Factorization of 11...11311...11

Table of contents 目次

About 11...11311...11 11...11311...11 について
Prime numbers of the form 11...11311...11 11...11311...11 の形の素数
Factor table of 11...11311...11 11...11311...11 の素因数分解表
Related links 関連リンク

1. About 11...11311...11 11...11311...11 について

1.1. Classification 分類

Near-repdigit-palindrome of the form AA...AABAA...AA AA...AABAA...AA の形のニアレプディジット回文数 (Near-repdigit-palindrome)

1.2. Sequence 数列

1w31w = { 3, 131, 11311, 1113111, 111131111, 11111311111, 1111113111111, 111111131111111, 11111111311111111, 1111111113111111111, … }

2. Prime numbers of the form 11...11311...11 11...11311...11 の形の素数

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

10³+18×10¹-19 = 131 is prime. は素数です。
10⁵+18×10²-19 = 11311 is prime. は素数です。
10³⁹+18×10¹⁹-19 = (1)₁₉3(1)₁₉_<39> is prime. は素数です。
10¹⁹⁵+18×10⁹⁷-19 = (1)₉₇3(1)₉₇_<195> is prime. は素数です。 (Patrick De Geest / September 23, 2002 2002 年 9 月 23 日)
10¹⁹⁶³⁷+18×10⁹⁸¹⁸-19 = (1)₉₈₁₈3(1)₉₈₁₈_<19637> is PRP. はおそらく素数です。 (Daniel Heuer / November 4, 2002 2002 年 11 月 4 日)

2.3. Range of search 捜索範囲

n≤20000 / Completed 終了
n≤100000 / Completed 終了 / Bob Price / June 22, 2017 2017 年 6 月 22 日

3. Factor table of 11...11311...11 11...11311...11 の素因数分解表

3.2. Range of factorization 分解範囲

n≤50 / Completed 終了 / August 9, 2004 2004 年 8 月 9 日
n≤75 / Completed 終了 / June 29, 2005 2005 年 6 月 29 日
n≤100 / Completed 終了 / October 24, 2011 2011 年 10 月 24 日
n≤150 / Remaining 20 残り 20

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

n=112, 115, 116, 118, 120, 121, 122, 127, 128, 130, 131, 136, 137, 138, 143, 145, 146, 147, 149, 150 (20/150)

3.4. Factor table 素因数分解表

10¹+18×10⁰-19 = 3 = definitely prime number 素数

10³+18×10¹-19 = 131 = definitely prime number 素数

10⁵+18×10²-19 = 11311 = definitely prime number 素数

10⁷+18×10³-19 = 1113111 = 3² × 337 × 367

10⁹+18×10⁴-19 = 111131111 = 7 × 13 × 1221221

10¹¹+18×10⁵-19 = 11111311111_<11> = 29 × 383148659

10¹³+18×10⁶-19 = 1111113111111_<13> = 3 × 136429 × 2714753

10¹⁵+18×10⁷-19 = 111111131111111_<15> = 439 × 253100526449_<12>

10¹⁷+18×10⁸-19 = 11111111311111111_<17> = 29 × 374137 × 1024068107_<10>

10¹⁹+18×10⁹-19 = 1111111113111111111_<19> = 3 × 331 × 1118943719145127_<16>

10²¹+18×10¹⁰-19 = 111111111131111111111_<21> = 7 × 13 × 89 × 278827 × 49202964007_<11>

10²³+18×10¹¹-19 = 11111111111311111111111_<23> = 89 × 151 × 826781093184843449_<18>

10²⁵+18×10¹²-19 = 1111111111113111111111111_<25> = 3³ × 97 × 1503043 × 282260812153783_<15>

10²⁷+18×10¹³-19 = 111111111111131111111111111_<27> = 71 × 1291 × 7877 × 153890586248990663_<18>

10²⁹+18×10¹⁴-19 = 11111111111111311111111111111_<29> = 7523 × 405974071 × 3638045547789467_<16>

10³¹+18×10¹⁵-19 = 1111111111111113111111111111111_<31> = 3 × 106087 × 3491194683329446935411851_<25>

10³³+18×10¹⁶-19 = 111111111111111131111111111111111_<33> = 7 × 13 × 467 × 2614563642400901972165355463_<28>

10³⁵+18×10¹⁷-19 = 11111111111111111311111111111111111_<35> = 929 × 11960291831120679559861260614759_<32>

10³⁷+18×10¹⁸-19 = 1111111111111111113111111111111111111_<37> = 3 × 67 × 661 × 198719 × 25914576379_<11> × 1623964258549751_<16>

10³⁹+18×10¹⁹-19 = 111111111111111111131111111111111111111_<39> = definitely prime number 素数

10⁴¹+18×10²⁰-19 = 11111111111111111111311111111111111111111_<41> = 7978168376511337_<16> × 1392689472915052132048303_<25>

10⁴³+18×10²¹-19 = 1111111111111111111113111111111111111111111_<43> = 3² × 2956408456951_<13> × 41759043759054902225870849129_<29>

10⁴⁵+18×10²²-19 = 111111111111111111111131111111111111111111111_<45> = 7 × 13 × 48351047 × 97546409 × 258880255891693275366262427_<27>

10⁴⁷+18×10²³-19 = 11111111111111111111111311111111111111111111111_<47> = 2228688269_<10> × 479605163792003_<15> × 10394995677062836056673_<23>

10⁴⁹+18×10²⁴-19 = 1111111111111111111111113111111111111111111111111_<49> = 3 × 10683768707_<11> × 293592609801329_<15> × 118077361199036418146879_<24>

10⁵¹+18×10²⁵-19 = 111111111111111111111111131111111111111111111111111_<51> = 1559 × 35897 × 331972108924898963_<18> × 5980694557064957219597539_<25>

10⁵³+18×10²⁶-19 = 11111111111111111111111111311111111111111111111111111_<53> = 2237 × 123754691 × 342745600795867_<15> × 117100283659446085539788899_<27>

10⁵⁵+18×10²⁷-19 = 1111111111111111111111111113111111111111111111111111111_<55> = 3 × 487 × 760514107536694805688645525743402540117119172560651_<51>

10⁵⁷+18×10²⁸-19 = 111111111111111111111111111131111111111111111111111111111_<57> = 7 × 13 × 373 × 1355423 × 2415084972367986214742390672146929850828105999_<46>

10⁵⁹+18×10²⁹-19 = 11111111111111111111111111111311111111111111111111111111111_<59> = 739 × 24229 × 5009723 × 511692317 × 27221473436670923_<17> × 8892898262853958517_<19>

10⁶¹+18×10³⁰-19 = 1111111111111111111111111111113111111111111111111111111111111_<61> = 3² × 163 × 757403620389305460880103006893736272059380443838521548133_<57>

