Factorization of 7477...77

Table of contents 目次

About 7477...77 7477...77 について
Prime numbers of the form 7477...77 7477...77 の形の素数
Factor table of 7477...77 7477...77 の素因数分解表
Related links 関連リンク

1. About 7477...77 7477...77 について

1.1. Classification 分類

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

1.2. Sequence 数列

747w = { 74, 747, 7477, 74777, 747777, 7477777, 74777777, 747777777, 7477777777, 74777777777, … }

2. Prime numbers of the form 7477...77 7477...77 の形の素数

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

673×10²-79 = 7477 is prime. は素数です。
673×10⁵-79 = 7477777 is prime. は素数です。
673×10²³-79 = 74(7)₂₃_<25> is prime. は素数です。
673×10¹⁸²-79 = 74(7)₁₈₂_<184> is prime. は素数です。 (discovered by:発見: Makoto Kamada / September 29, 2004 2004 年 9 月 29 日) (certified by:証明: Robert Backstrom / APLOG.UB / August 8, 2009 2009 年 8 月 8 日)
673×10²⁰⁹-79 = 74(7)₂₀₉_<211> is prime. は素数です。 (discovered by:発見: Makoto Kamada / September 29, 2004 2004 年 9 月 29 日) (certified by:証明: Robert Backstrom / APLOG.UB / August 8, 2009 2009 年 8 月 8 日)
673×10²⁸⁷-79 = 74(7)₂₈₇_<289> is prime. は素数です。 (discovered by:発見: Makoto Kamada / September 29, 2004 2004 年 9 月 29 日) (certified by:証明: Erik Branger / Primo 3.0.9 / April 10, 2010 2010 年 4 月 10 日)
673×10⁷⁴⁵⁴-79 = 74(7)₇₄₅₄_<7456> is PRP. はおそらく素数です。 (Makoto Kamada / PFGW / June 4, 2005 2005 年 6 月 4 日)
673×10¹⁶⁹⁵⁸-79 = 74(7)₁₆₉₅₈_<16960> is PRP. はおそらく素数です。 (Ray Chandler / srsieve, PFGW / November 15, 2010 2010 年 11 月 15 日)

2.3. Range of search 捜索範囲

n≤11000 / Completed 終了 / Ray Chandler / October 15, 2010 2010 年 10 月 15 日
n≤20000 / Completed 終了 / Ray Chandler / December 12, 2010 2010 年 12 月 12 日
n≤30000 / Completed 終了 / Ray Chandler / July 11, 2011 2011 年 7 月 11 日
n≤50000 / Completed 終了 / Tyler Busby / April 2, 2024 2024 年 4 月 2 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。

673×10^3k-79 = 37×(673×10⁰-79×37+673×10³-19×37×k-1Σm=010^3m)
673×10^3k+1-79 = 3×(673×10¹-79×3+673×10×10³-19×3×k-1Σm=010^3m)
673×10^13k+4-79 = 53×(673×10⁴-79×53+673×10⁴×10¹³-19×53×k-1Σm=010^13m)
673×10^16k+8-79 = 17×(673×10⁸-79×17+673×10⁸×10¹⁶-19×17×k-1Σm=010^16m)
673×10^18k+15-79 = 19×(673×10¹⁵-79×19+673×10¹⁵×10¹⁸-19×19×k-1Σm=010^18m)
673×10^21k+3-79 = 43×(673×10³-79×43+673×10³×10²¹-19×43×k-1Σm=010^21m)
673×10^22k+15-79 = 23×(673×10¹⁵-79×23+673×10¹⁵×10²²-19×23×k-1Σm=010^22m)
673×10^28k+10-79 = 29×(673×10¹⁰-79×29+673×10¹⁰×10²⁸-19×29×k-1Σm=010^28m)
673×10^33k+32-79 = 67×(673×10³²-79×67+673×10³²×10³³-19×67×k-1Σm=010^33m)
673×10^35k+19-79 = 71×(673×10¹⁹-79×71+673×10¹⁹×10³⁵-19×71×k-1Σm=010^35m)

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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 10.93%. 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 10.93% です。

3. Factor table of 7477...77 7477...77 の素因数分解表

3.2. Range of factorization 分解範囲

n≤100 / Completed 終了 / December 20, 2014 2014 年 12 月 20 日
n≤150 / Completed 終了 / January 15, 2015 2015 年 1 月 15 日
n≤200 / Completed 終了 / April 12, 2021 2021 年 4 月 12 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=205, 207, 214, 228, 233, 236, 237, 238, 239, 240, 241, 243, 244, 245, 246, 247, 249, 250, 251, 252, 253, 254, 255, 256, 259, 261, 262, 264, 265, 266, 269, 271, 273, 276, 277, 278, 279, 282, 283, 284, 285, 286, 289, 290, 291, 292, 293, 296, 297, 300 (50/300)

3.4. Factor table 素因数分解表

673×10⁰-79 = 74 = 2 × 37

673×10¹-79 = 747 = 3² × 83

673×10²-79 = 7477 = definitely prime number 素数

673×10³-79 = 74777 = 37 × 43 × 47

673×10⁴-79 = 747777 = 3 × 53 × 4703

673×10⁵-79 = 7477777 = definitely prime number 素数

673×10⁶-79 = 74777777 = 37 × 1327 × 1523

673×10⁷-79 = 747777777 = 3 × 249259259

673×10⁸-79 = 7477777777_<10> = 17 × 173 × 2542597

673×10⁹-79 = 74777777777_<11> = 37 × 2021021021_<10>

673×10¹⁰-79 = 747777777777_<12> = 3⁴ × 29 × 139 × 2290207

673×10¹¹-79 = 7477777777777_<13> = 40559 × 184367903

673×10¹²-79 = 74777777777777_<14> = 37 × 433 × 4667485037_<10>

673×10¹³-79 = 747777777777777_<15> = 3 × 97 × 3331 × 771444937

673×10¹⁴-79 = 7477777777777777_<16> = 1484473 × 5037328249_<10>

673×10¹⁵-79 = 74777777777777777_<17> = 19 × 23 × 37 × 167 × 27693185999_<11>

673×10¹⁶-79 = 747777777777777777_<18> = 3 × 118431013 × 2104678943_<10>

673×10¹⁷-79 = 7477777777777777777_<19> = 53 × 141090146750524109_<18>

673×10¹⁸-79 = 74777777777777777777_<20> = 37 × 107 × 317 × 59583744244259_<14>

673×10¹⁹-79 = 747777777777777777777_<21> = 3² × 71 × 557 × 2100953795561899_<16>

673×10²⁰-79 = 7477777777777777777777_<22> = 359 × 20829464562055091303_<20>

673×10²¹-79 = 74777777777777777777777_<23> = 37 × 6175313 × 327274264643917_<15>

673×10²²-79 = 747777777777777777777777_<24> = 3 × 227 × 1639271 × 15473813 × 43288979

673×10²³-79 = 7477777777777777777777777_<25> = definitely prime number 素数

673×10²⁴-79 = 74777777777777777777777777_<26> = 17 × 37 × 43 × 386760403 × 7148442853597_<13>

673×10²⁵-79 = 747777777777777777777777777_<27> = 3 × 63487 × 1183771 × 3316643542975967_<16>

673×10²⁶-79 = 7477777777777777777777777777_<28> = 8439035291_<10> × 886093910017490147_<18>

673×10²⁷-79 = 74777777777777777777777777777_<29> = 37 × 6763 × 298834987582584802753367_<24>

673×10²⁸-79 = 747777777777777777777777777777_<30> = 3² × 36313 × 2288062670478517879356881_<25>

673×10²⁹-79 = 7477777777777777777777777777777_<31> = 1031 × 7252936738872723353809677767_<28>

673×10³⁰-79 = 74777777777777777777777777777777_<32> = 37 × 53 × 38132472094736245679641906057_<29>

673×10³¹-79 = 747777777777777777777777777777777_<33> = 3 × 614617 × 405552171936765919685363827_<27>

673×10³²-79 = 7477777777777777777777777777777777_<34> = 67 × 91571 × 2573449 × 473613670237801956689_<21>

673×10³³-79 = 74777777777777777777777777777777777_<35> = 19 × 37 × 719 × 243359758000729_<15> × 607910401784809_<15>

673×10³⁴-79 = 747777777777777777777777777777777777_<36> = 3 × 20719 × 12030467650912653084572578756661_<32>

673×10³⁵-79 = 7477777777777777777777777777777777777_<37> = 839 × 8912726791153489604025956826910343_<34>

673×10³⁶-79 = 74777777777777777777777777777777777777_<38> = 37 × 61 × 269 × 1451 × 4091 × 2553384943_<10> × 8125975913720563_<16>

673×10³⁷-79 = 747777777777777777777777777777777777777_<39> = 3³ × 23 × 1204151010914295938450527822508498837_<37>

673×10³⁸-79 = 7477777777777777777777777777777777777777_<40> = 29 × 1117 × 12583 × 545532739041203_<15> × 33629186997744661_<17>

673×10³⁹-79 = 74777777777777777777777777777777777777777_<41> = 37 × 4994671079_<10> × 404635458282401346697573199899_<30>

673×10⁴⁰-79 = 747777777777777777777777777777777777777777_<42> = 3 × 17 × 19469 × 21191 × 35539170100885996019812316580113_<32>

673×10⁴¹-79 = 7477777777777777777777777777777777777777777_<43> = 541 × 2645161116626657_<16> × 5225443540262207987394821_<25>

673×10⁴²-79 = 74777777777777777777777777777777777777777777_<44> = 37² × 83 × 444905982163613291_<18> × 1479185936261437422761_<22>

673×10⁴³-79 = 747777777777777777777777777777777777777777777_<45> = 3 × 53 × 8231 × 19183 × 106661 × 1919162263_<10> × 11081652943_<11> × 13130595139_<11>

673×10⁴⁴-79 = 7477777777777777777777777777777777777777777777_<46> = 1303 × 2944235363_<10> × 30227871733_<11> × 64483417129556971949321_<23>

673×10⁴⁵-79 = 74777777777777777777777777777777777777777777777_<47> = 37 × 43 × 5669 × 9200017 × 90433531 × 571677049 × 17431190250175081_<17>

673×10⁴⁶-79 = 747777777777777777777777777777777777777777777777_<48> = 3² × 633463 × 891277 × 147162139357206268006424315071663003_<36>

673×10⁴⁷-79 = 7477777777777777777777777777777777777777777777777_<49> = 25931 × 56924512400843_<14> × 5065869178675545136087119402169_<31>

673×10⁴⁸-79 = 74777777777777777777777777777777777777777777777777_<50> = 37 × 1533148777_<10> × 166526050979_<12> × 7915973771418843439148597287_<28>

673×10⁴⁹-79 = 747777777777777777777777777777777777777777777777777_<51> = 3 × 47 × 61879 × 2365267 × 36235143277233503646721257848879597729_<38>

673×10⁵⁰-79 = 74(7)₅₀_<52> = 2600771773021_<13> × 698711142934187_<15> × 4115026557815516622237551_<25>

673×10⁵¹-79 = 74(7)₅₁_<53> = 19 × 37 × 173 × 967 × 13633 × 713436071 × 91534050302921_<14> × 714192811495168483_<18>

673×10⁵²-79 = 74(7)₅₂_<54> = 3 × 1889 × 2741 × 21023 × 4551601 × 503096657712861637493229600237146017_<36>

673×10⁵³-79 = 74(7)₅₃_<55> = 59 × 145702213 × 869870083809376713107787935882920948831270631_<45>

673×10⁵⁴-79 = 74(7)₅₄_<56> = 37 × 71 × 156843671 × 357968306463893_<15> × 506991766264082477374803683017_<30>

673×10⁵⁵-79 = 74(7)₅₅_<57> = 3² × 13331 × 76207 × 36536237 × 2238456379924147263841547344751569345457_<40>

