-- Sep 30, 2018 (Makoto Kamada) --

n=111442: c55720(9090909090......) = 105560324245608209 * c55703(8612051124......)
n=111478: c55201(1099999999......) = 31056597717007 * 2453438046912059 * c55172(1443655975......)
n=111484: c54465(1009999999......) = 686633705593992449 * c54447(1470944394......)
n=111488: c50689(1000000000......) = 2342406433010844929 * c50670(4269113958......)
n=111502: c55261(8290713329......) = 1924174147376903 * c55246(4308712566......)
# P-1 B1=1e6
# 140487 of 200000 Phi_n(10) factorizations were cracked.

-- Sep 29, 2018 (Makoto Kamada) --

n=111352: c53755(2993800459......) = 3135180023120377 * c53739(9549054399......)
n=111358: c51372(3597772878......) = 663054387513576943 * c51354(5426059982......)
n=111364: c50601(1009999999......) = 27197610860509 * c50587(3713561478......)
n=111375: c53991(5205029356......) = 65702863908001 * 1442078516859751 * c53962(5493510714......)
n=111382: c55675(1102487841......) = 2803956452629333361441 * c55653(3931900728......)
n=111404: c55700(9900990099......) = 8107731433520909 * c55685(1221178843......)
n=111406: c54601(1099999999......) = 1857032355589641831893 * c54579(5923429372......)
n=111416: c52705(1000099999......) = 199809571008355673 * c52687(5005265738......)
n=111418: c50160(2384566337......) = 76862792399903 * c50146(3102367560......)
n=111422: c55710(9090909090......) = 79583562502183 * c55697(1142309894......)
n=111428: c54894(5710669371......) = 273679308637741 * c54880(2086628105......)
n=111435: c50689(1109988900......) = 618227359797451681 * c50671(1795438009......)
# P-1 B1=1e6
# 140483 of 200000 Phi_n(10) factorizations were cracked.

-- Sep 28, 2018 (Makoto Kamada) --

n=111274: c51020(1344841138......) = 69576720938339 * c51006(1932889507......)
n=111284: c54265(1009999999......) = 173840366143137645103381 * c54241(5809927937......)
n=111285: c59329(1001000999......) = 137224594393389815108761 * 313806808127731623177601 * c59282(2324556968......)
n=111292: c55644(9900990099......) = 91377382698629 * c55631(1083527433......)
n=111322: c55653(5631943450......) = 17454093848413251128371 * c55631(3226717754......)
n=111338: c55181(1099999999......) = 419186349735521 * c55166(2624131250......)
# P-1 B1=1e6
# 140477 of 200000 Phi_n(10) factorizations were cracked.

-- Sep 27, 2018 (Makoto Kamada) --

n=111236: c55616(9900990099......) = 45970876320022141 * c55600(2153752743......)
n=111248: c52225(1000000009......) = 2145061626191996123041 * c52203(4661870772......)
# P-1 B1=1e6
# 140473 of 200000 Phi_n(10) factorizations were cracked.

-- Aug 31, 2018 (Alfred Reich) --

n=17499: c11017(1109999999......) = 2618174436157591 * c11001(4239595286......)
# P-1 B1=10000000-10000000
# 140471 of 200000 Phi_n(10) factorizations were cracked.

-- Jun 29, 2018 (Alfred Reich) --

n=22735: c18163(1461105432......) = 7121578543593791 * c18147(2051659506......)
# ECM B1=6000, sigma=0:7484317001553911725

-- Jun 28, 2018 (Alfred Reich) --

n=22737: c12480(9009009009......) = 1406396066088157 * c12465(6405741047......)
# ECM B1=21000, sigma=0:10100881924771920564
# 140470 of 200000 Phi_n(10) factorizations were cracked.

-- Sep 27, 2018 (Makoto Kamada) --

n=111208: c55600(9999000099......) = 305609339492711521 * c55583(3271824125......)
# P-1 B1=1e6
# 140469 of 200000 Phi_n(10) factorizations were cracked.

