-- Jun 30, 2018 (Alfred Reich) --

n=21522: c6720(9100000000......) = 2695082195023254663037 * c6699(3376520395......)
# ECM B1=60000, sigma=1:3185636979
n=23034: c6943(1853363934......) = 152503191281985175381726219 * c6917(1215295181......)
# ECM B1=150000, sigma=0:439465567785187354
# 140224 of 200000 Phi_n(10) factorizations were cracked.

-- May 26, 2018 (Alfred Reich) --

n=21418: c10696(3575713257......) = 14175953661207042517 * c10677(2522379335......)
# ECM B1=50000, sigma=0:13052865668694339737

-- Jun 30, 2018 (Sam Wagstaff) --

n=776: c384(9999000099......) = 89889606269073901082901578436277965983883967076039535258233 * p326(1112364433......)
# ECMNET
# 1142 of 200000 Phi_n(10) factorizations were finished.
# 140223 of 200000 Phi_n(10) factorizations were cracked.

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

n=104612: c52304(9900990099......) = 393424510794666483893489 * c52281(2516617502......)
n=104626: c52312(9090909090......) = 6478143790305521 * c52297(1403320053......)
n=104642: c52320(9090909090......) = 563870462441219 * c52306(1612233606......)
n=104644: c52320(9900990099......) = 1413709174465681 * 1432134502481099701 * c52287(4890291441......)
n=104666: c51382(9554192683......) = 3215828401593419 * c51367(2970989583......)
n=104674: c51854(1176240849......) = 332468169160213 * 1491247612995803448053 * c51818(2372446483......)
n=104709: c59739(6818861925......) = 3979074713567595511 * c59721(1713680294......)
n=104715: c51255(2602624535......) = 6090912023194441 * 528071220254424601 * c51221(8091642631......)
# P-1 B1=1e6
# 140222 of 200000 Phi_n(10) factorizations were cracked.

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

n=20820M: c2760(3184844192......) = 273028386000384949808745369301 * c2731(1166488305......)
# ECM B1=170000, sigma=1:498191314

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

n=104518: c52258(9090909090......) = 82104304488962849 * 2293911389005960802983 * c52220(4826860535......)
n=104535: c52787(7420433026......) = 22828041845912161 * c52771(3250577984......)
n=104542: c51788(1052198616......) = 363813829303362077 * c51770(2892134746......)
n=104548: c51236(5967934887......) = 44862685601740309 * c51220(1330266970......)
n=104559: c54996(1621837966......) = 111399459943591 * c54982(1455875969......)
n=104564: c52273(4116883559......) = 10406649882581569 * c52257(3956012362......)
n=104578: c52283(8692862898......) = 14539829278799023 * 36693116602774578091 * c52248(1629367021......)
n=104582: c52275(1497025150......) = 71588130815850809 * c52258(2091163903......)
n=104595: c52687(3169060469......) = 10735795641721 * c52674(2951863630......)
n=104602: c52290(2413422464......) = 875457345890396453339 * c52269(2756756198......)
n=104606: c51806(3431629638......) = 1626346679370571 * c51791(2110023454......)
# P-1 B1=1e6
# 140218 of 200000 Phi_n(10) factorizations were cracked.

-- Jun 29, 2018 (ebahapo) --

# via yoyo@home
n=1321: c1316(2803641369......) = 31337427608867251262904500110595867 * c1281(8946622563......)
# ECM B1=11000000, sigma=0:3388369777661332901

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

n=20350: c7200(9999900000......) = 94822541463412844933530801 * c7175(1054591012......)
# ECM B1=70000, sigma=0:12385246790912203609
n=20400: c5106(5195449113......) = 6823601028180090958012801 * c5081(7613940339......)
# ECM B1=80000, sigma=1:2457724186
n=20698: c10125(3079270082......) = 155600317000213263662167 * c10102(1978961316......)
# ECM B1=60000, sigma=1:2548259794
n=21734: c10857(1401584713......) = 405751383256649242797863 * c10833(3454294356......)
# ECM B1=60000, sigma=0:3421704362434546239
# 140217 of 200000 Phi_n(10) factorizations were cracked.