10⁶³+18×10³¹-19 = 111111111111111111111111111111131111111111111111111111111111111_<63> = 74996430398369_<14> × 1481551995487074841041374819579007502226992290919_<49>

10⁶⁵+18×10³²-19 = 11111111111111111111111111111111311111111111111111111111111111111_<65> = 4923930568267010799363737_<25> × 2256553165619005342268751764877465892703_<40>

10⁶⁷+18×10³³-19 = 1111111111111111111111111111111113111111111111111111111111111111111_<67> = 3 × 29 × 575857 × 1432850603923_<13> × 346599062584993_<15> × 44657591083683540801981310662811_<32>

10⁶⁹+18×10³⁴-19 = 111111111111111111111111111111111131111111111111111111111111111111111_<69> = 7 × 13 × 9067 × 366923 × 25324367 × 461479189419103_<15> × 31404134376862913825057983564352381_<35>

10⁷¹+18×10³⁵-19 = 11111111111111111111111111111111111311111111111111111111111111111111111_<71> = 97 × 1019 × 1776319 × 63283517571791477122882938540212532472482304194175232553083_<59>

10⁷³+18×10³⁶-19 = 1111111111111111111111111111111111113111111111111111111111111111111111111_<73> = 3 × 29² × 440392830404721011141938609239441582683753908486369841898973884705157_<69>

10⁷⁵+18×10³⁷-19 = 111111111111111111111111111111111111131111111111111111111111111111111111111_<75> = 4880884709_<10> × 29985486443951_<14> × 4001561987071042049_<19> × 189722261911285659958524711757621_<33>

10⁷⁷+18×10³⁸-19 = 11111111111111111111111111111111111111311111111111111111111111111111111111111_<77> = 4597 × 1053836524303_<13> × 113006670845150256479623408007_<30> × 20295775927451480425041108093203_<32>

10⁷⁹+18×10³⁹-19 = 1111111111111111111111111111111111111113111111111111111111111111111111111111111_<79> = 3⁵ × 4572473708276177411979881115683584819395518975765889346136259716506630086877_<76>

10⁸¹+18×10⁴⁰-19 = 111111111111111111111111111111111111111131111111111111111111111111111111111111111_<81> = 7 × 13 × 11071 × 198663919 × 170409248111_<12> × 691357007888810065267_<21> × 4712102397105375374448061036538617_<34>

10⁸³+18×10⁴¹-19 = 11111111111111111111111111111111111111111311111111111111111111111111111111111111111_<83> = 323273 × 292802557319_<12> × 117385158723064734602852610995592522402382342034687353843135434553_<66>

10⁸⁵+18×10⁴²-19 = 1111111111111111111111111111111111111111113111111111111111111111111111111111111111111_<85> = 3 × 2999 × 43391 × 90271 × 359275265125761359_<18> × 87757559853066152772031052406520133988551924686074037_<53>

10⁸⁷+18×10⁴³-19 = 111111111111111111111111111111111111111111131111111111111111111111111111111111111111111_<87> = 4957 × 13033 × 241372297823960436499_<21> × 7125359017342697241139397309471033799352398435170107637369_<58>

10⁸⁹+18×10⁴⁴-19 = 11111111111111111111111111111111111111111111311111111111111111111111111111111111111111111_<89> = 733 × 28703 × 683553112589_<12> × 376672726857767_<15> × 2051113927718923540942907666670241443540267476402698103_<55>

10⁹¹+18×10⁴⁵-19 = 1111111111111111111111111111111111111111111113111111111111111111111111111111111111111111111_<91> = 3 × 283 × 331 × 6133 × 91609143926926817505432251501573_<32> × 7037364033846844934918073662172458267436049905341_<49>

10⁹³+18×10⁴⁶-19 = 111111111111111111111111111111111111111111111131111111111111111111111111111111111111111111111_<93> = 7 × 13 × 10273 × 303507641 × 332246932901411438653507_<24> × 1178659064337455509363701055314772115263814591624892271_<55>

10⁹⁵+18×10⁴⁷-19 = 11111111111111111111111111111111111111111111111311111111111111111111111111111111111111111111111_<95> = 1097 × 638814419087861_<15> × 34000811883812823097633279_<26> × 466323031129653278108040623020560361219717883268877_<51>

10⁹⁷+18×10⁴⁸-19 = 1111111111111111111111111111111111111111111111113111111111111111111111111111111111111111111111111_<97> = 3² × 71 × 248319131 × 26307861763523_<14> × 2369383527953722507784360669_<28> × 112337702248409076368606593378533420636566717_<45>

10⁹⁹+18×10⁴⁹-19 = 111111111111111111111111111111111111111111111111131111111111111111111111111111111111111111111111111_<99> = 22469 × 40956262775830848593310835116334419264047867_<44> × 120740626653282130174514316949383727362598393980257_<51> (Makoto Kamada / GGNFS-0.50.2 / Total time: 0.70 hours (actual time: 1.6 hours))

10¹⁰¹+18×10⁵⁰-19 = (1)₅₀3(1)₅₀_<101> = 523 × 19851379 × 1143170174062515529727_<22> × 5744115976312124780689_<22> × 162978770007153641124937586273371816588033503161_<48>

10¹⁰³+18×10⁵¹-19 = (1)₅₁3(1)₅₁_<103> = 3 × 67 × 773 × 111497 × 85125974270347_<14> × 930822561080911_<15> × 809449502542781775382869875953370572519802984469590297653972943_<63>

10¹⁰⁵+18×10⁵²-19 = (1)₅₂3(1)₅₂_<105> = 7 × 13 × 569 × 2145872093148015819369070687172620388789105836557506539545203868578209527242919158560634834800036909_<100>

10¹⁰⁷+18×10⁵³-19 = (1)₅₃3(1)₅₃_<107> = 580088527 × 19154164569628026984079812892267581618815762427777012923255265676218262994729270194842366036160393_<98>

10¹⁰⁹+18×10⁵⁴-19 = (1)₅₄3(1)₅₄_<109> = 3 × 89 × 658187 × 6322617790418435783334386396939416475905226592059675589225189751101558242601096734812328053366429759_<100>

10¹¹¹+18×10⁵⁵-19 = (1)₅₅3(1)₅₅_<111> = 89 × 870917 × 21246608297_<11> × 3474558550145689_<16> × 19417864682040134592874806300493434114584832708442899243465598810328110664659_<77>

10¹¹³+18×10⁵⁶-19 = (1)₅₆3(1)₅₆_<113> = 114221 × 1845143 × 88426939 × 1622222052732881282990273999_<28> × 367524766119045158124354445689522437649534775678350860620764687617_<66>

10¹¹⁵+18×10⁵⁷-19 = (1)₅₇3(1)₅₇_<115> = 3² × 853 × 989302125817_<12> × 47200028680297085221_<20> × 3099522156097534704334514190784961592701667206489307256108216854163231481694799_<79>

