Factorizations of 600...001 2008-10-03(Fri) 22:12
Last update
Oct 3, 2008 22:12 JSTSequence
61, 601, 6001, 60001, 600001, ...General term
6·10n +1Room for prime numbers
upper limit of periods: 10000Prime numbers
6·101 +1 = 61 is prime.6·102 +1 = 601 is prime.6·108 +1 = 600000001 is prime.6·109 +1 = 6000000001<10> is prime.6·1015 +1 = 6( 0) 14 1<16> is prime.6·1020 +1 = 6( 0) 19 1<21> is prime.6·1026 +1 = 6( 0) 25 1<27> is prime.6·1038 +1 = 6( 0) 37 1<39> is prime.6·1045 +1 = 6( 0) 44 1<46> is prime.6·1065 +1 = 6( 0) 64 1<66> is prime.6·10112 +1 = 6( 0) 111 1<113> is prime.6·10244 +1 = 6( 0) 243 1<245> is prime.
6·10303 +1 = 6( 0) 302 1<304> is prime.
6·10393 +1 = 6( 0) 392 1<394> is prime.
6·10560 +1 = 6( 0) 559 1<561> is prime.
6·10839 +1 = 6( 0) 838 1<840> is prime.
6·101009 +1 = 6( 0) 1008 1<1010> is prime.
6·101019 +1 = 6( 0) 1018 1<1020> is prime.
6·101173 +1 = 6( 0) 1172 1<1174> is prime.
6·101334 +1 = 6( 0) 1333 1<1335> is prime.
6·102236 +1 = 6( 0) 2235 1<2237> is prime.
6·102629 +1 = 6( 0) 2628 1<2630> is prime.
6·104426 +1 = 6( 0) 4425 1<4427> is prime.
6·108848 +1 = 6( 0) 8847 1<8849> is prime. (Makoto Kamada / PFGW / Jan 1, 2005)
Searched:Condition
n≤200Status
Completed up to n=100. (Jan 4, 2005)175 , 177 , 180 , 181 , 182 , 185 , 192 , 194 , 195 , 198 (10/200)Factorization results
6·101 +1 =61 = definitely prime number 6·102 +1 =601 = definitely prime number 6·103 +1 =6001 = 17 · 353 6·104 +1 =60001 = 29 · 2069 6·105 +1 =600001 = 19 · 23 · 1373 6·106 +1 =6000001 = 72 · 122449 6·107 +1 =60000001 = 151 · 397351 6·108 +1 =600000001 = definitely prime number 6·109 +1 =6000000001<10> = definitely prime number 6·1010 +1 =60000000001<11> = 31 · 293 · 6605747 6·1011 +1 =600000000001<12> = 53 · 11320754717<11> 6·1012 +1 =6000000000001<13> = 7 · 4513 · 4903 · 38737 6·1013 +1 =60000000000001<14> = 139 · 34759 · 12418501 6·1014 +1 =600000000000001<15> = 1567 · 3967 · 96520609 6·1015 +1 =6000000000000001<16> = definitely prime number 6·1016 +1 =60000000000000001<17> = 15467 · 3879226740803<13> 6·1017 +1 =600000000000000001<18> = 467 · 1284796573875803<16> 6·1018 +1 =6000000000000000001<19> = 7 · 340335059 · 2518526477<10> 6·1019 +1 =60000000000000000001<20> = 17 · 167 · 21134202183867559<17> 6·1020 +1 =600000000000000000001<21> = definitely prime number 6·1021 +1 =6000000000000000000001<22> = 47 · 2333 · 54719063209637851<17> 6·1022 +1 =60000000000000000000001<23> = 6271 · 2650266823<10> · 3610146697<10> 6·1023 +1 =600000000000000000000001<24> = 19 · 31578947368421052631579<23> 6·1024 +1 =6000000000000000000000001<25> = 7 · 53 · 16172506738544474393531<23> 6·1025 +1 =60000000000000000000000001<26> = 31 · 773 · 2503860117681425531027<22> 6·1026 +1 =600000000000000000000000001<27> = definitely prime number 6·1027 +1 =6000000000000000000000000001<28> = 23 · 361754506133<12> · 721123194859339<15> 6·1028 +1 =60000000000000000000000000001<29> = 4801 · 12497396375755051031035201<26> 6·1029 +1 =600000000000000000000000000001<30> = 278581 · 6075673039<10> · 354491121990739<15> 6·1030 +1 =6000000000000000000000000000001<31> = 7 · 59 · 399796009 · 36338144226746427053<20> 6·1031 +1 =60000000000000000000000000000001<32> = 1051 · 57088487155090390104662226451<29> 6·1032 +1 =600000000000000000000000000000001<33> = 29 · 317 · 27697 · 14706583 · 160232083892316607<18> 6·1033 +1 =6000000000000000000000000000000001<34> = 17207 · 348695298425059568780147614343<30> 6·1034 +1 =60000000000000000000000000000000001<35> = 83 · 1361401 · 16294553140421<14> · 32587019298007<14> 6·1035 +1 =600000000000000000000000000000000001<36> = 17 · 353 · 562789 · 58641017 · 3029566777980005477<19> 6·1036 +1 =6000000000000000000000000000000000001<37> = 7 · 439 · 138577 · 12242047 · 1150915641512450972623<22> 6·1037 +1 =60000000000000000000000000000000000001<38> = 53 · 113 · 4099 · 21061 · 116048633486792236701987331<27> 6·1038 +1 =600000000000000000000000000000000000001<39> = definitely prime number 6·1039 +1 =6000000000000000000000000000000000000001<40> = 2179 · 56659 · 2309994469<10> · 21038471059992518119189<23> 6·1040 +1 =60000000000000000000000000000000000000001<41> = 31 · 2825470447<10> · 27466192401587<14> · 24940222831319339<17> 6·1041 +1 =600000000000000000000000000000000000000001<42> = 19 · 109 · 84405537443<11> · 3432418325247921334256483117<28> 6·1042 +1 =6000000000000000000000000000000000000000001<43> = 7 · 5431 · 12611 · 64783 · 193180295584722199571106305381<30> 6·1043 +1 =60000000000000000000000000000000000000000001<44> = 13997 · 43651 · 9395926339974827<16> · 10451592942449592229<20> 6·1044 +1 =600000000000000000000000000000000000000000001<45> = 141773 · 1978299179<10> · 2139270735658099657022956290703<31> 6·1045 +1 =6000000000000000000000000000000000000000000001<46> = definitely prime number 6·1046 +1 =60000000000000000000000000000000000000000000001<47> = 107 · 121591 · 187183537 · 530372671 · 97554764141<11> · 476177392039<12> 6·1047 +1 =600000000000000000000000000000000000000000000001<48> = 2657 · 3412861 · 7095600047<10> · 