THE LARGEST KNOWN PRIMES (Primes with 600,000 or more digits) (selected smaller primes which have comments are included) Originally Compiled by Samuel Yates -- Continued by Chris Caldwell (Mon Mar 25 05:51:06 CDT 2019) So that I can maintain this database of the 5,000 largest known primes (plus selected smaller primes with 1,000 or more digits), please send any new primes (that are large enough) to: http://primes.utm.edu/bios/submission.php This list in a searchable form (plus information such as how to find large primes and how to prove primality) is available at the interactive web site: http://primes.utm.edu/primes/ See the last pages for information about the provers. Professor Chris K. Caldwell Mathematics and Statistics caldwell@utm.edu University of Tennessee at Martin http://www.utm.edu/~caldwell/ Martin, TN 38238, USA The letters after the rank refer to when the prime was submitted. 'a' is this month, 'b' last month... ----- ------------------------------- -------- ----- ---- -------------- rank description digits who year comment ----- ------------------------------- -------- ----- ---- -------------- 1d 2^82589933-1 24862048 G16 2018 Mersenne 51?? 2 2^77232917-1 23249425 G15 2018 Mersenne 50?? 3 2^74207281-1 22338618 G14 2016 Mersenne 49?? 4 2^57885161-1 17425170 G13 2013 Mersenne 48? 5 2^43112609-1 12978189 G10 2008 Mersenne 47 6 2^42643801-1 12837064 G12 2009 Mersenne 46 7 2^37156667-1 11185272 G11 2008 Mersenne 45 8 2^32582657-1 9808358 G9 2006 Mersenne 44 9 10223*2^31172165+1 9383761 SB12 2016 10 2^30402457-1 9152052 G9 2005 Mersenne 43 11 2^25964951-1 7816230 G8 2005 Mersenne 42 12 2^24036583-1 7235733 G7 2004 Mersenne 41 13 2^20996011-1 6320430 G6 2003 Mersenne 40 14e 1059094^1048576+1 6317602 L4720 2018 Generalized Fermat 15 919444^1048576+1 6253210 L4286 2017 Generalized Fermat 16 168451*2^19375200+1 5832522 L4676 2017 17 Phi(3,-123447^524288) 5338805 L4561 2017 Generalized unique 18 8508301*2^17016603-1 5122515 L4784 2018 Woodall 19 Phi(3,-143332^393216) 4055114 L4506 2017 Generalized unique 20 2^13466917-1 4053946 G5 2001 Mersenne 39 21 19249*2^13018586+1 3918990 SB10 2007 22 3*2^11895718-1 3580969 L4159 2015 23 3*2^11731850-1 3531640 L4103 2015 24 3*2^11484018-1 3457035 L3993 2014 25 193997*2^11452891+1 3447670 L4398 2018 26a 2733014^524288+1 3374655 L4929 2019 Generalized Fermat 27 2312092^524288+1 3336572 L4720 2018 Generalized Fermat 28 2061748^524288+1 3310478 L4783 2018 Generalized Fermat 29 1880370^524288+1 3289511 L4201 2018 Generalized Fermat 30 3*2^10829346+1 3259959 L3770 2014 Divides GF(10829343,3), GF(10829345,5) 31 Phi(3,-844833^262144) 3107335 L4506 2017 Generalized unique 32 Phi(3,-712012^262144) 3068389 L4506 2017 Generalized unique 33 475856^524288+1 2976633 L3230 2012 Generalized Fermat 34 1806676*41^1806676+1 2913785 L4668 2018 Generalized Cullen 35 356926^524288+1 2911151 L3209 2012 Generalized Fermat 36 341112^524288+1 2900832 L3184 2012 Generalized Fermat 37 27653*2^9167433+1 2759677 SB8 2005 38 90527*2^9162167+1 2758093 L1460 2010 39 1323365*116^1323365+1 2732038 L4718 2018 Generalized Cullen 40 273809*2^8932416-1 2688931 L1056 2017 41 2038*366^1028507-1 2636562 L2054 2016 42 75898^524288+1 2558647 p334 2011 Generalized Fermat 43 28433*2^7830457+1 2357207 SB7 2004 44 1341174*53^1341174+1 2312561 L4668 2017 Generalized Cullen 45 Phi(3,-558640^196608) 2259865 L4506 2017 Generalized unique 46 737*2^7269322-1 2188287 L4665 2017 47 502573*2^7181987-1 2162000 L3964 2014 48 402539*2^7173024-1 2159301 L3961 2014 49 3343*2^7166019-1 2157191 L1884 2016 50 161041*2^7107964+1 2139716 L4034 2015 51f 27*2^7046834+1 2121310 L3483 2018 52 3*2^7033641+1 2117338 L2233 2011 Divides GF(7033639,3) 53 33661*2^7031232+1 2116617 SB11 2007 54 Phi(3,-237804^196608) 2114016 L4506 2017 Generalized unique 55 2^6972593-1 2098960 G4 1999 Mersenne 38 56 4*72^1119849-1 2079933 L4444 2016 57 127*2^6836153-1 2057890 L1862 2018 58 40597*2^6808509-1 2049571 L3749 2013 59 6679881*2^6679881+1 2010852 L917 2009 Cullen 60 37*2^6660841-1 2005115 L3933 2014 61 304207*2^6643565-1 1999918 L3547 2013 62 398023*2^6418059-1 1932034 L3659 2013 63 1582137*2^6328550+1 1905090 L801 2009 Cullen 64 194368*5^2638045-1 1843920 L690 2018 65 66916*5^2628609-1 1837324 L690 2018 66 3*2^6090515-1 1833429 L1353 2010 67 1583*2^5989282-1 1802957 L4036 2015 68d 6291332^262144+1 1782250 L4864 2018 Generalized Fermat 69d 6287774^262144+1 1782186 L4726 2018 Generalized Fermat 70 327926*5^2542838-1 1777374 L4807 2018 71 81556*5^2539960+1 1775361 L4809 2018 72 5828034^262144+1 1773542 L4720 2018 Generalized Fermat 73b 993*10^1768283-1 1768286 L4879 2019 Near-repdigit 74 5205422^262144+1 1760679 L4201 2018 Generalized Fermat 75 5152128^262144+1 1759508 L4720 2018 Generalized Fermat 76 4489246^262144+1 1743828 L4591 2018 Generalized Fermat 77 7*2^5775996+1 1738749 L3325 2012 78 4246258^262144+1 1737493 L4720 2018 Generalized Fermat 79 3933508^262144+1 1728783 L4309 2018 Generalized Fermat 80 3853792^262144+1 1726452 L4715 2018 Generalized Fermat 81 3673932^262144+1 1721010 L4649 2017 Generalized Fermat 82 3596074^262144+1 1718572 L4689 2017 Generalized Fermat 83 3547726^262144+1 1717031 L4201 2017 Generalized Fermat 84 1243*2^5686715-1 1711875 L1828 2016 85 3060772^262144+1 1700222 L4649 2017 Generalized Fermat 86 9*2^5642513+1 1698567 L3432 2013 87 2622*11^1621920-1 1689060 L2054 2015 88 2676404^262144+1 1684945 L4591 2017 Generalized Fermat 89 301562*5^2408646-1 1683577 L4675 2017 90 2611294^262144+1 1682141 L4250 2017 Generalized Fermat 91 171362*5^2400996-1 1678230 L4669 2017 92 2514168^262144+1 1677825 L4564 2017 Generalized Fermat 93 252191*2^5497878-1 1655032 L3183 2012 94 2042774^262144+1 1654187 L4499 2016 Generalized Fermat 95 1828858^262144+1 1641593 L4200 2016 Generalized Fermat 96 258317*2^5450519+1 1640776 g414 2008 97 5*2^5429494-1 1634442 L3345 2017 98 43*2^5408183-1 1628027 L1884 2018 99 1615588^262144+1 1627477 L4200 2016 Generalized Fermat 100 1349*2^5385004-1 1621051 L1828 2017 101 1488256^262144+1 1618131 L4249 2016 Generalized Fermat 102 1415198^262144+1 1612400 L4308 2016 Generalized Fermat 103 Phi(3,-1082083^131072) 1581846 L4506 2017 Generalized unique 104 180062*5^2249192-1 1572123 L4435 2016 105b 124125*6^2018254+1 1570512 L4001 2019 106 27*2^5213635+1 1569462 L3760 2015 107 Phi(3,-843575^131072) 1553498 L4506 2017 Generalized unique 108 53546*5^2216664-1 1549387 L4398 2016 109 773620^262144+1 1543643 L3118 2012 Generalized Fermat 110b 99*10^1536527-1 1536529 L4879 2019 Near-repdigit 111b 992*10^1533933-1 1533936 L4879 2019 Near-repdigit 112 51*2^5085142-1 1530782 L760 2014 113 3*2^5082306+1 1529928 L780 2009 Divides GF(5082303,3), GF(5082305,5) 114 676754^262144+1 1528413 L2975 2012 Generalized Fermat 115 296024*5^2185270-1 1527444 L671 2016 116 5359*2^5054502+1 1521561 SB6 2003 117 13*2^4998362+1 1504659 L3917 2014 118 525094^262144+1 1499526 p338 2012 Generalized Fermat 119 92158*5^2145024+1 1499313 L4348 2016 120 77072*5^2139921+1 1495746 L4340 2016 121 306398*5^2112410-1 1476517 L4274 2016 122 265711*2^4858008+1 1462412 g414 2008 123 154222*5^2091432+1 1461854 L3523 2015 124 1271*2^4850526-1 1460157 L1828 2012 125 Phi(3,-362978^131072) 1457490 p379 2015 Generalized unique 126 361658^262144+1 1457075 p332 2011 Generalized Fermat 127 100186*5^2079747-1 1453686 L4197 2015 128 2^4792057-2^2396029+1 1442553 L3839 2014 Gaussian Mersenne norm 40? 129 653*10^1435026-1 1435029 p355 2014 130e 1229*2^4703492-1 1415896 L1828 2018 131 144052*5^2018290+1 1410730 L4146 2015 132 9*2^4683555-1 1409892 L1828 2012 133 34*993^469245+1 1406305 L4806 2018 134 79*2^4658115-1 1402235 L1884 2018 135 11*2^4643238-1 1397755 L2484 2014 136 68*995^465908-1 1396712 L4001 2017 137 Phi(3,-192098^131072) 1385044 p379 2015 Generalized unique 138 27*2^4583717-1 1379838 L2992 2014 139 121*2^4553899-1 1370863 L3023 2012 140 27*2^4542344-1 1367384 L1204 2014 141 4*797^468702+1 1359920 L4548 2017 Generalized Fermat 142 145310^262144+1 1353265 p314 2011 Generalized Fermat 143c 2*1283^432757+1 1345108 L4879 2019 Divides Phi(1283^432757,2) 144 36772*6^1723287-1 1340983 L1301 2014 145 151*2^4424321-1 1331856 L1884 2016 146 49*2^4365175-1 1314051 L1959 2017 147 49*2^4360869-1 1312755 L1959 2017 148 13*2^4333087-1 1304391 L1862 2018 149 353159*2^4331116-1 1303802 L2408 2011 150 682156*79^682156+1 1294484 L4472 2016 Generalized Cullen 151 141941*2^4299438-1 1294265 L689 2011 152c 2*1151^417747+1 1278756 L4879 2019 Divides Phi(1151^417747,2) 153 15*2^4246384+1 1278291 L3432 2013 Divides GF(4246381,6) 154 3*2^4235414-1 1274988 L606 2008 155 109208*5^1816285+1 1269534 L3523 2014 156e 1091*2^4215518-1 1269001 L1828 2018 157 191*2^4203426-1 1265360 L2484 2012 158 1259*2^4196028-1 1263134 L1828 2016 159 325918*5^1803339-1 1260486 L3567 2014 160 133778*5^1785689+1 1248149 L3903 2014 161 17*2^4107544-1 1236496 L4113 2015 162 24032*5^1768249+1 1235958 L3925 2014 163 172*159^561319-1 1235689 L4001 2017 164 1031*2^4054974-1 1220672 L1828 2017 165 39653*430^460397-1 1212446 L4187 2016 166 40734^262144+1 1208473 p309 2011 Generalized Fermat 167 9*2^4005979-1 1205921 L1828 2012 168 12*68^656921+1 1203815 L4001 2016 169 67*688^423893+1 1202836 L4001 2017 170 1993191*2^3986382-1 1200027 L3532 2015 Generalized Woodall 171 138172*5^1714207-1 1198185 L3904 2014 172 Phi(3,-1202113^98304) 1195366 L4506 2016 Generalized unique 173 Phi(3,-1110815^98304) 1188622 L4506 2016 Generalized unique 174 22478*5^1675150-1 1170884 L3903 2014 175 1199*2^3889576-1 1170883 L1828 2018 176 298989*2^3886857+1 1170067 L2777 2014 Generalized Cullen 177 27*2^3855094-1 1160501 L3033 2012 178 164*978^387920-1 1160015 L4700 2018 179c 2*839^394257+1 1152714 L4879 2019 Divides Phi(839^394257,2) 180 30*514^424652-1 1151218 L4001 2017 181 24518^262144+1 1150678 g413 2008 Generalized Fermat 182 Phi(3,-700219^98304) 1149220 L4506 2016 Generalized unique 183c 241*2^3815727-1 1148651 L2484 2019 184f 109*980^383669-1 1147643 L4001 2018 185 123547*2^3804809-1 1145367 L2371 2011 186 2564*75^610753+1 1145203 L3610 2014 187 Phi(3,-660955^98304) 1144293 L4506 2016 Generalized unique 188 326834*5^1634978-1 1142807 L3523 2014 189 415267*2^3771929-1 1135470 L2373 2011 190 11*2^3771821+1 1135433 p286 2013 191d 265*2^3765189-1 1133438 L2484 2018 192 938237*2^3752950-1 1129757 L521 2007 Woodall 193 207394*5^1612573-1 1127146 L3869 2014 194 684*10^1127118+1 1127121 L4036 2017 195 Phi(3,-535386^98304) 1126302 L4506 2016 Generalized unique 196 104944*5^1610735-1 1125861 L3849 2014 197 23451*2^3739388+1 1125673 L591 2015 198c 2*1103^368361+1 1120767 L4879 2019 Divides Phi(1103^368361,2) 199c 2*131^528469+1 1118913 L4879 2019 Divides Phi(131^528469,2) 200 2^3704053+2^1852027+1 1115032 L3839 2014 Gaussian Mersenne norm 39? 201d 119*2^3698412-1 1113336 L2484 2018 202 330286*5^1584399-1 1107453 L3523 2014 203 13*2^3675223-1 1106354 L1862 2016 204 15*2^3668194-1 1104238 L3665 2013 205 13*2^3664703-1 1103187 L1862 2016 206 Phi(3,-406515^98304) 1102790 L4506 2016 Generalized unique 207 33300*430^417849-1 1100397 L4393 2016 208 65531*2^3629342-1 1092546 L2269 2011 209d 215*2^3628962-1 1092429 L2484 2018 210 113*2^3628034-1 1092150 L2484 2014 211c 2*431^414457+1 1091878 L4879 2019 Divides Phi(431^414457,2) 212 29*920^367810-1 1090113 L4064 2015 213 14641*2^3618876+1 1089395 L181 2018 Generalized Fermat 214a 485*2^3618563+1 1089299 L3924 2019 215a 95*2^3614033+1 1087935 L1474 2019 216a 1005*2^3612300+1 1087414 L1823 2019 217a 861*2^3611815+1 1087268 L1745 2019 218b 1087*2^3611476+1 1087166 L4834 2019 219 485767*2^3609357-1 1086531 L622 2008 220b 675*2^3606447+1 1085652 L3278 2019 221b 669*2^3606266+1 1085598 L1675 2019 222b 851*2^3604395+1 1085034 L2125 2019 223b 1143*2^3602429+1 1084443 L4754 2019 224b 1183*2^3601898+1 1084283 L1823 2019 225 189*2^3596375+1 1082620 L3760 2016 226b 1089*2^3593267+1 1081685 L3035 2019 227c 1101*2^3589103+1 1080431 L1823 2019 228 35*2^3587843+1 1080050 L1979 2014 Divides GF(3587841,5) 229 275*2^3585539+1 1079358 L3803 2016 230 2*59^608685+1 1077892 g427 2014 Divides Phi(59^608685,2) 231d 651*2^3579843+1 1077643 L3035 2018 232d 583*2^3578402+1 1077210 L3035 2018 233 309*2^3577339+1 1076889 L4406 2016 234d 1185*2^3574583+1 1076060 L4851 2018 235 251*2^3574535+1 1076045 L3035 2016 236e 1019*2^3571635+1 1075173 L1823 2018 237e 119*2^3571416-1 1075106 L2484 2018 238 35*2^3570777+1 1074913 L2891 2014 239 33*2^3570132+1 1074719 L2552 2014 240 5*2^3569154-1 1074424 L503 2009 241 81*492^399095-1 1074352 L4001 2015 242 22934*5^1536762-1 1074155 L3789 2014 243e 265*2^3564373-1 1072986 L2484 2018 244e 771*2^3564109+1 1072907 L2125 2018 245 381*2^3563676+1 1072776 L4190 2016 246f 555*2^3563328+1 1072672 L4850 2018 247f 1183*2^3560584+1 1071846 L1823 2018 248 415*2^3559614+1 1071554 L3035 2016 249 1103*2^3558176-1 1071121 L1828 2018 250 1379*2^3557072-1 1070789 L1828 2018 251 681*2^3553141+1 1069605 L3035 2018 252 599*2^3551793+1 1069200 L3824 2018 253 621*2^3551472+1 1069103 L4687 2018 254 773*2^3550373+1 1068772 L1808 2018 255 1199*2^3548380-1 1068172 L1828 2018 256 191*2^3548117+1 1068092 L4203 2015 257 867*2^3547711+1 1067971 L4155 2018 258 Phi(3,3^1118781+1)/3 1067588 L3839 2014 Generalized unique 259 351*2^3545752+1 1067381 L4082 2016 260 93*2^3544744+1 1067077 L1728 2014 261 1159*2^3543702+1 1066764 L1823 2018 262 178658*5^1525224-1 1066092 L3789 2014 263 1085*2^3539671+1 1065551 L3035 2018 264 465*2^3536871+1 1064707 L4459 2016 265 1019*2^3536312-1 1064539 L1828 2012 266 1179*2^3534450+1 1063979 L3035 2018 267 447*2^3533656+1 1063740 L4457 2016 268 1059*2^3533550+1 1063708 L1823 2018 269 345*2^3532957+1 1063529 L4314 2016 270 553*2^3532758+1 1063469 L1823 2018 271 141*2^3529287+1 1062424 L4185 2015 272 13*2^3527315-1 1061829 L1862 2016 273 1393*2^3525571-1 1061306 L1828 2017 274 1071*2^3523944+1 1060816 L1675 2018 275 329*2^3518451+1 1059162 L1823 2016 276 135*2^3518338+1 1059128 L4045 2015 277 2*10^1059002-1 1059003 L3432 2013 Near-repdigit 278 64*10^1058794+1 1058796 L4036 2017 Generalized Fermat 279 599*2^3515959+1 1058412 L1823 2018 280 7*2^3511774+1 1057151 p236 2008 Divides GF(3511773,6) 281 1135*2^3510890+1 1056887 L1823 2018 282 428639*2^3506452-1 1055553 L2046 2011 283 555*2^3502765+1 1054441 L1823 2018 284 643*2^3501974+1 1054203 L1823 2018 285 2*23^774109+1 1054127 g427 2014 Divides Phi(23^774109,2) 286 1159*2^3501490+1 1054057 L2125 2018 287 1189*2^3499042+1 1053320 L4724 2018 288 609*2^3497474+1 1052848 L1823 2018 289 9*2^3497442+1 1052836 L1780 2012 Generalized Fermat, divides GF(3497441,10) 290 87*2^3496188+1 1052460 L1576 2014 291 783*2^3494129+1 1051841 L3824 2018 292 51*2^3490971+1 1050889 L1823 2014 293 753*2^3488818+1 1050242 L1823 2018 294 699*2^3487253+1 1049771 L1204 2018 295 249*2^3486411+1 1049517 L4045 2015 296 195*2^3486379+1 1049507 L4108 2015 297 59912*5^1500861+1 1049062 L3772 2014 298 495*2^3484656+1 1048989 L3035 2016 299 323*2^3482789+1 1048427 L1204 2016 300 1149*2^3481694+1 1048098 L1823 2018 301 701*2^3479779+1 1047521 L2125 2018 302 813*2^3479728+1 1047506 L4724 2018 303 197*2^3477399+1 1046804 L2125 2015 304 491*2^3473837+1 1045732 L4343 2016 305 1061*2^3471354-1 1044985 L1828 2017 306 641*2^3464061+1 1042790 L1444 2018 307 453*2^3461688+1 1042075 L3035 2016 308 571*2^3460216+1 1041632 L3035 2018 309 1155*2^3455254+1 1040139 L4711 2017 310 37292*5^1487989+1 1040065 L3553 2013 311 1273*2^3448551-1 1038121 L1828 2012 312 1065*2^3447906+1 1037927 L4664 2017 313 1155*2^3446253+1 1037429 L3035 2017 314 27288429267119080686...(1036580 other digits)...83679577406643267931 1036620 p384 2015 315 943*2^3442990+1 1036447 L4687 2017 316 943*2^3440196+1 1035606 L1448 2017 317 543*2^3438810+1 1035188 L3035 2017 318 625*2^3438572+1 1035117 L1355 2017 Generalized Fermat 319 113*2^3437145+1 1034686 L4045 2015 320 1147*2^3435970+1 1034334 L3035 2017 321 911*2^3432643+1 1033332 L1355 2017 322 1127*2^3427219+1 1031699 L3035 2017 323 159*2^3425766+1 1031261 L4045 2015 324 1119*2^3422189+1 1030185 L1355 2017 325 1005*2^3420846+1 1029781 L2714 2017 Divides GF(3420844,10) 326c 93*10^1029523-1 1029525 L4789 2019 Near-repdigit 327 975*2^3419230+1 1029294 L3545 2017 328 999*2^3418885+1 1029190 L3035 2017 329 907*2^3417890+1 1028891 L3035 2017 330 191249*2^3417696-1 1028835 L1949 2010 331 479*2^3411975+1 1027110 L2873 2016 332 245*2^3411973+1 1027109 L1935 2015 333 177*2^3411847+1 1027071 L4031 2015 334 113*2^3409934-1 1026495 L2484 2014 335 59*2^3408416-1 1026038 L426 2010 336 953*2^3405729+1 1025230 L3035 2017 337 373*2^3404702+1 1024921 L3924 2016 338 833*2^3403765+1 1024639 L3035 2017 339 24*414^391179+1 1023717 L4273 2016 340 1167*2^3399748+1 1023430 L3545 2017 341 611*2^3398273+1 1022985 L3035 2017 342 255*2^3395661+1 1022199 L3898 2014 343 1049*2^3395647+1 1022195 L3035 2017 344 342924651*2^3394939-1 1021988 L4166 2017 345 555*2^3393389+1 1021515 L2549 2017 346 609*2^3392301+1 1021188 L3035 2017 347 303*2^3391977+1 1021090 L2602 2016 348 805*2^3391818+1 1021042 L4609 2017 349 67*2^3391385-1 1020911 L1959 2014 350 663*2^3390469+1 1020636 L4316 2017 351 453*2^3387048+1 1019606 L2602 2016 352 173198*5^1457792-1 1018959 L3720 2013 353a 58589880^131072+1 1018145 L4923 2019 Generalized Fermat 354a 58523466^131072+1 1018080 L4802 2019 Generalized Fermat 355a 58447816^131072+1 1018006 L4591 2019 Generalized Fermat 356a 58447642^131072+1 1018006 L4591 2019 Generalized Fermat 357b 58247118^131072+1 1017811 L4309 2019 Generalized Fermat 358b 57704312^131072+1 1017278 L4591 2019 Generalized Fermat 359b 57694224^131072+1 1017268 L4656 2019 Generalized Fermat 360b 57594734^131072+1 1017169 L4656 2019 Generalized Fermat 361b 57438404^131072+1 1017015 L4745 2019 Generalized Fermat 362 621*2^3378148+1 1016927 L3035 2017 363 1093*2^3378000+1 1016883 L4583 2017 364 861*2^3377601+1 1016763 L4582 2017 365b 56917336^131072+1 1016496 L4729 2019 Generalized Fermat 366b 56735576^131072+1 1016314 L4760 2019 Generalized Fermat 367b 56584816^131072+1 1016162 L4289 2019 Generalized Fermat 368b 56459558^131072+1 1016036 L4892 2019 Generalized Fermat 369b 56383242^131072+1 1015959 L4889 2019 Generalized Fermat 370b 56307420^131072+1 1015883 L4843 2019 Generalized Fermat 371 208003!