THE LARGEST KNOWN PRIMES (The 5,000 largest known primes) (selected smaller primes which have comments are included) Originally Compiled by Samuel Yates -- Continued by Chris Caldwell (Wed Mar 20 16:20:44 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 95*2^3614033+1 1087935 L1474 2019 215a 1005*2^3612300+1 1087414 L1823 2019 216a 861*2^3611815+1 1087268 L1745 2019 217b 1087*2^3611476+1 1087166 L4834 2019 218 485767*2^3609357-1 1086531 L622 2008 219b 675*2^3606447+1 1085652 L3278 2019 220b 669*2^3606266+1 1085598 L1675 2019 221b 851*2^3604395+1 1085034 L2125 2019 222b 1143*2^3602429+1 1084443 L4754 2019 223b 1183*2^3601898+1 1084283 L1823 2019 224 189*2^3596375+1 1082620 L3760 2016 225b 1089*2^3593267+1 1081685 L3035 2019 226c 1101*2^3589103+1 1080431 L1823 2019 227 35*2^3587843+1 1080050 L1979 2014 Divides GF(3587841,5) 228 275*2^3585539+1 1079358 L3803 2016 229 2*59^608685+1 1077892 g427 2014 Divides Phi(59^608685,2) 230d 651*2^3579843+1 1077643 L3035 2018 231d 583*2^3578402+1 1077210 L3035 2018 232 309*2^3577339+1 1076889 L4406 2016 233d 1185*2^3574583+1 1076060 L4851 2018 234 251*2^3574535+1 1076045 L3035 2016 235e 1019*2^3571635+1 1075173 L1823 2018 236e 119*2^3571416-1 1075106 L2484 2018 237 35*2^3570777+1 1074913 L2891 2014 238 33*2^3570132+1 1074719 L2552 2014 239 5*2^3569154-1 1074424 L503 2009 240 81*492^399095-1 1074352 L4001 2015 241 22934*5^1536762-1 1074155 L3789 2014 242e 265*2^3564373-1 1072986 L2484 2018 243e 771*2^3564109+1 1072907 L2125 2018 244 381*2^3563676+1 1072776 L4190 2016 245f 555*2^3563328+1 1072672 L4850 2018 246f 1183*2^3560584+1 1071846 L1823 2018 247 415*2^3559614+1 1071554 L3035 2016 248 1103*2^3558176-1 1071121 L1828 2018 249 1379*2^3557072-1 1070789 L1828 2018 250 681*2^3553141+1 1069605 L3035 2018 251 599*2^3551793+1 1069200 L3824 2018 252 621*2^3551472+1 1069103 L4687 2018 253 773*2^3550373+1 1068772 L1808 2018 254 1199*2^3548380-1 1068172 L1828 2018 255 191*2^3548117+1 1068092 L4203 2015 256 867*2^3547711+1 1067971 L4155 2018 257 Phi(3,3^1118781+1)/3 1067588 L3839 2014 Generalized unique 258 351*2^3545752+1 1067381 L4082 2016 259 93*2^3544744+1 1067077 L1728 2014 260 1159*2^3543702+1 1066764 L1823 2018 261 178658*5^1525224-1 1066092 L3789 2014 262 1085*2^3539671+1 1065551 L3035 2018 263 465*2^3536871+1 1064707 L4459 2016 264 1019*2^3536312-1 1064539 L1828 2012 265 1179*2^3534450+1 1063979 L3035 2018 266 447*2^3533656+1 1063740 L4457 2016 267 1059*2^3533550+1 1063708 L1823 2018 268 345*2^3532957+1 1063529 L4314 2016 269 553*2^3532758+1 1063469 L1823 2018 270 141*2^3529287+1 1062424 L4185 2015 271 13*2^3527315-1 1061829 L1862 2016 272 1393*2^3525571-1 1061306 L1828 2017 273 1071*2^3523944+1 1060816 L1675 2018 274 329*2^3518451+1 1059162 L1823 2016 275 135*2^3518338+1 1059128 L4045 2015 276 2*10^1059002-1 1059003 L3432 2013 Near-repdigit 277 64*10^1058794+1 1058796 L4036 2017 Generalized Fermat 278 599*2^3515959+1 1058412 L1823 2018 279 7*2^3511774+1 1057151 p236 2008 Divides GF(3511773,6) 280 1135*2^3510890+1 1056887 L1823 2018 281 428639*2^3506452-1 1055553 L2046 2011 282 555*2^3502765+1 1054441 L1823 2018 283 643*2^3501974+1 1054203 L1823 2018 284 2*23^774109+1 1054127 g427 2014 Divides Phi(23^774109,2) 285 1159*2^3501490+1 1054057 L2125 2018 286 1189*2^3499042+1 1053320 L4724 2018 287 609*2^3497474+1 