-- Sep 26, 2018 (Makoto Kamada) --

n=111106: c54696(2114029802......) = 13497347089805503 * c54680(1566255789......)
n=111111: c51830(1249550836......) = 7818331186105441 * 1302068666219587267 * c51796(1227456127......)
n=111124: c51265(1009999999......) = 63924882426289 * c51251(1579979440......)
n=111128: c53510(3519908371......) = 52765669011665921 * c53493(6670830556......)
n=111136: c52801(1000000000......) = 17938355503122456449 * c52781(5574647017......)
n=111152: c55568(9999999900......) = 18570027256129 * c55555(5385021659......)
n=111158: c55578(9090909090......) = 896026071390419 * c55564(1014580867......)
n=111165: c59281(1109988900......) = 313352995851704455681 * c59260(3542295477......)
n=111178: c55580(5702158744......) = 23374256169721 * 255949718028859 * c55552(9531183892......)
n=111182: c53124(2676090885......) = 17720249888662037 * c53108(1510188006......)
n=111184: c55578(8994091691......) = 12183567180481 * c55565(7382149708......)
# P-1 B1=1e6
# 140468 of 200000 Phi_n(10) factorizations were cracked.

-- Sep 25, 2018 (Makoto Kamada) --

n=111068: c55532(9900990099......) = 63633901433490049 * c55516(1555930074......)
n=111105: c59185(1000000001......) = 8510521882345392961 * c59166(1175016074......)
# P-1 B1=1e6
# 140463 of 200000 Phi_n(10) factorizations were cracked.

-- Sep 24, 2018 (Makoto Kamada) --

n=110966: c54881(1099999999......) = 97488539498895161 * c54864(1128337757......)
n=111002: c55493(5687402855......) = 851810874110081117 * c55475(6676837580......)
n=111008: c55488(9999999999......) = 3471468873424001 * c55473(2880624993......)
n=111014: c54281(1099999999......) = 49309185633703687 * c54264(2230821673......)
n=111015: c59185(1001000999......) = 17772125802121 * c59171(5632421304......)
n=111016: c55504(9999000099......) = 197526116149578683153216311337 * c55475(5062115478......)
# P-1 B1=1e6
# 140461 of 200000 Phi_n(10) factorizations were cracked.

-- Sep 23, 2018 (Makoto Kamada) --

n=110872: c55405(6535590780......) = 599605788062130953 * c55388(1089981269......)
n=110884: c52489(1009999999......) = 340043600192217889969 * c52468(2970207348......)
n=110888: c54449(1000099999......) = 16094307162929 * c54435(6213998464......)
n=110895: c59137(1109988900......) = 39293504018025841 * c59120(2824866164......)
n=110906: c53009(3471451786......) = 17249539712779681 * 490427527930397446967 * c52972(4103541101......)
n=110912: c55424(9999999999......) = 3372347878549889 * c55409(2965293131......)
n=110918: c53641(1099999999......) = 29653989635917 * c53627(3709450274......)
n=110924: c50401(1009999999......) = 518912058052081 * 24359226703145887961 * c50366(7990318922......)
n=110925: c53750(2840027814......) = 20918234454543001 * c53734(1357680458......)
# 140456 of 200000 Phi_n(10) factorizations were cracked.

-- Sep 22, 2018 (Alfred Eichhorn) --

# via Kurt Beschorner
n=25037: c25037(1111111111......) = 811768176143826688793987 * c25013(1368754213......)
# ECM B1=5e4, sigma=11091549647073987954
# 140450 of 200000 Phi_n(10) factorizations were cracked.
# 13858 of 17984 R_prime factorizations were cracked.