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

n=104433: c59665(1109999889......) = 6333917554788305077 * c59646(1752469746......)
n=104438: c51455(8125870857......) = 32589736073197 * c51442(2493383450......)
n=104445: c50400(9990000009......) = 150424845671941831 * c50383(6641190134......)
n=104446: c52222(9090909090......) = 1763833920997887637 * c52204(5154061832......)
n=104452: c52205(1450618249......) = 361244930999501 * c52190(4015608593......)
n=104458: c50396(1053044735......) = 753798655179931 * c50381(1396984099......)
n=104464: c52208(3458526990......) = 43224483476689853391649 * c52185(8001314793......)
n=104474: c52225(2698673311......) = 8195187782990167 * c52209(3292997528......)
n=104481: c59605(2400750812......) = 116902671699529 * c59591(2053632117......)
# P-1 B1=1e6
# 140216 of 200000 Phi_n(10) factorizations were cracked.

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

n=104408: c50391(6661637042......) = 277490930605969 * 19722508722163943489 * c50358(1217222625......)
n=104415: c55671(3239441188......) = 73689460888561711 * c55654(4396071228......)
n=104422: c51616(1363471215......) = 1052402769079423 * c51601(1295579273......)
n=104432: c50881(1000000009......) = 79761288634849 * c50867(1253741040......)
# P-1 B1=1e6
# 140213 of 200000 Phi_n(10) factorizations were cracked.

-- Jun 27, 2018 (Alfred Reich) --

n=20538: c5828(2432020352......) = 18884506158388473794496172343354383 * c5794(1287838999......)
# ECM B1=60000, sigma=1:3562737128
n=23358: c7286(3325600817......) = 5501457722241100895216569 * c7261(6044944785......)
# ECM B1=140000, sigma=0:6522747371218723741

-- Jun 26, 2018 (Deltik) --

# via yoyo@home
n=929: c845(1988022166......) = 443771757418389946333550544711719925863831 * c803(4479830303......)
# ECM B1=43000000, sigma=0:9461729732758165730

-- Jun 26, 2018 (Alfred Reich) --

n=22656: c7412(1512999973......) = 13094217981980020606272001 * c7387(1155471808......)
# ECM B1=100000, sigma=0:12407323290587661467
n=22740L: c2992(2981692918......) = 239390435947387459370664901 * c2966(1245535523......)
# ECM B1=100000, sigma=0:7038881256159052958

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

n=104354: c52149(4328543048......) = 663076076775773 * c52134(6527973486......)
n=104372: c51457(1009999999......) = 30762648461293014281129 * c51434(3283202359......)
n=104378: c52176(2779438608......) = 7957179795368052703 * c52157(3492994603......)
# P-1 B1=1e6
# 140212 of 200000 Phi_n(10) factorizations were cracked.

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

n=104306: c52152(9090909090......) = 407794093614757 * 108158013065795761 * c52121(2061140909......)
n=104325: c50860(7953250276......) = 11816890872151 * c50847(6730408499......)
n=104336: c52147(3178582718......) = 99849024420946897 * c52130(3183388858......)
n=104349: c59617(1109999889......) = 546052126188995759719 * c59596(2032772762......)
# P-1 B1=1e6
# 140211 of 200000 Phi_n(10) factorizations were cracked.

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

n=104288: c52128(9999999999......) = 363743795730593 * c52114(2749187784......)
n=104294: c52134(1741193435......) = 5993521135332748354171183 * c52109(2905126045......)
# P-1 B1=1e6
# 140209 of 200000 Phi_n(10) factorizations were cracked.