1052848 L1823 2018 288 9*2^3497442+1 1052836 L1780 2012 Generalized Fermat, divides GF(3497441,10) 289 87*2^3496188+1 1052460 L1576 2014 290 783*2^3494129+1 1051841 L3824 2018 291 51*2^3490971+1 1050889 L1823 2014 292 753*2^3488818+1 1050242 L1823 2018 293 699*2^3487253+1 1049771 L1204 2018 294 249*2^3486411+1 1049517 L4045 2015 295 195*2^3486379+1 1049507 L4108 2015 296 59912*5^1500861+1 1049062 L3772 2014 297 495*2^3484656+1 1048989 L3035 2016 298 323*2^3482789+1 1048427 L1204 2016 299 1149*2^3481694+1 1048098 L1823 2018 300 701*2^3479779+1 1047521 L2125 2018 301 813*2^3479728+1 1047506 L4724 2018 302 197*2^3477399+1 1046804 L2125 2015 303 491*2^3473837+1 1045732 L4343 2016 304 1061*2^3471354-1 1044985 L1828 2017 305 641*2^3464061+1 1042790 L1444 2018 306 453*2^3461688+1 1042075 L3035 2016 307 571*2^3460216+1 1041632 L3035 2018 308 1155*2^3455254+1 1040139 L4711 2017 309 37292*5^1487989+1 1040065 L3553 2013 310 1273*2^3448551-1 1038121 L1828 2012 311 1065*2^3447906+1 1037927 L4664 2017 312 1155*2^3446253+1 1037429 L3035 2017 313 27288429267119080686...(1036580 other digits)...83679577406643267931 1036620 p384 2015 314 943*2^3442990+1 1036447 L4687 2017 315 943*2^3440196+1 1035606 L1448 2017 316 543*2^3438810+1 1035188 L3035 2017 317 625*2^3438572+1 1035117 L1355 2017 Generalized Fermat 318 113*2^3437145+1 1034686 L4045 2015 319 1147*2^3435970+1 1034334 L3035 2017 320 911*2^3432643+1 1033332 L1355 2017 321 1127*2^3427219+1 1031699 L3035 2017 322 159*2^3425766+1 1031261 L4045 2015 323 1119*2^3422189+1 1030185 L1355 2017 324 1005*2^3420846+1 1029781 L2714 2017 Divides GF(3420844,10) 325c 93*10^1029523-1 1029525 L4789 2019 Near-repdigit 326 975*2^3419230+1 1029294 L3545 2017 327 999*2^3418885+1 1029190 L3035 2017 328 907*2^3417890+1 1028891 L3035 2017 329 191249*2^3417696-1 1028835 L1949 2010 330 479*2^3411975+1 1027110 L2873 2016 331 245*2^3411973+1 1027109 L1935 2015 332 177*2^3411847+1 1027071 L4031 2015 333 113*2^3409934-1 1026495 L2484 2014 334 59*2^3408416-1 1026038 L426 2010 335 953*2^3405729+1 1025230 L3035 2017 336 373*2^3404702+1 1024921 L3924 2016 337 833*2^3403765+1 1024639 L3035 2017 338 24*414^391179+1 1023717 L4273 2016 339 1167*2^3399748+1 1023430 L3545 2017 340 611*2^3398273+1 1022985 L3035 2017 341 255*2^3395661+1 1022199 L3898 2014 342 1049*2^3395647+1 1022195 L3035 2017 343 342924651*2^3394939-1 1021988 L4166 2017 344 555*2^3393389+1 1021515 L2549 2017 345 609*2^3392301+1 1021188 L3035 2017 346 303*2^3391977+1 1021090 L2602 2016 347 805*2^3391818+1 1021042 L4609 2017 348 67*2^3391385-1 1020911 L1959 2014 349 663*2^3390469+1 1020636 L4316 2017 350 453*2^3387048+1 1019606 L2602 2016 351 173198*5^1457792-1 1018959 L3720 2013 352a 58589880^131072+1 1018145 L4923 2019 Generalized Fermat 353a 58523466^131072+1 1018080 L4802 2019 Generalized Fermat 354a 58447816^131072+1 1018006 L4591 2019 Generalized Fermat 355a 58447642^131072+1 1018006 L4591 2019 Generalized Fermat 356b 58247118^131072+1 1017811 L4309 2019 Generalized Fermat 357b 57704312^131072+1 1017278 L4591 2019 Generalized Fermat 358b 57694224^131072+1 1017268 L4656 2019 Generalized Fermat 359b 57594734^131072+1 1017169 L4656 2019 Generalized Fermat 360b 57438404^131072+1 1017015 L4745 2019 Generalized Fermat 361 621*2^3378148+1 1016927 L3035 2017 362 1093*2^3378000+1 1016883 L4583 2017 363 861*2^3377601+1 1016763 L4582 2017 364b 56917336^131072+1 1016496 L4729 2019 Generalized Fermat 365b 56735576^131072+1 1016314 L4760 2019 Generalized Fermat 366b 56584816^131072+1 1016162 L4289 2019 Generalized Fermat 367b 56459558^131072+1 1016036 L4892 2019 Generalized Fermat 368b 56383242^131072+1 1015959 L4889 2019 Generalized Fermat 369b 56307420^131072+1 1015883 L4843 2019 Generalized Fermat 370 208003!