10¹¹⁷+18×10⁵⁸-19 = (1)₅₈3(1)₅₈_<117> = 7 × 13 × 211969 × 593884042536605113_<18> × 9699337942287920101638875527282598806667482851997673115606280173789235147646112305583122093_<91>

10¹¹⁹+18×10⁵⁹-19 = (1)₅₉3(1)₅₉_<119> = 3024343519_<10> × 2223875623351_<13> × 30570714644086154471417088373_<29> × 54039371092676589093455009283950381269263303781498564328294877994003_<68>

10¹²¹+18×10⁶⁰-19 = (1)₆₀3(1)₆₀_<121> = 3 × 154447398234564225886342941831524047483429993_<45> × 2398035671717026850696633658703135676844129777545406909287166321087776404709_<76> (Kenichiro Yamaguchi / GGNFS-0.77.0 / 2.97 hours on Pentium 4 2.4BGHz / May 29, 2005 2005 年 5 月 29 日)

10¹²³+18×10⁶¹-19 = (1)₆₁3(1)₆₁_<123> = 29 × 113 × 610946881695422440367_<21> × 55498033749490476998140900076874131218176884370144701875245260038684717544983438236736709182646029_<98>

10¹²⁵+18×10⁶²-19 = (1)₆₂3(1)₆₂_<125> = 104429341 × 106398364719270909802170551963083929746440812176638279380802674136487283886155243583420785075251131874049756869681971_<117>

10¹²⁷+18×10⁶³-19 = (1)₆₃3(1)₆₃_<127> = 3 × 131 × 1427 × 4567 × 433820385028343429052316410684378270961372093114371210309452977776229837232735043887970464453830206606464248330010803_<117>

10¹²⁹+18×10⁶⁴-19 = (1)₆₄3(1)₆₄_<129> = 7 × 13 × 29 × 373 × 1441751 × 26296122219913865246456723_<26> × 40321278194829645764324261000814467_<35> × 73840224208972855385320950425785046549938136877650926043_<56> (Kenichiro Yamaguchi / GMP-ECM 6.0 B1=3000000, sigma=3409470726 for P35 / May 20, 2005 2005 年 5 月 20 日)

10¹³¹+18×10⁶⁵-19 = (1)₆₅3(1)₆₅_<131> = 199 × 748471 × 304017797 × 13878558119_<11> × 56842844321_<11> × 311035728391647728127368141212337710521516233767370124543779221264207690948820211510598719053_<93>

10¹³³+18×10⁶⁶-19 = (1)₆₆3(1)₆₆_<133> = 3³ × 11939 × 26523766451086123_<17> × 9334726029996629638747991841927534061_<37> × 13921595242630642337527890331543853920769032729565157899809032183338983129_<74> (Kenichiro Yamaguchi / GGNFS-0.77.1 / 18.64 hours on Pentium 4 2.4BGHz / June 15, 2005 2005 年 6 月 15 日)

10¹³⁵+18×10⁶⁷-19 = (1)₆₇3(1)₆₇_<135> = 731677309511_<12> × 170855039510509088809_<21> × 18146224183647608683573_<23> × 48980570394515932553242180453490869913379290782230450308585554783848348941937493_<80>

10¹³⁷+18×10⁶⁸-19 = (1)₆₈3(1)₆₈_<137> = 11884518378563_<14> × 356467085933449629373_<21> × 1751194939250977175066504995391_<31> × 1497690153747151706489837868528375292873487187807515370827980740505032079_<73> (Anton Korobeynikov / GGNFS-0.77.1 gnfs for P31 x P73 / 11.63 hours / May 29, 2005 2005 年 5 月 29 日)

10¹³⁹+18×10⁶⁹-19 = (1)₆₉3(1)₆₉_<139> = 3 × 14479 × 1369466309_<10> × 4184092094865800336916701845043237_<34> × 893293804598802393281431649437994473684771919_<45> × 4997476473310700634780909783179017146879542389_<46> (Kenichiro Yamaguchi / GGNFS-0.77.0 / 147.72 hours on Pentium M 1.3GHz / June 29, 2005 2005 年 6 月 29 日)

10¹⁴¹+18×10⁷⁰-19 = (1)₇₀3(1)₇₀_<141> = 7 × 13 × 21059 × 39631 × 40620720393641_<14> × 540551021389733_<15> × 218987981154486144967_<21> × 38062932017002283179301590605129787_<35> × 7993490995978375366434407288869726310752610977_<46> (Makoto Kamada / msieve 0.88 / 21 minutes / January 9, 2005 2005 年 1 月 9 日)

10¹⁴³+18×10⁷¹-19 = (1)₇₁3(1)₇₁_<143> = 134429891 × 464364599 × 105315971156723317_<18> × 294462230363238233_<18> × 6006006329512600087139159707_<28> × 955636921585104075715887330948226861264268347446925114418067077_<63>

10¹⁴⁵+18×10⁷²-19 = (1)₇₂3(1)₇₂_<145> = 3 × 229122557543491_<15> × 5440064003342686021_<19> × 3027323346891135422817277_<25> × 98153449708853664285516957679877028587748336510585725421193899539501594530100815479871_<86>

10¹⁴⁷+18×10⁷³-19 = (1)₇₃3(1)₇₃_<147> = 247954698701_<12> × 21070985957691947813_<20> × 21266709091326086753830211320220181491926619784381012749420565178925261617407693169441325448035801147674010444921447_<116>

10¹⁴⁹+18×10⁷⁴-19 = (1)₇₄3(1)₇₄_<149> = 5722243 × 3298871579269547_<16> × 3858610884137167_<16> × 152543883878439179893665443714774534765784089742998667971555256377337926417594968991315758168418139970995025673_<111>

10¹⁵¹+18×10⁷⁵-19 = (1)₇₅3(1)₇₅_<151> = 3² × 123456790123456790123456790123456790123456790123456790123456790123456790123679012345679012345679012345679012345679012345679012345679012345679012345679_<150>

10¹⁵³+18×10⁷⁶-19 = (1)₇₆3(1)₇₆_<153> = 7 × 13 × 66953231 × 500644801 × 5178826309_<10> × 69542950342483_<14> × 101141732987996669906523679227161372887706629455215111159996041752055938752051507581487951540796187188492411253_<111>

10¹⁵⁵+18×10⁷⁷-19 = (1)₇₇3(1)₇₇_<155> = 431 × 416980469273_<12> × 66684598223441346958195769_<26> × 3385453822013664850885371158632589_<34> × 273855882047440888886717872523824428856083005964365210069879926975638073408030717_<81> (Serge Batalov / GMP-ECM B1=2000000, sigma=4013348180 for P34 / January 27, 2011 2011 年 1 月 27 日)

