Tabelle der Faktorisierungen der Partitionszahlen von 6000..6999
ermittelt mit qsieve-2.71 von Thorsten Reinecke
(Angaben ohne Gewhr) 
--------------------------------------------------------------------------------
Factorization of P6000:
4671727531970209092971024643973690643364629153270037033856605528925072405349246129 (82) = 
7 * 617 * 91509679 (8) * 378905447 (9) * 22833052523415996929 (20) [ecm,sigma=1970832622] * 1366257142518238364124813172294497533615383 (43)

Factorization of P6001:
4748931791550043415662355421559254508566954219859829030548344121059219957163947634 (82) = 
2 * 11 * 23 * 37 * 47 * 97 * 435187 (6) * 13385387 (8) * 245751997 (9) * 4086308203 (10) * 3120891961909 (13) * 3047616690897311195588077705253 (31)

Factorization of P6002:
4827405391257256220657204928669120483710979313920929113594902780137072382484086003 (82) = 
3^3 * 178792792268787267431748330691448906804110344960034411614626028893965643795706889 (81)

Factorization of P6003:
4907169094000646172228472774148153059313671835285890857591117896004074697811664251 (82) = 
4331276896250660097103 (22) [ecm,sigma=120678039] * 1132961297913902289399932447762285014704342051475930089354517 (61)

Factorization of P6004:
4988244000576669085523687430397114192209262846098438333673026539167341198985744800 (82) = 
2^5 * 3 * 5^2 * 7^2 * 11^2 * 338197 (6) * 14757031 (8) * 11612791 (8) * 6048527317902133899653586639070975678921651773344860499 (55)

Factorization of P6005:
5070651555139987575138354447506090234123484582484067867023214894543399437682509144 (82) = 
2^3 * 151 * 841663 (6) * 4987220816867804493082803562655567264293574742795025198794992548518517811 (73)

Factorization of P6006:
5154413550762138722022645832512165026261738752216463402329842613921539486965849599 (82) = 
13 * 29 * 1013 * 2011 * 1646189 (7) * 475173449 (9) * 96181512331 (11) [phi1] * 1502882644493 (13) [phi2] * 59356442256435124094221694596455443 (35)

Factorization of P6007:
5239552135079731887401383801060306375845394428411638104341277439286538920234507896 (82) = 
2^3 * 17 * 167 * 230695321199354169047260646401034976041096972015306362466593758334208300468233 (78)

Factorization of P6008:
5326089816033611316785658251223471718874500758943587934757335066506426121142530466 (82) = 
2 * 151 * 15731 * 31121 * 4181773 (7) * 1432919923002337691 (19) [phi2] * 6011866014639257605335526814616398995898978531 (46)

Factorization of P6009:
5414049467700441048680657295261496889537905320500105563915992654019903762964429420 (82) = 
2^2 * 5 * 13 * 17 * 91286293642198484756827340142917049627941 (41) * 13418203552184273829397103652853712911 (38)

Factorization of P6010:
5503454336218192876884309516518281559255836121418013147714927368424789245298827509 (82) = 
127 * 7305917251883 (13) [phi1] * 5931395691729940759130390774165041970787213308663844672351459375649 (67)

Factorization of P6011:
5594328045807041718049549086679395022382399851076127152452515482085357416192337258 (82) = 
2 * 3 * 7^2 * 44131 * 15019547 (8) * 9432391 (7) * 225931252469508986737 (21) [ecm,sigma=418928808] * 13471063739111263089739987805059512086353 (41)

Factorization of P6012:
5686694604887196713263704812974158148115554428411132612011789516939015493131851571 (82) = 
11 * 151 * 548069 (6) * 1980075714318851 (16) [ecm] * 3154810212628771075727651761011893968482954140352212482369 (58)

Factorization of P6013:
5780578412295220749687240184709894913049193236646991749670001181846944365787101573 (82) = 
3 * 7 * 139 * 211 * 10079 * 43911293174167 (14) [phi2] * 91241404396844273531 (20) [ecm,sigma=187610753] * 232417653755905142600606308839154822459 (39)

Factorization of P6014:
5876004263600415831789091966884000774473454631444374174970461814513782168134594475 (82) = 
3^3 * 5^2 * 1697 * 336223 (6) * 15285691270288291 (17) [phi1] * 998122818841683316048199274972202171709891164252198637 (54)

Factorization of P6015:
5972997357522876867509575768365604999009179242024550856769433844169188960232501390 (82) = 
2 * 5 * 103 * 3037297 (7) * 1909272145826312738420249169607887909957975901619983404562545471829284029 (73)

Factorization of P6016:
6071583302454841968962271915050593733236104447354082388050912181435824523845914693 (82) = 
3 * 2801 * 198647 (6) * 2883760396159 (13) [ecm] * 56669694042167775195217 (23) * 22257456980594787698666871958149543391 (38)

Factorization of P6017:
6171788123086993306338608235639372788581283347218909139516653188819301846402425297 (82) = 
47 * 131 * 733 * 1216123 (7) * 47802074303 (11) [phi1] * 23524133498454825456463433014867202207372417238592144074373 (59)

Factorization of P6018:
6273638267141388903886779324553575036926172780231608915600038343002926391817696021 (82) = 
7^2 * 11 * 47 * 59^2 * 2553580721449 (13) [ecm] * 65194018228829311 (17) [ecm] * 427337974403159964982945045291564027432616543 (45)

Factorization of P6019:
6377160612212732534684112519905952185544107275063299494168168702361355750601397825 (82) = 
3 * 5^2 * 37 * 9898397 (7) * 8544819431 (10) * 27170436133319798175964443458157040216185987987537676995809269 (62)

Factorization of P6020:
6482382472719716062994667687176654766693612299118522635791829391174746248416015026 (82) = 
2 * 4426151 (7) * 93921464569 (11) [phi1] * 4006497155946443 (16) [ecm] * 1946026433156638789156159076569300049645613176389 (49)

Factorization of P6021:
6589331606968196205990717800689355334283491748795984484016669334472115793564663697 (82) = 
23 * 9067 * 234217 (6) * 85356317 (8) * 6532850347 (10) * 241931891526165627610367413173332589406779935040560099 (54)

Factorization of P6022:
6698036224327995747311708183339101085176074191079333474162393113732892182026064544 (82) = 
2^5 * 3 * 69771210670083289034496960243115636303917439490409723689191594934717626896104839 (80)

Factorization of P6023:
6808524992525147740237810752385568577141055647989675168032304720151943635004355185 (82) = 
5 * 11 * 11071 * 2755429 (7) * 179379544499 (12) [phi1] * 22622539436260942856061406174668178754965646319146288424887 (59)

Factorization of P6024:
6920827045051430195175984226070172633691174599416741237937288559511369691214743350 (82) = 
2 * 5^2 * 7 * 44111 * 78294973 (8) * 5725443980119883879807138481582690804972720472766804736774092342327 (67)

Factorization of P6025:
7034971988693068161813151258513860394621089089295785733280223514542207471810325585 (82) = 
3 * 5 * 7^2 * 17 * 571 * 5443 * 38197 * 798957217789 (12) [phi2] * 5936068314271998957692948641323019853961988656088533167 (55)

Factorization of P6026:
7150989911180509997913974119026961752391807722932501448249866105923852444997737062 (82) = 
2 * 3^3 * 7723 * 157877 (6) * 548892319 (9) * 2028250303531559 (16) [ecm] * 97557082110286623273638091988116163030951075783 (47)

Factorization of P6027:
7268911388961214971673394775737908096524886528751664981354072814833293441733535200 (82) = 
2^5 * 3^2 * 5^2 * 3339906235756926832247 (22) [phi2] * 302275260136401085340202602481406179181260848001266323753 (57)

Factorization of P6028:
7388767495097420180235392592839440688529005348374553004698525058508422378460098041 (82) = 
53 * 25166903 (8) * 1514425021842540851 (19) [phi2] * 14235958918333487 (17) [ecm] * 256940078937291332691518938532320694927 (39)

Factorization of P6029:
7510589807290886091035035645360794623715137774032083532107256793125889706864699765 (82) = 
3^3 * 5 * 71^2 * 11036302037795096638725466941980639678657435361931544346884813849582886562579 (77)

Factorization of P6030:
7634410416036651832705359220777325974012168950323169147247523411977789313655032847 (82) = 
3 * 29 * 58031 * 1054106020899707 (16) [phi2] * 1434537489274685100944752261404653013520566050030872009190693 (61)

Factorization of P6031:
7760261932907863686229016191091353609442565996666621579557294828142585822090661553 (82) = 
7 * 11 * 29401 * 3062957 (7) * 1119135450911478629188655243991662097565203593100968088532746376661777 (70)

Factorization of P6032:
7888177498973773062744628046318073280148270772095120218244487469483764181142231899 (82) = 
7 * 47 * 109 * 467 * 4837739 (7) * 26357141 (8) * 123215847661 (12) [phi2] * 289790628154052736559643421932771 (33) * 103453635910756133 (18)

Factorization of P6033:
8018190793353033610001352994591050789893997155405267480672435386414229100621033062 (82) = 
2 * 11 * 19 * 709 * 4513 * 18253 * 328438667748112859427113587111219873059832245160464822046391992084259 (69)

Factorization of P6034:
8150336041904460973080760284598259306047972009894652817278687505193418411272621020 (82) = 
2^2 * 3 * 5 * 7 * 11^2 * 13 * 179 * 193 * 1873 * 6733 * 290540436904499857 (18) [ecm] * 97461745496594360340593042503200665166117743077 (47)

Factorization of P6035:
8284648026057453154989360681370646313949035875772551504407837244097508880041487249 (82) = 
23 * 7757 * 354661 (6) * 89334593 (8) * 251039507 (9) * 992411853553 (12) [phi1] * 5882816758745914253634893386377138113526173 (43)

Factorization of P6036:
8421162091784304387515116682101295874048453114598914815850500615564961164692189295 (82) = 
5 * 53 * 151 * 383261 (6) * 3857322743 (10) * 1637910031915060188934950343707463 (34) * 86911762340537566820916190997 (29)

Factorization of P6037:
8559914158716680940916321159871214681614844666649801931096688813233298814133719566 (82) = 
2 * 3^2 * 223 * 10035877 (8) * 1038169986192656899 (19) [ecm] * 204676622707483334803462089234696179298738801106003903 (54)

Factorization of P6038:
8700940729408563381285185201634711725196541385138331828716577506461942034761988042 (82) = 
2 * 11^3 * 17 * 8931737 (7) * 123696953570688527 (18) [ecm] * 174026067842811049407842712002771594831769169658090977 (54)

Factorization of P6039:
8844278898747996435651622718191505820649426207944287724851834731352033634405149250 (82) = 
2 * 3 * 5^3 * 7^2 * 56681 * 37247981 (8) * 113989499052519945125420200767889157574084468015445972655959052891 (66)

Factorization of P6040:
8989966363520024856054008679245741386578667885290546138184487845828215318476941856 (82) = 
2^5 * 7 * 79 * 421 * 443 * 70901 * 23561390827750895921688000331153 (32) * 1630586533381871255790148724258243779 (37)

Factorization of P6041:
9138041432123231494032868019848163536625464471336403815657455763217609581999447140 (82) = 
2^2 * 3^2 * 5 * 7526475557 (10) * 4839319661475711684113 (22) [ecm,sigma=675937498] * 1393813452310137499364419582729153198793921356553 (49)

Factorization of P6042:
9288543034442332215573266804031474659805951842436355537251010609185723528491176407 (82) = 
3 * 163 * 461 * 114432131330197 (15) [phi2] * 360072393979689740209020963683420538024342263017210567626605839 (63)

Factorization of P6043:
9441510731879321312850092793989079773852693684578696967874613087174326897128603685 (82) = 
3 * 5 * 2470046533 (10) * 9735428761282248781400902651 (28) * 26175200312026472981901930430729518612799613 (44)

Factorization of P6044:
9596984727545700712782881903595870303539845812567339438193382782184077275476117965 (82) = 
5 * 13 * 9511 * 88007480713 (11) [phi2] * 3129710295567372749430509 (25) [ecm,sigma=1605471151] * 56360071796205810941999910865974258792703 (41)

Factorization of P6045:
9755005876618366553098606825730981232722417478933275871908926234945686885624431234 (82) = 
2 * 11^3 * 53 * 101 * 173 * 347 * 4834680633397721 (16) [phi1] * 113794588704367738164756498812921 (33) * 20727993389190883958189 (23)

Factorization of P6046:
9915615696861767604199248613056781695127153418915608446116412416972265893181652358 (82) = 
2 * 7^2 * 19 * 307 * 800741 (6) * 309810843269 (12) [phi0] * 69921857065897401714105937904014280452973684002040425159603 (59)

Factorization of P6047:
10078856379318991569657862537263056164799091894927718693243741080630551693163894725 (83) = 
5^2 * 7 * 57593465024679951826616357355788892370280525113872678247107091889317438246650827 (80)

Factorization of P6048:
10244770799174477509800961121009874113123480825163066653472669412395823069147124564 (83) = 
2^2 * 23 * 113 * 87631 * 93967 * 4974953 (7) * 23249757269 (11) [ecm] * 1034654714592603252454900741361787073932613094425631 (52)

Factorization of P6049:
10413402526791095511914442102290062631441939731147770228580725949754172706946894300 (83) = 
2^2 * 5^2 * 7^2 * 23 * 233 * 396563573267594681916533396128963392935856131061147191967002903745907997873 (75)

Factorization of P6050:
10584795838924378287634878408218610298902786536342946866449262237994738889289442322 (83) = 
2 * 41 * 2885451460393948861 (19) [ecm] * 41128142433843300462402392137 (29) * 1087716622547684665362258593451853 (34)

Factorization of P6051:
10758995730116733623721991055191655230065227642861097468328955035719994256063454715 (83) = 
5 * 41 * 245927030266526858253381469 (27) [ecm,sigma=1556744191] * 213408448610509991431001060588495691570055154100776467 (54)

Factorization of P6052:
10936047924274511557482672318796617097396393339419044702566680948741462469954188986 (83) = 
2 * 564251 (6) * 31341516288929111 (17) [ecm] * 309198990998118620691849516905382452480023648283584514595313 (60)

Factorization of P6053:
11115998886430845803632640311769965370410768492313818611006672869840867163958156714 (83) = 
2 * 7 * 293 * 532703641888373 (15) [ecm] * 4285210988437386315126809 (25) [ecm,sigma=834057607] * 1187120931985829222759873760705998069251 (40)

Factorization of P6054:
11298895834697235336511447755448602193272069168297676568665495264828751752047808140 (83) = 
2^2 * 3 * 5 * 23 * 20116843 (8) * 1126661 (7) * 83237863 (8) * 4339931840222999057023969762620878409405696478773903672347 (58)

Factorization of P6055:
11484786752406879141657713277818678379830783053746003371035264452291004686497853925 (83) = 
5^2 * 41 * 103 * 1213021 (7) * 11026307 (8) * 1292662756019 (13) [ecm] * 6291847818719502505896861722336154204503108789381063 (52)

Factorization of P6056:
11673720400452825005329206004031897185455322749917521977315034604319917571746005983 (83) = 
3 * 11 * 163 * 2170239895975613497923258227185703139143952918742800144509208887213221337004277 (79)

Factorization of P6057:
11865746329824041821322206964634446416977673547137873841939445549841821342905028923 (83) = 
1681476314659 (13) [phi1] * 163893595776163399 (18) [ecm] * 43056856712290739615535548586836603016657250474957103 (53)

Factorization of P6058:
12060914894342574273294914149965172066164698629582388453247964095713749308869603409 (83) = 
3^3 * 7 * 43 * 67 * 281153 (6) * 579578849 (9) * 1860775815277399463 (19) [phi1] * 131631506062557183969552392779 (30) * 554965566124729 (15)

Factorization of P6059:
12259277263604988909805028655708068799425529215152696323406786074807790703323858560 (83) = 
2^7 * 3^2 * 5 * 11 * 3890065131702858319 (19) [ecm] * 92836522400753942717620141760461 (32) * 535764535378316850026445569 (27)

Factorization of P6060:
12460885436131371580695384519944774384166800011039040469375068700931417670311895657 (83) = 
7^2 * 87056797 (8) * 293509666619633008348209977 (27) [ecm,sigma=1246825789] * 9952397867569880434589901653951504897826354997 (46)

Factorization of P6061:
12665792252725187959758680938652016666502511556271535832262646100715500179668514099 (83) = 
19 * 113 * 42903136651 (11) [phi1] * 1269827502453611063060981 (25) [ecm,sigma=562988752] * 108284561527547144153484639379015244290446407 (45)

Factorization of P6062:
12874051410047371452432932331896685608340509376670679060378696517765122411354737472 (83) = 
2^6 * 201157053281990178944264567685885712630320459010479360318417133090080037677417773 (81)

Factorization of P6063:
13085717474408056191470862765836597188064783692964802275194618104801055586171631736 (83) = 
2^3 * 5573 * 4014191 (7) * 57766132100701 (14) [phi1] * 48271242289 (11) [phi2] * 26221571234436680159832460074540823283586735521 (47)

Factorization of P6064:
13300845895779427071137711162246141259087396510972333435709487410054726517960857305 (83) = 
3^3 * 5 * 3461 * 153107 (6) * 1584322064141587521244773352305965917 (37) * 117356021095664793413870665097364277 (36)

Factorization of P6065:
13519493022033213874775363239385976962593605848791998207849886422245839343901020376 (83) = 
2^3 * 3 * 23 * 4922533423 (10) * 4975453304269576466550894632941627871339810569789067549453959944947281 (70)

Factorization of P6066:
13741716113406412524986145276729603206767732974762201347682585999632160128265143212 (83) = 
2^2 * 7^2 * 17 * 97 * 431409889 (9) * 17394353 (8) * 20721774961979164343 (20) [ecm,sigma=1053899261] * 273425438310314584582794896424055133340413 (42)

Factorization of P6067:
13967573357198873343907165416133575744377562712937084229776412315154311056660271694 (83) = 
2 * 7^2 * 11 * 47 * 131 * 68437 * 385797647093809 (15) [phi0] * 22789971719761 (14) [ecm] * 3497346981566482905377765129310874501488853 (43)

Factorization of P6068:
14197123882706453966949606212917363118148143664233381774173491102576951574999455241 (83) = 
23 * 79 * 149 * 375527 (6) * 139642626407617998808024485214385049176232191861785024627907570389453451 (72)

Factorization of P6069:
14430427776393493221067690441437777732786896952539584498165314949022948043482499235 (83) = 
5 * 647 * 57383 * 1814809 (7) * 34336679291 (11) * 1247476733772584639560827463150555798826638544944176949213 (58)

Factorization of P6070:
14667546097308421872420364989859575774058788951574950500724195287551120873118571963 (83) = 
3^2 * 2617 * 622746405863729540713300428389571425043892028683180507821687058444831693334971 (78)

Factorization of P6071:
14908540892746386682740077180745759250175727896207875506199029336935157431765365603 (83) = 
7 * 11 * 2383 * 244803647439136423017811 (24) [ecm,sigma=566922560] * 1059693234046282422256475497 (28) * 313200414141371229554194499 (27)

Factorization of P6072:
15153475214162825703599633598404519302541224542964297331402843993964269604669756199 (83) = 
7 * 23 * 29 * 1366014451079561999389081379 (28) [ecm,sigma=525943136] * 2375926903533355980468536128984628660123156460227249 (52)

Factorization of P6073:
15402413133341995198073123877629429969324341383158882073926014638518538902518416075 (83) = 
3^2 * 5^2 * 23 * 858293 (6) * 494152811 (9) * 1332558527904349 (16) [ecm] * 5266174918270129361577415860450447844414728533287 (49)

Factorization of P6074:
15655419758824512025257750146882185316423550332042236808965492496118838838776391500 (83) = 
2^2 * 5^3 * 7^2 * 829 * 1171 * 5576897 (7) * 5255204063 (10) * 3924518414991910575739537732363 (31) * 5722932546763050793328741 (25)

Factorization of P6075:
15912561252598039770235658532045416669171607483895491175393004751913325587282454709 (83) = 
3^2 * 23209 * 23216481566801570479 (20) [ecm,sigma=155382604] * 3281290996885101254744102063754071575490629579650391729291 (58)

Factorization of P6076:
16173904847055312366025796173814833872094000443947653022791389287138310138179640488 (83) = 
2^3 * 17 * 67 * 61447295948693 (14) [ecm] * 28886730963119025345985883877411063367902658098607041904256634043 (65)

Factorization of P6077:
16439518862223755450868188791023070583877396435424981120918339608479302148495939240 (83) = 
2^3 * 5 * 11 * 52937 * 436428392302224665032170276791 (30) [ecm,sigma=1283660904] * 1617201383997688150837732807561879537966150813 (46)

Factorization of P6078:
16709472723271033250008937656962865668647152201736294535669406017174255496390214591 (83) = 
7 * 11^3 * 645451283 (9) * 375377849753 (12) [ecm] * 2910802603998821597836679 (25) * 2542973209073308100190391866578063 (34)

Factorization of P6079:
16983836978290917382478947369296963713939926885271878508600092344516327468281370855 (83) = 
3 * 5 * 37 * 82723 * 123923 (6) * 15954973 (8) * 128942809 (9) * 1451013437273745859035559890847318966278964204189544137 (55)

Factorization of P6080:
17262683316373943686905316181484886370051438043816552822827764929636082547731619014 (83) = 
2 * 71 * 293 * 2843 * 279131 (6) * 9537503085283 (13) [phi1] * 54819202869790279735882930619881490056971777560150017571 (56)

Factorization of P6081:
17546084585967393953144965781995361318412939661676907097185195161885929369423557885 (83) = 
3^3 * 5 * 7 * 17 * 241545181 (9) * 955074464783 (12) [ecm] * 4734388333141090079927147223555710008444164316334807057423 (58)

Factorization of P6082:
17834114813529211355734148420075755026098132756738118610442803706421472430981790196 (83) = 
2^2 * 547 * 599 * 10711 * 7374507071878646023 (19) [ecm] * 172271883672610236576614278068668287177282070891225561 (54)

Factorization of P6083:
18126849222480531428322931000037452142141508711810640749238757800916880075637370135 (83) = 
5 * 13 * 19 * 59 * 248773062821389301150386756330713677926871731445970503660725420996594799638199 (78)

Factorization of P6084:
18424364252461584613202079684875336255656980720055775265347297863272972472609900730 (83) = 
2 * 5 * 37 * 5653 * 47599 * 222365035173383 (15) [ecm] * 10163390678657 (14) [ecm] * 81885848431676963564969194955744657834633897 (44)

Factorization of P6085:
18726737578895801784800140479941542035572943753667380778549964937651366291581835307 (83) = 
7 * 11 * 2719 * 147483013097479 (15) [phi1] * 542633791613 (12) [phi1] * 30500012123661789067 (20) [ecm,sigma=901244317] * 36644883302435813072654419923121 (32)

Factorization of P6086:
19034048132867030698982154656851514546963533193480919458498707449249884557408662072 (83) = 
2^3 * 3^2 * 22612759332040924636928110621003125770571427 (44) * 11690823562985893872194337803898640613 (38)

Factorization of P6087:
19346376121314849079756003761302961219403718459304735949837722073213977327557181228 (83) = 
2^2 * 3^2 * 59 * 97909769 (8) * 1408489621581114585775957 (25) [ecm,sigma=1377936320] * 66048876900450828888742909649601699873813996509 (47)

Factorization of P6088:
19663803047553039040516353574088000569887282503484484310681549896010388602255852239 (83) = 
7^2 * 151 * 4027 * 5197 * 724352009717500279153123 (24) [ecm,sigma=2071776723] * 175311526982738761634852513175713970114739191853 (48)

Factorization of P6089:
19986411732116367767453447566584555155733236300875249989100498944574573173089440935 (83) = 
3 * 5 * 11 * 1691089373 (10) * 21100315100173 (14) [ecm] * 3394652976146830465241749929991297760017275805981671043891 (58)

Factorization of P6090:
20314286333940900887748443585050713051663150007397757112134604920242862699726158794 (83) = 
2 * 17 * 315376754321 (12) [ecm] * 16851454752951591690185595863 (29) * 112423104682655546820385678928574614179267 (42)

Factorization of P6091:
20647512371883157724497072814904447562619752275238702920715673288563776525535041821 (83) = 
11 * 311 * 10000451 (8) * 877499740921 (12) [ecm] * 687777679737695040728709905824764706143045124706033531220931 (60)

Factorization of P6092:
20986176746583501724086961138252046091356275093195034651783183860829302383147386173 (83) = 
3037673627 (10) * 2695055412695911 (16) [phi2] * 88707450334361069850897015259 (29) * 28897775956381110459474536051 (29)

Factorization of P6093:
21330367762679244750452978873764820156347883490187466616077096450719570715048892790 (83) = 
2 * 5 * 97 * 337 * 65252432814338905290626751732279421690317487504015009991364362478875373107311 (77)

Factorization of P6094:
21680175151373030695020496182219760369897573823868125557220271062893607388220565090 (83) = 
2 * 5 * 7^2 * 22057339 (8) * 2005919907698991649235111787160057033384168696466941905943161627093784919 (73)

Factorization of P6095:
22035690093362151972313421663263026133010193865130504312342931096242922360431155714 (83) = 
2 * 7^2 * 17 * 83 * 1408763 (7) * 40880197 (8) * 92315612633 (11) * 2026812230099 (13) [phi2] * 14788835472000087806932450194068199738199 (41)

Factorization of P6096:
22397005242134541980576405159749071791493395354075566709175274912328963373026791870 (83) = 
2 * 5 * 13217 * 518761 (6) * 8432829884313361108005591133 (28) [ecm,sigma=954107945] * 38736145510657327503994175466362802522073847 (44)

Factorization of P6097:
22764214747637277526096723074166703229603883298893477821562081430714992962868310960 (83) = 
2^4 * 5 * 89 * 739 * 2963 * 38993 * 1063871 (7) * 221311174594926273317 (21) [ecm,sigma=1876098732] * 159044123419854465769756512576917893529069 (42)

Factorization of P6098:
23137414280323517561308566685858099893699375218857128101017507920312703963594860538 (83) = 
2 * 18094791139 (11) * 129907616513 (12) [phi1] * 1380857864642584973069 (22) * 3564081775975925943786994151818336778843 (40)

Factorization of P6099:
23516701055583898392662717023039284157128246551175384684215088032786688873160449500 (83) = 
2^2 * 5^3 * 47033402111167796785325434046078568314256493102350769368430176065573377746320899 (80)

Factorization of P6100:
23902173858568500797439820262355164819927956742777651650770775747985506596289009040 (83) = 
2^4 * 5 * 11 * 17 * 56101 * 21873186863053 (14) [ecm] * 219516672361782317828239441247063 (33) * 5931378397044235275573032441 (28)

Factorization of P6101:
24293933069405601272322920473664622542413638903761991348892632677242463726916324427 (83) = 
6229 * 1280925077 (10) * 6627146397542131 (16) [phi2] * 1493423582219 (13) [ecm] * 307642408238784371892526245841340018785171 (42)

Factorization of P6102:
24692080688823517944132657365126331854887724425898571748206409074515647097881497035 (83) = 
5 * 7 * 23 * 307 * 1171 * 23459 * 805732741540522736027 (21) [ecm,sigma=319314512] * 4514046509587617776341881323083474790655536681447 (49)

Factorization of P6103:
25096720364181961528541138531986869982363410299142711968399221477980920223811981992 (83) = 
2^3 * 3 * 433 * 38959 * 10105410187 (11) * 253963337529360778294786663 (27) * 24153777441056160786048516975460358269 (38)

Factorization of P6104:
25507957415919403150064622374031777325624683158523093669140596171782237680016551725 (83) = 
5^2 * 31 * 2927 * 10597 * 27327353 (8) * 90491327 (8) * 5672363 (7) * 4739598049 (10) * 1787502462266775199307185279 (28) * 8929180949467 (13)

Factorization of P6105:
25925898864423073860815374937327877497945283222061372351090639860093908586721615174 (83) = 
2 * 7 * 67 * 38903 * 4147085326961892811 (19) [ecm] * 18080878339587526709508330045881 (32) * 9475134769571102250295451 (25)

Factorization of P6106:
26350653457328315341377728959962342788433577142127997377816738094085650903399805161 (83) = 
11 * 83 * 101 * 2072531 (7) * 137879024778615472576174900090895490228495991247629921108367794097856487 (72)

Factorization of P6107:
26782331697254107560160526238427723815825156558130272888152185830026259744852478767 (83) = 
3 * 1869947 (7) * 662330161654008569 (18) [ecm] * 7208141434170893328961428821229541680305193284032501646423 (58)

Factorization of P6108:
27221045869981707133461569622249254246086293876540526710906907683214656832983753730 (83) = 
2 * 5 * 43 * 61 * 1037782915363389520909705284874161427605272355186447834956420422539636173579251 (79)

Factorization of P6109:
27666910073083439793455143187593149193047516193839544011342107914445649319802721380 (83) = 
2^2 * 5 * 7^2 * 181 * 827 * 11867 * 4698465621620710441209220117369603 (34) * 3382622260061694659363878351125297763 (37)

Factorization of P6110:
28120040245008801761984893425988405596537843128289182188590358578735224203196573415 (83) = 
3 * 5 * 19 * 4282921 (7) * 9166892827 (10) * 3625557623077591820178965309 (28) * 693160886092201398651554670717185173 (36)

Factorization of P6111:
28580554194635137971429662120530363426157092721063959651001608136104948131139138456 (83) = 
2^3 * 11 * 8596970924807802600668175911 (28) [ecm,sigma=1834956695] * 37778309102086041023434178477373850996727287650487967 (53)

Factorization of P6112:
29048571631290279997448354789274570393976407504279744174748740265195717679079275259 (83) = 
3 * 7 * 1303 * 438735107 (9) * 2419684175939650756799418591288962209684581995998785653990173416964099 (70)

Factorization of P6113:
29524214195254643299968142142633778569991450216737522970554856881455233448478792047 (83) = 
17 * 53 * 79 * 401 * 11519407 (8) * 89794961718661616238463391106700522652650340586604478150114874539699 (68)

Factorization of P6114:
30007605488750401936658767525804959269901538090624498238722062692262414373439706495 (83) = 
3 * 5 * 13 * 8273 * 60060410779081 (14) [phi1] * 161785826880577 (15) [phi2] * 1914277675934302674112697195405279154960835610141 (49)

Factorization of P6115:
30498871107425479346075754571644047070866784563971939138108246120538896513709419130 (83) = 
2 * 5 * 23 * 3461 * 2172997 (7) * 17631741195856036916561849732352352162537251717699124275483733887960743 (71)

Factorization of P6116:
30998138672340216124845731483279760638908552021496506251769834105117821800598259568 (83) = 
2^4 * 7^2 * 109 * 3181 * 491261 (6) * 3481859 (7) * 43521102522999026042977 (23) * 1531813984905302169558184510687019358281 (40)

Factorization of P6117:
31505537862464699974351272689311662098755898074201315977709042012834688169463024180 (83) = 
2^2 * 5 * 3821 * 22159 * 84928609 (8) * 4523317878271 (13) [phi2] * 4056868258308010969 (19) [ecm] * 11937893015996755180128781929631141 (35)

Factorization of P6118:
32021200447694869197455513682475853471319218255363759761303988477879461052923848725 (83) = 
5^2 * 11 * 13 * 619 * 13763 * 156256123 (9) * 6275065139776151 (16) [ecm] * 1072265965162886657813676051666047343124731003103 (49)

Factorization of P6119:
32545260322395629315461926686949188082006603386562360811729469919262758131904511035 (83) = 
3 * 5 * 2244269 (7) * 47761980078460860483248390286623 (32) * 20241339860384445365487849705779606057296087 (44)

Factorization of P6120:
33077853539479352580781617014311871278543906893017562221253418742653557819757396255 (83) = 
5 * 463 * 5135308349 (10) * 36368667319 (11) * 3249640478977009376023 (22) [ecm,sigma=848600538] * 23542744835865486384667386236277888529 (38)

Factorization of P6121:
33619118345028262413212205849273792796815539712192396176179596460085195747488141660 (83) = 
2^2 * 5 * 5375697308422543743153832174351343649264653617354163 (52) * 312695418065619558549019212841 (30)

Factorization of P6122:
34169195213469339119342513398453965734805561372021674232780787536034151590185244707 (83) = 
3 * 11 * 43 * 5081 * 14430793673 (11) * 806451394740681312565551565324539361 (36) * 407225293462837756424373072521 (30)

Factorization of P6123:
34728226883310519697907971881626036259982960439228411262273745052971497065678257627 (83) = 
7^2 * 167 * 1109 * 11795982352337 (14) [phi2] * 46255426391 (11) [phi2] * 338911094111 (12) [ecm] * 42879578419639757 (17) * 481875712657 (12) * 1001544798757 (13)

Factorization of P6124:
35296358393447103121961240344017539670716518606218780677370076513245354660232645750 (83) = 
2 * 5^3 * 7 * 3965879777 (10) * 84397605087031 (14) [ecm] * 28304854961855717807400779 (26) [ecm,sigma=1135581343] * 2128929354690647441973853710853 (31)

Factorization of P6125:
35873737120047413255033093949160663765415394309593857052151269473919869772871487686 (83) = 
2 * 3 * 73 * 4019 * 20379076737123897363682947749991571863224679524310811915178739727118032821763 (77)