-1 1015843 p394 2016 Factorial 371c 55645700^131072+1 1015210 L4745 2019 Generalized Fermat 372c 55579418^131072+1 1015142 L4745 2019 Generalized Fermat 373c 55268442^131072+1 1014822 L4525 2019 Generalized Fermat 374 179*2^3371145+1 1014819 L3763 2014 375d 55184170^131072+1 1014736 L4871 2018 Generalized Fermat 376d 55015050^131072+1 1014561 L4205 2018 Generalized Fermat 377 839*2^3369383+1 1014289 L2891 2017 378 677*2^3369115+1 1014208 L2103 2017 379e 54548788^131072+1 1014076 L4726 2018 Generalized Fermat 380 715*2^3368210+1 1013936 L4527 2017 381 617*2^3368119+1 1013908 L4552 2017 382e 54361742^131072+1 1013881 L4210 2018 Generalized Fermat 383e 54334044^131072+1 1013852 L4745 2018 Generalized Fermat 384f 54212352^131072+1 1013724 L4307 2018 Generalized Fermat 385f 54206254^131072+1 1013718 L4249 2018 Generalized Fermat 386 777*2^3367372+1 1013683 L4408 2017 387f 54161106^131072+1 1013670 L4307 2018 Generalized Fermat 388f 54032538^131072+1 1013535 L4591 2018 Generalized Fermat 389 61*2^3366033-1 1013279 L4405 2017 390 369*2^3365614+1 1013154 L4364 2016 391 53659976^131072+1 1013141 L4823 2018 Generalized Fermat 392 53161266^131072+1 1012610 L4307 2018 Generalized Fermat 393 53078434^131072+1 1012521 L4835 2018 Generalized Fermat 394 533*2^3362857+1 1012324 L3171 2017 395 619*2^3362814+1 1012311 L4527 2017 396 52712138^131072+1 1012127 L4819 2018 Generalized Fermat 397 104*873^344135-1 1012108 L4700 2018 398 52412612^131072+1 1011802 L4289 2018 Generalized Fermat 399 52043532^131072+1 1011400 L4810 2018 Generalized Fermat 400 51954384^131072+1 1011303 L4720 2018 Generalized Fermat 401 51872628^131072+1 1011213 L4591 2018 Generalized Fermat 402 51580416^131072+1 1010891 L4765 2018 Generalized Fermat 403 51570250^131072+1 1010880 L4591 2018 Generalized Fermat 404 51567684^131072+1 1010877 L4800 2018 Generalized Fermat 405 51269192^131072+1 1010547 L4795 2018 Generalized Fermat 406 50963598^131072+1 1010206 L4726 2018 Generalized Fermat 407 50844724^131072+1 1010074 L4656 2018 Generalized Fermat 408 50495632^131072+1 1009681 L4591 2018 Generalized Fermat 409 9*10^1009567-1 1009568 L3735 2016 Near-repdigit 410 1183*2^3353058+1 1009375 L3824 2017 411 50217306^131072+1 1009367 L4720 2018 Generalized Fermat 412 81*2^3352924+1 1009333 L1728 2012 Generalized Fermat 413 50110436^131072+1 1009245 L4591 2018 Generalized Fermat 414 50055102^131072+1 1009183 L4309 2018 Generalized Fermat 415 543*2^3351686+1 1008961 L4198 2017 416 49817700^131072+1 1008912 L4760 2018 Generalized Fermat 417 49530004^131072+1 1008582 L4591 2018 Generalized Fermat 418 49397682^131072+1 1008430 L4764 2018 Generalized Fermat 419 49331672^131072+1 1008354 L4763 2018 Generalized Fermat 420 393*2^3349525+1 1008311 L3101 2016 421 49243622^131072+1 1008252 L4741 2018 Generalized Fermat 422 49225986^131072+1 1008232 L4757 2018 Generalized Fermat 423 