9325067142016844694550010779<28> 6·1048 +1 =6000000000000000000000000000000000000000000000001<49> = 72 · 1087 · 2537895020703233808083<22> · 44386609518255148449269<23> 6·1049 +1 =60000000000000000000000000000000000000000000000001<50> = 23 · 1160567 · 79918334330375449<17> · 28125922333383127880650489<26> 6·1050 +1 =600000000000000000000000000000000000000000000000001<51> = 53 · 6139787 · 1843835090204453684707905683569730866854391<43> 6·1051 +1 =6000000000000000000000000000000000000000000000000001<52> = 17 · 1159657247701<13> · 304349562916359881714040088241074414253<39> 6·1052 +1 =60000000000000000000000000000000000000000000000000001<53> = 71983 · 42544643 · 538230961 · 1760325991<10> · 25575186779<11> · 808529429401<12> 6·1053 +1 =600000000000000000000000000000000000000000000000000001<54> = 1697 · 269719 · 86687632287383<14> · 15121703768958887835334579829329<32> 6·1054 +1 =6000000000000000000000000000000000000000000000000000001<55> = 7 · 751 · 13297 · 55807 · 56123 · 1804287570049<13> · 15188828999489696506752821<26> 6·1055 +1 =60000000000000000000000000000000000000000000000000000001<56> = 31 · 233 · 421 · 272341 · 72450020365565062097204434945389647844594767<44> 6·1056 +1 =600000000000000000000000000000000000000000000000000000001<57> = 97 · 821 · 183543234976677913<18> · 41048564778833682869028261529146821<35> 6·1057 +1 =6000000000000000000000000000000000000000000000000000000001<58> = 394510951 · 16609273738277543<17> · 915675395184108237016902511266257<33> 6·1058 +1 =60000000000000000000000000000000000000000000000000000000001<59> = 37718022522533<14> · 30362036251597397<17> · 52392779681534623367518913401<29> 6·1059 +1 =600000000000000000000000000000000000000000000000000000000001<60> = 19 · 139 · 31413541 · 7232125525589724872156509017849096384597203614621<49> 6·1060 +1 =6000000000000000000000000000000000000000000000000000000000001<61> = 7 · 29 · 1427 · 20712438855154463012762314407917674959697046061011940721<56> 6·1061 +1 =60000000000000000000000000000000000000000000000000000000000001<62> = 61 · 30175681 · 79822797269482085863664027<26> · 408354543900247203214977743<27> 6·1062 +1 =600000000000000000000000000000000000000000000000000000000000001<63> = 227 · 948799 · 78639923 · 35424856144656390091844500707594811445488827319<47> 6·1063 +1 =6000000000000000000000000000000000000000000000000000000000000001<64> = 53 · 113207547169811320754716981132075471698113207547169811320754717<63> 6·1064 +1 =60000000000000000000000000000000000000000000000000000000000000001<65> = 10687 · 313365290753887<15> · 17916144227131827201852468716406014412728509729<47> 6·1065 +1 =600000000000000000000000000000000000000000000000000000000000000001<66> = definitely prime number 6·1066 +1 =6000000000000000000000000000000000000000000000000000000000000000001<67> = 7 · 34301 · 687684769 · 766609859 · 236954946916397<15> · 200039998745866188690389568389<30> 6·1067 +1 =60000000000000000000000000000000000000000000000000000000000000000001<68> = 17 · 47 · 353 · 19514377061177<14> · 10901219223968945662565276355575405434276865620279<50> 6·1068 +1 =600000000000000000000000000000000000000000000000000000000000000000001<69> = 32696453 · 39987656127484812945413<23> · 458906976273972267247081993747004432809<39> 6·1069 +1 =6000000000000000000000000000000000000000000000000000000000000000000001<70> = 181 · 443 · 36345923 · 63717801782714753<17> · 4504187740385421017<19> · 7173580535919808948789<22> 6·1070 +1 =60000000000000000000000000000000000000000000000000000000000000000000001<71> = 31 · 16661 · 557329 · 208437977492853009591329927228441927726791535728566959311859<60> 6·1071 +1 =600000000000000000000000000000000000000000000000000000000000000000000001<72> = 23 · 10782263 · 48914360697607819366223<23> · 49462619410288208457262695434014159560863<41> 6·1072 +1 =6000000000000000000000000000000000000000000000000000000000000000000000001<73> = 7 · 2939 · 291644388275895591308997229378311378991882564526320906041899577115637<69> 6·1073 +1 =60000000000000000000000000000000000000000000000000000000000000000000000001<74> = 199 · 10717141 · 7987068823361803464866907998419<31> · 3522344282723659121878623661414681<34> 6·1074 +1 =600000000000000000000000000000000000000000000000000000000000000000000000001<75> = 71713 · 115133 · 677749129 · 5610899309<10> · 19109621937767939368004201654255332549309559329<47> 6·1075 +1 =6000000000000000000000000000000000000000000000000000000000000000000000000001<76> = 83 · 72289156626506024096385542168674698795180722891566265060240963855421686747<74> 6·1076 +1 =60000000000000000000000000000000000000000000000000000000000000000000000000001<77> = 53 · 6793 · 187393 · 34863869 · 2078513971403<13> · 5504690659859<13> · 22708640191786349<17> · 98176563304319309<17> 6·1077 +1 =600000000000000000000000000000000000000000000000000000000000000000000000000001<78> = 19 · 11813 · 653722299549164948784877973<27> · 4089254551558801036157589009223360059576611971<46> 6·1078 +1 =6000000000000000000000000000000000000000000000000000000000000000000000000000001<79> = 