Factorization of 577...77

Table of contents 目次

About 577...77 577...77 について
Prime numbers of the form 577...77 577...77 の形の素数
Factor table of 577...77 577...77 の素因数分解表
Related links 関連リンク

1. About 577...77 577...77 について

1.1. Classification 分類

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

1.2. Sequence 数列

57w = { 5, 57, 577, 5777, 57777, 577777, 5777777, 57777777, 577777777, 5777777777, … }

2. Prime numbers of the form 577...77 577...77 の形の素数

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

52×10⁰-79 = 5 is prime. は素数です。
52×10²-79 = 577 is prime. は素数です。
52×10⁸-79 = 577777777 is prime. は素数です。
52×10¹⁴-79 = 5(7)₁₄_<15> is prime. は素数です。
52×10¹⁷-79 = 5(7)₁₇_<18> is prime. は素数です。
52×10¹⁸-79 = 5(7)₁₈_<19> is prime. は素数です。
52×10³³-79 = 5(7)₃₃_<34> is prime. は素数です。
52×10³⁵-79 = 5(7)₃₅_<36> is prime. は素数です。
52×10¹²⁶-79 = 5(7)₁₂₆_<127> is prime. は素数です。 (Makoto Kamada / PPSIQS / June 13, 2003 2003 年 6 月 13 日)
52×10¹⁸³-79 = 5(7)₁₈₃_<184> is prime. は素数です。 (Makoto Kamada / PPSIQS / June 13, 2003 2003 年 6 月 13 日)
52×10³²⁴-79 = 5(7)₃₂₄_<325> is prime. は素数です。 (Makoto Kamada / PPSIQS / June 13, 2003 2003 年 6 月 13 日)
52×10³⁴⁴-79 = 5(7)₃₄₄_<345> is prime. は素数です。 (Makoto Kamada / PPSIQS / June 13, 2003 2003 年 6 月 13 日)
52×10⁸⁶⁶-79 = 5(7)₈₆₆_<867> is prime. は素数です。 (discovered by:発見: Makoto Kamada / PFGW / December 23, 2004 2004 年 12 月 23 日) (certified by:証明: Tyler Cadigan / PRIMO 2.2.0 beta 6 / May 28, 2006 2006 年 5 月 28 日)
52×10⁹⁹²-79 = 5(7)₉₉₂_<993> is prime. は素数です。 (discovered by:発見: Makoto Kamada / PFGW / December 23, 2004 2004 年 12 月 23 日) (certified by:証明: Tyler Cadigan / PRIMO 2.2.0 beta 6 / May 28, 2006 2006 年 5 月 28 日)
52×10¹²²⁶-79 = 5(7)₁₂₂₆_<1227> is prime. は素数です。 (discovered by:発見: Makoto Kamada / PFGW / December 23, 2004 2004 年 12 月 23 日) (certified by:証明: Tyler Cadigan / PRIMO 2.2.0 beta 6 / September 12, 2006 2006 年 9 月 12 日) [certificate証明]
52×10²³⁵⁵-79 = 5(7)₂₃₅₅_<2356> is prime. は素数です。 (discovered by:発見: Makoto Kamada / PFGW / December 23, 2004 2004 年 12 月 23 日) (certified by:証明: Maksym Voznyy / Primo 3.0.9 / December 17, 2010 2010 年 12 月 17 日) [certificate証明]
52×10¹³³⁴⁴-79 = 5(7)₁₃₃₄₄_<13345> is PRP. はおそらく素数です。 (Erik Branger / PFGW / February 25, 2010 2010 年 2 月 25 日)
52×10⁷⁵⁰²⁷-79 = 5(7)₇₅₀₂₇_<75028> is PRP. はおそらく素数です。 (Bob Price / PFGW / December 30, 2014 2014 年 12 月 30 日)
52×10⁷⁷³²²-79 = 5(7)₇₇₃₂₂_<77323> is PRP. はおそらく素数です。 (Bob Price / PFGW / December 30, 2014 2014 年 12 月 30 日)

2.3. Range of search 捜索範囲

n≤30000 / Completed 終了
n≤50000 / Completed 終了 / Erik Branger / March 15, 2013 2013 年 3 月 15 日
n≤100000 / Completed 終了 / Bob Price / December 30, 2014 2014 年 12 月 30 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。

52×10^3k+1-79 = 3×(52×10¹-79×3+52×10×10³-19×3×k-1Σm=010^3m)
52×10^13k+3-79 = 53×(52×10³-79×53+52×10³×10¹³-19×53×k-1Σm=010^13m)
52×10^16k+9-79 = 17×(52×10⁹-79×17+52×10⁹×10¹⁶-19×17×k-1Σm=010^16m)
52×10^18k+1-79 = 19×(52×10¹-79×19+52×10×10¹⁸-19×19×k-1Σm=010^18m)
52×10^22k+15-79 = 23×(52×10¹⁵-79×23+52×10¹⁵×10²²-19×23×k-1Σm=010^22m)
52×10^25k+9-79 = 21401×(52×10⁹-79×21401+52×10⁹×10²⁵-19×21401×k-1Σm=010^25m)
52×10^28k+24-79 = 29×(52×10²⁴-79×29+52×10²⁴×10²⁸-19×29×k-1Σm=010^28m)
52×10^30k+11-79 = 211×(52×10¹¹-79×211+52×10¹¹×10³⁰-19×211×k-1Σm=010^30m)
52×10^33k+29-79 = 67×(52×10²⁹-79×67+52×10²⁹×10³³-19×67×k-1Σm=010^33m)
52×10^34k+26-79 = 103×(52×10²⁶-79×103+52×10²⁶×10³⁴-19×103×k-1Σm=010^34m)

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2.5. Difficulty of search 捜索難易度

The difficulty of search, percentage of terms that are not divisible by prime factors that appear periodically, is 19.90%. 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 19.90% です。

3. Factor table of 577...77 577...77 の素因数分解表

3.2. Range of factorization 分解範囲

n≤100 / Completed 終了 / June 13, 2003 2003 年 6 月 13 日
n≤150 / Completed 終了 / May 18, 2005 2005 年 5 月 18 日
n≤200 / Completed 終了 / July 9, 2021 2021 年 7 月 9 日
n≤300 / Remaining 49 残り 49

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

n=208, 210, 212, 214, 225, 226, 228, 231, 235, 236, 237, 242, 246, 247, 250, 251, 253, 254, 256, 257, 258, 261, 263, 264, 266, 267, 270, 272, 276, 277, 278, 279, 280, 283, 284, 285, 286, 287, 288, 289, 290, 291, 292, 293, 295, 296, 297, 298, 299 (49/300)

3.4. Factor table 素因数分解表

52×10⁰-79 = 5 = definitely prime number 素数

52×10¹-79 = 57 = 3 × 19

52×10²-79 = 577 = definitely prime number 素数

52×10³-79 = 5777 = 53 × 109

52×10⁴-79 = 57777 = 3 × 19259

52×10⁵-79 = 577777 = 373 × 1549

52×10⁶-79 = 5777777 = 463 × 12479

52×10⁷-79 = 57777777 = 3² × 571 × 11243

52×10⁸-79 = 577777777 = definitely prime number 素数

52×10⁹-79 = 5777777777_<10> = 17 × 15881 × 21401

52×10¹⁰-79 = 57777777777_<11> = 3 × 19259259259_<11>

52×10¹¹-79 = 577777777777_<12> = 211 × 2738283307_<10>

52×10¹²-79 = 5777777777777_<13> = 1021 × 25453 × 222329

52×10¹³-79 = 57777777777777_<14> = 3 × 19259259259259_<14>

52×10¹⁴-79 = 577777777777777_<15> = definitely prime number 素数

52×10¹⁵-79 = 5777777777777777_<16> = 23 × 71 × 1272827 × 2779747

52×10¹⁶-79 = 57777777777777777_<17> = 3³ × 53 × 90121 × 448017727

52×10¹⁷-79 = 577777777777777777_<18> = definitely prime number 素数

52×10¹⁸-79 = 5777777777777777777_<19> = definitely prime number 素数

52×10¹⁹-79 = 57777777777777777777_<20> = 3 × 19 × 691 × 1466925071159971_<16>

52×10²⁰-79 = 577777777777777777777_<21> = 1847 × 312819587318775191_<18>

52×10²¹-79 = 5777777777777777777777_<22> = 47 × 122931442080378250591_<21>

52×10²²-79 = 57777777777777777777777_<23> = 3 × 113 × 170435922648312028843_<21>

52×10²³-79 = 577777777777777777777777_<24> = 127 × 14723 × 309001651910946437_<18>

52×10²⁴-79 = 5777777777777777777777777_<25> = 29 × 21911333 × 41311603 × 220100987

52×10²⁵-79 = 57777777777777777777777777_<26> = 3² × 17 × 829 × 455527785880916276621_<21>

52×10²⁶-79 = 577777777777777777777777777_<27> = 103 × 29549683 × 189832594418483773_<18>

52×10²⁷-79 = 5777777777777777777777777777_<28> = 112069 × 1476649 × 25528579 × 1367638823_<10>

52×10²⁸-79 = 57777777777777777777777777777_<29> = 3 × 19259259259259259259259259259_<29>

52×10²⁹-79 = 577777777777777777777777777777_<30> = 53 × 59 × 61 × 67 × 83061359 × 544288655808047_<15>

52×10³⁰-79 = 5777777777777777777777777777777_<31> = 337 × 1103 × 30851 × 3255401167_<10> × 154768174571_<12>

52×10³¹-79 = 57777777777777777777777777777777_<32> = 3 × 89 × 17377 × 12453022469491352226053203_<26>

52×10³²-79 = 577777777777777777777777777777777_<33> = 1511 × 6619 × 57637 × 1002311287134103711169_<22>

52×10³³-79 = 5777777777777777777777777777777777_<34> = definitely prime number 素数

52×10³⁴-79 = 57777777777777777777777777777777777_<35> = 3² × 9239 × 21401 × 2374301 × 95557843 × 143105780689_<12>

52×10³⁵-79 = 577777777777777777777777777777777777_<36> = definitely prime number 素数

52×10³⁶-79 = 5777777777777777777777777777777777777_<37> = 43403 × 133119318429089643061027527539059_<33>

52×10³⁷-79 = 57777777777777777777777777777777777777_<38> = 3 × 19 × 23 × 44071531485719128739723705398762607_<35>

52×10³⁸-79 = 577777777777777777777777777777777777777_<39> = 379 × 769 × 90107926841_<11> × 104660835413_<12> × 210207443119_<12>

52×10³⁹-79 = 5777777777777777777777777777777777777777_<40> = 4834475167969_<13> × 10090709372633_<14> × 118437655630201_<15>

52×10⁴⁰-79 = 57777777777777777777777777777777777777777_<41> = 3 × 5457511663_<10> × 116589097627_<12> × 30268225861227630959_<20>

52×10⁴¹-79 = 577777777777777777777777777777777777777777_<42> = 17 × 211 × 1532261683169072423_<19> × 105122702222856737677_<21>

52×10⁴²-79 = 5777777777777777777777777777777777777777777_<43> = 53 × 109014675052410901467505241090146750524109_<42>

52×10⁴³-79 = 57777777777777777777777777777777777777777777_<44> = 3⁵ × 269 × 383 × 8219 × 982393 × 285824377899719312866530371_<27>

52×10⁴⁴-79 = 577777777777777777777777777777777777777777777_<45> = 80573292806815058387_<20> × 7170834871587972627132971_<25>

52×10⁴⁵-79 = 5777777777777777777777777777777777777777777777_<46> = 103993 × 13584481 × 19917785456324863_<17> × 205339559710965863_<18>

52×10⁴⁶-79 = 57777777777777777777777777777777777777777777777_<47> = 3 × 499 × 4691 × 3786647 × 2172795133202366621583279736194133_<34>

52×10⁴⁷-79 = 577777777777777777777777777777777777777777777777_<48> = 167 × 311 × 11124588978527403927407778227040024987538321_<44>

52×10⁴⁸-79 = 5777777777777777777777777777777777777777777777777_<49> = 151 × 38263428991905813097866077998528329654157468727_<47>

52×10⁴⁹-79 = 57777777777777777777777777777777777777777777777777_<50> = 3 × 12579517 × 1612753294349_<13> × 949309168657434994886148163123_<30>

