-- Apr 30, 2018 (Makoto Kamada) -- n=180330: c48075(1261586866......) = 22409024074958321497200811 * c48049(5629816194......) n=180360: c47802(3960331733......) = 15420201612534001 * c47786(2568274937......) n=180480: c47104(9999999999......) = 2930949777510272084984133121 * c47077(3411863306......) n=180642: c42229(4214708896......) = 2677746155190855211 * c42211(1573976266......) n=180750: c48000(9999999999......) = 311850775800246136619251 * c47977(3206661896......) n=180810: c40305(1058256955......) = 2359582978196147111731 * c40283(4484932146......) n=180990: c48214(5101345496......) = 10449126076321 * c48201(4882078615......) # P-1 B1=1e6 # 140056 of 200000 Phi_n(10) factorizations were cracked. -- Apr 29, 2018 (Makoto Kamada) -- n=179430: c47833(4528273335......) = 327574814002673469691 * c47813(1382363094......) n=179718: c46547(1080414807......) = 665757692827928444899 * c46526(1622834882......) n=179790: c44144(1162450362......) = 483026070724081 * c44129(2406599628......) n=180000: c47984(1509376270......) = 3836379360754080001 * c47965(3934376994......) # P-1 B1=1e6 -- Apr 28, 2018 (Makoto Kamada) -- n=178650: c47513(6084279068......) = 7622237843920801 * c47497(7982273963......) n=178800: c47360(9999999999......) = 2744595443558556001 * c47342(3643524229......) n=178950: c47663(2001558536......) = 7825667015193451 * c47647(2557684262......) n=179010: c41473(1000000000......) = 1092473984159711011 * c41454(9153536052......) n=179160: c47709(6506597343......) = 13598654276401 * c47696(4784736203......) n=179250: c47565(1826860846......) = 315849664107294001 * c47547(5783956909......) # P-1 B1=1e6 # 140054 of 200000 Phi_n(10) factorizations were cracked. -- Apr 27, 2018 (Makoto Kamada) -- n=178170: c47497(1248785482......) = 26811778429100641 * c47480(4657600337......) n=178374: c48961(1098900989......) = 87520235707087 * c48947(1255596468......) # P-1 B1=1e6 # 140052 of 200000 Phi_n(10) factorizations were cracked. -- Apr 26, 2018 (Makoto Kamada) -- n=177240: c40313(3358709089......) = 102337552188481 * c40299(3281990840......) n=177366: c48947(2623087068......) = 2938700600232248419 * c48928(8926009912......) n=177600: c46056(2560186859......) = 2657622068207224262401 * c46034(9633374475......) n=177786: c47217(7092001592......) = 26047066168977122809 * c47198(2722764071......) # P-1 B1=1e6 -- Apr 25, 2018 (Alfred Reich) -- n=20706: c5367(2131373290......) = 12115439461901181343801249 * c5342(1759220783......) # ECM n=20710: c7747(2892854744......) = 33681749528676507975641 * c7724(8588790028......) # ECM B1=10000, sigma=0:7279726480778949511 n=20984: c10044(6902099027......) = 7948232348169402458149489 * c10019(8683816381......) # ECM B1=10000, sigma=0:280362081807912795 n=21116: c10537(1777140896......) = 894712208362596394695181 * c10513(1986270982......) # ECM B1=10000, sigma=0:9583970994086924641 n=21364: c9049(7878025216......) = 94554096068298329 * c9032(8331765141......) # ECM B1=10000, sigma=0:14699418578097192552 n=21532: c9211(1876273683......) = 821325626199853700801 * c9190(2284445563......) # ECM B1=10000, sigma=0:17415044277115445310 n=21544: c10744(4045942413......) = 5702670608026658674537 * c10722(7094820464......) # ECM B1=10000, sigma=0:15812841856674000338 n=21604: c9785(9624671700......) = 297567566537250175321 * c9765(3234449174......) # ECM B1=10000, sigma=0:10114086053113944518 n=21692: c8939(8593857073......) = 1775093631136786049 * c8921(4841354237......) # ECM B1=10000, sigma=0:2477078368903200817 n=21756: c6024(6102736834......) = 72048017594759774401 * c6004(8470374395......) # ECM B1=10000, sigma=0:14719737185850978187 n=21934: c9949(3375928303......) = 94467599035090362929 * c9929(3573636185......) # ECM B1=10000, sigma=0:3512238664586920337 n=21970: c8082(1330148096......) = 