Factorization of P6126:
36460512814026914537104479943905113787983720869064033381205568264374557144468255235 (83) = 
3 * 5 * 101 * 349529 (6) * 38913534892399762986073 (23) [ecm,sigma=1069120724] * 1769400890931339036597145022610347196452074018087897 (52)

Factorization of P6127:
37056837639120120801785841380589407436690939468399230412252141393058963139090302082 (83) = 
2 * 31 * 613 * 2212979303 (10) * 44053450537729388253903668102531133653 (38) * 10001356493912775033780920428033 (32)

Factorization of P6128:
37662866210559785093736793154053186805566284663568417239824885117628616896905410982 (83) = 
2 * 7 * 166471 (6) * 16160200451284001028809304904266117052376469116271824796521781622036535276803 (77)

Factorization of P6129:
38278755634373008180736924131613761904776473658454934473992082749441429030169576490 (83) = 
2 * 3 * 5 * 2095304414260207869450640633 (28) [ecm,sigma=514390715] * 608960928284146932375237783994525939981371065319539251 (54)

Factorization of P6130:
38904665547304055634170830795454962152253057325549360985114393171416998264927284480 (83) = 
2^8 * 3^2 * 5 * 7 * 4810014857 (10) * 19288096886938188173 (20) [ecm,sigma=746718027] * 5200144003142400488498215635578034403736655715387 (49)

Factorization of P6131:
39540758157373827921814993889118457397286706096001552932634053710531788477536684538 (83) = 
2 * 149 * 13859 * 568549 (6) * 14435620504099 (14) [ecm] * 1166523459028673205448983109662969101772614323623815529709 (58)

Factorization of P6132:
40187198285086084955080639516261063459976873704699642775403189239991409951773621758 (83) = 
2 * 571 * 5021 * 571801 (6) * 221303 (6) * 156144076880269 (15) [ecm] * 281960491110974371 (18) [ecm] * 1258013842166036920611191620066777 (34)

Factorization of P6133:
40844153405290685997226303284275535092965214695118263147010743378404067001214919027 (83) = 
11 * 9767 * 1520733217147 (13) [phi1] * 13858731964071289038916200793 (29) * 18038461681287915468467353055488960501 (38)

Factorization of P6134:
41511793689714267808047630337301368158715972606978239659159109720775943644256490005 (83) = 
5 * 13 * 1709 * 16349 * 115523 (6) * 1179733 (7) * 353863900910284081701496265780227 (33) * 473954268533414942668098317729 (30)

Factorization of P6135:
42190292050168948413320483230422034167287168443900016196504034408533589160706711653 (83) = 
13 * 1129 * 103320218028516488391175643 (27) [ecm,sigma=1770274560] * 27822101039598174783026196849031230436581373746243523 (53)

Factorization of P6136:
42879824182449810983565750915935381168450038687725130313390045426482137169021118567 (83) = 
43965256646138689 (17) [phi1] * 3073842389984719 (16) [phi1] * 1051677507500846269 (19) [ecm] * 301702703748588691182836085908573 (33)

Factorization of P6137:
43580568610932092026887397109765577895760423460694497105062010966821249346190280084 (83) = 
2^2 * 7^2 * 13 * 29 * 53 * 233 * 17848223597 (11) [phi0] * 279847662258617 (15) [ecm] * 9561961677788410435493008717870505913853164821677 (49)

Factorization of P6138:
44292706733879170485703839965243921279068106167548766514580552506273383519427149978 (83) = 
2 * 20509 * 3185303521 (10) * 1644357650135593 (16) [ecm] * 11253177639167 (14) [ecm] * 18320421477234434229693130201214029322071 (41)

Factorization of P6139:
45016422869472629418778552337751319976019683546407832570478150236316085995703464910 (83) = 
2 * 5 * 64671521 (8) * 26745065749 (11) [ecm] * 2602640818299819379768159191386585881957647210237173331036445679 (64)

Factorization of P6140:
45751904302575839790337753975844539231918261305332016625332598138183397252697889234 (83) = 
2 * 79 * 101 * 182428859 (9) * 1795163581464503 (16) [ecm] * 315434773407740047317305051 (27) * 27753871638455844050497796549 (29)

Factorization of P6141:
46499341332242696520177288263285453112554256198980427734715764613076535749120876900 (83) = 
2^2 * 5^2 * 613 * 80651478071841470745690131 (26) [ecm,sigma=510750032] * 9405329081886761405998390372105561659178778596290623 (52)

Factorization of P6142:
47258927319983320416110566311285601893982173466514667505433519956670336994705727062 (83) = 
2 * 3 * 22695311 (8) * 17357277126855023 (17) [ecm] * 185582664291244388261657 (24) * 107740123309277501445915050273259937 (36)

Factorization of P6143:
48030858738798725957175742931552663013079844889294107267475625923325875269743854556 (83) = 
2^2 * 29 * 37 * 48998669 (8) * 21447079 (8) * 73540700022973 (14) [ecm] * 957235112750039 (15) [ecm] * 151273140551026748486813164465403519 (36)

Factorization of P6144:
48815335222996644167672054650822567071356269004399989777860539909492801009697868740 (83) = 
2^2 * 3 * 5 * 7^2 * 11 * 599 * 691 * 10313 * 9130293642115596359 (19) [ecm] * 310106092214768668987684876361 (30) * 124891053607506837967 (21)

Factorization of P6145:
49612559618800882064000199291306557837632164198103980168502083026268306302608752575 (83) = 
5^2 * 2731 * 38525869 (8) * 18861554438896599454131593615288425273864812624538564808559456583776377 (71)

Factorization of P6146:
50422738035766795414816978522114185542513562905089794520716429383022695719442645441 (83) = 
34825577 (8) * 2021323609 (10) * 425730563090574851 (18) [ecm] * 1682509117882199601090534832979958792623044001387 (49)

Factorization of P6147:
51246079899015649877277844512147882664582350579145600337392419778220778932570336899 (83) = 
7 * 8291382892593017117 (19) [ecm] * 882949039000746680652488968427902489463315646355837495546625321 (63)

Factorization of P6148:
52082798002300847005961787536881087236745202865323034381570905351159014099422093388 (83) = 
2^2 * 1951 * 5399 * 9011 * 137179978215927684946651978162985084956026021650666541575678421785797273 (72)

Factorization of P6149:
52933108561919196225023391628460142378525434272766625500596001985990815663716575425 (83) = 
5^2 * 7 * 2287 * 8719 * 6948041 (7) * 602511748140471278758698202866653557 (36) * 3623502925283931854989708327771 (31)

Factorization of P6150:
53797231271480621657523490424182400281748554023999469013556860090967271311799250859 (83) = 
3 * 100959803260996198559 (21) [ecm,sigma=535876447] * 36248464900187018179236646068932668096513 (41) * 4900050493555988837159 (22)

Factorization of P6151:
54675389357549903768845355343993489975079748744281457554306229098445607592421680462 (83) = 
2 * 7^2 * 23549 * 55681 * 326304679 (9) * 1303956223137924194192910992432038853204569599741178397406647269 (64)

Factorization of P6152:
55567809636174270154478320181795424078099133858463109363414183905634351832400524928 (83) = 
2^7 * 10133 * 69457 * 7608990009304067 (16) [ecm] * 81064784168763814535058232083912613824086814261178430563 (56)

Factorization of P6153:
56474722570310867537905683391381419004520308067285925560651255864106643559088056197 (83) = 
17 * 29 * 83 * 1380158913226395257408677714298526821391537135982940090438457828004268030965763 (79)

Factorization of P6154:
57396362328168368194331245223452846888030338779872811237067165134149505960812550550 (83) = 
2 * 3^2 * 5^2 * 61 * 443 * 287711659 (9) * 2004037694192154867670598066887 (31) * 8186060429483381211637765456452144281 (37)

Factorization of P6155:
58332966842477188633796056615623170561697691316567941150895802560594029349855816844 (83) = 
2^2 * 3 * 11 * 43 * 3823410806400443517059 (22) [ecm,sigma=1024082746] * 539082793130969022375772925629 (30) * 4986148921303593191375134079 (28)

Factorization of P6156:
59284777870703026516978099340826561411893663727787342272111175966742140139681797017 (83) = 
3 * 60685202657 (11) * 325641041940035248643585434355257757334210428115345091085885053363655827 (72)

Factorization of P6157:
60252041056218653493576770593501903423685924766895139286316028301214609740269604266 (83) = 
2 * 11 * 42987588105958625048344667630594029 (35) [ecm,sigma=1501854243] * 63709765064474671057810679281510995062500770107 (47)

Factorization of P6158:
61235005990449137002458139137551599616168196049095045689862988024237117745339740786 (83) = 
2 * 7^2 * 624846999902542214310797338138281628736410163766275976427173347186093038217752457 (81)

Factorization of P6159:
62233926276005903111338915647086529560178632029719323172576594938352387128604260235 (83) = 
3^3 * 5 * 31 * 1279 * 25333397729589054959243359 (26) [ecm,sigma=862628712] * 14999900315046649483677193 (26) * 30597037575803597894646347 (26)

Factorization of P6160:
63249059590825295259259263814915873910277086283269803791990666390326799755387242997 (83) = 
79 * 163753 (6) * 117087263 (9) * 41756881977662526257867773364481933153100079949524223442622585835037 (68)

Factorization of P6161:
64280667753327530355872262615401991803634227393353739066496585073843766046386960190 (83) = 
2 * 3 * 5 * 167 * 209525850049 (12) [phi1] * 28464934873014174494017187309400687517 (38) * 2151269638669119952135339535443 (31)

Factorization of P6162:
65329016788612204147003057371390528315433534425845225710259817625066043253089431113 (83) = 
3^3 * 97 * 4481369 (7) * 352908630518422046602133244760523 (33) [ecm,sigma=1312488966] * 15772394774694785201049886481694415375721 (41)

Factorization of P6163:
66394376995706752136266303135231579229002753612020940306464036765129339915771662607 (83) = 
3 * 324963661321298459 (18) [ecm] * 124527617018376249774141719584199 (33) * 546902071953549557029156833744809 (33)

Factorization of P6164:
67477023015884530718974169518458367108990842994662942016952704353256683271909965205 (83) = 
5 * 18617 * 2108761 (7) * 4639168571 (10) * 39052341136471963811036263617652237 (35) * 1897411908227343571034895359 (28)

Factorization of P6165:
68577233902069445599266101477802495596905039439563633552471633393859766154560915331 (83) = 
7^2 * 1399535385756519297944206152608214195855204886521706807193298640691015635807365619 (82)

Factorization of P6166:
69695293189344321087456928958253071766220375564710253025306803530399219750987886523 (83) = 
11^2 * 67 * 54539 * 15673519 (8) * 10135845017 (11) * 992223776357133345558995004219509517445272642992127748037 (57)

Factorization of P6167:
70831488966580474576121935796220857805888180715052334251636315912315798606264106992 (83) = 
2^4 * 44687 * 2748150426317 (13) [phi2] * 36048291613587492105800927211222503745440309055860688784418973653 (65)

Factorization of P6168:
71986113949206235435500321836380516068619840054908512900934964683588540223940780521 (83) = 
13 * 43 * 163853 (6) * 460415584864023490773077 (24) [ecm,sigma=668090213] * 1706996019640746714045842725641462049727395676127799 (52)

Factorization of P6169:
73159465553132426817495689625763005437356982473210915628540230399906605473975718280 (83) = 
2^3 * 5 * 19 * 35214379 (8) * 4046779679 (10) * 11543851316612770223510262251 (29) * 58516267000833027502030195197712633 (35)

Factorization of P6170:
74351845969853112480002282561205009053522570749211289383511309692412517790346653633 (83) = 
11 * 13 * 494069 (6) * 597075739256501 (15) [phi1] * 71867037184771 (14) [phi1] * 2722304221159 (13) * 9008910870791686610152525134483691 (34)

Factorization of P6171:
75563562242740198807647990349794132999502724032117195434767826239171118926857265819 (83) = 
23 * 173 * 7451 * 12404369 (8) * 205470389346105688901611573458584545678577073536477850709763482636019 (69)

Factorization of P6172:
76794926344550774780535744071530730331172770435464755851883876574441538973774605684 (83) = 
2^2 * 3 * 7^2 * 23 * 139 * 36299 * 1125428489924796045736689777989018086827435977774842643957099931432214481 (73)

Factorization of P6173:
78046255256166369799473103567911064652516896767024892358032752596340195217131312815 (83) = 
5 * 504307 (6) * 2608126654044591406063 (22) [ecm,sigma=436035083] * 2621583297261849772629664782503 (31) * 4526835680923409277973481 (25)

Factorization of P6174:
79317871046583611085884537700307578779316882858500313599406978620647417024105392075 (83) = 
3^2 * 5^2 * 465239876395589692285417 (24) [ecm,sigma=1956291825] * 757724969857057555705308907052081438052182169612993069811 (57)

Factorization of P6175:
80610100954176068909587551751782492361528725137410613488466107681990590358935349935 (83) = 
3^2 * 5 * 52363 * 23243453 (8) * 13094318411 (11) * 112400666684104123334056967020868623396361110925345912550367 (60)

Factorization of P6176:
81923277469247389231491425836767584863285545203222032266342513260863926174194060119 (83) = 
131 * 240665009355262969 (18) [ecm] * 2598502092077900792365627216479698436525367570836189407414471621 (64)

Factorization of P6177:
83257738417896129555795783200696024416798089832624653462133993627354587824170053855 (83) = 
3 * 5 * 11^2 * 8499028964561 (13) [phi1] * 780042299499080514313855706680331552341 (39) * 6919273813846291091190250117 (28)

Factorization of P6178:
84613827047213034943333881004610837589499765708460182164645478924980020907450431278 (83) = 
2 * 7^2 * 3769 * 1534823 (7) * 47623703 (8) * 11818759960105531 (17) [ecm] * 265176939115830373287381015305093051928995286221 (48)

Factorization of P6179:
85991892111831817321407129618440336475177385382171997678679884581459040576490969060 (83) = 
2^2 * 5 * 7 * 5376619 (7) * 119860879 (9) * 204714345859898130986450114076743 (33) * 4655801658016588353280646239797553 (34)

Factorization of P6180:
87392287961854832514072106495479338866100250117652058164082530981706119645071107473 (83) = 
47 * 1291 * 1440286895559352514364126547052084626235645304112794933238006674385782415825949 (79)

Factorization of P6181:
88815374632175385889861346556757140690049375628494589103855661978556910009481489808 (83) = 
2^4 * 7 * 677 * 919 * 1801 * 5227 * 1407151 (7) * 961711763 (9) * 6985981969 (10) * 14321438563291036669398274024145572312488947 (44)

Factorization of P6182:
90261517933218739262068173060041962321873875159934336637921664218731052004488898693 (83) = 
3 * 269 * 19403 * 7291201533549056993 (19) [phi1] * 680851385342005908449261231 (27) * 1161204703666732016120998439351 (31)

Factorization of P6183:
91731089543124238761978078481576871693389410344072442865364184619991735627041266668 (83) = 
2^2 * 7 * 11 * 19984493522870329 (17) [ecm] * 1932048180302131559 (19) [ecm] * 7713557775918956239782771050853770873188497161 (46)

Factorization of P6184:
93224467101391335921028835194439750400361526973625972017236200606247312087699538985 (83) = 
5 * 11 * 44488136668464104429446376906737 (32) [ecm,sigma=571086133] * 38099827007047928163449245408697947008028273526671 (50)

Factorization of P6185:
94742034304012632228362208349757841856270153776659694126453251016431057539592812702 (83) = 
2 * 21089 * 10878261597816871460557 (23) [ecm,sigma=782111969] * 206489144415263564461977857897951666565647097783167156587 (57)

Factorization of P6186:
96284181000117441061434765239493629802225914978215118399644201692855649879176851074 (83) = 
2 * 7^2 * 167 * 5883183490169707995932712039563340449848827751326843358159855902044216661320839 (79)

Factorization of P6187:
97851303290149730206456220135452261940785764151735648897095309079196260986740536841 (83) = 
13 * 19 * 79 * 1013 * 796980887 (9) * 9309762806899996104416640163320100443451 (40) * 667185504244202308480369697 (27)

Factorization of P6188:
99443803625604683280943388340845363214256908092785579932287613684559675104094418850 (83) = 
2 * 3 * 5^2 * 11 * 41 * 1009 * 4441 * 328048447612862898655360007933920890376604186843443339264548706620462761 (72)

Factorization of P6189:
101062090910348499332509289718109710108498438249388347148836460479328397473850947185 (84) = 
3^2 * 5 * 2245824242452188874055761993735771335744409738875296603307476899540631054974465493 (82)

Factorization of P6190:
102706580603546436807435276497012464375616026534688386977427143482491174010615571239 (84) = 
73 * 269 * 212030887616381 (15) [phi2] * 24667435370432278840568041021938646079361589981983135649165866887 (65)

Factorization of P6191:
104377694824224501052297637070437445577581132061509580659348720606720542565805839762 (84) = 
2 * 3 * 7 * 31 * 173 * 499 * 30319 * 4567133385091371877932299 (25) [ecm,sigma=805529944] * 80421658155010525805197 (23) * 83390864560319945748829 (23)

Factorization of P6192:
106075862457490573626072431583922779588319977472130258925569406337667713601579930141 (84) = 
5711 * 14657681 (8) * 1267182438663716512027695440729971314411114870884833167234925285354108451 (73)

Factorization of P6193:
107801519262441187054314047810344961895636644574976641917641626518196275771604199884 (84) = 
2^2 * 3 * 7^2 * 17 * 79 * 3863063913320107 (16) [phi1] * 35337811455442419284036690151173090874382346747869603070028893 (62)

Factorization of P6194:
109555107981780560348264489907114533001208830594843755935805889108453851387311832295 (84) = 
3 * 5 * 499 * 93390133 (8) * 156725560856089307225048949789159320381362495625612574558918819660199559 (72)

Factorization of P6195:
111337078453178928738674541313543003923406143281849798332648634703875872533904004371 (84) = 
13 * 223 * 144153539 (9) * 339224219 (9) * 29352956231 (11) * 324516109880383 (15) [phi1] * 82450128580669636034043780854304159353 (38)

Factorization of P6196:
113147887722397625736803077769480761780994381526484032500045661342417295722755873197 (84) = 
11 * 140056379 (9) * 74219157101 (11) [phi0] * 12627600349121 (14) [ecm] * 78363536181465890664449946017506912309662146327353 (50)

Factorization of P6197:
114988000158208806935154429725377689747833394766558118046218197835877698070108698680 (84) = 
2^3 * 5 * 17 * 2518179408312563011606819 (25) [ecm,sigma=1292203872] * 67151688904474941239091259610904974868858844828224075929 (56)

Factorization of P6198:
116857887569138143001236221331618859875871380553339052401511259868226952692300888492 (84) = 
2^2 * 3^4 * 47 * 73 * 4663 * 11377635943 (11) [phi2] * 18570335235779486907677 (23) [ecm,sigma=1922960466] * 106697712967415121909362757497890658338001 (42)

Factorization of P6199:
118758029322059254203789113367671458917167167608205817148769782900053415303588817750 (84) = 
2 * 5^3 * 11 * 31 * 11783 * 113869914611 (12) [ecm] * 20520479838469139227669 (23) [ecm,sigma=56320442] * 50596003053255857640259139055769320392723 (41)

Factorization of P6200:
120688912462669110648994658098021478525464221986804415971950581029388369481288872217 (84) = 
7 * 3289093671503621000819 (22) [phi1] * 5241952626138136114181847859164887223169819734673217956146149 (61)

Factorization of P6201:
122651031837874081302194049563959476620527156195571853489133205409801976915167160714 (84) = 
2 * 1139969897272455057891007382593324046178974863019353 (52) * 53795732734405811397189314165069 (32)

Factorization of P6202:
124644890220116780938406991996033840486569200551381747298871600677162077908795880725 (84) = 
5^2 * 43 * 1619021 (7) * 30886659858289017340382520411131053792416826033 (47) * 2318689459818633913155849571 (28)

Factorization of P6203:
126670998433674337513882071239007298311169098920751113699902324923282243573257027750 (84) = 
2 * 5^3 * 23 * 1021 * 1789 * 12060720869581340517457410348749823903501387519037640106755849942495631553 (74)

Factorization of P6204:
128729875482959183194217679766557944047384607421599995500711814570962242947856901375 (84) = 
3 * 5^3 * 3923 * 343051 (6) * 61807806059059121134606266213021516811 (38) * 4126936205790512595192525253293979 (34)

Factorization of P6205:
130822048682853960527195947146094708261473492459160713349912071912335307641395155185 (84) = 
5 * 48487 * 8549782051087974916926432479114453 (34) * 63114708899918055784816387817627819127585167 (44)

Factorization of P6206:
132948053791112631127078885338823299676243333523621800634768265303769239558731344930 (84) = 
2 * 5 * 43 * 824651 (6) * 3764458417 (10) * 2766201300691 (13) [phi1] * 36004522303242620867425342598681896017728016367392983 (53)

Factorization of P6207:
135108435142860377860238430446699678577704361601346891971680532008312649702161833949 (84) = 
3 * 7^2 * 17^2 * 1051 * 90802357696147 (14) [phi1] * 238692357187 (12) [phi2] * 139613987742446444722541941041923121401792714635877 (51)

Factorization of P6208:
137303745787225403009975113736597370416580309290966699458323862157212635269336204059 (84) = 
13 * 449 * 967 * 7963 * 3001969114998274973 (19) [ecm] * 1017614490304762493543189076215011572777789697253100079 (55)

Factorization of P6209:
139534547626136244373429288219025943296376849302215460340316238034458122749974031420 (84) = 
2^2 * 3^2 * 5 * 36833688216517522723 (20) [ecm,sigma=1798773655] * 21045732013029558956680573500141467583795922554823722185416153 (62)

Factorization of P6210:
141801411555318758829699059607625573701818760567080162549493756480139370953260966661 (84) = 
11^2 * 536664426787 (12) [phi1] * 15767885190493 (14) [phi2] * 3839080352863364852466323 (25) * 36073785936731092056677515446137 (32)

Factorization of P6211:
144104917607527458741663595488963640789933982518727204020015241701145962748796670332 (84) = 
2^2 * 3 * 137 * 15314561 (8) * 217777771 (9) * 137134813 (9) * 191651035079604341683304263409712437303045812735004876051 (57)

Factorization of P6212:
146445655098046430742530481485795390672777837170990743423004793600963516449271114252 (84) = 
2^2 * 8603315271833881981351 (22) [ecm,sigma=1302660437] * 4255500655005930256091831759264616650937553757485265191171013 (61)

Factorization of P6213:
148824222772495619141720279001616675548297157237339864297613224354830930819168308304 (84) = 
2^4 * 3 * 17 * 96017 * 489860623262873830236739 (24) [ecm,sigma=1886474916] * 129890011387993680724679 (24) * 29852935748698510543468257947 (29)

Factorization of P6214:
151241228956978817495317707830663324446050435997647459994658738802980351608717560530 (84) = 
2 * 5 * 7^2 * 181 * 499 * 140759 (6) * 6608899963 (10) * 3673581220433401499841575675682455941096721733363203859422839 (61)

Factorization of P6215:
153697291710610281957943374875985396086852037608848166251728067385566933682371217321 (84) = 
7 * 167 * 5358155321 (10) * 13233970494301 (14) [ecm] * 1546988964764291 (16) [ecm] * 597600119786837 (15) [ecm] * 2005618613085972890129455787 (28)

Factorization of P6216:
156193038980457459001589653870611264440718473540980725844237818865667559917348476964 (84) = 
2^2 * 13 * 17 * 41 * 47 * 97 * 358725449671 (12) * 399990990173947339 (18) [ecm] * 6587847895613695297921925977858608288554277511 (46)

Factorization of P6217:
158729108758937908090878492303193475376370456671301017655914366064623492922952440154 (84) = 
2 * 7 * 748729 (6) * 202433743873 (12) [phi1] * 74803338365843620309531125409169202011132902045739015988256113283 (65)

Factorization of P6218:
161306149243709097083631550704006729629085643287908138535000470401298008381258014023 (84) = 
257399 (6) * 67793990802563 (14) [phi2] * 149921319791147229647323 (24) [ecm,sigma=1266264966] * 61658005407839920178800550782054558970273 (41)

Factorization of P6219:
163924819000090354623055621036006914665629131489083763224138045642266685652536720920 (84) = 
2^3 * 5 * 23911 * 8318227921 (10) * 20669816492562121 (17) [ecm] * 996826431624560289209229941696018215537748663911273 (51)

Factorization of P6220:
166585787126056879747900984073757445302340302219391469920837923851303865025995134881 (84) = 
82376594971067171 (17) [phi2] * 83093218019801359352423379617709530977 (38) * 24337083389379373159873972043 (29)

Factorization of P6221:
169289733419846334516544141738760570387384493280511996029100733702656149338427117805 (84) = 
5 * 7^2 * 11 * 234977 (6) * 759301 (6) * 5504288303 (10) * 63963372153730404322590090917019408218571538040962977495329 (59)

Factorization of P6222:
172037348550219180769245069203791875151612407358801512670171189551222563475279374876 (84) = 
2^2 * 43 * 2057409244651 (13) [phi1] * 15969862858675054578736204693147 (32) * 30441946618782931143121447657464513389 (38)

Factorization of P6223:
174829334229414567391302492580191704377539811949977238464401437238375666002889499510 (84) = 
2 * 5 * 13 * 37^2 * 374561207 (9) * 38207929 (8) * 68642202378452623695743500445572577522424113390203779010618061 (62)

Factorization of P6224:
177666403388844229742287684563322540594721933822354269276149424841646105195600890625 (84) = 
3 * 5^6 * 7 * 29 * 229 * 4547 * 52072973 (8) * 189634768066560253 (18) [phi2] * 8741612434656227513 (19) * 207723518071997155610820743 (27)

Factorization of P6225:
180549280357567528439162055706901487863528346918365158251850445845336255663085688464 (84) = 
2^4 * 83 * 5158843 (7) * 117694762439303659 (18) [ecm] * 223917604297587203175456918195055594848676927778999971099 (57)

Factorization of P6226:
183478701043591430582472271329722780186004635979075613740754923323463218071258274636 (84) = 
2^2 * 401 * 821 * 622781635493902764533465890481770501 (36) * 223718726308355860989154618432018760376779 (42)

Factorization of P6227:
186455413118039922956013360166843981944022534566768271405485264233868916823058660190 (84) = 
2 * 5 * 7^3 * 53 * 1117 * 9735680951 (10) * 94316027472869304394864536857271880364553502597918200140945110483 (65)

Factorization of P6228:
189480176202238043874886285679196387073945942356887325124592176772385584393434154766 (84) = 
2 * 3 * 7 * 37 * 22238890920891087380632327536255280935817 (41) * 5482765114073857563795494150587445776087 (40)

Factorization of P6229:
192553762057756428370807272324147450482758674161691511344857294366279952677149263720 (84) = 
2^3 * 3 * 5 * 487 * 3285144322554617600053 (22) [phi2] * 1002968624155307222770670346878398629496672964223807533521 (58)

Factorization of P6230:
195676954779462980455470706529712195504295639281377238992698702168719315042427994016 (84) = 
2^5 * 3 * 41 * 521 * 3049 * 118913 (6) * 263184378448171482805402288324756870916526571016429066889935172481303 (69)

Factorization of P6231:
198850550991629016463947267916899260245337391109525201706331724778971260083854067572 (84) = 
2^2 * 11 * 61 * 2521387680495254089 (19) [ecm] * 29383576817284452396250589535380878398792779838456742793235947 (62)

Factorization of P6232:
202075360047137965124378378597410510750616811240723439284007056488955620285697038241 (84) = 
3 * 11 * 37 * 52009 * 22084861 (8) * 13482480447711923119 (20) [ecm,sigma=2087360010] * 2045546416482521527 (19) * 5224507846570508857381123893233 (31)

Factorization of P6233:
205352204229845463204154644870439415479014189970647700951495066918289605546609379816 (84) = 
2^3 * 15607 * 509497181885862701 (18) [ecm] * 3228108811847603322962658797420310130103816899889607030014711 (61)

Factorization of P6234:
208681918960140450525611737630978856294258883355579005464693996559219475373435208645 (84) = 
3 * 5 * 7^2 * 13 * 17 * 173 * 7528947827 (10) * 39930032321 (11) * 24701604073745987037501504407984546740488962315555783137 (56)

Factorization of P6235:
212065353003757645008080453594694899612495121056025015005579045959692371226446215632 (84) = 
2^4 * 3 * 7 * 109 * 233 * 1543 * 4243 * 13553 * 45691 * 377004388985982976530003561610189 (33) * 16259102086658873349023969807 (29)

Factorization of P6236:
215503368683892567362735637001298884060297567455711935004627824323481138142787046423 (84) = 
109 * 1753 * 240701 (6) * 2863349648160816413 (19) [ecm] * 131281645019482948484456797 (27) * 12464916140489477577564035759 (29)

Factorization of P6237:
218996842096671086329800239845612474065871525470498074764356875918471681586566044606 (84) = 
2 * 11 * 37 * 35281 * 211457 (6) * 213614245331735692657 (21) [ecm,sigma=199903534] * 168818595833531779560328207538403401406611696557241 (51)

Factorization of P6238:
222546663330026269094870758237938381863087879095856604217408631789329510995804693154 (84) = 
2 * 13 * 3967 * 25171 * 407483 (6) * 210366012158757779070062459867641638692574250102360864729024810442059 (69)

Factorization of P6239:
226153736686036147945973433696007424411729532604999917800338599740732572725876427885 (84) = 
5 * 29383946659 (11) * 1539301301561324400074854040702112373186836532808585628329489540955898403 (73)

Factorization of P6240:
229818980906776853531957039410966616171847498888158357581786683680455260976471538656 (84) = 
2^5 * 13 * 45240583 (8) * 641857061941 (12) [ecm] * 19025060528601852520071064589468331404400375835974483977987897 (62)

Factorization of P6241:
233543329403746417455528946066091570480270683920312614146031768106344590065106152171 (84) = 
3 * 175229 (6) * 22801133447681245991909089 (26) [ecm,sigma=249192000] * 19484254499738869925248323354905679947636361516917197 (53)

Factorization of P6242:
237327730490915412583275234367783257817144326581679361020072741702854929449853954872 (84) = 
2^3 * 3 * 7^2 * 127 * 5851 * 271585979158461577410156460158764067136055591960012495271743637639487139161 (75)

Factorization of P6243:
241173147621461478586126465242886500522598761970479623996631862919389839753699593161 (84) = 
11 * 593 * 630011401 (9) * 54574654658004283589 (20) [ecm,sigma=2129725918] * 1075331005130301136077272617909604011889222842789463 (52)

Factorization of P6244:
245080559628245673045864673275039390666231866922959303931693869382856906813965013845 (84) = 
3 * 5 * 7 * 547 * 2441 * 7331 * 360461 (6) * 582487735112490483090590939261663 (33) * 1135680504393925087761956435320879 (34)

Factorization of P6245:
249050960968089495188562000517514379894471870198208876241750423751677324731020069537 (84) = 
3 * 23 * 34471 * 763409 (6) * 2323480972117288012751571219913 (31) * 59032184240356612849919848125084899083139 (41)

Factorization of P6246:
253085361969912350149715792202676768512553948236086792008836077102340245966829021394 (84) = 
2 * 13 * 17 * 229 * 2500398762768601929989881169383674529357959535221865597115494053452352802533433 (79)

Factorization of P6247:
257184789086790156857038636387034983309753640303746256485080211045700849952432437768 (84) = 
2^3 * 19 * 307 * 8677 * 16553 * 2115592082869457 (16) [phi1] * 18137819268089667792079094208132208747585099003377759661 (56)

Factorization of P6248:
261350285151996752357486440604351400562850089157247063294018876343733927909668801237 (84) = 
89 * 512711 (6) * 2618374411 (10) * 2117298836359649889303557 (25) [ecm,sigma=2095796515] * 1033109677216076530853548719111369172047389 (43)

Factorization of P6249:
265582909639090709940698606749721806199419645731630224738749967748247504001925155625 (84) = 
3 * 5^4 * 7 * 17 * 43 * 7391923921 (10) * 696840365783 (12) [ecm] * 8966827652069432419 (19) [ecm] * 599313174379915851432283251672162547 (36)

Factorization of P6250:
269883738926111167950593320033003683741452672287666798682041732554431667564722790842 (84) = 
2 * 7 * 79 * 539849 (6) * 3203366471 (10) * 97655494463 (11) [phi0] * 149129852207839 (15) [ecm] * 76772909712734503 (17) [ecm] * 126204079279635779874173 (24)

Factorization of P6251:
274253866563947260962949072881462589910012411233529402503914981400852885561426122599 (84) = 
31 * 521662049 (9) * 10316177939 (11) * 1643928777520698388623122617871432544381327717439846212620714339 (64)

Factorization of P6252:
278694403548946755275535624093126010127232831724479488366566780889215571431496528749 (84) = 
67 * 1297 * 1607 * 126614683332701 (15) [ecm] * 15762079696411314886560950871010081218749562225470864329828093 (62)