52×10⁵⁰-79 = 5(7)₅₀_<51> = 71 × 3999323 × 22134974591_<11> × 22737205011977_<14> × 4042964233038616867_<19>

52×10⁵¹-79 = 5(7)₅₁_<52> = 947 × 25793 × 4963158993523_<13> × 47659645659062465985832863484169_<32>

52×10⁵²-79 = 5(7)₅₂_<53> = 3² × 29 × 914867 × 1415377 × 4285214882674981_<16> × 39894922502286662050483_<23>

52×10⁵³-79 = 5(7)₅₃_<54> = 955513411 × 84144942505299527_<17> × 7186145880695926587135960941_<28>

52×10⁵⁴-79 = 5(7)₅₄_<55> = 44281121579_<11> × 130479481362501145101760516944872250788247763_<45>

52×10⁵⁵-79 = 5(7)₅₅_<56> = 3 × 19² × 53 × 199 × 73415009 × 18043235514972930491_<20> × 3818599903699414294883_<22>

52×10⁵⁶-79 = 5(7)₅₆_<57> = 757988009 × 655999451358073_<15> × 1161970286796963340745457730038161_<34>

52×10⁵⁷-79 = 5(7)₅₇_<58> = 17 × 532267 × 897816067 × 2812083176118871_<16> × 252910486124572303983019399_<27>

52×10⁵⁸-79 = 5(7)₅₈_<59> = 3 × 1223527 × 11723009 × 1342724531579183561530595559863274488873995213_<46>

52×10⁵⁹-79 = 5(7)₅₉_<60> = 23 × 21401 × 290047 × 803287 × 7201279 × 5069913657253_<13> × 137990635375682383243093_<24>

52×10⁶⁰-79 = 5(7)₆₀_<61> = 103 × 23893 × 2347755823100391258022834724626978847758464325692245963_<55>

52×10⁶¹-79 = 5(7)₆₁_<62> = 3² × 257 × 6883 × 24097739 × 150602137408976999951290610744117133228479813417_<48>

52×10⁶²-79 = 5(7)₆₂_<63> = 67 × 163 × 331 × 5591 × 239957 × 119137235237883510255074535076232593403496176521_<48>

52×10⁶³-79 = 5(7)₆₃_<64> = 10211 × 10877381 × 33839521 × 1537248260559458848614051753278175694144391807_<46>

52×10⁶⁴-79 = 5(7)₆₄_<65> = 3 × 2521941838560707_<16> × 306552472064627279237_<21> × 24911489196978628138505889301_<29>

52×10⁶⁵-79 = 5(7)₆₅_<66> = 127 × 23590477 × 90788972325432740228337011_<26> × 2124160314224334926343205039433_<31>

52×10⁶⁶-79 = 5(7)₆₆_<67> = 773 × 863 × 29348388596934872025938603_<26> × 295111602027170337637953484230257641_<36>

52×10⁶⁷-79 = 5(7)₆₇_<68> = 3 × 47 × 409771473601260835303388494877856579984239558707643814026792750197_<66>

52×10⁶⁸-79 = 5(7)₆₈_<69> = 53 × 131 × 83217309200313665242370413045913550018403827996223214428601149039_<65>

52×10⁶⁹-79 = 5(7)₆₉_<70> = 5241829314960237707094389_<25> × 1102244546820312776304517941407067539120196493_<46>

52×10⁷⁰-79 = 5(7)₇₀_<71> = 3³ × 17874146211305838248351_<23> × 119721393692063474162305161895008666586931059901_<48>

52×10⁷¹-79 = 5(7)₇₁_<72> = 211 × 359 × 143137 × 13125467 × 750877415095646882134423_<24> × 5406898456896123287818235802769_<31>

52×10⁷²-79 = 5(7)₇₂_<73> = 5042573 × 110585286809_<12> × 10361229454050289674506272200399667187609057690132166461_<56>

52×10⁷³-79 = 5(7)₇₃_<74> = 3 × 17² × 19 × 38669 × 90703739972815143718088354008306320228943816942278536378768685821_<65>

52×10⁷⁴-79 = 5(7)₇₄_<75> = 5869 × 434289733 × 5516735288441172274111_<22> × 41089893607995099257309091869876970345391_<41>

52×10⁷⁵-79 = 5(7)₇₅_<76> = 89 × 1229 × 143971 × 53994130397_<11> × 6795123782789531691456723182359038626644836550892922091_<55>

52×10⁷⁶-79 = 5(7)₇₆_<77> = 3 × 32369 × 594467 × 56451955962511_<14> × 1647519579257818485491_<22> × 10761503894413366719189198995533_<32>

52×10⁷⁷-79 = 5(7)₇₇_<78> = 181 × 335519 × 2237773 × 4251567818375852506093951052196726303810608216516606800652292191_<64>

52×10⁷⁸-79 = 5(7)₇₈_<79> = 1483 × 11239 × 26476213 × 155162375569_<12> × 84381982672586022110470585942792296836399574528120593_<53>

52×10⁷⁹-79 = 5(7)₇₉_<80> = 3² × 374367359 × 798231529 × 141905078087_<12> × 151388726015774488496253175500940113899789002265929_<51>

52×10⁸⁰-79 = 5(7)₈₀_<81> = 29 × 1212923 × 391015372309_<12> × 232047655500053761_<18> × 181033350183536433605264488485898168648318819_<45>

52×10⁸¹-79 = 5(7)₈₁_<82> = 23 × 53 × 1059009695274338811102392585554489_<34> × 4475661083831491147014556405949828866815334547_<46>

52×10⁸²-79 = 5(7)₈₂_<83> = 3 × 827 × 1777319026401954601_<19> × 78892868001700622150011_<23> × 166085200659770374858287642520477269947_<39>

52×10⁸³-79 = 5(7)₈₃_<84> = 231962477 × 10848970217_<11> × 260748469823_<12> × 223277109782637184890493_<24> × 3943561420261229978393402119727_<31>

52×10⁸⁴-79 = 5(7)₈₄_<85> = 21401 × 10610641 × 164295284001391561539709803338765491_<36> × 154867414841796099417803887082624418067_<39>

52×10⁸⁵-79 = 5(7)₈₅_<86> = 3 × 71 × 13681 × 47726125457_<11> × 10981482347053_<14> × 37830862389931788281666661766089629561776088212821929729_<56>

52×10⁸⁶-79 = 5(7)₈₆_<87> = 97 × 5956471935853379152348224513172966781214203894616265750286368843069873997709049255441_<85>

52×10⁸⁷-79 = 5(7)₈₇_<88> = 59 × 409 × 12433 × 19517137 × 282916303 × 178094997787388788270133594123_<30> × 19583205192288188745951944693769983_<35>

52×10⁸⁸-79 = 5(7)₈₈_<89> = 3² × 6023369959_<10> × 1580717621359_<13> × 34640912021525709047_<20> × 19464137947362647190502012475361283983737806279_<47>

52×10⁸⁹-79 = 5(7)₈₉_<90> = 17 × 61 × 10657 × 52281388365647705423654137059942652746183983976719660791113322211674452119452797653_<83>

52×10⁹⁰-79 = 5(7)₉₀_<91> = 1787 × 6691 × 9817 × 6690247 × 263724113 × 307281207867435963317864967197_<30> × 90790094313344260828330034287832779_<35>

52×10⁹¹-79 = 5(7)₉₁_<92> = 3 × 19 × 2221 × 7409893 × 2977910582149_<13> × 20683014203655159921766990140382071401375296114389509027313956088613_<68>

52×10⁹²-79 = 5(7)₉₂_<93> = 36467 × 2928292527887_<13> × 15149982414053765260163_<23> × 357136476138628178117656460305510131709742876393123351_<54>

52×10⁹³-79 = 5(7)₉₃_<94> = 5735831 × 85668578612776721_<17> × 248398589382274575707_<21> × 47336244650558605822858644073856223642211453465861_<50>

52×10⁹⁴-79 = 5(7)₉₄_<95> = 3 × 53 × 103 × 136915496911_<12> × 80372459589803_<14> × 4692705643489103_<16> × 68319283950695706466047530081122153445919818405899_<50>

52×10⁹⁵-79 = 5(7)₉₅_<96> = 67 × 7213 × 9551 × 20113 × 15686131 × 1359837541_<10> × 291770605360543115706306294724162823313480526354341714063734761319_<66>

52×10⁹⁶-79 = 5(7)₉₆_<97> = 8619883 × 670284942124826726508675091967927845166550146652544794143699836503323511209813146858000019_<90>

52×10⁹⁷-79 = 5(7)₉₇_<98> = 3³ × 11913455419_<11> × 4882486044213573402295873_<25> × 2701245268880083982652835021_<28> × 13619284626233730310347354110669213_<35>

52×10⁹⁸-79 = 5(7)₉₈_<99> = 84288977 × 30353050489_<11> × 21348017854776694614109_<23> × 78639537271485774018999666677_<29> × 134520725298320437259542647913_<30>

52×10⁹⁹-79 = 5(7)₉₉_<100> = 179 × 26017 × 343257127 × 2374564485405339943_<19> × 2376716394887721017_<19> × 640427088105147918269292870117598646697449948147_<48>

52×10¹⁰⁰-79 = 5(7)₁₀₀_<101> = 3 × 1429 × 52013846180681913285720299537206519_<35> × 259112510218712445048525702580263310731723432818200529862258409_<63> (Robert Backstrom / NFSX v1.8)

52×10¹⁰¹-79 = 5(7)₁₀₁_<102> = 211 × 3863 × 21340144524163_<14> × 3460101688878664344586681_<25> × 9599916420747131205768935383654310344412907909802311405863_<58>

52×10¹⁰²-79 = 5(7)₁₀₂_<103> = 5948483 × 32205876097_<11> × 1932793619116627_<16> × 142534198989077557_<18> × 109474993744913507895972033895402634954137299003453493_<54>

52×10¹⁰³-79 = 5(7)₁₀₃_<104> = 3 × 23 × 542483 × 6182000311_<10> × 11094540841_<11> × 115652861104961_<15> × 194594639890041308706331105676621333631629031424395356637217441_<63>

52×10¹⁰⁴-79 = 5(7)₁₀₄_<105> = 4091 × 171011122129_<12> × 104409483761722619131_<21> × 7909828176564606629499151096422693186583490375365718442657542605694153_<70>

52×10¹⁰⁵-79 = 5(7)₁₀₅_<106> = 17 × 283 × 23735949331693223270431_<23> × 50596313058618817686039888851269753955954055168955972686762818076837305100012397_<80>

52×10¹⁰⁶-79 = 5(7)₁₀₆_<107> = 3² × 9524799773_<10> × 119302683737129_<15> × 1214516643934402824455104336716946385201_<40> × 4651668805091379483887786621168676355351109_<43>

52×10¹⁰⁷-79 = 5(7)₁₀₇_<108> = 53 × 127 × 3943 × 68824019003_<11> × 356240885798182013457559_<24> × 887913531943242690964009067360700278393601827643890006153672877097_<66>

52×10¹⁰⁸-79 = 5(7)₁₀₈_<109> = 29 × 370549133 × 4781840015829644548696579_<25> × 112440299267595136402138752774813563283147002298754154583982931651671056659_<75>

52×10¹⁰⁹-79 = 5(7)₁₀₉_<110> = 3 × 19 × 21401 × 858571284129153352367039_<24> × 55166515403936238954766416374571690203016758215196789235225497621829424159474399_<80>

52×10¹¹⁰-79 = 5(7)₁₁₀_<111> = 15791 × 765881 × 1734043 × 81736635084913_<14> × 337064711813437296719984351502414213818477156641433179543480600725727958446513093_<81>

52×10¹¹¹-79 = 5(7)₁₁₁_<112> = 109 × 1453 × 1723 × 150379 × 7333410855377_<13> × 19199513975109955653558572425033326402256529096033179932091697062511296298367542694289_<86>

52×10¹¹²-79 = 5(7)₁₁₂_<113> = 3 × 853 × 22578264078850245321523164430550128088228908861968650948721288697842038990925274629846728322695497373105813903_<110>

52×10¹¹³-79 = 5(7)₁₁₃_<114> = 47 × 68737 × 178843187919720457091546835711999322046746101244298040659379700974877656642471590845581254289871996771467743_<108>