673×10⁵⁶-79 = 74(7)₅₆_<58> = 17 × 53 × 139 × 2200502814449_<13> × 27133825968619662755578257085384968313607_<41>

673×10⁵⁷-79 = 74(7)₅₇_<59> = 37 × 157 × 23027 × 290916605123723_<15> × 1921610249250902863470313018286371793_<37>

673×10⁵⁸-79 = 74(7)₅₈_<60> = 3 × 17597 × 751319 × 713799959 × 26412637781598127763007711784056859247207_<41>

673×10⁵⁹-79 = 74(7)₅₉_<61> = 23 × 325120772946859903381642512077294685990338164251207729468599_<60>

673×10⁶⁰-79 = 74(7)₆₀_<62> = 37 × 315103 × 74266779573618607390255601_<26> × 86362200722823937356123105907_<29>

673×10⁶¹-79 = 74(7)₆₁_<63> = 3 × 717397 × 40038749 × 8677832123247511034234135949538706507605682973403_<49>

673×10⁶²-79 = 74(7)₆₂_<64> = 9631 × 6655791719_<10> × 9306565933863278723_<19> × 12534643608112338255895705030291_<32>

673×10⁶³-79 = 74(7)₆₃_<65> = 37 × 85021 × 11349713027_<11> × 2094400540418254599733240851330480142777632073963_<49>

673×10⁶⁴-79 = 74(7)₆₄_<66> = 3³ × 1639102978841_<13> × 10004969970103_<14> × 1688833214173546591374834920172298877437_<40>

673×10⁶⁵-79 = 74(7)₆₅_<67> = 67 × 637471 × 5830193431986317_<16> × 36904514719143719_<17> × 813719749674863441667951007_<27>

673×10⁶⁶-79 = 74(7)₆₆_<68> = 29 × 37 × 43 × 11719847 × 71801713 × 1925961625618377502634145113885902702989143187413_<49>

673×10⁶⁷-79 = 74(7)₆₇_<69> = 3 × 113 × 193 × 443 × 1012598928957859143154726919_<28> × 25478529423323340930360906321688103_<35>

673×10⁶⁸-79 = 74(7)₆₈_<70> = 233 × 4801 × 24103 × 447463 × 3484094059_<10> × 136262442263_<12> × 1026074396344793_<16> × 1272365270937871541_<19>

673×10⁶⁹-79 = 74(7)₆₉_<71> = 19 × 37 × 53 × 73127 × 27445023254234878815472365709116293444093392297390866679439189_<62>

673×10⁷⁰-79 = 74(7)₇₀_<72> = 3 × 51239 × 6528318773_<10> × 286654428876787843_<18> × 5322494810807638333_<19> × 488399712271311030863_<21>

673×10⁷¹-79 = 74(7)₇₁_<73> = 107 × 8431 × 263227 × 1027444251329402948843175911_<28> × 30649330133640861115415401227125473_<35>

673×10⁷²-79 = 74(7)₇₂_<74> = 17 × 37 × 17783 × 49433 × 20520889 × 380236393181_<12> × 953358076361_<12> × 29020862894129_<14> × 626446069424543327_<18>

673×10⁷³-79 = 74(7)₇₃_<75> = 3² × 445172131 × 10024744076147950644553_<23> × 18617818090762777847883577819079108575264171_<44>

673×10⁷⁴-79 = 74(7)₇₄_<76> = 1163 × 1861 × 21407 × 280338964487_<12> × 575714533501146362188402814137102666353207358888929071_<54>

673×10⁷⁵-79 = 74(7)₇₅_<77> = 37 × 349 × 768171133 × 124142688338840049061_<21> × 60724825435009779816913086454388044202814833_<44>

673×10⁷⁶-79 = 74(7)₇₆_<78> = 3 × 1427 × 1383728597769958829923_<22> × 126234019263388322845865413022452019363763030295665779_<54>

673×10⁷⁷-79 = 74(7)₇₇_<79> = 257 × 1627 × 65371 × 93710378383447159_<17> × 2919302226397661386831044706782916454181001581987887_<52>

673×10⁷⁸-79 = 74(7)₇₈_<80> = 37 × 21563 × 923311 × 89584280819399791648163_<23> × 1133135450147843563497838427891554644269398019_<46>

673×10⁷⁹-79 = 74(7)₇₉_<81> = 3 × 1427977391_<10> × 21436218664045457627_<20> × 8142950414362393031146899416274168408415981382859887_<52>

673×10⁸⁰-79 = 74(7)₈₀_<82> = 322519 × 887238517049_<12> × 255880660594037_<15> × 102126723716710153072766503842858452588243483599891_<51>

673×10⁸¹-79 = 74(7)₈₁_<83> = 23 × 37 × 491 × 30554111856186075521503_<23> × 5857224069245304099216360112930945945975216146356613599_<55>

673×10⁸²-79 = 74(7)₈₂_<84> = 3² × 53 × 919 × 2035273 × 187995161 × 7769526409_<10> × 2165250232610242940636953_<25> × 265012696637929895325365015459_<30>

673×10⁸³-79 = 74(7)₈₃_<85> = 83 × 263 × 32954263 × 10395062635981098487928828129811616222550964959496066367176147495325682251_<74>

673×10⁸⁴-79 = 74(7)₈₄_<86> = 37 × 5479 × 11089573163_<11> × 87368660779716242597700132717499789_<35> × 380714152205246777248602411723180757_<36> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=1584171678 for P35 x P36 / December 20, 2014 2014 年 12 月 20 日)

673×10⁸⁵-79 = 74(7)₈₅_<87> = 3 × 109 × 24692408819453249267730072453333589_<35> × 92610737646523007861207999802522545207064204868459_<50> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=2077790978 for P35 x P50 / December 20, 2014 2014 年 12 月 20 日)

673×10⁸⁶-79 = 74(7)₈₆_<88> = 313 × 297294271 × 17252628390601_<14> × 4657859764710254838040539088973603013565821609374947674690150799_<64>

673×10⁸⁷-79 = 74(7)₈₇_<89> = 19 × 37 × 43 × 229 × 108943 × 433889 × 15462858907_<11> × 856842567781572557_<18> × 17248228393724130133111887610270261084687289_<44>

673×10⁸⁸-79 = 74(7)₈₈_<90> = 3 × 17 × 12527 × 1022017 × 2909462388288497_<16> × 176552613785952653_<18> × 1817735009117160748291_<22> × 1226534337376657460399363_<25>

673×10⁸⁹-79 = 74(7)₈₉_<91> = 71 × 1033 × 265057704980449_<15> × 384656832702741450160716662013624072108932464536526708311679981770128111_<72>

673×10⁹⁰-79 = 74(7)₉₀_<92> = 37 × 883 × 26801 × 46289959 × 1844897881995444946250062629342220241883963967205025238266841583856624328393_<76>

673×10⁹¹-79 = 74(7)₉₁_<93> = 3⁵ × 93156051706502768729549_<23> × 33033546927956134945050031606129451131450351809456772885095129561911_<68>

673×10⁹²-79 = 74(7)₉₂_<94> = 2399 × 4436521 × 520463871785668403_<18> × 7807377190062528832231280079437_<31> × 172903591969932963766172732986244033_<36> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=4176785747 for P31 x P36 / December 20, 2014 2014 年 12 月 20 日)

673×10⁹³-79 = 74(7)₉₃_<95> = 37 × 131 × 484091 × 100053167 × 9508721444102793169_<19> × 33498052704855024676570069836205865915124547994256877567987_<59>

673×10⁹⁴-79 = 74(7)₉₄_<96> = 3 × 29 × 173 × 733562303 × 253547156563845192843776021_<27> × 267123101942046744877504755710907368451728135715000626329_<57>

673×10⁹⁵-79 = 74(7)₉₅_<97> = 47 × 53 × 16487936363401_<14> × 182067540158153931646066886577492487241162348677297645033183107043832649435347947_<81>

673×10⁹⁶-79 = 74(7)₉₆_<98> = 37 × 61 × 223 × 166297 × 210461 × 6501461411909_<13> × 652933722103329786001818822956961822904861881459537436054687902663719_<69>

673×10⁹⁷-79 = 74(7)₉₇_<99> = 3 × 317 × 175069 × 360181 × 22310373049_<11> × 64160585761768189_<17> × 35104926900162301081_<20> × 248152561174049909658176625438064324723_<39>

673×10⁹⁸-79 = 74(7)₉₈_<100> = 67 × 740591 × 177902293 × 2492405064870379125343_<22> × 257166215331757551235769_<24> × 1321615847691114947091960656825489009911_<40>

673×10⁹⁹-79 = 74(7)₉₉_<101> = 37 × 211969 × 9534512221225844444333940439503045355787973812307559223381820082280998735763347569790964815709_<94>

673×10¹⁰⁰-79 = 74(7)₁₀₀_<102> = 3² × 83086419753086419753086419753086419753086419753086419753086419753086419753086419753086419753086419753_<101>

673×10¹⁰¹-79 = 74(7)₁₀₁_<103> = 382073 × 42751258755607_<14> × 239960269566917355860809431082210242097_<39> × 1907822466446248336454216115347978989564868831_<46> (Makoto Kamada / Msieve v. 1.53 (SVN 975M) for P39 x P46 / January 6, 2015 2015 年 1 月 6 日)

673×10¹⁰²-79 = 74(7)₁₀₂_<104> = 37 × 139 × 327778557094967005403752780350197614098174091729_<48> × 44358361036650173550285879070697068800987769574953991_<53> (KTakahashi / Msieve 1.51 snfs for P48 x P53 / January 8, 2015 2015 年 1 月 8 日)

673×10¹⁰³-79 = 74(7)₁₀₃_<105> = 3 × 23 × 417169 × 1652351 × 5194963 × 36447959 × 83033521209969725619477323612001542891646931313360555211670232764313578044071_<77>

673×10¹⁰⁴-79 = 74(7)₁₀₄_<106> = 17 × 691 × 124433 × 752642309633_<12> × 27988461050909861_<17> × 242852381336378143449809039352475643132900457082553333327615427475279_<69>

673×10¹⁰⁵-79 = 74(7)₁₀₅_<107> = 19 × 37 × 3617 × 17971 × 107312339 × 1269538301_<10> × 2362282645010169977985670126346568750151_<40> × 5084744658976412526930232993137823773733_<40> (Makoto Kamada / Msieve v. 1.53 (SVN 975M) for P40(2362...) x P40(5084...) / January 6, 2015 2015 年 1 月 6 日)

673×10¹⁰⁶-79 = 74(7)₁₀₆_<108> = 3 × 5547475211_<10> × 4989827179706060859287812427_<28> × 6648191397146659644359870489260043_<34> × 1354462269051574045831670448383738329_<37> (Makoto Kamada / Msieve v. 1.53 (SVN 975M) for P34 x P37 / January 6, 2015 2015 年 1 月 6 日)

673×10¹⁰⁷-79 = 74(7)₁₀₇_<109> = 22646895053898106369626448425680537315790377_<44> × 330189977918878646530636903735544506907615360500725512119196456201_<66> (KTakahashi / Msieve 1.51 snfs for P44 x P66 / January 8, 2015 2015 年 1 月 8 日)

673×10¹⁰⁸-79 = 74(7)₁₀₈_<110> = 37 × 43 × 53 × 156070261729560790753_<21> × 10859681520146851316596327_<26> × 523225929150253543953926258323652636234641832161951397870029_<60>

673×10¹⁰⁹-79 = 74(7)₁₀₉_<111> = 3² × 97 × 2482871 × 7728980909397352851722866991299_<31> × 44635655862333808894115929134375665649454577073133764935963916883269781_<71> (KTakahashi / GMP-ECM 6.4.4 B1=250000, sigma=1767699701 for P31 x P71 / January 8, 2015 2015 年 1 月 8 日)