7 · 1664867 · 3961039 · 14625232591<11> · 370787449092414981629<21> · 23968272859703472959773937285158849<35> 6·1079 +1 =60000000000000000000000000000000000000000000000000000000000000000000000000000001<80> = 285031 · 210503418926362395669242994621637646431440790650841487417158133676687798871<75> 6·1080 +1 =600000000000000000000000000000000000000000000000000000000000000000000000000000001<81> = 5113 · 117347936632114218658321924506160766673185996479561901036573440250342264815177<78> 6·1081 +1 =6000000000000000000000000000000000000000000000000000000000000000000000000000000001<82> = 111949 · 35737634987<11> · 126145676809<12> · 699274404521801727955091123<27> · 17001420921467775458006288461<29> 6·1082 +1 =60000000000000000000000000000000000000000000000000000000000000000000000000000000001<83> = 151 · 34613 · 25862357294843<14> · 4493360119456930454809<22> · 98786074257911359306215236531947566825721<41> 6·1083 +1 =600000000000000000000000000000000000000000000000000000000000000000000000000000000001<84> = 17 · 25171 · 2600783 · 17366897 · 308604441953<12> · 44059979703527<14> · 2283121624258682255324277559118476008803<40> 6·1084 +1 =6000000000000000000000000000000000000000000000000000000000000000000000000000000000001<85> = 7 · 197 · 9221 · 31177 · 7568527 · 39290123 · 108401984385654685133<21> · 469507629407253139906085225665498575799<39> 6·1085 +1 =60000000000000000000000000000000000000000000000000000000000000000000000000000000000001<86> = 31 · 6827 · 876677 · 12147559 · 966625438653914723<18> · 27540562330104221469572957255891172036635636735957<50> 6·1086 +1 =600000000000000000000000000000000000000000000000000000000000000000000000000000000000001<87> = 1327 · 76753 · 12337057 · 17415121 · 3705060199<10> · 7400339291663857765484830291991875052756503510426252057<55> 6·1087 +1 =6000000000000000000000000000000000000000000000000000000000000000000000000000000000000001<88> = 453451 · 505643 · 18622367 · 180045788879165581<18> · 7804750743261622757311259350760834146985607834180691<52> 6·1088 +1 =60000000000000000000000000000000000000000000000000000000000000000000000000000000000000001<89> = 292 · 59 · 3581 · 34033 · 1786637 · 12971069 · 3326205203<10> · 73699717159<11> · 1746512648577745608670770637652515241481683<43> 6·1089 +1 =600000000000000000000000000000000000000000000000000000000000000000000000000000000000000001<90> = 53 · 593 · 19090648763880492538738108116707499443189411053485634286805179929364599573642177606669<86> 6·1090 +1 =6000000000000000000000000000000000000000000000000000000000000000000000000000000000000000001<91> = 72 · 2383 · 1454612251783<13> · 38583854261803063891061<23> · 915542013048253542684782683675913912809936371430181<51> 6·1091 +1 =60000000000000000000000000000000000000000000000000000000000000000000000000000000000000000001<92> = 229 · 5449 · 3936971760167<13> · 12213402240021839572649954565734941302776408893963263345101942272443728243<74> 6·1092 +1 =600000000000000000000000000000000000000000000000000000000000000000000000000000000000000000001<93> = 509 · 174990711565745028168904901757395757001<39> · 6736254254849041911313042640073220109096970044505389<52> 6·1093 +1 =6000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000001<94> = 23 · 3889 · 12421 · 122243852122547<15> · 44177575990804917577240031942529437755601646590367341215467242111773609<71> 6·1094 +1 =60000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000001<95> = 1229 · 81139505539820154437<20> · 601681988108295251598063284083437223829862273056653086908294981183123137<72> 6·1095 +1 =600000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000001<96> = 19 · 15527 · 299146613 · 14953622366592442973291661206155279<35> · 454652514628133701293284270253908633856234072151<48> (Makoto Kamada / GGNFS-0.70.8 / 0.27 hours) 6·1096 +1 =6000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000001<97> = 7 · 377183428187<12> · 18860663840080796999105381<26> · 120487954732241877019878624151198513351556109280299078280369<60> 6·1097 +1 =60000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000001<98> = 56207 · 2080630904836525863529<22> · 513057215195251896718766661771109556220731994182841655274064438564486167<72> 6·1098 +1 =600000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000001<99> = 576897077 · 463697380804547191<18> · 2242943165869171747348094295096124663610560630080590487050517465963032843<73> 6·1099 +1 =6000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000001 <100> = 17 · 107 · 353 · 9344237019686750027643367849906635498444963222640463349566349533644704075800450703698916224243<94> 6·10100 +1 =60000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000000001 <101> = 31 · 10988671 · 256470851428667<15> · 6445130741893997272288850119<28> · 106555198029917904757934072544719944133911203314837<51> 6·10101 +1 =6( 0) 100 1<102> = 349 · 362549619674618223167<21> · 4741965277137344047882581864905450007182542675222783233872004976836277282239947<79> 6·10102 +1 =6( 0) 101 1<103> = 7 · 53 · 659 · 529687 · 