number 素数

37×10¹⁴+179 = 411111111111113_<15> = 7² × 8390022675737_<13>

37×10¹⁵+179 = 4111111111111113_<16> = 3 × 7866827 × 174196073

37×10¹⁶+179 = 41111111111111113_<17> = 29 × 751 × 1887649162547_<13>

37×10¹⁷+179 = 411111111111111113_<18> = 353 × 1164620711362921_<16>

37×10¹⁸+179 = 4111111111111111113_<19> = 3 × 293 × 563 × 644701 × 12885569

37×10¹⁹+179 = 41111111111111111113_<20> = 5569 × 2285711 × 3229688807_<10>

37×10²⁰+179 = 411111111111111111113_<21> = 7 × 2311 × 62563 × 406203502163_<12>

37×10²¹+179 = 4111111111111111111113_<22> = 3⁴ × 23 × 2206715572255024751_<19>

37×10²²+179 = 41111111111111111111113_<23> = 43 × 956072351421188630491_<21>

37×10²³+179 = 411111111111111111111113_<24> = 107 × 127 × 2371 × 236063 × 54052058729_<11>

37×10²⁴+179 = 4111111111111111111111113_<25> = 3 × 26321 × 48468857 × 1074169449643_<13>

37×10²⁵+179 = 41111111111111111111111113_<26> = 5318843 × 7729333449231554891_<19>

37×10²⁶+179 = 411111111111111111111111113_<27> = 7 × 19 × 97 × 761 × 103087 × 406206886208659_<15>

37×10²⁷+179 = 4111111111111111111111111113_<28> = 3 × 1370370370370370370370370371_<28>

37×10²⁸+179 = 41111111111111111111111111113_<29> = 1123 × 36608291283269021470268131_<26>

37×10²⁹+179 = 411111111111111111111111111113_<30> = 337 × 784919 × 3287957 × 472692098466803_<15>

37×10³⁰+179 = 4111111111111111111111111111113_<31> = 3² × 1493 × 305954536809638394813657149_<27>

37×10³¹+179 = 41111111111111111111111111111113_<32> = definitely prime number 素数

37×10³²+179 = 411111111111111111111111111111113_<33> = 7 × 58730158730158730158730158730159_<32>

37×10³³+179 = 4111111111111111111111111111111113_<34> = 3 × 14268239 × 96043412951687336494038989_<26>

37×10³⁴+179 = 41111111111111111111111111111111113_<35> = 1811 × 9041 × 16061 × 42461 × 3681811034153413003_<19>

37×10³⁵+179 = 411111111111111111111111111111111113_<36> = 1553 × 264720612434714173284681977534521_<33>

37×10³⁶+179 = 4111111111111111111111111111111111113_<37> = 3 × 139 × 14758357 × 668013359681725060777999877_<27>

37×10³⁷+179 = 41111111111111111111111111111111111113_<38> = 11119 × 389204219 × 9499832435903447555140133_<25>

37×10³⁸+179 = 411111111111111111111111111111111111113_<39> = 7 × 8990101 × 654670283 × 9978700225696061929273_<22>

37×10³⁹+179 = 4111111111111111111111111111111111111113_<40> = 3² × 2551 × 50231 × 40946749 × 87059264957178216280453_<23>

37×10⁴⁰+179 = 41111111111111111111111111111111111111113_<41> = 81858359766731_<14> × 502222512499200501687147323_<27>

37×10⁴¹+179 = 411111111111111111111111111111111111111113_<42> = 47 × 71 × 123197815736023707255352445643125894849_<39>

37×10⁴²+179 = 4111111111111111111111111111111111111111113_<43> = 3 × 731218181 × 1874092310582701950582886792813991_<34>

37×10⁴³+179 = 41111111111111111111111111111111111111111113_<44> = 23 × 43 × 4751 × 4138579 × 2114105435854264729580439199873_<31>

37×10⁴⁴+179 = 411111111111111111111111111111111111111111113_<45> = 7 × 19 × 29 × 106588309855097513899691758130959582865209_<42>

37×10⁴⁵+179 = 4111111111111111111111111111111111111111111113_<46> = 3 × 2843 × 5717 × 4063247876359553087_<19> × 20750071185889488043_<20>

37×10⁴⁶+179 = 41111111111111111111111111111111111111111111113_<47> = 61 × 420789137 × 88244130425309_<14> × 18150100416347806035601_<23>

37×10⁴⁷+179 = 411111111111111111111111111111111111111111111113_<48> = 211943 × 7445936591_<10> × 260507843492249016244552793209601_<33>

37×10⁴⁸+179 = 4111111111111111111111111111111111111111111111113_<49> = 3³ × 6177343219_<10> × 2024135551508327_<16> × 12177387494027891764463_<23>

37×10⁴⁹+179 = 41111111111111111111111111111111111111111111111113_<50> = 353 × 116462071136292099464903997481901164620711362921_<48>

37×10⁵⁰+179 = 411111111111111111111111111111111111111111111111113_<51> = 7 × 887 × 6971 × 80677 × 157904405567_<12> × 745587270239166947521455313_<27>

37×10⁵¹+179 = 4(1)₅₀3_<52> = 3 × 25733 × 338413181069_<12> × 157362146009980342985172951659240323_<36>

37×10⁵²+179 = 4(1)₅₁3_<53> = 14117797379302453_<17> × 2912006030868702847322312411325473221_<37>

37×10⁵³+179 = 4(1)₅₂3_<54> = 284243 × 641452457447_<12> × 82557506998581481_<17> × 27311678601971944013_<20>

37×10⁵⁴+179 = 4(1)₅₃3_<55> = 3 × 349 × 27509 × 142737382886243780011185750031729169997125230531_<48>

37×10⁵⁵+179 = 4(1)₅₄3_<56> = definitely prime number 素数

37×10⁵⁶+179 = 4(1)₅₅3_<57> = 7² × 170167 × 262303 × 218493793322414808547_<21> × 860291099664362229542171_<24>

37×10⁵⁷+179 = 4(1)₅₆3_<58> = 3² × 84722646863870221903_<20> × 5391594105773709273564815714076539119_<37>

37×10⁵⁸+179 = 4(1)₅₇3_<59> = definitely prime number 素数

37×10⁵⁹+179 = 4(1)₅₈3_<60> = definitely prime number 素数

37×10⁶⁰+179 = 4(1)₅₉3_<61> = 3 × 59 × 13594003 × 847784282922594203_<18> × 2015362743940685653791423689145241_<34>

37×10⁶¹+179 = 4(1)₆₀3_<62> = definitely prime number 素数

37×10⁶²+179 = 4(1)₆₁3_<63> = 7 × 19 × 25850965905769_<14> × 119572359387469346427196761969320836220284097069_<48>

37×10⁶³+179 = 4(1)₆₂3_<64> = 3 × 33967 × 2996777144820626677_<19> × 13462518738923203389435240586511147134169_<41>

37×10⁶⁴+179 = 4(1)₆₃3_<65> = 43 × 1229 × 121525711891_<12> × 8366755895620831_<16> × 765091899645220909279208722904099_<33>

37×10⁶⁵+179 = 4(1)₆₄3_<66> = 23² × 127 × 223090199 × 27429590925557002847424894049924166826523743476459089_<53>

37×10⁶⁶+179 = 4(1)₆₅3_<67> = 3² × 106367 × 1427077877669_<13> × 99953536936375907633_<20> × 30106755407836245055295249923_<29>

37×10⁶⁷+179 = 4(1)₆₆3_<68> = 36713 × 969797 × 20274851 × 56950931614739435602298649441202926042584908503983_<50>

37×10⁶⁸+179 = 4(1)₆₇3_<69> = 7 × 3469 × 348287 × 426201623843628468543637_<24> × 114052421449710677121230142914309569_<36>

37×10⁶⁹+179 = 4(1)₆₈3_<70> = 3 × 733 × 821 × 829 × 3079 × 1447628215901653603_<19> × 616267931763492436759415733904050866339_<39>

37×10⁷⁰+179 = 4(1)₆₉3_<71> = 4190798831_<10> × 52633686742032076809109_<23> × 186379700350031770069896795012298151147_<39>

37×10⁷¹+179 = 4(1)₇₀3_<72> = 584707935973885063_<18> × 703105064627466687194473673291811619668670538062658351_<54>

37×10⁷²+179 = 4(1)₇₁3_<73> = 3 × 29 × 2247512135921041994909_<22> × 21025092566657741892365435045901810307864815050411_<50>

37×10⁷³+179 = 4(1)₇₂3_<74> = 68672686354735574108031355612763453_<35> × 598653020485431255706302191760471396221_<39> (Makoto Kamada / msieve 0.81 / 5.5 minutes)

37×10⁷⁴+179 = 4(1)₇₃3_<75> = 7 × 1213 × 1327 × 115633747 × 100221495629_<12> × 2646710744879_<13> × 227399186574186329_<18> × 5231046556089865573_<19>

37×10⁷⁵+179 = 4(1)₇₄3_<76> = 3³ × 401 × 379709163305727450920025040279958539864330942191845489157764026148620219_<72>

37×10⁷⁶+179 = 4(1)₇₅3_<77> = 71 × 107 × 1288541 × 585697009 × 7089181693319441_<16> × 60293728689276741733_<20> × 16775581777402988499997_<23>

37×10⁷⁷+179 = 4(1)₇₆3_<78> = 577 × 712497592913537454265357211631041787020989793953398806085114577315617176969_<75>

37×10⁷⁸+179 = 4(1)₇₇3_<79> = 3 × 4761083 × 1988679633118514137037982628153_<31> × 144732939065280776206476084579620720880929_<42> (Makoto Kamada / msieve 0.81 / 5.1 minutes)

37×10⁷⁹+179 = 4(1)₇₈3_<80> = definitely prime number 素数

37×10⁸⁰+179 = 4(1)₇₉3_<81> = 7 × 19 × 3091060985797827903091060985797827903091060985797827903091060985797827903091061_<79>

37×10⁸¹+179 = 4(1)₈₀3_<82> = 3 × 353 × 504356715895883_<15> × 7697070179745161104192229800204652264671379685181545872414913929_<64>

37×10⁸²+179 = 4(1)₈₁3_<83> = 139 × 229 × 1453 × 459209 × 4275023 × 24458028130127_<14> × 18512839279237890689905685257552304602641540583619_<50>

37×10⁸³+179 = 4(1)₈₂3_<84> = 39461 × 218204380096493474091492593_<27> × 47744974290143756699261067928700258433130208040089381_<53>

37×10⁸⁴+179 = 4(1)₈₃3_<85> = 3² × 179 × 40531 × 220373 × 2549279 × 78384901289_<11> × 380382334360473007_<18> × 3758788139591943147688105321674095773_<37>

37×10⁸⁵+179 = 4(1)₈₄3_<86> = 43 × 460841 × 473533 × 4381162873955469808990952491193464556485641489789879722725962219730777247_<73>

37×10⁸⁶+179 = 4(1)₈₅3_<87> = 7 × 113 × 1013 × 1901 × 168643 × 10703930928488277317_<20> × 149513205144452658400706486702650659462622743377166881_<54>

37×10⁸⁷+179 = 4(1)₈₆3_<88> = 3 × 23 × 47 × 69491 × 18242472682329800637576096582754097724424244722076833412742570399613842943828601_<80>

37×10⁸⁸+179 = 4(1)₈₇3_<89> = 318514524485906897317283583479528981_<36> × 129071385920205115815009182540393265674479123958105573_<54> (Makoto Kamada / GGNFS-0.70.3 / 0.17 hours)

37×10⁸⁹+179 = 4(1)₈₈3_<90> = 157 × 14149505821769_<14> × 185062442602012612170321382824740673115322324571867089738922228186971671861_<75>