-- Sep 22, 2018 (Makoto Kamada) --

n=110788: c55386(8936871468......) = 3345773779028969 * c55371(2671092565......)
n=110798: c55390(4685859314......) = 67916037973409 * c55376(6899488624......)
n=110804: c55394(5256226066......) = 6975318825307169 * c55378(7535463537......)
n=110836: c50161(1000000000......) = 969035037435095052269 * c50140(1031954430......)
n=110842: c54913(1099999999......) = 7201549187410087 * c54897(1527449124......)
n=110846: c52481(7088340897......) = 6521783748353851 * c52466(1086871501......)
n=110854: c54087(6894776075......) = 378770779658423 * c54073(1820303055......)
# P-1 B1=1e6
# 140449 of 200000 Phi_n(10) factorizations were cracked.

-- Sep 21, 2018 (Makoto Kamada) --

n=110714: c54868(2148459596......) = 31907659626280485346626091 * c54842(6733366289......)
n=110728: c55344(2104466081......) = 3831737103574769 * 127552525823978929 * c55311(4305832813......)
n=110734: c51084(2460109745......) = 69505596294811 * c51070(3539441249......)
n=110744: c54433(1000099999......) = 26684933266553 * c54419(3747807761......)
n=110752: c55335(1982049908......) = 14483576630209 * c55322(1368480976......)
n=110756: c55376(9900990099......) = 118780294683469 * 221658812062021 * c55348(3760531461......)
n=110758: c54601(1099999999......) = 98534830742291 * c54587(1116356512......)
n=110764: c55365(9621736265......) = 343920753307971421 * c55348(2797660848......)
# P-1 B1=1e6
# 140447 of 200000 Phi_n(10) factorizations were cracked.

-- Sep 20, 2018 (Makoto Kamada) --

n=110644: c54642(6085580127......) = 1555997949776447981 * c54624(3911046366......)
n=110648: c55304(3570981858......) = 68824747264195729 * c55287(5188514306......)
n=110654: c54354(7100636023......) = 605621697143071180449881 * c54331(1172454034......)
n=110678: c55317(1297184963......) = 1663046650228047649 * c55298(7800051566......)
n=110686: c55342(9090909090......) = 10805854359272048521 * c55323(8412948008......)
# P-1 B1=1e6
# 140444 of 200000 Phi_n(10) factorizations were cracked.

-- Sep 19, 2018 (Lennox84) --

# via yoyo@home
n=463: c447(4284536158......) = 212135711098934921098108241314382773839707263659206851643 * c391(2019714708......)
# ECM B1=260000000, sigma=0:18442255449381683540

-- Sep 19, 2018 (Makoto Kamada) --

n=110546: c53449(9001271676......) = 11104334645401 * c53436(8106088265......)
n=110554: c54761(1057434329......) = 803326610315749477140877961 * c54734(1316319310......)
n=110576: c55280(9999999900......) = 981163044694513 * c55266(1019198588......)
n=110594: c50145(2382362174......) = 265046485670925154571 * c50124(8988469206......)
n=110602: c52033(1099999999......) = 940412070651721 * 51327224447818127 * c52001(2278907565......)
n=110608: c53281(1000000009......) = 2337592549816810193 * c53262(4277905531......)
# P-1 B1=1e6
# 140443 of 200000 Phi_n(10) factorizations were cracked.

-- Sep 18, 2018 (Loaded) --

# via yoyo@home
n=1202: c525(5467074350......) = 12319072731805329005802468132076248505842564849805129 * c473(4437894368......)
# ECM B1=110000000, sigma=0:14036092255227619769

-- Sep 18, 2018 (Makoto Kamada) --

n=110486: c55222(5176931458......) = 1654704933204277 * 46332280993841849 * c55190(6752555647......)
n=110492: c52788(3708067631......) = 1980600458575301029 * c52770(1872193664......)
n=110494: c54590(5166963383......) = 95896977750592954207 * c54570(5388035686......)
n=110498: c55248(9090909090......) = 136443783555059 * 5432121553161794200690441173007 * c55204(1226546680......)
n=110512: c55248(9999999900......) = 437116655200991199953 * c55228(2287718800......)
n=110518: c55258(9090909090......) = 48971087305597579 * c55242(1856382937......)
# P-1 B1=1e6
# 140440 of 200000 Phi_n(10) factorizations were cracked.