52×10¹¹⁴-79 = 5(7)₁₁₄_<115> = 14057 × 146518010325593_<15> × 2805286210506949129373770965944104274869824167614270692272808502330431421437255853750094530616177_<97>

52×10¹¹⁵-79 = 5(7)₁₁₅_<116> = 3² × 149 × 13972747 × 15751233457_<11> × 195765290145959565750148880385720316111183374430512179329482555554664222702079721604344268304543_<96>

52×10¹¹⁶-79 = 5(7)₁₁₆_<117> = 1081153 × 294287166319_<12> × 55229660995211_<14> × 469354139791773985788071_<24> × 70053416877065299585386898058203695622855712835089631277926331_<62>

52×10¹¹⁷-79 = 5(7)₁₁₇_<118> = 16189 × 177211 × 4834852559_<10> × 134862510449_<12> × 3480789666185971967_<19> × 887355978154581842716010438658547545982916669273675162116332241659679_<69>

52×10¹¹⁸-79 = 5(7)₁₁₈_<119> = 3 × 2883770006635026225449549_<25> × 5848614691032790059526919_<25> × 1141894413153432936084075456225701442285357629332973814597860258381089_<70>

52×10¹¹⁹-79 = 5(7)₁₁₉_<120> = 89 × 6547 × 44401695721_<11> × 1261649828063_<13> × 8479592619703354082297012972049944781917_<40> × 2087445325589661664168369450690257430810427564543609_<52> (Robert Backstrom / NFSX v1.8)

52×10¹²⁰-79 = 5(7)₁₂₀_<121> = 53 × 71 × 419 × 19739490466243_<14> × 1227279797212489371909157653353692586057_<40> × 151263125442334610939196931165683423322159672814236639084655291_<63> (Naoki Yamamoto / GGNFS-0.41.4 / 4 hours)

52×10¹²¹-79 = 5(7)₁₂₁_<122> = 3 × 17 × 76527952888846873_<17> × 14803709765127487619468703387483487536425422123342891046726780629346523989870010670700644217720876692099_<104>

52×10¹²²-79 = 5(7)₁₂₂_<123> = 727 × 411119 × 34326541091370501393491790752141817728023093828339547_<53> × 56315614972351838954498824575900740272205844808950807812632507_<62> (Makoto Kamada / GGNFS-0.70.0 / 5.37 hours)

52×10¹²³-79 = 5(7)₁₂₃_<124> = 151 × 65670119 × 181368354226471_<15> × 3212584587572380340750834518231944067448254356333806394830103605439433740163273688854488392427112423_<100>

52×10¹²⁴-79 = 5(7)₁₂₄_<125> = 3⁴ × 293 × 277842659 × 24355455783257_<14> × 50408391850772438431203679_<26> × 3374735910808906095457422289280039_<34> × 2114805209658828165158357476070376552223_<40>

52×10¹²⁵-79 = 5(7)₁₂₅_<126> = 23 × 33199 × 189140663559977667679_<21> × 30070731661761949060757_<23> × 133039036908270675115875576834511385779651023982494366685655282750116182097867_<78>

52×10¹²⁶-79 = 5(7)₁₂₆_<127> = definitely prime number 素数

52×10¹²⁷-79 = 5(7)₁₂₇_<128> = 3 × 19 × 10709 × 9994091 × 4329722527558224072550073_<25> × 2187427638278767588023323914680046249820309131072503968456927021890449416892418798119254903_<91>

52×10¹²⁸-79 = 5(7)₁₂₈_<129> = 67 × 103 × 2081 × 52874113549174997_<17> × 589354625918674383253_<21> × 3161521622854831016219_<22> × 408376529480124620016615787061859021558691788201365479382407823_<63>

52×10¹²⁹-79 = 5(7)₁₂₉_<130> = 154409 × 15903185982991934289653_<23> × 2352903338374771512689750328090285779459605569858501555783549771932043052569929885054810849627848620101_<103>

52×10¹³⁰-79 = 5(7)₁₃₀_<131> = 3 × 439 × 98419 × 10067881308203_<14> × 44274944379674034344351844058913506196504034942270704392997498401771859527226710350746475827418930757164275533_<110>

52×10¹³¹-79 = 5(7)₁₃₁_<132> = 211 × 54639683519807_<14> × 944476919452537970177605023209405979475809411678581549459_<57> × 53061418313269019563666845242560398655598070802659505152439_<59> (Samuel Chong / GGNFS-0.77.1 / 9.27 hours on Pentium 3, 1.13GHz, 384MB RAM / May 17, 2005 2005 年 5 月 17 日)

52×10¹³²-79 = 5(7)₁₃₂_<133> = 17442282885463_<14> × 331251236762888245930232229455787791251600723618712634056807055862027209112866029517931465776188476782831544646589807479_<120>

52×10¹³³-79 = 5(7)₁₃₃_<134> = 3² × 53 × 507161535575400433388365477_<27> × 238833997115881069691548632721734130353784577435020569573433120826879103881898021999882972026521882938113_<105> (Tetsuya Kobayashi / GMP-ECM 5.0.3 B1=1000000)

52×10¹³⁴-79 = 5(7)₁₃₄_<135> = 113 × 21401 × 97117666918073_<14> × 2950265320624201_<16> × 9827130435253045429747763011768723_<34> × 84852040039259635923938051822061659838632591751201421054543493651_<65> (Tyler Cadigan / PPSIQS / 61:21:45:93)

52×10¹³⁵-79 = 5(7)₁₃₅_<136> = 215617 × 507675617 × 475037943625458441951949_<24> × 13211904979129240549403389_<26> × 8410034703945621004360499668004314178115109184419064132507984592687048313_<73>

52×10¹³⁶-79 = 5(7)₁₃₆_<137> = 3 × 29 × 630521 × 1113083 × 45267793 × 20903795821510558699288973144902824688700540220756091946740750704779963453863896227306470350050231186042951337452429_<116>

52×10¹³⁷-79 = 5(7)₁₃₇_<138> = 17 × 21092255101_<11> × 943450400877509381_<18> × 11305225507438309023348396485987063579_<38> × 151074301334662844595155052208063015057511047784279541687960209500181219_<72> (Samuel Chong / GMP-ECM 6.0.1 B1=3000000, sigma=653399910 for P38 / May 16, 2005 2005 年 5 月 16 日)

52×10¹³⁸-79 = 5(7)₁₃₈_<139> = 218288467390546054036499_<24> × 3707766113147792424168414786189831094066948320587_<49> × 7138676662676860357688100331726205343705275172333728441608783388129_<67> (Samuel Chong / GGNFS-0.77.1 / 17.37 hours on Pentium 3, 1.13GHz, 384MB RAM / May 16, 2005 2005 年 5 月 16 日)

52×10¹³⁹-79 = 5(7)₁₃₉_<140> = 3 × 20472013 × 42597380129480189454183205055817960792689265979756762838996143_<62> × 22084935811313758983846362561950714029638463802222315759047507219622601_<71> (Samuel Chong / GGNFS-0.77.1 / 11.71 hours on Pentium M, 1.8GHz, 1GB RAM / May 17, 2005 2005 年 5 月 17 日)

52×10¹⁴⁰-79 = 5(7)₁₄₀_<141> = 1128407803_<10> × 6286275241_<10> × 356947438147_<12> × 8005661431852798492398553348750679851731090314728794817_<55> × 28503610344096864232287570440735272746558672640479087001_<56> (Samuel Chong / GGNFS-0.77.1 / 11.55 hours on Pentium M, 1.8GHz, 1GB RAM / May 17, 2005 2005 年 5 月 17 日)

52×10¹⁴¹-79 = 5(7)₁₄₁_<142> = 148783 × 322569044293_<12> × 120388453425751259799622738847920245257576719190985724218648523321682564232255933906300689717736910268735561812685225118432083_<126>

52×10¹⁴²-79 = 5(7)₁₄₂_<143> = 3² × 431 × 16139 × 19417 × 47531585630653299372326662648191173808153297440578352239914765760440186814582134723739241510068241814811939417958681226659292679901_<131>

52×10¹⁴³-79 = 5(7)₁₄₃_<144> = 163 × 2617 × 4733 × 851991457 × 8667925780439851_<16> × 584455731065484537782713_<24> × 125889965470708780470086733497_<30> × 526671530019818401517049260674390169008114304609543901757_<57>

52×10¹⁴⁴-79 = 5(7)₁₄₄_<145> = 87474576061_<11> × 480495514382802389_<18> × 3924307085206602653466442605817_<31> × 35028913395220258969445205156955943580663708893079867110886710637775349419354904036089_<86> (Tetsuya Kobayashi / GMP-ECM 5.0.3)

52×10¹⁴⁵-79 = 5(7)₁₄₅_<146> = 3 × 19 × 59 × 3319928057_<10> × 972251695977166635036649_<24> × 5322633767519029347414563222122286741230679057918767461649260327206374173860467403356827251402706185427316603_<109>

52×10¹⁴⁶-79 = 5(7)₁₄₆_<147> = 53 × 126631 × 85962571 × 631459761977934293381057_<24> × 2142037134762324256832499675129124614771559_<43> × 740393939056520452153666798478006372560862505341587785632362025143_<66> (Samuel Chong / GGNFS-0.77.1 / 28.07 hours on Pentium M, 1.8GHz, 1GB RAM, with additional sieving on a Pentium 3, 1.13GHz, 384MB RAM / May 18, 2005 2005 年 5 月 18 日)

52×10¹⁴⁷-79 = 5(7)₁₄₇_<148> = 23 × 467 × 108316186367_<12> × 220273253359_<12> × 337378161931_<12> × 4208273355787308978065339_<25> × 15879619078378013191469036657869748592195928391475070719610825850041491268641523245461_<86>

52×10¹⁴⁸-79 = 5(7)₁₄₈_<149> = 3 × 3343 × 505033 × 88231709 × 2212585865983_<13> × 2478526946026081_<16> × 23575720606081997947952315856344101696309600528007664551579294628684219432762596161777396707551546651023_<104>

52×10¹⁴⁹-79 = 5(7)₁₄₉_<150> = 61 × 127 × 523 × 423061 × 16832243794990487_<17> × 1405742527016958541959699689_<28> × 67226748758879644967302995709_<29> × 343156546515091237037855140567_<30> × 617504895194380606684214867022111193_<36> (Tetsuya Kobayashi / GMP-ECM 5.0.3)

52×10¹⁵⁰-79 = 5(7)₁₅₀_<151> = 790448010127_<12> × 46547750638471_<14> × 14447140431035784716254423776982787208056721192529_<50> × 10869434012240476963127657425131912816905607200813492985282654831804960631289_<77> (Samuel Chong / GGNFS-0.77.1 / 31.03 hours on Pentium M 1.8GHz, 1GB RAM / May 16, 2005 2005 年 5 月 16 日)

52×10¹⁵¹-79 = 5(7)₁₅₁_<152> = 3³ × 2139917695473251028806584362139917695473251028806584362139917695473251028806584362139917695473251028806584362139917695473251028806584362139917695473251_<151>

52×10¹⁵²-79 = 5(7)₁₅₂_<153> = 1621 × 50957 × 2709042073446592170792934274741551206028921382492321254041066670097_<67> × 2582011769442852651209968987523621441279428819480352551729492154606092853851153_<79> (Tyler Cadigan / GGNFS-0.77.1-20060722-pentium4 / 62.87 hours on Pentium 4 3.20 GHz, 1 Gig RAM, Windows XP and Cygwin / January 30, 2007 2007 年 1 月 30 日)

52×10¹⁵³-79 = 5(7)₁₅₃_<154> = 17 × 2213 × 518990701259_<12> × 295917685975043969806491125539074192048757142149426355159064335326896553179898702179635375791755858797111757195678698617662509868791742343_<138>

52×10¹⁵⁴-79 = 5(7)₁₅₄_<155> = 3 × 199 × 569 × 4799 × 4922573 × 7199980520443774063215959664758072390041059476954013433887593629051448146727542404413672430147585189161121367148914776500564914691428738007_<139>

52×10¹⁵⁵-79 = 5(7)₁₅₅_<156> = 71 × 4243 × 17333 × 936195661381_<12> × 3711693141325814271569_<22> × 28952102340481043094473_<23> × 1099858772012175802582888931911165653889659854342156295254755351096778500510516404075150109_<91>