37×10⁹⁰+179 = 4(1)₈₉3_<91> = 3 × 149 × 27653 × 51115249565744920857396673_<26> × 6506672565155718010668194601250310547272387420870180513291_<58>

37×10⁹¹+179 = 4(1)₉₀3_<92> = definitely prime number 素数

37×10⁹²+179 = 4(1)₉₁3_<93> = 7 × 758023029617473_<15> × 44011173324865447_<17> × 53720523862892731425818416171_<29> × 32769935640210898295364263962859_<32>

37×10⁹³+179 = 4(1)₉₂3_<94> = 3² × 1789467327374290181_<19> × 132912200659205079292965196301_<30> × 1920560900493094865401866266897347553640992897_<46> (Makoto Kamada / msieve 0.81 / 10 minutes)

37×10⁹⁴+179 = 4(1)₉₃3_<95> = 3249763498153_<13> × 8341229994949_<13> × 1516622036688018425322536742895367963999916265639194036678594842925229_<70>

37×10⁹⁵+179 = 4(1)₉₄3_<96> = 1680319 × 307476629 × 694430887 × 18641369478940301_<17> × 80819629572950563_<17> × 760556822021479532843806315873935388523_<39>

37×10⁹⁶+179 = 4(1)₉₅3_<97> = 3 × 1165776134759_<13> × 1175500449452643820580919278408776069572641751786570096968860804257127655299221008069_<85>

37×10⁹⁷+179 = 4(1)₉₆3_<98> = 4817 × 7747374218645174473_<19> × 1101610417619428068471249807993959372974795086545113036567406205974976358193_<76>

37×10⁹⁸+179 = 4(1)₉₇3_<99> = 7³ × 19 × 33721993 × 2976880051_<10> × 628401081762047550996973681132081655743113050679451639245842903968271278474223_<78>

37×10⁹⁹+179 = 4(1)₉₈3_<100> = 3 × 167 × 3163 × 20454867712843970909_<20> × 184305017786764573439693235684554117_<36> × 688158474477353797382644287785626195567_<39> (Makoto Kamada / msieve 0.81 / 8.4 minutes)

37×10¹⁰⁰+179 = 4(1)₉₉3_<101> = 29 × 4441 × 11852891 × 19034700403843_<14> × 13266402888993867405460177_<26> × 106649033735220886111920788950358692886224772525317_<51>

37×10¹⁰¹+179 = 4(1)₁₀₀3_<102> = 131 × 373 × 66298672231680697_<17> × 124270671262932813977_<21> × 5339278972083386061151760617_<28> × 191259492550179013254672278996687_<33>

37×10¹⁰²+179 = 4(1)₁₀₁3_<103> = 3⁴ × 190006429 × 41069845939391_<14> × 102312544096715833460066914145360123_<36> × 63570253344877923919736852695701659411885609_<44> (Makoto Kamada / Msieve 1.39 for P36 x P44 / 21 minutes on Pentium 4 3.06GHz, Windows XP and Cygwin / December 9, 2008 2008 年 12 月 9 日)

37×10¹⁰³+179 = 4(1)₁₀₂3_<104> = definitely prime number 素数

37×10¹⁰⁴+179 = 4(1)₁₀₃3_<105> = 7 × 13906795613_<11> × 191527725033837704294831_<24> × 22049688198780996910721688780021075548111476058170795665799609460913653_<71>

37×10¹⁰⁵+179 = 4(1)₁₀₄3_<106> = 3 × 440595332445421_<15> × 162289576442334379000601302213848203_<36> × 19164938991181777466523269202040285923651202343362585517_<56> (Makoto Kamada / GMP-ECM 6.2.1 B1=25e4, sigma=3862425856 for P36 / December 5, 2008 2008 年 12 月 5 日)

37×10¹⁰⁶+179 = 4(1)₁₀₅3_<107> = 43 × 61 × 5189 × 282001 × 10710915792593771466662332208858698355914136120035963252974523708202209900074264871162362076379_<95>

37×10¹⁰⁷+179 = 4(1)₁₀₆3_<108> = 127 × 181 × 191 × 85817 × 74194045867266043_<17> × 14706223739586734092170962769032975992684794001962344371264710596375016520492919_<80>

37×10¹⁰⁸+179 = 4(1)₁₀₇3_<109> = 3 × 279294958181_<12> × 104182055552360290276887991646980292952367714049_<48> × 47095774354938298478289361041793337607914469549959_<50> (Robert Backstrom / GGNFS-0.77.1-20051202-athlon, Msieve 1.39 snfs / 0.66 hours, 0.1 hours / December 10, 2008 2008 年 12 月 10 日)

37×10¹⁰⁹+179 = 4(1)₁₀₈3_<110> = 23 × 22115353963_<11> × 74107818511_<11> × 20288855357221307444588716847_<29> × 53754633920485650751518557177632083869545213561233239872861_<59> (Erik Branger / Msieve for P29 x P59 / 1.22 hours / December 10, 2008 2008 年 12 月 10 日)

37×10¹¹⁰+179 = 4(1)₁₀₉3_<111> = 7 × 628917962227_<12> × 16006843126966813929239_<23> × 2656956168628220701641025905192586621_<37> × 2195720705836293015831544439171400308143_<40> (Makoto Kamada / GMP-ECM 6.2.1 B1=25e4, sigma=3893968894 for P40 / December 5, 2008 2008 年 12 月 5 日)

37×10¹¹¹+179 = 4(1)₁₁₀3_<112> = 3² × 71 × 618262165761401002774437605673913_<33> × 10406044663489707447387507175870550277722294772411596553841350107955983685359_<77> (Makoto Kamada / GMP-ECM 6.2.1 B1=25e4, sigma=1733571211 for P33 / December 5, 2008 2008 年 12 月 5 日)

37×10¹¹²+179 = 4(1)₁₁₁3_<113> = 379 × 1639987 × 2961077313095483_<16> × 12753719553121867358531_<23> × 1751430826938768409656470254170094445563204401335380538729163934297_<67>

37×10¹¹³+179 = 4(1)₁₁₂3_<114> = 353 × 357572207 × 3257022465850991026964911662776440693018161865164051999152574489986751322471469656099149779507055380903_<103>

37×10¹¹⁴+179 = 4(1)₁₁₃3_<115> = 3 × 46749460828632769_<17> × 342019143905148467_<18> × 4443048294979475939438127594270716123_<37> × 19289896788573421186011112317378260526846499_<44> (Makoto Kamada / Msieve 1.39 for P37 x P44 / 25 minutes on Pentium 4 3.06GHz, Windows XP and Cygwin / December 9, 2008 2008 年 12 月 9 日)

37×10¹¹⁵+179 = 4(1)₁₁₄3_<116> = 269 × 322463 × 5497749320430187878858053736352893214180573673_<46> × 86206916448515400419165649243334368387994159291444142145800123_<62> (Erik Branger / GGNFS, Msieve snfs / 1.75 hours / December 10, 2008 2008 年 12 月 10 日)

37×10¹¹⁶+179 = 4(1)₁₁₅3_<117> = 7 × 19² × 41256435683_<11> × 2796469277087969721701_<22> × 114211823311050440958853592870171_<33> × 12346422959357553160831951984115598501274515799483_<50> (Makoto Kamada / Msieve 1.39 for P33 x P50 / 32 minutes on Pentium 4 3.06GHz, Windows XP and Cygwin / December 9, 2008 2008 年 12 月 9 日)

37×10¹¹⁷+179 = 4(1)₁₁₆3_<118> = 3 × 134559089698345633832840039614067963863_<39> × 10184153099151195348037371312804759219593045915950096947235927280552420123916917_<80> (Erik Branger / GGNFS, Msieve snfs / 2.12 hours / December 10, 2008 2008 年 12 月 10 日)

37×10¹¹⁸+179 = 4(1)₁₁₇3_<119> = 59 × 109 × 780433 × 369285778102739495137261341581_<30> × 22181070269155109783562069123105623896282019970639176229640191423908175990898051_<80> (Robert Backstrom / GGNFS-0.77.1-20051202-athlon snfs / 1.40 hours / December 10, 2008 2008 年 12 月 10 日)

37×10¹¹⁹+179 = 4(1)₁₁₈3_<120> = 8971 × 45826676079713645202442437979167440765924769937700491707848747197760685666158857553350920868477439651221838268990203_<116>

37×10¹²⁰+179 = 4(1)₁₁₉3_<121> = 3² × 41917848601826078201_<20> × 863751842918896975369_<21> × 2308101579971905738871819833_<28> × 5466052707546773971047511126807607037714431298168841_<52>

37×10¹²¹+179 = 4(1)₁₂₀3_<122> = definitely prime number 素数

37×10¹²²+179 = 4(1)₁₂₁3_<123> = 7 × 97 × 23208376758293759_<17> × 11321645345950217203_<20> × 15652936366021378224975875123042415241_<38> × 147210676410511528346899665360963987897123545971_<48> (Makoto Kamada / Msieve 1.39 for P38 x P48 / 1.5 hours on Pentium 4 3.06GHz, Windows XP and Cygwin / December 10, 2008 2008 年 12 月 10 日)

37×10¹²³+179 = 4(1)₁₂₂3_<124> = 3 × 12175381 × 24966289 × 104613191 × 1627252480597_<13> × 6084530298541101046253093_<25> × 4352441637588567340589917200005057910692805623227041888630191929_<64>

37×10¹²⁴+179 = 4(1)₁₂₃3_<125> = 468623 × 112530124858026319235276321085291537757319_<42> × 779590994951787401614222560214997243616363930234312099703490458459408464798049_<78> (Sinkiti Sibata / GGNFS-0.77.1-20060513-k8 snfs / 3.54 hours on Core 2 Duo E6300 1.86GHz, Windows Vista / December 10, 2008 2008 年 12 月 10 日)

37×10¹²⁵+179 = 4(1)₁₂₄3_<126> = 223 × 8663 × 126466623195854517098346870112753670547872292270689591_<54> × 1682713250659195660607781542641572535401816555627858765330728147207_<67> (Serge Batalov / Msieve-1.39 snfs / 1.50 hours on Opteron-2.6GHz; Linux x86_64 / December 10, 2008 2008 年 12 月 10 日)

37×10¹²⁶+179 = 4(1)₁₂₅3_<127> = 3 × 136256540267_<12> × 3706954195686587_<16> × 1126034308459893071_<19> × 2409415832020869702484827666413478077146937460992520790393571033388292120462456069_<82>

37×10¹²⁷+179 = 4(1)₁₂₆3_<128> = 43 × 2287 × 5402086163_<10> × 1496014728227396684836493981_<28> × 192989518424688578863761535141003_<33> × 268036227003025546179556250126925130151642985964735177_<54> (Erik Branger / Msieve for P33 x P54 / 0.93 hours / December 11, 2008 2008 年 12 月 11 日)

37×10¹²⁸+179 = 4(1)₁₂₇3_<129> = 7 × 29 × 139 × 366317336179_<12> × 5892987442010330386722922517752335244214957_<43> × 6749248030263033399317509977913277782333557881183738908126529217567863_<70> (Sinkiti Sibata / GGNFS-0.77.1-20060513-k8 snfs / 5.06 hours on Core 2 Duo E6300 1.86GHz, Windows Vista / December 10, 2008 2008 年 12 月 10 日)

37×10¹²⁹+179 = 4(1)₁₂₈3_<130> = 3³ × 107 × 1439 × 988896588918815037824359083425427669043252439186935639055310830376732984477343697611031638570377324718814604848014745998303_<123>