673×10¹¹⁰-79 = 74(7)₁₁₀_<112> = 421 × 11428919461_<11> × 34541038840991_<14> × 845687621504079007_<18> × 53203465018818143393049932041534980306492278869839780624750833430041_<68>

673×10¹¹¹-79 = 74(7)₁₁₁_<113> = 37 × 59 × 13037 × 11985218453498011249488906173750017_<35> × 219227584768817827803505187321346044140281434141083470583417369157095811_<72> (KTakahashi / GMP-ECM 6.4.4 B1=250000, sigma=3108813813 for P35 x P72 / January 8, 2015 2015 年 1 月 8 日)

673×10¹¹²-79 = 74(7)₁₁₂_<114> = 3 × 73867 × 8599210097_<10> × 392411999477296076552454130398812881465204875471888494737374751127145172783138687759788168971359841_<99>

673×10¹¹³-79 = 74(7)₁₁₃_<115> = 479 × 33276952200604421_<17> × 4196260137777066426097_<22> × 2354234466681708948086457229_<28> × 47487726871440600987418853349704188658405371231_<47>

673×10¹¹⁴-79 = 74(7)₁₁₄_<116> = 37 × 2819 × 17502432300820312760941711_<26> × 40961641131871968250493636897622965307258108297235195902695819086622670575215736320369_<86>

673×10¹¹⁵-79 = 74(7)₁₁₅_<117> = 3 × 1223 × 5597121416726908022742065349853_<31> × 36413306356101581811062481932709628203541244850648012467263737775563018093083366161_<83> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=3843953943 for P31 x P83 / December 20, 2014 2014 年 12 月 20 日)

673×10¹¹⁶-79 = 74(7)₁₁₆_<118> = 747319 × 360342607 × 27768403701011205866131793714576593667664044262933121315433998457759219317803319423013865096614068467769_<104>

673×10¹¹⁷-79 = 74(7)₁₁₇_<119> = 37 × 3467 × 30616223269_<11> × 1942111632458381_<16> × 14114791635699181572644013611783968771033_<41> × 694571104413433230946485541670389989711919781999_<48> (Makoto Kamada / Msieve v. 1.53 (SVN 975M) for P41 x P48 / January 6, 2015 2015 年 1 月 6 日)

673×10¹¹⁸-79 = 74(7)₁₁₈_<120> = 3³ × 16033 × 46523 × 4802989 × 5114388085483_<13> × 1511544767608914388781376653313390387728894585450438029180115238798689548120800013909861847_<91>

673×10¹¹⁹-79 = 74(7)₁₁₉_<121> = 430494653 × 8619185344667_<13> × 14332171964921610204781_<23> × 273347546631435384900901_<24> × 514412345341257602761237397168508683829662710819974367_<54>

673×10¹²⁰-79 = 74(7)₁₂₀_<122> = 17 × 37 × 95928775095972817985537736357554556910440027784468351570021_<59> × 1239290185378543555359846103354773345398268785060962067225353_<61> (KTakahashi / Msieve 1.51 snfs for P59 x P61 / January 8, 2015 2015 年 1 月 8 日)

673×10¹²¹-79 = 74(7)₁₂₁_<123> = 3 × 53 × 125410387093_<12> × 2489245181505786717397_<22> × 15065177293016924360632987975389909179997287918354194020547018372145002508987104957935143_<89>

673×10¹²²-79 = 74(7)₁₂₂_<124> = 29 × 7493087143874612232397897_<25> × 218075344706193898374893719491061_<33> × 157800075196872452732651176140716989821543515167325069878329704489_<66> (KTakahashi / GMP-ECM 6.4.4 B1=1000000, sigma=2634092613 for P33 x P66 / January 8, 2015 2015 年 1 月 8 日)

673×10¹²³-79 = 74(7)₁₂₃_<125> = 19 × 37 × 149 × 2753 × 117652281540617094350883804802101208333202826482429_<51> × 2204064991341545730937648355515786838296143534627961445708678849743_<67> (KTakahashi / Msieve 1.51 snfs for P51 x P67 / January 8, 2015 2015 年 1 月 8 日)

673×10¹²⁴-79 = 74(7)₁₂₄_<126> = 3 × 71 × 83 × 107 × 1571 × 1907 × 162949902877_<12> × 258651792318868078106199497000342199763_<39> × 3130650633868429323809121543140625070933312008747647012367692947_<64> (KTakahashi / Msieve 1.51 snfs for P39 x P64 / January 8, 2015 2015 年 1 月 8 日)

673×10¹²⁵-79 = 74(7)₁₂₅_<127> = 23 × 132128137 × 865983913 × 15986398457_<11> × 18290721727_<11> × 9717579603628642699169072876983707829766989134083822971892896791789778246727977638435361_<88>

673×10¹²⁶-79 = 74(7)₁₂₆_<128> = 37 × 6353 × 292446893941_<12> × 1504977476428196568319013_<25> × 19813062223737155233344949_<26> × 36480716416138087279936682206128586459711043293117897729552721_<62>

673×10¹²⁷-79 = 74(7)₁₂₇_<129> = 3² × 22027 × 32999653093633338598500742287355745817633013_<44> × 114305023989585246115162980690650594745448818962119864782439796316172189526442703_<81> (KTakahashi / Msieve 1.51 snfs for P44 x P81 / January 8, 2015 2015 年 1 月 8 日)

673×10¹²⁸-79 = 74(7)₁₂₈_<130> = 60217 × 106297 × 274679 × 43302437923639_<14> × 98218800601783214608465577169594767032878605337549511973322379283214873764535307268497840477265786033_<101>

673×10¹²⁹-79 = 74(7)₁₂₉_<131> = 37 × 43 × 409 × 154153 × 52374231197_<11> × 99545632659217_<14> × 142983924822257131681332821533189725829665421966108455504484508493240558200223483587169342309139_<96>

673×10¹³⁰-79 = 74(7)₁₃₀_<132> = 3 × 8537 × 1774529051846303023_<19> × 4275580792929175003_<19> × 3848289957059363837322484788380900092839795006407443302962473340297218317170108580785677703_<91>

673×10¹³¹-79 = 74(7)₁₃₁_<133> = 67 × 563 × 5791 × 42745091 × 879430819524085289876430637_<27> × 910642394856781348413294273483654144027791988556587841360216607117356380927266205517489921_<90>

673×10¹³²-79 = 74(7)₁₃₂_<134> = 37 × 701 × 1031 × 4799 × 7019 × 8071682413_<10> × 10284995102582859283622056875621836722940180837646869529521034207868191481874462656006251473825524608810005447_<110>

673×10¹³³-79 = 74(7)₁₃₃_<135> = 3 × 78005927 × 25288429899907_<14> × 7876714704963841181035918331_<28> × 16041933673585742645077496403020112449119682244016846322450736979936419334710120535901_<86>

673×10¹³⁴-79 = 74(7)₁₃₄_<136> = 53 × 5231 × 13721 × 5179154939152698489531633174853501_<34> × 379548515633440838641137524585646937824610094532634014558876949562376795956551407338743139159_<93> (KTakahashi / GMP-ECM B1=1000000, sigma=380755361 for P34 x P93 / January 8, 2015 2015 年 1 月 8 日)

673×10¹³⁵-79 = 74(7)₁₃₅_<137> = 37 × 157 × 227 × 170185194156274931062369_<24> × 333214235270860821477345056846009248457511945395474108653087329739789845923243668403471909373770160545623531_<108>

673×10¹³⁶-79 = 74(7)₁₃₆_<138> = 3² × 17 × 571 × 8559433373141693597721893453496077032356693082629691949426848640474546178333822988882911275686249073151995441751974838063914675294779_<133>

673×10¹³⁷-79 = 74(7)₁₃₇_<139> = 173 × 102611 × 40766261 × 75470809600127510167937257_<26> × 216306271886008246480942178502810036149287_<42> × 632970587479201222011709957865464024456507972614801231941_<57> (KTakahashi / GMP-ECM 6.4.4 B1=1000000, sigma=3360823994 for P42 x P57 / January 8, 2015 2015 年 1 月 8 日)

673×10¹³⁸-79 = 74(7)₁₃₈_<140> = 37 × 440561008790551043473864048323214831321173241_<45> × 4587380591326553592178231503691719455962203444706681054812468068021180012965901876992471848581_<94> (KTakahashi / Msieve 1.51 snfs for P45 x P94 / January 8, 2015 2015 年 1 月 8 日)

673×10¹³⁹-79 = 74(7)₁₃₉_<141> = 3 × 1170843787_<10> × 488306094375461_<15> × 435973608029601117546142180898445387379363039055174112855984967159604101518894964585536227914459013451244242656114237_<117>

673×10¹⁴⁰-79 = 74(7)₁₄₀_<142> = 373 × 8677 × 346547 × 37811317097_<11> × 7190167740461_<13> × 594764887641994049419_<21> × 41231186484601646054320923691323257138626308269919011483709938737227475448886729640277_<86>

673×10¹⁴¹-79 = 74(7)₁₄₁_<143> = 19² × 37 × 47 × 3361 × 22381 × 19841853242473111_<17> × 62998347813418711_<17> × 108921632119378633523_<21> × 62635836270536316336512473_<26> × 185681808618920168824033255862038512794014378199477_<51>

673×10¹⁴²-79 = 74(7)₁₄₂_<144> = 3 × 53189 × 489217 × 733719963306938542861501_<24> × 13055622949037926704582240034491758157121555257199755135755090186051626103367160101710892754372308135184982443_<110>

673×10¹⁴³-79 = 74(7)₁₄₃_<145> = 1447 × 21317 × 12332955269958977985609165062270424620724919873_<47> × 19656707810721981649344394516587431504729436553129136273788796081091054637956594593358302651_<92> (Cyp / yafu v1.34.3 for P47 x P92 / January 15, 2015 2015 年 1 月 15 日)

673×10¹⁴⁴-79 = 74(7)₁₄₄_<146> = 37 × 599242313903_<12> × 130220419365637_<15> × 25899374098895033531450320556636359225176483599711632223263957508378970020568903136242652665461295812446701126462010711_<119>

673×10¹⁴⁵-79 = 74(7)₁₄₅_<147> = 3³ × 7649 × 89430645086797537_<17> × 16851566931741677580406601_<26> × 20879034882114482706046012354360360452089878649_<47> × 115071309867470655210658411416272157203901007922108323_<54> (KTakahashi / Msieve 1.51 gnfs for P47 x P54 / January 8, 2015 2015 年 1 月 8 日)

673×10¹⁴⁶-79 = 74(7)₁₄₆_<148> = 179 × 151709137 × 47660033456286241_<17> × 352430379257477188500919847_<27> × 16393817866761037888399660627523115201897218044992322448476792920021837701932182962938741876237_<95>

673×10¹⁴⁷-79 = 74(7)₁₄₇_<149> = 23 × 37 × 53 × 429784031339168867_<18> × 2629395585405634933414309987_<28> × 1467104065081551855613306156150253471478451188735278493144435348059097437271098509749697695658080871_<100>

673×10¹⁴⁸-79 = 74(7)₁₄₈_<150> = 3 × 139 × 50053 × 3578974303623847_<16> × 355153228461379868007479_<24> × 302735639725998974094772160941963_<33> × 93104031857357040351704701055414945510896871808776833595157354552207383_<71> (KTakahashi / GMP-ECM 6.4.4 B1=1000000, sigma=1775763282 for P33 x P71 / January 8, 2015 2015 年 1 月 8 日)

673×10¹⁴⁹-79 = 74(7)₁₄₉_<151> = 467 × 56207 × 194792518301599_<15> × 1462490306271554821356090441535100928932845830227499931164081652008287566942296410340565198676033457501790678128235307014971127867_<130>