Factorization of P6253:
283206478599830516648497082536498502600759891340828677960844751627769768264918638322 (84) = 
2 * 189901 (6) * 4829215513973 (13) [ecm] * 60675472997 (11) [ecm] * 2544814782873397490278835740963610404089439808493045781 (55)

Factorization of P6254:
287791238438980480189694539338233100798071510376288177835577943443669991659897910770 (84) = 
2 * 5 * 11 * 73 * 911 * 4590105493657 (13) [phi1] * 2929898886945815066912299231 (28) * 2925286090125509750549040786994689407 (37)

Factorization of P6255:
292449848078169850449794530543819603711916054208247179786123680438291698576425311768 (84) = 
2^3 * 29 * 59 * 349 * 11399 * 185190748684607693 (18) [ecm] * 595400967277621 (15) [ecm] * 48706889939869170298667676289379233230487 (41)

Factorization of P6256:
297183491108805334426060017920557660642987438589495043304611468293086027824169053730 (84) = 
2 * 5 * 7^2 * 9738528757 (10) * 30657347403911 (14) [ecm] * 3226984344998059 (16) [ecm] * 629511713209630912834419067974101527133789 (42)

Factorization of P6257:
301993369996752301526946881635158706632208082331163833095374351080041425282557028289 (84) = 
103 * 311 * 117643 (6) * 1522331 (7) * 144441905994693398359 (21) [ecm,sigma=1908015322] * 364444501374590762233102393380355058666473545839 (48)

Factorization of P6258:
306880706381814872880541678690538779787663704998458077813552760320142196369535926609 (84) = 
3^2 * 7248214381 (10) * 561336961960932197971709 (24) [ecm,sigma=1945831268] * 8380547768155194098999415218466394258082695439569 (49)

Factorization of P6259:
311846741381944067941392566401537252301779501854236475782327602140024142192307673045 (84) = 
3 * 5 * 20789782758796271196092837760102483486785300123615765052155173476001609479487178203 (83)

Factorization of P6260:
316892735902248279429229223608772969245378634926864778846841100248720512940744184192 (84) = 
2^7 * 163 * 2616893783291 (13) [phi1] * 104742313943938399207395694746766631083643 (42) * 55412334917536349183255081 (26)

Factorization of P6261:
322019970948881508490393224004693407739934673384232839306241666599906336176885317931 (84) = 
619 * 298076822183909126489 (21) [ecm,sigma=1712213354] * 1745275330366444021218080168600356614980493046062526643129641 (61)

Factorization of P6262:
327229747947885970883633995153071160624780020648175749434849807374405642576011283792 (84) = 
2^4 * 19 * 313 * 6844896313 (10) * 2429516356923431264376183163107032431 (37) * 206798867243583664535772458525257 (33)

Factorization of P6263:
332523389069066882235630003565153817134539995090660019939747204132820984526732977376 (84) = 
2^5 * 7^2 * 1999 * 4297 * 473850191 (9) * 52102304416926105053959331625593071722140899370858231109917112959 (65)

Factorization of P6264:
337902237554978446271834217768834960623340251252631414749303086755623119724103494625 (84) = 
3 * 5^3 * 19 * 37 * 71 * 312384169 (9) * 11528150533 (11) * 2250187839495912014707 (22) [ecm,sigma=1099530998] * 2227812813174250452994748037807261817 (37)

Factorization of P6265:
343367658055101304693048497945655482361510773095404963871334455221010251596327243790 (84) = 
2 * 5 * 11 * 83 * 401 * 563 * 2278309375225907 (16) [ecm] * 1985626182289121 (16) [ecm] * 36823549887641357340543449849536322726490403 (44)

Factorization of P6266:
348921036965292961329968726113238951456546971045246848060100745093260247911045544401 (84) = 
269 * 1439 * 19483 * 6129421 (7) * 49140885557 (11) [phi2] * 153601628284689799196781301633586035175365603288941283361 (57)

Factorization of P6267:
354563782772593966663778632208670124501674305041357224850123853840848599759597538773 (84) = 
3 * 47 * 163 * 2956562589278807 (16) [ecm] * 5217957984583043360340199309593412074858073547408014109593316533 (64)

Factorization of P6268:
360297326405473942052243774775142868323584839637359227118486974511679459491658002914 (84) = 
2 * 81097 * 40119580874728897 (17) [phi0] * 55369406410749088661652359350955416856083630201460663808191273 (62)

Factorization of P6269:
366123121589602836353847371201583370003824283012860072678685828048877482896852790940 (84) = 
2^2 * 5 * 1303 * 1571 * 2611859 (7) * 36591542437215628969 (20) [ecm,sigma=1696767873] * 33970869339381002272674828407 (29) * 2754478929205005971627 (22)

Factorization of P6270:
372042645209234141408208070456307881651160628289346205466080819754603299329059277027 (84) = 
7^2 * 19 * 29 * 3777889 (7) * 26342737 (8) * 584185910219411 (15) [ecm] * 7691802208094384782528057 (25) * 30814545675708174906289343 (26)

Factorization of P6271:
378057397674288147325001963715392009765625775576132429219697829048603988483770125508 (84) = 
2^2 * 3 * 1423 * 10453229 (8) * 734562404774076059596021 (24) [ecm,sigma=432069100] * 2883317265854187529438486590553885266605152626437 (49)

Factorization of P6272:
384168903293224694076410247203962699672878832025897345806521667463100657028724593529 (84) = 
19 * 510529 (6) * 1088618771 (10) * 19971327416058289722123310849 (29) * 1821652104639318504370471288266078642001 (40)

Factorization of P6273:
390378710651796272805194939666808334329769219382194988853159905094515505624021671672 (84) = 
2^3 * 11 * 231762142912277 (15) [ecm] * 38602561254171669317986598553100781 (35) * 495843739975534192098434051439437 (33)

Factorization of P6274:
396688392997773748882340212089622191278503835562924954774396227619561972614646726425 (84) = 
5^2 * 15867535719910949955293608483584887651140153422516998190975849104782478904585869057 (83)

Factorization of P6275:
403099548631738419410342507380628390301658255468055804988529020305475663135567904352 (84) = 
2^5 * 71 * 1231 * 108023 (6) * 608977 (6) * 7180793467 (10) * 111500927872436744771690641 (27) * 2736389340452864055621503572903 (31)

Factorization of P6276:
409613801304035580911406832579734974015506479977335776159912946343931864652120505131 (84) = 
11 * 1759 * 19037 * 1522029989604580243 (19) [ecm] * 730624677578160316329220508213936170702599133169892709609 (57)

Factorization of P6277:
416232800617986268709968345347934846593363776876194397704355521916034568978865219493 (84) = 
3 * 7 * 578467 (6) * 34264028117831166457449344177754457787596047325759653384710139197637447563899 (77)

Factorization of P6278:
422958222439455338367387620072017264933998224985520503656088786318107471475179399341 (84) = 
204835867 (9) * 586691459438899 (15) [ecm] * 1688582672580748500737 (22) [ecm,sigma=221819999] * 2084295894832861516042933641990455151821 (40)

Factorization of P6279:
429791769312875591810047229817044934850121215288844523329999580898089219049587140375 (84) = 
5^3 * 19 * 47 * 103 * 25097 * 60299334655447 (14) [ecm] * 1080263893441753 (16) [ecm] * 22866263634779814075994711228148022470388031 (44)

Factorization of P6280:
436735170883829206872574126693737544348277580409575241811976917342060341283507064683 (84) = 
27907004516436377952143099749717208596229 (41) * 15649661382560978823998955331390679560388527 (44)

Factorization of P6281:
443790184328289309223263429462526284218932411933182329481132713535587643237264070629 (84) = 
3^3 * 29 * 71 * 954411649 (9) * 3553444123 (10) * 2353815180753875986384250197772139154367491816084899995137639 (61)

Factorization of P6282:
450958594788626130422375603243790356705437731344353215111055661824311295008350572287 (84) = 
3 * 111893 (6) * 423169324199 (12) [phi1] * 3174668025453004666964523198530197951546924782980035495670311442647 (67)

Factorization of P6283:
458242215816483825564952403571231823612882592633579971159566262142414542869270497580 (84) = 
2^2 * 3 * 5 * 19 * 737082654149 (12) [phi1] * 880028448877208927 (18) [phi2] * 619694072490949556373700916322789516081071405897989 (51)

Factorization of P6284:
465642889822635678963107732038853635694109611002628996927456464683254403418829211790 (84) = 
2 * 5 * 7 * 2081 * 344868763 (9) * 3984448411513 (13) [ecm] * 2326273578985736618377441539313661761231858532637510987023 (58)

Factorization of P6285:
473162488533927107019275864554698978694456250085720983860099520764862423905442160289 (84) = 
653 * 535424539190647335091 (21) [ecm,sigma=1906106825] * 1353314871829744909792450818602551596855511913965883299428743 (61)

Factorization of P6286:
480802913457417574228527808661472326409782918520870837228260447961554560774356886019 (84) = 
93159037 (8) * 205974223157 (12) [ecm] * 147895548311945710543 (21) [ecm,sigma=1142980060] * 169423685475968777903669720805078562962568237 (45)

Factorization of P6287:
488566096351834271527783452968688887902332105038951597428654006905814575360189161697 (84) = 
3^2 * 7 * 11^2 * 13 * 2207 * 73591073 (8) * 30354744778717532748405764212884537558717553329638178995700391898573 (68)

Factorization of P6288:
496453999706452166391732798614415287437013646816790335226884879014860928777229458543 (84) = 
7^2 * 1816469269 (10) * 105287564299 (12) * 234603797765902182327301517221 (30) * 225809787439412146071584557569557 (33)

Factorization of P6289:
504468617227516821575002211536610587407075613284806470329530099926922581604470161760 (84) = 
2^5 * 5 * 41 * 43185469 (8) * 16851525236869393253208163341484382731009 (41) * 105670426231606217388261415384451 (33)

Factorization of P6290:
512611974332328194639413953449225923370979713435247205240016937575762246061541588008 (84) = 
2^3 * 3 * 23 * 43 * 47 * 9631 * 236917 (6) * 201379727134913010014855254915673922922335526471727190317307278558087 (69)

Factorization of P6291:
520886128651105473812423850619262731741681552176601232721730810262074751085473159431 (84) = 
7^2 * 3121 * 411626346427 (12) [phi2] * 510233441770407669173 (21) [ecm,sigma=974193722] * 16217386212355081399402686638303686548994685009 (47)

Factorization of P6292:
529293170536754877732898520366429823310478613035236643227519531383385777473945758463 (84) = 
3 * 41 * 44683 * 26976201451373 (14) [ecm] * 3569998708028376764825225528056343450866138798612280993114248259 (64)

Factorization of P6293:
537835223582664247694907448656008104494517599638453668317169595180172010003009371875 (84) = 
5^5 * 7 * 13 * 2113 * 93925037804478702167824493753669 (32) [ecm,sigma=685683423] * 9529650030533279184187183718903334234270737 (43)

Factorization of P6294:
546514445148650191547537566880435310758922186736366080451460769236964208045921284495 (84) = 
3 * 5 * 11^2 * 101 * 81355471 (8) * 653798340649 (12) [phi2] * 56049670593639733222463756136919069137747869554707153855587 (59)

Factorization of P6295:
555333026895185498904157490026703503495859780714384939490199503798225328437523811136 (84) = 
2^6 * 3^2 * 271 * 1790270695804892335985175249877986252491 (40) * 1987206620910249538536200665212857316001 (40)

Factorization of P6296:
564293195326036538220326710364889754265626371244526809975818332714474257309432048251 (84) = 
3 * 198953 (6) * 634853 (6) * 7762112680739 (13) [phi2] * 40480413032522566617782224584547 (32) * 4739527112900961652065051461 (28)

Factorization of P6297:
573397212339442368085022901281474521736475784947193655094862223035062802484101511478 (84) = 
2 * 3 * 404569397 (9) * 136631295209 (12) * 1728865123659475516669009757773636522007660692370554254107358781 (64)

Factorization of P6298:
582647375787969348211617334991054001691878947961639961867130306090599181894682421461 (84) = 
3^2 * 7 * 11 * 42181 * 39482647 (8) * 192436265569 (12) [phi2] * 2623387877020671625593875852521217530322098062656391849019 (58)

Factorization of P6299:
592046020047177120596951811927781010177787302725921776182336792249406905946271464425 (84) = 
5^2 * 315551 (6) * 12579953 (8) * 317742093172573002989194305473105328198201961 (45) * 18775526564337006873745319 (26)

Factorization of P6300:
601595516593233948630278112914792450057999816694636793725622864764078737334555742762 (84) = 
2 * 17863 * 1357040632504892359741 (22) [ecm,sigma=86912811] * 1957262898701062184166633302808944219 (37) * 6339838309005304436653 (22)

Factorization of P6301:
611298274589621552077574131715096917732678238273427037532218564841027144038141067002 (84) = 
2 * 61 * 103 * 3079189 (7) * 15798642362215801728706254924786685957720565374714893847705098057210156923 (74)

Factorization of P6302:
621156741483071759347369726561124618150695059811975277609912039865528621258359988465 (84) = 
3 * 5 * 7 * 3792572801 (10) * 1559832546590835801504134776776110217541389586183589374274936617889074633 (73)

Factorization of P6303:
631173403608879515775996032844571981862367286173999596708999255090305237590847290596 (84) = 
2^2 * 563 * 3469 * 669490963 (9) * 1597586088181 (13) [phi1] * 2108535528875944557131028072307 (31) * 35824991151269845164580027 (26)

Factorization of P6304:
641350786805739038375305258195015742269837868509649887070496548052639815352276138040 (84) = 
2^3 * 5 * 7 * 11 * 13 * 781686803 (9) * 20491265628064147718090563053010907158943992010532224246930712670565617 (71)

Factorization of P6305:
651691457040252194094599836598669458662253025982763092387186966145239217649561061610 (84) = 
2 * 5 * 7^3 * 19 * 3719 * 1678013 (7) * 1602406904006320309851793191995112148610297904003381508707278060238439 (70)

Factorization of P6306:
662198021041260500699103914863402836426249871982444189600912832468111924239147801523 (84) = 
3 * 53 * 12161 * 342469157793968915322724057502823923898517671959100201024572743608220693245677 (78)

Factorization of P6307:
672873126944154507406412087662518880046763147724946547752696236497770074557958626461 (84) = 
79 * 307 * 92013471973 (11) [ecm] * 301520121015018714078395905929995352298192319347324961146103024088269 (69)

Factorization of P6308:
683719464945316707004953796525834588594993311593171681418938430580323521676492344694 (84) = 
2 * 3 * 1530766381 (10) * 74441956376851461895821210065042423195099042744695571481299996682328880429 (74)

Factorization of P6309:
694739767966856562868126760069484976989923293121115569501162656443624404589470402440 (84) = 
2^3 * 5 * 11 * 2324032577 (10) * 169879618250748396052801664310892931 (36) * 3999318526100021578465973763048783773 (37)

Factorization of P6310:
705936812331798703646535318432875178443724083093405607549011777110887280387133172158 (84) = 
2 * 13^3 * 283 * 45192552829 (11) [phi2] * 1462427690674230670172519386409161 (34) * 8589701369123198888502457036307941 (34)

Factorization of P6311:
717313418449887846049653982860822980866926718875335231915632910380871515511195745113 (84) = 
7 * 19 * 409 * 1332371 (7) * 185555638155401009 (18) [ecm] * 53337748550213760959353250374244854981672021250162640911 (56)

Factorization of P6312:
728872451514176552607069336214063194709231644433958515608976195744877939846070581889 (84) = 
3 * 7^2 * 2473 * 552434603164797573379097 (24) [ecm,sigma=778402033] * 3629353000674336483348957272934571579973035549509481627 (55)

Factorization of P6313:
740616822208564517227129556616169698307740149109800572966714719492857806181725492972 (84) = 
2^2 * 83 * 3989 * 559231276226916578744506396065210728832406700587610335777842923078267801349589 (78)

Factorization of P6314:
752549487426460697355431439723153003054961676928175138921994643057996619396430670080 (84) = 
2^8 * 5 * 222423743 (9) * 5464796950704151370235977466563 (31) * 483693130776317098693908949877031041817529 (42)

Factorization of P6315:
764673451000742278194507669125495387416611089660736372461755165150775882516268962658 (84) = 
2 * 3^2 * 5387 * 12539534461381 (14) [phi2] * 305370691451684198090651 (24) * 2059433464994456361978922767739378265012173 (43)

Factorization of P6316:
776991764445187162406218949021572176982362831163443238352773366627661454181087612272 (84) = 
2^4 * 3 * 1571 * 41453 * 37166257 (8) * 5287700740951 (13) [phi1] * 54772616086724420063 (20) [ecm,sigma=782110714] * 23092122277106598540658640893188083 (35)

Factorization of P6317:
789507527707559428616196613192309793847720424369523359079092015443825237196021505001 (84) = 
3 * 911 * 3516893 (7) * 82140527634703904095488439973102217965972025014954857530428441830288128529 (74)

Factorization of P6318:
802223889934529994521471721876004675532608869652442080659200976469868722005067429825 (84) = 
5^2 * 413259875179135762797078227617 (30) [ecm,sigma=584607817] * 77648369766049994166183969565186285535378416879673929 (53)

Factorization of P6319:
815144050248617556124325753819909353194164885130848130295126118977876184669105220655 (84) = 
5 * 7^3 * 13 * 268823 (6) * 2324617 (7) * 3906437 (7) * 15874655897314426178118938772138851287 (38) * 943460904602165026253021 (24)

Factorization of P6320:
828271258537337754243625314207922312240904367694268724068054908585537060509984391216 (84) = 
2^4 * 11 * 24173089 (8) * 9301339237 (10) * 34584067417 (11) * 24892723563453920547153281 (26) * 24312734244757608394986282781 (29)

Factorization of P6321:
841608816254751443665892025459946098782316490214960714556612178700234388099001168980 (84) = 
2^2 * 3 * 5 * 13 * 173 * 197 * 20009303737 (11) [phi1] * 1582236385825635291766170756819938910842262506856722278114087894303 (67)

Factorization of P6322:
855160077235605909778911663737600878785751316370486252175315448999001150331330427417 (84) = 
19 * 15900319777 (11) [phi1] * 2830661631269119911344295778831667650301930867130404446699116713119969859 (73)

Factorization of P6323:
868928448522265892978134038585253202727660631878389660024170136492982858345116154423 (84) = 
3 * 734017 (6) * 5996964556809985202893 (22) [phi1] * 65799888996451224960120891631922127760827985963446978161 (56)

Factorization of P6324:
882917391204634343258475719913667691090752716167538112129768703305415290386912844875 (84) = 
3 * 5^3 * 11^2 * 37 * 389401528753179550640777195765633640870983617 (45) * 1350529444171755118058819319192017 (34)

Factorization of P6325:
897130421273265936920281381743059278739634179985314867319663016117819133603650173908 (84) = 
2^2 * 23 * 58657 * 493919 (6) * 5003581808645204326894237 (25) [ecm,sigma=1285002565] * 67268411347114364889435368633906698109156977169 (47)

Factorization of P6326:
911571110485879544958012877157731650316115927692558706531522587523339847182055652194 (84) = 
2 * 3 * 7^3 * 67 * 71 * 7451 * 12496761108803317995570612809154909186865676362258464860263903635174560299 (74)

Factorization of P6327:
926243087247479049204789533739802600368785754297189022008058243750962329468905659600 (84) = 
2^4 * 3^3 * 5^2 * 85763248819211023074517549420352092626739421694184168704449837384348363839713487 (80)

Factorization of P6328:
941150037504295158427625184265758390226283279267812972651632287534927587093797281171 (84) = 
67 * 130693 (6) * 107481008815611652558859332559779023009064227111229789014683298199338016492541 (78)

Factorization of P6329:
956295705651764183071052145443639776164183240934853547400130933347835908583863718550 (84) = 
2 * 3^2 * 5^2 * 11 * 13 * 5051 * 11783 * 67823004679 (11) [phi2] * 3681572711109534651190856210327038846119914566012710419386319 (61)

Factorization of P6330:
971683895456763085006448907005621934643666861702903071988475424293756501408984477165 (84) = 
5 * 19^2 * 854569931 (9) * 629941457598378061414077920266816739781917968912506165042882041409301763 (72)

Factorization of P6331:
987318470994323528248338453529031309084633806992582154680824576921743665344977303318 (84) = 
2 * 11^2 * 197 * 1499521 (7) * 5668079101 (10) * 2436616693108052701827567801552260018284305418180642794076702867 (64)

Factorization of P6332:
1003203357599051118946803379893125677896927571324886278423612736136626950860835149862 (85) = 
2 * 11 * 31 * 155119 (6) * 1281496139593 (13) [phi1] * 17391221831511937 (17) [ecm] * 425492793662664811851076094000302446663250588129 (48)

Factorization of P6333:
1019342542831479538868825331570247843823805570122002034288090556577665114819555259480 (85) = 
2^3 * 5 * 7 * 3640509081540998353102947612750885156513591321864292979600323416348803981498411641 (82)

Factorization of P6334:
1035740077459592846865087106705643492517315556207131457532321532161964484802962925050 (85) = 
2 * 5^2 * 11 * 17209 * 1524050722236316568953972084783612223723 (40) * 71801420487939574651998416296756690613 (38)

Factorization of P6335:
1052400076455752848319487048229749417724410670629639485840517236390406549423941001493 (85) = 
7 * 17 * 19 * 25841 * 16915864970378661175140126179703011866135441 (44) * 1064821429685412290494009625767873 (34)

Factorization of P6336:
1069326720009272114146034296990324987644494411740668239775968082115087834327732127335 (85) = 
5 * 241883 (6) * 149804428705946352355396051 (27) [ecm,sigma=844718997] * 5902152349423167623137645514058114495269335995861499 (52)

Factorization of P6337:
1086524254554876969394658639261155921329797157022231845821021995724640676440012644401 (85) = 
43 * 467 * 14699 * 749741 (6) * 995959359839 (12) [ecm] * 491554409533815646937028861927731 (33) * 10028634989512045985599691 (26)

Factorization of P6338:
1103996993817308567829728281725156046602413620300275495853626878340309060178492353034 (85) = 
2 * 7 * 147549109 (9) * 884598293 (9) * 1100545593912749617 (19) [ecm] * 32287013359144734632509987 (26) * 17002831622301610540297 (23)

Factorization of P6339:
1121749319872314023842082044377975138419445753636315676751164696189761486817725383310 (85) = 
2 * 3^2 * 5 * 1689098453793184631559095802821827 (34) * 7379014114852001272275021523551811931034652431617 (49)

Factorization of P6340:
1139785684224283487650123503327747011269799875930838758670343219972061935766706327281 (85) = 
7^2 * 13003 * 271253 (6) * 10804667 (8) * 151524697553 (12) [phi0] * 4028229382657699146663011517842337800341151663940875141 (55)

Factorization of P6341:
1158110608900793024854790474894858642115479523029034038170058909263042896437726082314 (85) = 
2 * 17 * 269 * 29917 * 8820293447690202403434953 (25) [ecm,sigma=974477392] * 479863555263781163885094003299430050818559147489909 (51)

Factorization of P6342:
1176728687564317197967833995076608456163864262271355909963628178817856599481916052884 (85) = 
2^2 * 11 * 392424387225613 (15) [ecm] * 12541573413919798172872911428209830318997 (41) * 5433950166735399566513929951 (28)

Factorization of P6343:
1195644586641379346477893586841077192932288808458761565806310149745639871456584417232 (85) = 
2^4 * 7 * 3907 * 141852690682257852689871092994860371001346583 (45) * 19262075909456781071158001237300831 (35)

Factorization of P6344:
1214863046469411724313880956292379884674799599511195798014332351472588303101198446500 (85) = 
2^2 * 5^3 * 11 * 163 * 1355117731700403485012694875953574885303736307318679083116935138285095708980701 (79)

Factorization of P6345:
1234388882461601880184407276697104874390103845746139556413789515465778134179419575475 (85) = 
5^2 * 347 * 967 * 147148569354890269997455784603393826164298370222666681338795766396654811569031 (78)

Factorization of P6346:
1254226986290005958204542591074589108927553814120403880473210529238535580088048985131 (85) = 
3 * 19 * 326999 (6) * 67290671273044075418039670547551387915481785320144166998805164500934177441717 (77)

Factorization of P6347:
1274382327087213954471346987543292039030376034613575344172392023011708632476295281100 (85) = 
2^2 * 3 * 5^2 * 7 * 31 * 281 * 6407186749161715229351 (22) [ecm,sigma=2130168838] * 10872891372483292024451340142836870701471715837088303631 (56)

Factorization of P6348:
1294859952666856390836994615960762082717384804307060040746567842221961153187927955027 (85) = 
14560657 (8) * 889797086029 (12) [phi1] * 227031411671639 (15) [ecm] * 2159542045144139198793429467 (28) * 203846488723419077887243 (24)

Factorization of P6349:
1315664990763246361088154918077485812423517054464962331053005075425979452241402251500 (85) = 
2^2 * 5^3 * 19 * 23 * 109 * 239 * 18838163 (8) * 604196167979679976901929673196423504419 (39) * 20307336317764587902120348977 (29)

Factorization of P6350:
1336802650290455468123668756174220892068798923431649243699844655260898687023442944081 (85) = 
101 * 1727880247348421 (16) [phi2] * 53089324430841344888681 (23) [phi2] * 2121901803959999245859 (22) * 67998573694859724602459 (23)

Factorization of P6351:
1358278222621126804596606146708954046301974646892044224023038277260009161475139997892 (85) = 
2^2 * 7 * 42923 * 763384123 (9) * 1480462853205483960493340206779815898165942603150978805648116427268591 (70)

Factorization of P6352:
1380097082885332834934985025515373069058420960835054077326791560652661770750081895757 (85) = 
7^2 * 17 * 313 * 15359 * 8429856242243 (13) [phi1] * 32401524663881 (14) [phi2] * 1261745439043577075081610575887152562766202718289 (49)

Factorization of P6353:
1402264691289790814777805585194140435168187552027840447543831679067879815775422654017 (85) = 
11 * 13 * 761 * 12885738228957029440263598551722893461567752699593288620455525753451750234559079 (80)

Factorization of P6354:
1424786594457753235776473813193299309120533754552750996878796900917618636864779116170 (85) = 
2 * 5 * 7^2 * 29 * 12011 * 8347887263661566363700233577778306251878387542786406601354323285508215152207 (76)

Factorization of P6355:
1447668426789895710550091381183052462492184990003172963028212004849923405617568433642 (85) = 
2 * 3^2 * 267779909 (9) * 242125799 (9) * 3570477782622623 (16) [ecm] * 347417112216207013677919708140206940622120539616433 (51)

Factorization of P6356:
1470915911846529715497756207039385401121235995506427015744000342336837921903281919263 (85) = 
3^2 * 11 * 79 * 557 * 658614707963 (12) [phi1] * 512671222341601925811819923940463523489405634265689429520532740933 (66)

Factorization of P6357:
1494534863751472689330830605923019832034222797075217994798497844725178038814273331642 (85) = 
2 * 109 * 6855664512621434354728580761114769871716618335207421994488522223509991003735198769 (82)

Factorization of P6358:
1518531188617913143779844105545023030843322086281492675701156573023757853446652614062 (85) = 
2 * 101 * 9195649467799 (13) [phi1] * 536919659687 (12) [ecm] * 1522581794368755689334236588477189103061916753189187224587 (58)

Factorization of P6359:
1542910885996613681159200080507707637540272006950598935511673989905455732474408471245 (85) = 
5 * 1304960680995877 (16) [phi2] * 62801203236127 (14) [ecm] * 3765350836648566046982115970192111892145554250208495531 (55)

Factorization of P6360:
1567680050346800132561461908989529455205384492776581422911459410637279256167380944197 (85) = 
71 * 653 * 15844502275457 (14) [phi1] * 2134063316270190485468967404445518021235470754742387963877547985567 (67)

Factorization of P6361:
1592844872530090431643716257010446151486284954352614052185649441555730488758448807243 (85) = 
3 * 7^2 * 710244822886350431872879 (24) [phi2] * 15256259610498377250087993111953691007783475879338082246311 (59)

Factorization of P6362:
1618411641327822323522341961728994082721312934905166119898431052913143426705455211279 (85) = 
2723400887540477 (16) [ecm] * 594261259417236057034556025438765433493172431983230371686895411999227 (69)

Factorization of P6363:
1644386744982144577489717843949393123842556204195058651604679400569618539522820691967 (85) = 
15600096032943536406411017 (26) [ecm,sigma=1457132768] * 3382465247163269882628468870408139 (34) * 31163293673497152068993909 (26)

Factorization of P6364:
1670776672761242027406811137803101038750926819038743836170425395097323582958988142310 (85) = 
2 * 3 * 5 * 11^2 * 89 * 233 * 31924687 (8) * 8362970887241141997977882833 (28) [ecm,sigma=503364076] * 83133988569755242709231152536398384878331 (41)

Factorization of P6365:
1697588016549070506028891562426675901542462165134406182307250124534597601412980302164 (85) = 
2^2 * 3 * 11 * 9996059 (7) * 2590712609 (10) * 210066573083 (12) [ecm] * 10753528710227050816147 (23) [ecm,sigma=571415723] * 219837800587740142838176514628367 (33)

Factorization of P6366:
1724827472459983570527669826325887366745272825512393543380119962238139271301772536767 (85) = 
3 * 13 * 97 * 331 * 5857 * 1883227 (7) * 598285759350347 (15) [phi2] * 20195106994202769471106079 (26) [ecm,sigma=1594024625] * 10335907299456268227385772797 (29)

Factorization of P6367:
1752501842478638837442289535370310456092989227033108912148097619775613867905494902139 (85) = 
7 * 503 * 81689 * 6092967737245247115343657274955709928900962089661032141071922987081277026931 (76)

Factorization of P6368:
1780618036125577757604915794156920822505754206600418927830031407900558947025748916997 (85) = 
7^2 * 31 * 31140877 (8) * 486725018800293999289689383 (27) [ecm,sigma=1801379905] * 77338987926371435211660180388534907596814794993 (47)

Factorization of P6369:
1809183072148878766646367621737824288654253223762153114456564578872261512537011100120 (85) = 
2^3 * 3^2 * 5 * 184279 (6) * 262896759101 (12) [phi1] * 210332881937464136783 (21) [ecm,sigma=848379684] * 493187162053978397782974226174900138281705931 (45)

Factorization of P6370:
1838204080242289945916958359617147231919892562637803479184310069738104703258519462567 (85) = 
19603 * 9818712283 (10) * 9550292030903100999769571863734918937217651757474090831794444568225383 (70)

Factorization of P6371:
1867688302790253623502806124877353245872303488813125751146172423191051985050824790529 (85) = 
3 * 23^2 * 193 * 233 * 73783 * 202025938741126363611951052396966955201 (39) * 1755701980476831152099640656248021 (34)

Factorization of P6372:
1897643096640241736945796989253840169589896620170256425115545589902774355100688395769 (85) = 
2473 * 1505183 (7) * 740972677 (9) * 253174280308953029462452178999185209437 (39) * 2717561216692768433725044959 (28)

Factorization of P6373:
1928075934902827269775978684352825986343745312110361857950058820051807397406936829257 (85) = 
11 * 23 * 61 * 118093 (6) * 655541 (6) * 14719811 (8) * 956082524942906535901 (21) [ecm,sigma=408205991] * 114670616937598309493497192432908975046103 (42)

Factorization of P6374:
1958994408779923664551034319490035036033466620189132175400228174246166471919496353000 (85) = 
2^3 * 5^3 * 373 * 3329532538013794261 (19) [ecm] * 1577397329514451612955787342424286593361169246100755301029001 (61)

Factorization of P6375:
1990406229421630807304331947055026976631583402848706901454377671203418060079689234448 (85) = 
2^4 * 3 * 7 * 11 * 8423 * 1063080055435215889 (19) [ecm] * 1782884676162729150941 (22) * 33732904466405123851012998201505598069 (38)

Factorization of P6376:
2022319229812132973690011845069770624773043555599823872764016366439702645570679296475 (85) = 
3 * 5^2 * 7 * 17 * 907 * 10259 * 32027 * 830177 (6) * 72297635581239970532317 (23) * 12668293557636143142298356013769275542793 (41)

Factorization of P6377:
2054741366685101027263607275218070507077986284031679913229053183315934149855901142555 (85) = 
3 * 5 * 11 * 1657 * 7515375968563490160251667947616431693195026733350450479066049206546823027581431 (79)

Factorization of P6378:
2087680722469058166856909127230018007422307780876948176673441939882413005179226374554 (85) = 
2 * 17 * 15854963 (8) * 3872754177368084471232259145216804292878676650995557402720712639432566107087 (76)

Factorization of P6379:
2121145507263175634527824995218212083601811318698701459044115420943237030496030370060 (85) = 
2^2 * 5 * 103 * 29610509 (8) * 557417165237 (12) [ecm] * 62384547573536473850135676490138963805669958234081982862890897 (62)

Factorization of P6380:
2155144060843972019746397987925320997625794665422427920972248995596880152741389903863 (85) = 
715499 (6) * 1526406767 (10) * 52976381206441933833530147157507194533 (38) * 37249007339731578756826018564367 (32)

Factorization of P6381:
2189684854703397130998771758963512672187057453926126288016578096938337148976686883507 (85) = 
3 * 83 * 3182787497917 (13) [ecm] * 13044290525727065995819828483046088317369 (41) * 211813755780131731540875932191 (30)