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

n=104162: c52075(1454608293......) = 2173276266280910299 * c52056(6693158694......)
n=104168: c50177(1000099999......) = 129212579837353 * c50162(7739958456......)
n=104175: c55428(1243313554......) = 53061914141062201 * 164622484528217276511419551 * c55385(1423339834......)
n=104204: c51409(1009999999......) = 2495494835436989 * c51393(4047293489......)
n=104205: c55560(1685438844......) = 255024870253471 * c55545(6608919525......)
n=104206: c52097(8723894835......) = 16816177391809 * 21645457843967 * c52071(2396714841......)
n=104218: c51506(1561453132......) = 337151038062886921 * c51488(4631316402......)
n=104224: c52076(2899825077......) = 16248704974832321 * c52060(1784649965......)
n=104235: c55585(1109988900......) = 2095752833405401 * c55569(5296373132......)
n=104252: c51203(2810926912......) = 111941333425109 * c51189(2511071493......)
# P-1 B1=1e6
# 140208 of 200000 Phi_n(10) factorizations were cracked.

-- Jun 22, 2018 (Alfred Reich) --

n=22288: c9481(8975701086......) = 2014963948836203633600753 * c9457(4454521924......)
# ECM B1=80000, sigma=1:4116326301
n=22502: c11243(1062051755......) = 234518862457401273917349077893 * c11213(4528641084......)
# ECM B1=90000, sigma=1:1386259051
n=22676: c11318(7957267689......) = 8994946171300882726004369 * c11293(8846376106......)
# ECM B1=100000, sigma=1:3524604443

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

n=104086: c51227(3930786600......) = 14556854103095137063 * c51208(2700299509......)
n=104096: c52032(9999999999......) = 15540160918817 * c52019(6434939800......)
n=104114: c52056(9090909090......) = 21728683899157464811 * c52037(4183828681......)
n=104138: c52068(9090909090......) = 2201204305110630041 * c52050(4129970611......)
# P-1 B1=1e6
# 140205 of 200000 Phi_n(10) factorizations were cracked.

-- Jun 21, 2018 (Alfred Reich) --

n=23384: c11214(1671526791......) = 40906102593612860013353 * c11191(4086252869......)
# ECM B1=80000, sigma=1:1053416710

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

n=103996: c51989(1054324347......) = 285373522345129 * c51974(3694541593......)
n=104008: c51993(3204561116......) = 30145889363526645889 * c51974(1063017606......)
n=104012: c52004(9900990099......) = 441326180590735463929 * c51984(2243463119......)
n=104025: c51840(9999900000......) = 113920691656351 * 223878010423801 * c51812(3920862435......)
n=104056: c52024(9999000099......) = 5722194375325817 * c52009(1747406579......)
# P-1 B1=1e6
# 140202 of 200000 Phi_n(10) factorizations were cracked.

-- Jun 20, 2018 (Alfred Reich) --

n=20354: c10176(9090909090......) = 740294249207718852743 * c10156(1228012928......)
# ECM B1=60000, sigma=0:9996576131698466930
# 140199 of 200000 Phi_n(10) factorizations were cracked.

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

n=103916: c51169(1009999999......) = 546903075966422353669 * c51148(1846762332......)
n=103918: c51505(1099999999......) = 713006768020931 * c51490(1542762354......)
n=103929: c58795(2405482575......) = 13996437639401323 * c58779(1718639155......)
n=103954: c51968(2187922631......) = 404632006013715913744099 * c51944(5407191222......)
n=103965: c53300(1110758556......) = 77743380194401 * c53286(1428750015......)
n=103976: c50554(5657976694......) = 23775658315169 * 380682767372881 * c50526(6251228670......)
n=103984: c50672(3746038467......) = 818257532935681 * 1249812898271771521 * c50639(3663002526......)
# P-1 B1=1e6
# 140198 of 200000 Phi_n(10) factorizations were cracked.

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

n=103876: c51928(7844894855......) = 11606938381591241981 * c51909(6758797709......)
# P-1 B1=1e6

-- Jun 19, 2018 (Alfred Reich) --

n=21260L: c4192(9809994809......) = 43885792488624626846159014284725221 * c4158(2235346396......)
# ECM B1=140000, sigma=1:3683898235

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

n=103804: c51900(9900990099......) = 868288210173281 * c51886(1140288441......)
n=103808: c51840(9999999999......) = 68349663643649 * c51827(1463064990......)
n=103828: c51201(1009999999......) = 1950934184363500981 * c51182(5177007036......)
n=103834: c51444(2669146335......) = 158785979867414112328119186601 * c51415(1680971038......)
# P-1 B1=1e6
# 140196 of 200000 Phi_n(10) factorizations were cracked.