49090656^131072+1 1008075 L4752 2018 Generalized Fermat 424 49038514^131072+1 1008015 L4743 2018 Generalized Fermat 425 48643706^131072+1 1007554 L4691 2018 Generalized Fermat 426 48370248^131072+1 1007234 L4701 2018 Generalized Fermat 427 48273828^131072+1 1007120 L4456 2018 Generalized Fermat 428 47179704^131072+1 1005815 L4673 2017 Generalized Fermat 429 47090246^131072+1 1005707 L4654 2017 Generalized Fermat 430 733*2^3340464+1 1005583 L3035 2016 431 57*2^3339932-1 1005422 L3519 2015 432 46776558^131072+1 1005326 L4659 2017 Generalized Fermat 433 46736070^131072+1 1005277 L4245 2017 Generalized Fermat 434 46730280^131072+1 1005270 L4656 2017 Generalized Fermat 435 46413358^131072+1 1004883 L4626 2017 Generalized Fermat 436 46385310^131072+1 1004848 L4622 2017 Generalized Fermat 437 46371508^131072+1 1004831 L4620 2017 Generalized Fermat 438 651*2^3337101+1 1004571 L3260 2016 439 46077492^131072+1 1004469 L4595 2017 Generalized Fermat 440 1087*2^3336385-1 1004355 L1828 2012 441 849*2^3335669+1 1004140 L3035 2016 442 611*2^3334875+1 1003901 L3813 2016 443 45570624^131072+1 1003840 L4295 2017 Generalized Fermat 444 403*2^3334410+1 1003761 L4293 2016 445 45315256^131072+1 1003520 L4562 2017 Generalized Fermat 446 44919410^131072+1 1003020 L4295 2017 Generalized Fermat 447 673*2^3330436+1 1002564 L3035 2016 448 44438760^131072+1 1002408 L4505 2016 Generalized Fermat 449 193*2^3329782+1 1002367 L3460 2014 Divides Fermat F(3329780) 450 44330870^131072+1 1002270 L4501 2016 Generalized Fermat 451 129*2^3328805+1 1002073 L3859 2014 452 44085096^131072+1 1001953 L4482 2016 Generalized Fermat 453 143183*2^3328297+1 1001923 L4504 2017 454 44049878^131072+1 1001908 L4466 2016 Generalized Fermat 455 655*2^3327518+1 1001686 L4490 2016 456 659*2^3327371+1 1001642 L3502 2016 457 821*2^3327003+1 1001531 L3035 2016 458 555*2^3325925+1 1001206 L4414 2016 459 43165206^131072+1 1000753 L4309 2016 Generalized Fermat 460 43163894^131072+1 1000751 L4334 2016 Generalized Fermat 461 791*2^3323995+1 1000626 L3035 2016 462 597*2^3322871+1 1000287 L3035 2016 463 387*2^3322763+1 1000254 L1455 2016 464 42654182^131072+1 1000075 L4208 2015 Generalized Fermat 465 5553507*2^3322000+1 1000029 p391 2016 466 464253*2^3321908-1 1000000 L466 2013 467 3^2095902+3^647322-1 1000000 x44 2018 468 191273*2^3321908-1 1000000 L466 2013 469 3139*2^3321905-1 999997 L185 2008 470 4847*2^3321063+1 999744 SB9 2005 471 49*2^3309087-1 996137 L1959 2013 472 139413*6^1279992+1 996033 L4001 2015 473 51*2^3308171+1 995861 L2840 2015 474 245114*5^1424104-1 995412 L3686 2013 475 175124*5^1422646-1 994393 L3686 2013 476 1611*22^738988+1 992038 L4139 2015 477 2017*2^3292325-1 991092 L3345 2017 478 Phi(3,-107970^98304) 989588 L4506 2016 Generalized unique 479 61*2^3286535-1 989348 L4405 2016 480 87*2^3279368+1 987191 L3458 2015 481 65*2^3270127+1 984409 L3924 2015 482 5*2^3264650-1 982759 L384 2013 483 223*2^3264459-1 982703 L1884 2012 484 9*2^3259381-1 981173 L1828 2011 485 33*2^3242126-1 975979 L3345 2014 486 39*2^3240990+1 975637 L3432 2014 487 211195*2^3224974+1 970820 L2121 2013 488 600921*2^3219922-1 969299 g337 2018 489 6*409^369832+1 965900 L4001 2015 490 94373*2^3206717+1 965323 L2785 2013 491 2751*2^3206569-1 965277 L4036 2015 492 113983*2^3201175-1 963655 L613 2008 493 34*888^326732-1 963343 