673×10¹⁵⁰-79 = 74(7)₁₅₀_<152> = 29 × 37 × 43 × 337 × 3233858603_<10> × 5209912817_<10> × 4752525494490967931553721_<25> × 233256042863597344005982346389_<30> × 257493123037875458332322917853300116529946397805129909260778630093429581_<72> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=1339402644 for P30 x P72 / December 21, 2014 2014 年 12 月 21 日)

673×10¹⁵¹-79 = 74(7)₁₅₁_<153> = 3 × 2579 × 53569 × 108922403 × 16095492247403_<14> × 17157830190493373_<17> × 59979463406618919786555196624218434764935252816464587948607705015732921469470272329748384828884534809693837_<107>

673×10¹⁵²-79 = 74(7)₁₅₂_<154> = 17 × 6263 × 316633 × 10046171249_<11> × 432630336097853961480348002547406153_<36> × 665630723063389998586963902551701039271287_<42> × 76671531952091311040141250893327590749207054205945086401_<56> (Serge Batalov / GMP-ECM B1=3000000, sigma=529783481 for P36 / January 8, 2015 2015 年 1 月 8 日) (Cyp / yafu v1.34.3 for P42 x P56 / January 9, 2015 2015 年 1 月 9 日)

673×10¹⁵³-79 = 74(7)₁₅₃_<155> = 37² × 577 × 35461 × 334433459036381_<15> × 7982383597490160779906687720804539143146959218289518663989549127093777100569297867887205811547372973041559855942596000209228528969_<130>

673×10¹⁵⁴-79 = 74(7)₁₅₄_<156> = 3² × 140729 × 1371179 × 43976719 × 9791054452360032922312807199634976558075351806313492830528014979081220302182327650476300435365571943177635450738782633401133231691448957_<136>

673×10¹⁵⁵-79 = 74(7)₁₅₅_<157> = 823² × 20578185107531_<14> × 6482091500754029837_<19> × 82765750526569517953924849977017472083509419901918533132381623130978220278035451911493128135651580216051670990758753679_<119>

673×10¹⁵⁶-79 = 74(7)₁₅₆_<158> = 37 × 61 × 14143777 × 2715677729_<10> × 361471701791368272054629577064271304413_<39> × 2386289118801315744531562074960027046321945253607067916737884504697806981217752438920004363962785109_<100> (Cyp / yafu v1.34.3 for P39 x P100 / January 15, 2015 2015 年 1 月 15 日)

673×10¹⁵⁷-79 = 74(7)₁₅₇_<159> = 3 × 379 × 4855699 × 271447247 × 191159926112863371087737733479_<30> × 2782511832753183191631188595098050247141288672182951_<52> × 938082463626465999387483954742609018948843246336690782124933_<60> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=462820407 for P30 / December 21, 2014 2014 年 12 月 21 日) (Cyp / yafu v1.34.3 for P52 x P60 / January 10, 2015 2015 年 1 月 10 日)

673×10¹⁵⁸-79 = 74(7)₁₅₈_<160> = 1499 × 128837 × 10534144081_<11> × 110845065535250400593667613_<27> × 11965388134608588614796820835555537900627_<41> × 2771327867000550102331264521160391452652258214939618566493585148904566589009_<76> (Ignacio Santos / GMP-ECM 7.0 B1=43000000, sigma=1:1390125708 for P41 x P76 / January 13, 2015 2015 年 1 月 13 日)

673×10¹⁵⁹-79 = 74(7)₁₅₉_<161> = 19 × 37 × 71 × 1183151 × 1266247806119909868116074613196705906710603062716221833868163142703630963042333891639859633198504711739602595775126763993692625906053940421984415504279_<151>

673×10¹⁶⁰-79 = 74(7)₁₆₀_<162> = 3 × 53 × 4226941711_<10> × 76066839005188521991_<20> × 2109162978224589954380353_<25> × 6934955242426883118619547626279287174076746361502275043322738120086150350175204940809113433314341697627351_<106>

673×10¹⁶¹-79 = 74(7)₁₆₁_<163> = 21807805418724371_<17> × 342894556980836452208435249348990744363931576752852165309692213521208827184208427002277535421364102945568057395760174260830044269073735449657732587_<147>

673×10¹⁶²-79 = 74(7)₁₆₂_<164> = 37 × 181 × 327486897233761_<15> × 5730252718198497977_<19> × 5950103928516733564370376327315943675948650862519778886094453821307787317591913703721145409708964236477329851371003355291907953_<127>

673×10¹⁶³-79 = 74(7)₁₆₃_<165> = 3² × 827 × 23497 × 4275748173830337431899712518451449628218581906135765910535926285018886599127266176154233883421296559718597421764893280162314567162908792600831635306985843987_<157>

673×10¹⁶⁴-79 = 74(7)₁₆₄_<166> = 67 × 5179367 × 12178433 × 514188449 × 651950079635960503_<18> × 1528580250536383528067311111174608512397400381982339435041_<58> × 3453064991606014789091049072930890046291710247713574602715308736923_<67> (Jo Yeong Uk / GGNFS/Msieve v1.39 snfs for P58 x P67 / February 22, 2015 2015 年 2 月 22 日)

673×10¹⁶⁵-79 = 74(7)₁₆₅_<167> = 37 × 83 × 363809 × 66929764947197436183530998872837021922731433948212698163809476123593550561964777195614427927543902240938919161475171684023826649837842590348398456962771476143_<158>

673×10¹⁶⁶-79 = 74(7)₁₆₆_<168> = 3 × 2434583 × 1685819048965975493_<19> × 329637305831432917799825863526522591317_<39> × 184238081302626386182524504299483863631739258969962569706412336316723367233393224859463303116650683223733_<105> (Ignacio Santos / GMP-ECM 7.0 B1=3000000, sigma=1:731618584 for P39 x P105 / February 18, 2015 2015 年 2 月 18 日)

673×10¹⁶⁷-79 = 74(7)₁₆₇_<169> = 389 × 19223079120251356755212796343901742359325906883747500714081690945444158811768066266780919737217937732076549557269351613824621536703798914595829762924878606112539274493_<167>

673×10¹⁶⁸-79 = 74(7)₁₆₈_<170> = 17 × 37 × 182682481 × 817353255523163971042085470602718189292011_<42> × 796187236957994543446813888830434520533666607232280701359772403369635192040252581854691848350892727963562278008441943_<117> (Jo Yeong Uk / GMP-ECM 6.4.4 B1=11000000, sigma=2579959433 for P42 x P117 / March 26, 2015 2015 年 3 月 26 日)

673×10¹⁶⁹-79 = 74(7)₁₆₉_<171> = 3 × 23 × 59 × 13361357 × 99839743 × 60342304433_<11> × 2186598823656942975260695933_<28> × 1043581636280682239039348788846069334210146994584920073774751337224184538368878214863977813371541625265118421745233_<115>

673×10¹⁷⁰-79 = 74(7)₁₇₀_<172> = 419 × 1889 × 1551887 × 411807829 × 947972679359_<12> × 384841470756739_<15> × 1378460597458501412661067687507867_<34> × 29396785029971859150573058167106638410088015601856132432628310609638925756456880483206917967_<92> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=2360015864 for P34 x P92 / December 21, 2014 2014 年 12 月 21 日)

673×10¹⁷¹-79 = 74(7)₁₇₁_<173> = 37 × 43 × 2039 × 907459897 × 444036322148998417_<18> × 10586340224581542749_<20> × 107703854116929573603878461813_<30> × 1216176372951731485380935650573573_<34> × 41253951835200279045833799271576324992276710856440811300677_<59> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=3263072133 for P30 / December 21, 2014 2014 年 12 月 21 日) (Makoto Kamada / Msieve v. 1.53 (SVN 975M) for P34 x P59 / January 6, 2015 2015 年 1 月 6 日)

673×10¹⁷²-79 = 74(7)₁₇₂_<174> = 3⁴ × 4447 × 256561 × 1351648589_<10> × 307450043962060360898065369_<27> × 7359252535122051510725658349_<28> × 1431386276993466190278771636091853554523_<40> × 1848420841003233036506304222673778644111704888627244483273693_<61> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=403850532 for P40 x P61 / December 21, 2014 2014 年 12 月 21 日)

673×10¹⁷³-79 = 74(7)₁₇₃_<175> = 53 × 5686997 × 140657879180238313870380941_<27> × 176380114881106518793795150809998991966654561643726568042223126440292825921297486146689824846444899446553963740027443773400021639132236880317_<141>

673×10¹⁷⁴-79 = 74(7)₁₇₄_<176> = 37 × 19025724511_<11> × 15920068030021_<14> × 66958807433607263_<17> × 20987268526187856229_<20> × 4748113350604953687517307040299390370200031336192556076930502849522540102496611036530533983141925770401832486691333_<115>

673×10¹⁷⁵-79 = 74(7)₁₇₅_<177> = 3 × 3271 × 10339218283_<11> × 596943877053519589069743764813_<30> × 12346661731672522452085620308746596764172795839848715618249627070097861341383652657297365211870576957373212618886218272340274917671651_<134> (Serge Batalov / GMP-ECM B1=3000000, sigma=1768322591 for P30 x P134 / January 9, 2015 2015 年 1 月 9 日)

673×10¹⁷⁶-79 = 74(7)₁₇₆_<178> = 317 × 3102904859_<10> × 129698388595386703_<18> × 3749445106902426988684413245520751_<34> × 15633033299707829700547644835985438294757246107656967928513735831674390120328164390663873363727832693906319117585503_<116> (Serge Batalov / GMP-ECM B1=3000000, sigma=1787639139 for P34 x P116 / January 9, 2015 2015 年 1 月 9 日)

673×10¹⁷⁷-79 = 74(7)₁₇₇_<179> = 19 × 37 × 107 × 40684271 × 343851529133206724423775503_<27> × 48555655334894262496828970990800012522817441983277928507659946497_<65> × 1463511480378617470851625246652138175550127497800785336830280943977401379117_<76> (Jo Yeong Uk / GGNFS/Msieve v1.39 snfs for P65 x P76 / October 29, 2015 2015 年 10 月 29 日)

673×10¹⁷⁸-79 = 74(7)₁₇₈_<180> = 3 × 29 × 1747 × 17066177 × 34920239692970561441266413073733_<32> × 1183998933485458574187560560059450509135191730226414018129659_<61> × 6972614013177709732647896667468458245504625285877307356440583247231045016747_<76> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=3062976827 for P32 / December 21, 2014 2014 年 12 月 21 日) (Jo Yeong Uk / GGNFS/Msieve v1.39 snfs for P61 x P76 / November 27, 2015 2015 年 11 月 27 日)

673×10¹⁷⁹-79 = 74(7)₁₇₉_<181> = 113 × 722724600377361333363332679853831398891830121519917151336701708050627771039_<75> × 91563265658249064866519446992217493519230111604845005032041139562713871385028921231030666973552574530911_<104> (Cyp / yafu v1.34.3 for P75 x P104 / February 21, 2015 2015 年 2 月 21 日)

673×10¹⁸⁰-79 = 74(7)₁₈₀_<182> = 37 × 173 × 1583105931101_<13> × 756983008896817177164119661467_<30> × 628404039229078565901144648291869_<33> × 15512780669425259436814242083921681714245396792233607802917794807780622967262645947994740381382099602699_<104> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=733107664 for P30, B1=1e6, sigma=1764805302 for P33 x P104 / December 21, 2014 2014 年 12 月 21 日)

673×10¹⁸¹-79 = 74(7)₁₈₁_<183> = 3² × 167 × 4923221 × 13893000307_<11> × 2810885951559527747_<19> × 1321954282366893222210719_<25> × 17578854486690286483961432453_<29> × 111357113574984029022897945495979409655210311229424775961023505821633231389100175763136926193_<93>