-1 1015843 p394 2016 Factorial 372c 55645700^131072+1 1015210 L4745 2019 Generalized Fermat 373c 55579418^131072+1 1015142 L4745 2019 Generalized Fermat 374c 55268442^131072+1 1014822 L4525 2019 Generalized Fermat 375 179*2^3371145+1 1014819 L3763 2014 376d 55184170^131072+1 1014736 L4871 2018 Generalized Fermat 377d 55015050^131072+1 1014561 L4205 2018 Generalized Fermat 378 839*2^3369383+1 1014289 L2891 2017 379 677*2^3369115+1 1014208 L2103 2017 380e 54548788^131072+1 1014076 L4726 2018 Generalized Fermat 381 715*2^3368210+1 1013936 L4527 2017 382 617*2^3368119+1 1013908 L4552 2017 383e 54361742^131072+1 1013881 L4210 2018 Generalized Fermat 384e 54334044^131072+1 1013852 L4745 2018 Generalized Fermat 385f 54212352^131072+1 1013724 L4307 2018 Generalized Fermat 386f 54206254^131072+1 1013718 L4249 2018 Generalized Fermat 387 777*2^3367372+1 1013683 L4408 2017 388f 54161106^131072+1 1013670 L4307 2018 Generalized Fermat 389f 54032538^131072+1 1013535 L4591 2018 Generalized Fermat 390 61*2^3366033-1 1013279 L4405 2017 391 369*2^3365614+1 1013154 L4364 2016 392 53659976^131072+1 1013141 L4823 2018 Generalized Fermat 393 53161266^131072+1 1012610 L4307 2018 Generalized Fermat 394 53078434^131072+1 1012521 L4835 2018 Generalized Fermat 395 533*2^3362857+1 1012324 L3171 2017 396 619*2^3362814+1 1012311 L4527 2017 397 52712138^131072+1 1012127 L4819 2018 Generalized Fermat 398 104*873^344135-1 1012108 L4700 2018 399 52412612^131072+1 1011802 L4289 2018 Generalized Fermat 400 52043532^131072+1 1011400 L4810 2018 Generalized Fermat 401 51954384^131072+1 1011303 L4720 2018 Generalized Fermat 402 51872628^131072+1 1011213 L4591 2018 Generalized Fermat 403 51580416^131072+1 1010891 L4765 2018 Generalized Fermat 404 51570250^131072+1 1010880 L4591 2018 Generalized Fermat 405 51567684^131072+1 1010877 L4800 2018 Generalized Fermat 406 51269192^131072+1 1010547 L4795 2018 Generalized Fermat 407 50963598^131072+1 1010206 L4726 2018 Generalized Fermat 408 50844724^131072+1 1010074 L4656 2018 Generalized Fermat 409 50495632^131072+1 1009681 L4591 2018 Generalized Fermat 410 9*10^1009567-1 1009568 L3735 2016 Near-repdigit 411 1183*2^3353058+1 1009375 L3824 2017 412 50217306^131072+1 1009367 L4720 2018 Generalized Fermat 413 81*2^3352924+1 1009333 L1728 2012 Generalized Fermat 414 50110436^131072+1 1009245 L4591 2018 Generalized Fermat 415 50055102^131072+1 1009183 L4309 2018 Generalized Fermat 416 543*2^3351686+1 1008961 L4198 2017 417 49817700^131072+1 1008912 L4760 2018 Generalized Fermat 418 49530004^131072+1 1008582 L4591 2018 Generalized Fermat 419 49397682^131072+1 1008430 L4764 2018 Generalized Fermat 420 49331672^131072+1 1008354 L4763 2018 Generalized Fermat 421 393*2^3349525+1 1008311 L3101 2016 422 49243622^131072+1 1008252 L4741 2018 Generalized Fermat 423 49225986^131072+1 1008232 L4757 2018 Generalized Fermat 424 49090656^131072+1 1008075 L4752 2018 Generalized Fermat 425 49038514^131072+1 1008015 L4743 2018 Generalized Fermat 426 48643706^131072+1 1007554 L4691 2018 Generalized Fermat 427 48370248^131072+1 1007234 L4701 2018 Generalized Fermat 428 48273828^131072+1 1007120 L4456 2018 Generalized Fermat 429 47179704^131072+1 1005815 L4673 2017 Generalized Fermat 430 47090246^131072+1 1005707 L4654 2017 Generalized Fermat 431 733*2^3340464+1 1005583 L3035 2016 432 57*2^3339932-1 1005422 L3519 2015 433 46776558^131072+1 1005326 L4659 2017 Generalized Fermat 434 46736070^131072+1 1005277 L4245 2017 Generalized Fermat 435 46730280^131072+1 1005270 L4656 2017 Generalized Fermat 436 46413358^131072+1 1004883 L4626 2017 Generalized Fermat 437 46385310^131072+1 1004848 L4622 2017 Generalized Fermat 438 46371508^131072+1 1004831 L4620 2017 Generalized Fermat 439 651*2^3337101+1 1004571 L3260 2016 440 46077492^131072+1 1004469 L4595 2017 Generalized Fermat 441 1087*2^3336385-1 1004355 L1828 2012 442 849*2^3335669+1 1004140 L3035 2016 443 611*2^3334875+1 1003901 L3813 2016 444 45570624^131072+1 1003840 L4295 2017 Generalized Fermat 445 403*2^3334410+1 1003761 L4293 2016 446 45315256^131072+1 1003520 L4562 2017 Generalized Fermat 447 44919410^131072+1 1003020 L4295 2017 Generalized Fermat 448 673*2^3330436+1 1002564 L3035 2016 449 44438760^131072+1 1002408 L4505 2016 Generalized Fermat 450 193*2^3329782+1 1002367 L3460 2014 Divides Fermat F(3329780) 451 44330870^131072+1 1002270 L4501 2016 Generalized Fermat 452 129*2^3328805+1 1002073 L3859 2014 453 44085096^131072+1 1001953 L4482 2016 Generalized Fermat 454 143183*2^3328297+1 1001923 L4504 2017 455 44049878^131072+1 1001908 L4466 2016 Generalized Fermat 456 655*2^3327518+1 1001686 L4490 2016 457 659*2^3327371+1 1001642 L3502 2016 458 821*2^3327003+1 1001531 L3035 2016 459 555*2^3325925+1 1001206 L4414 2016 460 43165206^131072+1 1000753 L4309 2016 Generalized Fermat 461 43163894^131072+1 1000751 L4334 2016 Generalized Fermat 462 791*2^3323995+1 1000626 L3035 2016 463 597*2^3322871+1 1000287 L3035 2016 464 387*2^3322763+1 1000254 L1455 2016 465 42654182^131072+1 1000075 L4208 2015 Generalized Fermat 466 5553507*2^3322000+1 1000029 p391 2016 467 464253*2^3321908-1 1000000 L466 2013 468 3^2095902+3^647322-1 1000000 x44 2018 469 191273*2^3321908-1 1000000 L466 2013 470 3139*2^3321905-1 999997 L185 2008 471 4847*2^3321063+1 999744 SB9 2005 472 49*2^3309087-1 996137 L1959 2013 473 139413*6^1279992+1 996033 L4001 2015 474 51*2^3308171+1 995861 L2840 2015 475 245114*5^1424104-1 995412 L3686 2013 476 175124*5^1422646-1 994393 L3686 2013 477 1611*22^738988+1 992038 L4139 2015 478 2017*2^3292325-1 991092 L3345 2017 479 Phi(3,-107970^98304) 989588 L4506 2016 Generalized unique 480 61*2^3286535-1 989348 L4405 2016 481 87*2^3279368+1 987191 L3458 2015 482 65*2^3270127+1 984409 L3924 2015 483 5*2^3264650-1 982759 L384 2013 484 223*2^3264459-1 982703 L1884 2012 485 9*2^3259381-1 981173 L1828 2011 486 33*2^3242126-1 975979 L3345 2014 487 39*2^3240990+1 975637 L3432 2014 488 211195*2^3224974+1 970820 L2121 2013 489 600921*2^3219922-1 969299 g337 2018 490 6*409^369832+1 965900 L4001 2015 491 94373*2^3206717+1 965323 L2785 2013 492 2751*2^3206569-1 965277 L4036 2015 493 113983*2^3201175-1 963655 L613 2008 494 34*888^326732-1 963343 L4001 2017 495 33*2^3176269+1 956154 L3432 2013 496 600921*2^3173683-1 955380 g337 2018 497c 1414*95^482691-1 954633 L4877 2019 498 1087*2^3164677-1 952666 L1828 2012 499 15*2^3162659+1 952057 p286 2012 500 67*2^3161450+1 951694 L3223 2015 501 19*2^3155009-1 949754 L1828 2012 502 69*2^3140225-1 945304 L3764 2014 503 3*2^3136255-1 944108 L256 2007 504 Phi(3,-62721^98304) 943210 L4506 2016 Generalized unique 505a 14613898^131072+1 939101 L4926 2019 Generalized Fermat 506b 14217182^131072+1 937534 L4387 2019 Generalized Fermat 507b 14020004^131072+1 936739 L4249 2019 Generalized Fermat 508 27777*2^3111027+1 936517 L2777 2014 Generalized Cullen 509c 13800346^131072+1 935840 L4880 2019 Generalized Fermat 510c 13613070^131072+1 935062 L4245 2019 Generalized Fermat 511d 13433028^131072+1 934305 L4868 2018 Generalized Fermat 512 1019*2^3103680-1 934304 L1828 2012 513 99*2^3102401-1 933918 L1862 2017 514 256612*5^1335485-1 933470 L259 2013 515e 13083418^131072+1 932803 L4747 2018 Generalized Fermat 516 69*2^3097340-1 932395 L3764 2014 517f 12978952^131072+1 932347 L4849 2018 Generalized Fermat 518f 12961862^131072+1 932272 L4245 2018 Generalized Fermat 519 12851074^131072+1 931783 L4670 2018 Generalized Fermat 520 45*2^3094632-1 931579 L1862 2018 521 12687374^131072+1 931054 L4289 2018 Generalized Fermat 522 513*2^3092705+1 931000 L4329 2016 523 12661786^131072+1 930939 L4819 2018 Generalized Fermat 524 5*2^3090860-1 930443 L1862 2012 525 12512992^131072+1 930266 L4814 2018 Generalized Fermat 526 12357518^131072+1 929554 L4295 2018 Generalized Fermat 527 12343130^131072+1 929488 L4720 2018 Generalized Fermat 528 373*520^342177+1 929357 L3610 2014 529 19401*2^3086450-1 929119 L541 2015 530 75*2^3086355+1 929088 L3760 2015 531 11876066^131072+1 927292 L4737 2018 Generalized Fermat 532e 271*2^3079189-1 926931 L2484 2018 533 766*33^610412+1 926923 L4001 2016 534 11778792^131072+1 926824 L4672 2018 Generalized Fermat 535 31*332^367560+1 926672 L4294 2018 536b 10001*2^3075602-1 925853 L4405 2019 537 11292782^131072+1 924425 L4672 2018 Generalized Fermat 538 14844*430^350980-1 924299 L4001 2016 539 11267296^131072+1 924297 L4654 2017 Generalized Fermat 540 11195602^131072+1 923933 L4706 2017 Generalized Fermat 541 60849*2^3067914+1 923539 L591 2014 542 11036888^131072+1 923120 L4660 2017 Generalized Fermat 543 10994460^131072+1 922901 L4704 2017 Generalized Fermat 544 21*2^3065701+1 922870 p286 2012 545 10962066^131072+1 922733 L4702 2017 Generalized Fermat 546 10921162^131072+1 922520 L4559 2017 Generalized Fermat 547 43*2^3063674+1 922260 L3432 2013 548 10765720^131072+1 921704 L4695 2017 Generalized Fermat 549 5*2^3059698-1 921062 L503 2008 550 10453790^131072+1 920031 L4694 2017 Generalized Fermat 551 10368632^131072+1 919565 L4692 2017 Generalized Fermat 552 123*2^3049038+1 917854 L4119 2015 553 10037266^131072+1 917716 L4691 2017 Generalized Fermat 554c 400*95^463883-1 917435 L4001 2019 555 9907326^131072+1 916975 L4690 2017 Generalized Fermat 556 9785844^131072+1 916272 L4326 2017 Generalized Fermat 557 291*2^3037904+1 914503 L3545 2015 558 9419976^131072+1 914103 L4591 2017 Generalized Fermat 559 9240606^131072+1 913009 L4591 2017 Generalized Fermat 560 8770526^131072+1 910037 L4245 2017 Generalized Fermat 561 8704114^131072+1 909604 L4670 2017 Generalized Fermat 562 383731*2^3021377-1 909531 L466 2011 563 46821*2^3021380-374567 909531 p363 2013 564 2^3021377-1 909526 G3 1998 Mersenne 37 565 7*2^3015762+1 907836 g279 2008 566 75*2^3012342+1 906808 L3941 2015 567 8150484^131072+1 905863 L4249 2017 Generalized Fermat 568 7926326^131072+1 904276 L4249 2017 Generalized Fermat 569 7858180^131072+1 903784 L4201 2017 Generalized Fermat 570 7832704^131072+1 903599 L4249 2017 Generalized Fermat 571 268514*5^1292240-1 903243 L3562 2013 572 7*10^902708+1 902709 p342 2013 573 43*2^2994958+1 901574 L3222 2013 574 1095*2^2992587-1 900862 L1828 2011 575 7379442^131072+1 900206 L4201 2017 Generalized Fermat 576 15*2^2988834+1 899730 p286 2012 577 29*564^326765+1 899024 L4001 2017 578 39*2^2978894+1 896739 L2719 2013 579 4348099*2^2976221-1 895939 L466 2008 580 205833*2^2976222-411665 895938 L4667 2017 581 18976*2^2976221-18975 895937 p373 2014 582 2^2976221-1 895932 G2 1997 Mersenne 36 583 1024*3^1877301+1 895704 p378 2014 584 249*2^2975002+1 895568 L2322 2015 585 195*2^2972947+1 894949 L3234 2015 586 6705932^131072+1 894758 L4201 2017 Generalized Fermat 587 46425*2^2971203+1 894426 L2777 2014 Generalized Cullen 588 493*72^480933+1 893256 L3610 2014 589 6403134^131072+1 892128 L4510 2016 Generalized Fermat 590 6391936^131072+1 892028 L4511 2016 Generalized Fermat 591 45*2^2958002-1 890449 L1862 2017 592 198677*2^2950515+1 888199 L2121 2012 593 5877582^131072+1 887253 L4245 2016 Generalized Fermat 594 17*2^2946584-1 887012 L3519 2013 595 141*2^2943065+1 885953 L3719 2015 596 5734100^131072+1 885846 L4477 2016 Generalized Fermat 597 33*2^2939063-1 884748 L3345 2013 598 5903*2^2938744-1 884654 L4036 2015 599 5586416^131072+1 884361 L4454 2016 Generalized Fermat 600 243*2^2937316+1 884223 L4114 2015 601 61*2^2936967-1 884117 L2484 2017 602 5471814^131072+1 883181 L4362 2016 Generalized Fermat 603 5400728^131072+1 882436 L4201 2016 Generalized Fermat 604 5326454^131072+1 881648 L4201 2016 Generalized Fermat 605 7019*10^881309-1 881313 L3564 2013 606 25*2^2927222+1 881184 L1935 2013 Generalized Fermat 607 97366*5^1259955-1 880676 L3567 2013 608 243944*5^1258576-1 879713 L3566 2013 609 269*2^2918105+1 878440 L2715 2015 610e 169*2^2917805-1 878350 L2484 2018 611 7*2^2915954+1 877791 g279 2008 Divides GF(2915953,12) [g322] 612 4974408^131072+1 877756 L4380 2016 Generalized Fermat 613 427194*113^427194+1 877069 p310 2012 Generalized Cullen 614 4893072^131072+1 876817 L4303 2016 Generalized Fermat 615 143157*2^2911403+1 876425 L4504 2017 616 207*2^2903535+1 874054 L3173 2015 617 99*2^2899303-1 872780 L1862 2017 618 63*2^2898957+1 872675 L3262 2013 619 11*2^2897409+1 872209 L2973 2013 Divides GF(2897408,3) 620 4329134^131072+1 869847 L4395 2016 Generalized Fermat 621 51*2^2881227+1 867338 L3512 2013 622 261*2^2879941+1 866952 L4119 2015 623 4085818^131072+1 866554 L4201 2016 Generalized Fermat 624 65*2^2876718-1 865981 L2484 2016 625 4013*2^2873250-1 864939 L1959 2014 626 41*2^2872058-1 864578 L2484 2013 627 165*2^2870868+1 864220 L4119 2015 628 283*2^2868750+1 863583 L3877 2015 629 3814944^131072+1 862649 L4201 2016 Generalized Fermat 630 147*2^2862651+1 861746 L1741 2015 631 1207*2^2861901-1 861522 L1828 2011 632 231*2^2860725+1 861167 L2873 2015 633 193*2^2858812+1 860591 L2997 2015 634f 241*2^2857313-1 860140 L2484 2018 635 3615210^131072+1 859588 L4201 2016 Generalized Fermat 636 222361*2^2854840+1 859398 g403 2006 637 225*2^2851959+1 858528 L3941 2015 638 247*2^2851602+1 858421 L3865 2015 639 183*2^2850321+1 858035 L2117 2015 640 3450080^131072+1 856927 L4201 2016 Generalized Fermat 641 111*2^2841992+1 855527 L1792 2015 642 95*2^2837909+1 854298 L3539 2013 643c 199*2^2835667-1 853624 L2484 2019 644 84466*5^1215373-1 849515 L3562 2013 645 97*2^2820650+1 849103 L2163 2013 646 107*2^2819922-1 848884 L2484 2013 647f 84256*3^1778899+1 848756 L4789 2018 648f 45472*3^1778899-1 848756 L4789 2018 649 97*2^2818306+1 848397 L3262 2013 650 177*2^2816050+1 847718 L129 2012 651 105*2^2813000+1 846800 L3200 2015 652 96*10^846519-1 846521 L2425 2011 Near-repdigit 653 63*2^2807130+1 845033 L3262 2013 654 150344*5^1205508-1 842620 L3547 2013 655 400254*127^400254+1 842062 g407 2013 Generalized Cullen 656 2639850^131072+1 841690 L4249 2016 Generalized Fermat 657 43*2^2795582+1 841556 L2842 2013 658 117*2^2794014+1 841085 L1741 2015 659 15*2^2785940+1 838653 p286 2012 660 1337*2^2785444-1 838506 L4518 2017 661 600921*2^2776014-1 835670 g337 2017 662 92*10^833852-1 833854 L4789 2018 Near-repdigit 663 2280466^131072+1 833359 L4201 2016 Generalized Fermat 664 57*2^2765963+1 832640 L3262 2013 665 77*2^2762047+1 831461 L3430 2013 666 2194180^131072+1 831164 L4276 2016 Generalized Fermat 667 7*10^830865+1 830866 p342 2014 668f 215*2^2751022-1 828143 L2484 2018 669 245*2^2748663+1 827433 L3173 2015 670 57*2^2747499+1 827082 L3514 2013 Divides Fermat F(2747497) 671 1955556^131072+1 824610 L4250 2015 Generalized Fermat 672 165*2^2732983+1 822713 L1741 2015 673 251*2^2730917+1 822091 L3924 2015 674 173*2^2729905+1 821786 L3895 2015 675d 1981*2^2728877-1 821478 L1134 2018 676 17*2^2721830-1 819354 p279 2010 677 1766192^131072+1 818812 L4231 2015 Generalized Fermat 678 165*2^2717378-1 818015 L2055 2012 679 1722230^131072+1 817377 L4210 2015 Generalized Fermat 680 1717162^131072+1 817210 L4226 2015 Generalized Fermat 681 133*2^2713410+1 816820 L3223 2015 682 45*2^2711732+1 816315 L1349 2012 683a 569*2^2711451+1 816231 L4568 2019 684 93*2^2708718-1 815408 L1862 2016 685 1660830^131072+1 815311 L4207 2015 Generalized Fermat 686b 837*2^2708160+1 815241 L4314 2019 687b 1005*2^2707268+1 814972 L4687 2019 688 13*458^306196+1 814748 L3610 2015 689 253*2^2705844+1 814543 L4083 2015 690b 657*2^2705620+1 814476 L4907 2019 691 39*2^2705367+1 814399 L1576 2013 Divides GF(2705360,3) 692b 303*2^2703864+1 813947 L1204 2019 693 141*2^2702160+1 813434 L1741 2015 694b 753*2^2701925+1 813364 L4314 2019 695 133*2^2701452+1 813221 L3173 2015 696b 521*2^2700095+1 812813 L4854 2019 697b 393*2^2698956+1 812470 L1823 2019 698b 417*2^2698652+1 812378 L3035 2019 699b 525*2^2698118+1 812218 L1823 2019 700 153*2^2697173+1 811933 L3865 2015 701 1560730^131072+1 811772 L4201 2015 Generalized Fermat 702 Phi(3,-1538654^65536) 810961 L4561 2017 Generalized unique 703 11*2^2691961+1 810363 p286 2013 Divides GF(2691960,12) 704 7335*2^2689080-1 809498 L4036 2015 705d 1049*2^2688749+1 809398 L4869 2018 706d 329*2^2688221+1 809238 L3035 2018 707d 865*2^2687434+1 809002 L4844 2018 708d 989*2^2686591+1 808748 L2805 2018 709 243*2^2685873+1 808531 L3865 2015 710d 909*2^2685019+1 808275 L3431 2018 711 Phi(3,-1456746^65536) 807848 L4561 2017 Generalized unique 712d 975*2^2681840+1 807318 L4155 2018 713 295*2^2680932+1 807044 L1741 2015 714 Phi(3,-1427604^65536) 806697 L4561 2017 Generalized unique 715e 575*2^2679711+1 806677 L2125 2018 716 219*2^2676229+1 805628 L1792 2015 717e 637*2^2675976+1 805552 L3035 2018 718 Phi(3,-1395583^65536) 805406 L4561 2017 Generalized unique 719e 951*2^2674564+1 805127 L1885 2018 720 1372930^131072+1 804474 g236 2003 Generalized Fermat 721 261*2^2671677+1 804258 L3035 2015 722f 895*2^2671520+1 804211 L3035 2018 723 1361244^131072+1 803988 g236 2004 Generalized Fermat 724f 789*2^2670409+1 803877 L3035 2018 725 256*11^771408+1 803342 L3802 2014 Generalized Fermat 726f 503*2^2668529+1 803310 L4844 2018 727 255*2^2668448+1 803286 L1129 2015 728 4189*2^2666639-1 802742 L1959 2017 729f 539*2^2664603+1 802129 L4717 2018 730 1396*5^1146713-1 801522 L3547 2013 731 267*2^2662090+1 801372 L3234 2015 Divides Fermat F(2662088) 732 297*2^2660048+1 800757 L3865 2015 733 851*2^2656411+1 799663 L4717 2018 734 487*2^2655008+1 799240 L3760 2018 735 371*2^2651663+1 798233 L3760 2018 736 69*2^2649939-1 797713 L3764 2014 737 207*2^2649810+1 797675 L1204 2015 738 505*2^2649496+1 797581 L3760 2018 739 993*2^2649256+1 797509 L3760 2018 740 517*2^2648698+1 797341 L3760 2018 741f 340*703^280035+1 797250 L4001 2018 742 441*2^2648307+1 797223 L3760 2018 743 1129*2^2646590+1 796707 L3760 2018 744a 128*518^293315+1 796156 L4001 2019 745 Phi(3,-1181782^65536) 795940 L4142 2015 Generalized unique 746 1176694^131072+1 795695 g236 2003 Generalized Fermat 747 13*2^2642943-1 795607 L1862 2012 748 501*2^2641052+1 795039 L3035 2018 749 879*2^2639962+1 794711 L3760 2018 750 57*2^2639528-1 794579 L2484 2016 751 342673*2^2639439-1 794556 L53 2007 752 813*2^2639092+1 794449 L2158 2018 753 Phi(3,-1147980^65536) 794288 L4142 2015 Generalized unique 754 1027*2^2638186+1 794177 L3760 2018 755 889*2^2637834+1 794071 L3545 2018 756 92182*5^1135262+1 793520 L3547 2013 757 741*2^2634385+1 793032 L1204 2018 758 465*2^2630496+1 791861 L1444 2018 759 189*2^2630487+1 791858 L3035 2015 760 87*2^2630468+1 791852 L3262 2013 761 1131*2^2629345+1 791515 L4826 2018 762 967*2^2629344+1 791515 L3760 2018 763 267*2^2629210+1 791474 L3035 2015 764 819*2^2627529+1 790968 L1387 2018 765 17152*5^1131205-1 790683 L3552 2013 766 183*2^2626442+1 790641 L3035 2015 767 813*2^2626224+1 790576 L4830 2018 768 807*2^2625044+1 790220 L1412 2018 769 1063730^131072+1 789949 g260 2013 Generalized Fermat 770 1243*2^2623707-1 789818 L1828 2011 771 693*2^2623557+1 789773 L3278 2018 772 981*2^2622032+1 789314 L1448 2018 773 145*2^2621020+1 789008 L3035 2015 774 541*2^2614676+1 787099 L4824 2018 775 Phi(3,-984522^65536) 785545 p379 2015 Generalized unique 776 1071*2^2609316+1 785486 L3760 2018 777 87*2^2609046+1 785404 L2520 2013 778 543*2^2608129+1 785128 L4822 2018 779 329584*5^1122935-1 784904 L3553 2013 780 10*311^314806+1 784737 L3610 2014 781 1019*2^2606525+1 784646 L1201 2018 782 977*2^2606211+1 784551 L4746 2018 783 13*2^2606075-1 784508 L1862 2011 784 693*2^2605905+1 784459 L4821 2018 785 147*2^2604275+1 783968 L1741 2015 786 105*2^2603631+1 783774 L3459 2015 787 93*2^2602483-1 783428 L1862 2016 788 155*2^2602213+1 783347 L2719 2015 789 303*2^2601525+1 783140 L4816 2018 790 711*2^2600535+1 782842 L4815 2018 791 1133*2^2599345+1 782484 L4796 2018 792 397*2^2598796+1 782319 L3877 2018 793 1171*2^2595736+1 781398 L3035 2018 794 909548^131072+1 781036 p387 2015 Generalized Fermat 795 2*218^333925+1 780870 L4683 2017 796 1149*2^2593359+1 780682 L1125 2018 797 225*2^2592918+1 780549 L1792 2015 Generalized Fermat 798b 333*2^2591874-1 780235 L2017 2019 799 Phi(3,-883969^65536) 779412 p379 2015 Generalized unique 800 Phi(3,-872989^65536) 778700 p379 2015 Generalized unique 801 703*2^2586728+1 778686 L4256 2018 802 120*825^266904+1 778416 L4001 2018 803 337*2^2585660+1 778364 L2873 2018 804 393*2^2584957+1 778153 L4600 2018 805 151*2^2584480+1 778009 L4043 2015 806 Phi(3,-862325^65536) 778001 p379 2015 Generalized unique 807 385*2^2584280+1 777949 L4600 2018 808 Phi(3,-861088^65536) 777919 p379 2015 Generalized unique 809 65*2^2583720-1 777780 L2484 2015 810 25*2^2583690+1 777770 L3249 2013 Generalized Fermat 811 82*920^262409-1 777727 L4064 2015 812 1041*2^2582112+1 777297 L1456 2018 813 334310*211^334310-1 777037 p350 2012 Generalized Woodall 814 229*2^2581111-1 776995 L1862 2017 815 61*2^2580689-1 776867 L2484 2015 816 1113*2^2580205+1 776723 L4724 2018 817 51*2^2578652+1 776254 L3262 2013 818 173*2^2578197+1 776117 L3035 2015 819 833*2^2578029+1 776067 L4724 2018 820 459*2^2573899+1 774824 L1204 2018 821 Phi(3,-806883^65536) 774218 p379 2015 Generalized unique 822 627*2^2567718+1 772963 L3803 2018 823 933*2^2567598+1 772927 L4724 2018 824 757*2^2566468+1 772587 L2606 2018 825 231*2^2565263+1 772224 L3035 2015 826 4*737^269302+1 772216 L4294 2016 Generalized Fermat 827 941*2^2564867+1 772105 L4724 2018 828 923*2^2563709+1 771757 L1823 2018 829c 151*596^278054+1 771671 L4876 2019 830 Phi(3,-770202^65536) 771570 p379 2015 Generalized unique 831e 303*2^2562423-1 771369 L2017 2018 832 75*2^2562382-1 771356 L2055 2011 833 147559*2^2562218+1 771310 L764 2012 834 829*2^2561730+1 771161 L1823 2018 835 404*12^714558+1 771141 L1471 2011 836 Phi(3,-757576^65536) 770629 p379 2015 Generalized unique 837 1193*2^2559453+1 770476 L2030 2018 838 Phi(3,-731582^65536) 768641 p379 2015 Generalized unique 839 419*2^2552363+1 768341 L4713 2018 840a 34*759^266676-1 768093 L4001 2019 841 315*2^2550412+1 767754 L4712 2017 842 415*2^2549590+1 767506 L4710 2017 843 693*2^2547752+1 766953 L4600 2017 844 673*2^2547226+1 766795 L2873 2017 845 169*2^2545526+1 766282 L2125 2015 Divides GF(2545525,10), generalized Fermat 846 183*2^2545116+1 766159 L3035 2015 847e 311*2^2544778-1 766058 L2017 2018 848 9*2^2543551+1 765687 L1204 2011 Divides Fermat F(2543548), GF(2543549,3), GF(2543549,6), GF(2543549,12) 849 663*2^2542990+1 765520 L4703 2017 850 705*2^2542464+1 765361 L2873 2017 851 689186^131072+1 765243 g429 2013 Generalized Fermat 852 745*2^2540726+1 764838 L4696 2017 853 Phi(3,-682504^65536) 764688 p379 2015 Generalized unique 854 64*177^340147-1 764644 L3610 2015 855 421*2^2539336+1 764419 L4148 2017 856 123287*2^2538167+1 764070 L3054 2012 857 305716*5^1093095-1 764047 L3547 2013 858 223*2^2538080+1 764041 L2125 2015 859 83*2^2537641+1 763908 L1300 2013 860 645*2^2532811+1 762455 L4600 2017 861 953*2^2531601+1 762091 L4404 2017 862 545*2^2528179+1 