96952179605352842955731 * c8059(1371963066......) # ECM B1=10000, sigma=0:10418852537860437101 -- Apr 25, 2018 (Makoto Kamada) -- n=176430: c47040(9100090999......) = 11082361356907891 * c47024(8211328530......) n=176760: c47029(1438403720......) = 40011512727981419281 * c47009(3594974601......) n=176904: c46651(1884257593......) = 58247043433489 * 1118383272003817 * c46622(2892515704......) n=177120: c46050(8115807534......) = 794581387747755841 * c46033(1021394115......) n=177156: c46657(1000000999......) = 12766906518926869 * c46640(7832758848......) # P-1 B1=1e6 # 140051 of 200000 Phi_n(10) factorizations were cracked. -- Apr 24, 2018 (Alfred Reich) -- n=17582: c8568(1504116627......) = 2257193127811336711831859 * c8543(6663659430......) # ECM B1=250000, sigma=1:1485525782 n=20324: c10117(1565513675......) = 653809618076468812799369 * c10093(2394448831......) # ECM B1=10000, sigma=0:15820992524885336984 n=20458: c9970(1864957783......) = 24091891989660928859 * c9950(7741018364......) # ECM B1=10000, sigma=0:781749477540018291 n=20558: c9693(3800421694......) = 787721765154552614653691 * c9669(4824573678......) # ECM B1=10000, sigma=0:9178654038120097162 n=22222: c10779(1629297787......) = 14345355247439874797677 * c10757(1135766775......) # ECM B1=10000, sigma=1:1856029582 n=22258: c10702(2809415132......) = 327890874029714288075661226333 * c10672(8568140669......) # ECM B1=20000, sigma=1:2058789198 n=22290: c5860(1090151515......) = 868596709688975089561 * c5839(1255072121......) # ECM B1=10000, sigma=1:582124355 n=22418: c10166(2802712734......) = 60377839657940065333447 * c10143(4641955972......) # ECM B1=10000, sigma=1:2366601415 n=22624: c9593(2322692991......) = 2666258708837027978017 * c9571(8711431429......) # ECM B1=20000, sigma=1:646509535 n=22772: c11331(6038229211......) = 10890590289853876265089 * c11309(5544446215......) # ECM B1=20000, sigma=0:1914985955656789570 n=22960: c7620(3256262690......) = 299832067199964754561 * c7600(1086028829......) # ECM B1=10000, sigma=0:8256591407602975238 n=23094: c7655(1065663244......) = 10233975495121702561 * c7636(1041299390......) # ECM B1=10000, sigma=1:1989805107 n=23262: c7730(3823064490......) = 143076690602532190333 * c7710(2672038663......) # ECM B1=20000, sigma=1:1290935390 n=23310: c5150(3247022395......) = 42942421384135238971531 * c5127(7561339791......) # ECM B1=10000, sigma=1:233840307 n=23368: c11089(1000099999......) = 1783821136870052826457 * c11067(5606503809......) # ECM B1=10000, sigma=1:1095692067 n=23538: c7813(6235829724......) = 59012397901729435837 * c7794(1056698244......) # ECM B1=10000, sigma=0:3005883150330992945 n=23544: c7756(1770604194......) = 288799733448302566537 * c7735(6130906608......) # ECM B1=10000, sigma=0:14390325406992556448 n=23864: c11215(2363000989......) = 1921005480316157769761 * c11194(1230085501......) # ECM B1=20000, sigma=0:10409771549309575684 n=23934: c7934(5896514510......) = 6645762585567080131327 * c7912(8872592775......) # ECM B1=10000, sigma=0:4160445159620645256 n=23956: c11628(1653381456......) = 687167542859344887169 * c11607(2406082001......) # ECM B1=10000, sigma=0:6123295573616714527 # 140049 of 200000 Phi_n(10) factorizations were cracked. -- Apr 24, 2018 (Makoto Kamada) -- n=175686: c48553(9688774976......) = 1058826911593880899 * c48535(9150480470......) n=175710: c46823(8110409909......) = 24999059950531 * c46810(3244285955......) n=175830: c46854(1658041811......) = 48617876103544269451 * c46834(3410354264......) n=176022: c45334(2254749236......) = 51097644582814406809 * c45314(4412628517......) n=176040: c46651(2840255509......) = 101896417106374321 * c46634(2787394876......) n=176190: c40225(1098890000......) = 102174731222761 * 1177746439135771 * c40195(9131853120......) n=176250: c45992(8480954883......) = 179937806355001 * c45978(4713270132......) n=176310: c46918(1197886893......) = 754258987534864411 * c46900(1588163898......) # P-1 B1=1e6 # 140048 of 200000 Phi_n(10) factorizations were cracked. -- Apr 23, 2018 (Makoto Kamada) -- n=175200: c46075(1426938603......) = 18997144773251029968844801 * c46049(7511331940......) n=175602: c48377(6075637550......) = 104820117866317058311849 * c48354(5796251400......) # P-1 B1=1e6 -- Apr 22, 2018 (Alfred Reich) -- n=17424: c5259(1821972513......) = 1903704211039592672000929 * c5234(9570670186......) # ECM B1=250000, sigma=0:2514719694566720518 n=17440: c6903(1339056008......) = 2618921931832730492725121 * c6878(5113004676......) # ECM B1=250000, sigma=0:5150108206535731990 n=17444: c7348(2033455629......) = 9259087096670489841663919229 * c7320(2196172914......) # ECM B1=250000, sigma=0:3310283967577577229 n=17480: c6336(9999000099......) = 912766350536517923026481 * c6313(1095461077......) # ECM B1=250000, sigma=0:8484033780618632879 n=17502: c5797(7588006016......) = 139728216142473886138412647 * c5771(5430546689......) # ECM B1=250000, sigma=0:6043933971638820655 n=17506: c8746(7750776569......) = 191778797756359755881 * c8726(4041519010......) # ECM B1=250000, sigma=0:12218412852231090589 n=17604: c5811(4535467221......) = 694362998385279301308589 * c5787(6531838867......) # ECM B1=50000, sigma=0:14172626676582148214 n=17616: c5851(7095771700......) = 4240517195960744247296929 * c5827(1673326948......) # ECM B1=50000, sigma=0:2153205065628938668 # 140047 of 200000 Phi_n(10) factorizations were cracked. -- Apr 22, 2018 (Makoto Kamada) -- n=174390: c46481(1293858859......) = 86693308572933523891 * c46461(1492455278......) n=174468: c47515(5788988244......) = 725535303069145433089 * c47494(7978920143......) n=174480: c46464(9999999900......) = 8008499233017350401 * c46446(1248673391......) n=174594: c49872(9100000909......) = 10265929325352791492140201 * c49847(8864273872......) n=174690: c46489(3135520775......) = 373621329753267927241 * c46468(8392242427......) n=174750: c46400(9999999999......) = 2149093771685251 * c46385(4653124089......) n=174846: c47501(4894875194......) = 335880765403260463 * c47484(1457325246......) n=174888: c49824(9999999999......) = 63083067504828167287009 * c49802(1585211435......) n=174960: c46648(4019403735......) = 3127579635890857603681 * c46627(1285148326......) # P-1 B1=1e6 # 140046 of 200000 Phi_n(10) factorizations were cracked. -- Apr 21, 2018 (Alfred Reich) -- n=17610: c4688(9100090999......) = 407301142150591188121 * c4668(2234241463......) # ECM B1=50000, sigma=0:5574378631890710340 # 140042 of 200000 Phi_n(10) factorizations were cracked. -- Apr 21, 2018 (Makoto Kamada) -- n=173730: c46320(9100090999......) = 680748730741922800239361 * c46297(1336776785......) n=173760: c46068(2058722793......) = 37097502793845121 * c46051(5549491579......) n=173838: c49656(9100000909......) = 5447362444932241 * c49641(1670533400......) n=174216: c46066(3783109778......) = 613092664448713 * c46051(6170535056......) n=174306: c49672(3693284372......) = 239007732680971 * c49658(1545257272......) # P-1 B1=1e6 # 140041 of 200000 Phi_n(10) factorizations were cracked. -- Apr 20, 2018 (Makoto Kamada) -- n=173130: c44327(1669549407......) = 166810563217839451 * c44310(1000865517......) n=173166: c45343(2271784684......) = 64613807428213 * c45329(3515943070......) n=173208: c49421(6078719998......) = 6006476425074721 * c49406(1012027612......) n=173280: c43745(1720902494......) = 7227336319167361 * c43729(2381101997......) n=173316: c47968(4904870721......) = 38229261383064181 * c47952(1283014775......) n=173418: c49527(1663371272......) = 12007172462391499 * 575684453911473458983117 * c49487(2406378542......) n=173550: c42241(1000009999......) = 192896977488703644001 * c42220(5184166247......) n=173586: c49579(2621171839......) = 606739293217391881 * c49561(4320095745......) n=173628: c44915(3967821507......) = 2619361453942505481301 * c44894(1514804878......) n=173640: c46255(2049618960......) = 257214026279281 * c46240(7968534958......) # P-1 B1=1e6 # 140039 of 200000 Phi_n(10) factorizations were cracked. -- Apr 19, 2018 (Makoto Kamada) -- n=172704: c49145(1160371498......) = 2927690212655041 * c49129(3963436751......) n=172746: c49248(9999999990......) = 9876223260920143 * c49233(1012532799......) n=172770: c42433(1098890109......) = 815428490387364677851 * c42412(1347622903......) n=172872: c49376(1404327278......) = 183713790707137657 * c49358(7644103760......) n=172890: c43000(2209850584......) = 80716687008758641 * c42983(2737786529......) # P-1 B1=1e6 # 140038 of 200000 Phi_n(10) factorizations were cracked. -- Apr 18, 2018 (Makoto Kamada) -- n=171930: c41590(1307065329......) = 57844193066185732363411 * c41567(2259631019......) n=171948: c46451(1826774038......) = 32443074424835929 * 744138109763463829 * c46416(7566748188......) n=172032: c49141(2288017939......) = 53788591990833739726849 * c49118(4253723428......) n=172080: c45685(1171067316......) = 10803992586531844321 * c45666(1083920880......) n=172116: c49082(7707921709......) = 57457077841231862352581989 * c49057(1341509523......) n=172530: c45360(9999999999......) = 27611052141382174800362611 * c45335(3621738117......) # P-1 B1=1e6 # 140036 of 200000 Phi_n(10) factorizations were cracked. -- Apr 17, 2018 (Makoto Kamada) -- n=171390: c43887(4763847785......) = 793137681836640961 * c43869(6006331428......) n=171534: c49244(1754437416......) = 1446649642771196293 * c49226(1212759029......) n=171654: c47508(2179711367......) = 6205639660292921505847 * c47486(3512468475......) n=171690: c44523(1700509652......) = 1339762030800091 * c44508(1269262461......) n=171720: c44928(9999999999......) = 149390731151884801 * c44911(6693855718......) n=171750: c45586(6216853686......) = 4257528760096789153743001 * c45562(1460202393......) # P-1 B1=1e6 # 140035 of 200000 Phi_n(10) factorizations were cracked. -- Apr 16, 2018 (Makoto Kamada) -- n=170982: c45937(1000999998......) = 69753282904829606041 * c45917(1435057903......) n=171090: c45589(1706412443......) = 517894577121518281 * c45571(3294903091......) n=171234: c48581(4819499685......) = 50497135882327 * c48567(9544105030......) # P-1 B1=1e6 # 140034 of 200000 Phi_n(10) factorizations were cracked. -- Apr 15, 2018 (Makoto Kamada) -- n=170170: c46080(9091000909......) = 662292752531411 * c46066(1372655955......) n=170184: c48571(2937694120......) = 6597519105360793 * c48555(4452725446......) n=170646: c45686(1257887179......) = 40688740252189815498393296449 * c45657(3091487157......) n=170670: c45491(3254312610......) = 5335941014367811 * c45475(6098854169......) # P-1 B1=1e6 # 140033 of 200000 Phi_n(10) factorizations were cracked. -- Apr 14, 2018 (Makoto Kamada) -- n=169650: c40302(6939159283......) = 44882620526892829051801 * c40280(1546068211......) n=169800: c45120(9999999999......) = 61586612895847649228401 * c45098(1623729497......) n=170142: c48592(1228686918......) = 1844395813963013027053 * c48570(6661731224......) n=170160: c45302(1700547987......) = 13883876123724098289601 * c45280(1224836617......) # P-1 B1=1e6 # 140032 of 200000 Phi_n(10) factorizations were cracked. -- Apr 13, 2018 (Makoto Kamada) -- n=169386: c46633(2564879908......) = 898189070887344595690213 * c46609(2855612466......) n=169494: c49912(3463366348......) = 420571034324402677 * c49894(8234914119......) # P-1 B1=1e6 -- Apr 12, 2018 (Makoto Kamada) -- n=168510: c43521(1098890109......) = 5210189030477830563093978820771 * c43490(2109117545......) n=168546: c48130(2600122023......) = 12025309104733 * c48117(2162208056......) n=168600: c44800(9999999999......) = 79742849904001 * c44787(1254030927......) n=168606: c48368(9701639958......) = 117537138845709844321 * c48348(8254105939......) n=168672: c47988(3905430360......) = 5857730769699649 * c47972(6667138716......) n=168924: c48240(9901000000......) = 1184751566530263755521 * c48219(8357026299......) n=168930: c45012(2762488065......) = 742688578617742301107681 * c44988(3719577956......) n=169008: c48156(1184113282......) = 55408776267830585028360961 * c48130(2137050052......) n=169026: c47033(1675611612......) = 693453843810157 * c47018(2416327528......) # P-1 B1=1e6 # 140031 of 200000 Phi_n(10) factorizations were cracked. -- Apr 11, 2018 (Makoto Kamada) -- n=168252: c48028(2499447206......) = 13592267298169471818229 * c48006(1838874377......) n=168270: c43681(1098890109......) = 2098487568739291 * 74287255658676721 * c43648(7049098011......) n=168360: c42241(1000099999......) = 9021101847533943907140001 * c42216(1108622889......) n=168378: c45347(1157713587......) = 541337102229621811 * 45613630171535905651963477 * c45303(4688551595......) n=168390: c44873(2471942552......) = 97047684169864921 * c44856(2547142235......) # P-1 B1=1e6 # 140028 of 200000 Phi_n(10) factorizations were cracked. -- Apr 10, 2018 (Makoto Kamada) -- n=167454: c47727(7603500454......) = 29663190664279316043733 * c47705(2563278017......) n=167610: c43191(1031178418......) = 1098173261735799360571 * c43169(9389942865......) n=167622: c44059(6555788817......) = 49533141624331 * c44046(1323515650......) n=167664: c47789(1875586312......) = 19512192876042049 * c47772(9612380960......) n=167706: c43549(1161262280......) = 27711869076739 * c43535(4190487033......) n=167748: c47898(2360921772......) = 65146699823709421 * c47881(3624008244......) n=167772: c48001(1009998990......) = 117379940675449 * c47986(8604528032......) n=167874: c47880(9999999000......) = 6384016790103987905849623 * c47856(1566411763......) # P-1 B1=1e6 # 140026 of 200000 Phi_n(10) factorizations were cracked. -- Apr 9, 2018 (Alfred Reich) -- n=17168: c8065(1000000009......) = 3400843228818759452161 * x8043(2940447244......) # ECM B1=250000, sigma=0:4490382732621584140 n=17168: x8043(2940447244......) = 2031812306520759403562417 * x8019(1447204170......) # ECM B1=250000, sigma=0:10362832412269364953 n=17168: x8019(1447204170......) = 51837331952888071286226577 * c7993(2791818398......) # ECM B1=250000, sigma=0:13625694277087047718 # 140024 of 200000 Phi_n(10) factorizations were cracked. -- Apr 9, 2018 (Makoto Kamada) -- n=167010: c42049(1098890109......) = 17231599205845527692641 * c42026(6377180068......) n=167040: c43008(9999999999......) = 257033685606299424001 * 919727236537135270840727642396161 * c42955(4230102672......) n=167118: c45402(1095933092......) = 3028217230620331807 * c45383(3619070261......) n=167244: c43186(1759549726......) = 2107340751548341 * c43170(8349621319......) n=167328: c47232(9999999999......) = 279507453959563155649 * c47212(3577722117......) n=167388: c48385(1009998990......) = 289860640732187953259521 * c48361(3484429577......) n=167400: c43186(8958241995......) = 4258696304563201 * c43171(2103517451......) # P-1 B1=1e6 # 140023 of 200000 Phi_n(10) factorizations were cracked. -- Apr 8, 2018 (Makoto Kamada) -- n=166440: c41442(1089638459......) = 4446777473675281 * c41426(2450400241......) n=166452: c46081(1009998990......) = 1096140169155805489 * c46062(9214140840......) n=166470: c42706(4423151057......) = 92737290697023601 * c42689(4769549578......) n=166572: c47520(9999990000......) = 12805134216841 * c47507(7809359769......) n=166614: c47575(3077723901......) = 58846757747992327 * c47558(5230065375......) # P-1 B1=1e6 # 