-- Sep 18, 2018 (Kurt Beschorner) --

n=5769: c3812(1173320258......) = 498268955994589849741317466453 * c3782(2354793017......)
# ECM B1=1e6, sigma=3296470939

-- Sep 17, 2018 (pi) --

# via yoyo@home
n=5900M: c1139(6124446911......) = 593243597135622945022444401922545308692618865123732027101 * c1083(1032366289......)
# ECM B1=11000000, sigma=0:12823567598948732363
# ----------------8<----------------8<----------------8<----------------
# Largest known factors that appear after the previous one
#   1  n=604: 188981422179250214477885038956646476812007525220846625175628245017547495717341304519447280552146559165713534073382085460954497219653965265520569 (NFS@Home / Mar 16, 2017)
#   2  n=786: 22470645744200057762885095342697894721605325430609487291715500041029950763944163993319007373686738769124162721892380653 (Serge Batalov and Bruce Dodson / Aug 12, 2009)
#   3  n=1540M: 647799461893729229242068652342456021003805852058736425973158141325454469108253161834095467738437014341 (NFS@Home / Sep 18, 2013)
#   4  n=2340L: 54416219768345058780693800256182138078138198676424989328564702046179663087831396313663972761 (Bo Chen, Wenjie Fang, Maksym Voznyy and Kurt Beschorner / Feb 15, 2016)
#   5  n=2700M: 71618803865606542412383896587352242997259054038820075447553395780556284501401142201 (Bo Chen, Maksym Voznyy, Wenjie Fang, Alfred Eichhorn and Kurt Beschorner / May 7, 2017)
#   6  n=2820M: 832530561417330269513686172453574642103980456844602894975421 (Eric_ch / Aug 23, 2016)
#   7  n=5900M: 593243597135622945022444401922545308692618865123732027101 (pi / Sep 17, 2018)
#   8  n=13980M: 21166873440679239162423181074773929272724025103001 (Kurt Beschorner / Jul 14, 2011)
#   9  n=103748: 1941549624124837091592820526305327246593529 (Makoto Kamada / Jun 18, 2018)
#   10  n=120833: 79670409416595961896605938971188364397 (Maksym Voznyy / Nov 27, 2015)
#   11  n=135070: 9855589830288396166509564150666175361 (Makoto Kamada / Dec 6, 2017)
#   12  n=199700M: 16745944922383579468094190800250901 (Serge Batalov / Jul 6, 2015)
#   13  n=199900L: 612937240365283738637341628923301 (Serge Batalov / Jul 6, 2015)
#   14  n=199940L: 37392384580207183395063521 (Serge Batalov / Jul 6, 2015)
#   15  n=199996: 599236237566764612695261 (Serge Batalov / Jul 7, 2015)
#   16  n=199999: 35434773177895836763 (Serge Batalov / Jul 6, 2015)
#   17  n=200000: 572400001 (Makoto Kamada / Apr 1, 2015)
# ----------------8<----------------8<----------------8<----------------

-- Sep 17, 2018 (Makoto Kamada) --

n=110368: c55168(9999999999......) = 10527039024753697 * c55152(9499347325......)
n=110378: c54708(8359914742......) = 18209413563019277 * c54692(4590985158......)
n=110385: c53266(2660534232......) = 45544991188951 * c53252(5841551756......)
n=110386: c54519(2256216586......) = 55321267656418249 * c54502(4078389164......)
n=110414: c55206(9090909090......) = 99848399542049 * c55192(9104711875......)
n=110416: c53857(1000000009......) = 10744184676977 * c53843(9307360586......)
n=110438: c55213(4115824232......) = 1652686403554801 * c55198(2490384276......)
n=110445: c57016(9899382112......) = 14667849652751193715711 * c56994(6749034348......)
n=110456: c55212(1490097971......) = 1659663514080757433 * c55193(8978313728......)
# P-1 B1=1e6
# 140437 of 200000 Phi_n(10) factorizations were cracked.