761061 L1502 2017 863 203*2^2526505+1 760557 L3910 2015 864 967*2^2526276+1 760488 L1204 2017 865 241*2^2522801-1 759442 L2484 2018 866 360307*6^975466-1 759066 p255 2017 867 749*2^2519457+1 758436 L1823 2017 868d 199*2^2518871-1 758259 L2484 2018 869 87*2^2518122-1 758033 L2484 2014 870 Phi(3,-605347^65536) 757859 p379 2015 Generalized unique 871 711*2^2516187+1 757451 L3035 2017 872 967*2^2514698+1 757003 L4600 2017 873 33*2^2513872-1 756753 L3345 2013 874 973*2^2511920+1 756167 L1823 2017 875 679*2^2511814+1 756135 L4598 2017 876 1093*2^2511384+1 756005 L1823 2017 877 45*2^2507894+1 754953 L1349 2012 878 130484*5^1080012-1 754902 L3547 2013 879 572186^131072+1 754652 g0 2004 Generalized Fermat 880b 242*501^279492-1 754586 L4911 2019 881 883*2^2506382+1 754500 L1823 2017 882 847*2^2505540+1 754246 L4600 2017 883 191*2^2504121+1 753818 L3035 2015 884 783*2^2500912+1 752853 L1823 2017 885 165*2^2500130-1 752617 L2055 2011 886 33*2^2499883-1 752542 L3345 2013 887f 319*2^2498685-1 752182 L2017 2018 888f 321*2^2496594-1 751553 L2235 2018 889 365*2^2494991+1 751070 L3035 2017 890 213*2^2493004-1 750472 L1863 2017 891 777*2^2492560+1 750339 L3035 2017 892 57*2^2492031+1 750178 L1230 2013 893 879*2^2491342+1 749972 L4600 2017 894 14*152^343720-1 749945 L3610 2015 895 231*2^2489083+1 749292 L3035 2015 896 255*2^2488562+1 749135 L3035 2015 897 221*780^258841-1 748596 L4001 2018 898 303*2^2486629+1 748553 L3035 2017 899 6*433^283918-1 748548 L3610 2015 900 617*2^2485919+1 748339 L1885 2017 901 515*2^2484885+1 748028 L3035 2017 902 1095*2^2484828+1 748011 L3035 2017 903 1113*2^2484125+1 747800 L3035 2017 904 607*2^2483616+1 747646 L3035 2017 905 625*2^2483272+1 747543 L2487 2017 Generalized Fermat 906 723*2^2482064+1 747179 L3035 2017 907 3*2^2478785+1 746190 g245 2003 Divides Fermat F(2478782), GF(2478782,3), GF(2478776,6), GF(2478782,12) 908 1071*2^2477584+1 745831 L3035 2017 909 22*30^504814-1 745673 p355 2014 910 11*2^2476839+1 745604 L2691 2011 911 825*2^2474996+1 745051 L1300 2017 912 1061*2^2474282-1 744837 L1828 2012 913 435*2^2473905+1 744723 L3035 2017 914 1121*2^2473401+1 744571 L3924 2017 915 325*2^2473267-1 744531 L2017 2018 916 889*2^2471082+1 743873 L1300 2017 917 529*2^2470514+1 743702 L3924 2017 Generalized Fermat 918 883*2^2469268+1 743327 L4593 2017 919 81*2^2468789+1 743182 g418 2009 920 55154*5^1063213+1 743159 L3543 2013 921 119*2^2468556-1 743112 L2484 2018 922 525*2^2467658+1 742842 L3035 2017 923 715*2^2465640+1 742235 L3035 2017 924 26773*2^2465343-1 742147 L197 2006 925 993*2^2464082+1 741766 L3035 2017 926 1179*2^2463746+1 741665 L3035 2017 927 857*2^2463411+1 741564 L3662 2017 928 103*2^2462567-1 741309 L2484 2014 929 12587*2^2462524-1 741298 L2012 2017 930 5*2^2460482-1 740680 L503 2008 931 763*2^2458592+1 740113 L1823 2017 932 453*2^2458461+1 740074 L3035 2017 933 519*2^2458058+1 739952 L3803 2017 934 137*2^2457639+1 739826 L4021 2014 935 41676*7^875197-1 739632 L2777 2012 Generalized Woodall 936 133*2^2455666+1 739232 L2322 2014 937 99*2^2455541-1 739194 L1862 2015 938 377*2^2452639+1 738321 L3035 2017 939 1129*2^2452294+1 738218 L3035 2017 940 1103*2^2451133+1 737868 L4531 2017 941 65*2^2450614-1 737711 L2074 2014 942 549*2^2450523+1 737684 L3035 2017 943 765*2^2448660+1 737123 L4412 2017 944 607*2^2447836+1 736875 L4523 2017 945 1005*2^2446722+1 736540 L4522 2017 946 703*2^2446472+1 736465 L2805 2017 947 75*2^2446050+1 736337 L3035 2013 948 115*26^520277-1 736181 L1471 2014 949 114986*5^1052966-1 735997 L3528 2013 950 1029*2^2444707+1 735934 L3035 2017 951 1035*2^2443369+1 735531 L3173 2017 952 1017*2^2442723+1 735336 L4417 2017 953 1065*2^2441132+1 734857 L1823 2017 954 393*2^2436849+1 733568 L3035 2016 955 386892^131072+1 732377 p259 2009 Generalized Fermat 956 465*2^2431455+1 731944 L3035 2016 957 905*2^2430509+1 731660 L4408 2016 958 223*2^2430490+1 731653 L4016 2014 959a 8*410^279991+1 731557 L4700 2019 960 69*2^2428251-1 730979 L384 2014 961 645*2^2426494+1 730451 L3035 2016 962 665*2^2425789+1 730239 L3173 2016 963 23*2^2425641+1 730193 L2675 2011 964 361*2^2424232+1 729770 L3035 2016 Generalized Fermat 965 753*2^2422914+1 729373 L3035 2016 966 105*2^2422105+1 729129 L2520 2014 967 201*2^2421514-1 728951 L1862 2016 968 239*2^2421404-1 728918 L2484 2018 969 577*2^2420868+1 728757 L4489 2016 970 929*2^2417767+1 727824 L3924 2016 971 4075*2^2417579-1 727768 L1959 2017 972 303*2^2417452-1 727729 L2235 2018 973 895*2^2417396+1 727712 L3035 2016 974 1081*2^2412780+1 726323 L1203 2016 975 333*2^2412735-1 726309 L2017 2018 976 83*2^2411962-1 726075 L1959 2018 977 69*2^2410035-1 725495 L2074 2013 978 12362*1027^240890-1 725462 L4444 2018 979 143157*2^2409056+1 725204 L4504 2016 980 Phi(3,-340594^65536) 725122 p379 2015 Generalized unique 981 339*2^2408337+1 724985 L3029 2016 982 811*2^2408096+1 724913 L2526 2016 983 157*2^2407958+1 724870 L1741 2014 984 243686*5^1036954-1 724806 L3549 2013 985 303*2^2406433+1 724411 L4425 2016 986 345*2^2405701+1 724191 L3035 2016 987 921*2^2405056+1 723997 L2805 2016 988 673*2^2403606+1 723561 L3035 2016 989 475*2^2403220+1 723444 L4445 2016 990 837*2^2402798+1 723318 L3372 2016 991 Phi(3,-329886^65536) 723303 p379 2015 Generalized unique 992 231*2^2402748+1 723302 L3995 2014 993 375*2^2401881+1 723041 L2805 2016 994 107*2^2401731+1 722996 L3998 2014 995 1023*2^2398601+1 722054 L4414 2016 996 539*2^2398227+1 721941 L4061 2016 997 659*2^2397567+1 721743 L4441 2016 998 40*844^246524+1 721416 L4001 2017 999 465*2^2395133+1 721010 L4088 2016 1000 667*2^2394430+1 720799 L4408 2016 1001 15*2^2393365+1 720476 L1349 2010 1002 633*2^2391222+1 719833 L3743 2016 1003 273*2^2388104+1 718894 L3668 2014 1004 1485*2^2386037-1 718272 L1134 2017 1005 399*2^2384115+1 717693 L4412 2016 1006 99*2^2383846+1 717612 L1780 2013 1007 737*2^2382804-1 717299 L191 2007 1008 111*2^2382772+1 717288 L3810 2014 1009 61*2^2381887-1 717022 L2432 2012 1010 321*2^2378535-1 716013 L2017 2018 1011 435*2^2378522+1 716010 L1218 2016 1012 147*2^2375995+1 715248 L1130 2014 1013 915*2^2375923+1 715228 L1741 2016 1014 1981*2^2375591-1 715128 L1134 2017 1015 1129*2^2374562+1 714818 L3035 2016 1016 97*2^2374485-1 714794 L2484 2018 1017 1117*2^2373977-1 714642 L1828 2012 1018 949*2^2372902+1 714318 L4408 2016 1019 659*2^2372657+1 714244 L3035 2016 1020 1365*2^2372586+1 714223 L1134 2016 1021 509*2^2370721+1 713661 L1792 2016 1022 99*2^2370390+1 713561 L1204 2013 1023 959*2^2370077+1 713468 L1502 2016 1024 1135*2^2369808+1 713387 L2520 2016 1025 125*2^2369461+1 713281 L3035 2014 1026 1183953*2^2367907-1 712818 L447 2007 Woodall 1027 57671892869766803925...(712708 other digits)...06520121133805600769 712748 p360 2013 1028 119878*5^1019645-1 712707 L3528 2013 1029 453*2^2367388+1 712658 L3035 2016 1030 150209!+1 712355 p3 2011 Factorial 1031 281*2^2363327+1 711435 L1741 2014 1032 2683*2^2360743-1 710658 L1959 2012 1033 409*2^2360166+1 710484 L1199 2016 1034 305*2^2358854-1 710089 L2017 2018 1035 403*2^2357572+1 709703 L3029 2016 1036 155*2^2357111+1 709564 L3975 2014 1037 365*2^2355607+1 709111 L2117 2016 1038 33706*6^910462+1 708482 L587 2014 1039 1087*2^2352830+1 708276 L1492 2016 1040 179*2^2352291+1 708113 L1741 2014 1041 559*2^2351894+1 707994 L3924 2016 1042d 24573*2^2350824+1 707673 p168 2018 1043 1035*2^2350388+1 707541 L2526 2016 1044 433*2^2348252+1 706897 L2322 2016 1045 329*2^2348105+1 706853 L3029 2016 1046 45*2^2347187+1 706576 L1349 2012 1047 127*2^2346377-1 706332 L282 2009 1048 933*2^2345893+1 706188 L3035 2016 1049 903*2^2345013+1 705923 L2006 2016 1050 33*2^2345001+1 705918 L2322 2013 1051 Phi(3,-242079^65536) 705687 p379 2015 Generalized unique 1052 627*2^2343140+1 705359 L3125 2016 1053 83*2^2342345+1 705119 L2626 2013 1054 277*2^2340182+1 704468 L1158 2014 1055 159*2^2339566+1 704282 L3035 2014 1056 335*2^2338972-1 704104 L2235 2017 1057 1149*2^2336638+1 703402 L4388 2016 1058 339*2^2336421-1 703336 L2519 2017 1059 275293*2^2335007-1 702913 L193 2006 1060 105*2^2334755-1 702834 L1959 2018 1061 228188^131072+1 702323 g124 2010 Generalized Fermat 1062 809*2^2333017+1 702312 L2675 2016 1063 795*2^2332488+1 702152 L3029 2016 1064 435*2^2329948+1 701387 L2322 2016 1065 585*2^2329350+1 701207 L2707 2016 1066 213*2^2328530-1 700960 L1863 2017 1067 1107*2^2327472+1 700642 L3601 2016 1068 435*2^2327152+1 700546 L2337 2016 1069 4161*2^2326875-1 700463 L1959 2016 1070 427*2^2326288+1 700286 L2719 2016 1071 147855!-1 700177 p362 2013 Factorial 1072 451*2^2323952+1 699582 L3173 2016 1073 431*2^2323633+1 699486 L3260 2016 1074 1085*2^2323291+1 699384 L1209 2016 1075 15*2^2323205-1 699356 L2484 2011 1076 1131*2^2322167+1 699045 L1823 2016 1077 385*2^2321502+1 698845 L1129 2016 1078 645*2^2320231+1 698462 L3377 2016 1079 165*2^2319575+1 698264 L2627 2014 1080 809*2^2319373+1 698204 L3924 2016 1081 125098*6^896696+1 697771 L587 2014 1082 65536*5^997872+1 697488 L3802 2014 Generalized Fermat 1083 381*2^2314743+1 696810 L4358 2016 1084 120*825^238890+1 696714 L4837 2018 1085 4063*2^2313843-1 696540 L1959 2016 1086 345*2^2313720-1 696502 L2017 2017 1087 361*2^2312832+1 696235 L3415 2016 Generalized Fermat 1088 1983*366^271591-1 696222 L2054 2012 1089 3*2^2312734-1 696203 L158 2005 1090 53653*2^2311848+1 695941 L2012 2017 1091 873*2^2311086+1 695710 L2526 2016 1092 1033*2^2310976+1 695677 L4352 2016 1093 4063*2^2310187-1 695440 L1959 2016 1094 4063*2^2309263-1 695162 L1959 2016 1095 565*2^2308984+1 695077 L2322 2016 1096 450457*2^2307905-1 694755 L172 2006 1097 1185*2^2306324+1 694276 L4347 2016 1098 537*2^2304115+1 693611 L3267 2016 1099 842*1017^230634-1 693594 L4001 2017 1100 729*2^2303162+1 693324 L1204 2016 Generalized Fermat 1101 641*2^2302879+1 693239 L2051 2016 1102 729*2^2300290+1 692460 L1204 2016 Generalized Fermat 1103 189*2^2299959+1 692359 L2627 2014 1104 659*2^2294393+1 690684 L3378 2016 1105 1087*2^2293345-1 690369 L1828 2011 1106 97768*5^987383-1 690157 L1016 2013 1107 3*2^2291610+1 689844 L753 2008 Divides GF(2291607,3), GF(2291609,5) 1108 319*2^2290722+1 689579 L1792 2015 1109 779*2^2290273+1 689444 L3034 2016 1110 971*2^2289135+1 689102 L4198 2016 1111 399*2^2288691+1 688968 L1990 2015 1112 Phi(3,-180139^65536) 688864 p379 2015 Generalized unique 1113 74270*151^315734-1 687982 L4001 2018 1114 417*2^2284402+1 687677 L2322 2015 1115 130*686^242244+1 687085 L4064 2018 1116 427*2^2282080+1 686978 L3260 2015 1117 109*2^2280194+1 686409 L2520 2014 1118 105*2^2280078-1 686374 L2444 2014 1119 1019*2^2278467+1 685890 L4323 2016 1120 213*2^2277870-1 685710 L1863 2017 1121 547*2^2276648+1 685343 L3260 2015 1122 7913*2^2275664-1 685048 L4036 2015 1123 651*2^2275040+1 684859 L4082 2016 1124 155877*2^2273465-1 684387 L541 2014 1125 739*2^2272938+1 684226 L1209 2016 1126 943*2^2269594+1 683219 L1823 2016 1127b 1286*603^245567+1 682758 L4444 2019 1128 329*2^2266631+1 682327 L4109 2015 1129 739*2^2266602+1 682319 L2520 2016 1130 1151*2^2265761+1 682066 L1823 2016 1131 851*2^2265691+1 682044 L3173 2016 1132 977*2^2265655+1 682034 L2413 2016 1133 2*11171^168429+1 681817 g427 2014 Divides Phi(11171^168429,2) 1134 217*2^2264546+1 681699 L3179 2014 1135 841*2^2264184+1 681591 L1823 2016 Generalized Fermat 1136 93*2^2263894+1 681502 L2826 2013 1137 217499*28^470508-1 680905 p366 2013 1138 963*2^2261357+1 680740 L1300 2016 1139 1065*2^2260193+1 680389 L1204 2016 1140 837*2^2259470+1 680172 L1823 2016 1141 927*2^2258112+1 679763 L4287 2016 1142 265*2^2258071-1 679750 L2484 2018 1143 561*2^2256600+1 679308 L3877 2015 1144 495*2^2255944+1 679110 L4119 2015 1145 129*2^2255199+1 678885 L3049 2014 1146 735*2^2254660+1 678724 L4283 2016 1147 973*2^2254320+1 678621 L1204 2016 1148 275102*151^311399-1 678537 L4001 2018 1149 603*2^2252402+1 678044 L1803 2016 1150 1029*2^2252198+1 677983 L3125 2016 1151 39*2^2251104-1 677652 L177 2015 1152 575*2^2250751+1 677547 L1741 2015 1153 725*2^2250697+1 677531 L2859 2016 1154 65*2^2250637+1 677512 L3487 2013 1155 14641*2^2250096+1 677351 L181 2017 Generalized Fermat 1156 187*2^2249974+1 677312 L2322 2014 1157 141*2^2249967+1 677310 L3877 2014 1158 459*2^2249183+1 677075 L3877 2015 1159 319*2^2248914+1 676994 L2322 2015 1160 569*2^2248709+1 676932 L4133 2015 1161 221*2^2248363+1 676828 L1130 2014 1162 144912*151^310514-1 676609 L4001 2018 1163 649*2^2247490+1 676565 L1204 2016 1164 374565*2^2247391+1 676538 L3532 2013 Generalized Cullen 1165 721*2^2246420+1 676243 L3037 2016 1166 875*2^2246363+1 676226 L2859 2016 1167 3888*931^227714-1 676075 L4001 2018 1168 347*2^2245598-1 675995 L2519 2017 1169 1199*2^2244631+1 675705 L3593 2016 1170 197*2^2244347+1 675619 L1129 2014 1171 5055*2^2242777-1 675147 L4036 2015 1172 651*2^2241783+1 674847 L3260 2016 1173 35*2^2241049+1 674625 L2742 2013 1174 4161*2^2240358-1 674419 L1959 2016 1175 164978*151^309413-1 674210 L4001 2018 1176 146*447^254042-1 673292 L4001 2018 1177 675*2^2236244+1 673180 L4191 2016 1178 615*2^2235833+1 673056 L1823 2016 1179 53069*28^465060-1 673021 p257 2016 1180 831*2^2235253+1 672882 L3432 2013 1181 185*2^2235003+1 672806 L2322 2014 1182 103*2^2234536+1 672665 L3865 2014 1183 885*2^2234318+1 672600 L3125 2016 1184 963*2^2234249+1 672579 L1823 2016 1185 305*2^2233655+1 672400 L4118 2015 1186 267*2^2233376+1 672316 L1792 2014 1187 103*2^2232551-1 672067 L2484 2013 1188 889*2^2231034+1 671612 L2526 2016 1189 907*2^2230776+1 671534 L4269 2016 1190 11*2^2230369+1 671410 L2561 2011 Divides GF(2230368,3) 1191 1425*2^2229009+1 671002 L1134 2016 1192 747*2^2228814+1 670943 L2526 2016 1193 969*2^2228379+1 670812 L4262 2016 1194 887*2^2228179+1 670752 L2840 2015 1195 130816^131072+1 670651 g308 2003 Generalized Fermat 1196 1123*2^2227338+1 670499 L3924 2015 1197 213*2^2226329+1 670195 L2125 2014 1198 505*2^2225296+1 669884 L4111 2015 1199 271*2^2223601-1 669374 L2484 2018 1200 325*2^2223243-1 669266 L2235 2016 1201 84363*2^2222321+1 668991 L541 2014 1202 2516745*2^2222222+1 668962 p396 2017 1203 7043*48^397817-1 668831 p255 2016 1204 1137*2^2221062+1 668610 L4040 2015 1205 152*806^229984-1 668413 L4001 2018 1206 1031*2^2218785+1 667924 L1204 2015 1207 911*2^2218151+1 667733 L3260 2015 1208 27*2^2218064+1 667706 L690 2009 1209 587*2^2217355+1 667494 L4109 2015 1210 547*2^2216110+1 667119 L2322 2015 1211 67*2^2215581-1 666959 L268 2010 1212 33*2^2215291-1 666871 L3345 2013 1213 157533*2^2214598-1 666666 L3494 2013 1214 1105*2^2213846+1 666438 L2321 2015 1215 33*2^2212971-1 666173 L3345 2013 1216 101*2^2212769+1 666112 L1741 2014 1217 3*10^665829+1 665830 p300 2012 1218 631*2^2210260+1 665358 L2322 2015 1219 479*2^2209541+1 665141 L4106 2015 1220 165*2^2207550-1 664541 L2055 2011 1221 819*2^2206370+1 664187 L2526 2015 1222 19*2^2206266+1 664154 p189 2006 1223 45*2^2205977-1 664067 L1862 2015 1224 2*179^294739+1 664004 g424 2011 Divides Phi(179^294739,2) 1225 73*416^253392+1 663660 L3610 2015 1226 Phi(3,-16159^78732) 662674 p294 2014 Generalized unique 1227 1041*2^2201196+1 662630 L3719 2015 1228 481*2^2201148+1 662615 L1741 2015 1229 1344*73^355570+1 662545 L3610 2014 1230 783*2^2200256+1 662346 L3924 2015 1231 969*2^2200223+1 662337 L1209 2015 1232 173*2^2199301+1 662058 L1204 2014 1233 5077*2^2198565-1 661838 L251 2008 1234 114487*2^2198389-1 661787 L179 2006 1235 1035*2^2197489+1 661514 L2517 2014 1236 903*2^2197294+1 661455 L2322 2014 1237 404882*43^404882-1 661368 p310 2011 Generalized Woodall 1238b 638*520^243506-1 661366 L4877 2019 1239 256*3^1384608+1 660629 L3802 2014 Generalized Fermat 1240 2*10271^164621+1 660397 g427 2014 Divides Phi(10271^164621,2) 1241 10880*151^302997-1 660228 L4001 2018 1242 1073*2^2193069+1 660183 L2487 2014 1243f 169*2^2193049-1 660176 L2484 2018 1244 202064*151^302700-1 659582 L4001 2018 1245 2*659^233973+1 659544 g424 2015 Divides Phi(659^233973,2) 1246 819*2^2190853+1 659516 L3234 2014 1247 1179*2^2189870+1 659220 L2517 2014 1248 269*2^2189235+1 659028 L1204 2014 1249 39*2^2188855+1 658913 p286 2013 1250 433*2^2188076+1 658680 L3855 2014 1251 815*2^2185439+1 657886 L3035 2014 1252 249*2^2185003+1 657754 L1300 2014 1253 585*2^2184510+1 657606 L3838 2014 1254 1033*2^2183858+1 657410 L3865 2014 1255 1035*2^2183770+1 657384 L3514 2014 1256 193020*151^301686-1 657373 L4001 2018 1257 1179*2^2182691+1 657059 L2163 2014 1258 2*191^287901+1 656713 g424 2015 Divides Phi(191^287901,2) 1259 525*2^2180848+1 656504 L3797 2014 1260 1107*2^2180142+1 656292 L1741 2014 1261 447*2^2180102+1 656279 L3760 2014 1262 315*2^2179612-1 656132 L2235 2015 1263 1423*2^2179023-1 655955 L3887 2015 1264 995*2^2178819+1 655893 L1741 2014 1265 1423*2^2178363-1 655756 L3887 2015 1266 196597*2^2178109-1 655682 L175 2006 1267 879*2^2177186+1 655402 L2981 2014 1268a 67*410^250678+1 654970 L4444 2019 1269 70082*5^936972-1 654921 L3523 2013 1270 699*2^2175031+1 654753 L3865 2014 1271 69*2^2174213-1 654506 L2055 2012 1272 1069*2^2174122+1 654479 L3865 2014 1273 793*2^2173720+1 654358 L2322 2014 1274 651*2^2173159+1 654189 L3864 2014 1275 10001*2^2172615+1 654027 L4405 2018 1276 1011*2^2172063+1 653860 L2826 2014 1277 1105*2^2171956+1 653827 L3035 2014 1278 4165*2^2171145-1 653584 L1959 2017 1279 Phi(3,-96873^65536) 653552 L4026 2014 Generalized unique 1280 739*2^2170786+1 653475 L2121 2014 1281 701*2^2169041+1 652950 L3863 2014 1282 295*2^2168448+1 652771 L1935 2014 1283 7*2^2167800+1 652574 g279 2007 Divides Fermat F(2167797), GF(2167799,5), GF(2167799,10) 1284 359*2^2165551+1 651899 L3838 2014 1285 1059*2^2164149+1 651477 L2322 2014 1286 329*2^2163717+1 651347 L2117 2014 1287 559*2^2163382+1 651246 L1741 2014 1288 775*2^2162344+1 650934 L3588 2014 1289 21*2^2160479-1 650371 L2074 2012 1290 102976*5^929801-1 649909 L3313 2013 1291 1179*2^2158475+1 649769 L3035 2014 Divides GF(2158470,6) 1292 617*2^2156699+1 649234 L1675 2014 1293 65536*3^1360576+1 649165 L3802 2014 Generalized Fermat 1294 2*3^1360104-1 648935 p390 2015 1295 483*2^2155456+1 648860 L3760 2014 1296 105*2^2155392+1 648840 L3580 2014 1297 40*1017^215605+1 648396 L4927 2018 1298 31340*6^833096+1 648280 p271 2013 1299 427*2^2153306+1 648213 L3838 2014 1300 261*2^2152805+1 648062 L1125 2014 1301 371*2^2150871+1 647480 L2545 2014 1302 111*2^2150802-1 647458 L2484 2013 1303 357*2^2148518+1 646771 L1741 2014 1304 993*2^2148205+1 646678 L1741 2014 1305 67*2^2148060+1 646633 L3276 2013 1306 243*2^2147387-1 646431 L2444 2014 1307 693*2^2147024+1 646322 L3862 2014 1308 3*2^2145353+1 645817 g245 2003 Divides Fermat F(2145351), GF(2145351,3), GF(2145352,5), GF(2145348,6), GF(2145352,10), GF(2145351,12) 1309 143157*2^2144728+1 645633 L4504 2016 1310 509*2^2144181+1 645466 L3035 2014 1311 753*2^2143388+1 645227 L2583 2014 Divides GF(2143383,3) 1312 161*2^2142431+1 644939 L3105 2014 1313 25*2^2141884+1 644773 L1741 2011 Divides Fermat F(2141872), GF(2141871,5), GF(2141872,10); generalized Fermat 1314 23*2^2141626-1 644696 L545 2008 1315 519*2^2140311+1 644301 L2659 2014 1316 7*2^2139912+1 644179 g279 2007 Divides GF(2139911,12) 1317 315*2^2139665+1 644106 L3838 2014 1318 193*2^2139400+1 644026 L3538 2014 1319 1113*2^2139060+1 643925 L3914 2014 1320 292402*159^292402+1 643699 g407 2012 Generalized Cullen 1321 307*2^2137553-1 643471 L2235 2015 1322 1051*2^2137440+1 643437 L3865 2014 1323 1185*2^2137344+1 643408 L3877 2014 1324 405*2^2137280-1 643388 L1862 2016 1325 513*2^2135642+1 642896 L3843 2014 1326 241*2^2135279-1 642786 L2484 2018 1327 915*2^2135151+1 642748 L2322 2014 1328 61*2^2134577-1 642574 L2055 2011 1329 711*2^2132477+1 641943 L2125 2014 1330 215*2^2131988-1 641795 L2484 2018 1331 319*2^2130729-1 641416 L1817 2015 1332 78792*151^294324-1 641331 L4001 2018 1333 75*2^2130432-1 641326 L2055 2011 1334 1145*2^2130307+1 641290 L3909 2014 1335 110488*5^917100+1 641031 L3354 2013 1336 37*2^2128328+1 640693 L3422 2013 1337 103*2^2128242+1 640667 L3787 2014 1338c 3762*70^347127+1 640487 L4876 2019 1339 253*2^2126968+1 640284 L1935 2014 1340 583*2^2126166+1 640043 L1741 2014 1341 999*2^2125575+1 639865 L1741 2014 1342 587*2^2124947+1 639676 L3838 2014 1343 451*2^2124636+1 639582 L1741 2014 1344 887*2^2124027+1 639399 L3865 2014 1345 693*2^2121393+1 638606 L3278 2014 1346 8331405*2^2120345-1 638295 L2055 2013 1347 975*2^2119209+1 637949 L1158 2014 1348 33*2^2118570-1 637755 L3345 2013 1349 254*5^911506-1 637118 p292 2010 1350 1139*2^2115949+1 636968 L3865 2014 1351 771*2^2115741+1 636905 L1675 2014 1352 411*2^2115559+1 636850 L2840 2014 1353 189*2^2115473+1 636824 L3784 2014 Divides GF(2115468,6) 1354 929*2^2114679+1 