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

n=103682: c50693(1099999999......) = 371571439882927 * c50678(2960399756......)
n=103695: c53280(9009099100......) = 16211093326711 * c53267(5557366747......)
n=103718: c51858(9090909090......) = 383392521556222693 * c51841(2371175382......)
n=103719: c53760(9009009910......) = 41688865682311 * c53747(2161011042......)
n=103725: c55190(1112712777......) = 162134137468785151 * c55172(6862914837......)
n=103742: c51870(9090909090......) = 46872444109992243915437 * c51848(1939499691......)
n=103748: c50401(1009999999......) = 1941549624124837091592820526305327246593529 * c50358(5202030313......)
n=103755: c55323(5349060531......) = 35116322991361 * c55310(1523240497......)
n=103761: c58294(1004402614......) = 13148174310517 * c58280(7639103273......)
# P-1 B1=1e6
# 140193 of 200000 Phi_n(10) factorizations were cracked.
# ----------------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=5100L: 185898550709887865845976723509058449254706894935901 (Frank Boerner / Jun 28, 2010)
#   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<----------------

-- Jun 17, 2018 (Alfred Reich) --

n=21100M: c4169(5473051546......) = 11950144912473737020800606901 * c4141(4579903914......)
# ECM B1=130000, sigma=1:845336738

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

n=103593: c59168(7906722512......) = 31265400815383519 * c59152(2528904893......)
n=103605: c55249(1109988900......) = 1529825047103161 * c55233(7255659084......)
n=103618: c51200(1061581370......) = 50964715170763579 * c51183(2082973223......)
n=103624: c51796(1790738195......) = 71802792038129 * c51782(2493967357......)
n=103658: c51828(9090909090......) = 620010386177861281268291029757 * c51799(1466251097......)
n=103677: c59226(3823686981......) = 4986392168589574681 * c59207(7668243597......)
# P-1 B1=1e6
# 140187 of 200000 Phi_n(10) factorizations were cracked.

-- Jun 16, 2018 (Alfred Reich) --

n=20196: c5710(4258739756......) = 46183507067553073501748330449 * c5681(9221343348......)
# ECM B1=60000, sigma=1:3515857074
n=21300M: c2786(1909768319......) = 37279032499404448186941901 * c2760(5122902048......)
# ECM B1=90000, sigma=0:6558615531038286250

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

n=103486: c50790(3685403418......) = 2667646634698873567 * c50772(1381518590......)
n=103492: c51737(7359163668......) = 1230498862008942101 * c51719(5980634274......)
n=103514: c50958(4362530977......) = 129494458683253303162769 * c50935(3368893944......)
n=103552: c51702(2331405322......) = 103100569508737 * c51688(2261292380......)
n=103562: c50753(1099999999......) = 32604209672413 * c50739(3373797466......)
# P-1 B1=1e6
# 140185 of 200000 Phi_n(10) factorizations were cracked.

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

n=103366: c51667(5174528885......) = 435790136249333 * 1125007242079103 * c51638(1055451062......)
n=103388: c51692(9900990099......) = 14103258503629 * c51679(7020356392......)
n=103389: c57595(2178420147......) = 5101946397760350425220649 * c57570(4269782505......)
n=103396: c51696(9900990099......) = 10368191966441687736521 * c51674(9549389258......)
n=103424: c51200(9999999999......) = 88967613469697 * c51187(1124004523......)
n=103438: c51712(2835080342......) = 69718021966811167 * c51695(4066495667......)
# P-1 B1=1e6
# 140184 of 200000 Phi_n(10) factorizations were cracked.