46331100053136927844437500771763677444507250136372992673418064800026514466955569321510517807<92> 6·10103 +1 =6( 0) 102 1<104> = 243629701591<12> · 40304843805077<14> · 51901639078658911183463<23> · 117728795678308022566270071685994524524193885160094796861<57> 6·10104 +1 =6( 0) 103 1<105> = 37370640967135726343267<23> · 9203784399467016788249685113729690619419<40> · 1744432892227357395735142027143932533665937<43> (Makoto Kamada / Msieve 1.17 for P40 x P43 / Mar 28, 2007) 6·10105 +1 =6( 0) 104 1<106> = 139 · 738929844829893537529<21> · 28570752196990754353494572179370181595997<41> · 2044615119347519919559849474950280720223543<43> (Makoto Kamada / Msieve 1.17 for P41 x P43 / Mar 28, 2007) 6·10106 +1 =6( 0) 105 1<107> = 29401 · 6685671247<10> · 369696101861<12> · 51940802628894500623<20> · 15896100624996536948021898679570060061241584509024461214768661<62> 6·10107 +1 =6( 0) 106 1<108> = 3301 · 188417 · 164052409 · 5880348011941284246615854413500342753034392574740915407786860158576275770540964336501180117<91> 6·10108 +1 =6( 0) 107 1<109> = 7 · 727 · 269089 · 116960511029<12> · 6063254605249<13> · 669060346041879059651<21> · 9234481200250125127176894322385720240709107656511138911<55> 6·10109 +1 =6( 0) 108 1<110> = 7822741 · 12580929070333423746767<23> · 609648605752542018869682610829436145583707994320866899932711993373999617005237683<81> 6·10110 +1 =6( 0) 109 1<111> = 17713 · 33075221 · 13415324383775158973<20> · 76340534197621381168700453218973975001163815611335044871304764485517103259263569<80> 6·10111 +1 =6( 0) 110 1<112> = 317 · 2136234618410849156029<22> · 842291613546434840273761021908166265719<39> · 10519147937640716926880457101711532119600907985103<50> (Makoto Kamada / Msieve 1.17 for P39 x P50 / Mar 28, 2007) 6·10112 +1 =6( 0) 111 1<113> = definitely prime number 6·10113 +1 =6( 0) 112 1<114> = 19 · 47 · 557 · 1193 · 1759 · 4021 · 4217 · 33900073442377684574112498516882213832532833600600564042656027111525885319259392813402783988539<95> 6·10114 +1 =6( 0) 113 1<115> = 7 · 49599570081656020724913841661<29> · 17281255779671851243059588271315196225145084333965975289768881624112485132674005882563<86> 6·10115 +1 =6( 0) 114 1<116> = 17 · 23 · 31 · 53 · 10193 · 694401711828655092792949<24> · 1281308932338524719016033<25> · 40539413087936983301001961<26> · 254034564641855352598667465918297<33> 6·10116 +1 =6( 0) 115 1<117> = 29 · 83 · 131 · 685813586041<12> · 1844456395138388719546644007583570020351357048013<49> · 1504282446191996744686075825671917165322581155319641<52> (Shaopu Lin / GGNFS-0.77.1-20060722-pentium4 / 1.68 hours on Pentium 4 2.80GHz / Mar 29, 2007) 6·10117 +1 =6( 0) 116 1<118> = 19249 · 104513 · 84949547191298834829861938440359659209<38> · 35108453167910401652183651057262560059278692771200689617890345494466697<71> (Shaopu Lin / GGNFS-0.77.1-20060722-pentium4 / 2.30 hours on Pentium 4 2.80GHz / Mar 29, 2007) 6·10118 +1 =6( 0) 117 1<119> = 2411 · 987542448413<12> · 52015854024587<14> · 4130272925600541901178462189<28> · 117296157088580226224056755910106397663849713852624571466192849<63> 6·10119 +1 =6( 0) 118 1<120> = 57543559 · 10426883745581325618041803775119297018107621740949321539183907620312466248394542297948585349057050850817204406839 <113> 6·10120 +1 =6( 0) 119 1<121> = 7 · 21247 · 801463667 · 27355202177207582747<20> · 8471936362176685853698170750873328576488389<43> · 217194658091737425168747728304628592086097429<45> (Makoto Kamada / Msieve 1.17 for P43 x P45 / Mar 28, 2007) 6·10121 +1 =6( 0) 120 1<122> = 61 · 252471385973041681<18> · 3895913010443395142052463046808468849591523951821310370343831754337081720480312214147822474048551205061 <103> 6·10122 +1 =6( 0) 121 1<123> = 1951 · 154619 · 1988983227431523625230622190849179449444735386649339263584065100428785335666892435047821737006964580574537628776429 <115> 6·10123 +1 =6( 0) 122 1<124> = 677 · 85482211 · 46731777018239824577493857223667185843576140952323<50> · 2218577168058000218769466780291988857687020303171346242507278821<64> (Jo Yeong Uk / GGNFS-0.77.1-20050930-k8 / 1.95 hours on Core 2 Duo E6300@2.33GHz / Mar 28, 2007) 6·10124 +1 =6( 0) 123 1<125> = 344209 · 56280827 · 3097195063457860009522337786495159196439749744481215793546730363286460601958790340899822844604035083233374808707 <112> 6·10125 +1 =6( 0) 124 1<126> = 2237 · 3668449819<10> · 8271163308755950427286499111<28> · 51476248134260390790050421143<29> · 171723290681284284232336757421737754290876953562908401679<57> 6·10126 +1 =6( 0) 125 1<127> = 7 · 785261756545781<15> · 11994069018834818454367125998411<32> · 91006459628890919464580217746794559086729129284436424507130614642478391402153873<80> (Makoto Kamada / GMP-ECM 6.1.2 B1=250000, sigma=4054558047 for P32 / Mar 25, 2007) 6·10127 +1 =6( 0) 126 1<128> = 263 · 1553 · 821897 · 80977097 · 123689475752141401<18> · 17844800569550782026356258864473158644358187707400859825983068391046935363574684890879023151<92> 6·10128 +1 =6( 0) 127 1<129> = 53 · 367 · 382800053 · 639224669 · 126061886020057845203330929768004199056650509960559266998271417668976313280156469855945817424565152822528243 <108> 6·10129 +1 =6( 0) 128 1<130> = 46441 · 18431290643<11> · 1214943511927468592389<22> · 15906743128195327845877493<26> · 563762750909587173399187190635729<33> · 643369114600182232260522769188169819<36> (Makoto Kamada / GMP-ECM 6.1.2 B1=250000, sigma=1640166223 for P33 / Mar 25, 2007) 6·10130 +1 =6( 0) 129 1<131> = 31 · 325910589480211013<18> · 80533406104775313809314886144551<32> · 73742017814548265755028178719963181032292046951828193081508776580982918009049717<80> (Jo Yeong Uk / GGNFS-0.77.1-20050930-k8 / 2.49 hours on Core 2 Duo E6300@2.33GHz / Mar 29, 2007) 6·10131 +1 =6( 0) 130 1<132> = 172 · 19 · 353 · 7577 · 40853363102957510445201825139711551633716795076125752017311613159589753090587746005643771867608180363065555099012489640531 <122> 6·10132 +1 =6( 0) 131 1<133> = 72 · 347 · 36596493239037447170949018613664094139517120346108317971376267<62> · 9642423972646013466783289114801468750815943389674239701142494172201<67> (suberi / GGNFS-0.77.1-20060513-pentium4 / 6.36 hours on Pentium 4 2.26GHz, Windows XP and Cygwin / Mar 29, 2007) 6·10133 +1 =6( 0) 132 1<134> = 4390696903639<13> · 206718352549405901933<21> · 366262675924266703046624692745658752739944862649<48> · 180487069279920119803199143358086060304773059562666427<54> (Shaopu Lin / GGNFS-0.77.1-20060722-pentium4 / 7.67 hours on Pentium 4 2.80GHz / Mar 29, 2007) 6·10134 +1 =6( 0) 133 1<135> = 13183 · 56512788861073<14> · 4433404553816215317147736447963746529<37> · 95562856740921441632025329178966092257<38> · 1900919699476513791402495760985135475898063<43> (suberi / GGNFS-0.77.1-20060513-pentium4 / 8.00 hours on Pentium 4 2.26GHz, Windows XP / Mar 31, 2007) 6·10135 +1 =6( 0) 134 1<136> = 6880668114947944749317742283818949380447951589<46> · 872008342760387973294859623740096978369380316479863520578687666785407351034250325563331309<90> (Robert Backstrom / GGNFS-0.77.1-20051202-athlon / 4.93 hours on Cygwin on AMD 64 3200+ / Mar 29, 2007) 6·10136 +1 =6( 0) 135 1<137> = 287271635614354961093<21> · 41930632229393576833881200665999<32> · 4981121010552314579673023411353830652553041863694028008692298895946066995164432699043<85> (Jo Yeong Uk / GGNFS-0.77.1-20050930-k8 / 5.30 hours on Core 2 Duo E6300@2.33GHz / Mar 29, 2007) 6·10137 +1 =6( 0) 136 1<138> = 23 · 48323971 · 4272684397523<13> · 14655169765563672253443781435081771<35> · 8621228002824546712512779722593849212894060284244445369802723033429410273152233309<82> (Jo Yeong Uk / GGNFS-0.77.1-20050930-k8 / 6.19 hours on Core 2 Duo E6300@2.33GHz / Mar 29, 2007) 6·10138 +1 =6( 0) 137 1<139> = 7 · 149 · 313 · 1667 · 63551171 · 231479951514173<15> · 749462771129028187179501577300325243967405287612534956934150011882051100389202685246684753100633759671351799 <108> 6·10139 +1 =6( 0) 138 1<140> = 2277647 · 1508867401072225998121996787<28> · 323196751600306705639682362661998583<36> · 54019028760861303562927364638531753025925788771571944925497170577303123<71> (Robert Backstrom / GGNFS-0.77.1-20051202-athlon / 7.00 hours on Athlon XP 3000+ / Mar 29, 2007) 6·10140 +1 =6( 0) 139 1<141> = 6553 · 36947 · 37307 · 73951 · 1557224920267273<16> · 2362708497035574005050811627<28> · 244138366996402871314657154147600629479440536453368969093870526132980050402458013<81> 6·10141 +1 =6( 0) 140 1<142> = 53 · 1787 · 63350613973033755318811964819292373641921212953088870352968504186419740051313997318157341808237691503626822649956182492001984985904488391 <137> 6·10142 +1 =6( 0) 141 1<143> = 179 · 193 · 1949 · 20250697 · 168722167314338241440719151552099503<36> · 260805622756239731875686742670995926907630708041156681530524921153215720747176911819093845937<93> (Jo Yeong Uk / GGNFS-0.77.1-20050930-k8 / 9.01 hours on Core 2 Duo E6300@2.33GHz / Mar 29, 2007) 6·10143 +1 =6( 0) 142 1<144> = 34979851 · 17152731725472472710075294488818720239831782016452843095300777581928522222693287058312512537574845587535521520660565420933325302043167651 <137> 6·10144 +1 =6( 0) 143 1<145> = 7 · 29 · 9419 · 8690737773132673400046895125462569162199460287601619<52> · 361071965016480062594290480035242393015221651315524279120702561149015142886111978824947<87> (Robert Backstrom / GGNFS-0.77.1-20051202-athlon / 8.84 hours on Cygwin on AMD 64 3200+ / Mar 29, 2007) 6·10145 +1 =6( 0) 144 1<146> = 31 · 647 · 736071551375499639200941<24> · 2620389743008896032383787<25> · 1550955553437612011205718195563558193552672293790742620592000665671583464243332425988643526279<94> 6·10146 +1 =6( 0) 145 1<147> = 59 · 7901 · 5214659 · 346417145671<12> · 286908163723179938475463307<27> · 2483413159054730378337215283022999229010263978375223753982805831421347502775406769232845620736793<97> 6·10147 +1 =6( 0) 146 1<148> = 17 · 2543 · 115760644183242053581470522727778242831221097437922034717<57> · 1198933330911430747361811027483210008562962708283177147904000051570352016647574586611563<88> (Robert Backstrom / GGNFS-0.77.1-20051202-athlon / 13.08 hours on Athlon XP 3000+ / Mar 30, 2007) 6·10148 +1 =6( 0) 147 1<149> = 45413 · 1021518389977<13> · 61418399131257487532861<23> · 