636585 L3035 2014 1355 1065*2^2113463+1 636219 L2826 2014 1356 591*2^2111001+1 635478 L1360 2014 1357 1051*2^2109344+1 634979 L3035 2014 1358 433*2^2109146+1 634919 L1935 2014 1359 519*2^2108910+1 634848 L1356 2014 1360 1047*2^2108751+1 634801 L3824 2014 1361 765*2^2106027+1 633981 L3838 2014 1362 503*2^2106013+1 633976 L1741 2014 1363 316903*10^633806+1 633812 L3532 2014 Generalized Cullen 1364 113*2^2104825+1 633618 L3785 2014 1365 381*2^2103999+1 633370 L2322 2014 1366 1246461300659*2^2103424-1 633206 L2484 2015 1367 57*2^2103370-1 633180 L2055 2011 1368 539*2^2102167+1 632819 L3125 2014 1369 687*2^2100243+1 632239 L3867 2014 1370 329*2^2099771+1 632097 L2507 2014 1371 35*2^2099769+1 632095 L3432 2013 1372 405*2^2099716+1 632081 L3154 2014 1373 575*2^2098483+1 631710 L3168 2014 1374e 208703*2^2097153+1 631312 L466 2018 1375 28401*2^2097152+1 631311 L4547 2017 1376 907*2^2095896+1 630931 L1129 2014 1377a 815730721*2^2095440+1 630800 L466 2019 Generalized Fermat 1378 2503*2^2094587-1 630537 L4113 2017 1379 14641*2^2093384+1 630176 L181 2017 Generalized Fermat 1380 103*2^2093350+1 630164 L3432 2013 1381 4001*2^2093286-1 630146 L1959 2014 1382 14172*1027^209226-1 630103 L4001 2018 1383 369*2^2093022+1 630065 L3514 2014 1384 217*2^2092673-1 629960 L2484 2018 1385 68*920^212407+1 629532 L4001 2017 1386 165*2^2090645+1 629350 L1209 2014 1387 1119*2^2090509+1 629309 L2520 2014 1388 941*2^2090243+1 629229 L1356 2014 1389 62722^131072+1 628808 g308 2003 Generalized Fermat 1390 401*2^2088713+1 628768 L3035 2014 1391 819*2^2088423+1 628681 L3890 2014 1392 1009*2^2087690+1 628461 L3728 2014 1393 85*2^2087651-1 628448 L2338 2013 1394 467*2^2085835+1 627902 L3625 2014 1395 563528*13^563528-1 627745 p262 2009 Generalized Woodall 1396 437960*3^1313880+1 626886 L2777 2012 Generalized Cullen 1397 247*2^2082202+1 626808 L3294 2014 1398 107*2^2081775+1 626679 L3432 2013 Divides GF(2081774,6) 1399b 159*2^2081069-1 626467 L1959 2019 1400 27*634^223550+1 626409 L4001 2018 1401 655*2^2080562+1 626315 L3859 2014 1402 201*2^2080464+1 626285 L1741 2014 1403 269328*211^269328+1 626000 p354 2012 Generalized Cullen 1404 153*2^2079401+1 625965 L3601 2014 1405 279*2^2079167+1 625895 L2413 2014 1406c 692*95^316400-1 625755 L4444 2019 1407 643*2^2078306+1 625636 L3035 2014 1408 79*2^2078162+1 625591 L2117 2013 1409 1485*2^2077172+1 625295 L1134 2015 1410 239*2^2076663+1 625141 L2413 2014 1411 1003*2^2076535-1 625103 L51 2008 1412 2186*7^739474-1 624932 p258 2011 1413 73*2^2075936+1 624921 L3464 2013 1414 807*2^2075519+1 624797 L3555 2014 1415 1425*2^2075382+1 624756 L1134 2015 1416 65*2^2073229+1 624106 L1480 2013 1417 693*2^2072564+1 623907 L3290 2014 1418 375*2^2071598+1 623616 L2413 2014 1419 73*2^2071592+1 623614 L1480 2013 1420 125*2^2071555+1 623603 L3432 2013 1421 1107*2^2071480+1 623581 L2520 2014 1422 6207*28^430803-1 623444 L1471 2014 1423 299*2^2070979+1 623430 L1741 2014 1424 99*2^2070908-1 623408 L1862 2015 1425 19062*1027^206877-1 623029 L4444 2018 1426 891*2^2069024+1 622842 L2520 2014 1427 943*2^2068944+1 622818 L1741 2014 1428 579*2^2068647+1 622728 L2967 2014 1429 911*2^2068497+1 622683 L1741 2014 1430 1005*2^2067272+1 622314 L3895 2014 1431 393*2^2066540+1 622094 L3700 2014 1432 951*2^2065180+1 621685 L1403 2014 1433 915*2^2064663+1 621529 L3035 2014 1434 213*2^2064426-1 621457 L1863 2017 1435 29*468^232718+1 621416 L4832 2018 1436 1455*2^2064103-1 621361 L1134 2016 1437 9*2^2060941-1 620407 L503 2008 1438 1455*2^2059553+1 619991 L1134 2015 1439 659*2^2058623+1 619711 L3860 2014 1440 128448*151^284308-1 619506 L4001 2018 1441 575*2^2056081+1 618945 L1935 2014 1442 1095*2^2055975+1 618914 L3518 2014 1443 3*10^618853+1 618854 p300 2012 1444 819*2^2054470+1 618461 L2826 2014 1445 969*2^2054054+1 618335 L3668 2014 1446 3394*28^427262+1 618320 p385 2015 1447 318564*151^283711-1 618206 L4444 2018 1448 675*2^2053578+1 618192 L1792 2014 1449 178998*151^283702-1 618186 L4001 2018 1450 739*2^2051658+1 617614 L3838 2014 1451 71*2^2051313+1 617509 L1480 2013 1452 265*2^2051155-1 617462 L2484 2018 1453 779*2^2050881+1 617380 L3453 2014 1454 75*2^2050637-1 617306 L2055 2011 1455 935*2^2050113+1 617149 L3696 2014 1456 847*2^2049400+1 616934 L2322 2014 1457 73*2^2048754+1 616739 L3432 2013 1458 527*2^2045751+1 615836 L4123 2014 1459 785*2^2045419+1 615736 L3861 2014 1460 195*2^2044789+1 615546 L3744 2014 1461 537*2^2044162+1 615357 L1741 2014 1462 413*2^2043829+1 615257 L1300 2014 1463 345*2^2042295+1 614795 L2562 2014 1464 216848*151^282017-1 614514 L4700 2018 1465 104*579^222402-1 614428 L4001 2018 1466 1069*2^2039562+1 613973 L1741 2014 1467 625*2^2039416+1 613929 L1741 2014 Generalized Fermat 1468 1085*2^2038005+1 613504 L2520 2014 1469 125*2^2037752-1 613427 L2444 2014 1470 1069*2^2036902+1 613172 L3876 2014 1471 417*2^2036482+1 613045 L1847 2014 1472 701*2^2035955+1 612887 L2823 2014 1473 1025*2^2034405+1 612420 L1741 2014 1474 651*2^2034352+1 612404 L3459 2014 1475 121*2^2033941-1 612280 L162 2006 1476 57*2^2033643+1 612190 L3432 2013 1477 4175*2^2032552-1 611863 L1959 2017 1478 249*2^2031803+1 611637 L2327 2014 1479 783*2^2031629+1 611585 L2126 2014 1480a (290^124116-1)^2-2 611246 p403 2019 1481 4157*2^2029894-1 611063 L1959 2017 1482 293028*151^280273-1 610714 L4001 2018 1483 285*2^2028495+1 610641 L2594 2014 1484 775*2^2027562+1 610360 L1204 2014 1485 199*686^215171-1 610297 L4001 2018 1486 621*2^2026864+1 610150 L3446 2014 1487 357*2^2026846+1 610144 L2163 2014 1488 122112*151^279966-1 610045 L4001 2018 1489 879*2^2026501+1 610041 L1139 2014 1490 4185*2^2026400-1 610011 L1959 2017 1491 787*2^2026242+1 609963 L2122 2014 1492 919*2^2024094+1 609316 L1741 2014 1493 325*2^2024035-1 609298 L4076 2015 1494 235*2^2023486+1 609133 L2594 2014 1495 195*2^2023030+1 608996 L4122 2014 1496 8*10^608989-1 608990 p297 2011 Near-repdigit 1497 1485*2^2022873+1 608949 L1134 2015 1498 233*2^2022801+1 608927 L3767 2014 1499 521*2^2022059+1 608704 L3760 2014 1500 5678*1027^202018-1 608396 L4001 2018 1501 94*790^209857+1 608090 L4001 2018 1502 431*2^2019693+1 607991 L2100 2014 1503 1155*2^2019244+1 607857 L3873 2014 1504 195*2^2018866+1 607742 L2413 2014 1505 59506*6^780877+1 607646 p254 2013 1506 4101*2^2018133-1 607523 L1959 2017 1507 4081*2^2015959-1 606868 L1959 2017 1508 4191*2^2015150-1 606625 L1959 2017 1509 45*2^2014557+1 606444 L1349 2012 Divides GF(2014552,10) 1510 251749*2^2013995-1 606279 L436 2007 Woodall 1511 126*523^222906-1 605973 L4001 2017 1512 1023*2^2012570+1 605847 L1741 2014 1513 403*2^2012412+1 605799 L3538 2014 1514 1173*2^2012185+1 605732 L1413 2014 1515f 85*730^211537+1 605701 L4001 2018 1516 Phi(3,-1449889^49152) 605684 L4142 2017 Generalized unique 1517 751*2^2010924+1 605352 L3859 2014 1518 101*2^2009735+1 604993 L3432 2013 1519 1069*2^2008558+1 604640 L1595 2014 1520 881*2^2008309+1 604565 L3260 2014 1521 959*2^2008035+1 604482 L1422 2014 1522 633*2^2007897+1 604441 L3857 2014 1523 143*2^2007888-1 604437 L384 2016 1524b 4*5^864751-1 604436 L4881 2019 1525 223*2^2007748+1 604395 L1741 2014 1526 461*2^2007631+1 604360 L1300 2014 1527 477*2^2006719+1 604086 L3803 2014 1528 428551*2^2006520+1 604029 g411 2011 1529 1097*2^2005203+1 603630 L3868 2014 1530 Phi(3,-1373894^49152) 603386 L4142 2016 Generalized unique 1531 493*2^2002964+1 602955 L3800 2014 1532 315*2^2002904+1 602937 L3790 2014 1533 77*2^2002742-1 602888 L2074 2013 1534 585*2^2002589+1 602843 L3035 2014 1535 1059*2^2001821+1 602612 L2103 2014 1536 249*2^2001627-1 602553 L1862 2015 1537 1115*2^2000291+1 602151 L3588 2014 1538 891*2^2000268+1 602144 L3440 2014 1539 343388*151^276191-1 601820 L4700 2018 1540 657*2^1998854+1 601718 L2520 2013 Divides GF(1998852,10) 1541 Phi(3,-1316236^49152) 601555 L4142 2016 Generalized unique 1542 573*2^1998232+1 601531 L1300 2013 1543 1323*2^1998103-1 601493 L1828 2016 1544 Phi(3,-1310544^49152) 601370 L4142 2016 Generalized unique 1545 669*2^1995918+1 600835 L2659 2013 1546 19861029*2^1995311-1 600656 L895 2013 1547 261*2^1995105+1 600589 L3378 2013 1548 68398*1027^199397+1 600503 L4001 2018 1549 1031*2^1994741+1 600480 L2626 2014 1550 577*2^1994634+1 600448 L3035 2013 1551 497*2^1994051+1 600272 L2413 2013 1552 8331405*2^1993674-1 600163 L260 2011 1553 467917*2^1993429-1 600088 L160 2005 1554 137137*2^1993201-1 600019 L321 2007 1555 17*2^1990299+1 599141 g267 2006 Divides GF(1990298,3) 1556 101*2^1988279+1 598534 L3141 2013 Divides GF(1988278,12) 1557 175*2^1962288+1 590710 L2137 2013 Divides GF(1962284,10) 1558 225*2^1960083+1 590047 L3548 2013 Divides GF(1960078,6) 1559 2*47^346759+1 579816 g424 2011 Divides Phi(47^346759,2) 1560 1183414*3^1183414+1 564639 L2841 2014 Generalized Cullen 1561 71*2^1873569+1 564003 L1223 2011 Divides GF(1873568,5) 1562 13*2^1861732+1 560439 g267 2005 Divides GF(1861731,6) 1563 3*2^1832496+1 551637 p189 2007 Divides GF(1832490,3), GF(1832494,5) 1564 39*2^1824871+1 549343 L2664 2011 Divides GF(1824867,6) 1565 92*10^544905-1 544907 L3735 2015 Near-repdigit 1566 45*2^1779971+1 535827 L1223 2011 Divides GF(1779969,5) 1567 5*2^1777515+1 535087 p148 2005 Divides GF(1777511,5), GF(1777514,6) 1568 129*2^1774709+1 534243 L2526 2013 Divides GF(1774705,12) 1569 190088*5^760352-1 531469 L2841 2012 Generalized Woodall 1570 2*191^232149+1 529540 g424 2011 Divides Phi(191^232149,2) 1571 183*2^1747660+1 526101 L2163 2013 Divides Fermat F(1747656) 1572 5*10^511056-1 511057 p297 2011 Near-repdigit 1573 63*2^1686050+1 507554 L2085 2011 Divides GF(1686047,12) 1574 110059!+1 507082 p312 2011 Factorial 1575 55*2^1669798+1 502662 L2518 2011 Divides GF(1669797,12) 1576 2^1667321-2^833661+1 501914 L137 2011 Gaussian Mersenne norm 38? 1577 30981*14^433735-1 497121 p77 2015 Generalized Woodall 1578 1035092*3^1035092-1 493871 L3544 2013 Generalized Woodall 1579 2*359^192871+1 492804 g424 2014 Divides Phi(359^192871,2) 1580 216290*167^216290-1 480757 L2777 2012 Generalized Woodall 1581 1098133#-1 476311 p346 2012 Primorial 1582 87*2^1580858+1 475888 L2487 2011 Divides GF(1580856,6) 1583 10^474500+999*10^237249+1 474501 p363 2014 Palindrome 1584 199388*233^199388-1 472028 L4780 2018 Generalized Woodall 1585 103040!-1 471794 p301 2010 Factorial 1586 95*10^466002-1 466004 L3735 2014 Near-repdigit 1587 5*10^464843-1 464844 p297 2011 Near-repdigit 1588 341351*22^341351-1 458243 p260 2017 Generalized Woodall 1589 135*2^1515894+1 456332 L1129 2013 Divides GF(1515890,10) 1590 2*839^155785+1 455479 g424 2014 Divides Phi(839^155785,2) 1591 13*2^1499876+1 451509 g267 2004 Divides GF(1499875,3) 1592 131*2^1494099+1 449771 L2959 2012 Divides Fermat F(1494096) 1593 7*2^1491852+1 449094 p166 2005 Divides GF(1491851,6) 1594 1286*3^937499+1 447304 L2777 2012 Generalized Cullen 1595 5*10^445773-1 445774 p297 2011 Near-repdigit 1596 176660*18^353320-1 443519 p325 2011 Generalized Woodall 1597 1467763*2^1467763-1 441847 L381 2007 Woodall 1598 4125*2^1445206-2723880039837*2^1290000-1 435054 p199 2016 Arithmetic progression (3,d=4125*2^1445205-2723880039837*2^1290000) 1599 4125*2^1445205-1 435054 L1959 2014 Arithmetic progression (2,d=4125*2^1445205-2723880039837*2^1290000) [p199] 1600 95*2^1433853+1 431635 L2503 2011 Divides GF(1433852,3) 1601 94550!-1 429390 p290 2010 Factorial 1602 15*2^1418605+1 427044 g279 2006 Divides GF(1418600,5), GF(1418601,6) 1603 2415*2^1413628-1489088842587*2^1290000-1 425548 p199 2017 Arithmetic progression (3,d=2415*2^1413627-1489088842587*2^1290000) 1604 2415*2^1413627-1 425548 L1959 2014 Arithmetic progression (2,d=2415*2^1413627-1489088842587*2^1290000) [p199] 1605 2985*2^1404275-770527213395*2^1290000-1 422733 p199 2017 Arithmetic progression (3,d=2985*2^1404274-770527213395*2^1290000) 1606 2985*2^1404274-1 422733 L1959 2014 Arithmetic progression (2,d=2985*2^1404274-770527213395*2^1290000) [p199] 1607 2^1398269-1 420921 G1 1996 Mersenne 35 1608 182402*14^364804-1 418118 p325 2011 Generalized Woodall 1609 17*2^1388355+1 417938 g267 2005 Divides GF(1388354,10) 1610 249798*47^249798-1 417693 L4780 2018 Generalized Woodall 1611 6*10^414508-1 414509 p297 2011 Near-repdigit 1612 2*11171^100961+1 408700 g427 2014 Divides Phi(11171^100961,2) 1613 338707*2^1354830+1 407850 L124 2005 Cullen 1614 226400*63^226400-1 407377 L4780 2018 Generalized Woodall 1615 2*12251^99265+1 405813 g427 2017 Divides Phi(12251^99265,2) 1616 11*2^1343347+1 404389 p169 2005 Divides GF(1343346,6) 1617 107*2^1337019+1 402485 L2659 2012 Divides GF(1337018,10) 1618 1389*2^1335434+1 402009 L1209 2015 Divides GF(1335433,10) 1619 248100*41^248100-1 400138 L4779 2018 Generalized Woodall 1620 272970*29^272970-1 399197 p260 2017 Generalized Woodall 1621 209694*79^209694-1 397927 L4780 2018 Generalized Woodall 1622 5*2^1320487+1 397507 g55 2002 Divides GF(1320486,12) 1623 94189*2^1318646+1 396957 L2777 2013 Generalized Cullen 1624 15266*12^366385-1 395401 p325 2011 Generalized Woodall 1625 2*503^145313+1 392574 g424 2014 Divides Phi(503^145313,2) 1626 10^390636+999*10^195317+1 390637 p363 2014 Palindrome 1627 125132*6^500528-1 389492 L2777 2012 Generalized Woodall 1628 99998*10^389150-1 389155 L3432 2016 Near-repdigit 1629 2618163402417*2^1290001-1 388342 L927 2016 Sophie Germain (2p+1) 1630 4704549881115*2^1290000-1 388342 L3494 2016 Arithmetic progression (3,d=496648444065*2^1290002) 1631 3572178694383*2^1290000-1 388342 L3494 2016 Arithmetic progression (3,d=104644852137*2^1290002) 1632 2996863034895*2^1290000+1 388342 L2035 2016 Twin (p+2) 1633 2996863034895*2^1290000-1 388342 L2035 2016 Twin (p) 1634 2723880039837*2^1290000-1 388342 L3829 2016 Arithmetic progression (1,d=4125*2^1445205-2723880039837*2^1290000) [p199] 1635 2618163402417*2^1290000-1 388342 L927 2016 Sophie Germain (p) 1636 2060323099527*2^1290000-1 388342 L3606 2015 Arithmetic progression (2,d=69718264533*2^1290002) [p199] 1637 1958727695745*2^1290000-1 388341 L4132 2015 Arithmetic progression (2,d=10032831585*2^1290001) [p199] 1638 1938662032575*2^1290000-1 388341 L927 2015 Arithmetic progression (1,d=10032831585*2^1290001) [p199] 1639 1781450041395*2^1290000-1 388341 L3203 2015 Arithmetic progression (1,d=69718264533*2^1290002) [p199] 1640 1489088842587*2^1290000-1 388341 L2511 2014 Arithmetic progression (1,d=2415*2^1413627-1489088842587*2^1290000) [p199] 1641 1188581180295*2^1290000-1 388341 L3765 2014 Arithmetic progression (1,d=160128309135*2^1290001) [L3494] 1642 10^388080-10^112433-1 388080 CH8 2014 Near-repdigit 1643 10^388080-10^180868-1 388080 p377 2014 Near-repdigit 1644 10^388080-10^332944-1 388080 p377 2014 Near-repdigit 1645 10^388080-10^342029-1 388080 p377 2014 Near-repdigit 1646 1957*2^1284992+1 386825 L3913 2014 Divides GF(1284991,6) 1647 5*2^1282755+1 386149 g55 2002 Divides GF(1282754,3), GF(1282748,5) 1648 15*2^1276177+1 384169 g279 2006 Divides GF(1276174,3), GF(1276174,10) 1649 1268979*2^1268979-1 382007 L201 2007 Woodall 1650 2^1257787-1 378632 SG 1996 Mersenne 34 1651 329*2^1246017+1 375092 L2085 2012 Divides Fermat F(1246013) 1652 259738*3^779214+1 371785 L2777 2011 Generalized Cullen 1653 531*2^1233440+1 371306 L2803 2011 Divides GF(1233439,5) 1654 3471*2^1224763+1 368694 L3548 2013 Divides GF(1224758,6) 1655 177482*117^177482+1 367072 g407 2008 Generalized Cullen 1656 843301#-1 365851 p302 2010 Primorial 1657 99*2^1211757+1 364778 L1446 2011 Divides GF(1211755,5) 1658 25*2^1211488+1 364696 g279 2005 Generalized Fermat, divides GF(1211487,12) 1659 10^362600+666*10^181299+1 362601 p363 2014 Palindrome 1660 2^1203793-2^601897+1 362378 L192 2006 Gaussian Mersenne norm 37 1661 183500*93^183500+1 361222 g157 2012 Generalized Cullen 1662 1195203*2^1195203-1 359799 L124 2005 Woodall 1663 83*2^1154617+1 347577 L446 2010 Divides GF(1154616,3) 1664 5245*2^1153762+1 347321 L1204 2013 Divides GF(1153761,12) 1665 29*2^1152765+1 347019 g300 2005 Divides GF(1152760,10) 1666 101*2^1142981+1 344074 L1446 2011 Divides GF(1142980,3) 1667 33*2^1130884+1 340432 L165 2006 Divides GF(1130881,12) 1668 163*2^1129934+1 340147 L1751 2010 Divides GF(1129933,10) 1669 2145*2^1099064+1 330855 L1792 2013 Divides Fermat F(1099061) 1670 93*2^1087202+1 327283 L669 2010 Divides GF(1087199,12) 1671 Phi(3,10^160118)+(137*10^160119+731*10^159275)*(10^843-1)/999 320237 p44 2014 Palindrome 1672 Phi(3,10^160048)+(137*10^160049+731*10^157453)*(10^2595-1)/999 320097 p44 2014 Palindrome 1673 1491*2^1050764+1 316315 L2826 2013 Divides GF(1050763,10) 1674 10^314727-8*10^157363-1 314727 p235 2013 Near-repdigit, palindrome 1675 9539*2^1034437+1 311401 L1502 2013 Divides GF(1034434,10) 1676 549*2^1033187+1 311024 L1224 2011 Divides GF(1033186,5) 1677 151*2^1016600+1 306030 L669 2010 Divides GF(1016599,5) 1678 2^991961-2^495981+1 298611 x28 2005 Gaussian Mersenne norm 36 1679 225*2^988695+1 297630 L1446 2010 Divides GF(988693,6) 1680 10^290253-2*10^145126-1 290253 p235 2012 Near-repdigit, Palindrome 1681 11*2^960901+1 289262 g277 2005 Divides Fermat F(960897) 1682 873*2^922545+1 277717 L153 2010 Divides GF(922543,3) 1683 113*2^916801+1 275987 L153 2009 Divides GF(916800,5), GF(916800,12) 1684 3*2^916773+1 275977 g245 2001 Divides GF(916771,3), GF(916772,10) 1685 Phi(3,10^137747)+(137*10^137748+731*10^129293)*(10^8454-1)/999 275495 p44 2012 Palindrome 1686 1705*2^906110+1 272770 L3174 2012 Divides Fermat F(906108) 1687 10^269479-7*10^134739-1 269479 p235 2012 Near-repdigit, Palindrome 1688 43*2^894766+1 269354 g279 2006 Divides GF(894765,5) 1689 11*2^886071+1 266735 g277 2005 Divides GF(886070,12) 1690 2^859433-1 258716 SG 1994 Mersenne 33 1691 249*2^832207+1 250522 L669 2010 Divides GF(832206,5) 1692 1815*2^823632+1 247942 L1741 2012 Divides GF(823629,12) 1693 7*2^804534+1 242190 g196 2003 Divides GF(804533,12) 1694 5215*2^789906+1 237790 L2659 2012 Divides GF(789905,6) 1695 2^756839-1 227832 SG 1992 Mersenne 32 1696 10^223663-454*10^111830-1 223663 p363 2016 Palindrome 1697 10^220285-949*10^110141-1 220285 p363 2016 Palindrome 1698 10^219113-535*10^109555-1 219113 p363 2016 Palindrome 1699 59*2^727815+1 219096 p227 2008 Divides GF(727814,12) 1700 10^214575-20002*10^107285-1 214575 p363 2016 Palindrome 1701 10^214479-535*10^107238-1 214479 p363 2016 Palindrome 1702 Phi(3,10^104279)+(137*10^104280+731*10^93395)*(10^10884-1)/999 208559 p44 2014 Palindrome 1703 Phi(3,10^104276)+(137*10^104277+731*10^99683)*(10^4593-1)/999 208553 p44 2014 Palindrome 1704 Phi(3,10^104257)+(137*10^104258+731*10^99193)*(10^5064-1)/999 208515 p44 2014 Palindrome 1705 Phi(3,10^103289)+(137*10^103290+731*10^90449)*(10^12840-1)/999 206579 p44 2014 Palindrome 1706 Phi(3,10^103282)+(137*10^103283+731*10^85009)*(10^18273-1)/999 206565 p44 2014 Palindrome 1707 Phi(3,10^103182)+(137*10^103183+731*10^66639)*(10^36543-1)/999 206365 x29 2014 Palindrome 1708 13*2^684560+1 206075 g267 2003 Divides GF(684557,10), GF(684559,6) 1709 27*2^672007+1 202296 g279 2005 Divides Fermat F(672005) 1710 667071*2^667071-1 200815 g55 2000 Woodall 1711 18543637900515*2^666668-1 200701 L2429 2012 Sophie Germain (2p+1) 1712 18543637900515*2^666667-1 200701 L2429 2012 Sophie Germain (p) 1713 3756801695685*2^666669+1 200700 L1921 2011 Twin (p+2) 1714 3756801695685*2^666669-1 200700 L1921 2011 Twin (p) 1715 659*2^617815+1 185984 L732 2009 Divides Fermat F(617813) 1716 151*2^585044+1 176118 L446 2007 Divides Fermat F(585042) 1717 519*2^567235+1 170758 L656 2009 Divides Fermat F(567233) 1718 392113#+1 169966 p16 2001 Primorial 1719 366439#+1 158936 p16 2001 Primorial 1720 243*2^495732+1 149233 L165 2007 Divides Fermat F(495728), GF(495726,3), GF(495728,6), GF(495727,12) 1721 481899*2^481899+1 145072 gm 1998 Cullen 1722 651*2^476632+1 143484 L668 2008 Divides Fermat F(476624) 1723 34790!-1 142891 p85 2002 Factorial 1724 2^364289-2^182145+1 109662 p58 2001 Gaussian Mersenne norm 35 1725 361275*2^361275+1 108761 DS 1998 Cullen 1726 26951!+1 107707 p65 2002 Factorial 1727 65516468355*2^333333+1 100355 L923 2009 Twin (p+2) 1728 65516468355*2^333333-1 100355 L923 2009 Twin (p) 1729 (7176^24691-1)/7175 95202 CH2 2017 Generalized repunit 1730 21480!