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

n=103256: c51624(9999000099......) = 4069120123329921779761 * c51603(2457288012......)
n=103257: c53264(3628719532......) = 54159742098001 * 2523580722402304951 * c53232(2654969972......)
n=103274: c51629(7042166188......) = 13696933500703 * c51616(5141418104......)
n=103294: c51618(1280800111......) = 8700051870175693 * c51602(1472175259......)
n=103318: c51658(9090909090......) = 154857584435693 * c51644(5870496510......)
n=103323: c60000(9009009009......) = 128072100590000141276791 * c59977(7034325952......)
n=103328: c51638(1876332930......) = 28599913340757370561 * c51618(6560624531......)
n=103335: c54449(1000000000......) = 1536337433487998075192761 * c54424(6508986751......)
n=103341: c54432(9999999000......) = 85141318447115449 * c54416(1174517752......)
n=103346: c51661(9861952539......) = 2748727243598207 * c51646(3587825078......)
# P-1 B1=1e6
# 140181 of 200000 Phi_n(10) factorizations were cracked.

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

n=103214: c51588(4157134688......) = 132738537273809 * c51574(3131821981......)
n=103228: c50961(1009999999......) = 33515753736638961181 * c50941(3013508238......)
n=103232: c51584(9999999999......) = 11770940433409 * c51571(8495497922......)
n=103244: c50545(1009999999......) = 669585363430381 * c50530(1508396173......)
# P-1 B1=1e6
# 140176 of 200000 Phi_n(10) factorizations were cracked.

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

n=103118: c50417(1099999999......) = 68509174792703 * c50403(1605624361......)
n=103126: c51551(1087398607......) = 2541291144669012641 * c51532(4278921797......)
n=103131: c58897(1001000999......) = 32659454538397 * c58883(3064965456......)
n=103148: c50881(1009999999......) = 527165228993476069 * c50863(1915907849......)
n=103154: c51576(9090909090......) = 12294470515512331256103173 * c51551(7394307123......)
# P-1 B1=1e6
# 140173 of 200000 Phi_n(10) factorizations were cracked.

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

n=103084: c51540(9900990099......) = 520736867941729337548801 * c51517(1901342253......)
n=103089: c58897(1109999889......) = 271359361300670016881816317 * c58870(4090516294......)
n=103095: c52405(1709425721......) = 153190443420631 * c52391(1115882742......)
n=103108: c50900(2033480673......) = 101853035928661 * c50886(1996485087......)
# P-1 B1=1e6
# 140169 of 200000 Phi_n(10) factorizations were cracked.

-- Jun 10, 2018 (Alfred Reich) --

n=34984: c17488(9999000099......) = 3403361848021356935761 * c17467(2937977372......)
# ECM B1=26000, sigma=0:4344517147973091859
n=34986: c9408(9999999999......) = 539942057433312367 * c9391(1852050578......)
# ECM
# 140167 of 200000 Phi_n(10) factorizations were cracked.

-- Jun 8, 2018 (Alfred Reich) --

n=23050: c9190(3862373595......) = 2809506058307725768754467651 * c9163(1374751830......)
# ECM B1=150000, sigma=0:12728225497410148318
n=20100M: c2594(7722235415......) = 113885204886129686006138514601 * c2565(6780718727......)
# ECM B1=60000, sigma=0:10409384809868544407

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

n=102946: c51463(9577825420......) = 4351320101168441 * c51448(2201130966......)
n=102968: c50401(1000099999......) = 180432942083497 * 875401144810721 * c50371(6331702287......)
n=102974: c51478(1248176705......) = 8296822381603210573 * c51459(1504403309......)
n=102975: c54881(1000010000......) = 55801882293601 * c54867(1792072164......)
n=102988: c51483(3231397865......) = 47643345107261 * c51469(6782474778......)
n=102999: c59616(9009009009......) = 476395157522516251267 * c59596(1891079047......)
n=103006: c51481(7793667217......) = 189840690720741373 * c51464(4105372345......)
n=103024: c50023(4581568153......) = 318069603306529 * c50009(1440429423......)
# P-1 B1=1e6
# 140165 of 200000 Phi_n(10) factorizations were cracked.