L4001 2017 494 33*2^3176269+1 956154 L3432 2013 495 600921*2^3173683-1 955380 g337 2018 496c 1414*95^482691-1 954633 L4877 2019 497 1087*2^3164677-1 952666 L1828 2012 498 15*2^3162659+1 952057 p286 2012 499 67*2^3161450+1 951694 L3223 2015 500 19*2^3155009-1 949754 L1828 2012 501 69*2^3140225-1 945304 L3764 2014 502 3*2^3136255-1 944108 L256 2007 503 Phi(3,-62721^98304) 943210 L4506 2016 Generalized unique 504a 14613898^131072+1 939101 L4926 2019 Generalized Fermat 505b 14217182^131072+1 937534 L4387 2019 Generalized Fermat 506b 14020004^131072+1 936739 L4249 2019 Generalized Fermat 507 27777*2^3111027+1 936517 L2777 2014 Generalized Cullen 508c 13800346^131072+1 935840 L4880 2019 Generalized Fermat 509c 13613070^131072+1 935062 L4245 2019 Generalized Fermat 510d 13433028^131072+1 934305 L4868 2018 Generalized Fermat 511 1019*2^3103680-1 934304 L1828 2012 512 99*2^3102401-1 933918 L1862 2017 513 256612*5^1335485-1 933470 L259 2013 514e 13083418^131072+1 932803 L4747 2018 Generalized Fermat 515 69*2^3097340-1 932395 L3764 2014 516f 12978952^131072+1 932347 L4849 2018 Generalized Fermat 517f 12961862^131072+1 932272 L4245 2018 Generalized Fermat 518 12851074^131072+1 931783 L4670 2018 Generalized Fermat 519 45*2^3094632-1 931579 L1862 2018 520 12687374^131072+1 931054 L4289 2018 Generalized Fermat 521 513*2^3092705+1 931000 L4329 2016 522 12661786^131072+1 930939 L4819 2018 Generalized Fermat 523 5*2^3090860-1 930443 L1862 2012 524 12512992^131072+1 930266 L4814 2018 Generalized Fermat 525 12357518^131072+1 929554 L4295 2018 Generalized Fermat 526 12343130^131072+1 929488 L4720 2018 Generalized Fermat 527 373*520^342177+1 929357 L3610 2014 528 19401*2^3086450-1 929119 L541 2015 529 75*2^3086355+1 929088 L3760 2015 530 11876066^131072+1 927292 L4737 2018 Generalized Fermat 531e 271*2^3079189-1 926931 L2484 2018 532 766*33^610412+1 926923 L4001 2016 533 11778792^131072+1 926824 L4672 2018 Generalized Fermat 534 31*332^367560+1 926672 L4294 2018 535b 10001*2^3075602-1 925853 L4405 2019 536 11292782^131072+1 924425 L4672 2018 Generalized Fermat 537 14844*430^350980-1 924299 L4001 2016 538 11267296^131072+1 924297 L4654 2017 Generalized Fermat 539 11195602^131072+1 923933 L4706 2017 Generalized Fermat 540 60849*2^3067914+1 923539 L591 2014 541 11036888^131072+1 923120 L4660 2017 Generalized Fermat 542 10994460^131072+1 922901 L4704 2017 Generalized Fermat 543 21*2^3065701+1 922870 p286 2012 544 10962066^131072+1 922733 L4702 2017 Generalized Fermat 545 10921162^131072+1 922520 L4559 2017 Generalized Fermat 546 43*2^3063674+1 922260 L3432 2013 547 10765720^131072+1 921704 L4695 2017 Generalized Fermat 548 5*2^3059698-1 921062 L503 2008 549 10453790^131072+1 920031 L4694 2017 Generalized Fermat 550 10368632^131072+1 919565 L4692 2017 Generalized Fermat 551 123*2^3049038+1 917854 L4119 2015 552 10037266^131072+1 917716 L4691 2017 Generalized Fermat 553c 400*95^463883-1 917435 L4001 2019 554 9907326^131072+1 916975 L4690 2017 Generalized Fermat 555 9785844^131072+1 916272 L4326 2017 Generalized Fermat 556 291*2^3037904+1 914503 L3545 2015 557 9419976^131072+1 914103 L4591 2017 Generalized Fermat 558 9240606^131072+1 913009 L4591 2017 Generalized Fermat 559 8770526^131072+1 910037 L4245 2017 Generalized Fermat 560 8704114^131072+1 909604 L4670 2017 