-- Sep 16, 2018 (Makoto Kamada) --

n=110288: c53754(4533582786......) = 3523155591796511884399057 * c53730(1286796074......)
n=110294: c55146(9090909090......) = 5022486182638927 * c55131(1810041632......)
n=110313: c58747(1509339321......) = 136668063052711 * c58733(1104383341......)
n=110332: c55156(3387623802......) = 1542582438770101 * c55141(2196073102......)
n=110338: c53810(2686919245......) = 198359787963133 * c53796(1354568520......)
# P-1 B1=1e6
# 140434 of 200000 Phi_n(10) factorizations were cracked.

-- Sep 15, 2018 (CCPLogibro) --

# via yoyo@home
n=1225: c837(1360359134......) = 148034167812084215700206443550170966001 * c798(9189494256......)
# ECM B1=43000000, sigma=0:671077335727112008

-- Sep 15, 2018 (Makoto Kamada) --

n=110212: c54039(5159634581......) = 1506940337972569 * c54024(3423914306......)
n=110234: c55111(2748964808......) = 865534274245860727 * c55093(3176032296......)
n=110246: c54649(1099999999......) = 395808082937009 * c54634(2779124650......)
n=110248: c55120(9999000099......) = 8221171116253273 * c55105(1216250088......)
n=110266: c50881(1099999999......) = 67899356544599893 * c50864(1620044807......)
n=110276: c52201(1009999999......) = 191758487887437769 * c52183(5267041950......)
# P-1 B1=1e6
# 140433 of 200000 Phi_n(10) factorizations were cracked.

-- Sep 14, 2018 (Alfred Eichhorn) --

# via Kurt Beschorner
n=25033: c25033(1111111111......) = 26379408690395699720505923 * c25007(4212039489......)
# ECM B1=5e4, sigma=17699047658806986723
n=50147: c50147(1111111111......) = 84543021478589310587493493 * c50121(1314255265......)
# ECM B1=5e4, sigma=5370675363275971662
# 140429 of 200000 Phi_n(10) factorizations were cracked.
# 13857 of 17984 R_prime factorizations were cracked.

-- Sep 14, 2018 (Makoto Kamada) --

n=110122: c55048(6634346364......) = 28038142377797 * 856379243897667047 * c55017(2763012004......)
n=110134: c53942(7806477495......) = 73945057926601 * c53929(1055713216......)
n=110144: c55032(3047674990......) = 308702972316161 * c55017(9872515859......)
n=110146: c55061(1515972598......) = 518807636877308577520303 * c55037(2922032156......)
n=110174: c53269(1306847035......) = 20678322945373822171 * c53249(6319888892......)
n=110182: c54369(1255413127......) = 25627427757158237 * c54352(4898709068......)
n=110186: c53550(2036962392......) = 12356124164011 * 295417727644411837 * c53519(5580385400......)
n=110187: c56160(9999999990......) = 75707790599827 * c56147(1320868025......)
n=110188: c50522(1417641845......) = 644996127063289 * c50507(2197907531......)
n=110198: c50069(5233058194......) = 12013499431535449 * c50053(4355981556......)
# P-1 B1=1e6
# 140427 of 200000 Phi_n(10) factorizations were cracked.

-- Sep 13, 2018 (Makoto Kamada) --

n=110024: c51713(1000099999......) = 19047914131993 * c51699(5250443660......)
n=110062: c54427(9994276005......) = 162705927577093 * c54413(6142539583......)
n=110072: c55032(9999000099......) = 4036248919550637798457 * c55011(2477300161......)
n=110078: c52625(1099999999......) = 742634747368609 * c52610(1481212674......)
# P-1 B1=1e6
# 140426 of 200000 Phi_n(10) factorizations were cracked.