37×10¹³⁰+179 = 4(1)₁₂₉3_<131> = 733 × 2755861 × 7976815312434325655010026496828210010899659_<43> × 2551340330232941042791734672815796033637758911848411720302531081819024948523739_<79> (Sinkiti Sibata / GGNFS-0.77.1-20060513-k8 snfs / 5.22 hours on Core 2 Duo E6300 1.86GHz, Windows Vista / December 10, 2008 2008 年 12 月 10 日)

37×10¹³¹+179 = 4(1)₁₃₀3_<132> = 23 × 71699265203561_<14> × 960213857480717092820466634798010164748470829921701_<51> × 259626312129121757923718106411025688347436635718952611864568981371_<66> (Sinkiti Sibata / GGNFS-0.77.1-20050930-pentium4 snfs / 6.36 hours on Pentium 4 2.4GHz, Windows XP and Cygwin / December 11, 2008 2008 年 12 月 11 日)

37×10¹³²+179 = 4(1)₁₃₁3_<133> = 3 × 7583 × 11535101 × 3804638313820375456246220797_<28> × 4117770380360137027754892208607309414209852961353118707178825662004704648473503880310043341621_<94>

37×10¹³³+179 = 4(1)₁₃₂3_<134> = 47 × 3144091 × 134779617139_<12> × 1684250815571_<13> × 5951370594238928819_<19> × 1846930778518400047877578506461_<31> × 111498147308124191098798893215513683973801682874412539_<54> (Makoto Kamada / GMP-ECM 6.2.1 B1=25e4, sigma=2554788293 for P31 / December 6, 2008 2008 年 12 月 6 日)

37×10¹³⁴+179 = 4(1)₁₃₃3_<135> = 7 × 19 × 2672183 × 2787517541_<10> × 471132757239436147139808562613_<30> × 880806410459632276715596095841364037728882550136191983702131080550187115046449927559099_<87> (Makoto Kamada / GMP-ECM 6.2.1 B1=25e4, sigma=4130022222 for P30 / December 6, 2008 2008 年 12 月 6 日)

37×10¹³⁵+179 = 4(1)₁₃₄3_<136> = 3 × 233 × 35533039 × 14641719656254489741568420087470167181_<38> × 11304662450032683330928990275564458178851499064755153440882955206425538566141385065716793_<89> (Sinkiti Sibata / GGNFS-0.77.1-20060513-nocona snfs / 8.28 hours on Core 2 Quad Q6600 2.4GHz, Windows Vista and Cygwin / December 10, 2008 2008 年 12 月 10 日)

37×10¹³⁶+179 = 4(1)₁₃₅3_<137> = 372133271 × 3432623119417_<13> × 21260462606590411_<17> × 1513776925312769062048249658482032998517075602958972400404430337644533524621207017391247632161392869_<100>

37×10¹³⁷+179 = 4(1)₁₃₆3_<138> = 37745119 × 3219321487884923385567438048156219294654507482548165761458705309_<64> × 3383249819657721642586538439401357021436968537987233098257618204803_<67> (Sinkiti Sibata / GGNFS-0.77.1-20060513-nocona snfs / 10.43 hours on Core 2 Quad Q6600 2.4GHz, Windows Vista and Cygwin / December 10, 2008 2008 年 12 月 10 日)

37×10¹³⁸+179 = 4(1)₁₃₇3_<139> = 3² × 510775719844408392390465528501098122071849389_<45> × 894306651059953932405219537564294331814846472823973070870460522554892046315226837865094032613_<93> (Sinkiti Sibata / GGNFS-0.77.1-20060513-nocona snfs / 13.91 hours on Core 2 Quad Q6600 2.4GHz, Windows Vista and Cygwin / December 10, 2008 2008 年 12 月 10 日)

37×10¹³⁹+179 = 4(1)₁₃₈3_<140> = 263 × 1129 × 776571400668482335948948936970269317882230994910909567_<54> × 178290470791338198590566039041674126404436054299479729486821730640619604606479657_<81> (Sinkiti Sibata / GGNFS-0.77.1-20060513-k8 snfs / 13.11 hours on Core 2 Duo E6300 1.86GHz, Windows Vista / December 11, 2008 2008 年 12 月 11 日)

37×10¹⁴⁰+179 = 4(1)₁₃₉3_<141> = 7² × 463 × 259452516097_<12> × 12224976615594643753028840051569_<32> × 349677359272427213877770746562063814121121_<42> × 16338369215819639791633317799316136066415149505855783_<53> (Makoto Kamada / GMP-ECM 6.2.1 B1=25e4, sigma=1073111114 for P32 / December 6, 2008 2008 年 12 月 6 日) (Sinkiti Sibata / Msieve 1.39 for P42 x P53 / 3.54 hours / December 10, 2008 2008 年 12 月 10 日)

37×10¹⁴¹+179 = 4(1)₁₄₀3_<142> = 3 × 751 × 12037 × 2372918662883_<13> × 63884707445967886439079114329128453227808030492175935957493850678923162115492992495199930110723283225687744937707494980451_<122>

37×10¹⁴²+179 = 4(1)₁₄₁3_<143> = 22702223 × 6121752194057_<13> × 231666310117384663_<18> × 1276886226190957832309633855974198356920371392733260978239238476876516263035945078749787216857380655672041_<106>

37×10¹⁴³+179 = 4(1)₁₄₂3_<144> = 108062477 × 1286855954399_<13> × 2956339867310275738648853014162480431096757636348936858000356432527135046454263451401839455186041091792599352096960653183731_<124>

37×10¹⁴⁴+179 = 4(1)₁₄₃3_<145> = 3 × 1496597 × 2961897446353_<13> × 41971050222566527_<17> × 593993235801753129113_<21> × 3407903959559821862197_<22> × 3638684403449605146707256346382154261001563619231849660436076224573_<67>

37×10¹⁴⁵+179 = 4(1)₁₄₄3_<146> = 353 × 2131 × 527010246557101099424149801137279030430573559_<45> × 31339397888629582441406376485402492357432031637_<47> × 3308958741102845839413788208190473225543080012977_<49> (Serge Batalov / Msieve-1.39 snfs / 8.00 hours on Opteron-2.6GHz; Linux x86_64 / December 10, 2008 2008 年 12 月 10 日)

37×10¹⁴⁶+179 = 4(1)₁₄₅3_<147> = 7 × 71 × 7717 × 334793 × 627732433 × 356693996625943_<15> × 1766069054027965440964145667998262780071429651417_<49> × 809654824638086357101658646633649047759620702589883621852808083_<63> (Sinkiti Sibata / GGNFS-0.77.1-20060513-k8 snfs / 18.72 hours on Core 2 Duo E6300 1.86GHz, Windows Vista / December 11, 2008 2008 年 12 月 11 日)

37×10¹⁴⁷+179 = 4(1)₁₄₆3_<148> = 3² × 1682582417488769_<16> × 185520423039161200349_<21> × 1463351418533092199866440738334455669742344684598820377042022438710748735142877572260774879070325787406053756597_<112>

37×10¹⁴⁸+179 = 4(1)₁₄₇3_<149> = 43² × 363116385553_<12> × 22691835202598580127_<20> × 2698403153885971042671014540914167580561774208417485415620043263127985784570071007791138150107254899422845411308127_<115>

37×10¹⁴⁹+179 = 4(1)₁₄₈3_<150> = 127 × 11282083 × 2109610728710016200472049234081_<31> × 1422639995218516766085174683074889_<34> × 95602415156372339326148758212848196389050952859263144734499019891465623985877_<77> (Serge Batalov / GMP-ECM 6.2.1 B1=1000000, sigma=640405658 for P31 / December 10, 2008 2008 年 12 月 10 日) (Robert Backstrom / GMP-ECM 6.2.1 B1=1474000, sigma=4067917861 for P34 / December 11, 2008 2008 年 12 月 11 日)

37×10¹⁵⁰+179 = 4(1)₁₄₉3_<151> = 3 × 35322799 × 301866832776298641101058383_<27> × 2594925527914511341596318466274576379113700104320912139_<55> × 49527060558983801304162718190994337266256570404149672188885417_<62> (Sinkiti Sibata / GGNFS-0.77.1-20060513-k8 snfs / 23.56 hours on Core 2 Duo E6300 1.86GHz, Windows Vista / December 12, 2008 2008 年 12 月 12 日)

37×10¹⁵¹+179 = 4(1)₁₅₀3_<152> = 8353 × 34386593 × 2039773586951292013_<19> × 273368539496778091201031494207412509_<36> × 256682989397362158875629863353292151892741767670591065562820018228860886687460955569841_<87> (Serge Batalov / GMP-ECM 6.2.1 B1=1000000, sigma=3498479059 for P36 / December 10, 2008 2008 年 12 月 10 日)

37×10¹⁵²+179 = 4(1)₁₅₁3_<153> = 7 × 19 × 44959 × 203910624271_<12> × 507610655507_<12> × 14460141021394288398859618298437_<32> × 151493134078234480918166746651747002165127_<42> × 303217922469936086150886963014441185305391540464493_<51> (Serge Batalov / GMP-ECM 6.2.1 B1=3000000, sigma=2586452568 for P32 / December 10, 2008 2008 年 12 月 10 日) (Jo Yeong Uk / Msieve 1.39 for P42 x P51 / 1.67 hours / December 11, 2008 2008 年 12 月 11 日)

37×10¹⁵³+179 = 4(1)₁₅₂3_<154> = 3 × 23 × 53069057 × 287828909 × 147798446122814265682532579169586489229599427021466891689_<57> × 26391524244025315181901986791051403695472473000891951978687175963298942219564161_<80> (Sinkiti Sibata / GGNFS-0.77.1-20060513-nocona snfs / 41.73 hours on Core 2 Quad Q6600 2.4GHz, Windows Vista and Cygwin / December 11, 2008 2008 年 12 月 11 日)

37×10¹⁵⁴+179 = 4(1)₁₅₃3_<155> = 21089 × 2363861 × 474284206163_<12> × 131233336262996763208529705822455103762873856738445745721093470207_<66> × 13249468585707739286382083178667357680893222111820417576063166951417_<68> (Sinkiti Sibata / GGNFS-0.77.1-20060513-nocona snfs / 41.45 hours on Core 2 Quad Q6600 2.4GHz, Windows Vista and Cygwin / December 11, 2008 2008 年 12 月 11 日)

37×10¹⁵⁵+179 = 4(1)₁₅₄3_<156> = 457 × 1521973 × 4812749602630778901982598117461876860320447_<43> × 150708074931584761567153708706295660448302303155627_<51> × 814903676675932977298347920721395104373594560096382057_<54> (Serge Batalov / Msieve-1.39 snfs / 11.00 hours on Opteron-2.6GHz; Linux x86_64 / December 11, 2008 2008 年 12 月 11 日)

37×10¹⁵⁶+179 = 4(1)₁₅₅3_<157> = 3³ × 29 × 10189769 × 13778351 × 2556268457_<10> × 3797525954125859456188033584306947_<34> × 3852375905322761719761070474805539193083531228124173816698883017752530486655049572263981171562611_<97> (Sinkiti Sibata / Msieve / 30.38 hours / December 23, 2008 2008 年 12 月 23 日)

37×10¹⁵⁷+179 = 4(1)₁₅₆3_<158> = 863 × 73607 × 2627737972449370281351927889_<28> × 2352669523486813031676403292583158308856321454209_<49> × 104685448438146196434694486111792280502604118654516603864565957058052394593_<75> (Sinkiti Sibata / GGNFS-0.77.1-20060513-k8 snfs / 51.04 hours on Core 2 Duo E6300 1.86GHz, Windows Vista / December 13, 2008 2008 年 12 月 13 日)

37×10¹⁵⁸+179 = 4(1)₁₅₇3_<159> = 7 × 1249 × 1381 × 6571 × 2896207 × 1527407729530867_<16> × 1171356272654871026223019920742698683615622053456587699481411117097541227738109285935044583782593138327230322796327244621077789_<127>