Factorization of P6382:
2224776494118788854559214289126917756271151569118913278506610879629408955023309257977 (85) = 
7 * 42499 * 52378769882383333 (17) [ecm] * 142775714204332391115572336942447132301999349946441241947891633 (63)

Factorization of P6383:
2260427720255198983529898686615546550442300010903640619300650803893289096644857741009 (85) = 
3 * 3257 * 2255206153 (10) * 102580630357178172403458279864267333282875507986958249245576911240169243 (72)

Factorization of P6384:
2296647412300591680138991563436467628841887247757176148046401487928098115476828993360 (85) = 
2^4 * 5 * 11 * 673 * 2777 * 7237 * 227251 (6) * 2240498389 (10) * 25052966239286335193849 (23) * 15126990890055459398054610393292201 (35)

Factorization of P6385:
2333444589634426032506578944670557925685790269651724155812037768482197210452270904439 (85) = 
17 * 19 * 277 * 127241 (6) * 970741339 (9) * 197874637424059103985767 (24) [ecm,sigma=550426257] * 1067073834955363318466180828884713804827573 (43)

Factorization of P6386:
2370828414030142085449188094795026956779375587335916814712625691992411936120148938189 (85) = 
3 * 11 * 3006347 (7) * 26148229 (8) * 1237644851520333377105137 (25) [ecm,sigma=161611818] * 738429023238746709351788411561878296093851243 (45)

Factorization of P6387:
2408808191892077765238938259221299921796192824522959537488479785054665584522101654041 (85) = 
8529839299414149504930772348273231141327897 (43) * 282397839787851651494200082238005327191553 (42)

Factorization of P6388:
2447393376527352282432566621666354414907704608622966810955327698320873056278217978162 (85) = 
2 * 3^2 * 141223493 (9) * 808206523 (9) * 22740434206549 (14) [phi2] * 52384550542422843832514328181477922193093315033365419 (53)

Factorization of P6389:
2486593570453259886837142071666760384891282348207333219385422795317422777057554804330 (85) = 
2 * 5 * 7^2 * 880809167913525947743 (21) [ecm,sigma=1959011456] * 45297024245211250310826383 (26) * 127191247724525788269281706648396593 (36)

Factorization of P6390:
2526418527740726266310567662159841299473353701778510504686372142837372258725391069424 (85) = 
2^4 * 3 * 11 * 7393 * 647218121908092387329580720849739439097117282774274217391956596646851715465231 (78)

Factorization of P6391:
2566878156394388428362746048403901859538099888786771051619553195213161703779584094863 (85) = 
3 * 41 * 547 * 2309 * 17826540772165610575477 (23) [ecm,sigma=1557045893] * 926876362399469759046108371937212507429373830712740711 (54)

Factorization of P6392:
2607982520769867582414144074880203728544682006356856684800637416450989095059512921228 (85) = 
2^2 * 7 * 13 * 379 * 271042117 (9) * 7812041551519453 (16) [phi1] * 8928176298026704324471030574959128671767776464977991563 (55)

Factorization of P6393:
2649741844028813353099339366271120576170348222775530422496826371434716853710365199612 (85) = 
2^2 * 2833 * 12281 * 1482671 (7) * 4470397 (7) * 32560063 (8) * 206412383 (9) * 427416610987907028187065966545795951715671997757 (48)

Factorization of P6394:
2692166510632306603221612288383465410935205182153505619902118371088125058159056457935 (85) = 
5 * 7 * 11 * 52861 * 1203805212177773099 (19) [ecm] * 109887829163869952420813819837925368621979356935506440433329 (60)

Factorization of P6395:
2735267068873217230949629221685759124992752964601370302358911851599266152885471909507 (85) = 
31 * 137 * 644046872821572222969067393851132358133447837203053991607937803531732082148686581 (81)

Factorization of P6396:
2779054233448122531709308849515217850611221789105479150969012835614857382360904560067 (85) = 
7 * 19 * 401 * 499 * 19991 * 505916204778623 (15) [ecm] * 512092119336590833 (18) [ecm] * 20162262328389655033119928642423031687029 (41)

Factorization of P6397:
2823538888069401083105806867749041022147475169815666263565604950847730917199157384115 (85) = 
5 * 11 * 23 * 73 * 127 * 1259 * 1621 * 1823 * 4674580199 (10) * 39208279190628061 (17) [ecm] * 353070031453380223116601999771338894269687 (42)

Factorization of P6398:
2868732088118126623287592618482526252929173624958871122123128396872951556845051411486 (85) = 
2 * 2677 * 163775068477 (12) * 1790881779485233 (16) [phi2] * 10836000107398643 (17) [ecm] * 168588488157142532185656539039638246693 (39)

Factorization of P6399:
2914645063338396051645377167610090237036722554339150679653711621359214049810073338025 (85) = 
5^2 * 7 * 967 * 232096024835530688646663938604924330879795618289 (48) * 74208465326495866139926182236081 (32)

Factorization of P6400:
2961289220573735487865399779740561874081799956999864821635708504984607831165182799000 (85) = 
2^3 * 5^3 * 11 * 47 * 4783 * 97399193 (8) * 12295170150454423336106813338454151447651624815863872965785561641013 (68)

Factorization of P6401:
3008676146546238283405672520477233022897062810103127686101275978321353398857861276680 (85) = 
2^3 * 5 * 9421 * 752359 (6) * 1297991543620867 (16) [ecm] * 631830618428299203266772064401991 (33) * 12939598360159583928671099 (26)

Factorization of P6402:
3056817610679098990746293366525982644817895504664995855778933751779572904460097591002 (85) = 
2 * 3^2 * 13 * 1973 * 88504409573 (11) [ecm] * 7980730656515809 (16) [ecm] * 9373872042536999149741487258252108689661384060689873 (52)

Factorization of P6403:
3105725567963217562627153853529052967839877600812014247480263329689700156795306284925 (85) = 
5^2 * 7^2 * 89 * 107 * 6221 * 26421569857681 (14) [phi1] * 620387163989 (12) [phi2] * 2610787841533604319295486376305895694435756098999 (49)

Factorization of P6404:
3155412161868558478310323586362780591582876199744641465084028351698971653175920107355 (85) = 
5 * 204443 (6) * 3086838054488105220829594152270100313126765112764576400350247601237481012483597 (79)

Factorization of P6405:
3205889727300960079108417026851206857347949271817798512557369347248597330522952802112 (85) = 
2^6 * 13177 * 26808198139759921513 (20) [ecm,sigma=1049998601] * 141802678816858739076016144414717637745365221593096426423133 (60)

Factorization of P6406:
3257170793605100143459504671705977850938197383081643203845545069360962434840183351345 (85) = 
5 * 19 * 37 * 735431 (6) * 1260007906146665760913876111662350199269819560828972794563949834083498370533 (76)

Factorization of P6407:
3309268087614334645196186971489961720273194882157711730062927280895083210878503313224 (85) = 
2^3 * 139 * 21049684339 (11) [phi2] * 124542134701321001362151 (24) [ecm,sigma=1312230188] * 1135181411742241738785012928617329740983174208543 (49)

Factorization of P6408:
3362194536748137719881837053856631921823429095545758079489022983558474514665766586590 (85) = 
2 * 5 * 7 * 11^2 * 918809743 (9) * 3511770125379448290824674946391163 (34) * 123023408666030970797441512522765307033 (39)

Factorization of P6409:
3415963272157882115739810869251444151125819560224036135534831216159264801000536495340 (85) = 
2^2 * 5 * 74086494319 (11) [phi0] * 1551284269673 (13) [ecm] * 1486116182338209431556424027186811309044056167320813977640841 (61)

Factorization of P6410:
3470587631921710830389819686675875523941285410806328380181228076901277171644869840538 (85) = 
2 * 7^3 * 11^2 * 2243 * 52673281 (8) * 353894557643730908141418860479362775728550570444230920722383776020081 (69)

Factorization of P6411:
3526081164289262234977577306054280907896938601688709036567301144378806932490744663078 (85) = 
2 * 145931 (6) * 8057651159707 (13) [phi1] * 237567676231 (12) [phi2] * 20257300972380235613 (20) [ecm,sigma=1244098603] * 311556889113387928094846141237139889 (36)

Factorization of P6412:
3582457630977022766027510620277923369493530782573145977430391606151762810746947273744 (85) = 
2^4 * 11 * 29 * 59 * 101 * 1933 * 6847507 (7) * 250564256520802956209 (21) [phi1] * 8810618704311371190709168630793 (31) * 4030947555750007 (16)

Factorization of P6413:
3639731010515093225192926210290136032532363038035667366804218558334987450682151628365 (85) = 
5 * 2489936959 (10) * 292355274085081221945340521393508584209289054376871664950792720719238695447 (75)

Factorization of P6414:
3697915501646166870794277851187722244469105298738712184455123785182239159850888001490 (85) = 
2 * 3 * 5 * 11 * 47 * 157 * 2374750597 (10) * 262863569523691 (15) [phi2] * 185645834530118215552810522744561 (33) * 13104242379073530699281 (23)

Factorization of P6415:
3757025526777529815436981406976742663576759762463432838736666366306045346935821933509 (85) = 
13 * 4294830398149988035618987 (25) [ecm,sigma=2134436651] * 67290658025229598519682912681849791073475786936199748104139 (59)

Factorization of P6416:
3817075735486906763941295742692363208496959554538369564060670255366251436447914762728 (85) = 
2^3 * 97 * 29641 * 356817606488501 (15) [phi1] * 27393377194565617 (17) [phi2] * 16650154911690099221 (20) * 1019685098366311049993768269 (28)

Factorization of P6417:
3878081008082987838197320634573521249707403679373018137669504193491083620447672976062 (85) = 
2 * 3 * 7^3 * 3677 * 5339233 (7) * 144327282696595183 (18) [ecm] * 665044288105408199546942468155982252516005941893462113 (54)

Factorization of P6418:
3940056459221485143321471758571502211939466520069295211417901049980470528358002831034 (85) = 
2 * 100801 (6) * 1995517842214644089 (19) [ecm] * 95933729817485084382211 (23) [ecm,sigma=188482048] * 102089402936297273859763073827930016023 (39)

Factorization of P6419:
4003017441577580835624990445781619159639040875875133821420126539742279839307774390100 (85) = 
2^2 * 3 * 5^2 * 7 * 11 * 19213 * 533276748368555273020030827767074817 (36) * 16913273488810748168682990213211910892551 (41)

Factorization of P6420:
4066979549575641760443717375161292496629499959425759532386343982490792233441231274465 (85) = 
5 * 941 * 2903 * 18007261272322391 (17) [phi2] * 2466149035769522589636586184686331 (34) * 6704993180852200963884179971 (28)

Factorization of P6421:
4131958623177089239901252309751107858131263520794216347133308880438859539386466499161 (85) = 
3^3 * 131 * 991 * 66791 * 18363347 (8) * 150445193 (9) * 6388503648269858655233262713845363138069685489602388730803 (58)

Factorization of P6422:
4197970751727326310311345157613066645286205545396667997960798433434257274341029395316 (85) = 
2^2 * 41 * 293 * 601 * 23509 * 74843 * 34864146278056787 (17) [ecm] * 2369676652252142694679068846662221535439310495096757 (52)

Factorization of P6423:
4265032277862638639344096562851337132598080898127522451991191943089329462487176965207 (85) = 
3^3 * 13 * 29 * 311 * 331 * 479 * 839 * 5279 * 5944934071 (10) * 2112450494065401585027223 (25) * 152772823874407757196229610403239 (33)

Factorization of P6424:
4333159801477999497506759350655511644076899267975828276039539150974315831229882471650 (85) = 
2 * 3 * 5^2 * 7 * 37 * 73 * 2083 * 4848227 (7) * 79118821610158510121527093 (26) * 1912224139057699309863872738486286823505821 (43)

Factorization of P6425:
4402370183756723520195117904238413223181182983040109308748110641770011564147839504019 (85) = 
383 * 934259 (6) * 12679814659 (11) * 1606921213788490309837 (22) [ecm,sigma=906388900] * 603827661934745664643849639168452188505407369 (45)

Factorization of P6426:
4472680551262928578876837450568204092519190991297961749957043764050924781203073386887 (85) = 
23 * 1321 * 508301 (6) * 204563 (6) * 13949072443 (11) [phi0] * 101494813378688239023790767049040553595467560626543369448621 (60)

Factorization of P6427:
4544108300097779886245593105419674845540929510600181607916141931257938182304031027540 (85) = 
2^2 * 3 * 5 * 331 * 10924156687846702810579216629902443126673 (41) * 20945055164819545781142854735645198738593 (41)

Factorization of P6428:
4616671100120505493857265122075627599089855642644434215422333081117618052415961218600 (85) = 
2^3 * 5^2 * 1777 * 101429 (6) * 128070577694617453279669680148994659203767016898704186156257388089580259721 (75)

Factorization of P6429:
4690386899235187605302135875379840007717511511552523276720297646134854019103634105290 (85) = 
2 * 5 * 277 * 1693280469037973864730012951400664262713903072762643782209493735066734302925499677 (82)

Factorization of P6430:
4765273927744349626907805294656988610449207728907851207438085661272318615009633915393 (85) = 
3 * 11 * 67 * 11824190407707126558127129875774096694015239940973 (50) * 182275254594231082254932425395031 (33)

Factorization of P6431:
4841350702770374614888059826467791360524734713205862779328534534093099070626813211248 (85) = 
2^4 * 7 * 167 * 146955827 (9) * 1696252678349 (13) [phi1] * 1038376120948295784939424470785005393891289999452769939812769 (61)

Factorization of P6432:
4918636032745806756389247846482482329922473875576225188182589826006726602469659158066 (85) = 
2 * 3 * 7 * 12894456881 (11) * 156358871975959043349029007102629041 (36) * 58085778412230953476957879391087013013 (38)

Factorization of P6433:
4997149021973603745729175153194410689258245046712938793511536367430632409644908548023 (85) = 
3^2 * 19 * 2111 * 15864365229959 (14) [phi2] * 872600098250135752213354833960904906350779123658129740508566837837 (66)

Factorization of P6434:
5076909075258424390021598617473845255697353781432917830075005830395606973254885773930 (85) = 
2 * 3 * 5 * 7 * 19 * 4084937201951 (13) [ecm] * 96131008544360331731821 (23) [ecm,sigma=1339708318] * 3240243190868521713464610817363515947786157317 (46)

Factorization of P6435:
5157935902610052504136491451900364075248591522778883061895497165497642751465320275451 (85) = 
3 * 7 * 11 * 4735513 (7) * 29851333 (8) * 157954934818035093277849137069065937012591776756418498641987547780049 (69)

Factorization of P6436:
5240249524020075137424635189824251916939360510289194571854527948763055307159907221127 (85) = 
2311 * 16633 * 164209 (6) * 3488453 (7) * 237986105320627488257627971425130497770575997688611502625689103877 (66)

Factorization of P6437:
5323870274312950417755719348940734897245777157297486489316997474056787760525790420778 (85) = 
2 * 7 * 11 * 31 * 581557 (6) * 42043766947621 (14) [ecm] * 45609062174789271376914228451060725747799653821216854343310751 (62)

Factorization of P6438:
5408818808072617806162548489156373777897444206778111253018029342384668446118041381363 (85) = 
7^2 * 1449585056412893 (16) [ecm] * 111726035599483659510546722723 (30) * 681566539025288065548746520740976798133 (39)

Factorization of P6439:
5495116104645821331791208314558497589566689532025593857148549461896769151468960895635 (85) = 
5 * 43 * 296741 (6) * 6917318027 (10) * 12451541319230954570519498297324928012020774462383777186931373221027 (68)

Factorization of P6440:
5582783473223334426030574489495092697194087443625384704182448185246387760682455561978 (85) = 
2 * 298420088927 (12) [phi1] * 1284030147923777 (16) [phi1] * 128168405436316116597454243201237 (33) * 56837704675126734134121943 (26)

Factorization of P6441:
5671842558000293300799141856103564995908242147190830826066615672464248244373350903657 (85) = 
11 * 615142120553 (12) [ecm] * 838216134937672400584774346476725595215492692898496185973038876874095779 (72)

Factorization of P6442:
5762315343416864423230867206460633764592305728004920009039588613551210438872856099498 (85) = 
2 * 43 * 25439 * 993053 (6) * 51573458627 (11) * 103266582971 (12) [phi2] * 498012270313062193053875594839195797842509368052837 (51)

Factorization of P6443:
5854224159480490531716849335340048932323536187668216786257367362114156363602546905194 (85) = 
2 * 142871 (6) * 24194617 (8) * 846791550444847194028040140548595372183214801840041999131120582039344171 (72)

Factorization of P6444:
5947591687170978820783714710105868483971643928549001838102486959537635032555210140635 (85) = 
5 * 61 * 1289 * 1481 * 18121 * 171373795123 (12) [ecm] * 519996894318006191 (18) [ecm] * 6325662341941506241110859430215950871317791 (43)

Factorization of P6445:
6042440963929714399046225618617096425447296102104648898855350330256899123688256834341 (85) = 
7 * 11 * 5733519662172191117 (19) [ecm] * 13686751575921906321863511495654165725355335416380056916292461149 (65)

Factorization of P6446:
6138795389234301899951761415231215895120964499718726517608500135809148404293995770218 (85) = 
2 * 19 * 127 * 151 * 713533 (6) * 381350111 (9) * 193793656029272749 (18) [ecm] * 159750194925042242712208414706595184886614208489 (48)

Factorization of P6447:
6236678730259958203797030793245734445901598765060712449792609417281972869666684255473 (85) = 
11^3 * 17 * 19 * 15174118711 (11) * 14166254153431 (14) [ecm] * 67486093389112422971182574108668615853898688788760333481 (56)

Factorization of P6448:
6336115127628999616170979998579864173921062988684337413952670491321017047240093108005 (85) = 
3 * 5 * 12647063719 (11) * 23687404436123431891 (20) [ecm,sigma=1776920456] * 1356715827164457582883 (22) * 1039287556547019397070179728051781 (34)

Factorization of P6449:
6437129101249787547260978832533954707764500425626299629553601336874549748480056334500 (85) = 
2^2 * 5^3 * 11 * 13 * 207402935068313095947843779 (27) [phi1] * 488290746603106464613961 (24) * 888981626907613879491389527657 (30)

Factorization of P6450:
6539745556246517753121949637124973231283327297927071900064920069959370850307012500347 (85) = 
11 * 331 * 337 * 128987 (6) * 15259605026067113 (17) [phi1] * 2707827764910386825650968178032987800419157893712262546161 (58)

Factorization of P6451:
6643989788981259538892534906781115022920144154667955573591140981395487320353512398478 (85) = 
2 * 3 * 54145940813 (11) * 20450870644600846448596779772487784226372690480646598830854267449810551201 (74)

Factorization of P6452:
6749887493169672989964575879990068999548048399825478810707447424570599165809040850734 (85) = 
2 * 3^2 * 7^2 * 11 * 23 * 67247 * 96753394835139499 (17) [phi2] * 404036211491968729 (18) * 11506626353277282909387158845733992400567 (41)

Factorization of P6453:
6857464766091854295262625739807845247588389283559315644439217863776916223166366625535 (85) = 
5 * 17 * 12136051 (8) * 92233620822190721 (17) [ecm] * 72073897567344532730438606489305307757171268141126435374001 (59)

Factorization of P6454:
6966748114899781562135231735491871520739588313728521922542947622994421722614723284300 (85) = 
2^2 * 5^2 * 1459 * 3109 * 473927 (6) * 1747108694749577217613 (22) [ecm,sigma=396434232] * 18549094691507024407350808678766761524937758503503 (50)

Factorization of P6455:
7077764463022856200042476340645147699600657956026163381068014875019027415259500719024 (85) = 
2^4 * 563 * 65957 * 16635293 (8) * 23614014801956171 (17) [ecm] * 30325400751446780316241579513885386532232840526097243 (53)

Factorization of P6456:
7190541156673057975466016600269556369990965355917051143151961903727064513675716007266 (85) = 
2 * 31 * 1553 * 28149111323955968092251674698326394254599124213053 (50) * 2652978574249059313895897642027 (31)

Factorization of P6457:
7305105971451255218569092597656216989829134579695936856323409441552846024237737905883 (85) = 
3 * 31 * 72167 * 1134619 (7) * 2264286293 (10) * 266333707867873 (15) [phi2] * 1590733382804298590961929894386381197606086945623 (49)

Factorization of P6458:
7421487119056235398475618103325621719060702779546542856332192833483852239820483370078 (85) = 
2 * 33199 * 111772750972261745812759693113130240655753227198809344503331317712639721675660161 (81)

Factorization of P6459:
7539713254098045384082099361190109038135579474599009727117713421675092237441534317190 (85) = 
2 * 5 * 7^2 * 11 * 2063 * 459622679 (9) * 1903322501 (10) * 5005868963 (10) * 13565602647329 (14) [phi1] * 11413909785890764701980789024109135299 (38)

Factorization of P6460:
7659813481017255176609217775337880136160878915489069584616112260367429552789071862124 (85) = 
2^2 * 3 * 367 * 1787 * 1380672067 (10) * 238918391032321046843263 (24) * 2950571966377706075744119112649322817669759753 (46)

Factorization of P6461:
7781817361111783744271062355429861798778603322385168583003215770977783627554035286061 (85) = 
3 * 17 * 152584654139446740083746320694703172525070653380101344764768936685838894657922260511 (84)

Factorization of P6462:
7905754919672950814204219023940269082656765081007834785540455445072644116983722808488 (85) = 
2^3 * 3 * 29 * 101 * 419 * 2833 * 105721378283 (12) [phi1] * 896167767835473254907878269784677601584533401324019499492866983 (63)

Factorization of P6463:
8031656653232444087957924001459480269825784769011575707446100626348769420622679897860 (85) = 
2^2 * 5 * 11 * 17 * 4696226214104510563417 (22) [ecm,sigma=72962053] * 457282439352987549222283046704326991923656958337444518302767 (60)

Factorization of P6464:
8159553536921917350289980765826648938541441951040893451823289083568943338220393860705 (85) = 
5 * 919 * 2941349297 (10) * 338742227426489 (15) [ecm] * 1782234883618006973644827050567047234648939643125525246883 (58)

Factorization of P6465:
8289477031946961342720171795188943644317317069123590129477704676293630842811329472877 (85) = 
13 * 37 * 257 * 243126020539 (12) [phi1] * 3325961293858620276709944511 (28) * 82927829851764742847097213596867444224489 (41)

Factorization of P6466:
8421459093177216079333197032167215753186795673101104400932560507782195422921699405628 (85) = 
2^2 * 3 * 7^2 * 47 * 109 * 15756691 (8) * 69497799169510073 (17) [ecm] * 2552992808636207849937439174288791904989759416960486629 (55)

Factorization of P6467:
8555532176854420498858521225089621305440483623435213227999809537571090266769283607461 (85) = 
7 * 1222218882407774356979788746441374472205783374776459032571401362510155752395611943923 (85)

Factorization of P6468:
8691729248420222980340132537402218584159148441444630535198875415115184496254398581400 (85) = 
2^3 * 3 * 5^2 * 17 * 852130318472570880425503189941393978839132200141630444627340726972076911397490057 (81)

Factorization of P6469:
8830083790465604306095175643703763349195886969138976188681340805036774689606064482060 (85) = 
2^2 * 5 * 19 * 431 * 2659 * 5479 * 12011 * 701303693 (9) * 8986195051 (10) [phi0] * 10738302112605833153 (20) * 4552894302163263832065186525403 (31)

Factorization of P6470:
8970629810803793141593075755213026644033391599311533270455444344019516874029494858985 (85) = 
5 * 97 * 131 * 1697 * 5927 * 50707 * 8469039335638738041786467533 (28) * 32688204352418985427085350537426735892839 (41)

Factorization of P6471:
9113401850668583023910201339323423751426360171467632960721263986495097486486052400008 (85) = 
2^3 * 38273 * 29764461404477644239771514315978051601084185233283362163670420356697598458724337 (80)

Factorization of P6472:
9258434993039989215172616789785718951642021984441616617685274591065666626264759230970 (85) = 
2 * 5 * 23 * 227 * 164663 (6) * 511001 (6) * 6557277977 (10) * 567237932537 (12) [phi1] * 566600892914640068417138269600640105159848003211 (48)

Factorization of P6473:
9405764871099213591635051022769009988609069896606916151417158441893344883625898161629 (85) = 
7 * 132973785407467463 (18) [ecm] * 134712422314435396505603 (24) [ecm,sigma=1768256810] * 75010558717056415189553369646543360430609423 (44)

Factorization of P6474:
9555427676814916009604077039093988722418899593507393656966313984781272250322109786250 (85) = 
2 * 5^4 * 11 * 23 * 61 * 211 * 24407 * 312969021705135307 (18) [ecm] * 307320514623588800348374761455068464461079861575970667 (54)

Factorization of P6475:
9707460169662821323247649967002780524994479466294968343699664900164757946970385248454 (85) = 
2 * 157 * 197 * 223 * 423431 (6) * 203876888625735125341538087 (27) [ecm,sigma=1417481344] * 8151813452488384093364970094824274789584047773 (46)

Factorization of P6476:
9861899685480722433496907011798101506828265536234820843586234018975601657199777210118 (85) = 
2 * 179 * 1416671733830733741131223813015583 (34) * 19445016913605288131546716681039839498280487983087 (50)

Factorization of P6477:
10018784145460971428901731594793120464897315596353183905499696787906051331117009576388 (86) = 
2^2 * 3 * 13 * 1129 * 346486667 (9) * 14094503347 (11) * 1076789746956020989 (19) [ecm] * 55004055293329333 (17) * 196668385927428638873981599 (27)

Factorization of P6478:
10178152065282583045719797098044780989579406813249436271058722280944048970034269746958 (86) = 
2 * 3 * 19 * 12421 * 8727689 (7) * 493009513284908907547683755327 (30) * 1670524925390409809379995141831296311455269 (43)

Factorization of P6479:
10340042564385107333080572749768575789998764081524510103900119412488818060937215767590 (86) = 
2 * 5 * 1034004256438510733308057274976857578999876408152451010390011941248881806093721576759 (85)

Factorization of P6480:
10504495375386461567263864468727639546567742600665804305343793050586689930313460195099 (86) = 
7 * 204360193897 (12) [ecm] * 35374297206400411130151477657437 (32) [ecm,sigma=1991759564] * 207583594451133693795336930239184287496713 (42)

Factorization of P6481:
10671550853646945124573161613275693703344750828650676655826792515233847388519386376314 (86) = 
2 * 31 * 2464621 (7) * 433590378370036750183 (21) [ecm,sigma=1575320672] * 161066813868082729156697851194326487104105709918349904729 (57)

Factorization of P6482:
10841249986981695202688878048953777296090825951360062923638394431435191825842484445561 (86) = 
18859 * 134026929503 (12) * 165469797480681423372703 (24) [ecm,sigma=247117431] * 25920889148130485630522136938719178085655207531 (47)

Factorization of P6483:
11013634405523875983593988064295853555086952835355411807352854624978263647284765412769 (86) = 
7 * 4003 * 14120329 (8) * 4948283 (7) * 5625325802136035915481516888385674818968625468137331493233644193327 (67)

Factorization of P6484:
11188746391740929065131766592297979110665184035465893494592548203138020762970812309700 (86) = 
2^2 * 5^2 * 61 * 79 * 479 * 9631 * 6490962785295256158743 (22) [ecm,sigma=970486797] * 775369097846967369746557653106016572757155200359509 (51)

Factorization of P6485:
11366628890606248761060067449965451263395974712889752948388890206990769330672721047728 (86) = 
2^4 * 3 * 11 * 33533 * 1259087 (7) * 11521742454335746109 (20) [ecm,sigma=791121153] * 44253889424624445825647432105042865400008174291205309 (53)

Factorization of P6486:
11547325519928682189308864088553686667479130115368367454125334525352397199674605231182 (86) = 
2 * 3 * 11 * 59 * 2965414874147067845225696992438029447221142813397115422220168085606676219741809253 (82)

Factorization of P6487:
11730880580842290943351862106108338567703767316707288085866837250929783211135376893576 (86) = 
2^3 * 3 * 7^2 * 14867 * 670965130096966970137021162819879265525286069173158930148154752806504705162153 (78)

Factorization of P6488:
11917339068458848580619146439866345790051592641062236573697880929440936469246142641088 (86) = 
2^6 * 3^2 * 11 * 23 * 241 * 2169967 (7) * 12392230051 (11) * 145229336029949 (15) [phi1] * 39910893577 (11) * 2177062258986897862392393817890412691 (37)

Factorization of P6489:
12106746682685586173284270410207447812952153199464703650496011540852127900624132880155 (86) = 
5 * 11 * 209524692332993063789050475295916600480434262676341 (51) * 1050581029409572179986407380506281 (34)

Factorization of P6490:
12299149839210736759264024820693926633943735785908855983444984153999729095027710233472 (86) = 
2^7 * 3 * 79 * 317 * 1049 * 63446939 (8) * 19216369992325173247666057834644865682585220434700449989818721891621 (68)

Factorization of P6491:
12494595680659468713712270489340919858123842294037195360410824443152766559592339305539 (86) = 
3 * 11 * 2477 * 21504537487 (11) * 277496544433 (12) [ecm] * 15830491114255999 (17) [ecm] * 1618080733018217246262669791116775116829551 (43)

Factorization of P6492:
12693132087922837842644421415330903173301373125647076288635213439302870853665339382462 (86) = 
2 * 7 * 503 * 541 * 6199 * 55501 * 2361089 (7) * 255788186213789164351848359 (27) * 16034677474071616509821855653839897079 (38)

Factorization of P6493:
12894807691662428389706005720156923964357063435734401424362711562775990745880569759908 (86) = 
2^2 * 823 * 4228012597 (10) * 15256281473366947145965150992753897603599257 (44) * 60725357157106143826030484731 (29)

Factorization of P6494:
13099671883993394153744663897029940013655520191647961836299248320175244141369998502320 (86) = 
2^4 * 5 * 7 * 11 * 53 * 32925923207 (11) [phi1] * 1218613191404004553476368665722150893669130767020184163926046724871737 (70)

Factorization of P6495:
13307774830348652548147380665950436788041779344825052208351785970407434525642444139556 (86) = 
2^2 * 3 * 3331293240449 (13) [phi1] * 7876458042869066571901 (22) [phi2] * 42264951056520030230601512467749901288038150693887 (50)

Factorization of P6496:
13519167481527026702393163097999025848380454203692615915211087595431796137461993872119 (86) = 
3 * 11 * 13 * 787 * 7237 * 36954037 (8) * 913699978918545029 (18) [ecm] * 371819780056533392057 (21) * 440718577202374954478186987629 (30)

Factorization of P6497:
13733901585928173621619451559315053209029919719018286872087954871167888381783726525170 (86) = 
2 * 5 * 7 * 59 * 1499 * 489833 (6) * 4528915381294500375279538140361923334312987603248193860543586053879599827 (73)

Factorization of P6498:
13952029701977179991028333453564571505165744604002731983887284769424816165509895244191 (86) = 
3 * 61 * 71 * 3041 * 3978883 (7) * 2692217357 (10) * 32964025762302969618965112116016587001126018735333525137533097 (62)

Factorization of P6499:
14173605210741751448634752789995640164789801597297355512443684676128289439771087463250 (86) = 
2 * 5^3 * 13 * 11772296117 (11) * 83225370779 (11) [phi1] * 8743087059831153181 (19) [ecm] * 509114248304815609334057131134755300869507 (42)

Factorization of P6500:
14398682328744966062302816386640063608668783058502316874419748926902008784956228204378 (86) = 
2 * 3 * 37 * 16759 * 74687 * 249703789747 (12) [ecm] * 207515970547778723234219649398935549318397777711938110304690249 (63)

Factorization of P6501:
14627316120976608345500520677190741046390151285889212222400864522801791782815491703735 (86) = 
3^2 * 5 * 7^2 * 433 * 21052695767 (11) * 727713518365378945212907490649624235926826619717649125099047300058597 (69)

Factorization of P6502:
14859562514106146441155682302929188980676374733104685786521435721142853129448826950600 (86) = 
2^3 * 5^2 * 29 * 71 * 653 * 10427 * 59219 * 217668907 (9) * 411139932618304848184142465346670661822790338077767953161229 (60)

Factorization of P6503:
15095478309900462105002200678528893132745746243789059585161709436443417460609973133378 (86) = 
2 * 13163 * 619061 (6) * 492960571 (9) * 1878954971813749232019241551120362450065440931398356256238756026613 (67)

Factorization of P6504:
15335121198849490839611764391116008432152339711008974283204263486835900492417885906405 (86) = 
5 * 23 * 49199 * 593119 (6) * 44331627037 (11) * 1326334490947 (13) [phi1] * 189855205329985759813 (21) * 409356807664043544286108968941 (30)

Factorization of P6505:
15578549774002977978820001244596795424601063320314136999626875553183307084645006649963 (86) = 
6846703 (7) * 18159698026361 (14) [ecm] * 2979965674653806442296193335332079 (34) * 42046093618131769425320323524259 (32)

Factorization of P6506:
15825823545021605710551088076368940981195210105182314932212334424362685458475663842340 (86) = 
2^2 * 3 * 5 * 131 * 67617131447267 (14) [phi1] * 696107727527 (12) [ecm] * 42777024810048259830000802939249960117427908882136382041 (56)