10¹⁵⁷+18×10⁷⁸-19 = (1)₇₈3(1)₇₈_<157> = 3 × 45614069522943079_<17> × 49439362307737592240623_<23> × 249482572607894688120635780334738137_<36> × 658300737373092476473977401758844097074347085812510304694504008243652557681252653_<81> (Dmitry Domanov / Msieve 1.47 snfs / January 27, 2011 2011 年 1 月 27 日)

10¹⁵⁹+18×10⁷⁹-19 = (1)₇₉3(1)₇₉_<159> = 73757 × 166615975709_<12> × 426133064947_<12> × 1796237002753794427_<19> × 6320339049090075586799595873745647288460433_<43> × 1868909868804683904242027320464292954596978602557746783768728367814111_<70> (Dmitry Domanov / Msieve 1.40 gnfs for P43 x P70 / January 28, 2011 2011 年 1 月 28 日)

10¹⁶¹+18×10⁸⁰-19 = (1)₈₀3(1)₈₀_<161> = 70017228822007875931_<20> × 158691100719751094392313399077622563436013964273963649475173924904858703964568645926949718575810489880732152484841372524902739743497237739781_<141>

10¹⁶³+18×10⁸¹-19 = (1)₈₁3(1)₈₁_<163> = 3 × 76945788837171053509_<20> × 1119204247922864094946211131049741_<34> × 4300728527229822419282237445232300345991145700031963346507729618593233132104552037728590906028894865586299373_<109> (Serge Batalov / GMP-ECM B1=2000000, sigma=3269300322 for P34 / January 27, 2011 2011 年 1 月 27 日)

10¹⁶⁵+18×10⁸²-19 = (1)₈₂3(1)₈₂_<165> = 7 × 13 × 1579 × 7309 × 4843139167_<10> × 11262007489_<11> × 1939694105020739184644864031747591465648528624377440782900046585272233222928254781926103757141572145414012583767048170948359901819733397_<136>

10¹⁶⁷+18×10⁸³-19 = (1)₈₃3(1)₈₃_<167> = 71 × 5987508415171117_<16> × 38616994751080477_<17> × 121557029100474756503272699_<27> × 695518684009760291672111465950327636721_<39> × 8005448234107593578866311250000480120366520237696348121233492163931_<67> (Dmitry Domanov / Msieve 1.40 gnfs for P39 x P67 / January 27, 2011 2011 年 1 月 27 日)

10¹⁶⁹+18×10⁸⁴-19 = (1)₈₄3(1)₈₄_<169> = 3² × 67 × 766531 × 138094255347927378062437864088919082649_<39> × 3891696406263672104937083577078012907934651_<43> × 4472969010508965496068672580839255672968479596968381281985485370783307155462173_<79> (Dmitry Domanov / Msieve 1.47 snfs / January 27, 2011 2011 年 1 月 27 日)

10¹⁷¹+18×10⁸⁵-19 = (1)₈₅3(1)₈₅_<171> = 273136098444691339709_<21> × 1097902758173387624077_<22> × 1465332041484118052237966036237_<31> × 222096851425933155642183978925117479602444029_<45> × 1138507943203106583966884639042534032794974791609966199_<55> (Serge Batalov / GMP-ECM 6.2.3 + msieve B1=2000000, sigma=2135908759 gnfs for P31 x P45 x P55 / January 27, 2011 2011 年 1 月 27 日)

10¹⁷³+18×10⁸⁶-19 = (1)₈₆3(1)₈₆_<173> = 151 × 19562741309_<11> × 82124254395047_<14> × 5719056205621243694451122807_<28> × 13210248527089083163689785022501848953_<38> × 606239233391486965487278693412706597876485552533635622689915568760712963377751917_<81> (Serge Batalov / GMP-ECM B1=3000000, sigma=13913281 for P38 / January 27, 2011 2011 年 1 月 27 日)

10¹⁷⁵+18×10⁸⁷-19 = (1)₈₇3(1)₈₇_<175> = 3 × 563 × 1450598974316272109474849480200223_<34> × 206276754324107298929959269801116611_<36> × 10582892832241657211822415196622119324267_<41> × 207742707437838979617491913419593313134331849245279312026845249_<63> (Serge Batalov / GMP-ECM B1=2000000, sigma=1581073136 for P34 / January 27, 2011 2011 年 1 月 27 日) (Wataru Sakai / GMP-ECM 6.3 B1=3000000, sigma=2692803813 for P36 / April 18, 2011 2011 年 4 月 18 日) (Serge Batalov / Msieve 1.49 gnfs for P41 x P63 / April 19, 2011 2011 年 4 月 19 日)

10¹⁷⁷+18×10⁸⁸-19 = (1)₈₈3(1)₈₈_<177> = 7 × 13 × 61909 × 170231 × 20795700833657_<14> × 348277289544965875853110948405333163391339693181_<48> × 15996498951382439145338254716866459661424227535236180775814745953529543317619044395261918020093526169147_<104> (Jo Yeong Uk / GGNFS/Msieve v1.39 snfs / September 3, 2011 2011 年 9 月 3 日)

10¹⁷⁹+18×10⁸⁹-19 = (1)₈₉3(1)₈₉_<179> = 29 × 311 × 569 × 941 × 6301 × 87667028392552166473057_<23> × 293300645327975742210637378717545121032748194873749677_<54> × 14201637727231956165699288478327515501871129981403156108555421812451349922887104485806249_<89> (Jo Yeong Uk / GGNFS/Msieve v1.39 snfs / September 17, 2011 2011 年 9 月 17 日)

10¹⁸¹+18×10⁹⁰-19 = (1)₉₀3(1)₉₀_<181> = 3 × 3347 × 233056823 × 85050882978491_<14> × 4376348242527010195987_<22> × 1275639626469892164471099275541910539243164467965991336806863609617856241091151434245713055766098866847795976234607986554494747184281_<133>

10¹⁸³+18×10⁹¹-19 = (1)₉₁3(1)₉₁_<183> = 661 × 1051 × 20512531647281483269_<20> × 23755259272689790799_<20> × 117278096136477863874001561103274045772259_<42> × 2798706580932972789847738499223549128413052492222434101757238345505433887191429862094691644779569_<97> (Serge Batalov / GMP-ECM B1=3000000, sigma=1049703350 for P42 / January 27, 2011 2011 年 1 月 27 日)

10¹⁸⁵+18×10⁹²-19 = (1)₉₂3(1)₉₂_<185> = 29 × 719 × 64679 × 271657 × 11719037711_<11> × 1359182692109927_<16> × 178269384425270000484257352404107883_<36> × 22944046480987696558456233829454041753036493_<44> × 465510883688420217153983121526221935360126068938420535238985959909_<66> (Serge Batalov / GMP-ECM B1=2000000, sigma=1673550252 for P36 / January 27, 2011 2011 年 1 月 27 日) (Dmitry Domanov / Msieve 1.40 gnfs for P44 x P66 / January 28, 2011 2011 年 1 月 28 日)