4713973367965261212205092299<28> · 43077009313549326145069669110361<32> · 103703570011344634621906538130450202423763726827619<51> (Makoto Kamada / Msieve 1.17 for P32 x P51 / Mar 28, 2007) 6·10149 +1 =6( 0) 148 1<150> = 19 · 109 · 113 · 10579907627<11> · 5679856078924981<16> · 22501049938160881627846852996382188283<38> · 1896141385290142214720833871694818954129695297495385547007001852440390777837062947<82> (Jo Yeong Uk / GGNFS-0.77.1-20050930-k8 / 16.31 hours on Core 2 Duo E6300@2.33GHz / Mar 30, 2007) 6·10150 +1 =6( 0) 149 1<151> = 7 · 2287 · 274691407 · 106052555431<12> · 12865327147663768523973250151725082408362339117847704977202467479029658749866722758755177966327179672272580078220625196472106417 <128> 6·10151 +1 =6( 0) 150 1<152> = 139 · 498255827 · 85355460087173921743066987368891301<35> · 4059984657865523211612358150944087268984576395068423<52> · 2499932966831125928910143611140847400709468157774550779<55> (Robert Backstrom / GGNFS-0.77.1-20051202-athlon / 17.90 hours on Cygwin on AMD 64 3200+ / Mar 30, 2007) 6·10152 +1 =6( 0) 151 1<153> = 97 · 107 · 4413797 · 146950709 · 312531144238105714806234223<27> · 298164910200576610275597713265821141<36> · 956449101954012566944100844383139842704712531307907202661451759300471921<72> (Jo Yeong Uk / GMP-ECM 6.1.1 B1=1000000, sigma=23251224 for P36 / Mar 29, 2007) 6·10153 +1 =6( 0) 152 1<154> = 21617 · 1541654209<10> · 984429390961917259297755699215421271<36> · 182887609531191459362098716133019089012168238316933698590744176357181073877813369466618012759402594754327 <105> (Robert Backstrom / GGNFS-0.77.1-20051202-athlon / 27.14 hours on Athlon XP 3000+ / Mar 31, 2007) 6·10154 +1 =6( 0) 153 1<155> = 53 · 110164333547<12> · 238374791151267475667638647382887847013<39> · 43109605018575408648854020726186133527988347085935528901089943775031879035223884740987728777643420089547 <104> (Jo Yeong Uk / GGNFS-0.77.1-20050930-k8 / 21.24 hours on Core 2 Duo E6300@2.33GHz / Mar 31, 2007) 6·10155 +1 =6( 0) 154 1<156> = 15679 · 5838172087029064235976796069<28> · 6554747975404540742365128375128746950110811434716985062195497790142313250580415385937683038666601418715210100773572817781651 <124> (Jo Yeong Uk / GMP-ECM 6.1.1 B1=1000000, sigma=273397416 for P28 / Mar 30, 2007) 6·10156 +1 =6( 0) 155 1<157> = 7 · 293 · 34589 · 3080875249<10> · 27451967147179722860574811764507770588509908035860564022334209651903010584803289607053853581663398484714009288847560755778089982663689650391 <140> 6·10157 +1 =6( 0) 156 1<158> = 83 · 151 · 72179234791<11> · 72357737078330308558694680661590216271249223389638162975859539<62> · 916640329258611436341178406620060063987449880780814068401233780150914565592579353<81> (Robert Backstrom / GGNFS-0.77.1-20051202-athlon / 34.58 hours on Cygwin on AMD XP 2700+ / Apr 19, 2007) 6·10158 +1 =6( 0) 157 1<159> = 23571451973426463027469189039<29> · 25454520182991554071457193472923624023655677192163090199587296650880130688226908716630410700752359541445351753329666094641222465359 <131> 6·10159 +1 =6( 0) 158 1<160> = 23 · 47 · 3167 · 36887 · 48599731 · 306920722151401391534780179<27> · 767698777607940194265527635370316671942213<42> · 4149093592080265396266679279339449692918936093049417612900424150237843877<73> (Jo Yeong Uk / GGNFS-0.77.1-20050930-nocona gnfs for P42 x P73 / 25.89 hours on Core 2 Quad Q6600 / Jun 2, 2007) 6·10160 +1 =6( 0) 159 1<161> = 31 · 670853 · 27432596289301964073885280181487235430291<41> · 105170824355437139403715973975995678497668642440971399521069843399452536718803322806044637013799975195072495150977 <114> (Robert Backstrom / GGNFS-0.77.1-20060513-athlon-xp / 33.19 hours on Cygwin on AMD 64 3200+ / Jun 10, 2007) 6·10161 +1 =6( 0) 160 1<162> = 1187 · 505475989890480202190395956192080876158382476832350463352990732940185341196293176074136478517270429654591406908171861836562763268744734625105307497893850042123 <159> 6·10162 +1 =6( 0) 161 1<163> = 7 · 409 · 461 · 1297 · 71355177903228522649<20> · 105440523536650831469<21> · 2635929378062082616090181215642985097332592374330359<52> · 176734845085883901472849673672121748213269636335439399849960889<63> (Jo Yeong Uk / GGNFS-0.77.1-20050930-nocona / 25.27 hours on Core 2 Quad Q6600 / May 9, 2007) 6·10163 +1 =6( 0) 162 1<164> = 17 · 353 · 383 · 5215147241069255739103596758994562191897609456843465301<55> · 5005670690155230684429614037038784632521687552228111599112073609027731095334283017297356948767263632947 <103> (Robert Backstrom / GGNFS-0.77.1-20051202-athlon / 63.28 hours on Cygwin on AMD XP 2700+ / Jul 26, 2007) 6·10164 +1 =6( 0) 163 1<165> = 127301 · 9028519 · 731813929840206967957739<24> · 369270152835869755547632504844697137215152321611<48> · 1931781669601575696400721360944887567321529473091599594216511185010148045718575651<82> (Sinkiti Sibata / GGNFS-0.77.1-20060513-pentium4 snfs / 109.83 hours on Pentium 4 2.4GHz, Windows XP and Cygwin / May 25, 2008) 6·10165 +1 =6( 0) 164 1<166> = 108649 · 1383530154323<13> · 10418259026881<14> · 12198214958645406697515956553865609339286480946779228031841<59> · 