Generalized Fermat 561 383731*2^3021377-1 909531 L466 2011 562 46821*2^3021380-374567 909531 p363 2013 563 2^3021377-1 909526 G3 1998 Mersenne 37 564 7*2^3015762+1 907836 g279 2008 565 75*2^3012342+1 906808 L3941 2015 566 8150484^131072+1 905863 L4249 2017 Generalized Fermat 567 7926326^131072+1 904276 L4249 2017 Generalized Fermat 568 7858180^131072+1 903784 L4201 2017 Generalized Fermat 569 7832704^131072+1 903599 L4249 2017 Generalized Fermat 570 268514*5^1292240-1 903243 L3562 2013 571 7*10^902708+1 902709 p342 2013 572 43*2^2994958+1 901574 L3222 2013 573 1095*2^2992587-1 900862 L1828 2011 574 7379442^131072+1 900206 L4201 2017 Generalized Fermat 575 15*2^2988834+1 899730 p286 2012 576 29*564^326765+1 899024 L4001 2017 577 39*2^2978894+1 896739 L2719 2013 578 4348099*2^2976221-1 895939 L466 2008 579 205833*2^2976222-411665 895938 L4667 2017 580 18976*2^2976221-18975 895937 p373 2014 581 2^2976221-1 895932 G2 1997 Mersenne 36 582 1024*3^1877301+1 895704 p378 2014 583 249*2^2975002+1 895568 L2322 2015 584 195*2^2972947+1 894949 L3234 2015 585 6705932^131072+1 894758 L4201 2017 Generalized Fermat 586 46425*2^2971203+1 894426 L2777 2014 Generalized Cullen 587 493*72^480933+1 893256 L3610 2014 588 6403134^131072+1 892128 L4510 2016 Generalized Fermat 589 6391936^131072+1 892028 L4511 2016 Generalized Fermat 590 45*2^2958002-1 890449 L1862 2017 591 198677*2^2950515+1 888199 L2121 2012 592 5877582^131072+1 887253 L4245 2016 Generalized Fermat 593 17*2^2946584-1 887012 L3519 2013 594 141*2^2943065+1 885953 L3719 2015 595 5734100^131072+1 885846 L4477 2016 Generalized Fermat 596 33*2^2939063-1 884748 L3345 2013 597 5903*2^2938744-1 884654 L4036 2015 598 5586416^131072+1 884361 L4454 2016 Generalized Fermat 599 243*2^2937316+1 884223 L4114 2015 600 61*2^2936967-1 884117 L2484 2017 601 5471814^131072+1 883181 L4362 2016 Generalized Fermat 602 5400728^131072+1 882436 L4201 2016 Generalized Fermat 603 5326454^131072+1 881648 L4201 2016 Generalized Fermat 604 7019*10^881309-1 881313 L3564 2013 605 25*2^2927222+1 881184 L1935 2013 Generalized Fermat 606 97366*5^1259955-1 880676 L3567 2013 607 243944*5^1258576-1 879713 L3566 2013 608 269*2^2918105+1 878440 L2715 2015 609e 169*2^2917805-1 878350 L2484 2018 610 7*2^2915954+1 877791 g279 2008 Divides GF(2915953,12) [g322] 611 4974408^131072+1 877756 L4380 2016 Generalized Fermat 612 427194*113^427194+1 877069 p310 2012 Generalized Cullen 613 4893072^131072+1 876817 L4303 2016 Generalized Fermat 614 143157*2^2911403+1 876425 L4504 2017 615 207*2^2903535+1 874054 L3173 2015 616 99*2^2899303-1 872780 L1862 2017 617 63*2^2898957+1 872675 L3262 2013 618 11*2^2897409+1 872209 L2973 2013 Divides GF(2897408,3) 619 4329134^131072+1 869847 L4395 2016 Generalized Fermat 620 51*2^2881227+1 867338 L3512 2013 621 261*2^2879941+1 866952 L4119 2015 622 4085818^131072+1 866554 L4201 2016 Generalized Fermat 623 65*2^2876718-1 865981 L2484 2016 624 4013*2^2873250-1 864939 L1959 2014 625 41*2^2872058-1 864578 L2484 2013 626 165*2^2870868+1 864220 L4119 2015 627 283*2^2868750+1 863583 L3877 2015 628 3814944^131072+1 862649 L4201 2016 Generalized Fermat 629 147*2^2862651+1 861746 L1741 2015 630 1207*2^2861901-1 861522 L1828 2011 631 231*2^2860725+1 861167 L2873 2015 632 193*2^2858812+1 860591 L2997 2015 633f 241*2^2857313-1 860140 