10¹⁸⁷+18×10⁹³-19 = (1)₉₃3(1)₉₃_<187> = 3³ × 739 × 1362294570401861591037671_<25> × 40876929152651015249886070367573157000413527805654127339120164818799451473314221914996981765766751108501072211682783519532704676322911026845919419602790856497_<158>

10¹⁸⁹+18×10⁹⁴-19 = (1)₉₄3(1)₉₄_<189> = 7 × 13 × 3803 × 422098957667177583752315833301941_<33> × 42832224028561658263140128375405526644769344167668254754296730582540881_<71> × 17758442268205737198805326294420681682297521037450124005574139092875059249470867_<80> (Serge Batalov / GMP-ECM B1=2000000, sigma=2861177825 for P33 / January 27, 2011 2011 年 1 月 27 日) (Jo Yeong Uk / GGNFS/Msieve v1.39 snfs / October 24, 2011 2011 年 10 月 24 日)

10¹⁹¹+18×10⁹⁵-19 = (1)₉₅3(1)₉₅_<191> = 3011 × 27059 × 78852503 × 1729495788451147144037663197634183607011251091530200414048666346093924208028873783728259861676287616822076675769855237065381446056507548458920318013887530249256447422138665913_<175>

10¹⁹³+18×10⁹⁶-19 = (1)₉₆3(1)₉₆_<193> = 3 × 6203 × 10589 × 15661 × 90173 × 383255900670858115477_<21> × 95664901653816794754139_<23> × 609803621589869590416569269_<27> × 178587895478401058047056908216742899498244383926986077710127752802403441090406368896643894397141026173641_<105>

10¹⁹⁵+18×10⁹⁷-19 = (1)₉₇3(1)₉₇_<195> = definitely prime number 素数

10¹⁹⁷+18×10⁹⁸-19 = (1)₉₈3(1)₉₈_<197> = 89 × 6606640687_<10> × 18896736024152446810335410236193296304324806585086719835205970219529351230889653134845898799580729962832318023485752571981279444261765607100450313331819936591618225031551468082025781777_<185>

10¹⁹⁹+18×10⁹⁹-19 = (1)₉₉3(1)₉₉_<199> = 3 × 89 × 6832669 × 33971761 × 1849059551_<10> × 983156186741924957449_<21> × 9861985779896495968033153717111272557457624422383971289289427594281901601735810668416784748676066786013068045431568473450995324586639921599599551732063_<151>

10²⁰¹+18×10¹⁰⁰-19 = (1)₁₀₀3(1)₁₀₀_<201> = 7 × 13 × 503 × 61463 × 160621 × 32402551 × 419137601257181_<15> × 1830202338453940709284356487_<28> × 9892295958256770032463260989406802078245367559305648516155790466112044226883365905665604286646398434978142956332818524858684771918295197_<136>

10²⁰³+18×10¹⁰¹-19 = (1)₁₀₁3(1)₁₀₁_<203> = 769 × 16603862669_<11> × 59021359351469264151276811679_<29> × 14743914724602696679882143228650156913932825729223777772364970195336577912098475715680616976561946855837358837698437575255480527616349646954448702356734970022269_<161>

10²⁰⁵+18×10¹⁰²-19 = (1)₁₀₂3(1)₁₀₂_<205> = 3² × 2614123 × 44392717 × 17655368062011612429586799534000607498665508790752438073560141899778613613_<74> × 60256022554562442489564749352447256703495040889057449007304403028061314964894917018946296972306952351940986536510213_<116> (Alfred Reich / Msieve 1.53 for P74 x P116 / October 31, 2016 2016 年 10 月 31 日)

10²⁰⁷+18×10¹⁰³-19 = (1)₁₀₃3(1)₁₀₃_<207> = 7591 × 783600312909839_<15> × 3724161603139849816143766890223038700947334723_<46> × 3712578004916249190523260349678311450899510681449_<49> × 1351013824005414412487323308503097892088692490791779062705509405260056382712633404788177272957_<94> (Alfred Reich / GMP-ECM 7.0 B1=100000000, sigma=3:2061620941 for P46, Msieve 1.53 for P49 x P94 / October 29, 2016 2016 年 10 月 29 日)

10²⁰⁹+18×10¹⁰⁴-19 = (1)₁₀₄3(1)₁₀₄_<209> = 5412881 × 6920911399993304356785857263_<28> × 43979205777168314111876628821260607196683593_<44> × 6744012079046892393118323805284783228125740835660349734455231544005559776838566546506852832325872804509355253759628403600772073809_<130> (Alfred Reich / GMP-ECM 7.0 B1=10000000, sigma=3:2535477616 for P44 x P130 / October 19, 2016 2016 年 10 月 19 日)

10²¹¹+18×10¹⁰⁵-19 = (1)₁₀₅3(1)₁₀₅_<211> = 3 × 733 × 2129 × 10093 × 53152020445010910292035513548313317887083011001219524692218081475211848064039_<77> × 442401457086927585796517615466433750640752511065435856039157111599907177703852799212924684484012198237060047466043379636883_<123> (Bob Backstrom / Msieve 1.44 snfs for P77 x P123 / October 12, 2020 2020 年 10 月 12 日)

10²¹³+18×10¹⁰⁶-19 = (1)₁₀₆3(1)₁₀₆_<213> = 7 × 13 × 113 × 176221 × 1780206499474175002409_<22> × 13421123328763006258385897341783384364834753649462963037_<56> × 32541980890198100469051894273915652211105399673321381901_<56> × 78863629075380483607141285084158690161969896938430369034377806425702969_<71> (ebina / Msieve 1.53 snfs for P56 x P56 x P71 / May 12, 2022 2022 年 5 月 12 日)

10²¹⁵+18×10¹⁰⁷-19 = (1)₁₀₇3(1)₁₀₇_<215> = 4937 × 688570926075738761793701040747986834039838059917273384859733868907_<66> × 3268478872690506301659422342249499184078937749102011318825726922703650641672217063205900587047659775440800975275221222218671375248884081338078829_<145> (Bob Backstrom / Msieve 1.53 snfs for P66 x P145 / September 21, 2017 2017 年 9 月 21 日)

10²¹⁷+18×10¹⁰⁸-19 = (1)₁₀₈3(1)₁₀₈_<217> = 3 × 97 × 8654837 × 441169630454236550357600426891934176349565692143304148310980858795319770076596034031058187486373668071535135615628003277286657752663991861461831382912007550356346931620924554039034642050376095735718837794233_<207>