37×10¹⁵⁹+179 = 4(1)₁₅₈3_<160> = 3 × 883 × 236107 × 6573072057648672985479150981373683721513129778853554464225559414607937107052991998739550544634828910973917133931125706290738023068568386666361526896691_<151>

37×10¹⁶⁰+179 = 4(1)₁₅₉3_<161> = 2211071263_<10> × 230520570756165931_<18> × 182534298451988745491465996097413122160200468742407_<51> × 441877926343855694297910384601660321631744164035971667970314416322997130688858619603_<84> (Sinkiti Sibata / GGNFS-0.77.1-20060513-nocona snfs / 46.00 hours on Core 2 Quad Q6600 2.4GHz, Windows Vista and Cygwin / December 13, 2008 2008 年 12 月 13 日)

37×10¹⁶¹+179 = 4(1)₁₆₀3_<162> = 45293 × 154488738576400451457982464398604103495508054393481467_<54> × 58753169523647679059266422943937672486812220399742768615027955753094899381427335186690263375374322360023_<104> (Serge Batalov / Msieve-1.39 snfs / 28.00 hours on Opteron-2.6GHz; Linux x86_64 / December 10, 2008 2008 年 12 月 10 日)

37×10¹⁶²+179 = 4(1)₁₆₁3_<163> = 3 × 19290329 × 66993539 × 288466127633_<12> × 2388806425599695184089_<22> × 130111273985304522814275954174641281081665867559899941167_<57> × 11827002600902938664289039732901650255844924476182741339279_<59> (Sinkiti Sibata / GGNFS-0.77.1-20050930-pentium4 gnfs for P57 x P59 / 57.40 hours on Pentium 4 2.4GHz, Windows XP and Cygwin / December 14, 2008 2008 年 12 月 14 日)

37×10¹⁶³+179 = 4(1)₁₆₂3_<164> = 68483 × 6032309821_<10> × 52051080620258933_<17> × 201971245076419635985427244193183158857_<39> × 766865902905323843944912313206274717756086063_<45> × 12343947829085375388272773864904907879747898874597_<50> (Jo Yeong Uk / GGNFS/Msieve v1.39 snfs / 31.70 hours on Core 2 Quad Q6700 / January 19, 2009 2009 年 1 月 19 日)

37×10¹⁶⁴+179 = 4(1)₁₆₃3_<165> = 7 × 293 × 76091 × 39322735725815644225314040621429171304048596658405725916552678760370150874401_<77> × 66991011921022211860576233057936764080376246489288267299249722416243173674326393_<80> (Serge Batalov / Msieve-1.39 snfs / 47.00 hours on Opteron-2.6GHz; Linux x86_64 / December 12, 2008 2008 年 12 月 12 日)

37×10¹⁶⁵+179 = 4(1)₁₆₄3_<166> = 3² × 5821 × 1709594773_<10> × 179904696626929_<15> × 255142862295769260371163745158227148153985527889367740868491400177609496049386366345988837867890095651254061592107624648528084151975157201_<138>

37×10¹⁶⁶+179 = 4(1)₁₆₅3_<167> = 61 × 4188456316799221800062368322618682657246331640966662822479121968077244812718221_<79> × 160907167268914976547336082636897002177991578144842220208538078678074396886300458033073_<87> (Serge Batalov / Msieve-1.39 snfs / 42.00 hours on Opteron-2.6GHz; Linux x86_64 / December 11, 2008 2008 年 12 月 11 日)

37×10¹⁶⁷+179 = 4(1)₁₆₆3_<168> = 157 × 76919 × 4887648636361_<13> × 173207329770929129788153516150523370482395041926341393891_<57> × 40212371719260342715433361435253229581586380261851521721210578233067994371204047342065429361_<92> (Robert Backstrom / GGNFS-0.77.1-20060513-pentium-m, Msieve 1.40 snfs / 49.39 hours, 1.86 hours / April 5, 2009 2009 年 4 月 5 日)

37×10¹⁶⁸+179 = 4(1)₁₆₇3_<169> = 3 × 2946143 × 423720173 × 1112749001488809062153_<22> × 986524290189826065640110868902497907261376482568863416149622196221125583129954868289384902293428385470871063937671574026533789385513_<132>

37×10¹⁶⁹+179 = 4(1)₁₆₈3_<170> = 43 × 4651579 × 1017191121592337384843_<22> × 87039115464799111997365977317_<29> × 8425498979072827488852800911267_<31> × 275535586632481005658474330785623147493947560810087737672451637475014017044809677_<81> (Serge Batalov / GMP-ECM 6.2.1 B1=1000000, sigma=1331634998 for P31 / December 10, 2008 2008 年 12 月 10 日)

37×10¹⁷⁰+179 = 4(1)₁₆₉3_<171> = 7 × 19 × 349 × 73073906498809_<14> × 30445651912471563466043_<23> × 6128198903992383225192559986628700854438637463216120687360319601_<64> × 649623446059833056859631161403636566829760031296775263008078058147_<66> (Sinkiti Sibata / Msieve 1.40 snfs / 57.28 hours / September 27, 2009 2009 年 9 月 27 日)

37×10¹⁷¹+179 = 4(1)₁₇₀3_<172> = 3 × 83183411459_<11> × 281584746142423_<15> × 1316651105129035672082350371724395741764941_<43> × 44434612768168640727083393444146990656379156177009848534978973830107699985188360300002215220704716111683_<104> (Sinkiti Sibata / Msieve 1.40 snfs / 93.11 hours on Core i7 2.93GHz,Windows 7 64bit,and Cygwin / February 26, 2010 2010 年 2 月 26 日)

37×10¹⁷²+179 = 4(1)₁₇₁3_<173> = 1019 × 500107 × 1606379 × 113767669 × 55172481563_<11> × 22736814924784767224815309943955870851_<38> × 351886879859479926106674281094605843954692625172311480161859483512498327727310770210259206169473031847_<102> (Wataru Sakai / GMP-ECM 6.2.1 B1=3000000, sigma=3910885405 for P38 / September 14, 2009 2009 年 9 月 14 日)

37×10¹⁷³+179 = 4(1)₁₇₂3_<174> = 2309642251320926628434349570227406190719013760451867200648957231633000117723292239_<82> × 177997744402185728430025384772804913156559791188015710518448917566430790426321615278811044967_<93> (Jo Yeong Uk / GGNFS-0.77.1-20050930-nocona snfs / 135.17 hours on Core 2 Quad Q6700 / December 21, 2008 2008 年 12 月 21 日)

37×10¹⁷⁴+179 = 4(1)₁₇₃3_<175> = 3² × 139 × 9448213 × 1443542544229_<13> × 240947620382301584940741130393090900455153681416352696474911519599429875114698659463843610901070276856259141822692376635567096248588191090304072271359819_<153>

37×10¹⁷⁵+179 = 4(1)₁₇₄3_<176> = 23 × 2539 × 23586711719453871087522664522636742344493353264814241528919205959807570277_<74> × 29847040760283621496854245399203499887235219181116358275700688536486472950381821332414081846863577_<98> (Ignacio Santos / GGNFS, Msieve snfs / 77.02 hours / February 23, 2009 2009 年 2 月 23 日)

37×10¹⁷⁶+179 = 4(1)₁₇₅3_<177> = 7 × 59 × 1609 × 9619 × 8776939756200820865213072967170758973_<37> × 7058612028736603934088785319274163215648343_<43> × 1038151569394059137260594482007170732585086805903291720721033646936001721745954812172629_<88> (Dmitry Domanov / Msieve 1.40 snfs / October 6, 2011 2011 年 10 月 6 日)

37×10¹⁷⁷+179 = 4(1)₁₇₆3_<178> = 3 × 353 × 587 × 1973 × 563412481 × 6448880383031735959_<19> × 922544412932336436191669849321909295711321211219840741751952223430819683475969135624230834126292500319110962748662281038553537992413980492483_<141>

37×10¹⁷⁸+179 = 4(1)₁₇₇3_<179> = 13752402607_<11> × 4488398865557_<13> × 10792876087603367_<17> × 7049599458449368393_<19> × 901053580759546473335733195289088783980467426146667758137_<57> × 9714868865503115801159431371805518306707962321967502211308133021_<64> (Ignacio Santos / GGNFS, Msieve gnfs for P57 x P64 / 42.93 hours / April 16, 2009 2009 年 4 月 16 日)

37×10¹⁷⁹+179 = 4(1)₁₇₈3_<180> = 47² × 162366808026637_<15> × 1920990739143013_<16> × 21492079510623863088342734548197989231356017342446287921627_<59> × 27762753431868935865345481896823576222004197073187684265833055278030988399021376562770411_<89> (Dmitry Domanov / Msieve 1.50 snfs / July 5, 2013 2013 年 7 月 5 日)

37×10¹⁸⁰+179 = 4(1)₁₇₉3_<181> = 3 × 13738328797_<11> × 536917231825991_<15> × 1256773885528825637460966552331_<31> × 147822166642050138394347416641861128175321407629618966131403832112713976405737301135389561046718472326592852623995402304750683_<126> (Makoto Kamada / GMP-ECM 6.2.1 B1=25e4, sigma=1974252905 for P31 / December 7, 2008 2008 年 12 月 7 日)

37×10¹⁸¹+179 = 4(1)₁₈₀3_<182> = 71 × 119778124793_<12> × 106040317334550756457_<21> × 19583730274725123056080763357840850011_<38> × 28184636656276296879657319496894612255107506628271474149_<56> × 82593235239664005598005831854617554075661396988713351577_<56> (Dmitry Domanov / GMP-ECM B1=3000000, sigma=2418528028 for P38, Msieve 1.40 gnfs for P56(2818...) x P56(8259...) / April 17, 2011 2011 年 4 月 17 日)

37×10¹⁸²+179 = 4(1)₁₈₁3_<183> = 7² × 107 × 294821 × 27986178620449117_<17> × 9503363480916583514141077395446026604539943273278333883346296405327375094984381647172680450657713831305785718252538119789642856350941435185476076821096501563_<157>

37×10¹⁸³+179 = 4(1)₁₈₂3_<184> = 3⁶ × 3709 × 6871097 × 7729925500789309529_<19> × 424395067561839425941019753018431513307_<39> × 1410353437705663581760579441798909793491280113_<46> × 47827224188349218600553150540822212458452579934419983162624496877151_<68> (Jo Yeong Uk / GMP-ECM v6.4.4 B1=11000000, sigma=1008391241 for P39, GGNFS/Msieve v1.39 gnfs for P46 x P68 / April 21, 2014 2014 年 4 月 21 日)

37×10¹⁸⁴+179 = 4(1)₁₈₃3_<185> = 29 × 1759 × 10163 × 158818291 × 66277557866403245738395259362965979604116231036771_<50> × 7533667276741594946033003521300673051042117609386396475997502163602410489128739122332846466643543854789674634479105081_<118> (Jo Yeong Uk / GGNFS/Msieve v1.39 snfs / September 23, 2014 2014 年 9 月 23 日)

37×10¹⁸⁵+179 = 4(1)₁₈₄3_<186> = 719 × 88668757 × 5696833643387_<13> × 5299043945182689140181312741165840388490659811007143_<52> × 213613475063258526668264409529766789021935983214367995245977057867381184321576046296417652710886690427165784871_<111> (Jo Yeong Uk / GGNFS/Msieve v1.39 snfs / November 8, 2014 2014 年 11 月 8 日)

37×10¹⁸⁶+179 = 4(1)₁₈₅3_<187> = 3 × 5431 × 48847 × 118529 × 20791445904137_<14> × 6636802404266483_<16> × 8319806456856435884237_<22> × 936611623971359060206147696654335999846721752617956297_<54> × 40530251017074094158289636271902336998641296433950350474105003157453_<68> (Ignacio Santos / GGNFS, Msieve gnfs for P54 x P68 / 49.82 hours / April 19, 2009 2009 年 4 月 19 日)