Factorization of P6507:
16077002952445795965361646030054023495758689341149189574436008899953830979506709288241 (86) = 
3^2 * 11 * 76243 * 24294621680193638185681 (23) [ecm,sigma=1765704549] * 87671771060880528379226841611371929181039570603318276873 (56)

Factorization of P6508:
16332149382185544799773974952288259602523103907698485616806621030557300026891424655668 (86) = 
2^2 * 3 * 7^2 * 14583554420969830481965915279163 (32) * 1904594960435609561668532839153847119652900244546797 (52)

Factorization of P6509:
16591325180234695379233469722736537349977828053184237684852625483417603552383356443835 (86) = 
5 * 7 * 11 * 13 * 315103 (6) * 8184523 (7) * 195297023 (9) * 788181540366380579 (18) [ecm] * 8350436918824469030075445690024391833655879 (43)

Factorization of P6510:
16854593667613108927063667418383645463312418412458916023640093218580865147954942255004 (86) = 
2^2 * 2441 * 557612201 (9) * 66119935218397 (14) [ecm] * 51076878841128677628541435822017300107 (38) * 916645641929531597609 (21)

Factorization of P6511:
17122019155540246065040800496243966689080251668635006846323528097062642891293180521410 (86) = 
2 * 5 * 13 * 321346939 (9) * 409861814983717311239134466015296720712004035772186129964936985659952521363 (75)

Factorization of P6512:
17393666960843724840284402158308757847467268054145172386322759471541038974414267550157 (86) = 
125551 (6) * 2558350541 (10) * 528294008586388696039879 (24) [ecm,sigma=291407174] * 102502684200447332249187468715102215852584990713 (48)

Factorization of P6513:
17669603421606476424360985352543800927182866811748145752096910603662791007456617062552 (86) = 
2^3 * 79 * 35677 * 170089217 (9) * 815590337483 (12) [phi1] * 5649012578669737238324398297663379454932064486950768599363 (58)

Factorization of P6514:
17949895913056174996309545650532118460906287896740717457309627772255839681105990656890 (86) = 
2 * 5 * 593 * 326187751 (9) * 89765508555555265769587 (23) [ecm,sigma=1097194178] * 103378469240127387106354625496120518722491554563829 (51)

Factorization of P6515:
18234612863700674694394754975639702477861909673646300481370157261738795009416493863844 (86) = 
2^2 * 7^2 * 19727 * 106430072647 (12) [ecm] * 44311359308330243683251832233147205677209056513234497194677767406481 (68)

Factorization of P6516:
18523823771713243754641875078906200526178919188388955145300725413090531379832828625663 (86) = 
17 * 1567 * 11483 * 13187 * 19597961 (8) * 234315200295494668166784608425226424956839557413582956410839196857 (66)

Factorization of P6517:
18817599221571444060666686804383333898038275424228078245250451299204136455948406765044 (86) = 
2^2 * 7 * 61 * 28109 * 31859 * 175598624077 (12) [phi1] * 70061221403857497171650096789608134887897239949333878457511589 (62)

Factorization of P6518:
19116010900953563322241489459476658489075848663496939096852734189814462783478847801427 (86) = 
11 * 19 * 31 * 857 * 4297 * 17659 * 1174387 (7) * 186236779 (9) * 527152707415371289691 (21) [phi2] * 3254450379650221133 (19) * 120916682928547657 (18)

Factorization of P6519:
19419131617896566992892152620677460595890547570012572372493902140318508114366490157465 (86) = 
5 * 7^3 * 67 * 233 * 4995765254436356362433183519723417177353 (40) * 145188739238658128535233115040874071697 (39)

Factorization of P6520:
19727035318219597843262282991267137488790496213833012953016748779784401308123517511855 (86) = 
3 * 5 * 1831 * 53166803157434387 (17) [ecm] * 1101407794603489338086141513453802253 (37) * 12265733530151513520994365377 (29)

Factorization of P6521:
20039797103217112840876144198662668673501793309123147861728163254455161223325369549016 (86) = 
2^3 * 7 * 11 * 29 * 4633471 (7) * 224775209 (9) * 1077109238001757374156216534679497307518819469022782101253335914821 (67)

Factorization of P6522:
20357493247625809662358842556255078202918437030975950329112548492017100336304734237606 (86) = 
2 * 7 * 263 * 19073 * 1944353072350783 (16) [ecm] * 14794041005180988834284057423931746311 (38) * 10077656649954859806783067 (26)

Factorization of P6523:
20680201217869558795419882251921009213532134652572681529371716113740023256150013541002 (86) = 
2 * 3^2 * 7 * 473219561 (9) * 65736102067 (11) * 81131450913686546545153 (23) * 65032183448806949478223039829338425697457 (41)

Factorization of P6524:
21007999690586621789479720626238296408322241323464657382414375487883168829349562221925 (86) = 
3 * 5^2 * 251 * 8960205337 (10) * 8795982777144397 (16) [phi2] * 121012100407593009759929 (24) [ecm,sigma=1760613358] * 117008816269199422250634159803489 (33)

Factorization of P6525:
21340968571443501800442688929247522678308367595489813413986746948513397024173226836401 (86) = 
7 * 2819 * 54438689 (8) * 185881157773 (12) [phi2] * 106875456702324405410445472049472093983475096598067743550668801 (63)

Factorization of P6526:
21679189014239839161740198027140848963928961874632145794711657220834298761744906919242 (86) = 
2 * 3 * 71 * 859 * 19248641299 (11) * 3077798541338322229845681682618172183770777592744421991184060142889937 (70)

Factorization of P6527:
22022743440308832315557815869265986743290361972873115165993867350603083754787308406617 (86) = 
1489 * 138163 (6) * 977513 (6) * 5090743409 (10) * 845967249481 (12) [phi2] * 25428905464150893908004199764528508522702733399603 (50)

Factorization of P6528:
22371715558217733070519951044551323020090826990355194061876996885322204530662175342780 (86) = 
2^2 * 5 * 1993 * 254291710311307 (15) [ecm] * 3379044964529039101 (19) [ecm] * 653184425448695051951117226751390962878083845589 (48)


Factorization of P6529:
22726190383773034830670386058433281448843161821510112092882140337120356445815169067280 (86) = 
2^4 * 5 * 7 * 11^2 * 27714411463884165994537 (23) [ecm,sigma=1710370646] * 12101733443069967546047182135665193979179919994165868734619 (59)

Factorization of P6530:
23086254260335043181225664442879490056281166960147927870361953558197041384623796643428 (86) = 
2^2 * 3 * 17 * 113167913040858054809929727661173970864123367451705528776284086069593340120704885507 (84)

Factorization of P6531:
23451994879446590035400789995784638498222983996253704977765837927757906560478836609535 (86) = 
3 * 5 * 11^2 * 67 * 2245759 (7) * 3695910084268643 (16) [ecm] * 29863416733852718976229841 (26) * 778044286917048446439139190643551 (33)

Factorization of P6532:
23823501301780725459965438312537696289767975531712938132326376633906827236640671843421 (86) = 
31 * 768500041992926627740820590727022460960257275216546391365366988190542814085182962691 (84)

Factorization of P6533:
24200863978412295321683307878746744396941395910409185345808209822572183824927320519294 (86) = 
2 * 3 * 281 * 61658731 (8) * 80468074664645913178369 (23) [ecm,sigma=1569224442] * 2893044460348469501616546731242724323240308466138711 (52)

Factorization of P6534:
24584174772418388049267258176568630314658387245479807977976754652505331044446089139015 (86) = 
3 * 5 * 7 * 19 * 107 * 116141 (6) * 662743934324110709333 (21) [phi1] * 2054881338910720542841 (22) * 728133288059757970109949340499527 (33)

Factorization of P6535:
24973526980812710103052675739221988422088410205166182106524738147616989587637773150401 (86) = 
3 * 7 * 7337628839 (10) [phi1] * 162070826503805796722750077254032406549412732308842737975143088043807963579 (75)

Factorization of P6536:
25369015356819027204613346799558093933273668166456410509931723866912512944621065137865 (86) = 
5 * 7^2 * 41 * 1427 * 3881 * 300912541 (9) * 821115878359493 (15) [ecm] * 1845615870329438516921297240457185354438173112675687 (52)

Factorization of P6537:
25770736132488887018642234142326329144313135615574133823771226388032237393191536240837 (86) = 
79^2 * 6133 * 9697 * 9776891 (7) * 248321053 (9) * 6530870077 (10) * 407354025195951179 (18) * 10749912036261702581873973658273 (32)

Factorization of P6538:
26178787041668918817484092392699165934624536353879411519417621779003772517559699791758 (86) = 
2 * 29 * 3061 * 9463 * 185878521891929634136070155715190172171657700760881 (51) * 83830131358593740839823297 (26)

Factorization of P6539:
26593267343323086712897838104315127706852235895985434447619093689333818991426071339600 (86) = 
2^4 * 5^2 * 7 * 9497595479758245254606370751541117038161512819994798017006819174762078211223596907 (82)

Factorization of P6540:
27014277845215355328377989639245188209465168442062775994731466581073711461132104158706 (86) = 
2 * 11 * 23 * 53387900879872243731972311540010253378389660952693233191168906286706939646506134701 (83)

Factorization of P6541:
27441920927958310327388333321239924222256947568516452145130357364345175774643517726574 (86) = 
2 * 449 * 1788366171041 (13) [phi2] * 118935382875026323 (18) [phi2] * 6590290220989 (13) [phi2] * 21800482739646021003753757222103323331569 (41)

Factorization of P6542:
27876300569433361027151512081167804526483631387769137494323825048371318266807099793592 (86) = 
2^3 * 3^4 * 11 * 1231 * 3176942793016517853317851326830882674393044921159553096440055515937800956902619 (79)

Factorization of P6543:
28317522369588238433476191214069525092487245024717660577401063964611803850059705615363 (86) = 
7 * 71 * 56976906176233880147839418941789788918485402464220645024951838963001617404546691379 (83)

Factorization of P6544:
28765693575617589449060317636748553824391025578137324978627641711982964207731572248705 (86) = 
3 * 5 * 90523 * 5831123 (7) * 8720080297429 (13) [ecm] * 416631369210028844335137739639214756935757711596330523642867 (60)

Factorization of P6545:
29220923107532556755651366645388348705136422059881438922484375555230353344215117341890 (86) = 
2 * 3^3 * 5 * 37 * 47 * 103 * 587 * 238181 (6) * 43835647669477 (14) [phi2] * 98587242026210044282873606816646199176613044721763998209 (56)

Factorization of P6546:
29683321584125323969538532499491372033257189291189342428867535562739432754716658599602 (86) = 
2 * 3 * 227 * 6329 * 628105148099491505413114404882897613036149717823 (48) * 5482364932976984995001208022663 (31)

Factorization of P6547:
30153001349334697140567786247627839958127724679525692205147422491237204613200949347919 (86) = 
3 * 37 * 102929 (6) * 186869 (6) * 15845537 (8) * 326242876607402771 (18) [ecm] * 2732024273922701567867993673989074284300001496927 (49)

Factorization of P6548:
30630076499018886527987429160766611368038902333871323923782943787978820697670088641422 (86) = 
2 * 191 * 8329 * 9949 * 901734352748054442821 (21) [ecm,sigma=397788041] * 1073084225191280639691382090594919128274458579068010081 (55)

Factorization of P6549:
31114662908141746863041289093988163558761376108241862856191559534064321405990776004350 (86) = 
2 * 5^2 * 7 * 113 * 20753 * 44711 * 847858430827006344591731482840449232320425557446590142025688477710024679 (72)

Factorization of P6550:
31606878258378830019739058360953254848645851572032553221111446350092940959195149109719 (86) = 
7^2 * 10709 * 9514187660279 (13) [phi0] * 18989040499999260127 (20) [ecm,sigma=205411230] * 333397140778407507460676865919135430867587444723 (48)

Factorization of P6551:
32106842066149701183381185006508698000716022871421478034900934310352493452915270601229 (86) = 
11 * 6747253 (7) * 347319860507 (12) [phi1] * 147125005399 (12) [ecm] * 5853827133838279 (16) [ecm] * 1446178525712781647033330627969608166129 (40)

Factorization of P6552:
32614675711083068253259486311996435022428613268151405368113019463832203936161631821489 (86) = 
13 * 17 * 59 * 1321063 (7) * 37388971 (8) * 50640937534180183917317044641940754235425163158091096880983683610587 (68)

Factorization of P6553:
33130502464921374363887000163909190312617216396645829862322566733214682036246252807325 (86) = 
3^2 * 5^2 * 199 * 739933053376245100254316028228010950588882554922296591006645823187374249832412123 (81)

Factorization of P6554:
33654447520871605080861723374803553760869346841538791607193445364982277599695307252450 (86) = 
2 * 3^2 * 5^2 * 799264621037 (12) [phi2] * 93570588750018429692883393956196935047647082004384037666600842792668853 (71)

Factorization of P6555:
34186638023409165046111514037828989037532841915367359612506494012996384654462556392395 (86) = 
5 * 19 * 419 * 5273 * 9349 * 14437 * 11300025603727346945624296687 (29) * 106792179548249263493191763201756083175353 (42)

Factorization of P6556:
34727203098541783636221912408248535969541490821416759231109557488423832371541691022602 (86) = 
2 * 571 * 12263 * 116203521547 (12) [phi2] * 21339669318229168170239329375434098069288481875798759527798623060571 (68)

Factorization of P6557:
35276273884540515580588176130445554467319461332085392517670713268222606193469518524931 (86) = 
7^2 * 11027 * 4229809 (7) * 7711921009349147 (16) [phi2] * 110124644037994297 (18) [ecm] * 18174455316648227693103684991936712324987 (41)

Factorization of P6558:
35833983563145010487388795339586143146622711333542874458932673319164492197480205387496 (86) = 
2^3 * 3^6 * 937 * 776813 (6) * 23933907822121653659 (20) [ecm,sigma=1742030161] * 65167521411941742442281779 (26) * 5412235451150445744243113233 (28)

Factorization of P6559:
36400467391250334869345035016361000743724711705118066948362493184047061799164162133280 (86) = 
2^5 * 5 * 17 * 35747 * 374367772853525500179211203000591172024767933067172923482292355920108698952567 (78)

Factorization of P6560:
36975862733082741572773498399041976172586023930240403048189835669693124354581517528439 (86) = 
3 * 71 * 3109 * 979969 (6) * 196462723147 (12) [ecm] * 2964423172324601917 (19) [ecm] * 97832982610262943493969050407864989480522657 (44)

Factorization of P6561:
37560309092871894517794668078727801667246369744545646936224413217138060330481863103169 (86) = 
29 * 43133 * 30027660310388713112525786783563430246020424192809927062985147956271628435929817 (80)

Factorization of P6562:
38153948148027171380348325016732551682209255031697637730238236806974724744947727419906 (86) = 
2 * 7^2 * 11 * 13 * 18539 * 391393 (6) * 3138702658308108679 (19) [ecm] * 380393771896234288513925049227 (30) * 314263860007265466113969 (24)

Factorization of P6563:
38756923782825783313890944017901735396463673416597343555228886273288344808999855730964 (86) = 
2^2 * 1439 * 76049871058433631131 (20) [ecm,sigma=1808408444] * 57551755095781095185816141 (26) [ecm,sigma=1052300638] * 1538407750418517435246930313997702789 (37)

Factorization of P6564:
39369382122620569046706482439589961676996891159670027160267796282401277349838524195205 (86) = 
5 * 7^2 * 19 * 263938622664853 (15) [ecm] * 32043206421113856823974390149305276992908725582829648956544620784287 (68)

Factorization of P6565:
39991471568575440726443741872904021692167223918645329364453358197450113559206053157999 (86) = 
3 * 13 * 509 * 802545381543149 (15) [ecm] * 2510240868951025265093603865401901022854639815388652294120906132801 (67)

Factorization of P6566:
40623342832936580743997430068928819949226235321336879048214410710034909801641744156895 (86) = 
3 * 5 * 13 * 43 * 3042761 (7) * 1293626525719317622864064878379 (31) [ecm,sigma=409076591] * 1230823664740521909778442701195435887169676533 (46)

Factorization of P6567:
41265148974847612481782381898194231123530500158464288214899241592542138647537091885620 (86) = 
2^2 * 3 * 5 * 11 * 1069 * 1871869741617399575677 (22) [ecm,sigma=1292334355] * 31245404581920429534029081589147534650132905969963662519889 (59)


Factorization of P6568:
41917045436717093524832907104991671962721686031663543089698400417833853698591080006363 (86) = 
103 * 151 * 24595936750252042690479073061446699 (35) * 109575414918309851603906229985870777950232648529 (48)

Factorization of P6569:
42579190081146807375435532612426569709103743728194487565033543245146901634386307537295 (86) = 
5 * 107 * 467 * 301363 (6) * 273073223411 (12) [phi2] * 2149970163521 (13) [phi2] * 963219471596252494682698759186923344385260907465787 (51)

Factorization of P6570:
43251743228429459152045250620817014323849236979114658380933643177714007344217337776525 (86) = 
5^2 * 1730069729137178366081810024832680572953969479164586335237345727108560293768693511061 (85)

Factorization of P6571:
43934867694624512160349075118923757328271289821595825609955873292419634662027854535214 (86) = 
2 * 7 * 14972572150583461823 (20) [ecm,sigma=1548164562] * 209596908518355712370269461484685812814658315207654758170456833487 (66)

Factorization of P6572:
44628728830221035628273613627605267363180738147879101000986719527011242579426747862692 (86) = 
2^2 * 3^2 * 661 * 208933 (6) * 92535697 (8) * 17269150159442487009628831 (26) * 5617243496844950031589075124027131489439767 (43)

Factorization of P6573:
45333494559396569327680509105835083614433069564046938126515233670225590675587441079746 (86) = 
2 * 3 * 7 * 11 * 29 * 454826928341 (12) [ecm] * 7439316832932014815479237001820655886114523377034916118018743610049047 (70)

Factorization of P6574:
46049335419881148294104400277261885038473693328092253136713334408084130985237506954250 (86) = 
2 * 3 * 5^3 * 787 * 2917 * 289543673347457 (15) [phi2] * 1237107595609310787442601 (25) * 74667117999120996027502313354313952213 (38)

Factorization of P6575:
46776424603435770433273062685012041129046141609350225012371720256646174836064451797416 (86) = 
2^3 * 3 * 2437 * 55745496479 (11) [phi2] * 310200073604162777849970406162023001329097 (42) * 46249662504407793624494680189 (29)

Factorization of P6576:
47514937996954731500887282617318103575502182176360644904861964387682772746468337408249 (86) = 
17401 * 326043519689 (12) [ecm] * 689277257465529851925061 (24) [ecm,sigma=755045543] * 12150284240126932164680373705595137560208303781 (47)

Factorization of P6577:
48265054224201395792282524550069323292260119283973011740023337939442364581093309826419 (86) = 
30466715853026621771 (20) [ecm,sigma=209701703] * 1584189594212749815535059068488167210900837949935197464960978432889 (67)

Factorization of P6578:
49026954688187116913681523304593398888665246591741803445220236527239588378726139331035 (86) = 
3^3 * 5 * 7 * 67 * 613 * 1433 * 24221809 (8) * 1043085331 (10) * 13295699499226722317940139 (26) * 2624122093192094118659753990098061 (34)

Factorization of P6579:
49800823614203171259801927241780980311281885273117067203193932457401876787189613352175 (86) = 
5^2 * 13^2 * 39749057 (8) * 641742229 (9) * 148896958843 (12) [phi1] * 3103391283634263949336966394957590477548012097880247337 (55)

Factorization of P6580:
50586848093515717327128146354208852004131973492308377901685323520980527117429472752210 (86) = 
2 * 5 * 8017 * 654204263 (9) * 3229936327 (10) * 156124235089 (12) [phi0] * 1912705394478135112032761531687672383206464995644517 (52)

Factorization of P6581:
51385218127733946782217907564741478622672942036401065158776223255753524569072287195057 (86) = 
3 * 13 * 59 * 227 * 27150239 (8) * 482201413148618497 (18) [ecm] * 7514387602079744231986987298750689569594073174438671977 (55)

Factorization of P6582:
52196126673861748314529704089664230872002296520433285042373974991548814265921908530113 (86) = 
3 * 19 * 1341454463 (10) * 112471527471318462569 (21) [ecm,sigma=1937483403] * 6069387875153340501395214144188044052606944214208284447 (55)

Factorization of P6583:
53019769690043362768484746739726431107606872612758722708677709346516079493617202313840 (86) = 
2^4 * 5 * 283 * 220592947 (9) * 10616217112409172962317402055088514514942691130774700047557281796807936923 (74)

Factorization of P6584:
53856346182013667905400740559561632793063526809337532042346109277433396904609439110545 (86) = 
5 * 7 * 11 * 10513 * 228256357337509488954013 (24) [ecm,sigma=714573484] * 58294369542868410806808800925661365158520087319572531893 (56)

Factorization of P6585:
54706058250263893428674424238601485618118638973294974708539517441499715210561850719353 (86) = 
7^3 * 11 * 53 * 89 * 63997 * 153915959 (9) * 326295820518359 (15) [ecm] * 956374444135136978648572629198579427343341099904869 (51)

Factorization of P6586:
55569111137933731651807977934780301697188380382294252373304623066054564344534183946832 (86) = 
2^4 * 11 * 13 * 397 * 234643687 (9) * 4831462914070665381218864129905979239 (37) * 53963411657677580137134560737373159 (35)

Factorization of P6587:
56445713279440976435784959814842200837767930029455714922994648992207654005175591939329 (86) = 
37 * 41 * 1523 * 2213 * 79423 * 138767641211 (12) [phi1] * 31784773936967 (14) [ecm] * 31514501866347783870713372732510329661440695113 (47)

Factorization of P6588:
57336076349859992807677627522755920759597552303508444814953604334726402535261089911902 (86) = 
2 * 3 * 543281 (6) * 1585638185505499 (16) [phi1] * 1673555823050736976069 (22) [phi2] * 1063358349106520419 (19) * 6233446809539328377301313 (25)

Factorization of P6589:
58240415315060492034550383909618154472614900266969461102175464815808323144149273730860 (86) = 
2^2 * 3^2 * 5 * 463 * 805097 (6) * 7175153 (7) * 1359132293 (10) * 26494645737923298053 (20) [ecm,sigma=397656504] * 3359477557981534450409117080608359721161 (40)

Factorization of P6590:
59158948482618261904630987089443860088943811679334603792288865159754059021986808098716 (86) = 
2^2 * 839 * 6421 * 8233654812392149332806181584067685145568157921502609 (52) * 333428845202935245589625549 (27)

Factorization of P6591:
60091897553509679600854317721376812439702805234900080246512217996214873501629878714513 (86) = 
1061 * 14983561 (8) * 118790331211 (12) [ecm] * 5903803000307611343566703 (25) [ecm,sigma=561718055] * 5389798676034269015823924587391027943441 (40)

Factorization of P6592:
61039487674602014880338787932219820683147374426232757859774571533231370161607342412095 (86) = 
5 * 7 * 19 * 2374685288483245403983 (22) [ecm,sigma=1436296742] * 1442818945982291868170846861543 (31) * 26789915035209423703458677185247 (32)

Factorization of P6593:
62001947491951714337831323307621130195560345590211237295138428168921913310231435719951 (86) = 
3 * 7^2 * 313 * 1721 * 138496593331878124032484702447 (30) [ecm,sigma=1364214470] * 5653582023223624495620452427451063460967527193643 (49)

Factorization of P6594:
62979509204923043372963209275793257667131853243777933947124881723100101681436940797785 (86) = 
3 * 5 * 7 * 342653 (6) * 1750473072089535626920173422030402203843645605203485295956769863475658400534789 (79)

Factorization of P6595:
63972408621139651142226608310691416430068806626479813734111042155998202688913010536932 (86) = 
2^2 * 11 * 23 * 41 * 10991038139 (11) * 19796873828189575763 (20) [ecm,sigma=989875755] * 7085867111861019004462715971918634826424401216688453 (52)

Factorization of P6596:
64980885212281815299470832426507653068572406765247818357809439971978215648836269939451 (86) = 
3 * 11 * 43 * 211 * 88703033 (8) * 2446708905592558114842095227216580578557733703069783705215040851649627683 (73)

Factorization of P6597:
66005182170742317756628488112388895849831440273081035361295504114783300646290517748745 (86) = 
3 * 5 * 13 * 19 * 607 * 2803 * 241963 (6) * 190433892703941007519 (21) [ecm,sigma=1411073355] * 227240024457806656995006327656137908408857127794497 (51)

Factorization of P6598:
67045546467154100073163332490477569869240497750714702579080255145886442311592528591848 (86) = 
2^3 * 11 * 1031 * 2131 * 15137 * 938129 (6) * 24419837830229525003916415043393090977273796735981424796155061425307 (68)

Factorization of P6599:
68102228908803047452891667916113375494827379579344169957317842030020470509749290253250 (86) = 
2 * 5^3 * 7^2 * 53 * 59 * 168887 (6) * 7186331 (7) * 1932807791 (10) * 1120750870969 (13) [phi1] * 676232696589027663114074468879231807911337737 (45)

Factorization of P6600:
69175484198939453735543424035821376436080510297190116417316287045785335347598133467370 (86) = 
2 * 5 * 29 * 73 * 1493 * 297051669182461 (15) [ecm] * 7367829120482444185228251559274149808194155499356677060929884157 (64)

Factorization of P6601:
70265570997001926263552278394230983638807936183440649898594138219134986946806286141590 (86) = 
2 * 5 * 29 * 73163977 (8) * 16309931051750870771026146823 (29) * 203046333781035537530344528571684969153777356901 (48)

Factorization of P6602:
71372751979767699128639416569535231033384422512271554384731189177676479851417619457780 (86) = 
2^2 * 5 * 149419 (6) * 710450912543 (12) [ecm] * 9510967238090767442145505818986527 (34) * 3534580354143890040878797288589771 (34)

Factorization of P6603:
72497293903443536105024909742574186090861937741254129141416823744969981502749288960363 (86) = 
761 * 1399 * 28751 * 76992842512507825356380141805637 (32) * 30762109687846785801674586870126748577568991 (44)

Factorization of P6604:
73639467666711620604515626601497201448348172749174256752154640248978428401969493662330 (86) = 
2 * 5 * 3967 * 9749 * 1164899665891806460047269761215241440658357 (43) * 163455616811560534134915226878178943 (36)

Factorization of P6605:
74799548374745049291950487829584594815236096400333947600299942206722476724934154329582 (86) = 
2 * 11 * 43 * 79069290036728381915381065358968916295175577590205018604968226434167522965046674767 (83)

Factorization of P6606:
75977815404207768626934817681740763427556466934257132588753817148395488144662328698271 (86) = 
7^2 * 11 * 1039187 (7) * 21202547 (8) * 141863297 (9) * 28564037134393 (14) [phi1] * 1578798333178657056678175221438231025510290183181 (49)

Factorization of P6607:
77174552469254019599609280161180888602666267332680245022433782003843241845441841548057 (86) = 
7 * 19 * 43 * 79 * 18127 * 131783 (6) * 106700730568259948979635047 (27) [ecm,sigma=418115174] * 582328075458415070758260799 (27) * 1150817573682086209 (19)

Factorization of P6608:
78390047688542585355271847465343114541367745368221691936450055432691549400378002994423 (86) = 
89 * 16333 * 166259 (6) * 324354401668018122589322532472231873101362882704527921561127874856454844681 (75)

Factorization of P6609:
79624593653281369306663828656385683304963366918057831804558402002372000775547797954375 (86) = 
5^4 * 157327 (6) * 30311933189 (11) * 255409189361114144437 (21) [ecm,sigma=1196304346] * 104595691772462384950563505760893182545277627857 (48)

Factorization of P6610:
80878487496318067766078943631852459533036322729494575429255942903465309138913476683594 (86) = 
2 * 906931 (6) * 2608554337 (10) * 31818058588399751 (17) [phi2] * 537223761796703110146243274445769185227993034492210401 (54)

Factorization of P6611:
82152030962292941145380462632188828779862486196557744184743599290509745564671759117120 (86) = 
2^6 * 3 * 5 * 265483 (6) * 322337144948597388005150293020130717644281390728399370929367414338950711080809 (78)

Factorization of P6612:
83445530478869931424536943336122612285042562854615037493638782297825380847795465167288 (86) = 
2^3 * 439 * 205033 (6) * 248371 (6) * 3987791 (7) * 214679444851 (12) [phi0] * 3319744402536325253443 (22) [ecm,sigma=94995060] * 164170991387141245613785054821461 (33)

Factorization of P6613:
84759297229062620933244109659055324782839835784233494454229931234906240421341407625280 (86) = 
2^6 * 3^2 * 5 * 7^3 * 907 * 1987 * 5501 * 467213 (6) * 8967504557374423 (16) [phi1] * 2065700791143289700013421007816164829364861207037 (49)

Factorization of P6614:
86093647224671778581243682101946230875098341677159235218527231156622045191312722127700 (86) = 
2^2 * 5^2 * 379 * 3391 * 34494907 (8) * 46185467783889793 (17) [phi2] * 10477059542812180397 (20) * 40133253611694018206549201788897319 (35)

Factorization of P6615:
87448901380851494567569256856925096103594724018967917274419358529601018298139504866569 (86) = 
3^2 * 821 * 397093740557982026643433 (24) [phi2] * 2967776308042443101 (19) [phi2] * 16309267713691772553841 (23) * 615757945939055657 (18)

Factorization of P6616:
88825385591821163354481889617405781017970102358022132694891582389342542336096398447097 (86) = 
1006897 (7) * 88216953265151414051766853627933920766443938514090450855342286638397514677366601 (80)

Factorization of P6617:
90223430807740837366501254217296431392802185375193342182612287523044809966761649533532 (86) = 
2^2 * 11 * 787 * 591721983317 (12) [phi1] * 2704681066690131291109 (22) [ecm,sigma=369187720] * 6271391965147517822883917 (25) * 259593741667027796347819 (24)

Factorization of P6618:
91643373112767740527762474661211037727538662849803936373338972495418056577643599821303 (86) = 
192239 (6) * 476715823078395853743321982850571620365995780511779276698999539611723201731405177 (81)

Factorization of P6619:
93085553804312001441890336637652088114102945867955132063537002477341438820924329272780 (86) = 
2^2 * 3 * 5 * 1327387409 (10) * 236151528250657 (15) [phi2] * 997281231035881708550380733617 (30) * 4962779008816016263826521363453 (31)

Factorization of P6620:
94550319473509940808537166881641314006949010029316245157875721586395969605455437370679 (86) = 
7^3 * 11 * 97 * 4567 * 90289 * 626525290491308705893661951050936639752909337971311864007188080109288293 (72)

Factorization of P6621:
96038022086933526621446473495266745720437931025499041916467541177281814994717007315442 (86) = 
2 * 3 * 10153677203 (11) * 110802359231 (12) * 196445770220256079 (18) [phi1] * 1229717432791 (13) [phi1] * 2593938583740671701 (19) * 22704497552639291 (17)

Factorization of P6622:
97549019069554893867075987933750836387609298114371347318261908565322011273426531970116 (86) = 
2^2 * 7^2 * 2646079 (7) * 246225373237099 (15) [ecm] * 1032637344712914469 (19) [ecm] * 739747315272548869538412159339604905422387929 (45)

Factorization of P6623:
99083673388985112904075655762240587020149621667938769655841082135337614436564396373815 (86) = 
5 * 1427 * 2165461 (7) * 6412948542327788516784588207774315435552093393690794856323969202626185802629 (76)

Factorization of P6624:
100642353641006682516857128142128273804878751603520963358301438882629057440510603834250 (87) = 
2 * 3 * 5^3 * 631 * 212662131306934352914647920004497144859754361549965057281144086386960501723213109 (81)

Factorization of P6625:
102225434136419519866668509167012740021864683199298949491249664967874260694737951812230 (87) = 
2 * 5 * 71 * 263 * 3262891 (7) * 14741518905643512423614167092137076067678697737 (47) * 11381514778656005913916649053 (29)

Factorization of P6626:
103833294989220520277541423552793869029570493688060289762598774091961018445480557703666 (87) = 
2 * 3^2 * 13 * 293339 (6) * 64090207153099659079 (20) [phi2] * 301303533908170750540384595402625749 (36) * 78334859823478780612021 (23)

Factorization of P6627:
105466322206137065059744263157851758685309421808577021161419558738438357111845064841043 (87) = 
3^3 * 7^2 * 109 * 139 * 9022038193297 (13) [ecm] * 265945668289287985731846089 (27) [ecm,sigma=1109197358] * 2192881062579173738217809185481554446127 (40)

Factorization of P6628:
107124907777535165458505478250206018300295766818322141226839753709072163715618410382693 (87) = 
11 * 13 * 83 * 163 * 9358203527 (10) * 619144014272737 (15) [phi1] * 41442178007 (11) [ecm] * 230601426831182950985018325191939329776970883 (45)

Factorization of P6629:
108809449769723245390341180720695697909564191649524658088901840095132779259139546412005 (87) = 
5 * 563 * 349098444341315943083675727331932041 (36) * 110723626446004154154805529816378587191284988547 (48)