140019 of 200000 Phi_n(10) factorizations were cracked. -- Apr 7, 2018 (Makoto Kamada) -- n=166056: c46067(7556012622......) = 198604418694529 * c46053(3804554134......) n=166278: c45775(4524162073......) = 179729020245808573 * c45758(2517212894......) n=166296: c49908(1572193277......) = 30235138004372530321 * c49888(5199887883......) # P-1 B1=1e6 -- Apr 6, 2018 (Makoto Kamada) -- n=165570: c44132(1048102016......) = 29921843366761790692891 * c44109(3502798955......) n=165606: c47292(3474310725......) = 1129688636530357 * c47277(3075458682......) n=165732: c47319(7719476371......) = 18992127368298235621 * c47300(4064566449......) n=165816: c46339(1726574477......) = 684375684829201 * c46324(2522846027......) # P-1 B1=1e6 -- Apr 5, 2018 (Makoto Kamada) -- n=164934: c40307(1039602099......) = 1064212563304131775432045687 * c40279(9768744852......) n=164976: c47040(9999999900......) = 16591614543169 * c47027(6027140923......) n=165048: c48567(3925138303......) = 232617412182513259513 * c48547(1687379404......) n=165066: c47985(1240466366......) = 158662180483509847 * c47967(7818286392......) n=165090: c44016(9100090999......) = 159039461515243122875232379441 * c43987(5721907577......) n=165132: c49670(1340303981......) = 576606381872401 * c49655(2324469558......) n=165144: c47127(4337499779......) = 674592613385587681 * c47109(6429806217......) n=165240: c41454(6630901284......) = 82379361580515939601 * c41434(8049226356......) n=165390: c42613(3964359915......) = 159597472676061811 * c42596(2483974118......) # P-1 B1=1e6 # 140017 of 200000 Phi_n(10) factorizations were cracked. -- Apr 4, 2018 (Makoto Kamada) -- n=164370: c43819(5536311758......) = 315000043612531 * c43805(1757559044......) n=164400: c43520(9999999999......) = 18107696271746401 * c43504(5522513659......) n=164490: c43838(1403290657......) = 33259227183442769692394611 * c43812(4219252148......) n=164610: c41754(1266883178......) = 13354375152775510611451 * c41731(9486652608......) n=164736: c46080(9999999999......) = 1388219645860721511553 * c46059(7203471028......) n=164760: c43897(5725308583......) = 2513862744367579565038897414530721 * c43864(2277494503......) n=164880: c43776(9999999999......) = 325187279782164005097601 * c43753(3075151035......) # P-1 B1=1e6 # 140015 of 200000 Phi_n(10) factorizations were cracked. -- Apr 3, 2018 (Makoto Kamada) -- n=164082: c49261(1424498141......) = 235110818915147011 * c49243(6058837055......) n=164250: c43200(9999999999......) = 889278191354251 * c43186(1124507504......) # P-1 B1=1e6 # 140012 of 200000 Phi_n(10) factorizations were cracked. -- Apr 2, 2018 (Makoto Kamada) -- n=163488: c49912(1028009558......) = 7430187130078753 * c49896(1383558099......) n=163614: c47490(1088296825......) = 2760728044750964971 * c47471(3942064587......) n=163632: c46614(2236264205......) = 196842874098529 * c46600(1136065613......) n=163758: c46698(1090459038......) = 390564568860949417756789969 * c46671(2792007072......) n=163884: c46789(9808103933......) = 1839790048848264379609 * c46768(5331099567......) n=163926: c46795(6094182166......) = 148640040984583 * c46781(4099959961......) # P-1 B1=1e6 -- Apr 1, 2018 (Makoto Kamada) -- n=163098: c46069(1694303914......) = 958912511795372863 * c46051(1766901457......) n=163110: c43468(1617736382......) = 33976488598357801 * c43451(4761340708......) n=163200: c40951(2586732091......) = 35957184663268761601 * c40931(7193922760......) n=163296: c46619(4041220320......) = 217688351956076173537 * c46599(1856424693......) n=163410: c40114(2635941722......) = 1776322867285201 * 18376095537984211 * c40082(8075337040......) n=163470: c43584(9100090999......) = 50912696680891 * 102626361869611 * c43557(1741649266......) # P-1 B1=1e6 # 140011 of 200000 Phi_n(10) factorizations were cracked.