673×10¹⁸²-79 = 74(7)₁₈₂_<184> = definitely prime number 素数

673×10¹⁸³-79 = 74(7)₁₈₃_<185> = 37 × 1460075933_<10> × 379954158868269802622889256154549_<33> × 3643042064002972648113211986321823685013350373609353213753810051227311906096978254685332166473645893851236938062333423951650597424030046123613_<142> (Serge Batalov / GMP-ECM B1=3000000, sigma=2435331557 for P33 x P142 / January 9, 2015 2015 年 1 月 9 日)

673×10¹⁸⁴-79 = 74(7)₁₈₄_<186> = 3 × 17 × 34129 × 3087200470495558669676398235858653699644505865054090905751417692787132093434926259639_<85> × 139159860127607603330395331181133474647303476587761868431867944849392259818599539957529426293117_<96> (Jo Yeong Uk / GGNFS/Msieve v1.39 snfs for P85 x P96 / July 16, 2016 2016 年 7 月 16 日)

673×10¹⁸⁵-79 = 74(7)₁₈₅_<187> = 7717 × 2253985193718389_<16> × 27470425517294218854234614759_<29> × 21990528245752026073689986009339_<32> × 711659001698251583994362986977461340921274646239572385904040103743935790578790632389645617525071217866474429_<108> (Serge Batalov / GMP-ECM B1=3000000, sigma=3731799167 for P32 x P108 / January 9, 2015 2015 年 1 月 9 日)

673×10¹⁸⁶-79 = 74(7)₁₈₆_<188> = 37 × 53 × 52775083 × 478616352941833817_<18> × 1509657757464710920832217350956729906283718740251256052787832807298536892204993482696484726619050225107514779812623798077966180026631002683616396081132415853587_<160>

673×10¹⁸⁷-79 = 74(7)₁₈₇_<189> = 3 × 47 × 60631 × 3155605461345901_<16> × 508739303979039296473_<21> × 4567804061727078134334144618730946888484974465351_<49> × 11928154455361437098266759691005052825589778840757931313406213349809627646849750757772895242379569_<98> (Jo Yeong Uk / GMP-ECM 6.4.4 B1=11000000, sigma=7280389594 for P49 x P98 / November 10, 2017 2017 年 11 月 10 日)

673×10¹⁸⁸-79 = 74(7)₁₈₈_<190> = 6763 × 29740853 × 2110305235334988296966065139835669507683085009971230422063251_<61> × 17617102071546071854532985144838102219964006476609356003423380605899484650654698272529138832489065519469019796554072093_<119> (Eric Jeancolas / cado-nfs-3.0.0 for P61 x P119 / July 24, 2020 2020 年 7 月 24 日)

673×10¹⁸⁹-79 = 74(7)₁₈₉_<191> = 37 × 15303841730896982171823507260323418328518886247_<47> × 34596660319472334032915593038971036551067701242216263105890681216295909_<71> × 3817123289695939851196266616775353769298108745405242321995070251384563327_<73> (Serge Batalov / GMP-ECM B1=43000000, sigma=2833680509 for P47 / January 11, 2015 2015 年 1 月 11 日) (Eric Jeancolas / cado-nfs-3.0.0 for P71 x P73 / May 8, 2020 2020 年 5 月 8 日)

673×10¹⁹⁰-79 = 74(7)₁₉₀_<192> = 3² × 81110340131_<11> × 104888983709_<12> × 841917831796887767069_<21> × 999309229338121640363086636159_<30> × 11607918196631716163681545914228390050719697132180893473677782729926264287158587141859367190113834073662560935422984917_<119> (Serge Batalov / GMP-ECM B1=3000000, sigma=920260583 for P30 x P119 / January 9, 2015 2015 年 1 月 9 日)

673×10¹⁹¹-79 = 74(7)₁₉₁_<193> = 23 × 349 × 217035529 × 4292284080269370414622325569858447865701282260731261651344467118478193509786497927431426291346905014779344207907314008855199238368758188121421236905766296432489677823334198950799819_<181>

673×10¹⁹²-79 = 74(7)₁₉₂_<194> = 37 × 43 × 1039517 × 17851214061581_<14> × 1406746370511584801_<19> × 1800475507613301277202105218419623825222922628855388524622254246653489910360428330506079241292281911803734459806211161320778056644217787846653385909764911_<154>

673×10¹⁹³-79 = 74(7)₁₉₃_<195> = 3 × 109 × 523 × 6801382909_<10> × 14896290464409205583_<20> × 43156652968363481063085445990580788906736827948663564969423970861866551365293125357719480524757745570787188915451293049590501378517968462727015289501998112192471_<161>

673×10¹⁹⁴-79 = 74(7)₁₉₄_<196> = 71 × 139 × 422077941713_<12> × 1795174827480528172190758098497698266569165277610799736239732993219484375813473617978532765243659958154130853137674877546637051068812019150551317850374197136709401184151535324483941_<181>

673×10¹⁹⁵-79 = 74(7)₁₉₅_<197> = 19 × 37 × 49043 × 79782083269289_<14> × 7392278014862561_<16> × 2858401991791945682259462626669169551783_<40> × 141878557443076181826213752767408447659689957511223_<51> × 9068103474207107992922281232125004529335177647932538547645903516254733_<70> (Serge Batalov / GMP-ECM B1=3000000, sigma=2292368845 for P40 / January 9, 2015 2015 年 1 月 9 日) (Erik Branger / GGNFS, Msieve gnfs for P51 x P70 / January 28, 2015 2015 年 1 月 28 日)

673×10¹⁹⁶-79 = 74(7)₁₉₆_<198> = 3 × 47309 × 231331 × 3587809 × 6720709050857233139761_<22> × 944559427746004980631181090342717192478880923889775250099273626176230169095805664467775757394518812686341223005923873917613834748462751435583976099796309443229_<159>

673×10¹⁹⁷-79 = 74(7)₁₉₇_<199> = 67 × 111608623548922056384742951907131011608623548922056384742951907131011608623548922056384742951907131011608623548922056384742951907131011608623548922056384742951907131011608623548922056384742951907131_<198>

673×10¹⁹⁸-79 = 74(7)₁₉₈_<200> = 37 × 271810461717504927499525905799_<30> × 2095281896322057935266736424090566728142778359527070561_<55> × 3548642110155677545386843237570401269101159185123177212115987733645123567064733980272766172890285371785440448677339_<115> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=3119699140 for P30 / December 21, 2014 2014 年 12 月 21 日) (Bob Backstrom / Msieve 1.54 snfs for P55 x P115 / April 12, 2021 2021 年 4 月 12 日)

673×10¹⁹⁹-79 = 74(7)₁₉₉_<201> = 3³ × 53 × 359 × 1087 × 6101 × 148622171417_<12> × 1792364232775927_<16> × 823944638978003523468298413584802275551057647671556191853091536495214717686327276655006625532933408177153568127331389053613155386880819155942519322015801696707661_<162>

673×10²⁰⁰-79 = 74(7)₂₀₀_<202> = 17 × 619309 × 20666201 × 22211669071_<11> × 1547299547970022686349469703226316043362808941719904251139582168253039841318673586828233375408291415461686295140440699078115208936888954074936364741716692388397149907393640350179_<178>

673×10²⁰¹-79 = 74(7)₂₀₁_<203> = 37 × 590272887570609299033_<21> × 2056750940739287485274258312749907_<34> × 14245449352922143613380545600106010390880527_<44> × 1125320053493798060610106088709499804854823479139_<49> × 103844638604129348002145062414458479546271360658838436547_<57> (Serge Batalov / GMP-ECM B1=3000000, sigma=1068318777 for P34 / January 9, 2015 2015 年 1 月 9 日) (Bob Backstrom / GMP-ECM 7.0.4 B1=46700000, sigma=1:2343874423 for P44, CADO for P49 x P57 / November 4, 2021 2021 年 11 月 4 日)

673×10²⁰²-79 = 74(7)₂₀₂_<204> = 3 × 683 × 853 × 2207 × 194501101 × 7707379717_<10> × 2970633880458121038629255461_<28> × 43531264454939058238212077736422866528015432096538935514477638951654644338544363302085267697090670481418472383015592214649393616731942598694241880599_<149>

673×10²⁰³-79 = 74(7)₂₀₃_<205> = 601297162122725474801142580770523436947825824192038710395100230689_<66> × 12436076949672272575046185232497024099679556465697611700443554323840781230992645298228820517247390898161982836160966025203359518156965453393_<140> (Jo Yeong Uk / GGNFS/Msieve v1.39 snfs for P66 x P140 / July 18, 2015 2015 年 7 月 18 日)

673×10²⁰⁴-79 = 74(7)₂₀₄_<206> = 37 × 29170593254612491820912259748689228398903170876086825727096893856079262075242669771428766253609691_<98> × 69282822031788968538364391812853431312251701528043948241004789811284801653549831811991689635870127670766631_<107> (Bob Backstrom / Msieve 1.54 snfs for P98 x P107 / July 6, 2020 2020 年 7 月 6 日)

673×10²⁰⁵-79 = 74(7)₂₀₅_<207> = 3 × 97 × 34703 × 169120937 × 460351673 × 83710998299_<11> × [11361689658488429965606330693681796629896034791372517853606581354376272319391734456195637162046398413189632887453458426151780579277614573286618593655636588396205691898540751_<173>] Free to factor

673×10²⁰⁶-79 = 74(7)₂₀₆_<208> = 29 × 83 × 249088226090653121066386353369803836600916671571475060900908938406612389364173_<78> × 12472205694701514260395902792083438309657982158337734149147710864189235254476809866060812188036229664666377939938313394548187907_<128> (Bob Backstrom / Msieve 1.54 snfs for P78 x P128 / July 8, 2020 2020 年 7 月 8 日)

673×10²⁰⁷-79 = 74(7)₂₀₇_<209> = 37 × 4289 × 471281 × 2454787 × 31109557 × 2033746591_<10> × 201895692179213_<15> × [31886240778289992467706125641228484901070201235513155636782013024013197019076909297258637832751168799630312206892555127941084478246783246457114659434748199190177_<161>] Free to factor

673×10²⁰⁸-79 = 74(7)₂₀₈_<210> = 3² × 12809 × 375121 × 451798261 × 7846380754277663718013186862693421641640139420989096349272814908883_<67> × 4877861986995256460752070310365543005818329647273767492078635632959979347850167142002443079049185384812973790634684463900479_<124> (Bob Backstrom / Msieve 1.54 snfs for P67 x P124 / July 25, 2021 2021 年 7 月 25 日)

673×10²⁰⁹-79 = 74(7)₂₀₉_<211> = definitely prime number 素数

673×10²¹⁰-79 = 74(7)₂₁₀_<212> = 37 × 487 × 10501 × 102871 × 1965427493_<10> × 50852114856901_<14> × 570564223898117_<15> × 4747164541734691_<16> × 41060775338202772281172817556277763_<35> × 112723693662724900764326865676923281_<36> × 3065992053509276626018445670207093644582875140481570091554707948165111077621_<76> (Serge Batalov / GMP-ECM B1=3000000, sigma=2566626223 for P35 / January 9, 2015 2015 年 1 月 9 日) (Cyp / yafu v1.34.3 for P36 x P76 / January 10, 2015 2015 年 1 月 10 日)

673×10²¹¹-79 = 74(7)₂₁₁_<213> = 3 × 91591 × 435000466142146847035559_<24> × 113101894783478544057799516994683_<33> × 456128421691170316774089622110891692381587_<42> × 121269548891352330824793039103584257142552380880795241602638693221731283727397982867681825488397802755927570091_<111> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=379462071 for P33 / December 21, 2014 2014 年 12 月 21 日) (Bob Backstrom / GMP-ECM 7.0.4 B1=16470000, sigma=1:2153870823 for P42 x P111 / June 22, 2022 2022 年 6 月 22 日)