52×10¹⁵⁶-79 = 5(7)₁₅₆_<157> = 219147336769_<12> × 43392867949703635301629857402687959159726060863_<47> × 607583935024911523260847922586741220802757668680390878600315487487290409913946585708438696721115791_<99> (Robert Backstrom / GGNFS-0.77.1-20051202-athlon / 36.15 hours on Cygwin on AMD 64 3200+ / April 13, 2007 2007 年 4 月 13 日)

52×10¹⁵⁷-79 = 5(7)₁₅₇_<158> = 3 × 1554899 × 55976863 × 2880409003079_<13> × 5703944054850977326847_<22> × 17494352101884891652933_<23> × 300130362599315830916471_<24> × 2565025138176329934262037933764039575567504030586606002975226373_<64>

52×10¹⁵⁸-79 = 5(7)₁₅₈_<159> = 6427 × 108821 × 1390073129_<10> × 1713217732673841051560857_<25> × 5594556839230532242057415597_<28> × 62004601708628711975953747522682075366465679647921274170775368930075346101569532831927891_<89>

52×10¹⁵⁹-79 = 5(7)₁₅₉_<160> = 47 × 53 × 223 × 21401 × 11930407 × 342274385260147_<15> × 119019608620826326652645979452636287317276048490438588152972107199137273243582444073591010705277811055920099623186041682115726241_<129>

52×10¹⁶⁰-79 = 5(7)₁₆₀_<161> = 3² × 463 × 519089 × 3534467 × 10021089293_<11> × 950676786076955258023_<21> × 2129889557380638207851_<22> × 372448878790988995862768145661716972734083396702733683865605356375925455491809498424537665333_<93>

52×10¹⁶¹-79 = 5(7)₁₆₁_<162> = 67 × 211 × 399657043 × 41884981582841233_<17> × 303583120466432755281692462570253330795169293513976483517_<57> × 8042297897793284514496513202115956001841463193178478887769004032896132968527_<76> (Robert Backstrom / GGNFS-0.77.1-20050930-k8 snfs, Msieve 1.32 / January 8, 2008 2008 年 1 月 8 日)

52×10¹⁶²-79 = 5(7)₁₆₂_<163> = 103 × 381011 × 946681999961618639_<18> × 1221459109676013540068392985396141510503_<40> × 8438134055835129687391374189732897448405262542547_<49> × 15088866711043141207643579503789954343073186607831_<50> (Wataru Sakai / GMP-ECM 6.1 B1=11000000, sigma=399357264 for P40 / December 4, 2006 2006 年 12 月 4 日) (JMB / GGNFS-0.77.1-20060513-pentium4 gnfs for P49 x P50 / 10.37 hours / December 6, 2006 2006 年 12 月 6 日)

52×10¹⁶³-79 = 5(7)₁₆₃_<164> = 3 × 19 × 89 × 4463 × 2537021 × 55830371 × 1248226627_<10> × 6420478316845888866764229697079609081_<37> × 2248089943587469434480299083386367776545352478097162371514379969035559192349878360635205285279419_<97> (Robert Backstrom / GMP-ECM 6.0 B1=2948000, sigma=3616249863 for P37 / April 5, 2008 2008 年 4 月 5 日)

52×10¹⁶⁴-79 = 5(7)₁₆₄_<165> = 29 × 7019 × 6320886474787_<13> × 1253831070899856312688601931720582966577047750139261_<52> × 358154634908081150423440098044503617839531497495445248785010282856127665013429077944232929344361_<96> (Robert Backstrom / GGNFS-0.77.1-20060513-athlon-xp snfs, Msieve 1.30 / November 26, 2007 2007 年 11 月 26 日)

52×10¹⁶⁵-79 = 5(7)₁₆₅_<166> = 313862789381081919213237110091137467_<36> × 18408610301244054879443279259036322031382779494497999913003479922425729679234475767694159477151224688418434556725166139285255188931_<131> (Samuel Chong / GMP-ECM 6.0.1 B1=3000000, sigma=2492638067 for P36 / June 29, 2005 2005 年 6 月 29 日)

52×10¹⁶⁶-79 = 5(7)₁₆₆_<167> = 3 × 8537 × 255757 × 525541 × 542555873 × 194347402850767085232324193773663394853_<39> × 159175768603678496522767736976312094223274142566031220136596573878529488740968790595578468802481799156919_<105> (Robert Backstrom / GGNFS-0.77.1-20060513-athlon-xp snfs, Msieve 1.36 / 117.71 hours on Cygwin on AMD 64 3200+ / June 7, 2008 2008 年 6 月 7 日)

52×10¹⁶⁷-79 = 5(7)₁₆₇_<168> = 6469 × 14737 × 59029 × 158560488000179_<15> × 134423132005673053281516895507169533951_<39> × 92767036161728595441434580385004989605003143823259_<50> × 51926195999481557111023152924214215900076403618583911_<53> (Robert Backstrom / GMP-ECM 6.2.1 B1=4860000, sigma=3081001015 for P39, GGNFS-0.77.1-20051202-athlon gnfs for P50 x P53 / 6.65 hours / September 2, 2008 2008 年 9 月 2 日)

52×10¹⁶⁸-79 = 5(7)₁₆₈_<169> = 2273 × 4327 × 20752002809996857119171828649866996717199970697800523504969822088337_<68> × 28308345385696301109711060065796518182592934915052319190743442789270172132944796227018696827351_<95> (Robert Backstrom / GGNFS-0.77.1-20051202-athlon snfs / 84.28 hours on Cygwin on AMD 64 X2 6000+ / May 20, 2008 2008 年 5 月 20 日)

52×10¹⁶⁹-79 = 5(7)₁₆₉_<170> = 3² × 17 × 23 × 73562233 × 1237468422473639074505273_<25> × 4666048034044970137486079167_<28> × 38654791290376242428890920668853599055154828102798041341723241644378871682017128046690823809215556980482561_<107>

52×10¹⁷⁰-79 = 5(7)₁₇₀_<171> = 20852144987_<11> × 79044397577_<11> × 22440932013872133921645504836737591772839461986141299394467185251929_<68> × 15620614489398361590137207913320714870296064367180578091040472815622493531339189187_<83> (Robert Backstrom / GGNFS-0.77.1-20060513-pentium-m, Msieve 1.39 snfs / 61.66 hours, 1.2 hours / May 21, 2009 2009 年 5 月 21 日)

52×10¹⁷¹-79 = 5(7)₁₇₁_<172> = 1952178017533_<13> × 39592814745574705902699945898782321093833965047403_<50> × 74752382368221238007239043624856816631832755356506250342177409326733359592982167470607142927525246902943388623_<110> (Ignacio Santos / GGNFS, Msieve snfs / 63.82 hours / September 10, 2009 2009 年 9 月 10 日)

52×10¹⁷²-79 = 5(7)₁₇₂_<173> = 3 × 53 × 229 × 331 × 17419 × 7794933312767_<13> × 574391550268011338538164911_<27> × 14367225085697915795287524745117_<32> × 4278422527553913505771834755528035916005882974401794090104527392050825146837825931010046247_<91> (Wataru Sakai / GMP-ECM 6.1 B1=11000000, sigma=1362951834 for P32 / October 14, 2006 2006 年 10 月 14 日)

52×10¹⁷³-79 = 5(7)₁₇₃_<174> = 1210160334377_<13> × 159530726244997224086241928713095827099743755503374136154174507_<63> × 2992771628076769445471332270509364770715107492621536451912162290811012305884588332131862245256697243_<100> (Ignacio Santos / GGNFS, Msieve snfs / March 17, 2010 2010 年 3 月 17 日)

52×10¹⁷⁴-79 = 5(7)₁₇₄_<175> = 2179 × 17891 × 148207092769069713284629119488465727427587361162481257039890346588300228272269460240399143817885564122125027155743346482694124265109073964719090656229398768771286902793_<168>

52×10¹⁷⁵-79 = 5(7)₁₇₅_<176> = 3 × 44119 × 505411 × 108654820435393_<15> × 107924410927665683001385431856290806743357967_<45> × 31288719349461934155851843896696720363661033230725719_<53> × 2354034136349944678676611987548074368673930574524031959_<55> (Serge Batalov / GMP-ECM 6.2.1 B1=11000000, sigma=4191283557 for P45 / October 11, 2008 2008 年 10 月 11 日) (Jo Yeong Uk / GGNFS-0.77.1-20050930-nocona gnfs for P53 x P55 / 8.93 hours on Core 2 Quad Q6700 / October 12, 2008 2008 年 10 月 12 日)

52×10¹⁷⁶-79 = 5(7)₁₇₆_<177> = 211571 × 74178571 × 533008111 × 95818687967871033440322599442249452320126352114384055290728749757_<65> × 720845505567717292374404979719480750653724353208898401998624694306306396853987963374698811_<90> (Robert Backstrom / Msieve 1.44 snfs / January 15, 2012 2012 年 1 月 15 日)

52×10¹⁷⁷-79 = 5(7)₁₇₇_<178> = 5209 × 687901 × 3591592130707531_<16> × 20758583474340401_<17> × 163882620580891776606591883_<27> × 5990130956546303578954044839627845137546757129595421161_<55> × 22030613574269288396243921906995869107155224693130054301_<56> (Patrick Keller / GGNFS-0.77.1-20050930-athlon gnfs / 19.89 hours on Athlon 64 3400+ 512MB Ram Win2k / January 25, 2006 2006 年 1 月 25 日)

52×10¹⁷⁸-79 = 5(7)₁₇₈_<179> = 3³ × 2044716587877367_<16> × 215395798882148819500558843402068099950243342416783201_<54> × 4858774251257680484380004532241818322086034722809326315548514988853886672228043579364724460321602665035608853_<109> (matsui / Msieve 1.46 snfs / July 20, 2010 2010 年 7 月 20 日)

52×10¹⁷⁹-79 = 5(7)₁₇₉_<180> = 2819 × 4813 × 2246417 × 20342559217_<11> × 1088742082327_<13> × 855911617131315827496988838486794772144113637607103956313853164026650291395078282203565640251391172190861315078598180580508020542398251763285297_<144>

52×10¹⁸⁰-79 = 5(7)₁₈₀_<181> = 1907145664709063958354268537876114943171_<40> × 2282249079063136761889376337454791894323802478621_<49> × 1327437030532454031084789475205826920108788207304808616927065055833914814194080582426819377847_<94> (Thomas Womack / gmp-ecm 6.1.2 for P40 / February 17, 2007 2007 年 2 月 17 日) (Thomas Womack / ggnfs / 300 CPU-hours on Core2 system / April 5, 2007 2007 年 4 月 5 日)

52×10¹⁸¹-79 = 5(7)₁₈₁_<182> = 3 × 19 × 401904412375528539331847398345165066791473496316622080484846488508256710720903033_<81> × 2522105239353325298748130209401148022385513396941975516899451253080021253195404610505390042856114817_<100> (Robert Backstrom / GGNFS-0.77.1-20060513-athlon-xp snfs / 730.72 hours on Cygwin on AMD 64 3200+ / September 20, 2007 2007 年 9 月 20 日)

52×10¹⁸²-79 = 5(7)₁₈₂_<183> = 97 × 12109 × 1625029841047031_<16> × 554118606159799492183_<21> × 6050846949569534546305953413918280462773016205027_<49> × 90281876882455528420305211263272621722292863319069048786908898396523904541201369347020933719_<92> (Dmitry Domanov / Msieve 1.40 snfs / December 13, 2012 2012 年 12 月 13 日)

52×10¹⁸³-79 = 5(7)₁₈₃_<184> = definitely prime number 素数

52×10¹⁸⁴-79 = 5(7)₁₈₄_<185> = 3 × 8009 × 21401 × 1700173 × 20208163 × 27152779 × 31960031215487241563_<20> × 6130350794396698697141_<22> × 614752723179023095973357865801983730047806656425200334109054308788793749967370846193522185467998271938667458923857_<114>