37×10¹⁸⁷+179 = 4(1)₁₈₆3_<188> = 467 × 88854137 × 16292765621288919609478817054628424562953771570853171629703611379365529746626204307635029_<89> × 60809281348649681244719041706611205948284047834909959845329179920172944231048578394381343_<89> (Robert Backstrom / Msieve 1.44 snfs / February 11, 2012 2012 年 2 月 11 日)

37×10¹⁸⁸+179 = 4(1)₁₈₇3_<189> = 7 × 19 × 3002369 × 33278892508173340532233520688461108189_<38> × 20279280412034744030621134055414823326172254253586961_<53> × 1525534736515495924385384461546362762062547868454577969555010783184734720615978092437097961_<91> (matsui / Msieve 1.48 snfs / January 27, 2011 2011 年 1 月 27 日)

37×10¹⁸⁹+179 = 4(1)₁₈₈3_<190> = 3 × 787 × 139397 × 785632671133_<12> × 5616549169121090056842846401961765333264956406983479979691840256549_<67> × 2830875041325105793507456315809032301844204297016278208603142105975889250039568797355361689205735209517_<103> (Eric Jeancolas / cado-nfs-3.0.0 for P67 x P103 / August 25, 2020 2020 年 8 月 25 日)

37×10¹⁹⁰+179 = 4(1)₁₈₉3_<191> = 43 × 193 × 12539 × 395066811825317911945179153931514478404782655760597473163989695551360522597966316281163835094162663734946327488226958289568872973761181764165701659922005974074334141929390073892324833_<183>

37×10¹⁹¹+179 = 4(1)₁₉₀3_<192> = 127 × 733 × 89393 × 1098953 × 8607538273_<10> × 720153328499564494309_<21> × 118373461238670166414903326981318101167638859_<45> × 61264741653585028176754707130066170671903323152951631888967605581483161350124337235973508823758886109_<101> (Dmitry Domanov / GMP-ECM B1=3000000, sigma=2204487915 for P45 / July 9, 2013 2013 年 7 月 9 日)

37×10¹⁹²+179 = 4(1)₁₉₁3_<193> = 3² × 4252293301_<10> × 2352321219203269993022329814821162725564976643555444146225079_<61> × 45666409502520341697748384523388499357964903336432732022085593914826320867461162672448309673656102793896687675437971142283_<122> (Robert Backstrom / Msieve 1.44 snfs / March 11, 2012 2012 年 3 月 11 日)

37×10¹⁹³+179 = 4(1)₁₉₂3_<194> = 48454659696821899901_<20> × 139091529552237679300172663376677578208612319434623924075623268990987547826111601_<81> × 6099903770870622927944399391865771289908621091321900022842520109205222564114807210100689641613_<94> (Bob Backstrom / Msieve 1.54 snfs for P81 x P94 / March 6, 2021 2021 年 3 月 6 日)

37×10¹⁹⁴+179 = 4(1)₁₉₃3_<195> = 7 × 175993 × 2870973547192298512710673_<25> × 29406524873634132932970662526145835546207735256467062403265483445034390305397_<77> × 3952691179549138869610915742302864330175315708821060451525875269150049795673413282840123_<88> (Eric Jeancolas / cado-nfs-3.0.0 for P77 x P88 / November 9, 2020 2020 年 11 月 9 日)

37×10¹⁹⁵+179 = 4(1)₁₉₄3_<196> = 3 × 50146288433_<11> × 173480020811_<12> × 157525076791862106271221436852379988303440791689983973335768165110816899464988741370372781323628568523345083407421314739328952076030937705671426526191308438199346102833084217_<174>

37×10¹⁹⁶+179 = 4(1)₁₉₅3_<197> = definitely prime number 素数

37×10¹⁹⁷+179 = 4(1)₁₉₆3_<198> = 23 × 15787 × 18264107 × 5497022059_<10> × 226298090408940143775922096312349568810241_<42> × 49833909350959969677301751356617269639171054001870542278474185519173663946167096738989305298242342889467770045001685325252212469609861_<134> (Dmitry Domanov / GMP-ECM B1=3000000, sigma=2711542789 for P42 / July 9, 2013 2013 年 7 月 9 日)

37×10¹⁹⁸+179 = 4(1)₁₉₇3_<199> = 3 × 113 × 313 × 10223 × 21059 × 101837 × 9114196286902007491447_<22> × 639053335173717309792569370825245028908634215685209_<51> × 303415660875720843943527951668033912805231675552098551267264910734501063457692251906973871009160298872234637_<108> (Eric Jeancolas / cado-nfs-3.0.0 for P51 x P108 / November 15, 2020 2020 年 11 月 15 日)

37×10¹⁹⁹+179 = 4(1)₁₉₈3_<200> = 839 × 3049 × 7873 × 31254950383080054367453276464222956337361047650703486667_<56> × 65310162477181152708881880046449075416785965652603249362609035330290641732379721581357004836612528566245014218626041056546069827570213_<134> (Robert Backstrom / Msieve 1.44 snfs / March 19, 2012 2012 年 3 月 19 日)

37×10²⁰⁰+179 = 4(1)₁₉₉3_<201> = 7 × 58730158730158730158730158730158730158730158730158730158730158730158730158730158730158730158730158730158730158730158730158730158730158730158730158730158730158730158730158730158730158730158730158730159_<200>

37×10²⁰¹+179 = 4(1)₂₀₀3_<202> = 3² × 1061 × 2273 × 106261 × 3242553299_<10> × 549719146390505044856964819843071943828414389078292699087612258314922907841174329095037428108471911016801814092924048217458600116916620771462250614326235284188671566285419941663971_<180>

37×10²⁰²+179 = 4(1)₂₀₁3_<203> = 191² × 180354191 × 27097070051_<11> × 55284542607383986572401237099780476354357401238902071462472260511815192308160390838989_<86> × 4170999967756456339424540737021067115225100729246908398582563437279825937384305961916518041377_<94> (Bob Backstrom / Msieve 1.54 snfs for P86 x P94 / October 3, 2021 2021 年 10 月 3 日)

37×10²⁰³+179 = 4(1)₂₀₂3_<204> = 72317555052941212202437_<23> × 14037327305061710827375833007_<29> × 6140930812850915255314216030096973_<34> × 65947274112224700593650870901927012395470632038377646836641194000390957486841353488687312767513602066729431644202380359_<119> (Serge Batalov / GMP-ECM 6.2.1 B1=1000000, sigma=1350806540 for P34 / December 10, 2008 2008 年 12 月 10 日)

37×10²⁰⁴+179 = 4(1)₂₀₃3_<205> = 3 × 153309913352856585802120594537109285957749031611920050232775437965114309133133655034055113177052274147_<102> × 8938563334885849358263822539007719875728625710335868949963740586159114978519165202551819473673605180193_<103> (Robert Backstrom / GGNFS-0.77.1-20050930-k8, Msieve 1.39 snfs / 151.50 hours, 24.52 hours / February 5, 2009 2009 年 2 月 5 日)

37×10²⁰⁵+179 = 4(1)₂₀₄3_<206> = 38708903282648616349050646735593058494904684196090851_<53> × 523279404482581894105023739895022302701579043553621531881177081933138648717_<75> × 2029619869509639122374709122919684913926210413942382626800386423565291654417839_<79> (Robert Backstrom / GGNFS-0.77.1-20050930-k8, Msieve 1.39 snfs / 111.52 hours, 16.97 hours / February 26, 2009 2009 年 2 月 26 日)

37×10²⁰⁶+179 = 4(1)₂₀₅3_<207> = 7 × 19 × 489842694540656464941788184395267414165503110731_<48> × 6310313535851401499362418364075616712275202368882809747587961002300450592726937900440105575721620095362793204850576695474588867247104213874232463122754586431_<157> (Robert Backstrom / GGNFS-0.77.1-20060513-nocona, Msieve 1.44 snfs / December 23, 2013 2013 年 12 月 23 日)

37×10²⁰⁷+179 = 4(1)₂₀₆3_<208> = 3 × 2048182176709_<13> × 142951768583316179_<18> × 246486158967982615991619194233_<30> × 83097706934831973738002894538803_<32> × 228506347067814311672890615564312754703546668213216777689329629644951370601622332623029772313523440274984697890448039_<117> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=30866186 for P30, B1=1e6, sigma=1523561007 for P32 / June 28, 2013 2013 年 6 月 28 日)

37×10²⁰⁸+179 = 4(1)₂₀₇3_<209> = 823 × 29721295560332492239_<20> × [1680705583634667079288866873744145531683651758665350656006483413264553264089437763873504164924578373873561335583541718023517292973965785790166873208741718711514084376602836959185133515729_<187>] Free to factor

37×10²⁰⁹+179 = 4(1)₂₀₈3_<210> = 353 × 661 × 24738219418562444719_<20> × 71222073387913462961496679970173051482668499204133077599768319193095910754826274287079806553475078892047497664620474931563045705489903940453657534349562407599098731566730476532080043019_<185>

37×10²¹⁰+179 = 4(1)₂₀₉3_<211> = 3³ × 84885327509621_<14> × 79843756222657090249291_<23> × [22465798632427518668017826214324215033205155288632380704009151725977841510379372554001806203775799031381310639872877732629192874721457303012644941337318091888527708868903229_<173>] Free to factor

37×10²¹¹+179 = 4(1)₂₁₀3_<212> = 43 × 621811419218965992546560237_<27> × [1537559976981566631588862834522354918549463157670089255342923685922910680965478010391788955766143241410123809072992298797070898685657450537186524987978979768422584789672640581451571943_<184>] Free to factor

37×10²¹²+179 = 4(1)₂₁₁3_<213> = 7 × 29 × 24887901923834229031571_<23> × 2809426650118988178041137798837_<31> × 28963910194360538127477065926486496628145887222167054994401711088222642794252107362055467154387762185995023947022309419458860135251832681839199383478769113973_<158> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=300432367 for P31 / June 28, 2013 2013 年 6 月 28 日)

37×10²¹³+179 = 4(1)₂₁₂3_<214> = 3 × 2341 × 49463 × 3856488061_<10> × 488239551679239128733967200277837_<33> × [6285374271281084849362793699168682300612584879257714528479126439685414220562016033833395542660378999145637876551986159040477094906676937593198928024161611724146841_<163>] (Dmitry Domanov / GMP-ECM B1=3000000, sigma=2365413833 for P33 / July 9, 2013 2013 年 7 月 9 日) Free to factor

37×10²¹⁴+179 = 4(1)₂₁₃3_<215> = 1033 × 11529007146493_<14> × 52655703750005453_<17> × 65557376151420844184629078382755606819852985898126549224772727836787889188650624226174340072292373267666136583685712057545447544062243879045897630644763206532784295200135843731887209_<182>

37×10²¹⁵+179 = 4(1)₂₁₄3_<216> = 4658440513_<10> × 6691928589734254737760860448090717748363_<40> × 141667315344126376300594235568277011999529_<42> × 95658740703236385812556938017372485933041528318558329_<53> × 973134880495703005809124337843933348842280265390394531239085656621953947_<72> (Bob Backstrom / GMP-ECM 6.2.3 B1=400000000, sigma=2314068567, Msieve 1.54 snfs for P40 x P42 x P53 x P72 / February 3, 2020 2020 年 2 月 3 日)

37×10²¹⁶+179 = 4(1)₂₁₅3_<217> = 3 × 71 × 397829 × 2033041 × 23863659080115135970207362100049359022940052421236756615173656297826998285868509085476912975673518819761643031583706460269602839984016621670380699193028986767828891920297607598544716303344789773868526609_<203>