-1 83727 p65 2001 Factorial 1731 183027*2^265441-1 79911 L983 2010 Sophie Germain (2p+1) 1732 183027*2^265440-1 79911 L983 2010 Sophie Germain (p) 1733 262419*2^262419+1 79002 DS 1998 Cullen 1734 648621027630345*2^253825-1 76424 x24 2009 Sophie Germain (2p+1) 1735 620366307356565*2^253825-1 76424 x24 2009 Sophie Germain (2p+1) 1736 648621027630345*2^253824-1 76424 x24 2009 Sophie Germain (p) 1737 620366307356565*2^253824-1 76424 x24 2009 Sophie Germain (p) 1738 (40734^16111-1)/40733 74267 CH2 2015 Generalized repunit 1739 (64758^15373-1)/64757 73960 p170 2018 Generalized repunit 1740 primV(111534,1,27000) 72683 x25 2013 Generalized Lucas primitive part 1741 (58729^15091-1)/58728 71962 CH2 2017 Generalized repunit 1742 12770275971*2^222225+1 66907 L527 2017 Twin (p+2) 1743 12770275971*2^222225-1 66907 L527 2017 Twin (p) 1744 (63847^13339-1)/63846 64091 p170 2013 Generalized repunit 1745 145823#+1 63142 p21 2000 Primorial 1746 2^203789+2^101895+1 61347 O 2000 Gaussian Mersenne norm 34 1747 (26371^13681-1)/26370 60482 p170 2012 Generalized repunit 1748 99064503957*2^200009-1 60220 L95 2016 Sophie Germain (2p+1) 1749 99064503957*2^200008-1 60220 L95 2016 Sophie Germain (p) 1750 70965694293*2^200006+1 60219 L95 2016 Twin (p+2) 1751 70965694293*2^200006-1 60219 L95 2016 Twin (p) 1752 66444866235*2^200003+1 60218 L95 2016 Twin (p+2) 1753 66444866235*2^200003-1 60218 L95 2016 Twin (p) 1754 (4529^16381-1)/4528 59886 CH2 2012 Generalized repunit 1755 4884940623*2^198800+1 59855 L4166 2015 Twin (p+2) 1756 4884940623*2^198800-1 59855 L4166 2015 Twin (p) 1757 (9082^15091-1)/9081 59729 CH2 2014 Generalized repunit 1758 2003663613*2^195000+1 58711 L202 2007 Twin (p+2) 1759 2003663613*2^195000-1 58711 L202 2007 Twin (p) 1760 primV(27655,1,19926) 57566 x25 2013 Generalized Lucas primitive part 1761 (43326^12041-1)/43325 55827 p170 2017 Generalized repunit 1762 607095*2^176312-1 53081 L983 2009 Sophie Germain (2p+1) 1763 607095*2^176311-1 53081 L983 2009 Sophie Germain (p) 1764 7775705415*2^175116+1 52726 p364 2017 Cunningham chain 2nd kind (2p-1) 1765 7775705415*2^175115+1 52725 p364 2017 Cunningham chain 2nd kind (p) 1766 (38284^11491-1)/38283 52659 CH2 2013 Generalized repunit 1767 38529154785*2^173250+1 52165 L3494 2014 Twin (p+2) 1768 38529154785*2^173250-1 52165 L3494 2014 Twin (p) 1769 48047305725*2^172404-1 51910 L99 2007 Sophie Germain (2p+1) 1770 48047305725*2^172403-1 51910 L99 2007 Sophie Germain (p) 1771 137211941292195*2^171961-1 51780 x24 2006 Sophie Germain (2p+1) 1772 194772106074315*2^171960+1 51780 x24 2007 Twin (p+2) 1773 194772106074315*2^171960-1 51780 x24 2007 Twin (p) 1774 137211941292195*2^171960-1 51780 x24 2006 Sophie Germain (p) 1775 100314512544015*2^171960+1 51780 x24 2006 Twin (p+2) 1776 100314512544015*2^171960-1 51780 x24 2006 Twin (p) 1777 16869987339975*2^171960+1 51779 x24 2005 Twin (p+2) 1778 16869987339975*2^171960-1 51779 x24 2005 Twin (p) 1779 9985628193*2^171009+1 51489 L109 2016 Cunningham chain 2nd kind (2p-1) 1780 9985628193*2^171008+1 51489 L109 2016 Cunningham chain 2nd kind (p) 1781 (34120^11311-1)/34119 51269 CH2 2011 Generalized repunit 1782 129431439657*2^170172+1 51238 L3494 2015 Cunningham chain 2nd kind (2p-1) 1783 129431439657*2^170171+1 51238 L3494 2015 Cunningham chain 2nd kind (p) 1784 14380757307*2^170171+1 51237 L3494 2015 Cunningham chain 2nd kind (2p-1) 1785 14380757307*2^170170+1 51237 L3494 2015 Cunningham chain 2nd kind (p) 1786 33218925*2^169690+1 51090 g259 2002 Twin (p+2) 1787 33218925*2^169690-1 51090 g259 2002 Twin (p) 1788 (50091^10357-1)/50090 48671 p170 2016 Generalized repunit 1789 185688291*2^161617+1 48660 p282 2015 Cunningham chain 2nd kind (2p-1) 1790 185688291*2^161616+1 48660 p282 2015 Cunningham chain 2nd kind (p) 1791 2^160423-2^80212+1 48293 O 2000 Gaussian Mersenne norm 33 1792 primV(40395,-1,15588) 47759 x23 2007 Generalized Lucas primitive part 1793 primV(53394,-1,15264) 47200 CH4 2007 Generalized Lucas primitive part 1794 (44497^10093-1)/44496 46911 p170 2016 Generalized repunit 1795 22835841624*7^54321+1 45917 p296 2010 Twin (p+2) 1796 22835841624*7^54321-1 45917 p296 2010 Twin (p) 1797 1679081223*2^151618+1 45651 L527 2012 Twin (p+2) 1798 1679081223*2^151618-1 45651 L527 2012 Twin (p) 1799 9606632571*2^151515+1 45621 p282 2014 Twin (p+2) 1800 9606632571*2^151515-1 45621 p282 2014 Twin (p) 1801 151023*2^151023-1 45468 g25 1998 Woodall 1802 (1852^13477-1)/1851 44035 p170 2015 Generalized repunit 1803 (42417^9337-1)/42416 43203 p170 2015 Generalized repunit 1804 71509*2^143019-1 43058 g23 1998 Woodall, arithmetic progression (2,d=(143018*2^83969-80047)*2^59049) [x12] 1805e U(2449,-1,12671) 42939 x45 2018 Generalized Lucas number, cyclotomy 1806 84966861*2^140219+1 42219 L3121 2012 Twin (p+2) 1807 84966861*2^140219-1 42219 L3121 2012 Twin (p) 1808 31737014565*2^140004-1 42156 L95 2010 Sophie Germain (2p+1) 1809 31737014565*2^140003-1 42156 L95 2010 Sophie Germain (p) 1810 14962863771*2^140002-1 42155 L95 2010 Sophie Germain (2p+1) 1811 12378188145*2^140002+1 42155 L95 2010 Twin (p+2) 1812 12378188145*2^140002-1 42155 L95 2010 Twin (p) 1813 23272426305*2^140001+1 42155 L95 2010 Twin (p+2) 1814 23272426305*2^140001-1 42155 L95 2010 Twin (p) 1815 14962863771*2^140001-1 42155 L95 2010 Sophie Germain (p) 1816 (32556^9283-1)/32555 41887 CH2 2011 Generalized repunit 1817 (1549^12973-1)/1548 41382 p170 2010 Generalized repunit 1818 13375563435*2^137137-1 41293 p364 2018 Sophie Germain (2p+1) 1819 13375563435*2^137136-1 41293 p364 2018 Sophie Germain (p) 1820 10429091973*2^135136-1 40691 p364 2018 Sophie Germain (2p+1) 1821 10429091973*2^135135-1 40690 p364 2018 Sophie Germain (p) 1822 73378515705*2^133148-1 40093 L167 2018 Sophie Germain (2p+1) 1823 73378515705*2^133147-1 40093 L167 2018 Sophie Germain (p) 1824 primV(4836,1,16704) 39616 x25 2013 Generalized Lucas primitive part 1825e U(21041,-1,9059) 39159 x45 2018 Generalized Lucas number, cyclotomy 1826 8151728061*2^125987+1 37936 p35 2010 Twin (p+2) 1827 8151728061*2^125987-1 37936 p35 2010 Twin (p) 1828 (13117^9151-1)/13116 37679 CH2 2016 Generalized repunit 1829 33759183*2^123459-1 37173 L527 2009 Sophie Germain (2p+1) 1830 33759183*2^123458-1 37173 L527 2009 Sophie Germain (p) 1831 (28839^8317-1)/28838 37090 CH6 2006 Generalized repunit 1832 (4366^10099-1)/4365 36758 x14 2011 Generalized repunit 1833 7068555*2^121302-1 36523 L100 2005 Sophie Germain (2p+1) 1834 7068555*2^121301-1 36523 L100 2005 Sophie Germain (p) 1835 2*(2^1562*3^109*828814575031^420*955637315837^480*672198801383^498*162\ 946224587^484*258724139309^335*327170641169^422*880151556857^437-1)+1 36498 p360 2013 Sophie Germain (2p+1) 1836 2^1562*3^109*828814575031^420*955637315837^480*672198801383^498*162946\ 224587^484*258724139309^335*327170641169^422*880151556857^437-1 36498 p360 2013 Sophie Germain (p) 1837 2*(2^1512*3^143*973012422269^378*471613096919^407*540579043769^407*251\ 138810633^368*589234783037^445*475774278173^498*579909737837^457-1)+1 35206 p360 2013 Sophie Germain (2p+1) 1838 2^1512*3^143*973012422269^378*471613096919^407*540579043769^407*251138\ 810633^368*589234783037^445*475774278173^498*579909737837^457-1 35206 p360 2013 Sophie Germain (p) 1839 2^116224-15905 34987 c87 2017 ECPP 1840 primV(38513,-1,11502) 34668 x23 2006 Generalized Lucas primitive part 1841 2540041185*2^114730-1 34547 g294 2003 Sophie Germain (2p+1) 1842 2540041185*2^114729-1 34547 g294 2003 Sophie Germain (p) 1843 primV(9008,1,16200) 34168 x23 2005 Generalized Lucas primitive part 1844 (14665*10^34110-56641)/9999 34111 c89 2018 ECPP, Palindrome 1845 10000000000000000000...(34053 other digits)...00000000000000532669 34093 c84 2016 ECPP 1846 primV(6586,1,16200) 32993 x25 2013 Generalized Lucas primitive part 1847e U(1624,-1,10169) 32646 x45 2018 Generalized Lucas number, cyclotomy 1848 1124044292325*2^108000-1 32524 L99 2006 Sophie Germain (2p+1) 1849 1124044292325*2^107999-1 32523 L99 2006 Sophie Germain (p) 1850 2^106693+2^53347+1 32118 O 2000 Gaussian Mersenne norm 32 1851 primV(28875,1,13500) 32116 x25 2016 Generalized Lucas primitive part 1852 (V(77786,1,6453)+1)/(V(77786,1,27)+1) 31429 x25 2012 Lehmer primitive part 1853 primV(10987,1,14400) 31034 x25 2005 Generalized Lucas primitive part 1854 V(148091) 30950 c81 2015 Lucas number, ECPP 1855 (V(73570,1,6309)-1)/(V(73570,1,9)-1) 30661 x25 2016 Lehmer primitive part 1856 49363*2^98727-1 29725 Y 1997 Woodall 1857 U(2341,-1,8819) 29712 x25 2008 Generalized Lucas number 1858 -τ(331^2128) 29492 c80 2015 ECPP 1859 primV(24127,-1,6718) 29433 CH3 2005 Generalized Lucas primitive part 1860 primV(12215,-1,13500) 29426 x25 2016 Generalized Lucas primitive part 1861 V(140057) 29271 c76 2014 Lucas number,ECPP 1862e U(1404,-1,9209) 28981 CH10 2018 Generalized Lucas number, cyclotomy 1863 primV(45922,1,11520) 28644 x25 2011 Generalized Lucas primitive part 1864 primV(205011) 28552 x39 2009 Lucas primitive part 1865 U(16531,1,6721)-U(16531,1,6720) 28347 x36 2007 Lehmer number 1866 (V(28286,1,6309)+1)/(V(28286,1,9)+1) 28045 x25 2016 Lehmer primitive part 1867 U(5092,1,7561)+U(5092,1,7560) 28025 x25 2014 Lehmer number 1868 90825*2^90825+1 27347 Y 1997 Cullen 1869 U(5239,1,7350)-U(5239,1,7349) 27333 CH10 2017 Lehmer number 1870 primV(5673,1,13500) 27028 CH3 2005 Generalized Lucas primitive part 1871 primV(44368,1,9504) 26768 CH3 2005 Generalized Lucas primitive part 1872 tau(157^2206) 26643 FE1 2011 ECPP 1873 primV(10986,-1,9756) 26185 x23 2005 Generalized Lucas primitive part 1874a 1027676400*60013#+1 25992 p155 2019 Arithmetic progression (4,d=6813491*60013#) 1875a 1025139165*60013#+1 25992 p115 2019 Arithmetic progression (4,d=6205834*60013#) 1876 primV(11076,-1,12000) 25885 x25 2005 Generalized Lucas primitive part 1877 2^85237+2^42619+1 25659 x16 2000 Gaussian Mersenne norm 31 1878 primV(17505,1,11250) 25459 x25 2011 Generalized Lucas primitive part 1879 U(2325,-1,7561) 25451 x20 2013 Generalized Lucas number 1880 Phi(12345,7176)/31531760245313526865033921 25331 c54 2017 ECPP 1881e U(13084,-13085,6151) 25319 x45 2018 Generalized Lucas number, cyclotomy 1882 primV(42,-1,23376) 25249 x23 2007 Generalized Lucas primitive part 1883e U(1064,-1065,8311) 25158 CH10 2018 Generalized Lucas number, cyclotomy 1884 primV(7577,-1,10692) 25140 x33 2007 Generalized Lucas primitive part 1885 (2^83339+1)/3 25088 c54 2014 ECPP, generalized Lucas number, Wagstaff 1886 6753^5122+5122^6753 25050 FE1 2010 ECPP 1887 U(1766,1,7561)-U(1766,1,7560) 24548 x25 2013 Lehmer number 1888 floor((3/2)^137752)+13566 24257 c35 2015 ECPP 1889 492590931*2^80000-1631979959*2^25001-1 24092 p199 2010 Arithmetic progression (4,d=164196977*2^80000-1631979959*2^25000) 1890 -tau(691^1522) 23770 c65 2014 ECPP 1891 U(1383,1,7561)+U(1383,1,7560) 23745 x25 2013 Lehmer number 1892 6917!-1 23560 g1 1998 Factorial 1893 2^77291+2^38646+1 23267 O 2000 Gaussian Mersenne norm 30 1894 (V(59936,1,4863)+1)/(V(59936,1,3)+1) 23220 x25 2013 Lehmer primitive part 1895 U(1118,1,7561)-U(1118,1,7560) 23047 x25 2013 Lehmer number 1896 (V(45366,1,4857)+1)/(V(45366,1,3)+1) 22604 x25 2013 Lehmer primitive part 1897 τ(257^1698) 22506 c72 2014 ECPP 1898 10^22250+57913 22251 c35 2014 ECPP 1899 2^73845+14717 22230 c61 2013 ECPP 1900 2^73360+10711 22084 c61 2014 ECPP 1901 U(104911) 21925 c82 2015 Fibonacci number, ECPP 1902 20170108*10^21700+39 21708 c83 2016 ECPP 1903 U(19258,-1,5039) 21586 x23 2007 Generalized Lucas number 1904 6380!+1 21507 g1 1998 Factorial 1905 U(43100,1,4620)+U(43100,1,4619) 21407 x25 2016 Lehmer number 1906 (V(23354,1,4869)-1)/(V(23354,1,9)-1) 21231 x25 2013 Lehmer primitive part 1907 U(15631,1,5040)-U(15631,1,5039) 21134 x25 2003 Lehmer number 1908 U(35759,1,4620)+U(35759,1,4619) 21033 x25 2016 Lehmer number 1909 U(31321,1,4620)-U(31321,1,4619) 20767 x25 2016 Lehmer number 1910 ((((((2521008887^3+80)^3+12)^3+450)^3+894)^3+3636)^3+70756)^3+97220 20562 FE1 2006 ECPP, Mills' prime 1911 U(11200,-1,5039) 20400 x25 2004 Generalized Lucas number, cyclotomy 1912 τ(41^2296) 20367 c91 2018 ECPP 1913 Phi(23749,-10) 20160 c47 2014 Unique, ECPP 1914 U(22098,1,4620)+U(22098,1,4619) 20067 x25 2016 Lehmer number 1915 U(21412,1,4620)-U(21412,1,4619) 20004 x25 2016 Lehmer number 1916 V(94823) 19817 c73 2014 Lucas number, ECPP 1917 U(19361,1,4620)+U(19361,1,4619) 19802 x25 2016 Lehmer number 1918 U(8454,-1,5039) 19785 x25 2013 Generalized Lucas number 1919 U(6584,-1,5039) 19238 x23 2007 Generalized Lucas number 1920 (2^63703-1)/42808417 19169 c59 2014 Mersenne cofactor, ECPP 1921 V(89849) 18778 c70 2014 Lucas number, ECPP 1922 primV(145353) 18689 c69 2013 ECPP, Lucas primitive part 1923 Phi(14943,-100) 18688 c47 2014 Unique, ECPP 1924 Phi(18827,10) 18480 c47 2014 Unique, ECPP 1925 42209#+1 18241 p8 1999 Primorial 1926 (V(46662,1,3879)-1)/(V(46662,1,9)-1) 18069 x25 2012 Lehmer primitive part 1927 7457*2^59659+1 17964 Y 1997 Cullen 1928 (2^58199-1)/237604901713907577052391 17497 c59 2015 Mersenne cofactor, ECPP 1929 Phi(26031,-10) 17353 c47 2014 Unique, ECPP 1930 (V(561,1,6309)+1)/(V(561,1,9)+1) 17319 x25 2016 Lehmer primitive part 1931e U(5768,-5769,4591) 17264 x45 2018 Generalized Lucas number, cyclotomy 1932 U(9657,1,4321)-U(9657,1,4320) 17215 x23 2005 Lehmer number 1933 (2^57131-1)/61481396117165983261035042726614288722959856631 17152 c59 2015 Mersenne cofactor, ECPP 1934 U(81839) 17103 p54 2001 Fibonacci number 1935 V(81671) 17069 c66 2013 Lucas number, ECPP 1936 primV(86756) 16920 c74 2015 Lucas primitive part, ECPP 1937 6521953289619*2^55555+1 16737 p296 2013 Triplet (3) 1938 6521953289619*2^55555-1 16737 p296 2013 Triplet (2) 1939 6521953289619*2^55555-5 16737 c58 2013 Triplet (1), ECPP 1940 U(15823,1,3960)-U(15823,1,3959) 16625 x25 2002 Lehmer number, cyclotomy 1941 p(221444161) 16569 c77 2017 Partitions, ECPP 1942 U(10803,1,4081)-U(10803,1,4080) 16457 x25 2005 Lehmer number, cyclotomy 1943 U(11091,-1,4049) 16375 CH3 2005 Generalized Lucas number 1944 (V(21151,1,3777)-1)/(V(21151,1,3)-1) 16324 x25 2011 Lehmer primitive part 1945 U(2554,-1,4751) 16185 CH3 2005 Generalized Lucas number 1946 U(1599,-1,5039) 16141 x23 2007 Generalized Lucas number 1947 (2^53381-1)/15588960193/38922536168186976769/1559912715971690629450336\ 68006103 16008 c84 2017 Mersenne cofactor, ECPP 1948 U(2878,1,4620)-U(2878,1,4619) 15978 x25 2013 Lehmer number 1949 U(10853,1,3960)+U(10853,1,3959) 15977 x25 2002 Lehmer number, cyclotomy 1950 -E(5186)/(704695260558899*578291717*726274378546751504461) 15954 c63 2018 Euler irregular, ECPP 1951e U(5797,-5798,4201) 15806 CH11 2018 Generalized Lucas number, cyclotomy 1952 U(9667,1,3960)-U(9667,1,3959) 15778 x25 2002 Lehmer number, cyclotomy 1953 Phi(2949,-100000000) 15713 c47 2013 Unique, ECPP 1954 U(14257,-1,3779) 15694 x25 2004 Generalized Lucas number, cyclotomy 1955 U(551,-1,5669) 15537 x25 2016 Generalized Lucas number 1956 (U(9275,1,3961)+U(9275,1,3960))/(U(9275,1,45)+U(9275,1,44)) 15537 x38 2009 Lehmer primitive part 1957e (2^51487-1)/57410994232247/17292148963401772464767849635553 15455 c77 2018 Mersenne cofactor, ECPP 1958 (V(824,1,5277)-1)/(V(824,1,3)-1) 15379 x25 2013 Lehmer primitive part 1959a primB(183835) 15368 c77 2019 Lucas Aurifeuillian primitive part, ECPP 1960a primU(77387) 15319 c77 2019 Fibonacci primitive part, ECPP 1961 U(13283,1,3697)+U(13283,1,3696) 15240 x25 2011 Lehmer number 1962b primB(181705) 15189 c77 2019 Lucas Aurifeuillian primitive part, ECPP 1963 16481859*35023#-1 15130 p364 2015 Arithmetic progression (4,d=4190788*35023#) 1964 primV(76568) 15034 c74 2015 Lucas primitive part, ECPP 1965e U(71983)/5614673/363946049 15028 c77 2018 Fibonacci cofactor, ECPP 1966 1008075799*34687#+1 15004 p252 2010 Arithmetic progression (4,d=2571033*34687#) 1967 (V(42995,1,3231)+1)/(V(42995,1,9)+1) 14929 x25 2012 Lehmer primitive part 1968 primV(75316) 14897 c74 2015 Lucas primitive part, ECPP 1969 Phi(5015,-10000) 14848 c47 2013 Unique, ECPP 1970 primV(91322) 14847 c74 2016 Lucas primitive part, ECPP 1971 2^49207-2^24604+1 14813 x16 2000 Gaussian Mersenne norm 29 1972 primV(110676) 14713 c74 2016 Lucas primitive part, ECPP 1973 (V(8003,1,3771)+1)/(V(8003,1,9)+1) 14685 x25 2013 Lehmer primitive part 1974 U(69239)/1384781 14464 c77 2018 Fibonacci cofactor, ECPP 1975 primV(112914) 14446 c74 2016 Lucas primitive part, ECPP 1976d primA(170575) 14258 c77 2018 Lucas Aurifeuillian primitive part, ECPP 1977 V(68213)/7290202116115634431 14237 c77 2018 Lucas cofactor, ECPP 1978 (V(5111,1,3789)+1)/(V(5111,1,9)+1) 14019 x25 2013 Lehmer primitive part 1979 (V(5763,1,3753)+1)/(V(5763,1,27)+1) 14013 x25 2011 Lehmer primitive part 1980 primU(67703) 13954 c77 2018 Fibonacci primitive part, ECPP 1981 U(66947)/12485272838388758877279873712131648167413 13951 c77 2017 Fibonacci cofactor, ECPP 1982d V(66533)/2128184670585621839884209100279 13875 c77 2018 Lucas cofactor, ECPP 1983 6*Bern(5534)/(89651360098907*22027790155387*114866371) 13862 c71 2014 Irregular, ECPP 1984 4410546*Bern(5526)/(4931516285027*1969415121333695957254369297) 13840 c63 2018 Irregular,ECPP 1985 (V(5132,1,3753)+1)/(V(5132,1,27)+1) 13825 x25 2011 Lehmer primitive part 1986 primV(82630) 13814 c74 2014 Lucas primitive part, ECPP 1987 (V(4527,1,3771)+1)/(V(4527,1,9)+1) 13754 x25 2013 Lehmer primitive part 1988 primB(163595) 13675 c77 2018 Lucas Aurifeuillian primitive part, ECPP 1989 6*Bern(5462)/(724389557*8572589*3742097186099) 13657 c64 2013 Irregular, ECPP 1990 (V(3813,1,3771)-1)/(V(3813,1,9)-1) 13473 x25 2011 Lehmer primitive part 1991 (V(3476,1,3771)-1)/(V(3476,1,9)-1) 13322 x25 2011 Lehmer primitive part 1992 (V(3755,1,3753)-1)/(V(3755,1,27)-1) 13319 x25 2011 Lehmer primitive part 1993 1815615642825*2^44046-1 13272 p395 2016 Cunningham chain (4p+3) 1994 1815615642825*2^44045-1 13272 p395 2016 Cunningham chain (2p+1) 1995 1815615642825*2^44044-1 13271 p395 2016 Cunningham chain (p) 1996 primU(94551) 13174 c77 2018 Fibonacci primitive part, ECPP 1997 primB(242295) 13014 c77 2018 Lucas Aurifeuillian primitive part, ECPP 1998d U(61813)/594517433/3761274442997 12897 c77 2018 Fibonacci cofactor, ECPP 1999 (2^42737+1)/3 12865 M 2007 ECPP, generalized Lucas number, Wagstaff 2000 primU(62771) 12791 c77 2018 Fibonacci primitive part, ECPP 2001 p(131328565) 12758 c77 2017 Partitions, ECPP 2002 primA(154415) 12728 c77 2018 Lucas Aurifeuillian primitive part, ECPP 2003 p(130249452) 12705 c85 2017 Partitions, ECPP 2004 p(130243561) 12705 c85 2017 Partitions, ECPP 2005 p(130242827) 12705 c85 2017 Partitions, ECPP 2006 p(130232271) 12705 c85 2017 Partitions, ECPP 2007 p(130201087) 12703 c85 2017 Partitions, ECPP 2008 p(130168020) 12701 c85 2017 Partitions, ECPP 2009 p(130142600) 12700 c85 2017 Partitions, ECPP 2010 p(130123073) 12699 c85 2017 Partitions, ECPP 2011 p(130086648) 12697 c85 2017 Partitions, ECPP 2012 p(130085878) 12697 c85 2017 Partitions, ECPP 2013 p(130060601) 12696 c85 2016 Partitions, ECPP 2014 p(130000231) 12693 c59 2016 Partitions, ECPP 2015 primA(263865) 12570 c77 2018 Lucas Aurifeuillian primitive part, ECPP 2016 6*Bern(5078)/(64424527603*9985070580644364287) 12533 c63 2013 Irregular, ECPP 2017 (2^41681-1)/1052945423/16647332713153/2853686272534246492102086015457 12495 c77 2015 Mersenne cofactor, ECPP 2018 (2^41521-1)/41602235382028197528613357724450752065089 12459 c54 2012 Mersenne cofactor, ECPP 2019 (2^41263-1)/(1402943*983437775590306674647) 12395 c59 2012 Mersenne cofactor, ECPP 2020 U(59369)/2442423669148466039458303756169988568809269383644075940757020\ 9763004757 12337 c79 2015 Fibonacci cofactor, ECPP 2021 primV(73549) 12324 c74 2015 Lucas primitive part, ECPP 2022 p(122110618) 12302 c77 2015 Partitions, ECPP 2023 p(120052058) 12198 c59 2012 Partitions, ECPP 2024 p(120037981) 12197 c59 2014 Partitions, ECPP 2025 742478255901*2^40069+1 12074 p395 2016 Cunningham chain 2nd kind (4p-3) 2026 996824343*2^40074+1 12073 p395 2016 Cunningham chain 2nd kind (4p-3) 2027 primV(57724) 12063 p54 2001 Lucas primitive part, cyclotomy 2028 primV(59018) 11789 c74 2015 Lucas primitive part, ECPP 2029 V(56003) 11704 p193 2006 Lucas number 2030 primA(143705) 11703 c77 2017 Lucas Aurifeuillian primitive part, ECPP 2031 p(110030755) 11677 c59 2014 Partitions, ECPP 2032 primV(77231) 11637 c74 2015 Lucas primitive part, ECPP 2033 primV(83481) 11631 c74 2015 Lucas primitive part, ECPP 2034 primU(73025) 11587 c77 2015 Fibonacci primitive part, ECPP 2035 primU(67781) 11587 c77 2015 Fibonacci primitive part, ECPP 2036 primV(64652) 11577 c74 2015 Lucas primitive part, ECPP 2037 primB(219165) 11557 c77 2015 Lucas Aurifeuillian primitive part, ECPP 2038 primV(56356) 11557 c74 2015 Lucas primitive part, ECPP 2039 primV(58672) 11557 c74 2015 Lucas primitive part, ECPP 2040 primV(131040) 11557 c74 2015 Lucas primitive part, ECPP 2041 198429723072*11^11005+1 11472 L3323 2016 Cunningham chain 2nd kind (4p-3) 2042 U(54799)/4661437953906084533621577211561 11422 c8 2015 Fibonacci cofactor, ECPP 2043 U(54521)/6403194135342743624071073 11370 c8 2015 Fibonacci cofactor, ECPP 2044 primU(67825) 11336 x23 2007 Fibonacci primitive part 2045 primV(64484) 11306 c74 2014 Lucas primitive part, ECPP 2046 3610!