-- Sep 12, 2018 (Makoto Kamada) --

n=110006: c50734(3937634895......) = 544717049460744602209 * c50713(7228771157......)
n=110019: c56160(9999999999......) = 9530794076448373 * c56145(1049230517......)
# P-1 B1=1e6
# 140423 of 200000 Phi_n(10) factorizations were cracked.

-- Sep 11, 2018 (Makoto Kamada) --

n=109916: c54956(9900990099......) = 556780343659650374461 * c54936(1778257837......)
n=109924: c54960(9900990099......) = 40576284126442849 * c54944(2440092855......)
n=109954: c50737(1099999999......) = 32415188298899407 * c50720(3393470955......)
n=109958: c54978(9090909090......) = 27715199977068853 * c54962(3280116722......)
# P-1 B1=1e6
# 140422 of 200000 Phi_n(10) factorizations were cracked.

-- Sep 10, 2018 (Makoto Kamada) --

n=109808: c54896(9999999900......) = 81886627250755489 * c54880(1221200608......)
n=109814: c54906(9090909090......) = 15054148687801 * c54893(6038806497......)
n=109822: c53587(2504046311......) = 185107681491461087 * c53570(1352751161......)
n=109826: c54202(1517551797......) = 143777442966791383703 * c54182(1055486706......)
n=109832: c54905(8056551771......) = 320175729800296834553 * c54885(2516290593......)
n=109845: c58552(8151028488......) = 54380625827401 * c58539(1498884642......)
n=109862: c54433(1099999999......) = 1540468403564677637887 * c54411(7140685245......)
n=109864: c53030(4291695727......) = 42840467367193 * 1407262192401601 * c53001(7118683814......)
n=109874: c54391(1442221311......) = 862241347618546699 * c54373(1672642254......)
n=109875: c58394(3792186654......) = 22911627459751 * c58381(1655136310......)
n=109876: c50674(2512744894......) = 2233876685989407941 * c50656(1124835990......)
n=109888: c51190(1958753895......) = 204447486181249 * c51175(9580718902......)
n=109892: c54121(1009999999......) = 376907394673709 * 63907905242448046541 * c54086(4193070197......)
n=109904: c54939(4549404210......) = 1444729250258209 * c54924(3148966638......)
# P-1 B1=1e6
# 140418 of 200000 Phi_n(10) factorizations were cracked.

-- Sep 9, 2018 (Makoto Kamada) --

n=109724: c54854(3007846077......) = 1542501800209652832769 * c54833(1949978974......)
n=109726: c54121(1099999999......) = 10779300264208664561 * c54102(1020474402......)
n=109738: c54868(9090909090......) = 17123392418681 * c54855(5309058432......)
n=109744: c51978(7009314678......) = 18743652065885921 * c51962(3739567216......)
n=109755: c58301(6246002370......) = 76537922908726801 * c58284(8160663541......)
n=109756: c52443(3067400818......) = 11252289796492321 * c52427(2726023657......)
n=109792: c52981(6381326929......) = 2431356540070144339930913 * c52957(2624595292......)
n=109796: c54885(1410191787......) = 182184528663875149 * c54867(7740458519......)
n=109804: c54136(4380098893......) = 6587336475040901 * c54120(6649271537......)
# P-1 B1=1e6
# 140414 of 200000 Phi_n(10) factorizations were cracked.