L2484 2018 634 3615210^131072+1 859588 L4201 2016 Generalized Fermat 635 222361*2^2854840+1 859398 g403 2006 636 225*2^2851959+1 858528 L3941 2015 637 247*2^2851602+1 858421 L3865 2015 638 183*2^2850321+1 858035 L2117 2015 639 3450080^131072+1 856927 L4201 2016 Generalized Fermat 640 111*2^2841992+1 855527 L1792 2015 641 95*2^2837909+1 854298 L3539 2013 642c 199*2^2835667-1 853624 L2484 2019 643 84466*5^1215373-1 849515 L3562 2013 644 97*2^2820650+1 849103 L2163 2013 645 107*2^2819922-1 848884 L2484 2013 646f 84256*3^1778899+1 848756 L4789 2018 647f 45472*3^1778899-1 848756 L4789 2018 648 97*2^2818306+1 848397 L3262 2013 649 177*2^2816050+1 847718 L129 2012 650 105*2^2813000+1 846800 L3200 2015 651 96*10^846519-1 846521 L2425 2011 Near-repdigit 652 63*2^2807130+1 845033 L3262 2013 653 150344*5^1205508-1 842620 L3547 2013 654 400254*127^400254+1 842062 g407 2013 Generalized Cullen 655 2639850^131072+1 841690 L4249 2016 Generalized Fermat 656 43*2^2795582+1 841556 L2842 2013 657 117*2^2794014+1 841085 L1741 2015 658 15*2^2785940+1 838653 p286 2012 659 1337*2^2785444-1 838506 L4518 2017 660 600921*2^2776014-1 835670 g337 2017 661 92*10^833852-1 833854 L4789 2018 Near-repdigit 662 2280466^131072+1 833359 L4201 2016 Generalized Fermat 663 57*2^2765963+1 832640 L3262 2013 664 77*2^2762047+1 831461 L3430 2013 665 2194180^131072+1 831164 L4276 2016 Generalized Fermat 666 7*10^830865+1 830866 p342 2014 667f 215*2^2751022-1 828143 L2484 2018 668 245*2^2748663+1 827433 L3173 2015 669 57*2^2747499+1 827082 L3514 2013 Divides Fermat F(2747497) 670 1955556^131072+1 824610 L4250 2015 Generalized Fermat 671 165*2^2732983+1 822713 L1741 2015 672 251*2^2730917+1 822091 L3924 2015 673 173*2^2729905+1 821786 L3895 2015 674d 1981*2^2728877-1 821478 L1134 2018 675 17*2^2721830-1 819354 p279 2010 676 1766192^131072+1 818812 L4231 2015 Generalized Fermat 677 165*2^2717378-1 818015 L2055 2012 678 1722230^131072+1 817377 L4210 2015 Generalized Fermat 679 1717162^131072+1 817210 L4226 2015 Generalized Fermat 680 133*2^2713410+1 816820 L3223 2015 681 45*2^2711732+1 816315 L1349 2012 682a 569*2^2711451+1 816231 L4568 2019 683 93*2^2708718-1 815408 L1862 2016 684 1660830^131072+1 815311 L4207 2015 Generalized Fermat 685b 837*2^2708160+1 815241 L4314 2019 686b 1005*2^2707268+1 814972 L4687 2019 687 13*458^306196+1 814748 L3610 2015 688 253*2^2705844+1 814543 L4083 2015 689b 657*2^2705620+1 814476 L4907 2019 690 39*2^2705367+1 814399 L1576 2013 Divides GF(2705360,3) 691b 303*2^2703864+1 813947 L1204 2019 692 141*2^2702160+1 813434 L1741 2015 693b 753*2^2701925+1 813364 L4314 2019 694 133*2^2701452+1 813221 L3173 2015 695b 521*2^2700095+1 812813 L4854 2019 696b 393*2^2698956+1 812470 L1823 2019 697b 417*2^2698652+1 812378 L3035 2019 698b 525*2^2698118+1 812218 L1823 2019 699 153*2^2697173+1 811933 L3865 2015 700 1560730^131072+1 811772 L4201 2015 Generalized Fermat 701 Phi(3,-1538654^65536) 810961 L4561 2017 Generalized unique 702 11*2^2691961+1 810363 p286 2013 Divides GF(2691960,12) 703 7335*2^2689080-1 809498 L4036 2015 704d 1049*2^2688749+1 809398 L4869 2018 705d 329*2^2688221+1 809238 L3035 2018 706d 865*2^2687434+1 809002 L4844 2018 707d 989*2^2686591+1 808748 L2805 2018 708 243*2^2685873+1 808531 L3865 2015 709d 909*2^2685019+1 808275 L3431 2018 710 Phi(3,-1456746^65536) 