-1 11277 C 1993 Factorial 2047 p(100115477) 11138 c59 2016 Partitions, ECPP 2048 p(100090547) 11137 c59 2014 Partitions, ECPP 2049 U(53189)/69431662887136064191105625570683133711989 11075 c8 2014 Fibonacci cofactor, ECPP 2050 primV(63119) 11060 c74 2014 Lucas primitive part, ECPP 2051 primU(61733) 11058 c77 2015 Fibonacci primitive part, ECPP 2052 14059969053*2^36672+1 11050 p364 2018 Triplet (3) 2053 14059969053*2^36672-1 11050 p364 2018 Triplet (2) 2054 14059969053*2^36672-5 11050 c67 2018 Triplet (1), ECPP 2055 778965587811*2^36627-1 11038 p395 2016 Cunningham chain (4p+3) 2056 778965587811*2^36626-1 11038 p395 2016 Cunningham chain (2p+1) 2057 778965587811*2^36625-1 11038 p395 2016 Cunningham chain (p) 2058 272879344275*2^36622-1 11036 p395 2016 Cunningham chain (4p+3) 2059 272879344275*2^36621-1 11036 p395 2016 Cunningham chain (2p+1) 2060 272879344275*2^36620-1 11036 p395 2016 Cunningham chain (p) 2061 V(52859)/1124137922466041911 11029 c8 2014 Lucas cofactor, ECPP 2062 3507!-1 10912 C 1992 Factorial 2063 V(52201)/70585804042896975505694709575919458733851279868446609 10857 c8 2015 Lucas cofactor, ECPP 2064 V(52009)/39772636393178951550299332730909 10838 c8 2015 Lucas cofactor, ECPP 2065 V(51941)/2808052157610902114547210696868337380250300924116591143641642\ 866931 10789 c8 2015 Lucas cofactor, ECPP 2066 1258566*Bern(4462)/(2231*596141126178107*4970022131749) 10763 c64 2013 Irregular, ECPP 2067 333645655005*2^35549-1 10713 p364 2015 Cunningham chain (4p+3) 2068 333645655005*2^35548-1 10713 p364 2015 Cunningham chain (2p+1) 2069 333645655005*2^35547-1 10713 p364 2015 Cunningham chain (p) 2070 V(51349)/224417260052884218046541 10708 c8 2014 Lucas cofactor, ECPP 2071 V(51169) 10694 p54 2001 Lucas number 2072 U(51031)/95846689435051369 10648 c8 2014 Fibonacci cofactor, ECPP 2073 V(50989)/69818796119453411 10640 c8 2014 Lucas cofactor, ECPP 2074 Phi(13285,-10) 10625 c47 2012 Unique, ECPP 2075 U(50833) 10624 CH4 2005 Fibonacci number 2076 (2^35339-1)/4909884303849890402839544048623503366767426783548098123390\ 4512709297747031041 10562 c77 2015 Mersenne cofactor, ECPP 2077 1213266377*2^35000+4859 10546 c4 2014 ECPP, consecutive primes arithmetic progression (3,d=2430) 2078 1213266377*2^35000+2429 10546 c4 2014 ECPP, consecutive primes arithmetic progression (2,d=2430) 2079 1213266377*2^35000-1 10546 p44 2014 Consecutive primes arithmetic progression (1,d=2430) 2080 1043085905*2^35000+18197 10546 c4 2014 ECPP, consecutive primes arithmetic progression (3,d=18198) 2081 1043085905*2^35000-1 10546 p44 2014 Consecutive primes arithmetic progression (2,d=18198) 2082 1043085905*2^35000-18199 10546 c4 2014 ECPP, consecutive primes arithmetic progression (1,d=18198) 2083 109061779*2^35003+11855 10545 c4 2014 ECPP, consecutive primes arithmetic progression (3,d=5928) 2084 109061779*2^35003+5927 10545 c4 2014 ECPP, consecutive primes arithmetic progression (2,d=5928) 2085 109061779*2^35003-1 10545 p44 2014 Consecutive primes arithmetic progression (1,d=5928) 2086 350049825*2^35000+7703 10545 c4 2014 ECPP, consecutive primes arithmetic progression (3,d=3852) 2087 350049825*2^35000+3851 10545 c4 2014 ECPP, consecutive primes arithmetic progression (2,d=3852) 2088 350049825*2^35000-1 10545 p44 2014 Consecutive primes arithmetic progression (1,d=3852) 2089 146462479*2^35001+8765 10545 c4 2013 ECPP, consecutive primes arithmetic progression (3,d=8766) 2090 146462479*2^35001-1 10545 p44 2013 Consecutive primes arithmetic progression (2,d=8766) 2091 146462479*2^35001-8767 10545 c4 2013 ECPP, consecutive primes arithmetic progression (1,d=8766) 2092 5110664609396115*2^34946-1 10536 p375 2014 Cunningham chain (4p+3) 2093 5110664609396115*2^34945-1 10536 p375 2014 Cunningham chain (2p+1) 2094 5110664609396115*2^34944-1 10535 p375 2014 Cunningham chain (p) 2095 primU(55297) 10483 c8 2014 Fibonacci primitive part, ECPP 2096 primA(219135) 10462 c8 2014 Lucas Aurifeuillian primitive part, ECPP 2097 3221449497221499*2^34567+5 10422 c58 2015 Triplet (3), ECPP 2098 3221449497221499*2^34567+1 10422 p296 2015 Triplet (2) 2099 3221449497221499*2^34567-1 10422 p296 2015 Triplet (1) 2100 1288726869465789*2^34567+1 10421 p296 2014 Triplet (3) 2101 1288726869465789*2^34567-1 10421 p296 2014 Triplet (2) 2102 1288726869465789*2^34567-5 10421 c58 2014 ECPP, Triplet (1) 2103 24029#+1 10387 C 1993 Primorial 2104e 400791048*24001#+1 10378 p155 2018 Arithmetic progression (5,d=59874860*24001#) 2105e 393142614*24001#+1 10378 p155 2018 Arithmetic progression (5,d=54840724*24001#) 2106 221488788*24001#+1 10377 p155 2018 Arithmetic progression (5,d=22703701*24001#) 2107 195262026*24001#+1 10377 p155 2018 Arithmetic progression (5,d=10601738*24001#) 2108 184591880*24001#+1 10377 p155 2018 Arithmetic progression (5,d=17881715*24001#) 2109 6*Bern(4306)/2153 10342 FE8 2009 Irregular, ECPP 2110 V(49391)/298414424560419239 10305 c8 2013 Lucas cofactor, ECPP 2111 23801#+1 10273 C 1993 Primorial 2112b 667674063382677*2^33608+7 10132 c88 2019 Quadruplet (4), ECPP 2113b 667674063382677*2^33608+5 10132 c88 2019 Quadruplet (3), ECPP 2114b 667674063382677*2^33608+1 10132 L4808 2019 Quadruplet (2) 2115b 667674063382677*2^33608-1 10132 L4808 2019 Quadruplet (1) 2116e 655846766879901*2^33505+5 10101 c88 2018 Triplet (1) 2117e 655846766879901*2^33505+1 10101 L4808 2018 Triplet (2) 2118 621988357825221*2^33505+5 10101 c88 2018 Triplet (3) 2119 Phi(427,-10^28) 10081 FE9 2009 Unique, ECPP 2120 9649755890145*2^33335+1 10048 p364 2015 Cunningham chain 2nd kind (4p-3) 2121 15162914750865*2^33219+1 10014 p364 2015 Cunningham chain 2nd kind (4p-3) 2122 32469*2^32469+1 9779 MM 1997 Cullen 2123 (2^32531-1)/(65063*25225122959) 9778 c60 2012 Mersenne cofactor, ECPP 2124 (2^32611-1)/1514800731246429921091778748731899943932296901864652928732\ 838910515860494755367311 9736 c90 2018 Mersenne cofactor, ECPP 2125 8073*2^32294+1 9726 MM 1997 Cullen 2126 V(45953)/4561241750239 9591 c56 2012 Lucas cofactor, ECPP 2127 E(3308)/39308792292493140803643373186476368389461245 9516 c8 2014 Euler irregular, ECPP 2128 Phi(5161,-100) 9505 c47 2012 Unique, ECPP 2129 primA(196035) 9359 c8 2014 Lucas Aurifeuillian primitive part, ECPP 2130 V(44507) 9302 CH3 2005 Lucas number 2131 V(43987)/175949 9188 c8 2014 Lucas cofactor, ECPP 2132 U(43399)/470400609575881344601538056264109423291827366228494341196421 9010 c8 2013 Fibonacci cofactor, ECPP 2133 primU(44113) 8916 c8 2014 Fibonacci primitive part, ECPP 2134 U(42829)/107130175995197969243646842778153077 8916 c8 2014 Fibonacci cofactor, ECPP 2135 (2^29473-1)/(5613392570256862943*24876264677503329001) 8835 c59 2012 Mersenne cofactor, ECPP 2136 primA(159165) 8803 c8 2013 Lucas Aurifeuillian primitive part, ECPP 2137 U(42043)/1681721 8780 c56 2012 Fibonacci cofactor, ECPP 2138 (2^28771-1)/104726441 8653 c56 2012 Mersenne cofactor, ECPP 2139 (2^28759-1)/226160777 8649 c60 2012 Mersenne cofactor, ECPP 2140 Phi(6105,-1000) 8641 c47 2010 Unique, ECPP 2141 Phi(4667,-100) 8593 c47 2009 Unique, ECPP 2142 U(40763)/643247084652261620737 8498 c8 2013 Fibonacci cofactor, ECPP 2143 primU(46711) 8367 c8 2013 Fibonacci primitive part, ECPP 2144 V(39769)/18139109172816581 8295 c8 2013 Lucas cofactor, ECPP 2145 2^27529-2^13765+1 8288 O 2000 Gaussian Mersenne norm 28 2146 primB(148605) 8282 c8 2013 Lucas Aurifeuillian primitive part, ECPP 2147 V(39607)/158429 8273 c46 2011 Lucas cofactor, ECPP 2148 primB(103645) 8202 c8 2013 Lucas Aurifeuillian primitive part, ECPP 2149 primU(62373) 8173 c8 2013 Fibonacci primitive part, ECPP 2150 primB(119945) 8165 c8 2013 Lucas Aurifeuillian primitive part, ECPP 2151 primB(99835) 8126 c8 2013 Lucas Aurifeuillian primitive part, ECPP 2152 primB(96545) 8070 c8 2013 Lucas Aurifeuillian primitive part, ECPP 2153 (2^26903-1)/1113285395642134415541632833178044793 8063 c55 2011 Mersenne cofactor, ECPP 2154 18523#+1 8002 D 1989 Primorial 2155 primU(43121) 7975 c8 2013 Fibonacci primitive part, ECPP 2156 6*Bern(3458)/28329084584758278770932715893606309 7945 c8 2013 Irregular, ECPP 2157 U(37987)/(16117960073*94533840409*1202815961509) 7906 c39 2012 Fibonacci cofactor, ECPP 2158 U(37511) 7839 x13 2005 Fibonacci number 2159 primB(145545) 7824 c8 2013 Lucas Aurifeuillian primitive part, ECPP 2160 V(37357)/20210113386303842894568629 7782 c8 2013 Lucas cofactor, ECPP 2161 U(37217)/4466041 7771 c46 2011 Fibonacci cofactor, ECPP 2162 -E(2762)/2670541 7760 c11 2004 Euler irregular, ECPP 2163 (2^25933-1)/1343522383641330719274248287/55891374030173104216060503792\ 56829183569 7740 c86 2017 Mersenne cofactor 2164 V(36779) 7687 CH3 2005 Lucas number 2165 (2^25243-1)/252431/403889/43014073/449245236879223161338352589831 7551 c84 2016 Mersenne cofactor, ECPP 2166 U(35999) 7523 p54 2001 Fibonacci number, cyclotomy 2167 Phi(4029,-1000) 7488 c47 2009 Unique, ECPP 2168 V(35449) 7409 p12 2001 Lucas number 2169 V(35107)/525110138418084707309 7317 c8 2013 Lucas cofactor, ECPP 2170 primA(161595) 7313 c8 2013 Lucas Aurifeuillian primitive part, ECPP 2171 U(34897)/4599458691503517435329 7272 c8 2013 Fibonacci cofactor, ECPP 2172 V(34759)/27112021 7257 c33 2005 Lucas cofactor, ECPP 2173 U(34807)/551750980997908879677508732866536453 7239 c8 2013 Fibonacci cofactor, ECPP 2174 U(34607)/13088506284255296513 7213 c8 2013 Fibonacci cofactor, ECPP 2175 Phi(9455,-10) 7200 c33 2005 Unique, ECPP 2176 Phi(1479,-100000000) 7168 c47 2009 Unique, ECPP 2177 primB(134415) 7163 c8 2013 Lucas Aurifeuillian primitive part, ECPP 2178 -30*Bern(3176)/(169908471493279*905130251538800883547330531*4349908093\ 09147283469396721753169) 7138 c63 2016 Irregular, ECPP 2179 U(33997)/8119544695419968014626314520991088099382355441843013 7053 c8 2013 Fibonacci cofactor, ECPP 2180 2154675239*16301#+1 7036 p155 2018 Arithmetic progression (6,d=141836149*16301#) 2181 primU(48965) 7012 c8 2013 Fibonacci primitive part, ECPP 2182 -10365630*Bern(3100)/(140592076277*66260150981141825531862457*17930747\ 9508256366206520177467103) 6943 c63 2016 Irregular ECPP 2183 V(33353)/279902102741094707003083072429 6941 c8 2013 Lucas cofactor, ECPP 2184 23005*2^23005-1 6930 Y 1997 Woodall 2185 22971*2^22971-1 6920 Y 1997 Woodall 2186 Phi(2405,-10000) 6912 c47 2009 Unique, ECPP 2187 15877#-1 6845 CD 1992 Primorial 2188 Phi(10887,10) 6841 c33 2005 Unique, ECPP 2189 primU(58773) 6822 c8 2013 Fibonacci primitive part, ECPP 2190 primU(40295) 6737 p12 2001 Fibonacci primitive part 2191 U(32077)/153087505413829037510511957221947361 6669 c8 2013 Fibonacci cofactor, ECPP 2192 6*Bern(2974)/19622040971147542470479091157507 6637 c8 2013 Irregular, ECPP 2193 (2^22193-1)/1482314857/335842152520679489/5501204091835435410769069847\ 32919 6622 c90 2018 Mersenne cofactor 2194 U(30757) 6428 p54 2001 Fibonacci number, cyclotomy 2195 V(31547)/2214098083841440850624929865754025869183488666508931309344798\ 2330346227824686184228977375762399380559492255026457207263132495525655\ 34024996670996378968020508259098756301 6425 c8 2013 Lucas cofactor, ECPP 2196 Phi(7357,-10) 6301 c33 2004 Unique, ECPP 2197 Phi(6437,10) 6240 c47 2008 Unique, ECPP 2198 (2^20887-1)/(694257144641*3156563122511*28533972487913*189380444251383\ 6092687) 6229 c4 2009 Mersenne cofactor, ECPP 2199 (2^20521-1)/123127/2515394736937/1963491988082957280584769807344972887 6124 c84 2017 Mersenne cofactor, ECPP 2200 primU(43653) 6082 CH7 2010 Fibonacci primitive part 2201 primU(70455) 6019 c8 2013 Fibonacci primitive part, ECPP 2202 E(2220)/392431891068600713525 6011 c8 2013 Euler irregular, ECPP 2203 primU(43359) 5939 c8 2013 Fibonacci primitive part, ECPP 2204 -E(2202)/53781055550934778283104432814129020709 5938 c8 2013 Euler irregular, ECPP 2205 primU(28667) 5914 c8 2013 Fibonacci primitive part, ECPP 2206 13649#+1 5862 D 1987 Primorial 2207 V(27827)/3579579016301 5803 c4 2011 Lucas cofactor, ECPP 2208 274386*Bern(2622)/8518594882415401157891061256276973722693 5701 c8 2013 Irregular, ECPP 2209 18885*2^18885-1 5690 K 1987 Woodall 2210 1963!-1 5614 CD 1992 Factorial 2211 13033#-1 5610 CD 1992 Primorial 2212 289*2^18502+1 5573 K 1984 Cullen, generalized Fermat 2213 V(26309)/42316339086094085101 5479 c8 2013 Lucas cofactor, ECPP 2214 E(2028)/11246153954845684745 5412 c55 2011 Euler irregular, ECPP 2215 -30*Bern(2504)/(313*424524649821233650433*117180678030577350578887*801\ 6621720796146291948744439) 5354 c63 2013 Irregular ECPP 2216 U(25561) 5342 p54 2001 Fibonacci number 2217 -E(1990)/8338208577950624722417016286765473477033741642105671913 5258 c8 2013 Euler irregular, ECPP 2218 33957462*Bern(2370)/40685 5083 c11 2003 Irregular, ECPP 2219 4122429552750669*2^16567+7 5003 c83 2016 Quadruplet (4), ECPP 2220 4122429552750669*2^16567+5 5003 c83 2016 Quadruplet (3), ECPP 2221 4122429552750669*2^16567+1 5003 L4342 2016 Quadruplet (2) 2222 4122429552750669*2^16567-1 5003 L4342 2016 Quadruplet (1) 2223 11549#+1 4951 D 1986 Primorial 2224 E(1840)/31237282053878368942060412182384934425 4812 c4 2011 Euler irregular, ECPP 2225 7911*2^15823-1 4768 K 1987 Woodall 2226 Phi(6685,-10) 4560 c8 2003 Unique, ECPP 2227 E(1736)/(55695515*75284987831*3222089324971117) 4498 c4 2004 Euler irregular, ECPP 2228 2^14699+2^7350+1 4425 O 2000 Gaussian Mersenne norm 27 2229 Phi(3273,-100) 4361 c8 2003 Unique, ECPP 2230 (2^14479+1)/3 4359 c4 2004 Generalized Lucas number, Wagstaff, ECPP 2231 276474*Bern(2030)/(19426085*24191786327543) 4200 c8 2003 Irregular, ECPP 2232 V(19469) 4069 x25 2002 Lucas number, cyclotomy, APR-CL assisted 2233 1477!+1 4042 D 1984 Factorial 2234 -2730*Bern(1884)/100983617849 3844 c8 2003 Irregular, ECPP 2235 2840178*Bern(1870)/85 3821 c8 2003 Irregular, ECPP 2236 -197676570*18851280661*Bern(1836)/(59789*3927024469727) 3734 c8 2003 Irregular, ECPP 2237 12379*2^12379-1 3731 K 1984 Woodall 2238 (2^12391+1)/3 3730 M 1996 Generalized Lucas number, Wagstaff 2239 -E(1466)/167900532276654417372106952612534399239 3682 c8 2013 Euler irregular, ECPP 2240 E(1468)/(95*217158949445380764696306893*597712879321361736404369071) 3671 c4 2003 Euler irregular, ECPP 2241 642*Bern(1802)/15720728189 3641 c8 2003 Irregular, ECPP 2242 101406820312263*2^12042+7 3640 c67 2018 Quadruplet (4) 2243 101406820312263*2^12042+5 3640 c67 2018 Quadruplet (3) 2244 101406820312263*2^12042+1 3640 p364 2018 Quadruplet (2) 2245 101406820312263*2^12042-1 3640 p364 2018 Quadruplet (1) 2246 2673092556681*15^3048+4 3598 c67 2015 Quadruplet (4) 2247 2673092556681*15^3048+2 3598 c67 2015 Quadruplet (3) 2248 2673092556681*15^3048-2 3598 c67 2015 Quadruplet (2) 2249 2673092556681*15^3048-4 3598 c67 2015 Quadruplet (1) 2250 2339662057597*10^3490+9 3503 c67 2013 Quadruplet (4) 2251 2339662057597*10^3490+7 3503 c67 2013 Quadruplet (3) 2252 2339662057597*10^3490+3 3503 c67 2013 Quadruplet (2) 2253 2339662057597*10^3490+1 3503 p364 2013 Quadruplet (1) 2254 (2^11279+1)/3 3395 PM 1998 Cyclotomy, generalized Lucas number, Wagstaff 2255 109766820328*7877#-1 3385 p395 2016 Cunningham chain (8p+7) 2256 104052837*7759#-1 3343 p398 2017 Arithmetic progression (6,d=12009836*7759#) 2257 (2^10691+1)/3 3218 c4 2004 Generalized Lucas number, Wagstaff, ECPP 2258 231692481512*7517#-1 3218 p395 2016 Cunningham chain (8p+7) 2259 (2^10501+1)/3 3161 M 1996 Generalized Lucas number, Wagstaff 2260 2^10141+2^5071+1 3053 O 2000 Gaussian Mersenne norm 26 2261 62037039993*7001#+7811555813 3021 x38 2013 Consecutive primes arithmetic progression (4,d=30), ECPP 2262 50946848056*7001#+7811555813 3021 x38 2013 Consecutive primes arithmetic progression (4,d=30), ECPP 2263 26997933312*7001#+7811555753 3020 x38 2013 Consecutive primes arithmetic progression (4,d=30), ECPP 2264 25506692100*7001#+7811555783 3020 x38 2013 Consecutive primes arithmetic progression (4,d=30), ECPP 2265 V(14449) 3020 DK 1995 Lucas number 2266 3124777373*7001#+1 3019 p155 2012 Arithmetic progression (7,d=481789017*7001#) 2267 2996180304*7001#+1 3019 p155 2012 Arithmetic progression (6,d=46793757*7001#) 2268 2946259686*7001#+1 3019 p155 2012 Arithmetic progression (6,d=313558156*7001#) 2269 2915000572*7001#+1 3019 p155 2012 Arithmetic progression (6,d=3093612*7001#) 2270 U(14431) 3016 p54 2001 Fibonacci number 2271 138281163736*6977#+1 3006 p395 2016 Cunningham chain 2nd kind (8p-7) 2272 375967981369*6907#*8-1 2972 p382 2017 Cunningham chain (8p+7) 2273 354362289656*6907#*8-1 2972 p382 2017 Cunningham chain (8p+7) 2274 285993323512*6907#*8-1 2972 p382 2017 Cunningham chain (8p+7) 2275 V(13963) 2919 c11 2002 Lucas number, ECPP 2276 284787490256*6701#+1 2879 p364 2015 Cunningham chain 2nd kind (8p-7) 2277 9531*2^9531-1 2874 K 1984 Woodall 2278 -E(1174)/50550511342697072710795058639332351763 2829 c8 2013 Euler irregular, ECPP 2279 6569#-1 2811 D 1992 Primorial 2280 -E(1142)/6233437695283865492412648122953349079446935570718422828539863\ 59013986902240869 2697 c77 2015 Euler irregular, ECPP 2281 -E(1078)/361898544439043 2578 c4 2002 Euler irregular, ECPP 2282 198267970563*6007#+7811555753 2575 x38 2013 Consecutive primes arithmetic progression (4,d=30), ECPP 2283 V(12251) 2561 p54 2001 Lucas number 2284 974!-1 2490 CD 1992 Factorial 2285 E(1028)/(6415*56837916301577) 2433 c4 2002 Euler irregular, ECPP 2286 E(1004)/(579851915*80533376783) 2364 c4 2002 Euler irregular, ECPP 2287 7755*2^7755-1 2339 K 1984 Woodall 2288 -2090369190*Bern(1236)/(103*939551962476779*157517441360851951) 2276 c4 2002 Irregular, ECPP 2289 -36870*Bern(1228)/1043706675925609 2272 c4 2002 Irregular, ECPP 2290 V(10691) 2235 DK 1995 Lucas number 2291 872!+1 2188 D 1983 Factorial 2292 557387248*5011#+1 2153 p364 2018 Cunningham chain 2nd kind (8p-7) 2293 5045589688*4933#+1 2106 p295 2010 Cunningham chain 2nd kind (8p-7) 2294 -E(902)/(9756496279*314344516832998594237) 2069 c4 2002 Euler irregular, ECPP 2295 -E(886)/68689 2051 c4 2002 Euler irregular, ECPP 2296 4787#+1 2038 D 1984 Primorial 2297 U(9677) 2023 c2 2000 Fibonacci number, ECPP 2298 6611*2^6611+1 1994 K 1984 Cullen 2299 4583#-1 1953 D 1992 Primorial 2300 U(9311) 1946 DK 1995 Fibonacci number 2301 4547#+1 1939 D 1984 Primorial 2302 4297#-1 1844 D 1992 Primorial 2303 125848198864*4253#+1 1829 p199 2010 Cunningham chain 2nd kind (8p-7) 2304 V(8467) 1770 c2 2000 Lucas number, ECPP 2305 4093#-1 1750 CD 1992 Primorial 2306 5795*2^5795+1 1749 K 1984 Cullen 2307 (2^5807+1)/3 1748 PM 1998 Cyclotomy, generalized Lucas number, Wagstaff 2308 54201838768*3917#-1 1681 p395 2016 Cunningham chain (16p+15) 2309 102619722624*3797#+1 1631 p395 2016 Cunningham chain 2nd kind (16p-15) 2310 V(7741) 1618 DK 1995 Lucas number 2311 394254311495*3733#/2+4 1606 c67 2017 Quintuplet (5) 2312 394254311495*3733#/2+2 1606 c67 2017 Quintuplet (4) 2313 394254311495*3733#/2-2 1606 c67 2017 Quintuplet (3) 2314 394254311495*3733#/2-4 1606 c67 2017 Quintuplet (2) 2315 394254311495*3733#/2-8 1606 c67 2017 Quintuplet (1) 2316 83*2^5318-1 1603 K 1984 Woodall 2317 2316765173284*3593#+16073 1543 c18 2016 Quintuplet (5), ECPP 2318 2316765173284*3593#+16069 1543 c18 2016 Quintuplet (4), ECPP 2319 2316765173284*3593#+16067 1543 c18 2016 Quintuplet (3), ECPP 2320 2316765173284*3593#+16063 1543 c18 2016 Quintuplet (2), ECPP 2321 2316765173284*3593#+16061 1543 c18 2016 Quintuplet (1), ECPP 2322 16*199949435137*3499#-1 1494 p382 2016 Cunningham chain (16p+15) 2323 163252711105*3371#/2+4 1443 c67 2014 Quintuplet (5) 2324 163252711105*3371#/2+2 1443 c67 2014 Quintuplet (4) 2325 163252711105*3371#/2-2 1443 c67 2014 Quintuplet (3) 2326 163252711105*3371#/2-4 1443 c67 2014 Quintuplet (2) 2327 163252711105*3371#/2-8 1443 c67 2014 Quintuplet (1) 2328 4713*2^4713+1 1423 K 1984 Cullen 2329 460226463*3301#+1 1402 p252 2010 Arithmetic progression (7,d=30017636*3301#) 2330 9039840848561*3299#/35+7 1401 c67 2013 Quintuplet (5) 2331 9039840848561*3299#/35+5 1401 c67 2013 Quintuplet (4) 2332 9039840848561*3299#/35+1 1401 p364 2013 Quintuplet (3) 2333 9039840848561*3299#/35-1 1401 p364 2013 Quintuplet (2) 2334 9039840848561*3299#/35-5 1401 c67 2013 Quintuplet (1) 2335 E(660)/(19825*3318810147166091*13270662249997061963929586463495619) 1393 c63 2017 Euler irregular, ECPP 2336 E(676)/878618128969410121818976030235415670049335313139115048927177891\ 58174298202475475590955674162377015 1391 c8 2013 Euler irregular, ECPP 2337 3229#+1 1368 D 1984 Primorial 2338 1233917739*3121#+1 1335 p155 2010 Arithmetic progression (7,d=5893725*3121#) 2339 1461401630*3109#+1 1328 p252 2009 Arithmetic progression (7,d=35777939*3109#) 2340 114109760*3041#+1 1303 p151 2017 Arithmetic progression (7,d=18121074*3041#) 2341 5780736564512*3023#-1 1301 p364 2015 Cunningham chain (16p+15) 2342 699549860111847*2^4244+11 1293 c26 2013 Quintuplet (5) 2343 699549860111847*2^4244+7 1293 c26 2013 Quintuplet (4) 2344 699549860111847*2^4244+5 1293 c26 2013 Quintuplet (3) 2345 699549860111847*2^4244+1 1293 p371 2013 Quintuplet (2) 2346 699549860111847*2^4244-1 1293 p371 2013 Quintuplet (1) 2347 898966996992*3001#+1 1289 p364 2015 Cunningham chain 2nd kind (16p-15) 2348 16*2658132486528*2969#+1 1281 p382 2017 Cunningham chain 2nd kind (16p-15) 2349 16*1413951139648*2969#+1 1280 p382 2017 Cunningham chain 2nd kind (16p-15) 2350 546!