# via Kurt Beschorner
n=32003: c32003(1111111111......) = 44752433366337719635418425431667 * c31971(2482794850......)
# ECM B1=1e6, sigma=2934471607211332
n=55337: c55337(1111111111......) = 46992402339976441856346067 * c55311(2364448412......)
# ECM B1=1e6, sigma=7210886858802239
# 1327 of 300000 Φn(10) factorizations were finished. 300000 個中 1327 個の Φn(10) の素因数分解が終わりました。
# 130 of 25997 Rprime factorizations were finished. 25997 個中 130 個の Rprime の素因数分解が終わりました。
n=12118: c5840(5974987763......) = 283769541439347428049840514527438743 * c5805(2105577551......)
# ECM B1=1.5e6, sigma=8457755426880321
n=12119: c12107(7083284445......) = 1586175574488674253019020557 * c12080(4465637070......)
# ECM B1=1e6, sigma=5424355819946614
n=12127: c11867(1308865671......) = 484381015341399524755306879867 * c11837(2702140732......)
# ECM B1=1e6, sigma=867414565140073
n=12134: c6028(7004153314......) = 2313826073736395901840463687042969 * c5995(3027087210......)
# ECM B1=1e6, sigma=5985808295382385
n=12138: c3264(9999999999......) = 132544170344455895575066766596579 * c3232(7544654716......)
# ECM B1=3e6, sigma=2104812381007890
n=33584: c16780(1488782012......) = 1739068581406664436804284177 * c16752(8560801042......)
# P-1 B1=100e6
n=33585: c17887(1418266116......) = 158835165671109101625271 * c17863(8929169498......)
# P-1 B1=50e6
n=1863: c1161(1332127334......) = 65621053967030030278032678666765356214396871 * c1117(2030030385......)
# ECM B1=30e6, sigma=3990636431393341
n=1868: c854(9524352625......) = 1273247159083037727872305641759112951550672981 * c809(7480364324......)
# ECM B1=43e6, sigma=8168184316954561
n=1891: c1730(4799695219......) = 14764045688817189934865309719992239643928483 * c1687(3250934954......)
# ECM B1=20e6, sigma=8773572821694751
n=12023: c10907(2260751043......) = 503848949065062738693567523271 * c10877(4486961911......)
# ECM B1=1e6, sigma=5478098394647358
n=12025: c8609(5673737382......) = 32417417230964498725173399401 * c8581(1750212653......)
# ECM B1=1e6, sigma=7143038973026063
n=12078: c3559(2598063691......) = 5641363215630632413731581790771943 * c3525(4605382763......)
# ECM B1=3e6, sigma=4559211936310747
n=12083: c11725(2155212524......) = 6537293072521298896944283 * x11700(3296796549......)
# ECM B1=1e6, sigma=8501454539169600
n=12083: x11700(3296796549......) = 413670932564244988996645173338485144387 * c11661(7969611326......)
# ECM B1=1e6, sigma=4908902462029792
n=12087: c7489(1001000999......) = 6672064100646552881097758902471 * c7458(1500286845......)
# ECM B1=1e6, sigma=106839095463008
n=12089: c9361(1111110999......) = 15514948341089827268516023609 * c9332(7161551399......)
# ECM B1=1e6, sigma=7339904742803186
n=12091: c11860(2035800608......) = 6199525333482716590744885025693 * c11829(3283800772......)
# ECM B1=1e6, sigma=3943941778212094
n=15093: c9036(4384511546......) = 23788345844813150711586228481 * c9008(1843134270......)
# P-1 B1=550e6
n=15098: c7528(8944751174......) = 1733657569018522357037811573479453712503 * c7489(5159468244......)
# P-1 B1=700e6
n=100682: c50283(1198765836......) = 16514482448539024406797 * c50260(7258876201......)
# P-1 B1=80e6
n=12020L: c2318(1669280064......) = 5927129729595990779226807978094020721 * c2281(2816337993......)
# ECM B1=3e6, sigma=1733734247424251
n=12031: c11731(4365863519......) = 59874773023798190758390512563 * c11702(7291657736......)
# ECM B1=1e6, sigma=1135839981977504
n=12054: c3318(6318041859......) = 14321265067519654392935432158893160849374733099 * c3272(4411650667......)
# ECM B1=3e6, sigma=1484744847755487
n=12059: c11640(9000000000......) = 216715947375345172042633246277 * c11611(4152901578......)
# ECM B1=1e6, sigma=2034964677036868
n=12069: c7976(1299168059......) = 1337569341662579206250374813 * x7948(9712902495......)
# ECM B1=1e6, sigma=4544288176877572
n=12069: x7948(9712902495......) = 432340422496650699549485584879 * c7919(2246586715......)
# ECM B1=1e6, sigma=6521220082461810
n=12071: c12048(3059157864......) = 80499647484101348167799941717 * c12019(3800212746......)