52×10¹⁸⁵-79 = 5(7)₁₈₅_<186> = 17 × 53 × 2157921737_<10> × 40246436214681691411_<20> × 1154328949285905116197937_<25> × 32019453541460024164603898999697617082680737_<44> × 199769609305323282848523939658398769541087148383686097599485662967743152472162214957319_<87> (Erik Branger / GGNFS, Msieve gnfs for P44 x P87 / October 1, 2010 2010 年 10 月 1 日)

52×10¹⁸⁶-79 = 5(7)₁₈₆_<187> = 653 × 1091 × 346963 × 4134739391_<10> × 5653164154372799162084492654148431917438433520361498690172247839387861523033716689789008827436282057124974960391655408997877410003058325905635205047621387238706653603_<166>

52×10¹⁸⁷-79 = 5(7)₁₈₇_<188> = 3² × 618445831 × 9439929796673_<13> × 506044253860307_<15> × 2172998348127469547509652536170099718831542837357851108902976483632358261255209000669484491945541300616676083454721073316335173045237767515888873253333_<151>

52×10¹⁸⁸-79 = 5(7)₁₈₈_<189> = 75683 × 3353117383423547_<16> × 84897711645192904013349945705851447515019469857036691947693_<59> × 26817466944902810451930987766989411538609879910521658014403278148957559018727990517711709477070917264010080389_<110> (Dmitry Domanov / January 21, 2013 2013 年 1 月 21 日)

52×10¹⁸⁹-79 = 5(7)₁₈₉_<190> = 193 × 936953 × 4752323308811190522323273_<25> × 221420394725445605000799427000151_<33> × 30364219319826735248650667358804337247970993171027903229829909448703653062603642525176895821064372165356594333176821379499831_<125> (Wataru Sakai / GMP-ECM 6.1 B1=11000000, sigma=4241102090 for P33 / October 14, 2006 2006 年 10 月 14 日)

52×10¹⁹⁰-79 = 5(7)₁₉₀_<191> = 3 × 71 × 673 × 106303 × 3573279849920867_<16> × 595994088561937115142082914549402700981475234802968617_<54> × 1780375720358557944914700664241024079560774478137276933896760933978405494824990902532860246922630790336877167369_<112> (Dmitry Domanov / January 28, 2013 2013 年 1 月 28 日)

52×10¹⁹¹-79 = 5(7)₁₉₁_<192> = 23 × 127 × 211 × 373 × 17041 × 5471101 × 95312458124447224795190832989059104022296743897607030704970127132422070079993_<77> × 282825465919931812641821888343475351245138036524801494635554056553103873324503150890106865741883_<96> (Ignacio Santos / GGNFS, Msieve snfs / May 10, 2010 2010 年 5 月 10 日)

52×10¹⁹²-79 = 5(7)₁₉₂_<193> = 29² × 124121 × 18595565132796813986844950129137_<32> × 2213836869102727608604180211960758853013103281383020394425608528871379048417_<76> × 1344511667120924949708912848829097866419296942170763947454495263041083326480833_<79> (Wataru Sakai / GMP-ECM 6.1 B1=11000000, sigma=2950670048 for P32 / October 21, 2006 2006 年 10 月 21 日) (Dmitry Domanov / Msieve 1.50 snfs / May 31, 2013 2013 年 5 月 31 日)

52×10¹⁹³-79 = 5(7)₁₉₃_<194> = 3 × 1517945766670785449_<19> × 7229865440639606423_<19> × 36201349029514598526708460117_<29> × 1361633458879307976532980614815947376699811_<43> × 35601487205328491845602471971596039725155115291438663960324094921313571336527310320491_<86> (Wataru Sakai / GMP-ECM 6.1 B1=11000000, sigma=2163703414 for P29 / October 20, 2006 2006 年 10 月 20 日) (Robert Backstrom / GMP-ECM 6.2.1 B1=6942000, sigma=2494068609 for P43 / October 5, 2008 2008 年 10 月 5 日)

52×10¹⁹⁴-79 = 5(7)₁₉₄_<195> = 67 × 2557 × 25856338193448299_<17> × 21809996957807287673_<20> × 5980433683468923498089748938309658505407495031557994101592054752814975129966972846279175764987428832971238239615792525832165427011603791416251694458763629_<154>

52×10¹⁹⁵-79 = 5(7)₁₉₅_<196> = 659 × 22153 × 18376102078038984678781_<23> × 30612927514071156846784322002866055941539_<41> × 703533228337433255034037808185060584919732405744586945887692326675648301743278084448563974094230110167875059952081791708743589_<126> (Dmitry Domanov / GMP-ECM B1=11000000, sigma=2729741791 for P41 / December 28, 2012 2012 年 12 月 28 日)

52×10¹⁹⁶-79 = 5(7)₁₉₆_<197> = 3² × 103 × 80783 × 48667662212255676300229_<23> × 15853335027815333290659529626303631786606363827489474369608755762597081394006256394532636955218924819546628291207230854973956956642502034619488704899671267745365698093_<167>

52×10¹⁹⁷-79 = 5(7)₁₉₇_<198> = 263 × 2196873679763413603717786227291930713983945923109421208280523869877482044782425010561892691170257710181664554288128432615124630333755809040980143641740599915504858470637938318546683565694972539079_<196>

52×10¹⁹⁸-79 = 5(7)₁₉₈_<199> = 53 × 131 × 151 × 3389 × 12854191790882714404785945059_<29> × 1147368479450803350892960355628253878443119_<43> × 8057561784111871534048592494523267711697846337592935373_<55> × 13684023717462302723800659371482835404673009473413052372894329397_<65> (Eric Jeancolas / cado-nfs-3.0.0 for P43 x P55 x P65 / July 9, 2021 2021 年 7 月 9 日)

52×10¹⁹⁹-79 = 5(7)₁₉₉_<200> = 3 × 19 × 13119178847_<11> × 21322941493829819_<17> × 27313233753447177563_<20> × 411351101494831873367498992021260976263151_<42> × 1272101379026747903707298354196236477819089199_<46> × 253527282351532668908867579235496341067847640059655454647818415871_<66> (Wataru Sakai / GMP-ECM 6.1 B1=11000000, sigma=3736281930 for P42 / February 21, 2007 2007 年 2 月 21 日) (Jo Yeong Uk / GGNFS-0.77.1-20050930-k8 gnfs for P46 x P66 / 19.89 hours on Core 2 Duo E6300@2.33GHz / February 22, 2007 2007 年 2 月 22 日)

52×10²⁰⁰-79 = 5(7)₂₀₀_<201> = 91199 × 1054881710182289609_<19> × 51991421624319888522887138780136184192355962882489488624811019795388145661015829382141_<86> × 115514180845252256064057441508823472503803486871040548490504098849197079144427556445314250467_<93> (Robert Backstrom / GGNFS-0.77.1-20060513-nocona, Msieve 1.44 snfs / September 30, 2012 2012 年 9 月 30 日)

52×10²⁰¹-79 = 5(7)₂₀₁_<202> = 17 × 125122724092779212405924526892226718008910557438256750215615650437133_<69> × 2716287417094089373891951696325505296257611996736767796909378438062195209416094069479645197442693059776416360256508101715646216801957_<133> (Robert Backstrom / GGNFS-0.77.1-20060513-nocona, Msieve 1.44 snfs / November 12, 2013 2013 年 11 月 12 日)

52×10²⁰²-79 = 5(7)₂₀₂_<203> = 3 × 311 × 941 × 2939 × 8369 × 178117 × 1960473834481873482723681921991308255247603577_<46> × 7662138376522220822386203673942076752719855607907995483169326635122657349773934363270241945257469395606962446956398763981271779354194005711_<139> (Bob Backstrom / Msieve 1.54 snfs for P46 x P139 / September 8, 2021 2021 年 9 月 8 日)

52×10²⁰³-79 = 5(7)₂₀₃_<204> = 59 × 3373 × 436871 × 49808293721924259505177_<23> × 1285461207721061407318826466643552510321_<40> × 103795523850205464528430782524222889776592414655235027189053145491594335829733740539497329319390792122532757218819546451371836835473_<132> (Dmitry Domanov / GMP-ECM B1=11000000, sigma=2827606608 for P40 / December 24, 2012 2012 年 12 月 24 日)

52×10²⁰⁴-79 = 5(7)₂₀₄_<205> = 3259364699293234259501553833_<28> × 381325892675598730096637439571016141_<36> × 1060336469925530019063918057928066925290559812262159_<52> × 4384175006771519221363319620681593183627381750404632932501890640979514373769627542976613251_<91> (Warut Roonguthai / GMP-ECM 6.3 B1=1000000, sigma=1057675665 for P36 / December 6, 2012 2012 年 12 月 6 日) (Erik Branger / GGNFS, Msieve gnfs for P52 x P91 / March 26, 2017 2017 年 3 月 26 日)

52×10²⁰⁵-79 = 5(7)₂₀₅_<206> = 3⁴ × 47 × 1583 × 59611 × 285113 × 444271567189174362710201699_<27> × 8902366691568773249644693314082743200722976540649185437_<55> × 142626300165359717010708603588565777912332936672128545298988139654122567422747216892879285698393937914063213_<108> (Bob Backstrom / Msieve 1.44 snfs for P55 x P108 / April 4, 2024 2024 年 4 月 4 日)

52×10²⁰⁶-79 = 5(7)₂₀₆_<207> = 761 × 37792540798959570043614383998733132751418026017848370025526379682338651365422746888263462944779459_<98> × 20089544358643461850850506576171184698992425976597251689302789198942527219412436787730502679831621124823123_<107> (Markus Tervooren / ggnfs 64 bit, msieve for P98 x P107 / January 5, 2014 2014 年 1 月 5 日)

52×10²⁰⁷-79 = 5(7)₂₀₇_<208> = 89 × 12640489 × 87783131414929_<14> × 5415118049819430479398878425545200002624390237228231057302490212754119_<70> × 10804084066939743076721970058559696390558333126274665325420130113889489751630458374536583030548842270177529898865687_<116> (Bob Backstrom / Msieve 1.44 snfs for P70 x P116 / September 16, 2024 2024 年 9 月 16 日)

52×10²⁰⁸-79 = 5(7)₂₀₈_<209> = 3 × 2699 × 270684151 × 118870884225188449_<18> × 839435474492100547908116219_<27> × [264186764019643643985333719184415691158785149331996803466616977449682554583121197586363548720394273559020110227422817930215891277034348660374085983976661_<153>] Free to factor

52×10²⁰⁹-79 = 5(7)₂₀₉_<210> = 61 × 6043 × 21401 × 1168763839_<10> × 587981809073809_<15> × 825797469192685977157432074497281_<33> × 1559212862458770040446190788317194193_<37> × 82770337337870722478986173399678382608826867507338655569955179975764880228382018740045025425330977879707753_<107> (Warut Roonguthai / GMP-ECM 6.3 B1=1000000, sigma=4056606462 for P33 / December 6, 2012 2012 年 12 月 6 日) (Warut Roonguthai / GMP-ECM 6.3 B1=1000000, sigma=1941291347 for P37 / December 7, 2012 2012 年 12 月 7 日)

52×10²¹⁰-79 = 5(7)₂₁₀_<211> = 683 × 19727 × 33494627 × 33754243 × 36642839161_<11> × [10351098736508058847008532595847442225455660565305854771154025269320584492702491906871436261299454786839339187512573682858649439793748991972547000964137916746468255285733955382557_<179>] Free to factor

52×10²¹¹-79 = 5(7)₂₁₁_<212> = 3 × 53 × 1169477 × 67723147 × 1803745058571499_<16> × 23751811450789307_<17> × 1756659203381931696382621417_<28> × 93793098172240353598385046487_<29> × 649986902417184439604309577932367947020820620800773592134092428216420786165376526764053980342045493199658671_<108>

52×10²¹²-79 = 5(7)₂₁₂_<213> = 9013 × 187168997453_<12> × 11162957469221863_<17> × [30681619445497555756005576049706434892341634214690916974497231249939427241347585649898939282833955590245968439228330818886015152446236374145355504474002058218990628182605571686311511_<182>] Free to factor

52×10²¹³-79 = 5(7)₂₁₃_<214> = 23 × 167 × 123449 × 6466012843_<10> × 106390227526607_<15> × 90603829113813859_<17> × 759715896561456578467_<21> × 257331460026842481664595376581724624262775107621564998727825587549206568691338130658773544015145096321567177538937469554660737291316000384055101_<144>