673×10²¹²-79 = 74(7)₂₁₂_<214> = 53 × 1069 × 5449 × 5092523 × 4560182281_<10> × 25984282279024357241_<20> × 57098481872971954301_<20> × 25286235628399527657613_<23> × 30231234423122249527903_<23> × 919626805467781613012919987761811606798903494044054265670881312503878240720189936959689092002707999775197_<105>

673×10²¹³-79 = 74(7)₂₁₃_<215> = 19 × 23² × 37 × 43 × 157 × 5969179 × 4989750694705472872677978757183908527185686704175608630801250194152393983266514010726167425579707141400787301144125827608748961544202557338484494751917286792507548004373713349633821972410519817118099_<199>

673×10²¹⁴-79 = 74(7)₂₁₄_<216> = 3 × 439 × 761 × 1217 × 113039 × 394643 × [13742914166894001847658317566708404832078202630094777927114587852085598064620804198621422408109645343430000504703289518331274550822755885553319687927424254074560486839578563709110676722298166362569_<197>] Free to factor

673×10²¹⁵-79 = 74(7)₂₁₅_<217> = 2899708525743448138750513834273051718459701701632174373080214267013049817300144137674371511_<91> × 2578803252599525084828617275190913720452916922012049839314915483801266096903330520458763162421202434048621007185106449704125207_<127> (Alfred Reich / Msieve 1.53 for P91 x P127 / February 25, 2017 2017 年 2 月 25 日)

673×10²¹⁶-79 = 74(7)₂₁₆_<218> = 17 × 37 × 61 × 25943 × 1107777374520508375344286261796610470302713465704081070646375801862082695699067127543939870033_<94> × 67814004053563494299211851179543990626839815320580318513876108318787302449312661359042783950927004745324972575834407_<116> (Bob Backstrom / Msieve 1.54 snfs for P94 x P116 / February 25, 2020 2020 年 2 月 25 日)

673×10²¹⁷-79 = 74(7)₂₁₇_<219> = 3² × 20001022968350066050592072513334857865598068346205075661645394706957_<68> × 4154108511577816782831438059332631377263357120245320097531438643094485310744787215957752944535545939342882886036939762247283606976529451458612134374029_<151> (Bob Backstrom / Msieve 1.54 snfs for P68 x P151 / June 2, 2019 2019 年 6 月 2 日)

673×10²¹⁸-79 = 74(7)₂₁₈_<220> = 619 × 2833 × 3577997 × 3248497081290121370129953691918666835765823277_<46> × 366870573193972394998250981077664784698955966433237493784966464119315329222786092863788708559980996771786445303346508452386837630931162784130531221943856504523979_<162> (Bob Backstrom / GMP-ECM 6.2.3 B1=400540000, sigma=515673538 for P46 x P162 / December 10, 2019 2019 年 12 月 10 日)

673×10²¹⁹-79 = 74(7)₂₁₉_<221> = 37 × 23795579650592914516599934627830748267_<38> × 84932624071238509849717347323373452690920654896017306553756788840386579921021795052218313377073956425589657707011727548473272908583600955938475707745282207006199186769143052856760663_<182> (Serge Batalov / GMP-ECM B1=3000000, sigma=114782505 for P38 x P182 / January 10, 2015 2015 年 1 月 10 日)

673×10²²⁰-79 = 74(7)₂₂₀_<222> = 3 × 52199121336591164915651669157661884133_<38> × 555252157080072604293363631567560520851827_<42> × 8599988154322957071039416126435138381870737359498770923517278401587490900726620410695978306831901689210540097165257142185275788742971510347749_<142> (Serge Batalov / GMP-ECM B1=3000000, sigma=3906828515 for P38 / January 10, 2015 2015 年 1 月 10 日) (Erik Branger / GGNFS; NFS_factory, Msieve snfs for P42 x P142 / March 29, 2018 2018 年 3 月 29 日)

673×10²²¹-79 = 74(7)₂₂₁_<223> = 64748309 × 16463814461341951538556078356426174406147160447573864562477701_<62> × 98401657582667813116086952086584476570285573466846953949670370153_<65> × 71287149084265098666955682776161989704638974069104174187195657898378329003961409743896801_<89> (Bob Backstrom / Msieve 1.54 snfs for P62 x P65 x P89 / July 1, 2019 2019 年 7 月 1 日)

673×10²²²-79 = 74(7)₂₂₂_<224> = 37 × 1831 × 8059 × 73369 × 108161 × 78342780833_<11> × 220302311462961081537176956855520654032147871636227040992171516326505119472915434773561543945086316641020507197431487335191503277662133886391178427905834080102064330286359163489118028431040859817_<195>

673×10²²³-79 = 74(7)₂₂₃_<225> = 3 × 131 × 173 × 10998511197072729085260524169759487237314532906466895788697844912820864813098850957916394972389324416858282630686990215737513094438479427227607080230298692108690784947238197028604300368850516668546055652793507446466013293_<221>

673×10²²⁴-79 = 74(7)₂₂₄_<226> = 88469 × 47562177010161257_<17> × 8582642156698497677140723729293659_<34> × 2640759364184679698971429108802423692369_<40> × 78409715420033442824972212552622244951155374737807007977164752897468651645728779295243685450894444209001253691416521514017997335439_<131> (Serge Batalov / GMP-ECM B1=3000000, sigma=4234683406 for P34 / January 9, 2015 2015 年 1 月 9 日) (Cyp / GMP-ECM 6.4.4 B1=11000000, sigma=2786387952 for P40 x P131 / June 12, 2015 2015 年 6 月 12 日)

673×10²²⁵-79 = 74(7)₂₂₅_<227> = 37 × 53 × 2109875792607169_<16> × 1661669848510193075977_<22> × 10876604385641007322609807956310954387846575196443165252980172337063353110800973808325805590598865750448659392470560727157953694621031758142686707339780412701071996294544262979548810705089_<188>

673×10²²⁶-79 = 74(7)₂₂₆_<228> = 3³ × 124881767205771482792742436841895147681568323971948769778430625100819734390198087003526730120139402578213_<105> × 221773553263336942414900759456495594744882404919240471493419175606722672024700045142654747270177210138402652466950406135527_<123> (Bob Backstrom / Msieve 1.54 snfs for P105 x P123 / November 15, 2018 2018 年 11 月 15 日)

673×10²²⁷-79 = 74(7)₂₂₇_<229> = 59 × 3227948937158329_<16> × 5596243106522693_<16> × 368278031779703497_<18> × 205537292398150555957_<21> × 31849343883731961786096761_<26> × 1116088374820347184703863246337111540404247497_<46> × 2607544900888147889827843020891816272598018901217589636625485005318344070297619997864043_<88> (Erik Branger / GGNFS, Msieve gnfs for P46 x P88 / March 12, 2015 2015 年 3 月 12 日)

673×10²²⁸-79 = 74(7)₂₂₈_<230> = 37 × [2021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021_<229>] Free to factor

673×10²²⁹-79 = 74(7)₂₂₉_<231> = 3 × 71 × 22807 × 204813353 × 27862230117737_<14> × 26974328771822266544561933212053983862036343147359879831644520184309114564059042693461255194102703378973168275411160063767402374355336434936999505167774579975394082512484400913259282847150478855056811627_<203>

673×10²³⁰-79 = 74(7)₂₃₀_<232> = 67 × 107 × 111599129 × 333200003 × 147512807283208538863_<21> × 1687219586165051795191_<22> × 8025972305585242426688750407_<28> × 14042653489808483168065795509370386521841525670613944043979681337928871581129767638819893212142406670849448421590186794509139866480224733483389_<143>

673×10²³¹-79 = 74(7)₂₃₁_<233> = 19 × 37 × 1950881 × 7984997129351115271_<19> × 6828285737070487453823054424548557586667465736788024013405882748713766238132286253418273115936871966214939160148176985557317136142196316980259173011804044964526544687016882984772890516172190303370796888409_<205>

673×10²³²-79 = 74(7)₂₃₂_<234> = 3 × 17 × 55743157 × 4194019895083_<13> × 177131116861565767_<18> × 25309508246323277511131_<23> × 13989486164766015945881286021575385049288949953237160891335722220065243597471237688826934752014540252300210804020527904210464490254740622527834244030177741360814608901862721_<173>

673×10²³³-79 = 74(7)₂₃₃_<235> = 47 × 569 × 33716999 × 544630453 × 20532199233462828481674374657_<29> × [741610937656189882695713681965645177211820610033034924051120812366840130902605554545286869353785302789755254943300617406155260403026125991739386449212900186244668307060808887001957340941_<186>] Free to factor

673×10²³⁴-79 = 74(7)₂₃₄_<236> = 29 × 37 × 43 × 2749 × 28840471103_<11> × 10713735157855943400386876893510423_<35> × 64056164708818778504262564891647898841_<38> × 213653909256557535257487527915904963661_<39> × 139416637779991120764628235325605957740047471479960688877793240023979132907177655182250715446911329796803003_<108> (Serge Batalov / GMP-ECM B1=3000000, sigma=257686143 for P35 / January 9, 2015 2015 年 1 月 9 日) (Cyp / GMP-ECM 6.4.4 B1=11000000, sigma=3130090853 for P38 / June 29, 2015 2015 年 6 月 29 日) (Robert Balfour / CADO-NFS for P39 x P108 / April 7, 2020 2020 年 4 月 7 日)

673×10²³⁵-79 = 74(7)₂₃₅_<237> = 3² × 23 × 461 × 1031 × 36943 × 2070650563215808971324980120807501241709_<40> × 99358183704468597002360825399816998871810055527107579788888225676642356316879985111531863834894415658272819451525317034760264256670555096975000024247897114385534243326925791109391491183_<185> (Cyp / GMP-ECM 6.4.4 B1=11000000, sigma=2143241433 for P40 x P185 / January 28, 2015 2015 年 1 月 28 日)

673×10²³⁶-79 = 74(7)₂₃₆_<238> = 22669 × 10602917565467_<14> × 7963344253166221567_<19> × [3906783248127632528649371878421367138193145454175568011727908789367141259661379199683831738079675517001358064676255879340548460604029629490349347136312967915320018169686127026378059618226401661710665297_<202>] Free to factor

673×10²³⁷-79 = 74(7)₂₃₇_<239> = 37 × 887 × 158223990443_<12> × 5698911025097_<13> × 157041848414815123_<18> × 277396597694536878046077179351_<30> × [58005139096256482033611857530414866028779307457671781544688198039624554209231157993226059245892261565782331820774960700642566928595294127307087406182634955257686101_<164>] (Serge Batalov / GMP-ECM B1=3000000, sigma=821290766 for P30 / January 9, 2015 2015 年 1 月 9 日) Free to factor

673×10²³⁸-79 = 74(7)₂₃₈_<240> = 3 × 53² × [88735941352530886172751605289875136795749113299843096923908600661893648721701409490658333662961644449718497422306607069868016824228999380298775101195891512730245375314795037116147831704969476418390622733805361074851996888308743061324051_<236>] Free to factor

673×10²³⁹-79 = 74(7)₂₃₉_<241> = 13249 × 2880926454237200134187_<22> × 12477926297439016693649374923159696929_<38> × [15700550028810000724631450377423097634603453050000862238869434016223179146666225306383739699141978044641584450930095232619468960637935294081911858067702322362017312881385257139251_<179>] (Serge Batalov / GMP-ECM B1=3000000, sigma=1697313941 for P38 / January 9, 2015 2015 年 1 月 9 日) Free to factor

673×10²⁴⁰-79 = 74(7)₂₄₀_<242> = 37 × 139 × [14539719575690798712381446194395834683604467777129647633244755546913820295115259144036122453388640439000151230367057705187201590079287921014539719575690798712381446194395834683604467777129647633244755546913820295115259144036122453388640439_<239>] Free to factor