-1 1260 D 1992 Factorial 2351 V(5851) 1223 DK 1995 Lucas number 2352 406463527990*2801#+1633050403 1209 x38 2013 Consecutive primes arithmetic progression (5,d=30) 2353 68002763264*2749#-1 1185 p35 2012 Cunningham chain (16p+15) 2354 1290733709840*2677#+1 1141 p295 2011 Cunningham chain 2nd kind (16p-15) 2355 U(5387) 1126 WM 1990 Fibonacci number 2356 993530619517*2503#+1633050373 1073 x38 2013 Consecutive primes arithmetic progression (5,d=30) 2357 495690450643*2503#+1633050403 1072 x38 2013 Consecutive primes arithmetic progression (5,d=30) 2358 150822742857*2503#+1633050373 1072 x38 2013 Consecutive primes arithmetic progression (5,d=30) 2359 94807777362*2503#+1633050373 1072 x38 2013 Consecutive primes arithmetic progression (5,d=30) 2360 587027392600*2477#*16-1 1070 p382 2016 Cunningham chain (16p+15) 2361 (2^3539+1)/3 1065 M 1989 First titanic by ECPP, generalized Lucas number, Wagstaff 2362 2968802755*2459#+1 1057 p155 2009 Arithmetic progression (8,d=359463429*2459#) 2363 469!-1 1051 BC 1981 Factorial 2364 28993093368077*2399#+19433 1037 c18 2016 Sextuplet (6), ECPP 2365 28993093368077*2399#+19429 1037 c18 2016 Sextuplet (5), ECPP 2366 28993093368077*2399#+19427 1037 c18 2016 Sextuplet (4), ECPP 2367 28993093368077*2399#+19423 1037 c18 2016 Sextuplet (3), ECPP 2368 28993093368077*2399#+19421 1037 c18 2016 Sextuplet (2), ECPP 2369 6179783529*2411#+1 1037 p102 2003 Arithmetic progression (8,d=176836494*2411#) 2370 R(1031) 1031 WD 1985 Repunit 2371 89595955370432*2371#-1 1017 p364 2015 Cunningham chain (32p+31) 2372 116040452086*2371#+1 1014 p308 2012 Arithmetic progression (9,d=6317280828*2371#) 2373 115248484057*2371#+1 1014 p308 2013 Arithmetic progression (8,d=7327002535*2371#) 2374 113236255068*2371#+1 1014 p308 2013 Arithmetic progression (8,d=6601354956*2371#) 2375 112929231161*2371#+1 1014 p308 2013 Arithmetic progression (8,d=6982118533*2371#) 2376 97336164242*2371#+1 1014 p308 2013 Arithmetic progression (9,d=6350457699*2371#) 2377 93537753980*2371#+1 1014 p308 2013 Arithmetic progression (9,d=3388165411*2371#) 2378 92836168856*2371#+1 1014 p308 2013 Arithmetic progression (9,d=127155673*2371#) 2379 69318339141*2371#+1 1014 p308 2011 Arithmetic progression (9,d=1298717501*2371#) 2380 V(4793) 1002 DK 1995 Lucas number 2381 V(4787) 1001 DK 1995 Lucas number ----- ------------------------------- -------- ----- ---- -------------- KEY TO PROOF-CODES (primality provers): BC Penk, Crandall, Buhler C Caldwell, Cruncher c2 Water, Primo c4 Broadhurst, Primo c8 Water, Broadhurst, Primo c11 Oakes, Primo c18 Luhn, Primo c26 Keiser, OpenPFGW, Primo c33 Chaglassian, Primo c35 Cami, Primo c39 Minovic, OpenPFGW, Primo c46 Boncompagni, Primo c47 Chandler, Primo c54 Wu_T, Primo c55 Gramolin, Primo c56 Soule, Minovic, OpenPFGW, Primo c58 Kaiser1, NewPGen, OpenPFGW, Primo c59 Metcalfe, OpenPFGW, Primo c60 Lemsafer, Primo c61 Kaiser1, Broadhurst, NewPGen, OpenPFGW, Primo c63 Ritschel, TOPS, Primo c64 Metcalfe, Minovic, Ritschel, TOPS, Primo c65 Lygeros, Rozier, Primo c66 Steine, Primo c67 Batalov, NewPGen, OpenPFGW, Primo c69 Jacobsen, Primo c70 Dubner, Underwood, Primo c71 Metcalfe, Ritschel, Andersen, TOPS, Primo c72 Deloche, Lygeros, Rozier, Primo c73 Lifchitz, Underwood, Primo c74 Lasher, Dubner, Primo c76 Kaiser1, Underwood, Water, Primo c77 Batalov, Primo c79 Batalov, Water, Broadhurst, Primo c80 Lygeros, Rozier, Anonymous, Primo c81 Underwood, Water, Primo c82 Steine, Water, Primo c83 Kaiser1, PolySieve, NewPGen, Primo c84 Underwood, Primo c85 Lasher, Broadhurst, Primo c86 Polzer, Primo c87 Kaiser1, OpenPFGW, Primo c88 Kaiser1, PolySieve, Primo c89 Underwood, Broadhurst, Primo c90 Palameta, Batalov, Primo c91 Lygeros, Rozier, Morain, Primo CD Dubner, Caldwell, Cruncher CH10 Batalov, Primo, OpenPFGW, CHG CH11 Wang3, Primo, OpenPFGW, CHG CH2 Wu_T, Primo, OpenPFGW, CHG CH3 Water, Broadhurst, Primo, OpenPFGW, CHG CH4 Irvine, Water, Broadhurst, Primo, OpenPFGW, CHG CH6 Steward, Primo, OpenPFGW, CHG CH7 Broadhurst, OpenPFGW, CHG CH8 Batalov, Ksieve, TOPS, LLR, OpenPFGW, CHG D Dubner, Cruncher DK Keller, Dubner, Cruncher DS Smith_Darren, Proth.exe FE1 Morain, FastECPP FE8 Oakes, Morain, Water, Broadhurst, FastECPP FE9 Morain, Water, Broadhurst, FastECPP g0 Gallot, Proth.exe g1 Caldwell, Proth.exe G1 Armengaud, GIMPS, Prime95 G2 Spence, GIMPS, Prime95 G3 Clarkson, Kurowski, GIMPS, Prime95 G4 Hajratwala, Kurowski, GIMPS, Prime95 G5 Cameron, Kurowski, GIMPS, Prime95 G6 Shafer, GIMPS, Prime95 G7 Findley_J, GIMPS, Prime95 G8 Nowak, GIMPS, Prime95 G9 Boone, Cooper, GIMPS, Prime95 G10 Smith_E, GIMPS, Prime95 G11 Elvenich, GIMPS, Prime95 G12 Strindmo, GIMPS, Prime95 G13 Cooper, GIMPS, Prime95 G14 Cooper, GIMPS, Prime95 G15 Pace, GIMPS, Prime95 G16 Laroche, GIMPS, Prime95 g23 Ballinger, Proth.exe g25 OHare, Proth.exe g55 Toplic, Proth.exe g124 Crickman, Proth.exe g157 Loeh, Proth.exe g196 Odermatt, Proth.exe g236 Heuer, GFN17Sieve, GFNSearch, Proth.exe g245 Cosgrave, NewPGen, PRP, Proth.exe g259 Papp, Proth.exe g260 AYENI, Proth.exe g267 Grobstich, NewPGen, PRP, Proth.exe g277 Eaton, NewPGen, PRP, Proth.exe g279 Cooper, NewPGen, PRP, Proth.exe g294 Underbakke, TwinGen, PRP, Proth.exe g300 Zilmer, Proth.exe g308 Angel, GFN17Sieve, GFNSearch, Proth.exe g337 Hsieh, NewPGen, PRP, Proth.exe g403 Yoshimura, ProthSieve, PrimeSierpinski, LLR, Proth.exe g407 HermleGC, MultiSieve, PRP, Proth.exe g411 Brittenham, NewPGen, PRP, Proth.exe g413 Scott, AthGFNSieve, Proth.exe g414 Gilvey, Srsieve, PrimeGrid, PrimeSierpinski, LLR, Proth.exe g418 Taura, NewPGen, PRP, Proth.exe g424 Broadhurst, NewPGen, OpenPFGW, Proth.exe g427 Batalov, Srsieve, LLR, Proth.exe g429 Underbakke, GenefX64, AthGFNSieve, PrimeGrid, Proth.exe gm Morii, Proth.exe K Keller L51 Hedges, NewPGen, PRP, LLR L53 Zaveri, ProthSieve, RieselSieve, PRP, LLR L95 Urushi, LLR L99 Underbakke, TwinGen, LLR L100 Minovic, TwinGen, LLR L109 Nair, NewPGen, LLR L124 Rodenkirch, MultiSieve, LLR L129 Snyder, LLR L137 Jaworski, Rieselprime, LLR L153 Eckhard, LLR L158 Underwood, NewPGen, 321search, LLR L160 Wong, ProthSieve, RieselSieve, LLR L162 Banka, NewPGen, 12121search, LLR L165 Keiser, NewPGen, OpenPFGW, LLR L167 Curtis, NewPGen, Rieselprime, LLR L172 Smith, ProthSieve, RieselSieve, LLR L175 Duggan, ProthSieve, RieselSieve, LLR L177 Kwok, Rieselprime, LLR L179 White, ProthSieve, RieselSieve, LLR L181 Siegert, LLR L185 Hassler, NewPGen, LLR L191 Banka, NewPGen, LLR L192 Jaworski, LLR L193 Rosink, ProthSieve, RieselSieve, LLR L197 DaltonJ, ProthSieve, RieselSieve, LLR L201 Siemelink, LLR L202 Vautier, McKibbon, Gribenko, NewPGen, PrimeGrid, TPS, LLR L251 Burt, NewPGen, Rieselprime, LLR L256 Underwood, Srsieve, NewPGen, 321search, LLR L259 Schwieger, NewPGen, PrimeGrid, TPS, LLR L260 Soule, Srsieve, Rieselprime, LLR L268 Metcalfe, Srsieve, Rieselprime, LLR L282 Curtis, Srsieve, Rieselprime, LLR L321 Broadhurst, NewPGen, OpenPFGW, LLR L381 Mate, Siemelink, Rodenkirch, MultiSieve, LLR L384 Pinho, Srsieve, Rieselprime, LLR L426 Jaworski, Srsieve, Rieselprime, LLR L436 Andersen2, Gcwsieve, MultiSieve, PrimeGrid, LLR L446 Saridis, NewPGen, Proth.exe, LLR L447 Kohlman, Gcwsieve, MultiSieve, PrimeGrid, LLR L466 Zhou, NewPGen, LLR L503 Benson, Srsieve, LLR L521 Thompson1, Gcwsieve, MultiSieve, PrimeGrid, LLR L527 Tornberg, TwinGen, LLR L541 Barnes, Srsieve, CRUS, LLR L545 AndersonM, NewPGen, Rieselprime, LLR L587 Dettweiler, Srsieve, CRUS, LLR L591 Penne, Srsieve, CRUS, LLR L606 Bennett, Srsieve, NewPGen, PrimeGrid, 321search, LLR L613 Keogh, Srsieve, ProthSieve, RieselSieve, LLR L622 Cardall, Srsieve, ProthSieve, RieselSieve, LLR L656 Yama, Srsieve, PrimeGrid, LLR L668 Ueda, Srsieve, PrimeGrid, LLR L669 Harvey, Srsieve, PrimeGrid, LLR L671 Wong, Srsieve, PrimeGrid, LLR L689 Brown1, Srsieve, PrimeGrid, LLR L690 Cholt, Srsieve, PrimeGrid, LLR L732 Embling, Srsieve, PrimeGrid, LLR L753 Wolfram, Srsieve, PrimeGrid, LLR L760 Riesen, Srsieve, Rieselprime, LLR L764 Ewing, Srsieve, PrimeGrid, LLR L780 Brady, Srsieve, PrimeGrid, LLR L801 Gesker, Gcwsieve, MultiSieve, PrimeGrid, LLR L895 Dinkel, Srsieve, LLR L917 Bergman1, Gcwsieve, MultiSieve, PrimeGrid, LLR L923 Kaiser1, Klahn, NewPGen, PrimeGrid, TPS, SunGard, LLR L927 Brown1, TwinGen, PrimeGrid, LLR L983 Wu_T, LLR L1016 Hartel, Srsieve, PrimeGrid, LLR L1056 Schwieger, Srsieve, PrimeGrid, LLR L1125 Laluk, PSieve, Srsieve, PrimeGrid, LLR L1129 Slomma, PSieve, Srsieve, PrimeGrid, LLR L1130 Adolfsson, PSieve, Srsieve, PrimeGrid, LLR L1134 Ogawa, Srsieve, NewPGen, LLR L1139 Harvey1, PSieve, Srsieve, PrimeGrid, LLR L1158 Vogel, PSieve, Srsieve, PrimeGrid, LLR L1199 DeRidder, PSieve, Srsieve, PrimeGrid, LLR L1201 Carpenter1, PSieve, Srsieve, PrimeGrid, LLR L1203 Mauno, PSieve, Srsieve, PrimeGrid, LLR L1204 Brown1, PSieve, Srsieve, PrimeGrid, LLR L1209 Wong, PSieve, Srsieve, PrimeGrid, LLR L1218 Winslow, PSieve, Srsieve, PrimeGrid, LLR L1223 Courty, PSieve, Srsieve, PrimeGrid, LLR L1224 Domanov1, PSieve, Srsieve, PrimeGrid, LLR L1230 Yooil1, PSieve, Srsieve, PrimeGrid, LLR L1300 Yama, PSieve, Srsieve, PrimeGrid, LLR L1301 Sorbera, Srsieve, CRUS, LLR L1349 Wallace, Srsieve, NewPGen, PrimeGrid, LLR L1353 Mumper, Srsieve, PrimeGrid, LLR L1355 Beck, PSieve, Srsieve, PrimeGrid, LLR L1356 Gockel, PSieve, Srsieve, PrimeGrid, LLR L1360 Tatterson, PSieve, Srsieve, PrimeGrid, LLR L1387 Anonymous, PSieve, Srsieve, PrimeGrid, LLR L1403 Andrews1, PSieve, Srsieve, PrimeGrid, LLR L1412 Jones_M, PSieve, Srsieve, PrimeGrid, LLR L1413 Morton, PSieve, Srsieve, PrimeGrid, LLR L1422 Steichen, PSieve, Srsieve, PrimeGrid, LLR L1444 Davies, PSieve, Srsieve, PrimeGrid, LLR L1446 Harvey, PSieve, Srsieve, PrimeGrid, LLR L1448 Hron, PSieve, Srsieve, PrimeGrid, LLR L1455 Heikkila, PSieve, Srsieve, PrimeGrid, LLR L1456 Webster, PSieve, Srsieve, PrimeGrid, LLR L1460 Salah, Srsieve, PrimeGrid, PrimeSierpinski, LLR L1471 Gunn, Srsieve, CRUS, LLR L1474 Brown6, PSieve, Srsieve, PrimeGrid, LLR L1480 Goudie, PSieve, Srsieve, PrimeGrid, LLR L1492 Eiterig, PSieve, Srsieve, PrimeGrid, LLR L1502 Champ, PSieve, Srsieve, PrimeGrid, LLR L1576 Craig, PSieve, Srsieve, PrimeGrid, LLR L1595 Cilliers, PSieve, Srsieve, PrimeGrid, LLR L1675 Schwieger, PSieve, Srsieve, PrimeGrid, LLR L1728 Gasewicz, PSieve, Srsieve, PrimeGrid, LLR L1741 Granowski, PSieve, Srsieve, PrimeGrid, LLR L1745 Cholt, PSieve, Srsieve, PrimeGrid, LLR L1751 Eckhard, Srsieve, PrimeGrid, LLR L1780 Ming, PSieve, Srsieve, PrimeGrid, LLR L1792 Tang, PSieve, Srsieve, PrimeGrid, LLR L1803 Puppi, PSieve, Srsieve, PrimeGrid, LLR L1808 Reynolds1, PSieve, Srsieve, PrimeGrid, LLR L1817 Barnes, PSieve, Srsieve, NPLB, LLR L1823 Larsson, PSieve, Srsieve, PrimeGrid, LLR L1828 Benson, PSieve, Srsieve, Rieselprime, LLR L1847 Liu1, PSieve, Srsieve, PrimeGrid, LLR L1862 Curtis, PSieve, Srsieve, Rieselprime, LLR L1863 Wozny, PSieve, Srsieve, Rieselprime, LLR L1884 Jaworski, PSieve, Srsieve, Rieselprime, LLR L1885 Ostaszewski, PSieve, Srsieve, PrimeGrid, LLR L1921 Winslow, TwinGen, PrimeGrid, LLR L1935 Channing, PSieve, Srsieve, PrimeGrid, LLR L1949 Pritchard, Srsieve, PrimeGrid, RieselSieve, LLR L1959 Metcalfe, PSieve, Srsieve, Rieselprime, LLR L1979 Tibbott, PSieve, Srsieve, PrimeGrid, LLR L1990 Makowski, PSieve, Srsieve, PrimeGrid, LLR L2006 Rix, PSieve, Srsieve, PrimeGrid, LLR L2012 Pedersen_K, Srsieve, CRUS, OpenPFGW, LLR L2017 Hubbard, PSieve, Srsieve, NPLB, LLR L2030 Tonner, PSieve, Srsieve, PrimeGrid, LLR L2035 Greer, TwinGen, PrimeGrid, LLR L2046 Melvold, Srsieve, PrimeGrid, LLR L2051 Reich, PSieve, Srsieve, PrimeGrid, LLR L2054 Kaiser1, Srsieve, CRUS, LLR L2055 Soule, PSieve, Srsieve, Rieselprime, LLR L2074 Minovic, PSieve, Srsieve, Rieselprime, LLR L2085 Dodson1, PSieve, Srsieve, PrimeGrid, LLR L2100 Christensen, PSieve, Srsieve, PrimeGrid, LLR L2103 Schmidt1, PSieve, Srsieve, PrimeGrid, LLR L2117 Karlsteen, PSieve, Srsieve, PrimeGrid, LLR L2121 VanRangelrooij, PSieve, Srsieve, PrimeGrid, LLR L2122 Megele, PSieve, Srsieve, PrimeGrid, LLR L2125 Greer, PSieve, Srsieve, PrimeGrid, LLR L2126 Senftleben, PSieve, Srsieve, PrimeGrid, LLR L2137 Hayashi1, PSieve, Srsieve, PrimeGrid, LLR L2158 Krauss, PSieve, Srsieve, PrimeGrid, LLR L2163 VanRooijen1, PSieve, Srsieve, PrimeGrid, LLR L2233 Herder, Srsieve, PrimeGrid, LLR L2235 Mullage, PSieve, Srsieve, NPLB, LLR L2269 Schori, Srsieve, PrimeGrid, LLR L2321 Medcalf, PSieve, Srsieve, PrimeGrid, LLR L2322 Szafranski, PSieve, Srsieve, PrimeGrid, LLR L2327 Oh, PSieve, Srsieve, PrimeGrid, LLR L2337 Schmalen, PSieve, Srsieve, PrimeGrid, LLR L2338 Burt, PSieve, Srsieve, Rieselprime, LLR L2371 Luszczek, Srsieve, PrimeGrid, LLR L2373 Tarasov1, Srsieve, PrimeGrid, LLR L2408 Reinman, Srsieve, PrimeGrid, LLR L2413 Blyth, PSieve, Srsieve, PrimeGrid, LLR L2425 DallOsto, LLR L2429 Bliedung, TwinGen, PrimeGrid, LLR L2432 Sutton1, PSieve, Srsieve, Rieselprime, LLR L2444 Batalov, PSieve, Srsieve, Rieselprime, LLR L2484 Ritschel, PSieve, Srsieve, Rieselprime, LLR L2487 Liao, PSieve, Srsieve, PrimeGrid, LLR L2503 Zhan1, PSieve, Srsieve, PrimeGrid, LLR L2507 Geis, PSieve, Srsieve, PrimeGrid, LLR L2511 Johnson6, TwinGen, PrimeGrid, LLR L2517 McPherson, PSieve, Srsieve, PrimeGrid, LLR L2518 Karevik, PSieve, Srsieve, PrimeGrid, LLR L2519 Schmidt2, PSieve, Srsieve, NPLB, LLR L2520 Mamanakis, PSieve, Srsieve, PrimeGrid, LLR L2526 Martinik, PSieve, Srsieve, PrimeGrid, LLR L2545 Nose, PSieve, Srsieve, PrimeGrid, LLR L2549 McKay, PSieve, Srsieve, PrimeGrid, LLR L2552 Foulher, PSieve, Srsieve, PrimeGrid, LLR L2561 Vinklat, PSieve, Srsieve, PrimeGrid, LLR L2562 Jones3, PSieve, Srsieve, PrimeGrid, LLR L2583 Nakamura, PSieve, Srsieve, PrimeGrid, LLR L2594 Sheridan, PSieve, Srsieve, PrimeGrid, LLR L2602 Mueller4, PSieve, Srsieve, PrimeGrid, LLR L2606 Slakans, PSieve, Srsieve, PrimeGrid, LLR L2626 DeKlerk, PSieve, Srsieve, PrimeGrid, LLR L2627 Graham2, PSieve, Srsieve, PrimeGrid, LLR L2659 Reber, PSieve, Srsieve, PrimeGrid, LLR L2664 Koluvere, PSieve, Srsieve, PrimeGrid, LLR L2675 Ling, PSieve, Srsieve, PrimeGrid, LLR L2691 Pettersen, PSieve, Srsieve, PrimeGrid, LLR L2707 Out, PSieve, Srsieve, PrimeGrid, LLR L2714 Piotrowski, PSieve, Srsieve, PrimeGrid, LLR L2715 Donovan, PSieve, Srsieve, PrimeGrid, LLR L2719 Yost, PSieve, Srsieve, PrimeGrid, LLR L2742 Fluttert, PSieve, Srsieve, PrimeGrid, LLR L2777 Ritschel, Gcwsieve, TOPS, LLR L2785 Meili, PSieve, Srsieve, PrimeGrid, LLR L2803 Barbyshev, PSieve, Srsieve, PrimeGrid, LLR L2805 Barr, PSieve, Srsieve, PrimeGrid, LLR L2823 Loureiro, PSieve, Srsieve, PrimeGrid, LLR L2826 Jeudy, PSieve, Srsieve, PrimeGrid, LLR L2840 Santana, PSieve, Srsieve, PrimeGrid, LLR L2841 Minovic, Gcwsieve, MultiSieve, TOPS, LLR L2842 English1, PSieve, Srsieve, PrimeGrid, LLR L2859 Keenan, PSieve, Srsieve, PrimeGrid, LLR L2873 Jurach, PSieve, Srsieve, PrimeGrid, LLR L2891 Lacroix, PSieve, Srsieve, PrimeGrid, LLR L2959 Derrera, PSieve, Srsieve, PrimeGrid, LLR L2967 Ryjkov, PSieve, Srsieve, PrimeGrid, LLR L2973 Kurtovic, Srsieve, PrimeGrid, LLR L2975 Loureiro, GeneferCUDA, AthGFNSieve, PrimeGrid, LLR L2981 Yoshigoe, PSieve, Srsieve, PrimeGrid, LLR L2992 Boehm, PSieve, Srsieve, PrimeGrid, LLR L2997 Williams2, PSieve, Srsieve, PrimeGrid, LLR L3023 Winslow, PSieve, Srsieve, PrimeGrid, 12121search, LLR L3029 Walsh, PSieve, Srsieve, PrimeGrid, LLR L3033 Snow, PSieve, Srsieve, PrimeGrid, 12121search, LLR L3034 Wakolbinger, PSieve, Srsieve, PrimeGrid, LLR L3035 Scalise, PSieve, Srsieve, PrimeGrid, LLR L3037 Noltensmeier, PSieve, Srsieve, PrimeGrid, LLR L3049 Tardy, PSieve, Srsieve, PrimeGrid, LLR L3054 Winslow, Srsieve, PrimeGrid, LLR L3101 Reichard, PSieve, Srsieve, PrimeGrid, LLR L3105 Eldredge, PSieve, Srsieve, PrimeGrid, LLR L3118 Yama, GeneferCUDA, AthGFNSieve, PrimeGrid, LLR L3121 Kwok, NewPGen, TPS, LLR L3125 Rizman, PSieve, Srsieve, PrimeGrid, LLR L3141 Kus, PSieve, Srsieve, PrimeGrid, LLR L3154 Hentrich, PSieve, Srsieve, PrimeGrid, LLR L3168 Schwegler, PSieve, Srsieve, PrimeGrid, LLR L3171 Bergelt, PSieve, Srsieve, PrimeGrid, LLR L3173 Zhou2, PSieve, Srsieve, PrimeGrid, LLR L3174 Boniecki, PSieve, Srsieve, PrimeGrid, LLR L3179 Hamada, PSieve, Srsieve, PrimeGrid, LLR L3183 Haller, Srsieve, PrimeGrid, LLR L3184 Hayslette, GeneferCUDA, AthGFNSieve, PrimeGrid, LLR L3200 Athanas, PSieve, Srsieve, PrimeGrid, LLR L3203 Scalise, TwinGen, PrimeGrid, LLR L3209 McArdle, GenefX64, AthGFNSieve, PrimeGrid, LLR L3222 Yamamoto, PSieve, Srsieve, PrimeGrid, LLR L3223 Yurgandzhiev, PSieve, Srsieve, PrimeGrid, LLR L3230 Kumagai, GeneferCUDA, AthGFNSieve, PrimeGrid, LLR L3234 Parangalan, PSieve, Srsieve, PrimeGrid, LLR L3249 Lind, PSieve, Srsieve, PrimeGrid, LLR L3260 Stanko, PSieve, Srsieve, PrimeGrid, LLR L3262 Molder, PSieve, Srsieve, PrimeGrid, LLR L3267 Cain, PSieve, Srsieve, PrimeGrid, LLR L3276 Jeka, PSieve, Srsieve, PrimeGrid, LLR L3278 Fischer1, PSieve, Srsieve, PrimeGrid, LLR L3290 Bednar1, PSieve, Srsieve, PrimeGrid, LLR L3294 Bartlett, PSieve, Srsieve, PrimeGrid, LLR L3313 Yost, Srsieve, PrimeGrid, SierpinskiRiesel, LLR L3323 Ritschel, NewPGen, TOPS, LLR L3325 Elvy, PSieve, Srsieve, PrimeGrid, LLR L3345 Domanov1, PSieve, Rieselprime, LLR L3354 Willig, Srsieve, PrimeGrid, SierpinskiRiesel, LLR L3372 Ryan, PSieve, Srsieve, PrimeGrid, LLR L3377 Ollivier, PSieve, Srsieve, PrimeGrid, LLR L3378 Glasgow, PSieve, Srsieve, PrimeGrid, LLR L3415 Johnston1, PSieve, Srsieve, PrimeGrid, LLR L3422 Micom, PSieve, Srsieve, PrimeGrid, LLR L3430 Durstewitz, PSieve, Srsieve, PrimeGrid, LLR L3431 Gahan, PSieve, Srsieve, PrimeGrid, LLR L3432 Batalov, Srsieve, LLR L3440 Pelikan, PSieve, Srsieve, PrimeGrid, LLR L3446 Marshall3, PSieve, Srsieve, PrimeGrid, LLR L3453 Benes, PSieve, Srsieve, PrimeGrid, LLR L3458 Jia, PSieve, Srsieve, PrimeGrid, LLR L3459 Boruvka, PSieve, Srsieve, PrimeGrid, LLR L3460 Ottusch, PSieve, Srsieve, PrimeGrid, LLR L3464 Ferrell, PSieve, Srsieve, PrimeGrid, LLR L3483 Farrow, PSieve, Srsieve, PrimeGrid, LLR L3487 Ziemann, PSieve, Srsieve, PrimeGrid, LLR L3494 Batalov, NewPGen, LLR L3502 Ristic, PSieve, Srsieve, PrimeGrid, LLR L3512 Tsuji, PSieve, Srsieve, PrimeGrid, LLR L3514 Bishop1, PSieve, Srsieve, PrimeGrid, OpenPFGW, LLR L3518 Papendick, PSieve, Srsieve, PrimeGrid, LLR L3519 Kurtovic, PSieve, Srsieve, Rieselprime, LLR L3523 Brown1, Srsieve, PrimeGrid, SierpinskiRiesel, LLR L3528 Batalov, Srsieve, PrimeGrid, SierpinskiRiesel, LLR L3532 Batalov, Gcwsieve, LLR L3538 Beard1, PSieve, Srsieve, PrimeGrid, LLR L3539 Jacobs, PSieve, Srsieve, PrimeGrid, LLR L3543 Yama, PrimeGrid, LLR L3544 Minovic, Gcwsieve, GenWoodall, LLR L3545 Eskam1, PSieve, Srsieve, PrimeGrid, LLR L3547 Ready, Srsieve, PrimeGrid, LLR L3548 Ready, PSieve, Srsieve, PrimeGrid, LLR L3549 Hirai, Srsieve, PrimeGrid, LLR L3552 Benson2, Srsieve, PrimeGrid, LLR L3553 Cilliers, Srsieve, PrimeGrid, LLR L3555 Cervelle, PSieve, Srsieve, PrimeGrid, LLR L3562 Schouten, Srsieve, PrimeGrid, LLR L3564 Jaworski, Srsieve, CRUS, LLR L3566 Slakans, Srsieve, PrimeGrid, LLR L3567 Meili, Srsieve, PrimeGrid, LLR L3580 Nelson1, PSieve, Srsieve, PrimeGrid, LLR L3588 Matousek, PSieve, Srsieve, PrimeGrid, LLR L3593 Veit, PSieve, Srsieve, PrimeGrid, LLR L3601 Jablonski1, PSieve, Srsieve, PrimeGrid, LLR L3606 Sander, TwinGen, PrimeGrid, LLR L3610 Batalov, Srsieve, CRUS, LLR L3625 Haymoz, PSieve, Srsieve, PrimeGrid, LLR L3659 Volynsky, Srsieve, PrimeGrid, LLR L3662 Schawe, PSieve, Srsieve, PrimeGrid, LLR L3665 Kelava1, PSieve, Srsieve, Rieselprime, LLR L3668 Prokopchuk, PSieve, Srsieve, PrimeGrid, LLR L3686 Yost, Srsieve, PrimeGrid, LLR L3696 Linderson, PSieve, Srsieve, PrimeGrid, LLR L3700 Kim4, PSieve, Srsieve, PrimeGrid, LLR L3719 