52×10²¹⁴-79 = 5(7)₂₁₄_<215> = 3² × 17026752761370736288790671141662154081_<38> × [377039190995038080592096267322253434968963869896185394444041011423023240899874054378092563790599881557092791495525612588897918812849028782777179586273589472136090220448949760713_<177>] (Dmitry Domanov / GMP-ECM B1=3000000, sigma=3059108962 for P38 / December 12, 2012 2012 年 12 月 12 日) Free to factor

52×10²¹⁵-79 = 5(7)₂₁₅_<216> = 42571169 × 96030101810939_<14> × 141331142215400101080999814403324260837522185254262205671420618458390048881027150565593170729324918731221949188985093458721528514861499918758017632477524884278223249097112062773057538270031229347_<195>

52×10²¹⁶-79 = 5(7)₂₁₆_<217> = 233 × 874949953 × 45080280077653274173_<20> × 19368756875796672324853_<23> × 1857981481233932811463207_<25> × 17469962254839286314769298438714423843526033828565390137775281676789881821016195519003114612028711139972772643664249593138338015709539277231_<140>

52×10²¹⁷-79 = 5(7)₂₁₇_<218> = 3 × 17 × 19 × 67358512524195225302175158210771711550536322806530094637289891661_<65> × 885206448639014111358703277040359476946139004655797959641915548534657327477603045204013564508489158523598024982855618669176046858044594776180368538253_<150> (Bob Backstrom / Msieve 1.53 snfs for P65 x P150 / November 12, 2017 2017 年 11 月 12 日)

52×10²¹⁸-79 = 5(7)₂₁₈_<219> = 389 × 1223 × 269023 × 5701919946313_<13> × 1778249083516261_<16> × 379635653054700269092374123073127015160830413_<45> × 1172774902162220838829976048550943444528058482536730025131088690986326084357856400666165518679295038763935714427502862914989899015502013_<136> (Erik Branger / GGNFS, NFS_factory, Msieve snfs for P45 x P136 / October 2, 2019 2019 年 10 月 2 日)

52×10²¹⁹-79 = 5(7)₂₁₉_<220> = 109 × 4973 × 10658985637631794770250689093172448243962863274116518701497771964530995407822014617978880039881004724185422894230270576300606352796436127155959203142432950368278202804830078345594241524005368029151505796950833173961_<215>

52×10²²⁰-79 = 5(7)₂₂₀_<221> = 3 × 29 × 7789 × 26391663892763679144917_<23> × 22982756675969501133038177511691402397_<38> × 140569463389151896180874852128470187192077663151676199503241205257525021554216383696089684408130000482420745152203872271274011862514890350049887721500558611_<156> (Dmitry Domanov / GMP-ECM B1=11000000, sigma=342572392 for P38 / December 31, 2012 2012 年 12 月 31 日)

52×10²²¹-79 = 5(7)₂₂₁_<222> = 211 × 6661 × 84589 × 200268692528410356344584680287950120553566139_<45> × 24266771005952880443583130072471388438791385971815898991459962193219725651361208665370424248474688563244156875723313121550814501170137676272064846495550395872329416497_<167> (Dmitry Domanov / GMP-ECM B1=43000000, sigma=3292069308 for P45 / January 25, 2013 2013 年 1 月 25 日)

52×10²²²-79 = 5(7)₂₂₂_<223> = 122827 × 410953 × 51417024870187_<14> × 2226219030485231481613970704568076040425476355273910389712732420003326832644609924375407882456684655962565247733377915417412987636722342293407848317690869155753701612606138797243818898069343623068241_<199>

52×10²²³-79 = 5(7)₂₂₃_<224> = 3² × 7919 × 3901052513_<10> × 2438574314122552998223623676900987118150795370121_<49> × 68056420065563401982333480728369916262690698155984866272517063751_<65> × 1252163643428641214860314935920583139436940498191771978218100784345251043530928654128137869664569_<97> (Bob Backstrom / GMP-ECM 6.2.3 B1=50990000, sigma=928930434, Msieve 1.54 snfs for P49 x P65 x P97 / May 28, 2020 2020 年 5 月 28 日)

52×10²²⁴-79 = 5(7)₂₂₄_<225> = 53 × 163 × 114902678159_<12> × 582059268029096287745731768844137583996969722928667889200503952272038724914490378083142958520555887627765415038623929021218684080876015522349158884557420851517788840676424831089766158007577088416353142024976577_<210>

52×10²²⁵-79 = 5(7)₂₂₅_<226> = 71 × 19687 × 25913 × 36701177 × [4346355613927705766531725411593870326245523643838590048911711652980036135422921993364225636839025830968746214596888954534077946409484018855583932700364053522352750729613885974156747774473445209790492981500401_<208>] Free to factor

52×10²²⁶-79 = 5(7)₂₂₆_<227> = 3 × 274740465118028207183_<21> × [70099827671855699433692369372746167974370323614000432261695629440040040089560957581377510889546466413132955469608206126342651588444821564703655178194992157015785574134265414866490726125420380110298029060373_<206>] Free to factor

52×10²²⁷-79 = 5(7)₂₂₇_<228> = 67 × 7057 × 16020163 × 32199635948134729_<17> × 222036306893901169_<18> × 3295178819461331022427789654097783_<34> × 3237762877452213781747021280128874997669851238880514115386259827839984433215645082315040654180036746968793934397287496555525072227003691798463252327_<148> (Warut Roonguthai / GMP-ECM 6.3 B1=1000000, sigma=3342113041 for P34 / December 7, 2012 2012 年 12 月 7 日)

52×10²²⁸-79 = 5(7)₂₂₈_<229> = 9079277 × [636369809818312380796155660607973275600885156139390589997174640423216273473953683512219946343500454692348055663218313283951770364289775251683341942070693269714953930558322846387193361076854222839305131650656520092709780501_<222>] Free to factor

52×10²²⁹-79 = 5(7)₂₂₉_<230> = 3 × 75271268286563955547_<20> × 255864683798573226973640326382712875634790096223524900874331185565517987095771453579308492638741336677514322271981446323653482645716239079969995637255815211866762917008729331127804263945654732297316975308569697_<210>

52×10²³⁰-79 = 5(7)₂₃₀_<231> = 103 × 769 × 169649 × 642947 × 2906807 × 16561923964512781_<17> × 128086589763369780121_<21> × 137902488293524799347_<21> × 2690974335802537653757739_<25> × 29225266909025264906521835945035650742848916876822681537095968607477442712553175618182372458320667920860913113717037178516863327_<128>

52×10²³¹-79 = 5(7)₂₃₁_<232> = 4073 × 40560646684504693_<17> × 279904455141512124109013_<24> × [124948700140583976928083068956657777112804408067989410285898998314347816017970929992787214885833022383897296544775277589884136741311980311133742927470614839787075612641448233643488325026161_<189>] Free to factor

52×10²³²-79 = 5(7)₂₃₂_<233> = 3³ × 2206587359_<10> × 2464198139645015051389_<22> × 466622938068420907097876890901399_<33> × 843401239479380844715870906245407571804291635263656504651724822541169698181598406158571742438622980096449621488798367043316133559489794065986718522938055028349948856999_<168> (Warut Roonguthai / GMP-ECM 6.3 B1=1000000, sigma=4222949778 for P33 / December 7, 2012 2012 年 12 月 7 日)

52×10²³³-79 = 5(7)₂₃₃_<234> = 17 × 127 × 5079059 × 2969121470456720881068530359472039761526377_<43> × 17745856634409565434846742223074997918195039167277840908998680453389794271064420274685267326298980754304440649570078387980384604326501739373838441024511843069829899514403453941476221_<182> (Dmitry Domanov / GMP-ECM B1=43000000, sigma=1270692986 for P43 / January 22, 2013 2013 年 1 月 22 日)

52×10²³⁴-79 = 5(7)₂₃₄_<235> = 1291 × 21401 × 23562031 × 2241669151_<10> × 37608604701581_<14> × 1345146161829647_<16> × 78263558153522374248515935131208400721385823020586808700422363572329939918636753804280622468770594931868585157093772297898698080124572233705056222133424705206579293626684648438876041_<182>

52×10²³⁵-79 = 5(7)₂₃₅_<236> = 3 × 19 × 23 × 271576703 × 135479882377698828803407106738828154236357_<42> × [1197817958395575456323962118800211091359309800712015260808908446481101940970869826461742969432758952372871861389853280185125448807330709788174089380373885095949466265328332471891889117_<184>] (Dmitry Domanov / GMP-ECM B1=11000000, sigma=1826376105 for P42 / December 19, 2012 2012 年 12 月 19 日) Free to factor

52×10²³⁶-79 = 5(7)₂₃₆_<237> = 1032329 × 62534459639_<11> × 56314225012739_<14> × [158929747463717426939200751659200005298581644810956228128892765908878513224162400472018182251852884936351222729561754574616477172578528048431207755114781318276676159333920061209343829166712171591972952436853_<207>] Free to factor

52×10²³⁷-79 = 5(7)₂₃₇_<238> = 53 × 1567 × [69569033217875495512128424435320198164715389071507601085812064608226003031604409071266785201596341739145558485482146846850462700964200043079285954145979913279524361871353478919914001972014518522086161247640338801191771053663144065427_<233>] Free to factor

52×10²³⁸-79 = 5(7)₂₃₈_<239> = 3 × 21157 × 1607131 × 646142045030730145029579095764226937556976063163277_<51> × 876609581465016006266970384260477904278234062248733925139149622773972434970962186742116535214830232316651475997691914070504601651555842932039352752612877976360538620238027116801_<177> (Dmitry Domanov / GMP-ECM B1=43000000, sigma=2697599047 for P51 / May 17, 2013 2013 年 5 月 17 日)

52×10²³⁹-79 = 5(7)₂₃₉_<240> = 563 × 27572313199_<11> × 228619547699051_<15> × 1607115585015211_<16> × 24146926316108002439441_<23> × 1444884763997895967700527055263_<31> × 2903512459059560599395070210639160354344206434283095290568444570859318353101518055314858530245787367877780633129982445271125555140997903135949667_<145> (Makoto Kamada / GMP-ECM 6.4.3 B1=1e6, sigma=2511937122 for P31 / December 6, 2012 2012 年 12 月 6 日)

52×10²⁴⁰-79 = 5(7)₂₄₀_<241> = 7388341 × 716537527 × 664153691500003_<15> × 43672805912048840319421_<23> × 277658883681887930286499_<24> × 135513855762271710192411512002058699183475657598186979501740061518075216383273561049024410613367780137736188787661649067357864321072792586654058093271959246405091903_<165>

52×10²⁴¹-79 = 5(7)₂₄₁_<242> = 3² × 83412540861375912102649_<23> × 76963883609405943559632532301484207169648776716924660733711385966821287959943725137735513022685036327309305710687782434479077399709532490073113547274908034004947354419281701675590256216208665242720267284326931518117297_<218>

52×10²⁴²-79 = 5(7)₂₄₂_<243> = 1299134495060853968738667536178669217581650668799_<49> × [444740540701841306135966953871164177206556151412975750728618977729959087116636982090811621348202906910951868411408746573523974036278269386545189363700509574678757888518581433860209570605168084623_<195>] (Dmitry Domanov / GMP-ECM B1=110000000, sigma=1855225058 for P49 / January 21, 2013 2013 年 1 月 21 日) Free to factor

52×10²⁴³-79 = 5(7)₂₄₃_<244> = 1123485375951958667_<19> × 8031455045555257436186491927_<28> × 640323111994101205924284904248649571243321719406459245138527199857151944443294494043782585882218916968653251105238295488356947522190197715555195107219429325707180612442182724184424727236371298587653_<198>

52×10²⁴⁴-79 = 5(7)₂₄₄_<245> = 3 × 7307 × 46008546839064571654437321654841_<32> × 87833466646100640748992210303346227330992843_<44> × 652231743468475256231945973787624543644926737004796233273858124458824633955562571231738923341264743675970338760373308903342725380813477859041018205794879501924113899_<165> (Warut Roonguthai / GMP-ECM 6.3 B1=1000000, sigma=557433435 for P32 / December 7, 2012 2012 年 12 月 7 日) (Dmitry Domanov / GMP-ECM B1=3000000, sigma=4139602741 for P44 / December 13, 2012 2012 年 12 月 13 日)