673×10²⁴¹-79 = 74(7)₂₄₁_<243> = 3 × 600109 × 2894911 × 22725518807915640881_<20> × 30478877193399190575985479809997217_<35> × [207144388488569191809864363408462582735471251196901333914556004028422893639543672526880895252690834806167275319528355236353568311634979225573443962400850599212420438076995006633_<177>] (Cyp / GMP-ECM 6.4.4 B1=11000000, sigma=1320580411 for P35 / February 6, 2015 2015 年 2 月 6 日) Free to factor

673×10²⁴²-79 = 74(7)₂₄₂_<244> = 509 × 16146851158483_<14> × 909843989566466481142720763230184933567439092337508529416091186221821406635071846236244247453056484713362817609265640067931835791954777384245598596883861108804283278658226126641892391427317122514104161934563279923526249591077191_<228>

673×10²⁴³-79 = 74(7)₂₄₃_<245> = 37 × 3416041362901943_<16> × [591626624598056470591170837751293194706670645724957231593355607819486081514691649743969197986542474037363527204369737137781813309835057839943232937847870729429329126403986328771165031253556033270622597252034053031389984418967947_<228>] Free to factor

673×10²⁴⁴-79 = 74(7)₂₄₄_<246> = 3² × 3763707930051830589721_<22> × 4825516448978111261445409_<25> × [4574781233465475984432468401482774152558019909366795099882473393139032948826539928235263391590138032245602642929112063814154348533768812763369386701678911821984506921558907717621866726335343229841777_<199>] Free to factor

673×10²⁴⁵-79 = 74(7)₂₄₅_<247> = 75401 × [99173456290735902412140127820291213349660850357127594830012569830344130419726234105353745676818315112236943512390787625864083735995249105154809323189052900860436569512045964612906695902942637070831657110353679364700438691499818010076494711977_<242>] Free to factor

673×10²⁴⁶-79 = 74(7)₂₄₆_<248> = 37 × 431083661 × 512909021 × 314719305534723961_<18> × [29043272290998737592679829024903753009215972456893806008870099005950080827833056476652156452094659789646592308052565266994576092511094447024213690977822222853386552774330258872416761913791397584475297619556331181_<212>] Free to factor

673×10²⁴⁷-79 = 74(7)₂₄₇_<249> = 3 × 83 × [3003123605533244087460954930834448906738063364569388665774207942882641677822400713966979027219991075412762159750111557340473003123605533244087460954930834448906738063364569388665774207942882641677822400713966979027219991075412762159750111557340473_<247>] Free to factor

673×10²⁴⁸-79 = 74(7)₂₄₈_<250> = 17 × 227 × 1297 × 2029 × 79063 × 299660188938317105154866854081_<30> × 1796837584757082699035551805701_<31> × 17296753311192257097150304895444519650760446131643275571498880453513395071246164014800633712533449075628800144245128564103886740361226599619939809353100672700010219163883914077_<176> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=1570397940 for P30 / December 21, 2014 2014 年 12 月 21 日) (Serge Batalov / GMP-ECM B1=3000000, sigma=3261986087 for P31 x P176 / January 9, 2015 2015 年 1 月 9 日)

673×10²⁴⁹-79 = 74(7)₂₄₉_<251> = 19 × 37 × 68669 × [1549018151162227513235514241100918916925680109251030320907098216402729049591074974474056722922563710293713336532780838837889019883346596312149603261581316491560982486559108508337111453050538411204489746021165622901179664324912582955935085257211_<244>] Free to factor

673×10²⁵⁰-79 = 74(7)₂₅₀_<252> = 3 × 421 × 5526694901331839_<16> × 3228338836154312969340819323_<28> × [33183684332957142824373177781596842589682755873040155328518426265550954502188680039866082510673876194273369746734715304307614480943193180048107695256132018242013617270437331012884743846195043440692346356307_<206>] Free to factor

673×10²⁵¹-79 = 74(7)₂₅₁_<253> = 53 × 11474161508077_<14> × 300461262877951943_<18> × 5237867071498238680585877_<25> × 396837991263132586024396757803799_<33> × [19688812496818569949805402300823452576001745107786528641807126133087649354626020161240916753490138649692379539544684688355299960632256293254599522155189910446075453_<164>] (Erik Branger / GMP-ECM B1=3e6, sigma=3:1993622058 for P33 / December 16, 2018 2018 年 12 月 16 日) Free to factor

673×10²⁵²-79 = 74(7)₂₅₂_<254> = 37 × [2021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021_<253>] Free to factor

673×10²⁵³-79 = 74(7)₂₅₃_<255> = 3⁴ × 99006954330254587_<17> × [93244201677139535872994892979512781660616913429863728520565251960350891804402168470785410555969077343803264057758546633966161243582734122127106605485244076436746273135625856658582613399848373998155318721886995678739377033437732398611091_<236>] Free to factor

673×10²⁵⁴-79 = 74(7)₂₅₄_<256> = 18371 × 106653254293_<12> × 2299598139941_<13> × 40565472854862976991_<20> × [40912607047859097928686570858805556215257307580812994575377293891024207416545431170145512943843663872547627888478772719783308335949503688804400662202929038144604038632194528942466067213345189589884220597436989_<209>] Free to factor

673×10²⁵⁵-79 = 74(7)₂₅₅_<257> = 37 × 43 × 317 × [148266526375249139536425869050034555133227277604065807425795687845427409656006237328223976305555059865088476342236154428950261977919523220675007044312304381264839044899201894286627615070135794954223536132420293523660848141810653732009465264545596142691_<252>] Free to factor

673×10²⁵⁶-79 = 74(7)₂₅₆_<258> = 3 × 2418943 × [103044701449872634146095736550741071310592791669443744337613271275618838169919365300984462742304907250505389857991386840971142874908279880616971652188273663025238403409778262348165814266503699863642615497454573861086953789014151742831170167820928091013_<252>] Free to factor

673×10²⁵⁷-79 = 74(7)₂₅₇_<259> = 23 × 1531 × 23599 × 172735471 × 2293270350649266408317_<22> × 106061610592920413985431_<24> × 214180991811148666075338820120042321355114007886420910188075733526300160568212088334704152822166370907359605222052960940750281575307355066075099470596488120127045056858911652806498245068475603121263_<198>

673×10²⁵⁸-79 = 74(7)₂₅₈_<260> = 37 × 2021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021021_<259>

673×10²⁵⁹-79 = 74(7)₂₅₉_<261> = 3 × 193 × 144576032954766632064709_<24> × [8933007264369461680165603283153577320067294519520390331502316314543245712511555356276539846739161388082867518688361647948441327942387382582053151150458709337329178472836722874936384679096275490947825170652121612065769729281273510110207_<235>] Free to factor

673×10²⁶⁰-79 = 74(7)₂₆₀_<262> = 722159 × 937086497 × 23070392520433_<14> × 2801159041043681_<16> × 43360147873156665136614102239538984881_<38> × 50964037867273594355300469234365590378439_<41> × 487280273430001319312165637696596186480239_<42> × 158793924121612311800867051173405655263134775896788844577765965186276988244125648022535462250325063_<99> (Erik Branger / GMP-ECM B1=3e6, sigma=3:3053140393 for P38 / December 16, 2018 2018 年 12 月 16 日) (Dmitry Domanov / GMP-ECM B1=11000000, sigma=2589332108 for P42, B1=11000000, sigma=3364377937 for P41 x P99 / December 23, 2018 2018 年 12 月 23 日)

673×10²⁶¹-79 = 74(7)₂₆₁_<263> = 37 × 11483 × 19477 × 20431 × 96959 × 14397127 × [316839861284670378890394721576922648048779416215109897978271012135136048589858106349594252919244278799358293253509662853926803863519296495396696905018189567687891036802806329311506723403529587698387731220156276358525255540023488837834157_<237>] Free to factor

673×10²⁶²-79 = 74(7)₂₆₂_<264> = 3² × 29 × 62753 × 32692619 × 21436905940474043924627_<23> × [65145697613792428174931908370137566347249536377073874687632025181388909818510986333589983117340565539363000411523132961821581200145470517399255527570292988771917989680798338914824619062212069443837429974368726189710322165595213_<227>] Free to factor

673×10²⁶³-79 = 74(7)₂₆₃_<265> = 67 × 71875061 × 6135041897_<10> × 253105739160080180629609741251532218219901316978399966001230691634729993279967155904713497233694629304243529108105920752779538575445651400059131182319482852564925381003863610217107049616640319549706465435966649381769368268713911276851517144273943_<246>

673×10²⁶⁴-79 = 74(7)₂₆₄_<266> = 17² × 37² × 53 × 71 × 3296601881_<10> × [15235985247619257016854427405106527828304605695852669947576885751513430423501786596896839995217390746670585654828733870044864791766475350446377902412948326112927864511354966693154357663748890777889710006138970663828382493635036044238006050142398299_<248>] Free to factor

673×10²⁶⁵-79 = 74(7)₂₆₅_<267> = 3 × 4951 × 17761 × 97865451674158753308246126859669367171_<38> × [28964201132620885913359448085370093791262069155454921768447953651835723499990431209761264782318458031644908779557858094236377314977188538607152740958622301321397011204089759200030856476222458393058644361768571126175180639_<221>] (Erik Branger / GMP-ECM B1=3e6, sigma=3:4206601866 for P38 / December 16, 2018 2018 年 12 月 16 日) Free to factor

673×10²⁶⁶-79 = 74(7)₂₆₆_<268> = 173 × 3673 × 42709 × 52963422306235734383_<20> × 175728749406172580659558951869049_<33> × [29605149752499282151468951498907737013698182547904480505327958191143319456575769861009629414629711674765578652097936449180908221838954242372337766585250796947219915870396560808689235933413350957684544464671_<206>] (Erik Branger / GMP-ECM for P33 / December 16, 2018 2018 年 12 月 16 日) Free to factor

673×10²⁶⁷-79 = 74(7)₂₆₇_<269> = 19 × 37 × 4049 × 26270567404830575723973703981763151668651402178848851841533595312956038801276741768871079552079409094136577205821073702681897037878371800977772562699315243803161547633866984973820969713392793815510275714874641185231194460243868154853323380965033874784170503711391_<263>

673×10²⁶⁸-79 = 74(7)₂₆₈_<270> = 3 × 947 × 4919 × 7346993732921447711280392696899923773_<37> × 7283075785512792382516560810054660988251967823677325172895078653559030297184927696718646644813404523477919833572253026069519850370078955721328191928443692303840035594291744753720184204066498838522302748868140165690798984915931_<226> (Erik Branger / GMP-ECM B1=3e6, sigma=3:366328618 for P37 x P226 / December 16, 2018 2018 年 12 月 16 日)

673×10²⁶⁹-79 = 74(7)₂₆₉_<271> = 857 × 35158638287_<11> × 3662563456066995451_<19> × [67760176530422115399304772165927465215540928585211856076499936664736914121448815673598562211450907131020178613290497374108190439563371255752409762419471622154548798937544889149736148168473389539776645257330081519779339264234267825335095253_<239>] Free to factor

673×10²⁷⁰-79 = 74(7)₂₇₀_<272> = 37 × 156631 × 10305182977_<11> × 11581434395642527571_<20> × 108112286185415859951467623925319599357840665522059446049928301594048344164278425649046367572065297896354987968152228612319753447037051198598007301648863078154924609276491239699277674114501068236497838728878771648678919964790396226347273_<237>

673×10²⁷¹-79 = 74(7)₂₇₁_<273> = 3² × 149 × 220793 × [2525564570473854196546220499619064367438164385715784010426067933017841083106461548988486490385659590386367836748010526944911222628259077038462055886182917574574762746935025967759219858012707310212537227736488493456328057721280650658325725858130991545202762769347629_<265>] Free to factor

673×10²⁷²-79 = 74(7)₂₇₂_<274> = 911 × 101183231521501969330411_<24> × 81123304367160326139648081155676881191165991216947195632341724872642161319790844785400542289488920277322693372646589914907817045585575059601692915385189987490091909150608889792985275017760985894153909513428129241132501373648257904578339313342130237_<248>