10²¹⁹+18×10¹⁰⁹-19 = (1)₁₀₉3(1)₁₀₉_<219> = 13878217 × 370111109 × 502389545751889687006318759_<27> × 109208718222097569832577072616215064030627269_<45> × 1495517513060797746420497391344488306663601104511650508044467647_<64> × 263634528332604085923524210607910406017958770836997732881817363737151_<69> (Alfred Reich / GMP-ECM 7.0.4 B1=1049107856939 for P45, Msieve 1.53 for P64 x P69 / October 29, 2016 2016 年 10 月 29 日)

10²²¹+18×10¹¹⁰-19 = (1)₁₁₀3(1)₁₁₀_<221> = 91724420916542688301064833171797490107989129901916417091714422909_<65> × 121135800041962427139366222375967114426192247239163123579198372019252179489945002366817181552314250195651545843024799060799481746874835452044645979287685779_<156> (RSALS + Lionel Debroux / ggnfs-lasieve4I14e on the RSALS grid + msieve for P65 x P156 / June 29, 2012 2012 年 6 月 29 日)

10²²³+18×10¹¹¹-19 = (1)₁₁₁3(1)₁₁₁_<223> = 3² × 163 × 832668181949162601756495497629_<30> × 3852240807156427362914266606804238713396260803_<46> × 236125004724617715347644617675634906954481547814898290162264689559847406774477571705869332338143249713525177411893543527904687203298862336937059_<144> (Serge Batalov / GMP-ECM B1=250000, sigma=2272528183 for P30 / November 9, 2011 2011 年 11 月 9 日) (yas mat / GMP-ECM 6.4.4 [configured with GMP 6.0.0] [ECM] B1=43000000, sigma=1123058053 for P46 / August 20, 2014 2014 年 8 月 20 日)

10²²⁵+18×10¹¹²-19 = (1)₁₁₂3(1)₁₁₂_<225> = 7 × 13 × 622337 × 30949107649_<11> × [63393151793679474990732542024997238383924285590528780645067689831157533973267314090366909441646809256506937024527973026781387847138338049340521349796815829103716107003052896252683195852981024975438412635717_<206>] Free to factor

10²²⁷+18×10¹¹³-19 = (1)₁₁₃3(1)₁₁₃_<227> = 54601 × 212579 × 6356923 × 150587728771133437457358067517434413698262592004963294230319423092737524388643598128962033775480004314708251852598258014907679984080856903508174948489012582210147786392652110576834096164541875523302838359586783_<210>

10²²⁹+18×10¹¹⁴-19 = (1)₁₁₄3(1)₁₁₄_<229> = 3 × 1251355933659746209_<19> × 91736221158031801183663917109_<29> × 11649561105699409037823768746880682693_<38> × 276952294992088578552459260430738971821581184216892973483309733729812917239460181393177322833407930327530798736526071086834687775837611399241189_<144> (Dmitry Domanov / GMP-ECM B1=11000000, sigma=854987352 for P38 / November 27, 2011 2011 年 11 月 27 日)

10²³¹+18×10¹¹⁵-19 = (1)₁₁₅3(1)₁₁₅_<231> = 2557 × 68651454202577_<14> × 191639976986590313235157304821_<30> × [3302865673498725036350876053302215833712771220943373368945914953129839800542670268610539145387364017135356788326187755724996944030275637982638097897334531950355118944806950591865444919_<184>] (Serge Batalov / GMP-ECM B1=250000, sigma=3314007471 for P30 / November 9, 2011 2011 年 11 月 9 日) Free to factor

10²³³+18×10¹¹⁶-19 = (1)₁₁₆3(1)₁₁₆_<233> = 1553 × 2467 × 38802579892368783397_<20> × [74740548995180341242671855476353074777949791887616899829095610422371575814409221907061000436826479473994972426488053388092673112930405285678011004158976435040111285377927910919502718871506486424348767773113_<206>] Free to factor

10²³⁵+18×10¹¹⁷-19 = (1)₁₁₇3(1)₁₁₇_<235> = 3 × 29 × 67 × 146681 × 991732681 × 657332765269_<12> × 1941339632059815085064909_<25> × 397140918243402969967419777621731789_<36> × 2313586667939249076366133369485504095551_<40> × 1117577728247414853134543650434124809637006539299514485765489979953515189291626215652542708395064204082601_<106> (Dmitry Domanov / GMP-ECM B1=3000000, sigma=3756216535 for P36 / November 19, 2011 2011 年 11 月 19 日) (Wataru Sakai / GMP-ECM 6.3 B1=3000000, sigma=612196550 for P40 / November 24, 2011 2011 年 11 月 24 日)

10²³⁷+18×10¹¹⁸-19 = (1)₁₁₈3(1)₁₁₈_<237> = 7 × 13 × 71 × 1753403 × 2898771203_<10> × 1571159148493761309051067_<25> × [2153485180196534382487755314721961231877623089188457387209553968283042664524333380165677353249750394537357703892378531923278661577951451274368531703531094967216983721669586469948384299325211417_<193>] Free to factor

10²³⁹+18×10¹¹⁹-19 = (1)₁₁₉3(1)₁₁₉_<239> = 331 × 359 × 23879 × 137219 × 546719 × 141449262401_<12> × 369011421440465619690949681902683683544035074318328334724401549748536842356934883150889884554304548713584375964713388400360172735486189688949925542749726857130392704935082638458335487043553479514481611317161_<207>

10²⁴¹+18×10¹²⁰-19 = (1)₁₂₀3(1)₁₂₀_<241> = 3⁴ × 29 × 1273739 × 4262805801389175701_<19> × [87116110914176549302628325394838904262351805679639051302289135263251142302410189678098956723576690097925601685776525443075100702405712841535721625606590649222605918185388013091782623925088143003865662503660530501_<212>] Free to factor

10²⁴³+18×10¹²¹-19 = (1)₁₂₁3(1)₁₂₁_<243> = 156253 × 203197393647923227482965989997_<30> × [3499540251348024579969146447621754510959185619693552719838036962540601886762710132366600606997611418313795201936153593815124976052085834708228551283447349850464841052796974637483623529458837187756364450303071_<208>] (Serge Batalov / GMP-ECM B1=1000000, sigma=2776947241 for P30 / November 9, 2011 2011 年 11 月 9 日) Free to factor

10²⁴⁵+18×10¹²²-19 = (1)₁₂₂3(1)₁₂₂_<245> = 593 × 9127 × 28859 × 6625747 × 78401267831_<11> × [136941643000890530986584212206322979624029195488913026362328023365276275204492867181427170705915854461631855991283972456851197514062215946346375011396869186624860564548943264945095144883028477671235930928995164771927_<216>] Free to factor

10²⁴⁷+18×10¹²³-19 = (1)₁₂₃3(1)₁₂₃_<247> = 3 × 370370370370370370370370370370370370370370370370370370370370370370370370370370370370370370370370370370370370370370370370371037037037037037037037037037037037037037037037037037037037037037037037037037037037037037037037037037037037037037037037037037_<246>