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

n=102824: c51388(4011638803......) = 41771502675169 * c51374(9603769428......)
n=102825: c54715(1620874267......) = 119952609075939592801 * c54695(1351262202......)
n=102826: c51400(1109428769......) = 2088144407966293 * c51384(5312988722......)
n=102832: c51408(9999999900......) = 166433256458567009 * c51391(6008414491......)
n=102837: c57066(6257477959......) = 40655902899529 * c57053(1539131469......)
n=102868: c51432(9900990099......) = 91026230853121 * c51419(1087707357......)
n=102898: c51440(7096284627......) = 664388050005613 * c51426(1068093357......)
n=102921: c52407(4008329242......) = 28649006811517 * c52394(1399116300......)
# P-1 B1=1e6
# 140162 of 200000 Phi_n(10) factorizations were cracked.

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

n=102705: c53105(1134826185......) = 1481416256442508951 * c53086(7660414013......)
n=102711: c57018(1414713016......) = 1034544832488763 * c57003(1367473860......)
n=102722: c51349(1027846206......) = 83896944811369 * c51335(1225129483......)
n=102766: c51382(9090909090......) = 2007814971867571597 * c51364(4527762377......)
n=102812: c51398(2751481858......) = 5850636659112701 * 38325246088455907828589 * c51360(1227096093......)
# P-1 B1=1e6
# 140160 of 200000 Phi_n(10) factorizations were cracked.

-- Jun 7, 2018 (Alfred Reich) --

n=22030: c8809(1099989000......) = 7036592075969256556621561 * c8784(1563241109......)
# ECM B1=130000, sigma=0:1795710450291252565
# 140159 of 200000 Phi_n(10) factorizations were cracked.

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

n=102604: c50625(1009999999......) = 4729732477742244281 * c50606(2135427330......)
n=102614: c51306(9090909090......) = 13738571641933 * c51293(6617070047......)
n=102615: c54699(7344022582......) = 7247085967422041227196191 * c54675(1013375943......)
n=102627: c58321(1000000000......) = 237942071432009157907 * c58300(4202703599......)
n=102628: c51312(9900990099......) = 1036175027503055369 * c51294(9555325921......)
n=102644: c50418(6559885585......) = 2890309701906397648321 * c50397(2269613384......)
n=102663: c57600(9990000009......) = 19054049970764161 * c57584(5242979852......)
n=102686: c51329(9177272020......) = 4285764171097979 * c51314(2141338546......)
# P-1 B1=1e6
# 140158 of 200000 Phi_n(10) factorizations were cracked.

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

n=102514: c51245(2402905490......) = 449827947754169 * c51230(5341832365......)
n=102525: c54634(2032044616......) = 8016267863940343201 * c54615(2534901092......)
# P-1 B1=1e6

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

n=102405: c54601(5704845019......) = 9895347345359539042192858921 * c54573(5765179149......)
n=102417: c58485(3664404225......) = 18041146807111 * c58472(2031137080......)
n=102434: c51204(2104003886......) = 41121231670859 * c51190(5116587712......)
n=102436: c51210(1039305009......) = 2614897133292640698200801 * c51185(3974554089......)
n=102458: c51223(4436385995......) = 1108656429683053 * c51208(4001587757......)
n=102464: c51191(9445920719......) = 54700835621326104961 * c51172(1726832983......)
# P-1 B1=1e6

-- Jun 5, 2018 (WhiteFire) --

# via yoyo@home
n=439: c417(4004180363......) = 4420197369389321682193651680706705688987 * c377(9058827080......)
# ECM B1=260000000, sigma=0:18058967600223373828
n=439: c377(9058827080......) = 221873542765174880268698440076944289246071 * c336(4082878457......)
# ECM B1=260000000, sigma=0:17298367688802026569