37×10²¹⁷+179 = 4(1)₂₁₆3_<218> = 18191 × 497161530720774395902950436496726167644692012040133178101052816413_<66> × 4545745571006565907730664654234048670407457983188828025278001421945122147517646593094693830115454232021833405263835567154059638792771407743013009811_<148> (Bob Backstrom / Msieve 1.53 snfs for P66 x P148 / November 8, 2017 2017 年 11 月 8 日)

37×10²¹⁸+179 = 4(1)₂₁₇3_<219> = 7 × 97 × 99877843765798207118580518889227256237568364619974265360802396789549524331404857_<80> × 6062060724287437129389788530797517093523678783550860710148814520494696251793807980619202251213808710884492106551681500466944585622120071_<136> (Bob Backstrom / Msieve 1.53 snfs for P80 x P136 / April 7, 2018 2018 年 4 月 7 日)

37×10²¹⁹+179 = 4(1)₂₁₈3_<220> = 3² × 23 × 257 × 42641 × 598727823731_<12> × 4317552393371037924396992290511_<31> × 701069877612750444823258396924071578080160080011396137924696074026745763860909942145271606374942199194395179223151817985118785971214929000007435095025759897485816372227_<168> (Dmitry Domanov / GMP-ECM B1=3000000, sigma=2302872419 for P31 / July 9, 2013 2013 年 7 月 9 日)

37×10²²⁰+179 = 4(1)₂₁₉3_<221> = 139 × 38767 × 217432736777_<12> × 35087892830422143140618961753444587463203626594781617377884866932251252230282523938505595471102889103824300451816144060840927363345413044325657234716720343850784160497516611099114807617386023566943387213_<203>

37×10²²¹+179 = 4(1)₂₂₀3_<222> = 10457 × 133283 × 9154039 × 119504091663001_<15> × 239926753420331459_<18> × 1123836508137489422175769572637495750042616406866296710631778272180387913867644416164752234261252636890102538976204777723449092056924126422134353077425224976160253956156212823_<175>

37×10²²²+179 = 4(1)₂₂₁3_<223> = 3 × 5333 × 3870283 × 302929722640561_<15> × 177553569306407588023039527221136048456890447_<45> × 4113461191316709990507784662603854071848767219703566260207623033273119_<70> × 300085461408605639346922499085922246743564269727790616535381429684287048358423804293_<84> (Erik Branger / GGNFS, NFS_factory, Msieve snfs for P45 x P70 x P84 / November 18, 2020 2020 年 11 月 18 日)

37×10²²³+179 = 4(1)₂₂₂3_<224> = 116291837885234958553_<21> × [353516737362793028748589101593919273150620856619483716430974322850185532260702706346858262007634357869996462025842997797062458832284634574663687229482419841782065776715001033151513627185017004940491985521_<204>] Free to factor

37×10²²⁴+179 = 4(1)₂₂₃3_<225> = 7² × 19 × 4397 × 169395624915010677402565617775268285819_<39> × 592858264946324351688771190437712821484717899226665917596931462981594176834169724800302689145263784203775248735169003899514076599422500994922854963408386057110948110850722356488061_<180> (Dmitry Domanov / GMP-ECM B1=3000000, sigma=2381226193 for P39 / July 13, 2013 2013 年 7 月 13 日)

37×10²²⁵+179 = 4(1)₂₂₄3_<226> = 3 × 47 × 2859491 × 208223604015059_<15> × 34631449667001652134353_<23> × 1414004323647603054185844659152775413924920147573042469274739948260703913608301072598801935396958071197451573690028066296676418406784018139643480266633520261419424821388451436262949_<181>

37×10²²⁶+179 = 4(1)₂₂₅3_<227> = 61 × 109 × 6183051753814274494075967981818485653648836082284721177787804348189368493173576644775321268026938052505807055363379622666733510469410604769305325779983623268327735164853528517237345632593038217944218846610183653348038969937_<223>

37×10²²⁷+179 = 4(1)₂₂₆3_<228> = 3347 × 1545455463214583_<16> × 1151071153899796163329_<22> × 6762398985415349526204641_<25> × 310136679558901747202624843_<27> × 1489197640283923612075931599403627627347_<40> × 22107446085935287407610607969265955106889256671380802423694856498506058783764284252471960794365877_<98> (Serge Batalov / GMP-ECM B1=11000000, sigma=3376821301 for P40 / November 8, 2013 2013 年 11 月 8 日)

37×10²²⁸+179 = 4(1)₂₂₇3_<229> = 3² × 327871 × 13408362850501_<14> × 2212120699395414523798487_<25> × 2900570548193670959827489_<25> × 16193685230864580398494401849050061273132698742157683121024179409542670639068790110879866954010577823490760614640189631472180160830024521337801457363176683173669_<161>

37×10²²⁹+179 = 4(1)₂₂₈3_<230> = definitely prime number 素数

37×10²³⁰+179 = 4(1)₂₂₉3_<231> = 7 × 1709 × 2927 × 5297 × 32717 × 4144271 × 16347253437465266459114509482631328997877002277673353385134344278890239749887030255792694335233837306685441125317441795884807244871701114257054990665778139211984787905581764785884528454508760453380570209601447_<209>

37×10²³¹+179 = 4(1)₂₃₀3_<232> = 3 × 131 × 16927 × 118130871338549733218765983889_<30> × [5231464260214739219053740851891913593771427408762470736518282583520855648341951373534946480410839676129909166152954574362715936421249903728782261145939909487302694515355292699748461563632966662447_<196>] (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=3552391670 for P30 / June 28, 2013 2013 年 6 月 28 日) Free to factor

37×10²³²+179 = 4(1)₂₃₁3_<233> = 43 × 70573 × 1749307159072713641937658878045301147_<37> × 22204566484431403181677754323958151587_<38> × 129378091546484664240945563400401257514759_<42> × 2695771434781182952763519958524239960954027134137833737355009490497845022123304098850101327656451017575592336817_<112> (Dmitry Domanov / GMP-ECM B1=3000000, sigma=1605387373 for P38 / July 9, 2013 2013 年 7 月 9 日) (Serge Batalov / GMP-ECM B1=3000000, sigma=2956722652 for P37 / January 9, 2014 2014 年 1 月 9 日) (Ignacio Santos / GMP-ECM B1=11000000, sigma=1:4204130996 for P42 x P112 / March 8, 2016 2016 年 3 月 8 日)

37×10²³³+179 = 4(1)₂₃₂3_<234> = 127 × 5119 × 4496963 × 140621280987355200015739854788689155808731547769998881445401556470614759560351653045221257722202506447047161053704323095085955017839533270524648143971891902121743758878317998520988922002479003742835352797395741129090833027_<222>

37×10²³⁴+179 = 4(1)₂₃₃3_<235> = 3 × 59 × 210099143 × 762064981 × 2562393707_<10> × [56613995133385440684599699355660288197725543489849574577310232330521241255820987089466915392566020807102343036375200127009222042141692416512178814902823629343042711567218504087056168063219254523901505463849_<206>] Free to factor

37×10²³⁵+179 = 4(1)₂₃₄3_<236> = 107 × 15328073 × 25066164004609529628799277944675851442864009728900697683404816569328190598973683569540288758655357524262902350582435852355391613141682475555878768158725479061222125964019914780327957613111790465262879089249985963913543464786883_<227>

37×10²³⁶+179 = 4(1)₂₃₅3_<237> = 7 × 204033523 × 1509509660424417715590233353_<28> × [190688169328680353120950834759602931734659458396503005826809245396397016864286943762246905593948379508096225996506138566200049382388657834477895760169100626233858190029031548357431251543139548699911661_<201>] (Dmitry Domanov / GMP-ECM B1=3000000, sigma=532192135 for P28 / July 9, 2013 2013 年 7 月 9 日) Free to factor

37×10²³⁷+179 = 4(1)₂₃₆3_<238> = 3³ × 461 × 36899 × 4705783 × 7397823877_<10> × 257124845902481829951819675943663011953017504618171173649683315193491496370643257396508499988151715414850104978497564367421901663127561735726262700288794009609801718512486059790562279561602421345387969918445426031_<213>

37×10²³⁸+179 = 4(1)₂₃₇3_<239> = 149 × 433 × 857 × 11197 × 2335733 × 1040683153_<10> × 17770665139051234954603_<23> × 3415311005781470696478091327186027_<34> × 450118526017891222868562011810763367549413751807682586943894185211393654356797159317414934038755249311372112768800476272157414067593309566455984055709556789_<156> (Dmitry Domanov / GMP-ECM B1=3000000, sigma=2535711339 for P34 / July 9, 2013 2013 年 7 月 9 日)

37×10²³⁹+179 = 4(1)₂₃₈3_<240> = 487 × 2377 × 1155291619_<10> × 684214722842263_<15> × 81361025530237496207171817943964876441573_<41> × 5522053624702270806532133221468616753085979794309853215950002593146098572296421364255751468989235884066180370821261765919201997766004638884958348312216440538706031831727_<169> (Serge Batalov / GMP-ECM B1=3000000, sigma=2661189035 for P41 / May 19, 2014 2014 年 5 月 19 日)

37×10²⁴⁰+179 = 4(1)₂₃₉3_<241> = 3 × 29 × 134293 × 727691 × 143152909379576723387_<21> × 241955946867636073692443_<24> × 69614190965767192191370705521971597_<35> × 28672626749286214824800544147758057082546651799_<47> × 6994196692004469161022826229461619641620472731361592374448347991876829268584199479950743179927992758451_<103> (Dmitry Domanov / GMP-ECM B1=3000000, sigma=3820679204 for P35 / July 9, 2013 2013 年 7 月 9 日) (ivelive / GMP-ECM B1=110000000, sigma=3695017926 for P47 x P103 / December 30, 2020 2020 年 12 月 30 日)

37×10²⁴¹+179 = 4(1)₂₄₀3_<242> = 23 × 353 × 112704253 × 44927925748051136472661308678425812926243868165601079475321794108664130125027780507707617876130199946777725566823133301925473883428423913569738635232236484965197652690067952414223711836148331438921741927556223850408230546351356459_<230>

37×10²⁴²+179 = 4(1)₂₄₁3_<243> = 7 × 19 × 367 × 80911 × 7364431541174903023475748929_<28> × 14134964147556681149007629870901669872876528886442966990459150597347433546472372992383027254067911199721868354334290936845141143435917576076806465923691853510026363199028861087317054971456740978111320370357_<206>

37×10²⁴³+179 = 4(1)₂₄₂3_<244> = 3 × 941 × 51713 × 432084899251_<12> × 611975445467816560441296346674963919_<36> × 106498997024832790583614050686641539363129533869348071840918397269469266182921713527311977850175649230354827816276295006063641283522498402749859047104627646441352738262009187900713765416923_<189> (Dmitry Domanov / GMP-ECM B1=3000000, sigma=1488409851 for P36 / July 9, 2013 2013 年 7 月 9 日)

37×10²⁴⁴+179 = 4(1)₂₄₃3_<245> = 7587819920493257629148919796603_<31> × [5418039903672176446906443130663885913411723509899335174157867505050095741166909789938167135860160212299736062188082678889373392458493797066891267540209385952913358239638655592034655376047438272824439788708861164171_<214>] (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=380467019 for P31 / June 28, 2013 2013 年 6 月 28 日) Free to factor

37×10²⁴⁵+179 = 4(1)₂₄₄3_<246> = 157 × 181123004816777_<15> × 268408368732064536889_<21> × 4723941633145004424691451_<25> × [11402113822974808812426346957113988949026532610205286019753779145626085206034039446942991377587083595202653606683682052596986875433124216619261402940275571833539483235446077082655212103_<185>] Free to factor