314083740589948806536874133179020940182628645393194584520163117078481245780803<78> (Sinkiti Sibata / GGNFS-0.77.1-20050930-nocona snfs / 73.33 hours on Core 2 Quad Q6600 2.4GHz, Windows Vista and Cygwin / Aug 13, 2008) 6·10166 +1 =6( 0) 165 1<167> = 511873 · 1672952309429<13> · 10374402770189235705553<23> · 6753709287929355035146226664320891176106045884127335781481288525048429003589981557630847342869747421590160530223111979292489101 <127> 6·10167 +1 =6( 0) 166 1<168> = 19 · 53 · 151888273037<12> · 285222132532084029211<21> · 11344553699289079283476154821341898793<38> · 1212346876153485600056159157453359594304541020922218903516315067388636750613885280058055706162793<97> (Robert Backstrom / GMP-ECM 6.2.1 B1=5466000, sigma=2706353897 for P38 / Oct 3, 2008) 6·10168 +1 =6( 0) 167 1<169> = 7 · 192463 · 782311 · 76228657 · 7328634264783832045460771<25> · 10190258598918290646665763144046669701615740101386780018710605032958701422540550897580384388016235363077372155509748597910533 <125> 6·10169 +1 =6( 0) 168 1<170> = 1163 · 50207 · 409692145250436913282056636020822590790365187<45> · 2508127593417771961783639597835041387496768657625863183136324428934170806705227815812321776714203987196208985026667903 <118> (matsui / GGNFS-0.77.1-20060513-prescott snfs / 153.02 hours / May 30, 2008) 6·10170 +1 =6( 0) 169 1<171> = 2036522480469412757<19> · 15289860020412201132871070965187<32> · 19268971414983811114353408295498404565964742578518175921195273229007773017207159266351520463816824536907817669941020019839 <122> (Makoto Kamada / GMP-ECM 6.1.2 B1=250000, sigma=2501685443 for P32 / Mar 27, 2007) 6·10171 +1 =6( 0) 170 1<172> = 154699561095803788960811837883435548718183965521<48> · 38784854704818871237674570715604655076738950339421849949486353744053423298050903282396196418361477719330298221232535393256881 <125> (Jo Yeong Uk / GGNFS-0.77.1-20050930-k8 / 121.74 hours on Core 2 Duo E6300@2.33GHz / Apr 22, 2007) 6·10172 +1 =6( 0) 171 1<173> = 29 · 199 · 16071179 · 19040639559853345070153144890519<32> · 33975895006073920745483829891601971700743187759442035498563591928892715199253724062640060946711525430463604441778590052394140275231 <131> (Makoto Kamada / GMP-ECM 6.1.2 B1=250000, sigma=1259013039 for P32 / Mar 27, 2007) 6·10173 +1 =6( 0) 172 1<174> = 21541129 · 27853693276708012843709352467087495738965213940272118513379684045344141432884042428788203255270417813291030381926592612671322844777541604249248031521467607384923974969 <167> 6·10174 +1 =6( 0) 173 1<175> = 72 · 26739999478904985595633<23> · 2530871633323057178390377682713<31> · 1809354470273988391909928868065730996169303489059876315412862866428943687873409338301708886637922973447152338599360182281 <121> (Makoto Kamada / GMP-ECM 6.1.2 B1=250000, sigma=1641265231 for P31 / Mar 27, 2007) 6·10175 +1 =6( 0) 174 1<176> = 31 · 227 · 18229 · 142965322616087752221825023<27> · [3271674927454503946351778908731093597432135074118241825266750809997264745464837343269894562027727499605259733648083021004609399100642593226719 <142> ] SUBMIT/RESERVE 6·10176 +1 =6( 0) 175 1<177> = 1030061 · 759763843008042511<18> · 766672144559061628890362809860246401749327549579192810118560668328581190184331587072870045980078093533295409943121533471797139072738514272272184421422731 <153> 6·10177 +1 =6( 0) 176 1<178> = 1711983023<10> · [3504707651531425262270255585355766696758884857236110570939931569636832783008269352446726920609188774648263553487352543682321317037966912128660752496258837024694023499087 <169> ] SUBMIT/RESERVE 6·10178 +1 =6( 0) 177 1<179> = 223 · 23027 · 104789 · 1426643 · 40644591731<11> · 1922982159835701962150458941690226028839255940333920593187848701699883509225282546417481896412237304915230566990618028032839551868545552478944916472713 <151> 6·10179 +1 =6( 0) 178 1<180> = 17 · 751 · 112771 · 518476220445751<15> · 7132513818777656481169<22> · 112692106264930656963353447779273751723066822219291723251430616150893819819926889355130216345663562021311482951308997824134576583591747 <135> 6·10180 +1 =6( 0) 179 1<181> = 7 · 53 · 5189 · 1530654942827<13> · [2036180958583651599919324369895283334276379392748411313706838298632139875636431258517052429423184385967502888554627103436454845173306061562588430970166718470572477 <163> ] SUBMIT/RESERVE 6·10181 +1 =6( 0) 180 1<182> = 23 · 61 · 22921 · 1872699346433998020537767237<28> · [996304195760147997067562108673821534929496595129015951823604834209205894024502191944842412261659576950028689198887149061532283496510397260878954271 <147> ] SUBMIT/RESERVE 6·10182 +1 =6( 0) 181 1<183> = 197 · 145547 · 1137803 · [18391395823449372300575893180223312543185970054154952630352403989388712406544792922867043474269789628321139510554494097239501557913706825725190124681389399364840334287413 <170> ] SUBMIT/RESERVE 6·10183 +1 =6( 0) 182 1<184> = 20333 · 10194940864693489<17> · 28944435148578785733104660113465072797152479367601174647170452255255351712646305441136563428992615113626275537468635220759236152222648647988056301400691764608750773 <164> 6·10184 +1 =6( 0) 183 1<185> = 587 · 6203 · 325333469 · 713020687 · 71036326324885719916006924101251043260542849380055405036227243025556824832034153023040670401241782980289641135898120243779064840152646514058646245571449472789347 <161> 6·10185 +1 =6( 0) 184 1<186> = 19 · 167 · 3149035144740077<16> · 30217523095511560432976100709<29> · [1987214777147857751405440882712878768498289240274665943254488411740605391914998115487412671203360049610514137987060572328808885079490819309 <139> ] SUBMIT/RESERVE 6·10186 +1 =6( 0) 185 1<187> = 7 · 10163 · 62671630591<11> · 1345737301505097687201439347428036846138371098114174304318480099980843850210046146833023361562269414714787790594720740673267590241197928585436790524132914144562207600247571 <172> 6·10187 +1 =6( 0) 186 1<188> = 4547 · 6536834037833420095985946925674276836560136508795702561667702266167<67> · 2018639826103785865286631933082975605890545795355024440916114945745465813061205948102752034943266139296166842862791149 <118> (Wataru Sakai / GGNFS-0.77.1-20060722-nocona snfs / 777.86 hours / Aug 27, 2008) 6·10188 +1 =6( 0) 187 1<189> = 1637 · 57366058831<11> · 91095427949217511<17> · 22030613152866699260353<23> · 3183643221139836301633704566827700114389439812117447115877607563174062544857782710167851006811747130033335416499676921705100923728652101 <136> 6·10189 +1 =6( 0) 188 1<190> = 42589 · 5780291335866737<16> · 107788304148617970061487122159<30> · 174013302696433020274845304681<30> · 18309085696764041534162136664724986762411<41> · 70971393580825121102733841341176453634821357709829428898091709401554553<71> (Makoto Kamada / GMP-ECM 6.1.2 B1=250000, sigma=4096400016 for P30 / Mar 27, 2007) (Serge Batalov / GMP-ECM 6.2.1 B1=3000000, sigma=2803236752 for P30, Msieve+pol51select gnfs for P41 x P71 / 16.0 hours on Opteron-2.2GHz; Linux x86_64 / Aug 3, 2008) 6·10190 +1 =6( 0) 189 1<191> = 31 · 317 · 607 · 4014704477167<13> · 2505463157764540601632715230028063963509462985755629687871628272822482673435884812516654525020188175592347477023966102366980522080623114977847924939420382160579296254327227 <172> 6·10191 +1 =6( 0) 190 1<192> = 131635826256638403650836189<27> · 4558029656988930544160466050975243216804086899733582752815935681533569740973520942156018486465079186654037838635878625973621820618371568810759829632545572174289678709 <166> 6·10192 +1 =6( 0) 191 1<193> = 7 · 99079 · 687912079 · [12575887987552449949026242858572851364527613573509060923551620410457482729565243389228910414519077788326664190901048863112517318053854082566295455325857182378946464323168683102623 <179> ] SUBMIT/RESERVE 6·10193 +1 =6( 0) 192 1<194> = 53 · 1009 · 500066384184503<15> · 419477943340664305459<21> · 5348689947030520136369877611008157028910945064205692570927331747738290069137351398562510725948141270187377372256033232564725133808464233517898734873007769 <154> 6·10194 +1 =6( 0) 193 1<195> = 153817 · 33881245227068299278185531<26> · 901361069267656452128353133474957<33> · [127728776954149061732629779151943546510736581677373866290113899810994265965188567884730521444012921154476658141238516044262272295959 <132> ] (Serge Batalov / GMP-ECM 6.2.1 B1=1000000, sigma=3175350205 for P33 / Jul 13, 2008) SUBMIT/RESERVE 6·10195 +1 =6( 0) 194 1<196> = 17 · 353 · 421 · 53984968629707<14> · 5444649381690383<16> · 450367983155898302933<21> · [17940529133815885800153881115863745792404754507504894161833210949988179704602632689155214043439581558442074568668317290243055511365952998997 <140> ] SUBMIT/RESERVE 6·10196 +1 =6( 0) 195 1<197> = 4526985911422555852980453461875447673693370404671619628486604463189<67> · 13253851718117155717822280766012995701858464863771693748201984239161431357726436028994453405662098135543550990120795749232748691709 <131> (Wataru Sakai / GGNFS-0.77.1-20060722-nocona snfs / 2601.57 hours / Jul 21, 2008) 6·10197 +1 =6( 0) 196 1<198> = 139 · 407899 · 1342591 · 861735247427<12> · 14372479836996783727118873851<29> · 636406362238420386067405897142966505290908179596403443220782248012253741879671512661660594487605220807515330784453069807282234525943730437109463 <144> 6·10198 +1 =6( 0) 197 1<199> = 7 · 83 · 827 · [12487330562533429624526782202223993573187203816128219910216093255384640999652435966009486208784004562038098845546289493784431212498985404391794158843007198946069300522178539689939582132294942423 <194> ] SUBMIT/RESERVE 6·10199 +1 =6( 0) 198 1<200> = 100827365033<12> · 21583541164043<14> · 10056670285225909<17> · 2683916005958404450397<22> · 479403087032713635428088886452712241517044136079900092034489<60> · 2130718979593492245520692728000484684740606068588764504461505725233767054216707<79> (Tyler Cadigan / GGNFS, Msieve gnfs for P60 x P79 / 729.05 hours on C2Q Q6600 2.40 Ghz, 4 GB RAM, Windows Vista / Jul 10, 2008) 6·10200 +1 =6( 0) 199 1<201> = 29 · 367530286683762818311653969900003494345257271270268514080948164981978980653079960969<84> · 56293742099725151227484967667076511849333661046901547637197489587498221199711228253147257513850471263698402737741901 <116> (Serge Batalov / Msieve 1.36 / 13 CPU-days on Opteron-2.8GHz; Linux x86_64 / Jul 4, 2008)