Factorization of P6630:
110520352418672884963952078561041002589930510767583201417729522871071582865036151624708 (87) = 
2^2 * 3 * 191 * 37500775008920824597 (20) [ecm,sigma=469814323] * 21742966213993177556939063649271 (32) * 59138269710043113640489240227527 (32)

Factorization of P6631:
112258026225178170949024150115833345466702438613342237204789899783465435168023406658255 (87) = 
3^2 * 5 * 19^2 * 54926227498333 (14) [ecm] * 125810797390828836211911993327017229361840394454665263275260739514703 (69)

Factorization of P6632:
114022888051475629427127891794546902083123951011999181483187540120925410187369634476762 (87) = 
2 * 19 * 3000602317144095511240207678803865844292735552947346881136514213708563425983411433599 (85)

Factorization of P6633:
115815361219347049908104963387127458078647751060720296753165462728145344376794551343632 (87) = 
2^4 * 199 * 1644947 (7) * 22112670643632964262438747394004156624323444519449420904263318677677681691309 (77)

Factorization of P6634:
117635875609727849297807525933754641357006246265577256100849619826860836805121961973415 (87) = 
5 * 7^2 * 41 * 449 * 1399513 (7) * 732044164451 (12) [phi1] * 25458293407799305819576297862956679357247739276217036403304601 (62)

Factorization of P6635:
119484867763843968334886315715093340330482880223602496284686894537027892541570422020236 (87) = 
2^2 * 67 * 50730263 (8) * 482732048081208316507299743375502269052004490684551 (51) * 18205594582792798145056129 (26)

Factorization of P6636:
121362780985900642552719945594989018945738748449021844514214527190733654273278709273016 (87) = 
2^3 * 7 * 212207 (6) * 1496594431964761567 (19) [ecm] * 1474023576960960907423 (22) [ecm,sigma=807437567] * 4629448227888600833809119002251210992703 (40)

Factorization of P6637:
123270065447346744545908106470987230662015380892255738295027309432630887398882103831656 (87) = 
2^3 * 19 * 41 * 145861 (6) * 138241 (6) * 4671761 (7) * 17406479 (8) * 3753093167 (10) * 3214202508223300887176465641382489072748506230571 (49)

Factorization of P6638:
125207178292738754408557147188086045682010448379177057304176238412456604103022757484036 (87) = 
2^2 * 7817 * 4004323215195687425116961340286748294806525789279041106056551055790476017110872377 (82)

Factorization of P6639:
127174583747228780744601184203107323339336027284887087379872261290559109720976671588620 (87) = 
2^2 * 5 * 11 * 877 * 252683810303676782257057 (24) [ecm,sigma=782256412] * 2608558816895575392292687796197150846173731924325932614889 (58)

Factorization of P6640:
129172753225701425710567786025822269121697806086710007343526593693109287655021590579354 (87) = 
2 * 19 * 73 * 54779 * 677119 (6) * 23650873 (8) * 14158975510411 (14) [ecm] * 154411345296100763803 (21) [ecm,sigma=340290690] * 24278796003979612247611014675419 (32)

Factorization of P6641:
131202165443584664221683876274686604081209484315033221488410762275699481125517254956091 (87) = 
3^3 * 7 * 19 * 419 * 10859 * 2067365408053009320337591 (25) [ecm,sigma=1055480410] * 3884226049632490669998912973300469469585400323587291 (52)

Factorization of P6642:
133263306529360289817439705976021048603391772031784274877139630238693498585597886629882 (87) = 
2 * 109 * 2776336513 (10) * 31231217451874380842007741043483643305057 (41) * 7050064206814327261758947803599089 (34)

Factorization of P6643:
135356670138799867828365441122615111155358869721874141133786743276000922585457685549429 (87) = 
3^2 * 7^2 * 579823961301057175666991 (24) [ecm,sigma=439589915] * 529352433307200802588862410926952942175803848627566614332659 (60)

Factorization of P6644:
137482757570952530498787788113797551207141430590432209627153343376662680481419241632860 (87) = 
2^2 * 3^6 * 5 * 99289 * 145510275445986221 (18) [ecm] * 652673396669750410393593071341216695620870925369508708679143 (60)

Factorization of P6645:
139642077885911348688986755734323657198193433282684642686849040897855160347252289000070 (87) = 
2 * 3^2 * 5 * 127 * 283 * 315047 (6) * 5352757389272637803 (19) [ecm] * 14693018195212671010531356812711 (32) * 1742287063825138636971353 (25)

Factorization of P6646:
141835148024385420794050068581371214832942633542412579593265573365550061677136599112051 (87) = 
7 * 101 * 683 * 5897 * 1922077785152421262453 (22) [phi2] * 25914430056627779561701464648711437987326863995743702031 (56)

Factorization of P6647:
144062492929105231666750851261217063481329825283358789896745497858077681129263659485315 (87) = 
5 * 631 * 391291 (6) * 4726051348768890529 (19) [ecm] * 24691829378853346732654198861338738261725435680296702389507 (59)

Factorization of P6648:
146324645668089252710239926762052265734467213144389413747502036150260251208143940951892 (87) = 
2^2 * 7^2 * 13 * 61 * 89 * 383 * 986641 (6) * 388875006521 (12) [phi1] * 71983051248694320936625453540153088094627178388020098597427 (59)

Factorization of P6649:
148622147559800179006915603798603012861823856878393705248214124424659024694000054084650 (87) = 
2 * 3 * 5^2 * 7 * 11370130007491134052931634416793067 (35) * 12448837642546656969097120144409231866603789802299 (50)

Factorization of P6650:
150955548300219630467581183427262432868087164911405952433795197912801776883078040924478 (87) = 
2 * 11^2 * 9649 * 8121977453277441595727 (22) [ecm,sigma=1060139959] * 7959570394753109854345526032020253126564517397747715673033 (58)

Factorization of P6651:
153325406091870581616416318833361562379006249706590487765829801299000984476219960510508 (87) = 
2^2 * 9750593687 (10) * 284078795276646548649881179624704074708368019633 (48) * 13838348236215669422423925437 (29)

Factorization of P6652:
155732287774817228870309432494846417990753573980281908909006559543293342291146473822404 (87) = 
2^2 * 11^2 * 991 * 4931 * 126435320966408081 (18) [ecm] * 42797201930027943757502516957 (29) * 12168606675863722181456571776033 (32)

Factorization of P6653:
158176768959672455125126646582344795948942521970803496657652325318825464588696761001195 (87) = 
5 * 11 * 103 * 4229 * 6602449691593703340137525875003982961714673510408357902727805981304870922923727 (79)

Factorization of P6654:
160659434162643509227417346244648204730837574113595096031671063448883454207922787461410 (87) = 
2 * 5 * 124292027 (9) * 1372885865508014327 (19) [phi2] * 1356777141009274775383273 (25) [ecm,sigma=892359844] * 69393694623094687126821061051552073 (35)

Factorization of P6655:
163180876942646982590276161664113566642721138890606393214188878686943993314966477691767 (87) = 
7^3 * 59 * 2671566363936761 (16) [phi2] * 3018263585746393500761749935099003139525117955245842718092083729131 (67)

Factorization of P6656:
165741700040524636910526244800988577361762355092424207133791745113283816846448298823642 (87) = 
2 * 41 * 1321 * 2087 * 1762361 (7) * 416004277798756416198407779095454646589218002193633795955549251729771123 (72)

Factorization of P6657:
168342515520392115766544287416432660032406998531426810161407153474589074109614270956259 (87) = 
3 * 73 * 119906471 (9) * 4436396333 (10) * 17072713812495661 (17) [ecm] * 84639712267157388117950803946613671964009922223207 (50)

Factorization of P6658:
170983944913153058928976612885703930219174989691178231904524551869457824211582281772368 (87) = 
2^4 * 15733 * 7041334822603 (13) [phi1] * 14653829820412564079 (20) [ecm,sigma=1757713111] * 6582906216147955107790796745528512014280251136813 (49)

Factorization of P6659:
173666619362211631608961972998972082247794773722830010463774715051918120135918425002835 (87) = 
3 * 5 * 17 * 439 * 21671401496360878912073288638353406185604439 (44) * 71585432207385097551258586713974089277 (38)

Factorization of P6660:
176391179771416981710569585813452498508987474057399720269827317078498698483361307187738 (87) = 
2 * 179 * 136919292299 (12) [phi1] * 87252071784459988727 (20) [ecm,sigma=1915877613] * 41243303552425799347786073941419360219244763953162507 (53)

Factorization of P6661:
179158276955273646557918937000309947241401535857920259533420491322362901552425384331936 (87) = 
2^5 * 11 * 23 * 38765053 (8) * 1854422293 (10) * 4753581854446303 (16) [ecm] * 43174573228127359 (17) * 1499920793687759621189216553007577 (34)

Factorization of P6662:
181968571791452446646483236502638129733049736113545454807504884312640605492797419750470 (87) = 
2 * 5 * 7^2 * 13 * 139 * 205514350983649127143289968154047332632788290563393441387241096769525095708071129 (81)

Factorization of P6663:
184822735375636927837702210035738627802985596341710095583761400909786620798929341645259 (87) = 
3^4 * 22109 * 40637043855228392579311536467902460706129048052393 (50) * 2539680984755680940555269184447 (31)

Factorization of P6664:
187721449178740945193277156810547884470471890491985412682607600052703789759132980065780 (87) = 
2^2 * 5 * 12659 * 10062518835296585927196226979 (29) [ecm,sigma=894361513] * 73684780885177386572061453799154550961394079512628449 (53)

Factorization of P6665:
190665405206533521449176627943131346656689354710161988378090397495716755843325094208487 (87) = 
100674846778549 (15) [phi1] * 221327284752531288289939 (24) [ecm,sigma=1448824693] * 13124434141448467773577 (23) * 651981660056985244949029121 (27)

Factorization of P6666:
193655306161707661080005073394486091998480950338405932486880600467114423441282418165863 (87) = 
467 * 2027 * 33409 * 656594565343 (12) * 403149352318861 (15) [ecm] * 23133004655542229240327255717616867762177827193901 (50)

Factorization of P6667:
196691865608430357124341876064304728822510684534818283709474664510977854708034112597632 (87) = 
2^7 * 773 * 3541 * 368369 (6) * 2879024251 (10) * 84321898872023 (14) [ecm] * 6277724217136655873997208852660496203583827142009 (49)

Factorization of P6668:
199775808139411592555135762111132416658593552102620800889261913329610143997350093618361 (87) = 
4978447 (7) * 57095698206150392187431 (23) [ecm,sigma=297731051] * 702822440923122476605357464685554451881920665928347916273 (57)

Factorization of P6669:
202907869545530711112287188112796491150652633733972189893333246455284165168493128237440 (87) = 
2^7 * 3 * 5 * 7 * 107 * 3049 * 721299269 (9) * 64156834564947781814681551546075889004242918987016691793502285265253 (68)

Factorization of P6670:
206088796988059114295100225555385113775759777673241803227570074318952693518242520204982 (87) = 
2 * 7 * 4253 * 2861146239958541 (16) [ecm] * 402788262400091869339 (21) [ecm,sigma=1088737426] * 3003406409088546399901999159999504271116631279 (46)

Factorization of P6671:
209319349173518831770178699685902515629887317416341321343874835531283193922164546259644 (87) = 
2^2 * 19 * 223 * 1117 * 1943429 (7) * 862789 (6) * 7209218598163030304341 (22) [ecm,sigma=469461641] * 914694935260654248353640440056788900372728579 (45)

Factorization of P6672:
212600296531217111917362072340167052543825772398575823562511742470491004702595007206059 (87) = 
3 * 11^2 * 147522354065027437704482591144719 (33) * 3970081359749164744952486174287639379903343801881647 (52)

Factorization of P6673:
215932421393497787746196987999971092063979403146422616998619960362397221808439751837790 (87) = 
2 * 5 * 17 * 160888397 (9) * 7894855923509504240061622196847533937525920827715954191328991288378000961471 (76)

Factorization of P6674:
219316518178750791103971029359251435093492117794958253744352344097892873537780264392550 (87) = 
2 * 3 * 5^2 * 7 * 520199197528771 (15) [phi2] * 401524791749416077485032767106788317353119039296962384565804523634261 (69)

Factorization of P6675:
222753393577221815101274563514983191796975560243893352509255892381184193757362541864934 (87) = 
2 * 4157 * 14831 * 110222293061256101026471300437086842640781919318129 (51) * 16389829366962929204324237969 (29)

Factorization of P6676:
226243866739664761142241273517121142175104872728142217815871435570921030596834379990283 (87) = 
7 * 11^2 * 383 * 743 * 1637 * 17291 * 33161718352507952399029560170346702515994184694531333125284960628750843 (71)

Factorization of P6677:
229788769468880253005973490446773321639396261258438058183148630662544822658675702501830 (87) = 
2 * 5 * 37 * 59 * 367 * 5023 * 5710127707049681602440611020820570321902169589324913138162527682431133182161 (76)

Factorization of P6678:
233388946414184156227230002701335071724969177116135552924567692751005471493807042250543 (87) = 
3^2 * 11 * 17299 * 136277478767199222835459048956140438855850940829846270628457937809802441720988743 (81)

Factorization of P6679:
237045255268850706714438170708511930245526344543009753331563901805565023726242425050170 (87) = 
2 * 3 * 5 * 7^2 * 233 * 414477819687785009162671417 (27) [ecm,sigma=1586391832] * 1669770239618311661763006219075020595566364422151854051 (55)

Factorization of P6680:
240758566970575528269868755077116938669775470054066715964421333923345961915593402684930 (87) = 
2 * 5 * 11 * 958063 (6) * 56509151 (8) * 1968398753 (10) * 386655781 (9) * 53117622090641621155537879416903054618667300840700107 (53)

Factorization of P6681:
244529765905004504590976449164800572522704852736866803380206492483787022296710373842502 (87) = 
2 * 13^2 * 5659 * 4209629 (7) * 33410369 (8) * 68154164164856617 (17) [phi1] * 13336990660356502772213144497323295445256845494493 (50)

Factorization of P6682:
248359750112375167586305932259930391113253371606331957044765076857203083979892252434308 (87) = 
2^2 * 101 * 12721 * 61874053 (8) * 2012831369 (10) * 388027619470868016826452262747905515289179128368670615230352241 (63)

Factorization of P6683:
252249431497317970589118644549995113925699649002894750062175507296470311527204055404484 (87) = 
2^2 * 7^2 * 11 * 257126679079 (12) [phi1] * 2395533551197099 (16) [phi1] * 1163303502823853449 (19) [phi1] * 163282260899214273726915800902598230391 (39)

Factorization of P6684:
256199736041865532454451734216533345646268860452182997019371215148217998997729927272175 (87) = 
5^2 * 1627 * 233113 (6) * 186163023399446195904267289445980639 (36) * 145141363730248504862109298727811735945683 (42)

Factorization of P6685:
260211604021718666740470441576387125458979742839026294830940453758117408138275782248836 (87) = 
2^2 * 29 * 293 * 7243 * 95093 * 1677590211874417970821 (22) [ecm,sigma=339705786] * 139966253056563206442363179 (27) * 47339623132438487933913617 (26)

Factorization of P6686:
264285990225818749364896581826722614798962618845601352608385555030551285101527793650295 (87) = 
3^2 * 5 * 101 * 24105247 (8) * 8452891057214305042809504643 (28) [ecm,sigma=1184114564] * 285379909968504673035104910562000697726925744931 (48)

Factorization of P6687:
268423864179276728456587533621668651008795464611431744371177926716051661909799837631985 (87) = 
5 * 19^2 * 67927 * 2017289 (7) * 43038043 (8) * 25216270114941197894523365954338818518071477060805867496358398113 (65)

Factorization of P6688:
272626210369709841758057711477698503470357460496981728456318815806713529768376441456556 (87) = 
2^2 * 3^4 * 7^4 * 11 * 271 * 40933 * 101723 (6) * 26046103 (8) * 1084009208408196131860697440769336730316618388473896764631487 (61)

Factorization of P6689:
276894028477037880046426571358016215390985391893238866175322593784566212236133656981925 (87) = 
5^2 * 79 * 67213 * 849096478056603908738831446327187908413134817173 (48) * 2456609744068951925127870223187 (31)

Factorization of P6690:
281228333606791619800022675340635372333655604789428482999635638189299598633913164582719 (87) = 
7 * 569 * 1063 * 131327688860796539 (18) [ecm] * 505777145530854858998582439091598822652702088833377007812710949 (63)

Factorization of P6691:
285630156526986844920318933814281448960225070884197056982903015006155891669562570914257 (87) = 
13^2 * 2618581127 (10) * 656297456413 (12) [phi1] * 983446182247044297602994849934930960329619253917214186351941403 (63)

Factorization of P6692:
290100543908618185901272501525583943816291574297106870683528692458277898522836781661932 (87) = 
2^2 * 14502473 (8) * 76728503316201937 (17) [ecm] * 888066817828864233355386750317 (30) * 73391221519977890935948874837599 (32)

Factorization of P6693:
294640558569827825600391210890622597508763012868678363760055903716271749993264041044972 (87) = 
2^2 * 95587967 (8) * 174177599131 (12) [phi1] * 4424223038406840617054114005038312357499822387702802712757535204959 (67)

Factorization of P6694:
299251279723804953890528068441539857939814328681944508034553438950210438991198606434850 (87) = 
2 * 3 * 5^2 * 11 * 258521 (6) * 2632867 (7) * 266457116473016810914520169487713678959083592970831735632623087328902987 (72)

Factorization of P6695:
303933803230472699143821154558702305134996105495013347956232206106021860933503283344106 (87) = 
2 * 283 * 110768077802399551 (18) [ecm] * 4847836386878309391809392138053649524149152382806051496614891434641 (67)

Factorization of P6696:
308689241852020122907417376269421759517156882924194783391946418298470901142921331904772 (87) = 
2^2 * 403327 (6) * 58842197 (8) * 3251736359107305854421966424452677002567745460873669201089315431574356547 (73)

Factorization of P6697:
313518725512337735465519272683728870291892473629183700621259822189046681530883222564653 (87) = 
3 * 7^2 * 2213 * 4957913 (7) * 16666424611514096181839 (23) [phi1] [composite] * 12917221217390143 (17) [ecm] * 902930441803862734011575920273206523 (36)

Factorization of P6698:
318423401560415874437595669089613880981947325617870116725742596864281658207681342701910 (87) = 
2 * 5 * 263 * 2347 * 51586509039193448871319534052793531582579707063603583690811925079388080278469131 (80)

Factorization of P6699:
323404435037766186334909742582272888736989940101338130313061035758290778627694489355875 (87) = 
5^3 * 2207 * 15677113304860737354952225730058815954395028138635099 (53) * 74776912260771284300619007379 (29)

Factorization of P6700:
328463008949927362286384320031440588164857794923744709520914182709890483574859608793442 (87) = 
2 * 3 * 129753167 (9) * 421907503999404451641611080459460112400516326669884814861480006251524331547221 (78)

Factorization of P6701:
333600324542117204152761808861128699146912205166074176662766693768475080739935709896352 (87) = 
2^5 * 3^4 * 59 * 33766742641937956543968727453005589369 (38) * 64602643262430605427782066965114407918060311 (44)

Factorization of P6702:
338817601579094036180562558873844254560135349345795876879362105147333020182855725963803 (87) = 
53 * 231503 (6) * 321011040542151269437139190898651389209443 (42) * 86022785548292856200864116607775915019 (38)

Factorization of P6703:
344116078629291430413102639021004332274956326316226949897783806664147684627188946408166 (87) = 
2 * 3^2 * 19117559923849523911839035501166907348608684795345941660987989259119315812621608133787 (86)

Factorization of P6704:
349497013353291181486511899379036750228182786290878023397602312500882073018515414128570 (87) = 
2 * 5 * 7^2 * 383 * 7318994103230886929063646785087 (31) [ecm,sigma=180003948] * 254446931315416239852899985038189964681313742388233 (51)

Factorization of P6705:
354961682796700448409163772243289057250343376967978520536381164673330820653718806215006 (87) = 
2 * 3 * 7 * 11 * 13 * 17 * 2153 * 32653 * 735822399217834697187791773 (27) [ecm,sigma=320807730] * 67205853844451087915347023707137669611134272429 (47)

Factorization of P6706:
360511383687499977671260449785667195028880664409003085542592448258293813209829638668936 (87) = 
2^3 * 3 * 71 * 26539 * 4208979787 (10) * 23130763715570911 (17) [ecm] * 81883806914042838525672115932718033987929162079414283 (53)

Factorization of P6707:
366147432737931333778832181132810968158429435615045804291851080561619966463735877049979 (87) = 
7 * 3779 * 4993 * 456626167 (9) * 6070978575792749885044616449828741151163584167927556696906159760400553 (70)

Factorization of P6708:
371871166950992090277727415282956892599210360682014763838833464775560251742120745548320 (87) = 
2^5 * 3^2 * 5 * 7 * 17 * 103 * 80621 * 638168199992747 (15) [ecm] * 1028269070189 (13) [ecm] * 398249936864804835018260424406483124501252968103 (48)

Factorization of P6709:
377683943931608976756258895153263304848000618205639663294628835065710189986321721807765 (87) = 
5 * 17 * 191 * 1277 * 35582459921 (11) * 511975717669693508228414610135524836851322488303737477130967708394747 (69)

Factorization of P6710:
383587142202560035421394309095761444884695986949503625414136638399119125233873058963151 (87) = 
28097 * 375914967704907817 (18) [ecm] * 7377088041135984256357267 (25) * 4922996250385958900873135011977202413197 (40)

Factorization of P6711:
389582161525217914867551047616716167261075809618549502286674753925746467720476086294814 (87) = 
2 * 7^2 * 54323 * 140624089277310500651431778357850303223 (39) * 520390690151286308924147668405849455599267 (42)

Factorization of P6712:
395670423225187518837484029465916517356979878989934144091461899206029000847185630378927 (87) = 
1049693991499 (13) [phi1] * 7730360964199 (13) [ecm] * 48760831485344602712721125962352316246636250405932790262042827 (62)

Factorization of P6713:
401853370522912334353305083605470224811166466440913881220492572122440322275440927189053 (87) = 
3 * 1787 * 74958658929847478894479590301337478979885556135219899500185146823809050974713845773 (83)

Factorization of P6714:
408132468869324886817806874147902340834790637537359945419847624728678652418586623465305 (87) = 
5 * 83 * 5857 * 597659023936009286536414141 (27) [ecm,sigma=670369818] * 280946964670597597935692193420566733694866735066098291 (54)

Factorization of P6715:
414509206286617909801105370021991216436830312626576176607034952156577671877119549595537 (87) = 
2607301 (7) * 158980189202020752418345779801408129110076018314178599481622931973169830363705437 (81)

Factorization of P6716:
420985093714213974487994799558795035863671209776589575433937325203069632069249925814804 (87) = 
2^2 * 11 * 181236766542363033779 (21) [ecm,sigma=1464491888] * 42151648834256271133060507 (26) [ecm,sigma=955201992] * 1252429156176681499008339094552181132047 (40)

Factorization of P6717:
427561665360012498423926185991424310097049259611640481131022853952053638253489267515037 (87) = 
3 * 67 * 1950667 (7) * 2707066037381 (13) [phi1] * 402828988045621763618782881209933783962355520474628206424115774131 (66)

Factorization of P6718:
434240479056994245522594932197371382016036931637736496758253877603245740644321928862666 (87) = 
2 * 3 * 7 * 698647334956007 (15) [phi2] * 104596742146103 (15) [ecm] * 141483192238721915080704412660100179484434706118066134513 (57)

Factorization of P6719:
441023116625264639550052861711096125920399451938199714515651927042944420106771971610090 (87) = 
2 * 5 * 37 * 12384773 (8) * 96243537871664825732690187641972345618109944896828464934352096209561492471609 (77)

Factorization of P6720:
447911184239618441747279809231137968279063400119550232214240082022425494350588161600336 (87) = 
2^4 * 3 * 13 * 7245241 (7) * 3164951 (7) * 13220504884412877707 (20) [phi2] * 2367769649926859139013905357208421910816949702667447 (52)

Factorization of P6721:
454906312802709590167487628431571769806773585244048670871666499214870902724090787722544 (87) = 
2^4 * 235231 (6) * 340508801 (9) * 354959729476518030154705145578755184012210337316103126508173631135150989 (72)

Factorization of P6722:
462010158323911263962367037218425718476046114511703303057151583262802435487302084459894 (87) = 
2 * 3 * 130673071755601 (15) [phi2] * 16748076805802798513307973891052254577303 (41) * 35184325521129996133151215768783 (32)

Factorization of P6723:
469224402303952520533420150058147490948343393228744302294079302684298669337697628268118 (87) = 
2 * 3 * 11 * 13 * 3494823829309387 (16) [phi2] * 156483306305861441703612453295747050972281531323891875838687754280133 (69)

Factorization of P6724:
476550752125419157455018310393239271275386215858338364481836011225473792660368907181250 (87) = 
2 * 5^5 * 11 * 29 * 239022320815257257657689434679994618821510327703241812906250036978294065284197571 (81)

Factorization of P6725:
483990941449207774663691593502594217970464652369264075112190589073495218599621745780837 (87) = 
7 * 69141563064172539237670227643227745424352093195609153587455798439070745514231677968691 (86)

Factorization of P6726:
491546730617023355886497722669810957637314670194065110546235449671533733942488283145862 (87) = 
2 * 3 * 3843246924779 (13) [ecm] * 21316469304804859942077447398335182990595342454245010319434711373860188163 (74)

Factorization of P6727:
499219907060012051947601394664278613988763372994965803103010738162357189835921491755514 (87) = 
2 * 11 * 4967 * 4568514990391237183114019754601081812588203717215127140060862951501337828174327761 (82)

Factorization of P6728:
507012285713622232748314675994193972278957172275624724967990136838766522439883305174839 (87) = 
211 * 9035272407242946853956090173070578650657 (40) * 265946804891063060703096815112251455172005357 (45)

Factorization of P6729:
514925709438788279668192581588514670465530966663700694373253560841710980604029342779760 (87) = 
2^4 * 3 * 5 * 7 * 23 * 1697 * 4070463013 (10) * 828125087971 (12) [phi1] * 2643948715884478525468383214059487693 (37) * 881115486395810810323 (21)

Factorization of P6730:
522962049449533016194291936822004774823190195370342209369084397773869759715505149616713 (87) = 
31367371687012385657 (20) [ecm,sigma=1838401624] * 193868255498501005468312720049837 (33) * 85997404004748883322020636786335157 (35)

Factorization of P6731:
531123205747086122067959810208574617523783855651580553979948259602173855882976635891549 (87) = 
3 * 1738973 (7) * 2025462603738703230459185418517 (31) [ecm,sigma=436596974] * 50263989273759030851286596377033644967376935961663 (50)

Factorization of P6732:
539411107560617345463789266567830449472077488511422856943173254202033265952388444196583 (87) = 
7^2 * 163 * 67536134663906015458093059542735751780653247591263660566316921773135503437133898109 (83)

Factorization of P6733:
547827713794684819008698955538532334057891829584949057915708499744495240538011088530695 (87) = 
5 * 61 * 34085835429983210702581 (23) [phi2] * 52695098008104842889415351099061248113844300795165375734496379 (62)

Factorization of P6734:
556375013483500299140328643435083273382621404239124602717042064445550368133539289587380 (87) = 
2^2 * 3 * 5 * 7 * 29 * 13119863 (8) * 3481697450168005179446584882588243503701003556633471847129030590267776570207 (76)

Factorization of P6735:
565055026252114684727871832944913817960869030301236859535178082509434285882948056451397 (87) = 
43 * 21747299017943 (14) [ecm] * 891277505029471332442065418019 (30) [ecm,sigma=324208618] * 677959913184520190816121956730937464589987 (42)

Factorization of P6736:
573869802784628730374845445972341160346948987349734347698682733451437341357159561470174 (87) = 
2 * 7321 * 323253413459 (12) [phi1] * 121246678608665453058622442015773812630506233357390983832645952553459133 (72)

Factorization of P6737:
582821425299535452736934972605672866250377980279858948784253332288790266772622642281828 (87) = 
2^2 * 67 * 631 * 11213 * 176677 (6) * 1739680585879810838996867942555966300559750747343016187804642122796635141 (73)

Factorization of P6738:
591912008032302334868889569919933284045298064712967759440239282946381564923735505846062 (87) = 
2 * 11^3 * 9241 * 249779 (6) * 266961223 (9) * 2399575657 (10) * 33654144217223389 (17) [ecm] * 4468410095935592645287909689437645659421 (40)

Factorization of P6739:
601143697725303064417617541889036253110762279741297505962419426749545282927275626783230 (87) = 
2 * 5 * 7 * 97 * 6151036187 (10) * 247137687029 (12) [ecm] * 58239986324809150950420342261780309327145023216118139122069619 (62)

Factorization of P6740:
610518674125210196764571839365940805017921153105523851390699716482385374992558632218432 (87) = 
2^6 * 1163 * 51325753 (8) * 91183734113 (11) [phi2] * 152936182266618191582671576469 (30) * 11459780943541197944512224182570611 (35)

Factorization of P6741:
620039150487961814355000416154473483798582720128739205010982215683658483024614542189844 (87) = 
2^2 * 3 * 191 * 270523189567173566472513270573505010383325794122486564140917197069659024007248927657 (84)

Factorization of P6742:
629707374091416958805888836359729732276143547514566146862103964580442357747478820848164 (87) = 
2^2 * 60887 * 274467301 (9) * 322624365551 (12) [phi2] * 54672349374141420554008878174324409 (35) * 534070634979211910771307877 (27)

Factorization of P6743:
639525626755816343335182941092562379320141602202711332454285590853095355589255034871814 (87) = 
2 * 3^2 * 73025838178109318512507901725543 (32) * 486529184365934422177204710866710154828968642166034461 (54)

Factorization of P6744:
649496225372166609984488920269603711299488947995331365902026861495682785418566537043325 (87) = 
5^2 * 4919 * 1901653379 (10) * 6985456357522000621361913763674237779146301 (43) * 397588356165087661262721490933 (30)

Factorization of P6745:
659621522438668179403931711118327751511990184336386509177119634375618191234159696936774 (87) = 
2 * 3^2 * 41152915302374660505044641136680280657016469 (44) * 890474948523683079906851715479945684862047 (42)

Factorization of P6746:
669903906605308551025002897866042380828644295042124927663347526014816820601504220769510 (87) = 
2 * 5 * 7^2 * 337 * 4056827388150599836643873904596635262088320081403287880235859783290842491379544727 (82)

Factorization of P6747:
680345803226744748664691902068578334725595917241710173004147712871792815251349020577339 (87) = 
3^2 * 151 * 823 * 945798221021 (12) [phi0] * 491299861496666389627709861301056645291003 (42) * 1309077274792339196718598429 (28)

Factorization of P6748:
690949674923600471387554538533551403724936069012159666037061176949359814900701331196106 (87) = 
2 * 3 * 374203 (6) * 77486242833644353 (17) [ecm] * 3971579846800125987950839361904952480891821010609449899808302389 (64)

Factorization of P6749:
701718022152305402213243751010963630335148328838160754243657193987255800824334324826375 (87) = 
3^2 * 5^3 * 11 * 23 * 47 * 509 * 6407563 (7) * 11004053165214001 (17) [phi2] * 49071192251031697139717657659 (29) [phi2] * 29785285819009529558150773 (26)

Factorization of P6750:
712653383783606048413137937354753943168661586057260186476041656206663151594404883723216 (87) = 
2^4 * 3^2 * 11 * 17 * 37 * 61 * 4557103 (7) * 1147996964578420279 (19) [ecm] * 2241367701941854629057702240057540657298712367211781783 (55)

Factorization of P6751:
723758337689879437114989204396033081555121570461746736314472941681537522764646398188895 (87) = 
5 * 7 * 1381 * 18604841563980131 (17) [ecm] * 5230434348720387123410560705972099 (34) * 153875021145983351254488067790473 (33)

Factorization of P6752:
735035501341382969159212501111145126252847421109773090382017302083468309489787593060822 (87) = 
2 * 367517750670691484579606250555572563126423710554886545191008651041734154744893796530411 (87)

Factorization of P6753:
746487532411575743061174210531075498197364763555858043231363730960200102681127044295709 (87) = 
7^2 * 19197812331427 (14) [phi2] * 793550805371298081264025764759615025862304404005939843151013012290332783 (72)

Factorization of P6754:
758117129391648699973729294254629215548395094252338031347722446026562403628829626667590 (87) = 
2 * 5 * 355372479817906352947 (21) [ecm,sigma=1153113188] * 213330286515182492172111738874480015625090532782310447287325144797 (66)

Factorization of P6755:
769927032214403010162995748803087754218795589216812439044404064029074381531268848307998 (87) = 
2 * 3 * 229 * 4460411 (7) * 7814970144012599 (16) [phi1] * 16075357275680820594551514952385945099631739424766415330604293 (62)

Factorization of P6756:
781920022887618222164319944255145753189490381235681160817300915266792896946725568470682 (87) = 
2 * 3^2 * 101 * 3229 * 133198830130207205356762362312518078767994393022338665718388346545009438485099381 (81)

Factorization of P6757:
794098926137053827937730832724341413658435314865483563320024583046148709533354616655798 (87) = 
2 * 3 * 59 * 399779671 (9) * 50931941413 (11) [phi0] * 4295367761203 (13) [phi2] * 25648386905661361934632067321409461161086757599124723 (53)