10²⁴⁹+18×10¹²⁴-19 = (1)₁₂₄3(1)₁₂₄_<249> = 7 × 13 × 1787 × 1064966059_<10> × 149745305299_<12> × 9504095648202873874426063_<25> × 455541089184601377787980721_<27> × 989610305189240506040195993110745234980197419493624884587319444637773518276558659168192313638132567602296571555651894231892350112296619846295543845743796151173034436946481_<171>

10²⁵¹+18×10¹²⁵-19 = (1)₁₂₅3(1)₁₂₅_<251> = 16749581 × 663366511145031694292001161767038298516906847467474625849512958629300106737661742769034706665862931801763346265862478059069735004780782940845571666008308572680779961666570113670969507303562465897571474242317530875017775734874270055538172036131_<243>

10²⁵³+18×10¹²⁶-19 = (1)₁₂₆3(1)₁₂₆_<253> = 3 × 827 × 1908392897_<10> × 11129820907091896304013345108406907871771019_<44> × 21085055999598475133195326227171579585249618205328681710073800126554973231060108290480534897265106604432996124993718214301065281376811808099604859443258094925386383998251896549734009841680110944517_<197> (Alfred Reich / GMP-ECM 7.0 B1=10000000, sigma=3:3713929287 for P44 x P197 / October 21, 2016 2016 年 10 月 21 日)

10²⁵⁵+18×10¹²⁷-19 = (1)₁₂₇3(1)₁₂₇_<255> = 863 × 21671393 × 21361907807_<11> × 114968419773824385666577_<24> × [2419030078273687486919739710827886567398906088211280225737466065894161415938613586781630193856453041936091960827147473860890097707214560343272178663778002834547269312266650676911735686167361677331878110472411511_<211>] Free to factor

10²⁵⁷+18×10¹²⁸-19 = (1)₁₂₈3(1)₁₂₈_<257> = 631 × 663660292363_<12> × 1650407408731253_<16> × 16997756627021509244109250320353_<32> × [945800471126944657894400062396099439680654732785759553159841705353447419772144850628145939050246096305308756765449273218482051927451093673172592668767258100740060618265166942783109490524152864743_<195>] (Makoto Kamada / GMP-ECM 6.3 B1=1e6, sigma=741801282 for P32 / November 7, 2011 2011 年 11 月 7 日) Free to factor

10²⁵⁹+18×10¹²⁹-19 = (1)₁₂₉3(1)₁₂₉_<259> = 3² × 1022843317_<10> × 10847844402713_<14> × 35207847865810796591436513184621_<32> × 316026093702121321154302867384442154978180346861425669139823068324338135384200009500579260123286441583180961794038569133303082831432415507962162837112659347962476899010413182089295342963726682748825604919_<204> (Dmitry Domanov / GMP-ECM B1=3000000, sigma=2192103452 for P32 / November 22, 2011 2011 年 11 月 22 日)

10²⁶¹+18×10¹³⁰-19 = (1)₁₃₀3(1)₁₃₀_<261> = 7 × 13 × 2287 × 2671 × 171167 × [1167766484570921627770130594994002136037062241222802255962697183125599802526687114279586775076173822991116970641086133817065415322725891760367018424119604446863605634329519493366254237781856262358506118662557372629341033261331171473984065345722619_<247>] Free to factor

10²⁶³+18×10¹³¹-19 = (1)₁₃₁3(1)₁₃₁_<263> = 97 × 131 × 1093 × 3452425534965653_<16> × 37963108963270951607516293531923301_<35> × [6103911203819330077949544779433712380524828208717634804393247380220321624858696583401373969868627386565532845859370127123476619535750939995237466846962727288722438697337120153392653717590606081869703642337_<205>] (Serge Batalov / GMP-ECM B1=1000000, sigma=423010420 for P35 / November 9, 2011 2011 年 11 月 9 日) Free to factor

10²⁶⁵+18×10¹³²-19 = (1)₁₃₂3(1)₁₃₂_<265> = 3 × 917513 × 187352950644878188725140013772726793_<36> × 2154584207319279757711624118374290717232151790665615129654389679622268610779600833159524628552441578347805787413271434890750224789594296822901056924604391783493579500708442743166395188604795248119560040438589543709342275293_<223> (Lionel Debroux / GMP-ECM 6.3 B1=3000000, sigma=3006516415 for P36 / November 10, 2011 2011 年 11 月 10 日)

10²⁶⁷+18×10¹³³-19 = (1)₁₃₃3(1)₁₃₃_<267> = 84449 × 59829335597_<11> × 225320355278519_<15> × 97599675094246896533717012879675059284132169405642635285878406107751336164265462011331365947530621403926810540805644608885338119123150146548895870436404619615748306570547297718044938220709902704116484226133260552112856040482965352896373_<236>

10²⁶⁹+18×10¹³⁴-19 = (1)₁₃₄3(1)₁₃₄_<269> = 17661206009_<11> × 382399918261301_<15> × 683199965750704446735969913296427_<33> × 2408083308912577296846631806602012277397292214551241832256093929046721033922399643854168016743600543064415833140770389913936017570894184222599235784272791837823773037404426197444996711820312062107352955036822377_<211> (Dmitry Domanov / GMP-ECM B1=3000000, sigma=3673650781 for P33 / November 22, 2011 2011 年 11 月 22 日)

10²⁷¹+18×10¹³⁵-19 = (1)₁₃₅3(1)₁₃₅_<271> = 3 × 3552917 × 10404340959316315157804218671953_<32> × 10019281943382206279370517556462817638518429657626174705008948077352100382520902214466550355468090533038908668371083044356713207889739222293862259457009962653186690682511766819565099931108105832069061290291748671713983671723936541737_<233> (Serge Batalov / GMP-ECM B1=1000000, sigma=563790612 for P32 / November 9, 2011 2011 年 11 月 9 日)

10²⁷³+18×10¹³⁶-19 = (1)₁₃₆3(1)₁₃₆_<273> = 7 × 13 × 45466144454301184227683_<23> × [26855174012576998935004761542044338277596257971985468099529518684389938294466989184743110059605760420988151998210513922411657201726558946323781070587967453766534173360711498007020964455020877854316548095063777084690707358106696632162217220028301687_<248>] Free to factor

10²⁷⁵+18×10¹³⁷-19 = (1)₁₃₇3(1)₁₃₇_<275> = 2524063223002910553513776538856602585072283259_<46> × [4402073216649493823492269288482531811411386180360539932876021248745211302452234291122994361955411405786141142436951607386379315944377504935066508361338175321023902746116396020238439480204846800552078181351781403262071720850427429_<229>] ([AF>Le_Pommier>MacADSL.com]Bertrand / GMP-ECM B1=110000000, sigma=1582994029 for P46 / June 4, 2012 2012 年 6 月 4 日) Free to factor