-- Sep 8, 2018 (Makoto Kamada) --

n=109636: c54809(1497642394......) = 2915649576166995121 * c54790(5136565129......)
n=109642: c50593(1099999999......) = 14587302951517063 * c50576(7540804517......)
n=109652: c53969(5293653920......) = 51222592400821 * c53956(1033460758......)
n=109654: c54217(1099999999......) = 51769133920328375258489 * c54194(2124818239......)
n=109658: c54818(4403587526......) = 14077863226103 * c54805(3128022666......)
n=109706: c51931(1329156047......) = 53224610364917 * c51917(2497258389......)
# P-1 B1=1e6
# 140412 of 200000 Phi_n(10) factorizations were cracked.

-- Sep 4, 2018 (Alfred Reich) --

n=20386: c10182(8140050617......) = 491022932445115589240182891 * c10156(1657774022......)
n=20606: c10269(9434761926......) = 4300746464765407224366047 * c10245(2193749853......)
n=21478: c10713(1750378764......) = 751985330931333459031129 * c10689(2327676741......)
n=23596: c11066(2377991943......) = 138405051430533075520700161 * c11040(1718139561......)
n=23622: c7539(3755183242......) = 433728337031543509836737053 * c7512(8657915386......)
# ECM

-- Sep 7, 2018 (Makoto Kamada) --

n=109568: c54272(9999999999......) = 751436674753537 * c54258(1330784128......)
n=109575: c58321(1000000000......) = 418863728893659326398351 * c58297(2387411301......)
n=109598: c54798(9090909090......) = 60270404182237 * c54785(1508353762......)
n=109628: c54803(5055383589......) = 3213533640404389 * c54788(1573154089......)
# P-1 B1=1e6
# 140410 of 200000 Phi_n(10) factorizations were cracked.

-- Sep 6, 2018 (Makoto Kamada) --

n=109468: c54710(3281611441......) = 21295095521126058047569 * c54688(1541017479......)
n=109474: c54173(1778415535......) = 16402136307857601605047 * c54151(1084258478......)
n=109486: c50521(1099999999......) = 3731787845165466659 * c50502(2947648809......)
n=109526: c52354(4782510966......) = 554242276807572247 * 3343790496815435078813 * c52315(2580579632......)
n=109528: c54760(9999000099......) = 140989159956713 * c54746(7092034666......)
n=109534: c54760(2074905284......) = 27479657707921 * 20802501824463449 * c54730(3629705497......)
# P-1 B1=1e6
# 140407 of 200000 Phi_n(10) factorizations were cracked.

-- Sep 5, 2018 (Deltik) --

# via yoyo@home
n=947: c899(1538873644......) = 48654367388531252592760353317455806428703907 * c855(3162868468......)
# ECM B1=43000000, sigma=0:3047487473098335725

-- Sep 5, 2018 (Makoto Kamada) --

n=109372: c53137(1009999999......) = 129315097634942881 * c53119(7810379595......)
n=109412: c51457(1009999999......) = 129030498866701 * 246796499496961 * c51428(3171684661......)
n=109418: c54686(1297288167......) = 90230555624783687 * c54669(1437748176......)
n=109425: c58321(1000010000......) = 16888766814695401 * c58304(5921154641......)
n=109432: c54695(7264514041......) = 33090847103443673 * c54679(2195324289......)
# P-1 B1=1e6
# 140405 of 200000 Phi_n(10) factorizations were cracked.

-- Sep 4, 2018 (Makoto Kamada) --

n=109336: c53665(1000099999......) = 9980729499216880049 * c53646(1002030963......)
n=109342: c52265(1842523441......) = 84914129680573 * c52251(2169866720......)
n=109346: c54662(2280584247......) = 7530083268150103 * c54646(3028630848......)
n=109348: c54672(9900990099......) = 10316975052161 * c54659(9596795619......)
n=109358: c54678(9090909090......) = 124153160764601893 * c54661(7322333990......)
# P-1 B1=1e6
# 140402 of 200000 Phi_n(10) factorizations were cracked.

-- Sep 2, 2018 (Alfred Reich) --

n=109154: c54562(3411792888......) = 1898378954458000569491 * c54541(1797213817......)
# P-1 B1=5000000-5000000