52×10²⁴⁵-79 = 5(7)₂₄₅_<246> = 579521 × 996991960218486953497419037062984391899133556467803199155471118005693974468186274143262759723595482782811628530765542193945996396640980702645422301828195661206026663016142258482052898476116961728354585559069952215325722066633957661202575537_<240>

52×10²⁴⁶-79 = 5(7)₂₄₆_<247> = 113 × 283 × [180674122948740666618023633565082641038737226860682878694698951742636660864247718120572181049369204095743387153374957871658831663834947239681596603326488563675467581155688976446348471740135019161880539659707238430775752142899333242996271858963_<243>] Free to factor

52×10²⁴⁷-79 = 5(7)₂₄₇_<248> = 3 × 34132229 × [564254366723581376981247232908793013760081688754029490991029600184015502159535471863242780284266206559766702000600642262749944026780649434271030446305140495197640308204285728285113148023800592081438902195905789195872887740770145988978899071_<240>] Free to factor

52×10²⁴⁸-79 = 5(7)₂₄₈_<249> = 29 × 202724952195480410339103433_<27> × 4012662158352732880895462829806633117_<37> × 18564194245840162266491675549099881793491769611_<47> × 1319310227864457903538665750942037896170130271120258584554752604054442021583358885534204752426525420132636348929560641880890489044722992003_<139> (Dmitry Domanov / GMP-ECM B1=3000000, sigma=790433040 for P37 / December 12, 2012 2012 年 12 月 12 日) (Dmitry Domanov / GMP-ECM B1=43000000, sigma=333961493 for P47 / May 14, 2013 2013 年 5 月 14 日)

52×10²⁴⁹-79 = 5(7)₂₄₉_<250> = 17 × 691 × 18181 × 51599 × 1614007 × 49297597 × 554240309209_<12> × 4771014217867572511674881_<25> × 51940196437338181369866838963496041511_<38> × 14504785789067769969717867680134541811066182671217_<50> × 3307652855458461809224734820634829893189752252240849193840529160165480331778508355429835823891645117_<100> (Warut Roonguthai / GMP-ECM 6.3 B1=1000000, sigma=2167044063 for P38 / December 6, 2012 2012 年 12 月 6 日) (Dmitry Domanov / GMP-ECM B1=43000000, sigma=2949279053 for P50 / January 11, 2013 2013 年 1 月 11 日)

52×10²⁵⁰-79 = 5(7)₂₅₀_<251> = 3² × 53 × 359 × 10055493083_<11> × [33554025865737273316091704778845520722198314122196126497406008015887047412337086251648656249468128361885982658539300684514175964776077696475880066479715503583737479562031873290829738146600258965431915400858620032992860792599203679489833_<236>] Free to factor

52×10²⁵¹-79 = 5(7)₂₅₁_<252> = 47² × 89 × 211 × 1132917131_<10> × 2141414227265141_<16> × 400672524208124873_<18> × 2196176058183117259316261_<25> × [6524347944344744535004538844153474876842435943217268024214666884897638439547948067222746842810127568034455829460594548435298016790517180206019533059785316749307921646735609858489_<178>] Free to factor

52×10²⁵²-79 = 5(7)₂₅₂_<253> = 17971 × 29191 × 2316939810180151302435347_<25> × 7212515147555869237586942009_<28> × 659079990929116448196784294020352710224785433049995838513694144146442749081560587548094959947997690470604394935922181983022321208983117081870710255590520590913197913407052725268800233843489159_<192>

52×10²⁵³-79 = 5(7)₂₅₃_<254> = 3 × 19 × 199 × 2879 × 48221 × 379283 × 1287528751545979687470353_<25> × [75133688740958925687857791033052620801692948013573629526846704688098457452991119400309262762004076429956000542973730018993830891624251157089613552748831126589945767901397112823922042873856127531557691995334933479_<212>] Free to factor

52×10²⁵⁴-79 = 5(7)₂₅₄_<255> = 1733023423_<10> × 420040805344250300669_<21> × 1764998071164133927931101_<25> × [449697718330849930262254025638866456354474778397815357382649919018031676134358116226291600399325948839495392335429646043548384051521603330502741309563429436718658659186329498649129631937183453061822071_<201>] Free to factor

52×10²⁵⁵-79 = 5(7)₂₅₅_<256> = 13673016161914360140667655657257603191064923453775435623632914840245914282036223284913224366155547588017738503060276839_<119> × 422567903771776908809826386912653072721147000683772472000697418939402473873674005697179572322067040324590361038098341916779205823483498343_<138> (NFS@home + Dmitry Domanov / Msieve 1.54 for P119 x P138 / November 8, 2023 2023 年 11 月 8 日)

52×10²⁵⁶-79 = 5(7)₂₅₆_<257> = 3 × 1834799 × 2803817 × 1785084383272979_<16> × 16038970921700849_<17> × [130757367802280896365199000411258221931235940519012696823452023286595281449734510519757621976606381874380536366749523614442388516331007130030585875679502512719858753201966176154558459867445839208102656795854694063_<213>] Free to factor

52×10²⁵⁷-79 = 5(7)₂₅₇_<258> = 23² × 181 × 328847255649941915669_<21> × [18349843533056103896626866709873107432075986516117924095506772304419045796512796775944293658633510280776543094047184925914353080082111270804414314231398961918700286609625974319793732589350461051260077791221153115511331498604617737417_<233>] Free to factor

52×10²⁵⁸-79 = 5(7)₂₅₈_<259> = 461 × 16438577 × 65131813 × 201370662425738537_<18> × [58130803041990568457690688168350338676122611449971334851095996808932420256999340765260481467534046846775348692810474569580208258549773581212137512888736639467134749620434162069740167122436175154548189850881996384219344722361_<224>] Free to factor

52×10²⁵⁹-79 = 5(7)₂₅₉_<260> = 3³ × 773 × 21401 × 948783235583791_<15> × 198504121026557489287_<21> × 17081940957779601812255164249846604033033_<41> × 350242515295598148621782520355677944673181_<42> × 114799738772662994979061360416958645476215453214565284841069754050750078956416604611828893884748394900739042146126135375205726312064507_<135> (Dmitry Domanov / GMP-ECM B1=11000000, sigma=3263377357 for P42 / October 19, 2015 2015 年 10 月 19 日) (Dmitry Domanov / GMP-ECM B1=11000000, sigma=2327828967 for P41 x P135 / October 19, 2015 2015 年 10 月 19 日)

52×10²⁶⁰-79 = 5(7)₂₆₀_<261> = 67 × 71 × 6777382303_<10> × 17921142720273797113634962119056534435983190865075359070036460956425064131081908213288317172460066495762677663618468235419966294646204607680395421281551427340825155020185364967547604823195002722035567725404911699542492665048569126991031532101705587_<248>

52×10²⁶¹-79 = 5(7)₂₆₁_<262> = 59 × 309900306167_<12> × 8764734476627_<13> × 1239549186269068946962131409591596971_<37> × [29086019354709882646619632043937330284188400209973489783802936512621676651138657948621037197465526896782117647702972576977820547205589696339436967400938961030351313766248555042939907960864665653013477_<200>] (Dmitry Domanov / GMP-ECM B1=11000000, sigma=2859051840 for P37 / October 19, 2015 2015 年 10 月 19 日) Free to factor

52×10²⁶²-79 = 5(7)₂₆₂_<263> = 3 × 1447 × 197651 × 67339832592469106879579371743446262389285514481123502024922169272225506470032547681151122907656364775746775663370359716820355207570340250454648797113316563925332257702791362154794373878561196971139437179162208512368435062690565583095709485443714237329247_<254>

52×10²⁶³-79 = 5(7)₂₆₃_<264> = 53 × 149 × 49235673501568649_<17> × 2986736382230719907398222549_<28> × 2199017825670761001386125007893_<31> × [226252387645953358584369581298256932053401581161341425211774147421720966870363658840893735526937880920097832139479393838042928931132371877776144653791609583554821714643998048285419606937_<186>] (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=25571184 for P31 / September 29, 2015 2015 年 9 月 29 日) Free to factor

52×10²⁶⁴-79 = 5(7)₂₆₄_<265> = 103 × 22573 × 880656276990097793923_<21> × [2821810810759925871103563645153818638370439958290383387925517652691044219012112019635093901500904158791033198053880957476734650544973736545223908635739675968867139580439733319459751742546590149467302601627287813446897888105938789433007521_<238>] Free to factor

52×10²⁶⁵-79 = 5(7)₂₆₅_<266> = 3 × 17 × 6481 × 10573072813_<11> × 7133845027586429_<16> × 2317521345543708601036616516662202594730577622247191072317636570391941447752757994742484872001067979334853249643856348914974737693041312594218484703931626981806995386676434107140077396237200535658666333105197313721163171636361123712371_<235>

52×10²⁶⁶-79 = 5(7)₂₆₆_<267> = 12323667106666965507839_<23> × [46883591773199268628593022712826015482932804960688673009994507275559620955419661501713721872172243006099715063102968350015256291771300014352951210499829748052784593031404209394790214060128088290824441334069562519665046310874994495398014819251343_<245>] Free to factor

52×10²⁶⁷-79 = 5(7)₂₆₇_<268> = 40013 × 50683 × 29640341699_<11> × 23652013868145054737_<20> × [4063928661183246171001440859573049581796096868128870889510929725959822102358377003810844897323760303144665553012720137461921513909350224655694109469116242710769454731358688434849556424663287715714097236248583834336446833519760501_<229>] Free to factor

52×10²⁶⁸-79 = 5(7)₂₆₈_<269> = 3² × 5918441 × 3636810665260727828876255834532229_<34> × 632130295826170733020240271307914747_<36> × 471827994794410191083129813443793934386522737759821051303224828496177663817290175471943282954900714268902900065546465522843548822471521599242879005919265616984974424640915414653031327649165591_<192> (Dmitry Domanov / GMP-ECM B1=3000000, sigma=605567491 for P34 / October 9, 2015 2015 年 10 月 9 日) (Dmitry Domanov / GMP-ECM B1=11000000, sigma=1621309346 for P36 x P192 / October 20, 2015 2015 年 10 月 20 日)

52×10²⁶⁹-79 = 5(7)₂₆₉_<270> = 61 × 50135069745569302724077_<23> × 7164099877653729494031169_<25> × 1129584664665553403987464688077_<31> × 21569377538000976369664082124257_<32> × 1082359027980287968796719647688701177656410846233187119616807297171081044274573559426051511916145240472968314841088271581152269477365787041721023060936524578301_<160> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=713370597 for P32 / September 29, 2015 2015 年 9 月 29 日) (KTakahashi / GMP-ECM 6.4.4 B1=1000000, sigma=2173402655 for P31 x P160 / October 5, 2015 2015 年 10 月 5 日)

52×10²⁷⁰-79 = 5(7)₂₇₀_<271> = 293 × 4825181368335715449138553532911_<31> × 5008890328311884453480013500377_<31> × [815902096189937515161388762534900247945934713009450551788631804625162707089781780892743452000832879584761847911757973547694437546262538254578464974699270248752787048213234823609283170826610064194314990105387_<207>] (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=4261508105 for P31(5008...), B1=1e6, sigma=447092011 for P31(4825...) / September 29, 2015 2015 年 9 月 29 日) Free to factor

52×10²⁷¹-79 = 5(7)₂₇₁_<272> = 3 × 19 × 5332841 × 16885963 × 135943789872802693_<18> × 3080479253296119528181_<22> × 9925663220328308292130150297939603_<34> × 2708097605495116320120972528636813449891525031684992132602045581145653470436559623648157859361563528420524479969114633516754933411229861933244195577997277072475232911281333683279648633_<184> (Dmitry Domanov / GMP-ECM B1=3000000, sigma=433034386 for P34 x P184 / October 9, 2015 2015 年 10 月 9 日)

52×10²⁷²-79 = 5(7)₂₇₂_<273> = 310447 × 50633642244742079754132123857_<29> × [36756504014222773400655031939925192359839786042803364441066615681799295697887239449150360439740296772511577178838641751954449128450638624745152614385032404246679411681756958513243373413015097940762996378898104355564102560882668566184985263_<239>] Free to factor