37×10²⁴⁶+179 = 4(1)₂₄₅3_<247> = 3² × 913138005011_<12> × 589614138838840388134021684573781_<33> × 848422929620588076980462352264364749444706790195450614844001878314211527113635522131643057695587880530198871104465017606098088854529381727572301860051054362533082402668098812723071097275289747016780527_<201> (Dmitry Domanov / GMP-ECM B1=3000000, sigma=619923533 for P33 / July 9, 2013 2013 年 7 月 9 日)

37×10²⁴⁷+179 = 4(1)₂₄₆3_<248> = 10450568168204087291198123_<26> × 48296850335408818912457500039_<29> × 81451765615269271201472566376957254543458178469096558817661062564109147737643966709105450089024915090537485926524442848885502063475214037502591719546352851845854347348354818311139653648242022029_<194>

37×10²⁴⁸+179 = 4(1)₂₄₇3_<249> = 7 × 10691 × 95929 × 3179303 × [18011961415927794655788573237743544503657423946484698927461714719098731438211048972855666074632734460517967676602084700210998729638388398423412362289647146053698121961097062220111719441250350062656543799517925619826981002410188235627_<233>] Free to factor

37×10²⁴⁹+179 = 4(1)₂₄₈3_<250> = 3 × 326617 × 380879 × 477073 × 13398363256451363473_<20> × [1723358218898660119318311834197788405511049710019697195902995060333009045713012490045632347093784535876092561652337515970010556783270858476014313637502860849178377204049922532618757206531206388601928840019094037493_<214>] Free to factor

37×10²⁵⁰+179 = 4(1)₂₄₉3_<251> = 1997 × 3697 × 36227767787978666323625761206583_<32> × 108510794249972473127567508974628652112026348603_<48> × 1416501965603876644710384140565635779922289964156798560633632072947853667696912916278014651332584343691164364746454540608850993084757767303073560346349424540971133393_<166> (Dmitry Domanov / GMP-ECM B1=3000000, sigma=2516291205 for P32 / July 9, 2013 2013 年 7 月 9 日) (Dmitry Domanov / GMP-ECM B1=43000000, sigma=3671690416 for P48 / August 5, 2013 2013 年 8 月 5 日)

37×10²⁵¹+179 = 4(1)₂₅₀3_<252> = 71 × 2311 × 15104176632859170829313467103_<29> × 165883757687241931808098873020443319934171204591102146819923088016543350604184784264819381313151139515861567730421002431148390806172581278435417739431451808709558224513264850859734472197332961882469210735188492416040391_<219>

37×10²⁵²+179 = 4(1)₂₅₁3_<253> = 3 × 733 × 13640943665955667062556417_<26> × 58964867977597189749333903752920430369_<38> × [2324321713694792520891845147568584274198160627834072922365906539204462385704825528021282778916369746406163767544482969637116188110791105824261216658385428875948897571469643991241154185919_<187>] (ivelive / GMP-ECM B1=3000000, sigma=1557718139 for P38 / January 9, 2021 2021 年 1 月 9 日) Free to factor

37×10²⁵³+179 = 4(1)₂₅₂3_<254> = 43 × 2917 × 622397 × 4081634708159_<13> × 25531871526299_<14> × 26024407788811_<14> × 1119294817388858937440989_<25> × 220155703323150460666849429_<27> × 787979221265587514069292574339200547665681661005510743829733059183803636833832614842908295377054791550123284327212879207222480314251370659466886018551789_<153>

37×10²⁵⁴+179 = 4(1)₂₅₃3_<255> = 7 × 7249553 × 19072573483053401747_<20> × 730588433094224495526358559401_<30> × 581390400184080373972252540000127167855314361172983951689149848643137040893294717343072769957589110467549120109017527735874332512439289932436903386346378123112226998138036807478273044992652987141149_<198> (Jason Parker-Burlingham / GMP-ECM for P30 x P198 / January 2, 2021 2021 年 1 月 2 日)

37×10²⁵⁵+179 = 4(1)₂₅₄3_<256> = 3² × 271631851 × 283678621609_<12> × [5928016503934416681327045649596811739490879645384568456965514608620932369463245835894759613409825272831259650378003081885575647879898541183078185655364610196320187229334501344954121117306352634293307179049367174931665104721315600536523_<235>] Free to factor

37×10²⁵⁶+179 = 4(1)₂₅₅3_<257> = 1541597209_<10> × 26667868150707783949491511508769935189413742063353146036417811853414630248666408367317633818517837697454673525625921855902316381990226547634539153548189325445977186581109794362057067729882683714116085371760108778914577751490409652857065539167767857_<248>

37×10²⁵⁷+179 = 4(1)₂₅₆3_<258> = 378817 × 3118305767493911_<16> × 211158295998664493847670762633967_<33> × [1648173425896965798510416675667912757349056378414242024019721668825448373625167519161759464872427432482714444777069082392605782433406648551815502589981588642550332749267928909273556188920961308178995489297_<205>] (Jason Parker-Burlingham / GMP-ECM for P33 / January 2, 2021 2021 年 1 月 2 日) Free to factor

37×10²⁵⁸+179 = 4(1)₂₅₇3_<259> = 3 × 9940724266310934202134116119_<28> × 34369260801242195415463850408377961_<35> × 41788130020070246133710944871978652671_<38> × 95983548870066194026670690266458834977521965243989323156004963350524040792819718121798071957951539077394064145398249722680776334556379881244689823153813800339_<158> (Jason Parker-Burlingham / GMP-ECM for P35 x P38 x P158 / January 2, 2021 2021 年 1 月 2 日)

37×10²⁵⁹+179 = 4(1)₂₅₈3_<260> = 3559 × 11551309668758390309387780587555805313602447628859542318379070275670444257125909275389466454372326808404358277918266679154569011270331866004807842402672411101745184352658362211607505229309106802784802222846617339452405482189129281009022509443976148106521807_<257>

37×10²⁶⁰+179 = 4(1)₂₅₉3_<261> = 7 × 19 × 953 × 41411 × 778027 × 5306167158703_<13> × 70984335786817_<14> × [267276537254806849351095537981644346728895170426673737680870307306785379667613807224726321817481214608267287225834195661639669720121678599783102967104779532943868642004800421724260767360701949954319099476116925463481971_<219>] Free to factor

37×10²⁶¹+179 = 4(1)₂₆₀3_<262> = 3 × 14088262213_<11> × 447962540167509890269_<21> × [217139500806830386268889387099978208156962996612673277453036719134609665932351431978385119274784281095549095362068856301778357671127917125963879307989806401133172318724415978867764756504257324857633962560702208850449092231659965843_<231>] Free to factor

37×10²⁶²+179 = 4(1)₂₆₁3_<263> = 179 × 10781 × 558198348457_<12> × 219266384252057_<15> × [174055012729505331686793163837724983258613506413267073730594260720485870370928689705360987352286208252664256199713921568470829426170308422448856099226340161750770784526211727998450499547650885005121831060623504501420325140453719663_<231>] Free to factor

37×10²⁶³+179 = 4(1)₂₆₂3_<264> = 23 × 120569848325978191879_<21> × 3875979188886897418985805457_<28> × 26592190539733628846490383407_<29> × [1438325279535056438270449239655863601349125659184591050345906017860524662247264724884548133031252275409533049714048185878374042620039555030487307349393253765389667491714597669278959827511_<187>] Free to factor

37×10²⁶⁴+179 = 4(1)₂₆₃3_<265> = 3⁴ × 179749 × 187781854402334939127457_<24> × 33509844067372243280153764697731637_<35> × 44872646317173760447397712631138538954410948185312318746546725560746674919336091972535309083982387079437280124600935694025277988248493693711824865198347470344540906641126441554830136231227775738818353_<200> (Jason Parker-Burlingham / GMP-ECM for P35 x P200 / January 2, 2021 2021 年 1 月 2 日)

37×10²⁶⁵+179 = 4(1)₂₆₄3_<266> = 167 × 2693 × 43579 × 6923027 × 103933870446911_<15> × 185616440971544400313_<21> × 26759434325661689629428862231_<29> × [586925034429397282662882702738099781240079852579113296987260190856960024990818226679863132657903472728159325647841538372855730593022007823073204665179908980185181319009435750195262523907_<186>] Free to factor

37×10²⁶⁶+179 = 4(1)₂₆₅3_<267> = 7² × 139 × 751 × 80372670259672584767046006120183339184246504804363254145182454541815065570305243888804280361683098424654390458121831022369256419642133517295514386067167353646635125389728707264900870412124334609325501907232604090373724010546719014907370823360877047431323128133_<260>

37×10²⁶⁷+179 = 4(1)₂₆₆3_<268> = 3 × 599935431755561316945186221644691_<33> × [2284196428206154586848259842085220883366916311143161002783910686608062604335879574523101849342998290881506202237780156082987759884020667412059578408173672632103427615166389369278068939323355159240037931538352247048861491138642709614481_<235>] (Jason Parker-Burlingham / GMP-ECM for P33 / January 2, 2021 2021 年 1 月 2 日) Free to factor

37×10²⁶⁸+179 = 4(1)₂₆₇3_<269> = 29 × 6421 × 3532056142870894404913379_<25> × [62507330032176638915285664622043075643545165493024596513517162891309958742743905059216256777822917422934017334970870231706431686207423816984269230202444653064539867444714882824348484405098255297847779594514708518932023117637268621234927683_<239>] Free to factor

37×10²⁶⁹+179 = 4(1)₂₆₈3_<270> = 2089698047898524801_<19> × 2301557973368888781421558688603437014563_<40> × [85477883255306677444009884797818703757705706941640074506394284747604667328669333934070406970083414841575999235285285899947970194553406886840443798853068264204306977068155387640684730811117271335602049885170822051_<212>] (Ignacio Santos / GMP-ECM B1=1000000, sigma=1:3481959024 for P40 / March 21, 2021 2021 年 3 月 21 日) Free to factor

37×10²⁷⁰+179 = 4(1)₂₆₉3_<271> = 3 × 121242547 × 175886179650324827_<18> × 26579163053091627793930677853637911_<35> × 4477521635772449670483847400488702699_<37> × [539973191201259105045307669477239505502309452253116622714972203164830610482026303122262225128650490329762089651116715970395644402781445333033866879132117017291109163451900031_<174>] (Jason Parker-Burlingham / GMP-ECM for P35 x P37 / January 2, 2021 2021 年 1 月 2 日) Free to factor

37×10²⁷¹+179 = 4(1)₂₇₀3_<272> = 47 × 523 × 36691 × 884029 × 436547330095420835792138219_<27> × 38866170227813154723318984653_<29> × 3038998757039015811164799903639200425334707104848235283445664698839873742169163036607348144008442640277888475761524849373097207229851018436514845040415755350222555885559383284343554865216326929399487501_<202>

37×10²⁷²+179 = 4(1)₂₇₁3_<273> = 7 × 19150991500992334159247_<23> × 1338546093202772269896761118424155824953460971_<46> × 2291060618664648577145178710506515528713076699789443096388583600116993397380790752714293634045135816805616948234687458941358031587457122558865274408766000091570584125324116202236926381127061002890388055907_<205> (Ignacio Santos / GMP-ECM B1=1000000, sigma=1:378717670 for P46 x P205 / March 21, 2021 2021 年 3 月 21 日)

37×10²⁷³+179 = 4(1)₂₇₂3_<274> = 3² × 353 × 795715784808491441757992249_<27> × 1626237706138890043878814529946331136993564790008618338296975568390088954123647147759877802185421994181022924497990345426174335490581390439649052532194064187438634929786024911029622825295187314230684817328714875574256995543202499835330784037481_<244>