Factorization of P6758:
806466610059230061462938159032743045081328852456643931263388113808725074062778509155482 (87) = 
2 * 11 * 31 * 61 * 2129 * 9105347394610414449703401311896576912427689680894590748816477278612123148760829 (79)

Factorization of P6759:
819025986784135944780113131125323905136561694494155537473370857425193208390712853648925 (87) = 
5^2 * 19 * 36928587483083 (14) [phi1] * 71304094812397537 (17) [phi2] * 6516215341367576071134883 (25) * 100491997024423420168397044871 (30)

Factorization of P6760:
831780013148014824978396461905725005488554671399000879244088715922050604682737467260931 (87) = 
7^3 * 11 * 17 * 199 * 287921 (6) * 23194005821619062545823168196520273 (35) * 9758219293121597645626512959551272678073 (40)

Factorization of P6761:
844731691376379908550593403834915647436137204978900664316019065515616523883822746507149 (87) = 
73 * 555127843307657569762138564709888821 (36) [ecm,sigma=255534557] * 20845048838133583026052682873610544020318754043953 (50)

Factorization of P6762:
857884069777414596368417889245787892312056134694358259275916954904315445504238550068858 (87) = 
2 * 11 * 50902949549 (11) * 2983104667 (10) * 2907094902986505311061983 (25) [ecm,sigma=571697140] * 88335500344577143770130070760457961495351 (41)

Factorization of P6763:
871240243445914753793919873109604491397593002772871106115502471959317102450930910075594 (87) = 
2 * 65741947 (8) * 125137801 (9) * 120729859 (9) * 7975583533 (10) * 47884386004984601 (17) [ecm] * 14769631610405677 (17) * 77756392526751974029 (20)

Factorization of P6764:
884803354977932416642864713902225221767427553225853293773053713482881393591821539932710 (87) = 
2 * 5 * 11 * 23 * 31 * 349 * 155536352034492361321 (21) [ecm,sigma=2037269079] * 207829508237397047683434121577568071705434761374085909151193 (60)

Factorization of P6765:
898576595196282835375946715088085946978443982522055138172378313522542831305796909608593 (87) = 
3^2 * 13 * 17 * 29 * 92383 * 13542301 (8) * 12451962320176922465505229322468199980869372132787126083742594474731691 (71)

Factorization of P6766:
912563203887079197542661716127273566745136054153579232092769687118768808079230742467287 (87) = 
3^2 * 659 * 50441 * 178513 (6) * 26295589 (8) * 925719095091525130131233822441796521 (36) * 701971317878396221546719469601 (30)

Factorization of P6767:
926766470547461842677136202566245011168162386735745289718573748901167940784472619659094 (87) = 
2 * 3 * 7 * 357951731 (9) * 4040814417052308973067 (22) [ecm,sigma=1847787695] * 22431905849450167707557189153 (29) * 680082308325492668255392847 (27)

Factorization of P6768:
941189735144691295089878481924342300844536758240807456662762176997211397512642066905388 (87) = 
2^2 * 179 * 173783 (6) * 223331 (6) * 102524413 (9) * 330354759046154045304041533926290016948409990758382041862327883257 (66)

Factorization of P6769:
955836388886776988867029724132557330535187092446628236671473182095837449641144550777680 (87) = 
2^4 * 5 * 265042549 (9) * 29900002516431608400379 (23) [phi2] [composite] * 78751933565148913 (17) [ecm] * 19144565890169487237502484134909947527 (38)

Factorization of P6770:
970709875004816146440200144809430212452107577945775136988414946748339344224194037401520 (87) = 
2^4 * 3 * 5 * 7 * 103 * 3187 * 4813 * 82307 * 597416852091170803 (18) [ecm] * 7437565005877317603716378176668137388078459846338363 (52)

Factorization of P6771:
985813689547219897894652876121046190457545299947044705737472162637918795526054134248604 (87) = 
2^2 * 3 * 11^2 * 71 * 16421 * 21153653 (8) * 27843890801 (11) * 104491701329 (12) [ecm] * 9461787285702582408879746288581072493913388852331 (49)

Factorization of P6772:
1001151382186006393319166102640123295670341830325156885333942000060349535160851873178569 (88) = 
41 * 67 * 25033 * 1009559 (7) * 3211357 (7) * 163764611 (9) * 657169815143 (12) [ecm] * 41726334427843139528966316695495482551843363781 (47)

Factorization of P6773:
1016726557035343365553654956894417002020794235926569743767175897681112610045734425301948 (88) = 
2^2 * 11 * 4551752729 (10) * 184839681927833 (15) [ecm] * 27464874399333663869805986081649166972755815972342574129731581 (62)

Factorization of P6774:
1032542873482525346255558280773881300109384582818098890031293621492877942920673735508700 (88) = 
2^2 * 5^2 * 7 * 29 * 479 * 2441 * 43501953800489303404544764837881619583731208692237766271566951674979517873211 (77)

Factorization of P6775:
1048604047031573524886907577071776331538547541835872551214335496587461639153270204098057 (88) = 
3 * 7 * 1523 * 2293 * 14298427469919025818146597655841128905696965155290434578672136872477208804373003 (80)

Factorization of P6776:
1064913850159649068633668613803038193553609274985869588767478624339779532359542624728168 (88) = 
2^3 * 143359340259591787539165318523162169108153 (42) * 928535462209270446911927574465053717209687157 (45)

Factorization of P6777:
1081476113186473592029241130156799210441453581940730607914118432603352354847660847417925 (88) = 
5^2 * 7 * 17 * 19 * 173 * 6991 * 776099 (6) * 39493536013 (11) [phi1] * 64211092839823 (14) [phi2] * 8037810265692117616487862908636325692363634779 (46)

Factorization of P6778:
1098294725156953378796002623600434491144067586953062692286614917692917278311063665688639 (88) = 
17 * 136849 (6) * 18313351980803399900263957 (26) [ecm,sigma=2047591911] * 3869973207410864701768721491 (28) * 6661201133543586146886401009 (28)

Factorization of P6779:
1115373634737206915782930864186184362688249243406383289852885564816153978325478844152025 (88) = 
3 * 5^2 * 1319 * 45341 * 64287749 (8) * 393555966721 (12) [phi2] * 9828528482741717232478344026730042827919383525824380222797 (58)

Factorization of P6780:
1132716851124198300513576196122245619282469140352050548360289828314779759160849350492025 (88) = 
5^2 * 7 * 29 * 793114187 (9) * 169909786165759 (15) [phi1] * 1656270257394299345369922254163676256070356326689891351592919 (61)

Factorization of P6781:
1150328444969182130426555634069779631130427247235409336466492248636368105578355878305370 (88) = 
2 * 3 * 5 * 7^2 * 19 * 711829 (6) * 11835060706847293 (17) [ecm] * 4888827978260277071053593194011946229940073122254392747438497 (61)

Factorization of P6782:
1168212549315168574059662415197136646167485195633158297899556610283791438088172554017135 (88) = 
5 * 11^2 * 3006317 (7) * 6494543599 (10) * 36294051649 (11) * 70327600203649 (14) [ecm] * 64393472206823965258699 (23) * 601699968197211267611 (21)

Factorization of P6783:
1186373360548620462877906888496603025087314429200147127707098552033741652334690843114613 (88) = 
3 * 11 * 1091 * 14821 * 2223336452668371209561538346147580132604409732680736312830183117801645633757051 (79)

Factorization of P6784:
1204815139365597427864677379060035086712855126023740359334561530028438709986915682352055 (88) = 
5 * 7 * 17 * 23 * 143881 (6) * 21346036589 (11) * 198761071939977491244320543 (27) [ecm,sigma=545347072] * 144219367646552658894219511712470167860369 (42)

Factorization of P6785:
1223542211752565338083301603949831723795071843355495150735366814111723656022829546060974 (88) = 
2 * 3 * 1759 * 4982470218175812978387658448084603 (34) * 23267898232352187105008418638546063703363790625177 (50)

Factorization of P6786:
1242558969982092579883538414814438041601651200523510702776312601587457411878474574646264 (88) = 
2^3 * 29 * 9931 * 7476493 (7) * 2383911234946545523 (19) [ecm] * 30258544287184854601670277814246205439906115924471219303 (56)

Factorization of P6787:
1261869873623658045994396571979407568319152830465631728286297999902331954706942059776868 (88) = 
2^2 * 3 * 19 * 31 * 79 * 1906252529 (10) * 1947247313027 (13) [ecm] * 34975281547046363 (17) [ecm] * 17407170153750326147490071181083461724857361 (44)

Factorization of P6788:
1281479450569799084142299992094769789991310661913325459458123174248949268706592331830487 (88) = 
7 * 13 * 14082191764503286638926373539502964725179238043003576477561793123614827128643871778357 (86)

Factorization of P6789:
1301392298077831085803970627426011717167844837264235393970315110585664766479521045381615 (88) = 
5 * 1109 * 181539140801 (12) * 2708588871076944697 (19) [ecm] * 344239403006420588901617 (24) * 1386541064480303985569676803903 (31)

Factorization of P6790:
1321613083827373877999448895351684713283971367717284245699660120428958758533007979418073 (88) = 
43 * 103 * 2522476403 (10) * 118296402337512495218085820496857195427870107656823954935562819961735608079 (75)

Factorization of P6791:
1342146546993923615416542488560657308733848603953897766480407378207729998086528179305455 (88) = 
3 * 5 * 41 * 443 * 1613 * 6271 * 487023512118327119666093242988172397788620497019835606678621137871955080953 (75)

Factorization of P6792:
1362997499338712457409134134012273273543481750526774018949912066581853796809844924265204 (88) = 
2^2 * 67 * 27211 * 622370183 (9) * 12095852203 (11) * 174834225117279745363 (21) [ecm,sigma=436071596] * 142005138604122077613281000230273788454379 (42)

Factorization of P6793:
1384170826315101955315122613886144545336931180689877916404392713927847950417564792714885 (88) = 
3^2 * 5 * 11 * 251 * 647 * 94449631 (8) * 520330404376507969 (18) [ecm] * 350370087174321908697707557177345743939256065730625881 (54)

Factorization of P6794:
1405671488191759770893912194595227151083276839546668391644070004951636891096722776979270 (88) = 
2 * 3 * 5 * 19 * 47 * 10781 * 3842801 (7) * 1190308611702530189 (19) [ecm] * 110681497758378365934951221 (27) * 9613235424442134276899352517 (28)

Factorization of P6795:
1427504521192873097298726384645536575767622543071508782585157475082097185389275260593419 (88) = 
7^2 * 47 * 1051 * 21407 * 27550217344410662618795738221080612718501052598469777344051837716027333989489 (77)

Factorization of P6796:
1449675038655655960698029684798498778664290815682468199109815519541570852093846419694417 (88) = 
2663 * 8087 * 8273 * 328382129 (9) * 24778186243439393217432456264311240889194600127734207578167230930321 (68)

Factorization of P6797:
1472188232205411444277603859185407038407536600495762848597123520241240550606888054180916 (88) = 
2^2 * 3 * 7594199 (7) * 770470248972897131 (18) [ecm] * 6122537553388715657164791106701165135689 (40) * 3424623176486558060323 (22)

Factorization of P6798:
1495049372948413797737312079356363888483419924335630422865415367996168995041724037534681 (88) = 
1495049372948413797737312079356363888483419924335630422865415367996168995041724037534681 (88)

Factorization of P6799:
1518263812682879375403806777970240719713915028395726492742745307079927854581726374474725 (88) = 
5^2 * 337 * 145807 (6) * 20938796773 (11) [ecm] * 544829305310297383 (18) [ecm] * 78558934815873036263153 (23) * 1379085491677253641132240673 (28)

Factorization of P6800:
1541836985128299385584634624829042495151798419179228089036359716875408807872398723479588 (88) = 
2^2 * 3^2 * 148013 (6) * 2196154452370719394409 (22) [ecm,sigma=1632469255] * 28701347321932180045852817 (26) [ecm,sigma=1627005502] * 4590615649194981438917218778771597 (34)

Factorization of P6801:
1565774407173411533675519432174176618683811366061196022303877395969638934628563804374322 (88) = 
2 * 782887203586705766837759716087088309341905683030598011151938697984819467314281902187161 (87)


Factorization of P6802:
1590081680143091802699321354051488556677398488703202304901418705364481138640155825254368 (88) = 
2^5 * 7^2 * 2777 * 26599507263141862597152682360277678596937 (41) [ecm,sigma=813417262] * 13728525797705865071467769300252646707599 (41)

Factorization of P6803:
1614764491084451838313837542710093340489557847345276057948377224656913801069121384590606 (88) = 
2 * 7 * 13 * 177237409 (9) * 576530057 (9) * 58159601924078117789 (20) [phi2] * 39862282749550823098319 (23) [ecm,sigma=586118056] * 37452159613991936959390351 (26)

Factorization of P6804:
1639828614072431691801279215688190068040534767474387507138766688241485302867533086348545 (88) = 
5 * 11^2 * 9340658262155201905322123746295376404471302071937 (49) * 290178747905781158197474099324428917 (36)

Factorization of P6805:
1665279911535182025083680116158006663040257082896730998759102978128862073997845197168787 (88) = 
3^3 * 241 * 5886281 (7) * 695561 (6) * 18647107 (8) * 188377889659591 (15) [ecm] * 17794624678220193502501836281909650101723487482373 (50)

Factorization of P6806:
1691124335599534297348304088334340865638238963023655156147039110358396570918113179361423 (88) = 
37573273 (8) * 92624923 (8) * 485924337464786356959677599015498282584704315939229604619387890109852837 (72)

Factorization of P6807:
1717367929456861934382067328412617268562561107017551066267598062185897813502320644555843 (88) = 
2591 * 4351027 (7) * 11307312607 (11) * 28941838720446893 (17) [ecm] * 465498878656165507513830348933468835328473119244949 (51)

Factorization of P6808:
1744016828749640030185123807259781526453637322859036185492898392541191628972029058204870 (88) = 
2 * 5 * 7 * 31 * 2089 * 11909 * 2066546386579 (13) [phi2] * 15632629827138107037860264860402675239996927366970203096157950809 (65)

Factorization of P6809:
1771077262979015746856648736320404436404729325398740700740769920963766073206644961378840 (88) = 
2^3 * 5 * 7^3 * 71049499671679619247487213054979573 (35) [ecm,sigma=468823007] * 1816863801462914505280771845644400315958856560589 (49)

Factorization of P6810:
1798555556933706264130795275263019429317060068767988366965791845896911040554048928981088 (88) = 
2^5 * 7 * 67^2 * 443 * 304869894279484419393372891958749528091 (39) * 13243658315541033044192741080447913992741 (41)

Factorization of P6811:
1826458132140545885313043600447433571352832858582647203741969754391824598023177171414689 (88) = 
3 * 7 * 19 * 73 * 1217 * 34631607487 (11) * 1092511558189 (13) [ecm] * 85704577725023 (14) [ecm] * 15889882180210292463363558807639121721663539 (44)

Factorization of P6812:
1854791508337008732767127877563390908438292499975047187284167934174150199018617006453675 (88) = 
3^2 * 5^2 * 1948426303 (10) * 173396803 (9) * 2258293268871589 (16) [phi2] * 10804562127670857493392981713934086171797894263102683 (53)

Factorization of P6813:
1883562304966038364586227154005659711926766519597664179526301103904863092380949574643964 (88) = 
2^2 * 1259787620471 (13) [phi1] * 373785683070497656121078878730675870667425113143323964868832167538680704121 (75)

Factorization of P6814:
1912777242693520615720571523701393682577280144466370160911074018057028621591984382757000 (88) = 
2^3 * 3^4 * 5^3 * 331 * 5776861 (7) * 12349786951674545615126329609729423319427001449875349911532520343570122667 (74)

Factorization of P6815:
1942443144948741012714325168722546135201074431106385507284407002616192911633466611592744 (88) = 
2^3 * 11 * 17^2 * 14251 * 141731 (6) * 9843569 (7) * 50017463 (8) * 107572939 (9) * 713970595562855310478058291329383189818739149383979 (51)

Factorization of P6816:
1972566939488173232430925659408613616815979168100031213769980389459235275811523524619220 (88) = 
2^2 * 3 * 5 * 7 * 13 * 17 * 47 * 1568605499 (10) * 42050807448347101757 (20) [ecm,sigma=1312740510] * 761378265593377 (15) [ecm] * 9003342676974101009513470069788504113 (37)

Factorization of P6817:
2003155659982950272837666118817928862449099811826275854121412750596325827745892391164028 (88) = 
2^2 * 3 * 7^2 * 3406727312896173933397391358533892623212754782017475942383355018020962292084851005381 (85)

Factorization of P6818:
2034216447630375279213444974939012535694601517270281820630979872924319653051485196006841 (88) = 
24376124819 (11) [phi1] * 172109576530954567224924329 (27) * 484872396165339494088940088568317734413564779794891 (51)

Factorization of P6819:
2065756552789834323191321743236113525173317463521136073855228585255537067425573666098095 (88) = 
3 * 5 * 47 * 38670001 (8) * 251380489 (9) * 73575992738474024536193926529104307 (35) * 4096831871309193640410029544795133 (34)

Factorization of P6820:
2097783336643478866019901877586510405735687883523997949099060302376184127090393336470192 (88) = 
2^4 * 157 * 311 * 1847 * 3264607 (7) * 3255799510411523 (16) [phi2] * 1032938115437 (13) [ecm] * 132419165786762070754180316342988096322349839 (45)

Factorization of P6821:
2130304272882051152512025969087470791072873889482038329474681107409704888484112637489319 (88) = 
7 * 1109 * 44533 * 229518673701868163 (18) [ecm] * 252354840570616177 (18) [ecm] * 106389908249105148290508473103391489463757811 (45)

Factorization of P6822:
2163326949416231379550711327103737006041923247756021985470353333093167915303800466893629 (88) = 
1676365458707239 (16) [ecm] * 6180204748271941483 (19) [ecm] * 208809663473835965251876935784691927115985937568957617 (54)

Factorization of P6823:
2196859070113891163963554542666233419321002984836079302621715106640951338985871933391606 (88) = 
2 * 7 * 156918505008135083140253895904730958522928784631148521615836793331496524213276566670829 (87)

Factorization of P6824:
2230908456563643600298695853121992330951181098329373578193662553736196710678559523934625 (88) = 
3^2 * 5^3 * 41 * 16798984466170927331306946713950301640433 (41) * 2879137075308830215098302850859368109422101 (43)

Factorization of P6825:
2265483049865086050797156339022303727668444474252394045005066904784061484483824870940158 (88) = 
2 * 3 * 89 * 4242477621470198596998420110528658666045776169011973867050687087610602030868585900637 (85)

Factorization of P6826:
2300590912446137748935685875294811190046637810151016651293744958779687834579237530583925 (88) = 
5^2 * 11 * 17 * 20887 * 40329811 (8) * 3344148299 (10) * 293748690012570041315238555037 (30) * 594694695021670034194759573753621 (33)

Factorization of P6827:
2336240229907880325607888158165586304636249213968280972518691378023125276759623940737502 (88) = 
2 * 3^2 * 93083 * 1178408437 (10) * 1183256170668177385610350955196441317678178304904792318314714182208242209 (73)

Factorization of P6828:
2372439312897315484635167816954941835456181856827464106248161544126005355683435450632682 (88) = 
2 * 16880605193504345383091010421 (29) [ecm,sigma=1968407994] * 70271156919487395345114066037683636971905561149699237147521 (59)

Factorization of P6829:
2409196599008460263188268199782507816699407869823517413632767285620421361835737131097785 (88) = 
5 * 23 * 8161 * 492412597 (9) * 282752917 (9) * 18437191841785512720365940335492604642476582263674388619384009531 (65)

Factorization of P6830:
2446520654712206614209863322331721360986850761318796994922237293463005423965976688136798 (88) = 
2 * 7^2 * 139 * 809 * 1061 * 1091 * 13103 * 134353 (6) * 8788639 (7) * 138741817 (9) * 2945180879490586547 (19) [ecm] * 30336136458093651807654305006849 (32)

Factorization of P6831:
2484420177315378443433882127061284706164126402775761563609410477584350475353603971701374 (88) = 
2 * 3^2 * 83 * 7547 * 19457 * 28462250983 (11) * 26387403802963166676004795432547 (32) * 15078506040215582404328784965146699 (35)

Factorization of P6832:
2522903996949425724493342497771108167912124170907812033909516328558632922752815796525292 (88) = 
2^2 * 3^3 * 19 * 61 * 138463269299 (12) [phi1] * 145565665987627759964844622483469671689706473082345749729972115131462989 (72)

Factorization of P6833:
2561981078589201903311436477997649055203873757593032607300980638355515192461554035002780 (88) = 
2^2 * 5 * 7 * 197 * 1097 * 3658891 (7) * 14544265700231 (14) [phi1] * 1591232926704810747482982853928527684468368098486266940762693 (61)

Factorization of P6834:
2601660524102277488917335217923434849351363198570384110907921025117115736817693730524400 (88) = 
2^4 * 5^2 * 19 * 1288513 (7) * 2126147 (7) * 1046572349 (10) * 119394875279669882415296092579719797701161985099740504464596171 (63)

Factorization of P6835:
2641951574329249513476796539521307849520761844977600926282905575990739624848937757419620 (88) = 
2^2 * 3^2 * 5 * 31 * 61 * 72096234811 (11) [phi1] * 107658477683275488368111445621367302382216786902784174647526582033261709 (72)

Factorization of P6836:
2682863611195513431157821779174664504355792909319520288988415463079096141276093240726436 (88) = 
2^2 * 13 * 238162715627 (12) [phi1] * 61652294413 (11) [phi1] * 362304207694599599707 (21) [ecm,sigma=1060383475] * 9698372399388419385619030030324720871680249 (43)

Factorization of P6837:
2724406159854971014964838371704538612136774514557042743320977403500789965928220361905927 (88) = 
7 * 11 * 17^2 * 19 * 137 * 349 * 94079 * 572903 (6) * 2500402368606736457665491230285094948968728500049976726820437271781 (67)

Factorization of P6838:
2766588890866154904394872872994162288869504711685725344724817181996063844356579946455081 (88) = 
271 * 72399692344894649207809303630600300863224230157 (47) * 141006332552005006682546258315419279523 (39)

Factorization of P6839:
2809421622401257656242119883632658248140081385341750163076415464545981444665476997102445 (88) = 
5 * 13 * 73517 * 4735849 (7) * 2497970904673343887362766899111763 (34) [ecm,sigma=1502246817] * 49697044875809605327344142869914970169507 (41)

Factorization of P6840:
2852914322488560457672232161896898993846870362852123536056335407481796850637624928648311 (88) = 
3^2 * 53 * 333406207 (9) * 1207967119914030523 (19) [phi1] * 238236099281628458262661 (24) * 62335290337211836436790277039344283 (35)

Factorization of P6841:
2897077111288764076396750607664667955477552250333216230981681789455912451944100061914826 (88) = 
2 * 3^2 * 23 * 34603 * 202230176580481634009613712786112340059702193474694972203108369555508398991409953 (81)

Factorization of P6842:
2941920263405732149017062704796582068321274403137907357396707783921094193337773640263230 (88) = 
2 * 3 * 5 * 7 * 211 * 6959 * 12017748178343 (14) [ecm] * 793887952764590025108491573128271058469093453173231262073237109109 (66)

Factorization of P6843:
2987454210232164547015681251870526126050118438377561323184577731168554484217060014824849 (88) = 
29 * 477091 (6) * 123833521467449535866592863077 (30) [ecm,sigma=212423412] * 1743668060141412901211481441560814504245791723775083 (52)

Factorization of P6844:
3033689542330726312114232983688124935300300571118574583482192504625076269026690697118115 (88) = 
5 * 7^2 * 37 * 521811426555897420721 (21) [ecm,sigma=1004922471] * 641342087523053963951518537212844800930817010583869108117578651 (63)

Factorization of P6845:
3080637011851165520480660169446520975760969865319107327997770879393459218247812573800549 (88) = 
3^2 * 137 * 685328438940902964967351468719131 (33) * 3645681280303603938841966896042672947603698557053263 (52)

Factorization of P6846:
3128307534983961420266009452372890806911232857116394991398144362284265999061926629434037 (88) = 
7^2 * 37 * 3089 * 34851539 (8) * 4587809683 (10) * 8558374896821 (13) [phi1] * 408201942652498961777815724026228984840465212506533 (51)

Factorization of P6847:
3176712194451052290922339950521548785433735884261592769936061608476293729374482557339938 (88) = 
2 * 53 * 35869 * 48733 * 106249866799 (12) [phi0] * 212960534069 (12) [ecm] * 757708339063399192638758635413794512436825090191268479 (54)

Factorization of P6848:
3225862242034200697461914190623596414371320690827938198727472058839704372614292785055946 (88) = 
2 * 11^2 * 11447 * 14741 * 172806899 (9) * 457141601418057646914596531867196213482620629214866999316605479490581 (69)

Factorization of P6849:
3275769101141562160054163233207266896516275429099876847071070418484598438170922843973125 (88) = 
5^4 * 7 * 13 * 40177 * 108813717677261 (15) [phi1] * 2603144076493 (13) [phi2] * 5060955436654658503663148619729297981487843306800487 (52)

Factorization of P6850:
3326444369413031730937581404123081262633768568740327933622199290021054274562675677534676 (88) = 
2^2 * 3^3 * 11 * 13^2 * 73 * 11827 * 31391 * 984587 (6) * 973823 (6) * 2049948178231 (13) [phi1] * 25952687243486980691894150437 (29) * 11984368966792344799 (20)

Factorization of P6851:
3377899821364951568392151984548056790055876148339051160618213511812889974244952780906348 (88) = 
2^2 * 3 * 7^2 * 109 * 270874973 (9) * 59383522153 (11) [ecm] * 3276484423021810636466221083350410170707310286880479231683395801 (64)

Factorization of P6852:
3430147411074771323344777854977426944476883283979032760950354225716213349416641710502353 (88) = 
31 * 269 * 264071 (6) * 2954537 (7) * 20604987038300783 (17) [phi2] * 236742317671980097 (18) [ecm] * 108078778259487931844488607785277942651 (39)

Factorization of P6853:
3483199274906262009963733879338174386703689245616644830772598663860629456503877000211639 (88) = 
91151 * 38213505884809404284799221943129251315988735676148861019326158394977887861942019289 (83)

Factorization of P6854:
3537067734275893019264618042124342531097910556994925236469167857024563383264737672963230 (88) = 
2 * 5 * 599 * 6424757 (7) * 535751399 (9) * 21011776217 (11) * 1498744154210599 (16) [ecm] * 729529743197774440034437 (24) * 7467294201511118309 (19)

Factorization of P6855:
3591765298460991056254318307303805095315547718236391739312591456269797669854149450039762 (88) = 
2 * 19 * 1559 * 13541561996971 (14) [phi1] * 415357078823 (12) [phi1] * 10779233000599153042408736452572180433278169496375368482617 (59)

Factorization of P6856:
3647304667450309038464626313209933111442446819205671000359721886545181391436552893793414 (88) = 
2 * 107 * 17043479754440696441423487444906229492721714108437714954951971432454118651572677073801 (86)

Factorization of P6857:
3703698734837642388886067239627908968278653730472308381934290427321699101906438460227160 (88) = 
2^3 * 5 * 29 * 647 * 5737 * 224423044385788038113622996367227254039 (39) * 3832843474970166209229779979416051830531 (40)

Factorization of P6858:
3760960590759139691347712237770177599051193553348793000890022627474231360695490537916691 (88) = 
7^2 * 37 * 79 * 11777 * 149249 (6) * 55319923 (8) * 236442209 (9) * 477241870849 (12) [phi1] * 2393220243091907066249756849703062554893911347 (46)

Factorization of P6859:
3819103524874964353372751042212785612661025722326296830160799519325679781894649432621935 (88) = 
3 * 5 * 7 * 11 * 39226573 (8) * 3789399823877368091293505959 (28) [ecm,sigma=1014242012] * 22244807313443714289819076836905354649411821249311 (50)

Factorization of P6860:
3878141029395973742575545794376258849966525109235818734825140693325508241256388457728194 (88) = 
2 * 3 * 61 * 164396969610005654798934307765161740425432913 (45) * 64453826409669726685385623741029414612343 (41)

Factorization of P6861:
3938086802156092229887891913767110955319842206640859472218626742569726745849764732107191 (88) = 
93306722135945936782693 (23) [ecm,sigma=408435911] * 11109113253520240657774678709470753 (35) * 3799207004668377455707162090379 (31)

Factorization of P6862:
3998954749731064688475873565976322476363823543654389088266714849561661238556911705562929 (88) = 
23 * 37 * 47 * 71 * 127 * 283 * 509552269 (9) * 6976768529 (10) * 33847453730534038000964711997297143 (35) * 325612830204163111647509 (24)

Factorization of P6863:
4060758990604287263331543438351295790871812906519155242053155919859608461650313790077540 (88) = 
2^2 * 5 * 455491 (6) * 4161581 (7) * 320064540666641 (15) [phi1] * 2065929924989061689227 (22) * 161989146800130062355036500313149200841 (39)

Factorization of P6864:
4123513858380422645425599201436125054034923600808297006222157305776847221438003329199635 (88) = 
5 * 67 * 193 * 761 * 83807075447361775859062300883891363836111909472978472440494225456368939749815397 (80)

Factorization of P6865:
4187233905047517658251064097364464615649988671886301121850680256137432214343660944706483 (88) = 
7 * 29 * 37 * 827 * 1841731949 (10) * 2770786695739 (13) [phi2] * 132097450189426960019403121201322609318937413522778289604449 (60)

Factorization of P6866:
4251933904288351695869852542660517567501896920067257301652853050827194268411078708804981 (88) = 
52291 * 666511 (6) * 1139473 (7) * 950763379041671539 (18) [ecm] * 112609687126666108479338240011673364053069620054659523 (54)

Factorization of P6867:
4317628854841755442524002849868021358110794375014984292839185591657131038511999664341344 (88) = 
2^5 * 283 * 10224415995783516496657 (23) [phi2] * 9695730713408261 (16) [ecm] * 4809388244533744053730613136205828862362353037 (46)

Factorization of P6868:
4384333983914650356855617395323495475426527798630146525043713199216916188693316616162631 (88) = 
3 * 802628893557386459 (18) [ecm] * 1820822391314016286132841599119021218607763861827987337142584778748503 (70)

Factorization of P6869:
4452064750645570621193338567340003498541372577486163138925029991071988827906991710809930 (88) = 
2 * 5 * 12433 * 80915107352773 (14) [phi1] * 5417820712542540352362904807 (28) * 81682927535512619150866692395397517648411 (41)

Factorization of P6870:
4520836849620440640643033989203843973464705777018550766076422787160928802469170742824838 (88) = 
2 * 3^3 * 11 * 1583 * 63737 * 258835167566145121687 (21) [ecm,sigma=775243548] * 1076467451905893742328219 (25) [ecm,sigma=334115574] * 270729555590524689943864246988129 (33)

Factorization of P6871:
4590666214441392730336667292782110815920685091813272793514631205010518385130258202504945 (88) = 
5 * 11 * 43 * 367 * 1223 * 7547 * 15889 * 19069 * 176455973 (9) * 34021352048425121621 (20) [phi1] * 315039698867126339128902085737062691403 (39)

Factorization of P6872:
4661569021349421354652890764311218486037178588157493952295523967202694752277828277208419 (88) = 
7^2 * 953 * 1879 * 12809 * 34512403351709 (14) [phi2] * 835717547137806413 (18) [ecm] * 143802490685805362876815406659683371037102221 (45)

Factorization of P6873:
4733561692901682182069446066463432003329559592599076646136134375044924061988621468818998 (88) = 
2 * 3 * 11 * 17 * 59 * 71506113370519988248428140826965044311452907831038349287533375253707424121402783601 (83)

Factorization of P6874:
4806660901704256296122206005568366420103131831544599168705314229661915336114158820457375 (88) = 
3 * 5^3 * 5563 * 185154911 (9) * 43819266863368325529632689 (26) [ecm,sigma=599810047] * 283989847382094817106272031302127274131429044789 (48)

Factorization of P6875:
4880883574201212159347864925160234014457583773716460192362773707095957446237017228885146 (88) = 
2 * 3^2 * 11 * 38113 * 729559 (6) * 568306925059 (12) [phi2] * 304760154411505423 (18) [phi2] * 5118686963081351953468694603785387642469357933 (46)

Factorization of P6876:
4956246894520810365734700116055968687277771630534481699892458186224546121622689035010812 (88) = 
2^2 * 3 * 151 * 1277 * 13627 * 45746097343 (11) * 3618070617861491093993 (22) [ecm,sigma=867922359] * 949669514864077450410351971852240229819357931 (45)

Factorization of P6877:
5032768308379708840795440970335780843428373038097071386177383761397776732553106758829063 (88) = 
1153199 (7) * 337164097 (9) * 24777834118700090975936184240037149005269 (41) * 522393803372037910716367006413509 (33)

Factorization of P6878:
5110465527046038959644776635766594904587322001641872782988120271011527588963137380205796 (88) = 
2^2 * 929 * 114092262937 (12) [phi2] * 136837678849529750136546351027947 (33) * 88089240369024509591701098717713569414979 (41)