# ECM B1=1e6, sigma=5190152304928739
n=12072: c3947(1027917069......) = 1011674937383879947534793401541386057 * c3911(1016054694......)
# ECM B1=3e6, sigma=5358427617299025
n=12073: c12040(3074130239......) = 1681779199059947543250257286751 * c12010(1827903592......)
# ECM B1=1e6, sigma=6507687772168919
n=33572: c12928(3925412748......) = 146339316647636822538520023949 * c12899(2682404728......)
# P-1 B1=80e6
n=33575: c24924(4454926871......) = 8503366064194011120401 * c24902(5239015747......)
# P-1 B1=35e6
n=100689: c67113(1118248000......) = 24266685111684082489489 * c67090(4608161335......)
# P-1 B1=35e6
n=100697: c99577(3664950754......) = 40884705512444912399 * c99557(8964111905......)
# P-1 B1=35e6
n=100700L: c18708(3608882551......) = 150468245489588431514801 * c18685(2398434659......)
# P-1 B1=80e6
n=100711: c90705(1016778896......) = 452049063792720609151 * c90684(2249266678......)
# P-1 B1=35e6
n=100714: c48946(6156445071......) = 52812755786099226601 * c48927(1165711764......)
# P-1 B1=80e6
n=100720: c40257(1000000009......) = 948426247608507678804265293955712641 * c40221(1054378252......)
# P-1 B1=80e6
n=100722: c33548(3173772477......) = 52189978457599534922173093 * c33522(6081191391......)
# P-1 B1=80e6
n=100725: c49912(7442220755......) = 10151653870019894646411190962751 * c49881(7331042656......)
# P-1 B1=35e6
n=100726: c50362(9090909090......) = 108932553815164248052950809 * x50336(8345447501......)
# P-1 B1=80e6
n=100726: x50336(8345447501......) = 1602529010027853783042126711481 * c50306(5207673277......)
# P-1 B1=80e6
n=100727: c91560(9000000000......) = 911876032809122852634791 * c91536(9869762639......)
# P-1 B1=35e6
# via yoyo@home
n=1560: c311(3090028118......) = 2303737084496179509862982171386156189854552565653639960837121 * p251(1341311098......)
# ECM B1=2900000000, sigma=0:13868635003750328954
# 1325 of 300000 Φn(10) factorizations were finished. 300000 個中 1325 個の Φn(10) の素因数分解が終わりました。
n=295209: c196792(1254278416......) = 8558672272685569 * x196776(1465505836......)
n=295245: c157464(9999999999......) = 1353072055439431 * x157449(7390589407......)
n=295105: c236062(4422483168......) = 6509126135244431 * x236046(6794280948......)
n=295117: c293417(3462318184......) = 6382613330250049 * x293401(5424609020......)
n=295127: c238889(2689184153......) = 3006884839786759 * x238873(8943422501......)
n=295191: c175385(1355054844......) = 6270904077893443 * x175369(2160860423......)
n=295009: c247441(1111111111......) = 4386673965108293 * x247425(2532923850......)
n=295009: x247425(2532923850......) = 6675968916864391 * x247409(3794091737......)
n=294917: c252780(9000000900......) = 7528650353817041 * x252765(1195433507......)
n=294925: c229992(5969588795......) = 2778464486527601 * x229977(2148520819......)
n=294933: c185017(8181666006......) = 2472137325363787 * x185002(3309551586......)
n=294963: c196628(1230664447......) = 1994027424002923 * x196612(6171752867......)
n=1857: c1175(3185582769......) = 92210148513068942436013633452031685683 * c1137(3454698664......)
# ECM B1=30e6, sigma=3101056640734712
n=4260L: c553(6633009548......) = 163507298295479102139017319338546225954464493641 * c506(4056705491......)
# ECM B1=43e6, sigma=2276044753
n=10134: c3352(1219807588......) = 44531338664247612524328560744867479388263 * c3311(2739211586......)
# ECM B1=3e6, sigma=5389112932797187
n=10340L: c1808(1135339466......) = 297517376949199017896261678178051095256170821 * c1763(3816044219......)
# ECM B1=5e6, sigma=8514155822349833
n=12036: c3661(5261090946......) = 40294487243445989319601814435389 * c3630(1305660229......)
# ECM B1=2e6, sigma=4068048775403518
n=12040: c3984(3179468927......) = 984956165193549779438894283160679201 * c3948(3228030890......)
# ECM B1=2e6, sigma=1447753526051050
n=100680: c26816(9999000100......) = 287281875615891362474641 * c26793(3480553751......)
# P-1 B1=80e6
n=100683: c60481(1000000000......) = 4516513320397565521 * x60462(2214097311......)
# P-1 B1=35e6
n=100683: x60462(2214097311......) = 14919483380463482402434434121 * c60434(1484030817......)
# P-1 B1=35e6