37×10²⁷⁴+179 = 4(1)₂₇₃3_<275> = 43 × 2269 × 570107 × 2063047444751_<13> × 16031782225637_<14> × [22346466931143090755267709401489432719368489037905405978282146230237342855926563948544588539984896843866803304049686275340447640562016500909101218551224585846398893013614125010578575887503708573117061108903295894177169674275150683647459071_<239>] Free to factor

37×10²⁷⁵+179 = 4(1)₂₇₄3_<276> = 127 × 401 × 227709961401294487602859841527_<30> × 35451049069104290137615312953017071021443339761204728370690755852902548204338456099022947209140226157557834558490553545465927912937205725806061563245343288716778501046899735175251988342415333284812616592883833792376625985624484474935827941297_<242> (Jason Parker-Burlingham / GMP-ECM for P30 x P242 / January 2, 2021 2021 年 1 月 2 日)

37×10²⁷⁶+179 = 4(1)₂₇₅3_<277> = 3 × 1213 × 22943 × 59243 × 97365369883850992513_<20> × 1423453237139555301714465163_<28> × 5997112403608561042994519680471257589187499848742576549155829597776158403371598547837523211073324278928963885746787168332322188814553788747452528599754660022606330254962677986248050229282180496920388056547674469347657_<217>

37×10²⁷⁷+179 = 4(1)₂₇₆3_<278> = 1723 × 243474154262821939_<18> × 5609359853052534253_<19> × 2947928992591857551694649_<25> × 5926397138999701903948732339295042634546260711663254524962808717626320726629968124774228340633701540334456068550220708162733304977205105873213727656818812585201898138529139281473862110666241668770552092503838042357_<214>

37×10²⁷⁸+179 = 4(1)₂₇₇3_<279> = 7 × 19 × 49095732677_<11> × 2078492627999_<13> × 78688145894183633784503815781_<29> × [384951509821080901088165137182696010329983595248896461295082310500371390247042168027646930039977053146110402543599035356588976205494237505480764212968569599498210369751543014653269464839288510160686974945336325425093565994947_<225>] Free to factor

37×10²⁷⁹+179 = 4(1)₂₇₈3_<280> = 3 × 109819 × 34034423 × 660269089 × 11906403295121_<14> × 119653252481281_<15> × 2759284194760723631937945144679751527178519_<43> × 141260125066041991408533488820011532519215923189888172834401768777121589299479359617432083039664583460259734684821533018808373688589807039348627114222787969936246728634063933182426804897913_<189> (ivelive / GMP-ECM B1=3000000, sigma=1327030275 for P43 x P189 / January 9, 2021 2021 年 1 月 9 日)

37×10²⁸⁰+179 = 4(1)₂₇₉3_<281> = 2782217 × [14776385562704530635500793471936628635045760668959722088935230828907706016860335161172227439883772944781485811894295488493928083650955734621386869216567618956792770337867646956046602803128264657685260032237280956557705998889055422747798288599024127561261796298100080299671489_<275>] Free to factor

37×10²⁸¹+179 = 4(1)₂₈₀3_<282> = 701 × 12577 × 46629862598304414689803093810726337868415140323182503749639579518112632870375673992129862201320449325860103884024322993312534146134687484707453000910807243200556311904529565620271125429251515215330467159514067933383267614843333806815478689629781953847450757384282986402744669_<275>

37×10²⁸²+179 = 4(1)₂₈₁3_<283> = 3² × 9973 × 252881 × 634307 × 472349989 × 85975220167_<11> × 120833581261967079392525170061_<30> × 58190264099841692254746682939162627002455306349810214505943610595563712286814050953222369667588068556831750479776885561718219941252410527484939173031254762212085075678487829227644663841090719349045539983035750520796089_<218> (Jason Parker-Burlingham / GMP-ECM for P30 x P218 / January 2, 2021 2021 年 1 月 2 日)

37×10²⁸³+179 = 4(1)₂₈₂3_<284> = 10313826613409681927_<20> × [3986019219836395273331079806741670946770878759820984308154985277597609244192584394511119902734559116097753267798973307404841155817860792000764521755344707224927252023211037479114093048695933823923015769342355077951856544367676710020236629707728863063878549583833519_<265>] Free to factor

37×10²⁸⁴+179 = 4(1)₂₈₃3_<285> = 7 × 811 × 1069 × 156526460407_<12> × 5555733813890143239202425647_<28> × [77899275947879924512987169925387925297720868913341468590973536142487731740696361669923868147561636055352832784135089322838984031443595991660791014605962422146485552161361002011299861631553293254073614977523043594271384000902810412092256969_<239>] Free to factor

37×10²⁸⁵+179 = 4(1)₂₈₄3_<286> = 3 × 23 × 30868592568817524820761920032933_<32> × [1930159929321585991743689237959633121291917740540479677706325616220421722498121621514886054329379523833303678600396367898328487417124172862870323664003167346875270079257594389795024228305814061153043274599112309935760395486685869341739259337849557052369_<253>] (Jason Parker-Burlingham / GMP-ECM for P32 / January 2, 2021 2021 年 1 月 2 日) Free to factor

37×10²⁸⁶+179 = 4(1)₂₈₅3_<287> = 61 × 71 × 349 × 1443965021327370163_<19> × 12007382456117448167_<20> × 339787694278290035079329724311_<30> × 337460676161352613677125804798081373839_<39> × [13680745637349836914404061662882443863709166629678483244923493739500525807819076798752044367789688185762000807205136669962251507505578315419122106553675788863501253989756132003_<176>] (Jason Parker-Burlingham / GMP-ECM for P30 / January 2, 2021 2021 年 1 月 2 日) (Ignacio Santos / GMP-ECM B1=3000000 for P39 / October 26, 2023 2023 年 10 月 26 日) Free to factor

37×10²⁸⁷+179 = 4(1)₂₈₆3_<288> = 181 × 373 × [6089362213367960409270971681174160696623037209294670820599160326323983693675456743310341876543941331463734556472251434703110676626888319451233260425564130035861406116023745221084992684536476102544859673116453292123163110972866131131946604522256618889859895295885401494691557346157201_<283>] Free to factor

37×10²⁸⁸+179 = 4(1)₂₈₇3_<289> = 3 × 107 × 7159 × 19087 × 67957 × 157231 × 1997214259_<10> × 513300601741703984459211469963_<30> × 6225991611107124407924710775687_<31> × 1223007794825328055164238117481939_<34> × 1123718636844243899334660660081431551941233860779672558455341502099004416527297156562159480430514026222065228264995330249054925992612252140223733001565169712304777783_<166> (Jason Parker-Burlingham / GMP-ECM for P30 x P31 x P34 x P166 / January 2, 2021 2021 年 1 月 2 日)

37×10²⁸⁹+179 = 4(1)₂₈₈3_<290> = 4447787628313_<13> × [9243047228562064188684142142241008684371850901893538379800186268748183317936269445596168822887761823134250073612123199617505782052333142855878018418108988756385604486051782530606225963231030954389758112431872797574123502074368928246372116706197339731003753710541805616918615601_<277>] Free to factor

37×10²⁹⁰+179 = 4(1)₂₈₉3_<291> = 7 × 653 × 31474898501_<11> × 105000355877_<12> × [27214031555413503143933967276289735258671386576606176943760230736396427883928608257906488402033356796651128330241324508580433589049111736162471519710866370819771831225853992934810647956874224094756470164981111448665145931048298285765949889809088810117537805234051139_<266>] Free to factor

37×10²⁹¹+179 = 4(1)₂₉₀3_<292> = 3³ × 11971 × 18304349147395302869_<20> × 1071295730373700523401108363_<28> × [648636456476859642121490719925898583950766573050311913709501302888636768071893921375492291444028164252215304918681378253988277854947780446172352915975731234009580575249765984861411046185815209080854750243566817422315242189648951906375721887_<240>] Free to factor

37×10²⁹²+179 = 4(1)₂₉₁3_<293> = 59 × 6569 × 7741 × 778712773 × 432813350087507_<15> × 12172384328618933311729035728369_<32> × [3340083091982779711173955548903540238657139288830200869633038119232311701947178172453548547592281204198612968856218096369057227817150907609521638636456062017966098054079804544606160867899371417285417073735253399625047468695963937_<229>] (Jason Parker-Burlingham / GMP-ECM for P32 / January 2, 2021 2021 年 1 月 2 日) Free to factor

37×10²⁹³+179 = 4(1)₂₉₂3_<294> = 362851 × 58230091943456232508908541_<26> × 318725567394930894078007063936717_<33> × [61047307142697364300988498124001280970446774506401218796172971009246029503010195808938903982589553087859232416111581885867337066690711619052179097565931722703078144362323992889455747293729871961696838166027253084624972838890985179_<230>] (Jason Parker-Burlingham / GMP-ECM for P33 / January 2, 2021 2021 年 1 月 2 日) Free to factor

37×10²⁹⁴+179 = 4(1)₂₉₃3_<295> = 3 × 463 × 3769 × 251399227 × 20387396556523_<14> × 11165594855659610840069_<23> × 167951220582862317028507_<24> × [81703393140451036675556816160302389621599556492246173718924927347414710105991345360522399507358036314345513982668736170744443098255064550528580416626611226579094399862346029538181290034689827983510526463489476033074481451_<221>] Free to factor

37×10²⁹⁵+179 = 4(1)₂₉₄3_<296> = 43 × 36187 × 6553642064551_<13> × 4031395999253231809922400633852915053499677201748219211814752726202998541574515901210844261188279967791392118506121918518267229433353409172366280298450476568096532233311482624853072534809416298154886415582199527172710272733349642343075911789959427020881112280964885339372046743_<277>

37×10²⁹⁶+179 = 4(1)₂₉₅3_<297> = 7 × 19 × 29 × 6553 × 8647 × 431698453512040897577814282416503826663_<39> × [4357360136823655473555007134846087118045545668570408314689807669327955705304296729197790391173988865085958949072042553823762821540807777504990394883673783019583364261028008799331840459773779869123635275877987813934093370475105376743025920079680273_<247>] (Ignacio Santos / GMP-ECM B1=3000000 for P39 / October 27, 2023 2023 年 10 月 27 日) Free to factor

37×10²⁹⁷+179 = 4(1)₂₉₆3_<298> = 3 × 191 × 82757 × 1220541649_<10> × [71030889011046686703569485753332241377380938396275850062604308749605355803732880460848449606917782318687585327729142089976616409841919017767378978780566245979860670511931936740374682285823216323873843005786275527715455248001290222607943482233425586827688981932879011818248935739017_<281>] Free to factor

37×10²⁹⁸+179 = 4(1)₂₉₇3_<299> = 206783693 × 530751313 × 550747904039796751085629159_<27> × [680141065025413384849576876950207761267006959709995396805232978873125729709961961682047991141241940420289523136362456535040788748950226888666813836789203560709966030551082028946930368883540631301136076416096886358536030438902751764760183142637892549440923_<255>] Free to factor

37×10²⁹⁹+179 = 4(1)₂₉₈3_<300> = 563 × 27733 × 105573557518233716566815373_<27> × 249401356837423674004846170992748045961754361166415187684868609791760975879488643728381012352296896515531573876023545069204397218262464850156473241712313414551091879345206506441376964376205029362005063283361314443968352886961687748206574084694070945294793002514143139_<267>

37×10³⁰⁰+179 = 4(1)₂₉₉3_<301> = 3² × 22769 × [20061931725450837694092411764099878055987971516394664827475520376687167792032593590267035155553169812323339780262204025507932867354302931915768081900396304483733297764070598479956232455976259685981969203308158320089747322680989801489896648518751670698030514740368781682263463047277297646952294353_<296>] Free to factor

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4. Related links 関連リンク

A102981 - OEIS (The OEIS Foundation Inc.)