Factorization of P6879:
5189356531362236055188389866984097702226123510341525046412465649666685816978590194639225 (88) = 
3^2 * 5^2 * 7^3 * 17 * 102191 (6) * 182886671591614650813600211 (27) [ecm,sigma=1235780857] * 211637803231311014492306340023002487623646916982411 (51)

Factorization of P6880:
5269459575828520983528501609220948855447135173162699922352236258063295194430633986296443 (88) = 
13 * 17 * 191 * 48605367239585858976137 (23) [ecm,sigma=261283482] * 2568361832931663575580898693562352233862568668973834979010049 (61)

Factorization of P6881:
5350793192747942804822117681678471413886167883255865526159973635181020345064443088793512 (88) = 
2^3 * 11 * 487 * 43075181 (8) * 12728385287680967932639 (23) [ecm,sigma=288476407] * 336600047462307838163 (21) [ecm,sigma=1896793771] * 676537595780511655117892657133281 (33)

Factorization of P6882:
5433376196433906227993957020452525094010123278163231516735352086815579187802298165660281 (88) = 
3^2 * 467 * 5527 * 58207 * 4018330973574520648425102692796187133732104082782953939608717550730911316243 (76)

Factorization of P6883:
5517227687481121259850599685715699552809760758502056761006541420528164058460852284369566 (88) = 
2 * 1747 * 47657 * 2674954591103 (13) [ecm] * 525179109368077941149 (21) [ecm,sigma=96355643] * 23585628295495185665492067009563707142923770191 (47)

Factorization of P6884:
5602367057100926496253255686743378234263476572362929407176493906847012376816585204184975 (88) = 
5^2 * 1361 * 91397 * 1227391183061 (13) [phi2] * 5292712269643664841517559 (25) * 277319367438018447982072560036567984977753 (42)

Factorization of P6885:
5688813991521951698115235214085628556707414858799649418671193980023733285204390815331734 (88) = 
2 * 7 * 23 * 909679 (6) * 1540701390456590177 (19) [phi1] * 227492344128960903574265929177 (30) [ecm,sigma=1964801078] * 55410546391346074936307641060717 (32)

Factorization of P6886:
5776588476457099711172833133690004760400100490967132396267269399561758938340861845827620 (88) = 
2^2 * 3 * 5 * 7 * 37 * 6195747191 (10) * 18367981640582798172617358601 (29) * 3266369335527699082850500881944578297404390083 (46)

Factorization of P6887:
5865710801637842418856338820887178163814885860606657734352592833249456544790210244270727 (88) = 
3^2 * 13 * 28010219 (8) * 30595139 (8) * 58501344900218255900617957851716114110480489095561134454286674415873291 (71)

Factorization of P6888:
5956201565416840265328600261525496977154651132102606640335235157905722563281405087128894 (88) = 
2 * 7 * 83 * 461 * 267523 (6) * 164651883138824261353 (21) [ecm,sigma=2001173117] * 252426243792925161992956114899112697868882301390261384493 (57)

Factorization of P6889:
6048081679439909954075975858357985364786413476861894912986102141317146223400601423955955 (88) = 
5 * 17 * 40592567 (8) * 747756959 (9) * 2344184242502995486273318714563464714800917382136044036015061866605391 (70)

Factorization of P6890:
6141372373388380219591861690372085334691600893479143076406015876012742108275584065996572 (88) = 
2^2 * 3 * 89 * 461 * 3463 * 19993 * 65557 * 666123641567101 (15) [phi1] * 527877546829 (12) [ecm] * 147968982383682042803309 (24) * 52818370623148115023 (20)

Factorization of P6891:
6236095199792891088995538008528432067932555872266596311075679484658855489807580861495894 (88) = 
2 * 13 * 19 * 540349 (6) * 373459 (6) * 1555950654593 (13) [phi0] * 832357515664811 (15) [phi2] * 48301740521185327483870828438905258384747929857 (47)

Factorization of P6892:
6332272038919707800236780015488010075356424112847384255312514638740749374385679163423442 (88) = 
2 * 11^2 * 13 * 6971 * 19813 * 171974237 (9) * 1890048688437038057 (19) [ecm] * 44835202996915952828992365336735317407299968212711 (50)

Factorization of P6893:
6429925103730636527256872574029257993106076930083671068756467818554426031535100393040242 (88) = 
2 * 3 * 7^2 * 165752585195502862486493 (24) [ecm,sigma=616623662] * 8456981006608229333839699583 (28) * 15602094998976300120649727654923297 (35)

Factorization of P6894:
6529076944917645283566832545727596045776163587988589179836513682370254337498077251552255 (88) = 
5 * 4357 * 46258385282503811170995377 (26) [ecm,sigma=1697071359] * 6478936948295178171520994266957981718303028417620426724359 (58)

Factorization of P6895:
6629750456013309837672114088917119130864670334570487721984039044458917641324824482983459 (88) = 
3^2 * 71 * 79 * 21997 * 557673524489849210626731137 (27) [ecm,sigma=420989736] * 10705963310507138732655462551535701737019900718308351 (53)

Factorization of P6896:
6731968878578221180179796195298284963376075795723442491063889168133100054379515652261252 (88) = 
2^2 * 3^2 * 281 * 4643 * 4787 * 804857 (6) * 37200813943089485299903862226923379150181344370593550143784925892784081 (71)

Factorization of P6897:
6835755807466508036881534919511655366762682199492088219542498218290900385314765743099598 (88) = 
2 * 31 * 59 * 147258335270713 (15) [ecm] * 12690038871655755633141720841688695966795701589312640388277097887606387 (71)

Factorization of P6898:
6941135196170645128278840722428346741609647866128609571639669079125007270501144676916445 (88) = 
5 * 17426708298852964879513 (23) [phi2] * 79660886922948200187957086306053708425209558733861708556770470753 (65)

Factorization of P6899:
7048131362246735337625856022047451736584724910249977843134283442663102208789410924686700 (88) = 
2^2 * 5^2 * 7 * 1697533 (7) * 3310201 (7) * 1552065077321043671359 (22) [ecm,sigma=1881001658] * 11416378089730880444094491 (26) * 101126525981934558402817453 (27)

Factorization of P6900:
7156768992821471670382796701972564751598093672706728809202714414800393262031080669955397 (88) = 
7^4 * 33461 * 193601 (6) * 497852759 (9) * 16750061 (8) * 96271743069164881 (17) [phi1] * 9116970040793 (13) * 62865395625056387911678955131 (29)

Factorization of P6901:
7267073150182002871830117109986452042304311785809006037116851616600038635393214448377184 (88) = 
2^5 * 3 * 43 * 83 * 109 * 277 * 1012004177 (10) * 153428980391517799 (18) [phi1] * 1691016676607375812141 (22) [ecm,sigma=1432977123] * 2675456469346501874908457828459 (31)

Factorization of P6902:
7379069277449944820375102165657064560306701673916297868223120205165443258875132418166437 (88) = 
7 * 13 * 71 * 20389 * 3745996726378957 (16) [phi2] * 822642590346415963 (18) [ecm] * 18177214701702656036574347471682823933401491083 (47)

Factorization of P6903:
7492783204340798335731955793398804491034568665601087318179138307506073224216582641758122 (88) = 
2 * 11 * 13 * 2939 * 184584017 (9) * 50268893521397 (14) [ecm] * 168524147417069 (15) [ecm] * 5700618659204808467514224633151586254082445953 (46)

Factorization of P6904:
7608241153010052837674483239739630325845367054677615539520601332165141094924631310562385 (88) = 
5 * 193 * 15666471281 (11) * 503252301166777316772150999458765562515143300656481548192541690129132469869 (75)

Factorization of P6905:
7725469743987274366506913352526622564554810366259507907037118302797068733130954557775937 (88) = 
341398891 (9) * 86187504784390258493 (20) [ecm,sigma=825471550] * 427020246477211688916969907108314361 (36) * 614851186522139718311159 (24)

Factorization of P6906:
7844496002199495834892709748057215582944653434678138668286562427108932331064854106388775 (88) = 
5^2 * 11 * 587 * 119711227 (9) * 1046185183 (10) * 6795620421413591 (16) [phi1] * 18358393497700807 (17) [phi2] * 3110190687769924740534297895099979 (34)

Factorization of P6907:
7965347363085247026403360896037537743717604146971632427862058774457400927770800764861082 (88) = 
2 * 7^3 * 11 * 31 * 467 * 823 * 1861 * 47606158280447701194472417830446747430045984378644616231950454597709668407 (74)

Factorization of P6908:
8088051678800581793340537976795224562832034801807452119375943958533511701224044177007326 (88) = 
2 * 3 * 6698288171 (10) * 19929425479526324023 (20) [ecm,sigma=1591293747] * 10097969633363356943699882195483518732392223882403623260937 (59)

Factorization of P6909:
8212637224518480139349419574654088220022878384454783697170888524839688583488731074167795 (88) = 
5 * 2426974525349107 (16) [ecm] * 676779845749484101511044401549538912491395349841104402625404265535333837 (72)

Factorization of P6910:
8339132704823023405445403473265103542736232205681819678602523431059965195287416293698481 (88) = 
3 * 156968953 (9) * 657057649410366341026037 (24) [ecm,sigma=10566909] * 26951465995961565719006495727455248499173994717853348007 (56)

Factorization of P6911:
8467567260199761615752028579719824018022255621646662784855055388165861899178399588856636 (88) = 
2^2 * 3 * 71 * 8291 * 3125272706418034547 (19) [phi2] * 821836571931479996792239 (24) [ecm,sigma=948266752] * 466701033237296507947513573690661864581 (39)

Factorization of P6912:
8597970473623713185990994331391073383899546027078676609723189758343534154984256845178950 (88) = 
2 * 3^2 * 5^2 * 13 * 19 * 7351 * 41332372768913799899 (20) [ecm,sigma=1529535614] * 1985545520919014501309455969 (28) * 128224163289390286226243553869833 (33)

Factorization of P6913:
8730372377246458658138032420531239079790588101308139992819523148815290370082559367763699 (88) = 
29 * 149 * 16165988389 (11) * 19286174559437383002389 (23) [ecm,sigma=1820234104] * 535104892699491292539013327 (27) * 12110476298934847536209557 (26)

Factorization of P6914:
8864803459183811903290425473949355069212128405442251645057006644357446518855563528469280 (88) = 
2^5 * 3 * 5 * 7 * 11 * 43 * 197 * 133303531477 (12) [phi2] * 269217147319429251581104913188057 (33) * 788965647793197819075676320198071897 (36)

Factorization of P6915:
9001294670405574336380556252024133711418924062833494153041819066650498006212238542083381 (88) = 
9419 * 955652900563284248474419391870064095065179325069911259479968050392875889819751411199 (84)

Factorization of P6916:
9139877431728900115681387741419051479795637643608194179644400943077001411743760773823398 (88) = 
2 * 89 * 1032782209423514887 (19) [ecm] * 49717767746609839466446606825018292083968559008809840913328856944093 (68)

Factorization of P6917:
9280583640916823061920608710255324604261975921808051245259295590411191163376845710869850 (88) = 
2 * 5^2 * 7 * 23209 * 1606117 (7) * 190783956162841 (15) [phi1] * 798000979596949150528349225293613113 (36) * 4672274635912527364445279 (25)

Factorization of P6918:
9423445679883519131157754582490841307297163315720428452126070578490065573996634930995886 (88) = 
2 * 17 * 45282059 (8) * 1025009383 (10) * 892226639 (9) * 143196156348601 (15) [phi1] * 46738014679002234330382146018454987976063843413 (47)

Factorization of P6919:
9568496422007901717362426143717047660032007815189421340264355657172850432669765730230515 (88) = 
3 * 5 * 107 * 1123 * 136511 (6) * 1303085059202581 (16) [phi2] * 29843413227556465383114677554966247001336563619794657262373751 (62)

Factorization of P6920:
9715769239557170849914400914592328722572999882707404346323514810654207392865403636618137 (88) = 
3 * 23 * 19055732383 (11) [phi1] * 7389285650037387492353483139531575898399801671373124983856233292379723576731 (76)

Factorization of P6921:
9865298011221961493154781136655515999723411710162288986283604750450321144001709059629073 (88) = 
3^2 * 7 * 43 * 1483 * 115099 (6) * 34146131 (8) * 15358965738678220740886334120381333738687 (41) * 40680382591260066802349855353 (29)

Factorization of P6922:
10017117129764760654853444473820550825506499193433697616436827739257727383416899428106085 (89) = 
5 * 1499 * 63647 * 4907023413018285147283 (22) [ecm,sigma=1415851772] * 4279322790280213763067257758305331121249484587698926161983 (58)

Factorization of P6923:
10171261509783287873300434263134627462343487010324466977692717362568519362662982755046474 (89) = 
2 * 3^2 * 7^2 * 5273 * 8101 * 30809 * 2414401849127563 (16) [phi2] * 3629298377630061858780873451908674195155887477523342749227 (58)

Factorization of P6924:
10327766595590558884033516335224613405071403308620121779875214501539152579676211142544675 (89) = 
3^2 * 5^2 * 7 * 43910188307847746570548587103254027054773370687989 (50) * 149334639109542179512729868510406641 (36)

Factorization of P6925:
10486668369213377872415537655149231949239214606733813564056442157349416168038408597199008 (89) = 
2^5 * 11 * 929 * 3010313 (7) * 10652891469634490814657141575158503845736028452759392743416928060594957911127 (77)

Factorization of P6926:
10648003358511029702887823402849439204197782623058023377885606959894548682171263000283499 (89) = 
9227 * 363067554223048808686991 (24) [ecm,sigma=1192192329] * 3178485387700166917457785150789826103469038819132093177027407 (61)

Factorization of P6927:
10811808645415969885344960732629776826760672330288009296988753475668568099913729236811937 (89) = 
3^2 * 7 * 101 * 1141999 (7) * 1357433639 (10) * 27231131906831231 (17) [ecm] * 858126027895208447639622200149 (30) * 46906748322263724723761 (23)

Factorization of P6928:
10978121874298336799379380913533109723150341749929934531947948593512796523157112439806535 (89) = 
3 * 5 * 7^2 * 19 * 7241375653683058192936529 (25) [ecm,sigma=2045663676] * 108559049023581282197538330274486825578000240363349665959731 (60)

Factorization of P6929:
11146981260456137853891932574572924734553105290972951910481358858164559615655104647266530 (89) = 
2 * 5 * 79 * 1367084415181949059 (19) [ecm] * 10321310596945785976644216695432649684664972953464799321475155899473 (68)

Factorization of P6930:
11318425598732988818602444296329284167104450393999194432967974425283298456774193316540013 (89) = 
43 * 241 * 1092195850500143666756966544082725481723868608896959802467236748555755906279474410551 (85)

Factorization of P6931:
11492494272265313531253187742046046723810919455544903993775663068397696279525339121976325 (89) = 
3 * 5^2 * 17 * 73 * 89 * 151 * 6386143 (7) * 27310639474630021 (17) [ecm] * 52679760131921094693257345600952738516800165494454836283 (56)

Factorization of P6932:
11669227261360939565796284582581811773049924903419959751587774703611329248757695444901097 (89) = 
3^5 * 101 * 397 * 2230979 (7) * 100513526187129821380465160201375744050891 (42) * 5340770945700833968765837773874163 (34)

Factorization of P6933:
11848665152511054248699862995715361534871602455754604421359454300479744511539906692540890 (89) = 
2 * 3^2 * 5 * 7 * 757 * 13198260676672933671314316956834017412659109575411759 (53) * 1882418990870985574980369724981 (31)

Factorization of P6934:
12030849147537514638893162962078141012295023260074118834251521132149472974567489994762205 (89) = 
5 * 7 * 14150803 (8) * 104887831 (9) * 3713947123 (10) * 62357160529697861363378474375182124869505295192435116631905617 (62)

Factorization of P6935:
12215821072877534748084711638580625214633904938342588561466724192152726253396000582971285 (89) = 
3 * 5 * 7 * 1049 * 16063 * 18131 * 380810976838795229878660561664440556878257932911631545597087396711811745161 (75)

Factorization of P6936:
12403623389007803378609262883241484656677511323973671697860741582003338291006330494825898 (89) = 
2 * 3 * 11 * 271 * 114760506557 (12) [phi2] * 282946381452503 (15) [ecm] * 2087621703907 (13) [ecm] * 10230266346208461112385651014825403285194107019 (47)

Factorization of P6937:
12594299200010116502061111518498233951345479322271282064374269336342025305857265936189263 (89) = 
3 * 17^3 * 251 * 307 * 11089038484990339230133389518659875655126884992172021335122158020182901257908181 (80)

Factorization of P6938:
12787892263280639100321283023372667725459945338033060866343959876650480927868255197148800 (89) = 
2^7 * 3 * 5^2 * 53 * 272379159704045035508975156256346918450986257 (45) * 92273711686878483347906051833570170043 (38)

Factorization of P6939:
12984446999384942847847915656431303888046320975279995730557714748844763529329712701447280 (89) = 
2^4 * 5 * 67 * 16651 * 67778707742168081 (17) [phi2] * 798599364986626823 (18) [ecm] * 2687794757810001072287600078822059518645478621 (46)

Factorization of P6940:
13184008502060997937034575896031210869113209741790128914000397208917250796081800338783036 (89) = 
2^2 * 7^2 * 563 * 839 * 1483 * 1607106367 (10) * 9854631738239 (13) [ecm] * 1426618781909224711 (19) [ecm] * 4249980503285379978816297872722669727 (37)

Factorization of P6941:
13386622548372329743911116077282632563361529316462907589939209358700362709770656123830920 (89) = 
2^3 * 5 * 39788007610374957017690077638779690681 (38) * 8411216942213568627041419431758249543650558379333 (49)

Factorization of P6942:
13592335609013583906427434057779158269565028300726691042799218333255401405418902437979837 (89) = 
7^2 * 251 * 9173 * 1136369881 (10) * 13167851677180281311 (20) [ecm,sigma=1514926712] * 822660064165583536483 (21) [ecm,sigma=314671501] * 9787185926371166755101853494127 (31)

Factorization of P6943:
13801194858770776749085637989423690280775823755792841457223650111607657934461477788559259 (89) = 
11 * 1033 * 6569 * 8243 * 152501 (6) * 52212071 (8) * 166209139 (9) * 16948864518234073070617513214043527028478920478379749091 (56)

Factorization of P6944:
14013248187138541842937724116619220115131413713005250462266328953630081507828892946477410 (89) = 
2 * 5 * 313 * 13490201 (8) * 331876159452874694919699346247948785708307444528610097594375419591896343950957 (78)

Factorization of P6945:
14228544209096717846216082361843464683351160148595421831587869270844757072543729975274380 (89) = 
2^2 * 3 * 5 * 23464387 (8) * 5146946313368700817 (19) [ecm] * 3075571078093072290782987199064603 (34) * 638446628404954412026545229 (27)

Factorization of P6946:
14447132276048657635491697862069470007911295044698114342993495383402898898511782307058364 (89) = 
2^2 * 7 * 11 * 103 * 482208485189 (12) [phi1] * 34535165327687 (14) [ecm] * 27346221069168167160139726621392317077697250452414408905727 (59)

Factorization of P6947:
14669062486923674117746720642526187267238474009906541065768297524428640638689766673673633 (89) = 
11 * 18755897244237360943854920279 (29) [ecm,sigma=1948834320] * 71100364744459516807828800024008281669455854768008912402357 (59)

Factorization of P6948:
14894385699446074017700771727533313408462965860688668441765442832575242818768942390961888 (89) = 
2^5 * 3 * 361826450737140381369761 (24) [ecm,sigma=1740955324] * 38630872202594525863232595951289 (32) * 11099835361754556368782478097157 (32)

Factorization of P6949:
15123153541573267369851921898473478325629847792955472730176730452588102666763538338310625 (89) = 
5^4 * 7^2 * 137 * 443 * 45574817 (8) * 4484608267452756383 (19) [ecm] * 39810031756090469674611803023987830769334090358594853 (53)

Factorization of P6950:
15355418423105477418804661028967422219004232193429939603226749468794718604239821842168049 (89) = 
196613 (6) * 21397224844681292699 (20) [ecm,sigma=1714299060] * 6145879821980077245307544145756817 (34) * 593892596289158232375169030231 (30)

Factorization of P6951:
15591233547469613152493923421481275650815395576739109176731556495986264305036141026886642 (89) = 
2 * 11^2 * 164683 (6) * 2645581 (7) * 147875177289938165121677831764926297943279679683409005502337175669073826287 (75)

Factorization of P6952:
15830652923679904768928181318931574738788664891345297612818996081021216380216229262495814 (89) = 
2 * 3 * 197 * 248293 (6) * 10146432151 (11) * 139481791820704879669688061296513505159649 (42) * 38114129177561574356879366111 (29)

Factorization of P6953:
16073731378477941016235575595523364026368027891616951470140763672698054280411362806755750 (89) = 
2 * 5^3 * 64294925513911764064942302382093456105472111566467805880563054690792217121645451227023 (86)

Factorization of P6954:
16320524568654786556394528157533304157587377878048114979618704226044055273139749417620895 (89) = 
5 * 39839 * 84463 * 970038960921564628151409963655107338666620049910312957395053053450457121510147 (78)

Factorization of P6955:
16571088993557897293475226623111206028667266020936592560071666160724495095616549567872239 (89) = 
3 * 17 * 12413 * 38113481727747582961747407605317501 (35) [ecm,sigma=632542962] * 686792421266833286715504876738701829906847599853 (48)

Factorization of P6956:
16825482007785591986044954162214265728987277316432656954717443130641807529341975229105890 (89) = 
2 * 5 * 7^2 * 67 * 563 * 93283 * 206777186995937 (15) [ecm] * 47193600236348622048860811882548845376783774692623026128108871 (62)

Factorization of P6957:
17083761834071879439257632111833026370805536432350515231748076772427287981345117875515900 (89) = 
2^2 * 5^2 * 6029561 (7) * 1424628774199 (13) [phi1] * 19888228600906961283285060348556245268734529332954455243816568496681 (68)

Factorization of P6958:
17345987576364482153842159181228123412782436079534725265677863027625579716366634165094483 (89) = 
11 * 47 * 673 * 2029 * 2050991537113119183360825906064113735371 (40) * 11979743193007115364992656305681212276057 (41)

Factorization of P6959:
17612219233098939505639859618645895132612774410000089641145340124834994672353366033623275 (89) = 
5^2 * 149 * 211 * 72421 * 331827568729645138973226614517992975503 (39) * 932456043539096748686935747211730856583 (39)

Factorization of P6960:
17882517710671716349563842143936716345304572952979059524533613400426212015824080582209105 (89) = 
3^4 * 5 * 32092783 (8) * 2150958658237061032492270377803 (31) * 639637913271614558360601172153615322274482903209 (48)

Factorization of P6961:
18156944837115286395040030899788339090713978228231325059493179942270031087990192512227456 (89) = 
2^7 * 3 * 139 * 547 * 14753 * 5729778937 (10) * 20155254006575703643543 (23) [phi2] * 365008466728840530229687211638262259728023301 (45)

Factorization of P6962:
18435563375978203795453159496431671237408140877091442023714536165216332054408700741879917 (89) = 
1223 * 8353 * 1768757 (7) * 8875211 (7) * 855085648619 (12) [ecm] * 29000741190530069 (17) [ecm] * 4635770226682107115790188550772085185019 (40)

Factorization of P6963:
18718437040413221141309569603007021380374679495922177586719896806631205091313366494201366 (89) = 
2 * 3 * 7 * 466820281 (9) * 1005575453 (10) * 949414616754039342592582090411346256038337433802035910043048373187011 (69)

Factorization of P6964:
19005630507476557455329013493269458989753081768180814283034036843039377376491897632892560 (89) = 
2^4 * 5 * 1039 * 7365796119836996707 (19) [ecm] * 31042525999718943586827373044834508727879259628004164288849948009 (65)

Factorization of P6965:
19297209432641465867216965174986816169135157691114943671766420965417539731638184621459716 (89) = 
2^2 * 3 * 18211 * 238339 (6) * 3120527 (7) * 3041667126389962513601 (22) [ecm,sigma=1221544492] * 39034150148656053697790416106109376711418808153821 (50)

Factorization of P6966:
19593240464529297406316734652304000191197099117627653357450642052566119588757925308458617 (89) = 
47 * 5127910847 (10) * 81295769199263676428869178029981241147160034094325999499638245764790632167913 (77)

Factorization of P6967:
19893791259861304801710964386178574278642800754333398934372789814945997084188479761537914 (89) = 
2 * 9946895629930652400855482193089287139321400377166699467186394907472998542094239880768957 (88)

Factorization of P6968:
20198930498634478331795453306214994810862601400242332117222758514852246224982100891242317 (89) = 
11 * 4523758724621 (13) [phi1] * 53263374383111988697157 (23) [ecm,sigma=2044860743] * 909224897105729330342817949 (27) * 8381780044328599103632499 (25)

Factorization of P6969:
20508727899524754629194001575192305197277858774734950195730640180553801379477501830543650 (89) = 
2 * 3^2 * 5^2 * 11 * 23 * 229 * 653 * 76157 * 40147379 (8) * 1403852770358603 (16) [ecm] * 280652189985782525957269365541673124422851333998553 (51)

Factorization of P6970:
20823254235520988932581277405876778369500307489908338612947207530446791177885262829749331 (89) = 
7 * 271 * 1381 * 10789 * 23728949858984716301534783 (26) [ecm,sigma=138209668] * 31047588975009106173753254197684813034088727992798509 (53)

Factorization of P6971:
21142581349793131595144830871577899578005403548215796345350304453790683909866564788575078 (89) = 
2 * 3^2 * 163 * 420206919680265540107 (21) [ecm,sigma=910024775] * 31233428632551753608453 (23) [ecm,sigma=148169639] * 549053974543537954787235835518123605260127 (42)

Factorization of P6972:
21466782171798100720815880292925817769850260309073662945925993709328753344282223923497692 (89) = 
2^2 * 13 * 6823 * 15251093982391005001491844502617480795963 (41) * 3967228700595908307221741438894635671668879 (43)

Factorization of P6973:
21795930733626894614957503921087021205034934970012615535087331363890598510125138291900761 (89) = 
45414436544857955245529171364484151 (35) * 479933967959682559518553805883051478708967388870160111 (54)

Factorization of P6974:
22130102186596540317004375477539559797410078044656392897315636247779674207893131982510625 (89) = 
5^4 * 19 * 23 * 63617 * 216512139653 (12) * 15915917535752783076137039842265022907 (38) * 369602455338343214990959937963 (30)

Factorization of P6975:
22469372818090527839848369491076079293749782772867441553580348052679562335002521983708741 (89) = 
7 * 2803 * 1145169604917717131636938458339334350631964872986465600814451253895293936853499922721 (85)

Factorization of P6976:
22813820068651433885971966429583750718016060296271306522971672493694690574330932714940713 (89) = 
17 * 121397186791599675424068301 (27) [ecm,sigma=610496646] * 11054534715922158439621142601757247236178146299461113963988989 (62)

Factorization of P6977:
23163522549329493755026091680169390046435472492480393177997800087001415461496634915588543 (89) = 
7^3 * 41 * 51336687686713381 (17) [ecm] * 139118387386346005789 (21) [ecm,sigma=1994545506] * 230629176903939765983090801169716297034772073729 (48)

Factorization of P6978:
23518560059290935913479888605545401887694034879484487412164598342186983637471737630831839 (89) = 
429161 (6) * 17633149 (8) * 227942989 (9) * 1537019922883 (13) [phi1] * 507776823367546602370373 (24) [ecm,sigma=147593425] * 17469561029201343388333364911601 (32)

Factorization of P6979:
23879013603689950276057860942237813771234597653511858742044132676649463949697563087097095 (89) = 
5 * 7057 * 38333 * 1327618189 (10) * 178292762163889 (15) [ecm] * 625040498959 (12) [ecm] * 119326907905634891188086305770269062832305341 (45)

Factorization of P6980:
24244965411808218663020076635327261180884871390131874445230616764860965582931921139093134 (89) = 
2 * 7 * 11^2 * 53657 * 73136942072270444021 (20) [ecm,sigma=694844431] * 6512197616076053207 (19) [ecm] * 560037884600769697606180949170908545168059 (42)

Factorization of P6981:
24616498955465994159205840737271012138051895258190345352557823479042784937759269504939724 (89) = 
2^2 * 6047 * 39608152318374142286355031 (26) [ecm,sigma=1761218360] * 25694592989334475321732681674345904804752747030745342853083 (59)

Factorization of P6982:
24993698967708775222602014697693114946496299664180033645735403999386316511562682939626087 (89) = 
3181 * 7857182951181633204213145142311573387769977888770837361123987425145022480843345784227 (85)


Factorization of P6983:
25376651461773680384647649113000538473856352442377112088207378198013511698051313136797458 (89) = 
2 * 3 * 173 * 25120276865873934083 (20) [ecm,sigma=795046719] * 973223393615813589950722673798600683346004139261326103248539117477 (66)

Factorization of P6984:
25765443750339690264365192775180827413335561175969290768938686436386574831920641310304420 (89) = 
2^2 * 5 * 7 * 151 * 335444643150807670568759768609 (30) [ecm,sigma=607766120] * 3633388043959550271525542784067758038204697023775437717 (55)

Factorization of P6985:
26160164465065985396721036829481399342479832356392520397803473727623139156610751860125083 (89) = 
3 * 7 * 17 * 3386271240787 (13) [phi1] * 21639663925385574026798663494997059000377091551734703700449968334771654437 (74)

Factorization of P6986:
26560903576422671065560478385751641575140440624809831081210539644487487209537847206380035 (89) = 
5 * 142619 (6) * 530090492467 (12) * 3066028897707107 (16) [ecm] * 2812423388099678025526610079899 (31) * 8148703096710548584612663 (25)

Factorization of P6987:
26967752413818243946423174088346055423368316948357897359216399254128628630012922508561191 (89) = 
3 * 11 * 227 * 307 * 54150162528340349249784942197408006151324397 (44) * 216554301810995667441882799806597957019 (39)

Factorization of P6988:
27380803686028219918109340255150414443347305847190665740719730614202866238058023147761357 (89) = 
774919 (6) * 61104602037532606108551271020929523743 (38) * 578250427007816016891465812070195343290649621 (45)

Factorization of P6989:
27800151501929407907817437033415857788122980320577609214744941821479536750072493906213980 (89) = 
2^2 * 5 * 7^2 * 977 * 30593 * 438397103464861858815977 (24) [ecm,sigma=1289002003] * 2164894716455499211985497555947456336069785299777212083 (55)

Factorization of P6990:
28225891391544381106995388271277637997330333803809864507442840075558402675158783283432248 (89) = 
2^3 * 3 * 22809999470626874153 (20) [ecm,sigma=485386589] * 51559791112467499723078958332872277206811160044021257899656952559109 (68)

Factorization of P6991:
28658120327400764347928449299916414570268180799309607375637859780472871068226513171629180 (89) = 
2^2 * 5 * 7^2 * 11 * 571 * 35869 * 145577 (6) * 27253360890801733 (17) [ecm] * 32716040046234388909295800535947599866376208026649821059 (56)

Factorization of P6992:
29096936746210024878923901215691410076819849162349959717664654821438686415782209348708516 (89) = 
2^2 * 3019 * 2409484659341671487158322392819759032528970616292643235977530210453683870137645689691 (85)

Factorization of P6993:
29542440570870523233352444728722258891425982281560131744496932869622846386038827675551279 (89) = 
43 * 10787187099361916509695558692602322083912610980361939 (53) * 63689773369073305124118668093351327 (35)

Factorization of P6994:
29994733232799651369588533282576718347037717872083806567599534128282686324945340813385570 (89) = 
2 * 5 * 7 * 1499 * 2377 * 13668983701 (11) * 261508232946788351 (18) [ecm] * 33642987746071909212771100245752086057531952939969387 (53)


Factorization of P6995:
30453917694599956780093493566767301803617967306204027518308652434351558587621703480758677 (89) = 
71 * 113 * 689629406958558725572472041200484813 (36) * 5504154364260958830334865323526892979528044479423 (49)

Factorization of P6996:
30920098473064223843762375463960574121634996106216250637496170172900463672185925008533091 (89) = 
41 * 332154045791 (12) * 12112234035757 (14) [ecm] * 187453352154571475745644940151013108615501566274515334702200873 (63)

Factorization of P6997:
31393381662524557341687164862963624310071489161141343646682245756953505930566169197804837 (89) = 
3^2 * 7 * 127 * 157 * 1709 * 4813 * 4667323 (7) * 1236317353 (10) * 15579557481457 (14) [ecm] * 33797401633196353765462968069578511514954965131 (47)

Factorization of P6998:
31873874958550587788380502193614350595456024794243883638186806464414099987765914021610930 (89) = 
2 * 5 * 7^2 * 281 * 342342809 (9) * 79309883603 (11) * 21027033449476910219900058774463 (32) * 405476731212383813745838835302297 (33)

Factorization of P6999:
32361687682001994064189993418714607900681682864291648963547191368688781658708928014321000 (89) = 
2^3 * 3^2 * 5^3 * 2059856421683329 (16) [phi2] * 2360078662511 (13) [ecm] * 660236507893733 (15) [ecm] * 1120277696049014721625304013395802234077147 (43)