52×10²⁷³-79 = 5(7)₂₇₃_<274> = 151 × 40292986873301_<14> × 949629996709426979214863540349399396795428020801463183996138901506167429433021944258596492950939158181287694855313832136605121102636115993146617355216716390810010084691297118237999627907716852190849554205913255256912549317021380155963213901056307990468209627_<258>

52×10²⁷⁴-79 = 5(7)₂₇₄_<275> = 3 × 1345079 × 482676250797627734717_<21> × 29664419661834452153538938605275526384781104479441821499903896896153533990875694092234363266029856590910463312255202212853838667155243908861586076874069600258154324774983899443295636924580462378397348499909196910220100730807562780938978684245169313_<248>

52×10²⁷⁵-79 = 5(7)₂₇₅_<276> = 127 × 2099 × 253922408383621_<15> × 860052289208900547359599_<24> × 9924732038309830134121701704730771639943110583921978372017875331793311156880329434165041744312477932995652852564620839143391879235732427652045078079952382295506271145007535409825109830437331926950849046805322318731278377184544198431_<232>

52×10²⁷⁶-79 = 5(7)₂₇₆_<277> = 29 × 53 × 11681 × 1021087 × [315169509462885463809403364658740503789140988312030250484418481862643720231081194132185743903317829222515812682334110574896499628215877744875579783909643002449152844884038980212351962014562284768882797177052604717909020995763929710512663979880113463619616200281743_<264>] Free to factor

52×10²⁷⁷-79 = 5(7)₂₇₇_<278> = 3² × 179 × 150209 × [238764270997298813426839537894509556402427630031755496519161070823061137661032261024304388638227499346060246798018339750887621214989910572637621614805273978210586598306288635218656285640632577816922812678137230087087463339370474150638245525130196423638052014494308126323_<270>] Free to factor

52×10²⁷⁸-79 = 5(7)₂₇₈_<279> = 97 × 25691596104613679_<17> × 185794141508960641_<18> × [1247860387118058756457673778868388904139779932806341949018871285477994135649536696378698122049702210932400126048650198356075846695766370124662978881467245262865694708765105470950742610718482239197881718056049523386289781073535026178167700525119_<244>] Free to factor

52×10²⁷⁹-79 = 5(7)₂₇₉_<280> = 23 × 6012319 × 170729389 × 312622504433_<12> × 8640315119500067_<16> × 116208245687843669_<18> × 524407371133773131_<18> × 3549903052462931482457_<22> × [418803836932108207236438448667223476802997489250551871951595897645617226824794084815486815676360382790512481700262147339775334768184210899126573766678960388274568445122116765120113_<180>] Free to factor

52×10²⁸⁰-79 = 5(7)₂₈₀_<281> = 3 × 417264720192078587425217541593749049_<36> × [46155973240185954657389198876826043646235257952180029076567613617805677012343688328944008211062567113217161266126453404721824338287814431686475451233023281399762381534191713678562074748450750820516859853007330253449475778299872618841630028414291_<245>] (KTakahashi / GMP-ECM 6.4.4 B1=1000000, sigma=279821236 for P36 / October 5, 2015 2015 年 10 月 5 日) Free to factor

52×10²⁸¹-79 = 5(7)₂₈₁_<282> = 17 × 211 × 1164479873788104436296045931_<28> × 423117680803715376109626547241_<30> × 105803395734114447839419978912591_<33> × 84976397689193733486576004161270172878547_<41> × 36361213947424242517516726980246708241519278648757248657393879919589851277627397249393292736437929693049377769878254644092069761223577913433961933213_<149> (Makoto Kamada / GMP-ECM 6.4.4 B1=1e6, sigma=3057973956 for P30, B1=1e6, sigma=3091774141 for P33 / September 29, 2015 2015 年 9 月 29 日) (Erik Branger / GMP-ECM B1=43000000, sigma=1440363086 for P41 x P149 / October 29, 2015 2015 年 10 月 29 日)

52×10²⁸²-79 = 5(7)₂₈₂_<283> = 331 × 43577 × 1413987999335063_<16> × 7558654763380739_<16> × 125962256485480529_<18> × 297539649221266975557153788987972331002703411035285483794279067266290560365371449528916954519526095851275807042541265702554621173815989776261509277106384185219061696313005711224007235042211912054415051398167861677196136306994207_<228>

52×10²⁸³-79 = 5(7)₂₈₃_<284> = 3 × 58071257 × 402963799697710213_<18> × 61190838051845796514177259_<26> × [13450112548908822860284630908455945885676074325945557539892217857064193062249621360410735347722834291764307175441015227476555169848647704278742368865037466889923063042909974191446431660838167187091106440290944744724488044029887673861_<233>] Free to factor

52×10²⁸⁴-79 = 5(7)₂₈₄_<285> = 1901 × 21401 × [14201841138155868369132037190831141695649961584429389782745942316179746028420303892689970702666870069805244608292178104667017501302998441001082428826947394897424321044592172542188200947061247015766438858483429792921124511941097842030512169545381230932509084692458406405561283677_<278>] Free to factor

52×10²⁸⁵-79 = 5(7)₂₈₅_<286> = 3617 × 1089122813_<10> × 256166110871275133_<18> × [5725504965200534571034330357809682705873201138567176359127414860596144742601981882620003826959170235992662536011414024204148103055860662651356585225884656366596677315508633797636904091458711175339611843461126991527542069413700156855716768549838250660638089_<256>] Free to factor

52×10²⁸⁶-79 = 5(7)₂₈₆_<287> = 3⁵ × 2007527 × 44744699 × 1808338258123349_<16> × [1463766838921849491934843945528583107281215142691811959296730797220315564621960784760908495692395415576035136507466692413370590880089850283696829655997931941141651001943600378890889673289859415610247965103671862900147484025693129117038387201682673305869707_<256>] Free to factor

52×10²⁸⁷-79 = 5(7)₂₈₇_<288> = [577777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777777_<288>] Free to factor

52×10²⁸⁸-79 = 5(7)₂₈₈_<289> = 48767 × 97549 × 706228813447_<12> × 351023606008357619633_<21> × 1481950882048038354399644283913164887_<37> × [3305950962057903680412266739233763998082176323800752851524039958323629173433970003910784509714307673991818615600672054679556652633556415712597112805602173079506089484783526442488865041287753064591800519734820187_<211>] (Dmitry Domanov / GMP-ECM B1=3000000, sigma=4240866154 for P37 / October 11, 2015 2015 年 10 月 11 日) Free to factor

52×10²⁸⁹-79 = 5(7)₂₈₉_<290> = 3 × 19 × 53 × 433 × 3371 × 272766874504853_<15> × 588120352885853413_<18> × [81678099419115815753420131999500333961137063155004049635827393093998879969341725178299670847115761434259922410861916153253418995011461283825185810901340042442077512740050641243644445539237897104805735599018322060915298758791209583979431659052230231_<248>] Free to factor

52×10²⁹⁰-79 = 5(7)₂₉₀_<291> = 929 × 71020377607121464559831_<23> × [8757136981990809427280761833155541317831591137256705585272743185581408088937676493999883123737446313564170460415640555059511170864291051224000219414219329754431270464399994022609175785619149542401581766164908915344698354356322982855697496993057827819431750361731223_<265>] Free to factor

52×10²⁹¹-79 = 5(7)₂₉₁_<292> = 409 × 174659 × 91439199139880351_<17> × [884533209931055631600452437756735914206592105866934696149223819260876216162733587026873050087998850989782542812731183601176941412522591543893882513245482253096731340392429820015903357991848614335686290489216473010433956415911856472378354225647518826973085351165590317_<267>] Free to factor

52×10²⁹²-79 = 5(7)₂₉₂_<293> = 3 × 1823 × 629226831956043493685025348094680648761_<39> × [16789805957986463313736881237886390110390229083867022430489274173887510208554111737514932837623806834425382416278849742111535028214301567924547319647172928017316983674596268157551973397926633389170719446998828481878558072572246240880549801325785733453_<251>] (Dmitry Domanov / GMP-ECM B1=11000000, sigma=735193318 for P39 / October 20, 2015 2015 年 10 月 20 日) Free to factor

52×10²⁹³-79 = 5(7)₂₉₃_<294> = 67 × 5267881 × [1637005263037715685481867781563708182388501573286249813142538909213899013459502290340831903213267651380801677573275619352811335527816331376681070886897967495304281096824994513364365053605407398347003021432891528184623561524478440497920045825267576230926990782633777912513384804323549251_<286>] Free to factor

52×10²⁹⁴-79 = 5(7)₂₉₄_<295> = 40825013 × 108657343 × 1388288233_<10> × 20900477433726085051_<20> × 1212340443860121372955844633768788393141637263_<46> × 15981472874593434436516565316015927563008149076685599_<53> × 2316851383131803427842026567683448667555025879913237843824803068579852553247302127520516203985896357379167959313012450799819741789303970316579606064983793_<154> (Dmitry Domanov / GMP-ECM B1=11000000, sigma=2306836436 for P53 / October 20, 2015 2015 年 10 月 20 日) (Dmitry Domanov / GMP-ECM B1=43000000, sigma=3804544726 for P46 x P154 / March 28, 2017 2017 年 3 月 28 日)

52×10²⁹⁵-79 = 5(7)₂₉₅_<296> = 3² × 71 × 89 × 719 × 1088407 × 120560989 × 61540920021910415039687_<23> × [174976194201966009283895888756370055186600760383619912266203571632526105542110971736957665512321708894916089602890302498725817598968353270856004409955980955329141394340196083300037075195138251337184914431490135397489606799676011070657991829719480196573_<252>] Free to factor

52×10²⁹⁶-79 = 5(7)₂₉₆_<297> = 1181 × 49578407 × 3740113764941729403923_<22> × 303022992729204636113797068073_<30> × [8706788050964498441163456466772301432497093708454617281174145524534268847189212902568046224216927107297666569022589783437927988277924948202702101387396864366977077205589850539675347456875952665387317046094914547571308727550293779918489_<235>] (KTakahashi / GMP-ECM 6.4.4 B1=80000000, x0=2270268000 for P30 / October 4, 2015 2015 年 10 月 4 日) Free to factor

52×10²⁹⁷-79 = 5(7)₂₉₇_<298> = 17 × 47 × 313 × 666515327 × 3445196382879991524410189770852661_<34> × 68695511840393418773525528949232232527688939_<44> × [146459393120800941806449781987190988166458928259364169871688532349058091362238797437228654259470225353008273720174407360186558936579670410196065359043643314942605428948090196036203635022836874753302498097087_<207>] (Dmitry Domanov / GMP-ECM B1=3000000, sigma=2978563943 for P34 / October 11, 2015 2015 年 10 月 11 日) (Dmitry Domanov / GMP-ECM B1=11000000, sigma=1590235808 for P44 / October 20, 2015 2015 年 10 月 20 日) Free to factor

52×10²⁹⁸-79 = 5(7)₂₉₈_<299> = 3 × 103 × 631 × 9871301779_<10> × [30019162132730394668355881079640038927429815036766395813022608631527094399943825319083722651714368698665953609136095149269244931322124127587426726284384938356837687136084783520939058521254931423329583394866652161245329108924545547703758998392462081653206211098199538000930189139852697_<284>] Free to factor

52×10²⁹⁹-79 = 5(7)₂₉₉_<300> = 1132811 × 1599795727677585367_<19> × [318815071645827153440886321352646531077339450198432818691018367296107294649041063743351361322647874085866560945606151963536706486637108904346175276698650499967159997874165987193252105846913588660960543220042633284366165497503429817528889226372605944442254822565690857608593221_<276>] Free to factor

52×10³⁰⁰-79 = 5(7)₃₀₀_<301> = 988252749873017_<15> × 1165155346733120687325429911_<28> × 5017749430311966278948329060683444580624091617883050550347701018228143266270543491100110868423430134194456252195902222089269171930624464819850402444637788464320002008230600997669351165155935279171876733816166570793232115513155650761411159962022312811210810671_<259> (KTakahashi / GMP-ECM 6.4.4 B1=1000000, sigma=4250099178 for P28 x P259 / October 4, 2015 2015 年 10 月 4 日)

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4. Related links 関連リンク

A056715 - OEIS (The OEIS Foundation Inc.)
A093941 - OEIS (The OEIS Foundation Inc.)