10²⁷⁷+18×10¹³⁸-19 = (1)₁₃₈3(1)₁₃₈_<277> = 3² × 8615835991954955267607028819273_<31> × 166630692592728831852116323718177929_<36> × [85992892706326442314522074760132016248445407019724048043435651429781566517582364400962769093653848048766402822412997014588080034552838870740747354847628273700827209482286315100615884056035775254141604586101087_<209>] (Makoto Kamada / GMP-ECM 6.3 B1=1e6, sigma=585988113 for P31 / November 7, 2011 2011 年 11 月 7 日) (Serge Batalov / GMP-ECM B1=1000000, sigma=3491358478 for P36 / November 9, 2011 2011 年 11 月 9 日) Free to factor

10²⁷⁹+18×10¹³⁹-19 = (1)₁₃₉3(1)₁₃₉_<279> = 600073 × 10973197 × 8607716329741_<13> × 1960343973489616655045443064293767374324254244345548970999044416140708456414404136734109804140546211180609620677616837915705060944235914197340057567582670793048484154228851764318165169253104779752548453993261729756745842549899868357534598156439989159991_<253>

10²⁸¹+18×10¹⁴⁰-19 = (1)₁₄₀3(1)₁₄₀_<281> = 270737325236437_<15> × 7508702249948609_<16> × 156149813405776053529_<21> × 35002817515553505950384319176047978380608919735361434126150656164736385780911100041488554001534053474161211194670684396117792742760343009442257878528222360734803434079702915619031902681079111048078031276218336994899243771835842723_<230>

10²⁸³+18×10¹⁴¹-19 = (1)₁₄₁3(1)₁₄₁_<283> = 3 × 4877 × 11295979 × 5566645757_<10> × 101421976543_<12> × 1239570782913209_<16> × 9606443164090189476673912216389855890653460717897179832493440901048997093939501937332066115067613838021160881575724747558159490496288856527882498117557006147561777382807870784297818034455819774861804640526033930090803192402767751955721_<235>

10²⁸⁵+18×10¹⁴²-19 = (1)₁₄₂3(1)₁₄₂_<285> = 7 × 13 × 89 × 1012289 × 81187764064101574449764773_<26> × 166928692997830240169288304323908410983984932000046896294600364495869609990689989760590270834745137555234061789741332303903251294107625282457435729210249784137070183343735890204308975008571043763406036812433372052490625228026623655169164694877523337_<249>

10²⁸⁷+18×10¹⁴³-19 = (1)₁₄₃3(1)₁₄₃_<287> = 89 × 229 × 14957 × 3080476036683751768011896226979943_<34> × 422762455869999390718247350109454623_<36> × [27988089955927731827971224306475307852703757746798638879307707532249867150400231383990744539542655480831857769254330742273454018551494533613350125886703031112677272329208208961069838506785655896794570235820247_<209>] (Lionel Debroux / GMP-ECM 6.3 B1=3000000, sigma=2890537313 for P36 / November 10, 2011 2011 年 11 月 10 日) (Lionel Debroux / GMP-ECM 6.3 B1=3000000, sigma=1371691855 for P34 / November 11, 2011 2011 年 11 月 11 日) Free to factor

10²⁸⁹+18×10¹⁴⁴-19 = (1)₁₄₄3(1)₁₄₄_<289> = 3 × 83719 × 215489823021729448061344335017393907545883188657_<48> × 20529834067404447998179675293687840204309668117647100267829169482265995485683665413722014481838330954957631487498323935556455391335063950156266158473057649266076570345702754334037910823438419164605695109584575233834162669678681197163739_<236> (Dmitry Domanov / GMP-ECM B1=43000000, sigma=4272203601 for P48 / December 2, 2011 2011 年 12 月 2 日)

10²⁹¹+18×10¹⁴⁵-19 = (1)₁₄₅3(1)₁₄₅_<291> = 29 × 196286998483091_<15> × [19519467178826556194253712321510575159650880264838444327409018032222698712651629198640264580459868342160883262464179545989944510883319958273060923290543720315139751215302176725116018422489821536671211267324857192397389128852792497337373323171173243187480203155927014031649249_<275>] Free to factor

10²⁹³+18×10¹⁴⁶-19 = (1)₁₄₆3(1)₁₄₆_<293> = 161966257 × 621075110703539598697_<21> × [110455874716001229659195249433181476790989984469278438846576242703436615352637765678143814978226350279220155402019825528699730638902690641729355489858718371049325214986519803204430030783802061829821868248402571702694333886652593288038635976810293976099551620734559_<264>] Free to factor

10²⁹⁵+18×10¹⁴⁷-19 = (1)₁₄₇3(1)₁₄₇_<295> = 3³ × 1163 × 5431 × 11828812499569939_<17> × 1537896019077634053974191684379194883_<37> × [358150934244588206887309875237539770524517174876279610038990373420948930273015282435872540667000600033176073304040171595304341832334138409421825312204000079504704348289329940421215049092380825337308426835798581590091975639263575039313_<234>] (Serge Batalov / GMP-ECM B1=1000000, sigma=3084535066 for P37 / November 9, 2011 2011 年 11 月 9 日) Free to factor

10²⁹⁷+18×10¹⁴⁸-19 = (1)₁₄₈3(1)₁₄₈_<297> = 7 × 13 × 29 × 12959 × 1099247 × 54355510507380770987482681_<26> × 6833346186398256359664453534526157077_<37> × 1941375394600204306532185441083406124453_<40> × 4098876170690998554131346729636226064504760674762715381787846976253735418695630275864699875887674080615720903404744369027623390205803500752322600534760738415881607769526262987380633_<181> (Dmitry Domanov / GMP-ECM B1=3000000, sigma=2739670139 for P40 / November 13, 2011 2011 年 11 月 13 日) (yas mat / GMP-ECM B1=11000000, sigma=2629679305 for P37 x P181 / January 5, 2015 2015 年 1 月 5 日)

10²⁹⁹+18×10¹⁴⁹-19 = (1)₁₄₉3(1)₁₄₉_<299> = [11111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111311111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111111_<299>] Free to factor

10³⁰¹+18×10¹⁵⁰-19 = (1)₁₅₀3(1)₁₅₀_<301> = 3 × 67 × 503 × 2344073054318981_<16> × 284793581746661704921_<21> × [16462360503071845523653803751584963210632198669139637586655019234640906156401752939288585856712721744358832428460935203386859509417723904798119120065924644261248149890756723458117508007286446324020902641657577856942540130329559137813252583094239233296735116637_<260>] Free to factor

plain text versionプレーンテキスト版

4. Related links 関連リンク

Palindromic Wing Primes (Patrick De Geest)
A077779 - OEIS (The OEIS Foundation Inc.)
A107123 - OEIS (The OEIS Foundation Inc.)