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

n=102286: c50668(1641823347......) = 39406533133237 * c50654(4166373484......)
n=102308: c51141(1574928547......) = 2345949424860389 * c51125(6713395144......)
n=102316: c51146(8856739614......) = 742951296999649 * c51132(1192102315......)
n=102328: c51160(9999000099......) = 270337346626849 * 698826793524303193 * c51128(5292745091......)
n=102345: c54568(3765819641......) = 119909894919511 * c54554(3140541190......)
n=102352: c51168(9999999900......) = 599462236441121 * c51154(1668161777......)
n=102376: c50113(5198568484......) = 60384788355817 * c50099(8609069645......)
n=102394: c51178(3196651215......) = 540048649048235291 * c51160(5919191207......)
# P-1 B1=1e6
# 140153 of 200000 Phi_n(10) factorizations were cracked.

-- Jun 3, 2018 (Makoto Kamada) --

n=102148: c51045(6671605639......) = 81043875896801 * c51031(8232091031......)
n=102152: c50618(1208559550......) = 21813124218357950992572769 * c50592(5540515601......)
n=102164: c51080(9900990099......) = 9199940122111319883936001 * c51056(1076201580......)
n=102188: c50106(3294580154......) = 663082562838941233649 * c50085(4968582103......)
n=102201: c58308(2371957629......) = 38153016283933 * c58294(6216959655......)
n=102218: c51102(1434459125......) = 188237135537837 * c51087(7620489554......)
n=102226: c50373(1354460008......) = 4129207529797331 * c50357(3280193593......)
n=102236: c50161(1009999999......) = 2489109950960569 * c50145(4057675313......)
n=102248: c51100(2244173218......) = 321673058294369 * c51085(6976565679......)
n=102249: c58313(4486259779......) = 1633425048837163 * c58298(2746535436......)
n=102266: c51112(1922957981......) = 42825992850143 * c51098(4490165558......)
# P-1 B1=1e6
# 140151 of 200000 Phi_n(10) factorizations were cracked.

-- Jun 2, 2018 (Makoto Kamada) --

n=102039: c56448(9009009909......) = 183515290083772123 * c56431(4909133133......)
n=102056: c51018(2084587271......) = 40028771682920777 * c51001(5207722306......)
n=102064: c51024(9999999900......) = 4542629846268593 * c51009(2201367982......)
n=102094: c51038(1768510405......) = 2890781770152327990023 * c51016(6117758261......)
n=102098: c50241(2407731072......) = 90015838102299491 * c50224(2674786041......)
n=102105: c54419(5218216802......) = 841062295634401 * 5113540258323763192111 * c54383(1213311391......)
n=102118: c51050(3749939818......) = 395654278676754847 * c51032(9477819451......)
n=102123: c58321(1001000999......) = 3418756479182521 * 5289663050104613164269517 * c58280(5535263962......)
# P-1 B1=1e6
# 140149 of 200000 Phi_n(10) factorizations were cracked.

-- Jun 1, 2018 (Alfred Reich) --

n=101704: c50824(3143043156......) = 17609872442625193 * c50808(1784818809......)
# ECM

-- Jun 1, 2018 (Makoto Kamada) --

n=101895: c54337(1109988900......) = 12662898362669761 * c54320(8765678032......)
n=101902: c50930(1396445593......) = 87838380557659 * c50916(1589789776......)
n=101918: c50441(1099999999......) = 107902425300599641 * 19794532884005415649 * c50404(5150106632......)
n=101925: c53988(5467037490......) = 1787086329169951 * c53973(3059190482......)
n=101938: c50952(1211440024......) = 67877055378317743 * 41054721617360114957 * c50915(4347261980......)
n=101968: c50976(9999999900......) = 225816353080868761297 * c50956(4428377202......)
n=101984: c50967(4095847817......) = 276000704895468942113 * c50947(1483999042......)
n=101986: c50974(1595997198......) = 2294304160615249 * c50958(6956345306......)
n=101997: c58249(1001000999......) = 1029620127005979013 * c58230(9722041884......)
# P-1 B1=1e6
# 140146 of 200000 Phi_n(10) factorizations were cracked.