Skinner, PSieve, Srsieve, PrimeGrid, LLR L3720 Ohno, Srsieve, PrimeGrid, LLR L3728 Rietveld, PSieve, Srsieve, PrimeGrid, LLR L3735 Kurtovic, Srsieve, LLR L3743 Parker1, PSieve, Srsieve, PrimeGrid, LLR L3744 Green1, PSieve, Srsieve, PrimeGrid, LLR L3749 Meador, Srsieve, PrimeGrid, LLR L3760 Okazaki, PSieve, Srsieve, PrimeGrid, LLR L3763 Martin4, PSieve, Srsieve, PrimeGrid, LLR L3764 Diepeveen, PSieve, Srsieve, Rieselprime, LLR L3765 Ruch, TwinGen, PrimeGrid, LLR L3767 Huang1, PSieve, Srsieve, PrimeGrid, LLR L3770 Tang, Srsieve, PrimeGrid, LLR L3772 Ottusch, Srsieve, PrimeGrid, LLR L3784 Cavnaugh, PSieve, Srsieve, PrimeGrid, LLR L3785 Reichel, PSieve, Srsieve, PrimeGrid, LLR L3787 Palumbo, PSieve, Srsieve, PrimeGrid, LLR L3789 Toda, Srsieve, PrimeGrid, LLR L3790 Tamagawa, PSieve, Srsieve, PrimeGrid, LLR L3797 Schmidt3, PSieve, Srsieve, PrimeGrid, LLR L3800 Amschl, PSieve, Srsieve, PrimeGrid, LLR L3802 Aggarwal, Srsieve, LLR L3803 Bredl, PSieve, Srsieve, PrimeGrid, LLR L3810 Radle, PSieve, Srsieve, PrimeGrid, LLR L3813 Chambers2, PSieve, Srsieve, PrimeGrid, LLR L3824 Mazzucato, PSieve, Srsieve, PrimeGrid, LLR L3829 Abrahmi, TwinGen, PrimeGrid, LLR L3838 Boyden, PSieve, Srsieve, PrimeGrid, LLR L3839 Batalov, EMsieve, LLR L3843 Whiteley, PSieve, Srsieve, PrimeGrid, LLR L3849 Smith10, Srsieve, PrimeGrid, SierpinskiRiesel, LLR L3855 Lunner, PSieve, Srsieve, PrimeGrid, LLR L3857 Hudec, PSieve, Srsieve, PrimeGrid, LLR L3859 Clifton, PSieve, Srsieve, PrimeGrid, LLR L3860 Cimrman, PSieve, Srsieve, PrimeGrid, LLR L3861 Roemer, PSieve, Srsieve, PrimeGrid, LLR L3862 Gudenschwager, PSieve, Srsieve, PrimeGrid, LLR L3863 WaldenForrest, PSieve, Srsieve, PrimeGrid, LLR L3864 Piantoni, PSieve, Srsieve, PrimeGrid, LLR L3865 Silva, PSieve, Srsieve, PrimeGrid, LLR L3867 Traebert, PSieve, Srsieve, PrimeGrid, LLR L3868 Miller3, PSieve, Srsieve, PrimeGrid, LLR L3869 Cholt, Srsieve, PrimeGrid, SierpinskiRiesel, LLR L3873 Sala, PSieve, Srsieve, PrimeGrid, LLR L3876 Apreutesei, PSieve, Srsieve, PrimeGrid, LLR L3877 Jarne, PSieve, Srsieve, PrimeGrid, LLR L3887 Byerly, PSieve, Rieselprime, LLR L3890 Beeson, PSieve, Srsieve, PrimeGrid, LLR L3895 Englehard, PSieve, Srsieve, PrimeGrid, LLR L3898 Christy, PSieve, Srsieve, PrimeGrid, LLR L3903 Miao, Srsieve, PrimeGrid, SierpinskiRiesel, LLR L3904 Darimont, Srsieve, PrimeGrid, SierpinskiRiesel, LLR L3909 Taylor2, PSieve, Srsieve, PrimeGrid, LLR L3910 Bischof, PSieve, Srsieve, PrimeGrid, LLR L3913 Kadohara, PSieve, Srsieve, PrimeGrid, LLR L3914 Matsuda, PSieve, Srsieve, PrimeGrid, LLR L3917 Rodenkirch, PSieve, Srsieve, LLR L3924 Kim5, PSieve, Srsieve, PrimeGrid, LLR L3925 Okazaki, Srsieve, PrimeGrid, LLR L3933 Batalov, PSieve, Srsieve, CRUS, Rieselprime, LLR L3941 Lee8, PSieve, Srsieve, PrimeGrid, LLR L3961 Darimont, Srsieve, PrimeGrid, LLR L3964 Iakovlev, Srsieve, PrimeGrid, LLR L3975 Hou, PSieve, Srsieve, PrimeGrid, LLR L3993 Gushchak, Srsieve, PrimeGrid, LLR L3995 Unbekannt, PSieve, Srsieve, PrimeGrid, LLR L3998 Rossman, PSieve, Srsieve, PrimeGrid, LLR L4001 Willig, Srsieve, CRUS, LLR L4016 Bedenbaugh, PSieve, Srsieve, PrimeGrid, LLR L4021 Busse, PSieve, Srsieve, PrimeGrid, LLR L4026 Batalov, Cyclo, EMsieve, PIES, LLR L4031 Darney, PSieve, Srsieve, PrimeGrid, LLR L4034 Vanc, Srsieve, PrimeGrid, LLR L4036 Domanov1, PSieve, Srsieve, CRUS, LLR L4040 Oddone, PSieve, Srsieve, PrimeGrid, LLR L4043 Niedbala, PSieve, Srsieve, PrimeGrid, LLR L4045 Chew, PSieve, Srsieve, PrimeGrid, LLR L4061 Lee, PSieve, Srsieve, PrimeGrid, LLR L4064 Davies, Srsieve, CRUS, LLR L4076 Lacroix, PSieve, Srsieve, NPLB, LLR L4082 Zimmerman, PSieve, Srsieve, PrimeGrid, LLR L4083 Charrondiere, PSieve, Srsieve, PrimeGrid, LLR L4088 Graeber, PSieve, Srsieve, PrimeGrid, LLR L4103 Klopffleisch, Srsieve, PrimeGrid, LLR L4106 Ga, PSieve, Srsieve, PrimeGrid, LLR L4108 Yoshioka, PSieve, Srsieve, PrimeGrid, LLR L4109 Palmer1, PSieve, Srsieve, PrimeGrid, LLR L4111 Leps1, PSieve, Srsieve, PrimeGrid, LLR L4113 Batalov, PSieve, Srsieve, LLR L4114 Bubloski, PSieve, Srsieve, PrimeGrid, LLR L4118 Slegel, PSieve, Srsieve, PrimeGrid, LLR L4119 Nelson3, PSieve, Srsieve, PrimeGrid, LLR L4122 Sasaki1, PSieve, Srsieve, PrimeGrid, LLR L4123 Bush, PSieve, Srsieve, PrimeGrid, LLR L4132 T�pert, TwinGen, PrimeGrid, LLR L4133 Ito, PSieve, Srsieve, PrimeGrid, LLR L4139 Hawker, Srsieve, CRUS, LLR L4142 Batalov, CycloSv, EMsieve, PIES, LLR L4146 Schmidt1, Srsieve, PrimeGrid, LLR L4148 Glatte, PSieve, Srsieve, PrimeGrid, LLR L4155 Jones4, PSieve, Srsieve, PrimeGrid, LLR L4159 Schulz5, Srsieve, PrimeGrid, LLR L4166 Kwok, PSieve, LLR L4185 Hoefliger, PSieve, Srsieve, PrimeGrid, LLR L4187 Schmidt2, Srsieve, CRUS, LLR L4190 Fnasek, PSieve, Srsieve, PrimeGrid, LLR L4191 Mahan, PSieve, Srsieve, PrimeGrid, LLR L4197 Kumagai1, Srsieve, PrimeGrid, LLR L4198 Rawles, PSieve, Srsieve, PrimeGrid, LLR L4200 Harste, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4201 Brown1, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4203 Azarenko, PSieve, Srsieve, PrimeGrid, LLR L4205 Bischof, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4207 Jaamann, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4208 Farrow, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4210 Cholt, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4226 Heath, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4231 Schneider1, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4245 Greer, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4249 Larsson, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4250 Vogt, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4256 Gniesmer, PSieve, Srsieve, PrimeGrid, LLR L4262 Hutchins, PSieve, Srsieve, PrimeGrid, LLR L4269 Romanov, PSieve, Srsieve, PrimeGrid, LLR L4273 Rangelrooij, Srsieve, CRUS, LLR L4274 AhlforsDahl, Srsieve, PrimeGrid, LLR L4276 Borbely, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4283 Crawford1, PSieve, Srsieve, PrimeGrid, LLR L4286 Zimmerman, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4287 Suzuki1, PSieve, Srsieve, PrimeGrid, LLR L4289 Ito2, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4293 Trunov, PSieve, Srsieve, PrimeGrid, LLR L4294 Kurtovic, Srsieve, CRUS, Prime95, LLR L4295 Splain, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4303 Thorson, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4307 Keller1, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4308 Matillek, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4309 Kecic, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4314 DeThomas, PSieve, Srsieve, PrimeGrid, LLR L4316 Nilsson1, PSieve, Srsieve, PrimeGrid, LLR L4323 Seisums, PSieve, Srsieve, PrimeGrid, LLR L4326 Steel, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4329 Okon, Srsieve, LLR L4334 Miller5, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4340 Becker4, Srsieve, PrimeGrid, LLR L4342 Kaiser1, PolySieve, NewPGen, LLR L4343 Norton, PSieve, Srsieve, PrimeGrid, LLR L4347 Schaeffer, PSieve, Srsieve, PrimeGrid, LLR L4348 Burridge, Srsieve, PrimeGrid, LLR L4352 Fahlenkamp1, PSieve, Srsieve, PrimeGrid, LLR L4358 Tesarz, PSieve, Srsieve, PrimeGrid, LLR L4362 Mochizuki, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4364 Steinbach, PSieve, Srsieve, PrimeGrid, LLR L4380 Rix, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4387 Davies, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4388 Mena, PSieve, Srsieve, PrimeGrid, LLR L4393 Veit1, Srsieve, CRUS, LLR L4395 Nilsson1, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4398 Greer, Srsieve, PrimeGrid, LLR L4404 Stepnicka, PSieve, Srsieve, PrimeGrid, LLR L4405 Eckhard, Srsieve, LLR L4406 Mathers, PSieve, Srsieve, PrimeGrid, LLR L4408 Fricke, PSieve, Srsieve, PrimeGrid, LLR L4412 Simpson3, PSieve, Srsieve, PrimeGrid, LLR L4414 Falk, PSieve, Srsieve, PrimeGrid, LLR L4417 Rasp, PSieve, Srsieve, PrimeGrid, LLR L4425 Weber1, PSieve, Srsieve, PrimeGrid, LLR L4435 Larsson, Srsieve, PrimeGrid, LLR L4441 Miyauchi, PSieve, Srsieve, PrimeGrid, LLR L4444 Terber, Srsieve, CRUS, LLR L4445 Leudesdorff, PSieve, Srsieve, PrimeGrid, LLR L4454 Clark5, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4456 Chambers2, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4457 Geiger, PSieve, Srsieve, PrimeGrid, LLR L4459 Biscop, PSieve, Srsieve, PrimeGrid, LLR L4466 Falk, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4472 Harvanek, Gcwsieve, MultiSieve, PrimeGrid, LLR L4477 Tennant, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4482 Mena, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4489 Szreter, PSieve, Srsieve, PrimeGrid, LLR L4490 Mazumdar, PSieve, Srsieve, PrimeGrid, LLR L4499 Ohsugi, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4501 Eskam1, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4504 Sesok, NewPGen, LLR L4505 Lind, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4506 Propper, Batalov, CycloSv, EMsieve, PIES, Prime95, LLR L4510 Ming, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4511 Donovan1, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4518 Primecrunch.com, Hedges, Srsieve, LLR L4522 Lorsung, PSieve, Srsieve, PrimeGrid, LLR L4523 Mull, PSieve, Srsieve, PrimeGrid, LLR L4525 Kong1, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4527 Fruzynski, PSieve, Srsieve, PrimeGrid, LLR L4531 Butez, PSieve, Srsieve, PrimeGrid, LLR L4547 Nair, TwinGen, NewPGen, LLR L4548 Sydekum, Srsieve, CRUS, Prime95, LLR L4552 Koski, PSieve, Srsieve, PrimeGrid, LLR L4559 Okazaki, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4561 Propper, Batalov, CycloSv, Cyclo, EMsieve, PIES, LLR L4562 Donovan, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4564 DeThomas, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4568 Vrontakis, PSieve, Srsieve, PrimeGrid, LLR L4582 Kinney, PSieve, Srsieve, PrimeGrid, LLR L4583 Rohmann, PSieve, Srsieve, PrimeGrid, LLR L4591 Schwieger, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4593 Mangio, PSieve, Srsieve, PrimeGrid, LLR L4595 Mangio, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4598 Connaughty, PSieve, Srsieve, PrimeGrid, LLR L4600 Simbarsky, PSieve, Srsieve, PrimeGrid, LLR L4609 Elgetz, PSieve, Srsieve, PrimeGrid, LLR L4620 Kinney, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4622 Jurach, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4626 Iltus, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4649 Humphries, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4654 Voskoboynikov, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4656 Beck, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4659 AverayJones, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4660 Snow, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4664 Toledo, PSieve, Srsieve, PrimeGrid, LLR L4665 Szeluga, Kupidura, Banka, LLR L4667 Morelli, LLR L4668 Okazaki, Gcwsieve, MultiSieve, PrimeGrid, LLR L4669 Schwegler, Srsieve, PrimeGrid, LLR L4670 Drumm, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4672 Slade, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4673 Okhrimouk, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4675 Lind, Srsieve, PrimeGrid, LLR L4676 Maloney, Srsieve, PrimeGrid, PrimeSierpinski, LLR L4683 Bird2, Srsieve, CRUS, LLR L4687 Campbell1, PSieve, Srsieve, PrimeGrid, LLR L4689 Gordon2, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4690 Brandt, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4691 Fruzynski, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4692 Hajek, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4694 Schapendonk, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4695 Goudie, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4696 Plottel, PSieve, Srsieve, PrimeGrid, LLR L4700 Liu4, Srsieve, CRUS, LLR L4701 Kalus, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4702 Charette, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4703 Pacini, PSieve, Srsieve, PrimeGrid, LLR L4704 Kurtovic, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4706 Kraemer, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4710 Wiedemann, PSieve, Srsieve, PrimeGrid, LLR L4711 Closs, PSieve, Srsieve, PrimeGrid, LLR L4712 Gravemeyer, PSieve, Srsieve, PrimeGrid, LLR L4713 Post, PSieve, Srsieve, PrimeGrid, LLR L4715 Skinner1, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4717 Wypych, PSieve, Srsieve, PrimeGrid, LLR L4718 Brown1, Gcwsieve, MultiSieve, PrimeGrid, LLR L4720 Gahan, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4724 Thonon, PSieve, Srsieve, PrimeGrid, LLR L4726 Miller7, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4729 Wimmer1, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4737 Reinhardt, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4741 Wong, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4743 Plsak, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4745 Cavnaugh, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4746 Brech, PSieve, Srsieve, PrimeGrid, LLR L4747 Brech, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4752 Harvey2, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4754 Calvin, PSieve, Srsieve, PrimeGrid, LLR L4757 Johnson9, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4760 Sipes, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4763 Guilleminot, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4764 McLean2, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4765 Kumsta, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4779 Harvey, Gcwsieve, MultiSieve, LLR L4780 Harvey, Gcwsieve, MultiSieve, GenWoodall, LLR L4783 Marini, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4784 Bertolotti, Gcwsieve, MultiSieve, PrimeGrid, LLR L4789 Kurtovic, Srsieve, Prime95, LLR L4795 Lawson2, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4796 White2, PSieve, Srsieve, PrimeGrid, LLR L4800 Doenges, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4802 Jones5, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4806 Rajala, Srsieve, CRUS, LLR L4807 Tsuji, Srsieve, PrimeGrid, LLR L4808 Kaiser1, PolySieve, LLR L4809 Bocan, Srsieve, PrimeGrid, LLR L4810 Dhuyvetters, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4814 Telesz, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4815 Kozisek, PSieve, Srsieve, PrimeGrid, LLR L4816 Doenges, PSieve, Srsieve, PrimeGrid, LLR L4819 Inci, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4821 Svantner, PSieve, Srsieve, PrimeGrid, LLR L4822 Magklaras, PSieve, Srsieve, PrimeGrid, LLR L4823 Helm, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4824 Allivato, PSieve, Srsieve, PrimeGrid, LLR L4826 Soraku, PSieve, Srsieve, PrimeGrid, LLR L4830 Eisler1, PSieve, Srsieve, PrimeGrid, LLR L4832 Meekins, Srsieve, CRUS, LLR L4834 Helm, PSieve, Srsieve, PrimeGrid, LLR L4835 Katzur, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4837 Hines, Srsieve, CRUS, LLR L4843 Hutchins, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4844 Valentino, PSieve, Srsieve, PrimeGrid, LLR L4849 Burt, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4850 Jones5, PSieve, Srsieve, PrimeGrid, LLR L4851 Schioler, PSieve, Srsieve, PrimeGrid, LLR L4854 Gory, PSieve, Srsieve, PrimeGrid, LLR L4864 Freihube, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4868 Bergmann, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4869 Ogata, PSieve, Srsieve, PrimeGrid, LLR L4871 Gory, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4876 Tennant, Srsieve, CRUS, LLR L4877 Cherenkov, Srsieve, CRUS, LLR L4879 Propper, Batalov, Srsieve, LLR L4880 Goossens, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4881 Bonath, Srsieve, LLR L4889 Hundhausen, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4892 Hewitt1, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4907 Reinhardt, PSieve, Srsieve, PrimeGrid, LLR L4911 Calveley, Srsieve, CRUS, LLR L4923 Koriabine, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4926 Shenton, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4927 Smith12, Srsieve, CRUS, LLR L4929 Givoni, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR M Morain MM Morii O Oakes p3 Dohmen, OpenPFGW p8 Caldwell, OpenPFGW p12 Water, OpenPFGW p16 Heuer, OpenPFGW p21 Anderson, Robinson, OpenPFGW p35 Augustin, NewPGen, OpenPFGW p44 Broadhurst, OpenPFGW p54 Water, Broadhurst, OpenPFGW p58 Glover, Oakes, OpenPFGW p65 DavisK, Kuosa, OpenPFGW p77 Harvey, MultiSieve, GenWoodall, OpenPFGW p85 Marchal, Carmody, Kuosa, OpenPFGW p102 Underwood, Frind, OpenPFGW p115 DavisK, OpenPFGW p148 Yama, Noda, Nohara, NewPGen, MatGFN, PRP, OpenPFGW p151 Kubota, NewPGen, OpenPFGW p155 DavisK, NewPGen, OpenPFGW p166 Yamada, Noda, Nohara, NewPGen, MatGFN, PRP, OpenPFGW p168 Cami, OpenPFGW p169 Eaton, NewPGen, PRP, OpenPFGW p170 Wu_T, Primo, OpenPFGW p189 Bohanon, LLR, OpenPFGW p193 Irvine, Broadhurst, Primo, OpenPFGW p199 Broadhurst, NewPGen, OpenPFGW p227 Harvey, Srsieve, PRP, OpenPFGW p235 Bedwell, OpenPFGW p236 Cooper, NewPGen, PRP, OpenPFGW p252 Oakes, NewPGen, OpenPFGW p254 Vogel, Srsieve, CRUS, OpenPFGW p255 Siemelink, Srsieve, CRUS, OpenPFGW p257 Siemelink, Srsieve, OpenPFGW p258 Batalov, Srsieve, CRUS, OpenPFGW p259 Underbakke, GenefX64, AthGFNSieve, OpenPFGW p260 Harvey, Gcwsieve, MultiSieve, GenWoodall, OpenPFGW p262 Vogel, Gcwsieve, MultiSieve, PrimeGrid, OpenPFGW p271 Dettweiler, Srsieve, CRUS, OpenPFGW p279 Domanov1, Srsieve, Rieselprime, Prime95, OpenPFGW p282 Rajala, NewPGen, OpenPFGW p286 Batalov, Srsieve, OpenPFGW p290 Domanov1, Fpsieve, PrimeGrid, OpenPFGW p292 Dausch, Srsieve, SierpinskiRiesel, OpenPFGW p294 Batalov, EMsieve, PIES, LLR, OpenPFGW p295 Angel, NewPGen, OpenPFGW p296 Kaiser1, Srsieve, LLR, OpenPFGW p297 Broadhurst, Srsieve, NewPGen, LLR, OpenPFGW p300 Gramolin, NewPGen, OpenPFGW p301 Winskill1, Fpsieve, PrimeGrid, OpenPFGW p302 Gasewicz, Fpsieve, PrimeGrid, OpenPFGW p308 DavisK, Underwood, NewPGen, PrimeForm_egroup, OpenPFGW p309 Yama, GenefX64, AthGFNSieve, PrimeGrid, OpenPFGW p310 Hubbard, Gcwsieve, MultiSieve, PrimeGrid, OpenPFGW p312 Doggart, Fpsieve, PrimeGrid, OpenPFGW p314 Hubbard, GenefX64, AthGFNSieve, PrimeGrid, OpenPFGW p325 Broadhurst, Gcwsieve, MultiSieve, OpenPFGW p332 Johnson6, GeneferCUDA, AthGFNSieve, PrimeGrid, OpenPFGW p334 Goetz, GeneferCUDA, AthGFNSieve, PrimeGrid, OpenPFGW p338 Tomecko, GeneferCUDA, AthGFNSieve, PrimeGrid, OpenPFGW p342 Trice, OpenPFGW p346 Burt, Fpsieve, PrimeGrid, OpenPFGW p350 Koen, Gcwsieve, GenWoodall, OpenPFGW p354 Koen, Gcwsieve, OpenPFGW p355 Domanov1, Srsieve, CRUS, OpenPFGW p360 Kinne, Exoo, OpenPFGW p362 Snow, Fpsieve, PrimeGrid, OpenPFGW p363 Batalov, OpenPFGW p364 Batalov, NewPGen, OpenPFGW p366 Demeyer, Siemelink, Srsieve, CRUS, OpenPFGW p371 Keiser, OpenPFGW p373 Morelli, OpenPFGW p375 Gevay, Vatai, Farkas, Jarai, OpenPFGW p377 Batalov, Ksieve, TOPS, LLR, OpenPFGW p378 Batalov, Srsieve, CRUS, LLR, OpenPFGW p379 Batalov, CycloSv, Cyclo, EMsieve, PIES, OpenPFGW p382 Oestlin, NewPGen, OpenPFGW p384 Booker, OpenPFGW p385 Rajala, Srsieve, CRUS, OpenPFGW p387 Zimmerman, GeneFer, AthGFNSieve, PrimeGrid, OpenPFGW p390 Jaworski, Srsieve, Rieselprime, Prime95, OpenPFGW p391 Keiser, NewPGen, OpenPFGW p394 Fukui, MultiSieve, OpenPFGW p395 Angel, Augustin, NewPGen, OpenPFGW p396 Ikisugi, OpenPFGW p398 Stocker, OpenPFGW p403 Bonath, Cksieve, OpenPFGW PM Mihailescu SB10 Agafonov, SoBSieve, ProthSieve, Ksieve, PRP, Proth.exe, SB SB11 Sunde, SoBSieve, ProthSieve, Ksieve, PRP, Proth.exe, SB SB12 Szabolcs, Srsieve, SoBSieve, ProthSieve, Ksieve, PrimeGrid, LLR, SB SB6 Sundquist, SoBSieve, ProthSieve, Ksieve, PRP, Proth.exe, SB SB7 Team_Prime_Rib, SoBSieve, ProthSieve, Ksieve, PRP, SB SB8 Gordon, SoBSieve, ProthSieve, Ksieve, PRP, Proth.exe, SB SB9 Hassler, SoBSieve, ProthSieve, Ksieve, PRP, Proth.exe, SB SG Gage, Slowinski WD Dubner, Williams, Cruncher WM Williams, Morain x13 Renze x14 Steward, Primo, OpenPFGW x16 Doumen, Beelen, Unknown x20 Irvine, Water, Broadhurst x23 Renze, Water, Broadhurst, Primo, OpenPFGW x24 Jarai_Z, Farkas, Csajbok, Kasza, Jarai, Unknown x25 Water, Broadhurst, Primo, OpenPFGW x28 Iskra x29 Broadhurst, OpenPFGW x33 Carmody, Renze, Water, Broadhurst, Primo, OpenPFGW x36 Irvine, Carmody, Renze, Water, Broadhurst, Primo, OpenPFGW x38 Broadhurst, Primo, OpenPFGW x39 Keller, Dubner, Broadhurst, Primo, OpenPFGW x44 Zhou, Unknown x45 Batalov, Primo, OpenPFGW, Unknown Y Young