673×10²⁷³-79 = 74(7)₂₇₃_<275> = 37 × 511288954538777_<15> × 1847445350370051389_<19> × 646831463592078811026766876109_<30> × [3307818583331351102031029927603758554798008715025020312273204079853124138083101275084073494475233770454852368929431105254384062798357541995903319752604145796026090428228401581223626782633178411764922941844929773_<211>] (Erik Branger / GMP-ECM B1=3e6, sigma=3:423710981 for P30 / December 16, 2018 2018 年 12 月 16 日) Free to factor

673×10²⁷⁴-79 = 74(7)₂₇₄_<276> = 3 × 2069 × 45039537029476877_<17> × 492671789640689518289014269766745292623_<39> × 5429241954223780587420989495045505032390641819159451204993691495639528797434818337651258448794378535957146415886408028639070243963011051543946867381993349456165020528639497828720984006672069971139484788539938898054341_<217> (Erik Branger / GMP-ECM B1=3e6, sigma=3:2913787571 for P39 x P217 / December 16, 2018 2018 年 12 月 16 日)

673×10²⁷⁵-79 = 74(7)₂₇₅_<277> = 102370645687_<12> × 120783845437_<12> × 604767243337382593131684484594583557276905812490044091923808927783680877672987878270413156677528010088836337054827279716105147241276587184877256591818403924697600570548601536938258664609477987503475818068717873603349963435420829403151684259528401688928483_<255>

673×10²⁷⁶-79 = 74(7)₂₇₆_<278> = 37 × 43 × 61 × 11827 × 7401854428667_<13> × [8801514396666941720758755673858146691862242895547704619659207413895874353393961863615010576403347828752235373733102975230866830696370868716686023093356986685879343412882405744665031497103448486570057164461466363018067060634381942143375493068343676560290403_<256>] Free to factor

673×10²⁷⁷-79 = 74(7)₂₇₇_<279> = 3 × 53 × 1319 × 573471617 × 1315321571_<10> × 108625554299_<12> × [43516580219859493680403297316908794046443422346932810708281065777497396210941742971861441531016526302122292314233003834626139623296575519523357954972366663881295620755330436221992784142054924980971549595681044687425552109217739750175106693836009_<245>] Free to factor

673×10²⁷⁸-79 = 74(7)₂₇₈_<280> = 25494733441273_<14> × 5989035291790050273203919051999736813_<37> × [48973958279214156475540946779874541058942241388691419023854420010738283712779827622851074759956610104388605201378834610818627984444262684272153613384015535345359926868837978070310893707897413841939266016684971419452383763824952573_<230>] (Erik Branger / GMP-ECM B1=3e6, sigma=3:3624691340 for P37 / December 16, 2018 2018 年 12 月 16 日) Free to factor

673×10²⁷⁹-79 = 74(7)₂₇₉_<281> = 23 × 37 × 47 × 177337190809_<12> × 5503782966420511_<16> × 1022470564747073860282496036033723_<34> × [1873411570546770205607737721736089577178054894640854327363774993764588804373322109081389448851035132157565829011765136566420630997435404698446754614622489486207276458765953894771442531648591305850533225440206111609033_<217>] (Erik Branger / GMP-ECM B1=3e6, sigma=3:112596499 for P34 / December 16, 2018 2018 年 12 月 16 日) Free to factor

673×10²⁸⁰-79 = 74(7)₂₈₀_<282> = 3³ × 17 × 85793340553_<11> × 9556702381661_<13> × 45150134059814617_<17> × 2307952883332639376011_<22> × 37482669907642046189371822523_<29> × 2044111977307326368470589907519897333074260853_<46> × 248872577518922566372719997695590896499141847126592191008644130971571154488549873190184239379159869163778548113281900666751475363758480768106747_<144> (Dmitry Domanov / GMP-ECM 7.0.5 B1=43000000 for P46 x P144 / April 15, 2024 2024 年 4 月 15 日)

673×10²⁸¹-79 = 74(7)₂₈₁_<283> = 1901 × 1387039779490583_<16> × 869184866890102417_<18> × 3262791821293982457657096529828485472428770319049986902879273587617563554148844985452291885157191293402810972940728904140915412487711330100827456089512021486447092139969749410733335763519371958003071021076150474495655144908109553172346218592120707_<247>

673×10²⁸²-79 = 74(7)₂₈₂_<284> = 37 × 1291 × 24419 × [64108662101063606551533265024039261786157266873496242323686788351562061282390866638304594469380756449000123712285633411609619200760801745850752622504590605771737694350430448900329673098423822652257869352252023185239244187386465518162499938414485279919933238264264481643115549_<275>] Free to factor

673×10²⁸³-79 = 74(7)₂₈₃_<285> = 3 × 107 × 6917 × 216371 × 152681965431870877_<18> × 17716008642582172644831197477_<29> × [575436053911183165015933444362363112725836045925609701450187651317155594425203550609423153576372114414175553110618496801502541333663391947670902565508329974033961896652740662684627274764096243469135647597540859553788472725719679_<228>] Free to factor

673×10²⁸⁴-79 = 74(7)₂₈₄_<286> = 1665427 × 8815269867920664713188285026628134523_<37> × [509344172175245057077313978969046151074484885476503197785524218495187630287414641046160893338317981246637593809654366878372288094758845506082544869862484647128844233914906873029791925720133253255511450241586508223878479800241879795070855945937_<243>] (Erik Branger / GMP-ECM B1=3e6, sigma=3:2036155076 for P37 / December 16, 2018 2018 年 12 月 16 日) Free to factor

673×10²⁸⁵-79 = 74(7)₂₈₅_<287> = 19 × 37 × 59 × 861698702344097660265829_<24> × 2824417102398982660909991_<25> × [740765839546095766922111566063983601507282168678536533985039018577834662959324619245117790347002868174796261637959710302515651341798243501615857752940563752977236652226731587619394349941497353077294850501528400274058892240178918268959_<234>] Free to factor

673×10²⁸⁶-79 = 74(7)₂₈₆_<288> = 3 × 139 × [1793232081001865174527045030642152944311217692512656541433519850786037836397548627764455102584598987476685318411937116973088196109778843591793232081001865174527045030642152944311217692512656541433519850786037836397548627764455102584598987476685318411937116973088196109778843591793232081_<286>] Free to factor

673×10²⁸⁷-79 = 74(7)₂₈₇_<289> = definitely prime number 素数

673×10²⁸⁸-79 = 74(7)₂₈₈_<290> = 37 × 83 × 443 × 1889 × 13735820102364580225565279_<26> × 1697509759564579136259217882256603_<34> × 1247929870361681351104774564319788545109861046287128742365082383677323943461479023564390139601164294998742264659926575879610965575807963372879133302221689152786877266223050145986927863534490086175688435212516119320357792313_<223> (Erik Branger / GMP-ECM B1=3e6, sigma=3:1073197683 for P34 x P223 / December 16, 2018 2018 年 12 月 16 日)

673×10²⁸⁹-79 = 74(7)₂₈₉_<291> = 3² × 6443837 × 598230769572662801_<18> × [21553447811311376513690682817767314222119821159010890981927221124507659558603067461789008046325320736378173357023167565820027677783442319146083888106959224819429688058350161801636760766217694063073773814121034118524749775082101609473979308798111728795710800462761869_<266>] Free to factor

673×10²⁹⁰-79 = 74(7)₂₉₀_<292> = 29 × 53 × [4865177474156003759126725945203498879491072074025880141690161208703824188534663485867129328417552230174221065567845008313453336224969276368105255548326465697968625750018072724643967324513843707077278970577604279621195691462444878189835899660232776693414299139738306947155353141039543121521_<289>] Free to factor

673×10²⁹¹-79 = 74(7)₂₉₁_<293> = 37 × 113 × 157 × 863 × 8039 × [16420255498772524875318808015094150478330777812334468662605871770495169221742613329560426807313024659083935259852897558561251567831731607919554496143838608526979342379090989383166903388692143938266075317412312768759376011179236540835898146314397586621839816300289656289670662550233_<281>] Free to factor

673×10²⁹²-79 = 74(7)₂₉₂_<294> = 3 × [249259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259259_<294>] Free to factor

673×10²⁹³-79 = 74(7)₂₉₃_<295> = 481124538402395656672163756231143_<33> × [15542291404650051795557128212990880008689048739114784296170353874619755150170972137742180867675453729834003425078610973050147908930266176687100275042126748373809370603784150759012080939216722343515718859092286679840359397110181092664261659268208761427307790142439_<263>] (Erik Branger / GMP-ECM B1=3e6, sigma=3:1504605130 for P33 / December 16, 2018 2018 年 12 月 16 日) Free to factor

673×10²⁹⁴-79 = 74(7)₂₉₄_<296> = 37 × 9296179 × 25259719 × 30660858612902526201412161682919270759_<38> × 280707182868961125024710308486077363154732264833432127075299967687251788480194668538696544007973927479046822015756895042404641620315913481033465995315961598899449216341314948318462296224432956679811520920133930274992735950820598926713543917119_<243> (Erik Branger / GMP-ECM B1=3e6, sigma=3:675651006 for P38 x P243 / December 16, 2018 2018 年 12 月 16 日)

673×10²⁹⁵-79 = 74(7)₂₉₅_<297> = 3 × 23603 × 280937325186956287_<18> × 37590201220819118060088043999015627440519949576700502812878054949798205319798231768768554335603794207746609080780576686998515759653164583887147246082597111718845632316449319989737322279903607813723826342412082815550354460297003270270723582473793880817319338650171016014614119_<275>

673×10²⁹⁶-79 = 74(7)₂₉₆_<298> = 17 × 67 × 31219 × 682967 × 8342596300867_<13> × [36908712410179582689935051061842491147605931257792641579679560956698858332307864251222792595720646259067829289111352054723093782860246463066269922404897312007123322585062242064140635747519540577975639189622327070640453281668188763065860880437380689294932556388336859312373_<272>] Free to factor

673×10²⁹⁷-79 = 74(7)₂₉₇_<299> = 37 × 43 × 557 × 11013439 × 641226127 × [11948489869968660974181426607098075774380836915653890160182555131623167864067771529599535435166588508076640281021315572200215928254695041751359697296413677677590300396405137428656736322447463250262471633305831858644645781604743077873979101186075913072018889855518322367804775107_<278>] Free to factor

673×10²⁹⁸-79 = 74(7)₂₉₈_<300> = 3² × 727 × 114286684667244043676872654405896038174809380678248170224327950141797001035882283016625061558578294020751609013874029921714470086776368298605804337120247253213782328867152342622310526941430196817633773158761696129875863942805712636065685125749316487509976735102824052846978110618642484758945098239_<297>

673×10²⁹⁹-79 = 74(7)₂₉₉_<301> = 71 × 2648022701_<10> × 14854480884665910548761011923_<29> × 2677534176320075170154496590688123647115946165486316288638565369477701465910463436217745860619452666015521151711309351321849520186996546197374303093256681059879303242175354745697865039020765571014504579226207829762915433022097227381256953379166180225074436442769_<262>

673×10³⁰⁰-79 = 74(7)₃₀₀_<302> = 37 × 233 × 18056285465530193830027765439353_<32> × 111368650192400959467454833212072648341_<39> × [4313437816280993171542346063280570498394360183851384850780051310678506276933491483557207651311947366865827906135439985329482634366125076674443862494857943228305120569093387749783489575887864644125334175474367079734141286229093769_<229>] (Erik Branger / GMP-ECM for P32, B1=3e6, sigma=3:321265621 for P39 / December 16, 2018 2018 年 12 月 16 日) Free to factor

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4. Related links 関連リンク

A257030 - OEIS (The OEIS Foundation Inc.)