807848 L4561 2017 Generalized unique 711d 975*2^2681840+1 807318 L4155 2018 712 295*2^2680932+1 807044 L1741 2015 713 Phi(3,-1427604^65536) 806697 L4561 2017 Generalized unique 714e 575*2^2679711+1 806677 L2125 2018 715 219*2^2676229+1 805628 L1792 2015 716e 637*2^2675976+1 805552 L3035 2018 717 Phi(3,-1395583^65536) 805406 L4561 2017 Generalized unique 718e 951*2^2674564+1 805127 L1885 2018 719 1372930^131072+1 804474 g236 2003 Generalized Fermat 720 261*2^2671677+1 804258 L3035 2015 721f 895*2^2671520+1 804211 L3035 2018 722 1361244^131072+1 803988 g236 2004 Generalized Fermat 723f 789*2^2670409+1 803877 L3035 2018 724 256*11^771408+1 803342 L3802 2014 Generalized Fermat 725f 503*2^2668529+1 803310 L4844 2018 726 255*2^2668448+1 803286 L1129 2015 727 4189*2^2666639-1 802742 L1959 2017 728f 539*2^2664603+1 802129 L4717 2018 729 1396*5^1146713-1 801522 L3547 2013 730 267*2^2662090+1 801372 L3234 2015 Divides Fermat F(2662088) 731 297*2^2660048+1 800757 L3865 2015 732 851*2^2656411+1 799663 L4717 2018 733 487*2^2655008+1 799240 L3760 2018 734 371*2^2651663+1 798233 L3760 2018 735 69*2^2649939-1 797713 L3764 2014 736 207*2^2649810+1 797675 L1204 2015 737 505*2^2649496+1 797581 L3760 2018 738 993*2^2649256+1 797509 L3760 2018 739 517*2^2648698+1 797341 L3760 2018 740f 340*703^280035+1 797250 L4001 2018 741 441*2^2648307+1 797223 L3760 2018 742 1129*2^2646590+1 796707 L3760 2018 743a 128*518^293315+1 796156 L4001 2019 744 Phi(3,-1181782^65536) 795940 L4142 2015 Generalized unique 745 1176694^131072+1 795695 g236 2003 Generalized Fermat 746 13*2^2642943-1 795607 L1862 2012 747 501*2^2641052+1 795039 L3035 2018 748 879*2^2639962+1 794711 L3760 2018 749 57*2^2639528-1 794579 L2484 2016 750 342673*2^2639439-1 794556 L53 2007 751 813*2^2639092+1 794449 L2158 2018 752 Phi(3,-1147980^65536) 794288 L4142 2015 Generalized unique 753 1027*2^2638186+1 794177 L3760 2018 754 889*2^2637834+1 794071 L3545 2018 755 92182*5^1135262+1 793520 L3547 2013 756 741*2^2634385+1 793032 L1204 2018 757 465*2^2630496+1 791861 L1444 2018 758 189*2^2630487+1 791858 L3035 2015 759 87*2^2630468+1 791852 L3262 2013 760 1131*2^2629345+1 791515 L4826 2018 761 967*2^2629344+1 791515 L3760 2018 762 267*2^2629210+1 791474 L3035 2015 763 819*2^2627529+1 790968 L1387 2018 764 17152*5^1131205-1 790683 L3552 2013 765 183*2^2626442+1 790641 L3035 2015 766 813*2^2626224+1 790576 L4830 2018 767 807*2^2625044+1 790220 L1412 2018 768 1063730^131072+1 789949 g260 2013 Generalized Fermat 769 1243*2^2623707-1 789818 L1828 2011 770 693*2^2623557+1 789773 L3278 2018 771 981*2^2622032+1 789314 L1448 2018 772 145*2^2621020+1 789008 L3035 2015 773 541*2^2614676+1 787099 L4824 2018 774 Phi(3,-984522^65536) 785545 p379 2015 Generalized unique 775 1071*2^2609316+1 785486 L3760 2018 776 87*2^2609046+1 785404 L2520 2013 777 543*2^2608129+1 785128 L4822 2018 778 329584*5^1122935-1 784904 L3553 2013 779 10*311^314806+1 784737 L3610 2014 780 1019*2^2606525+1 784646 L1201 2018 781 977*2^2606211+1 784551 L4746 2018 782 13*2^2606075-1 784508 L1862 2011 783 693*2^2605905+1 784459 L4821 2018 784 147*2^2604275+1 783968 L1741 2015 785 105*2^2603631+1 783774 L3459 2015 786 93*2^2602483-1 783428 L1862 2016 787 155*2^2602213+1 783347 L2719 2015 788 303*2^2601525+1 783140 L4816 2018 789 711*2^2600535+1 782842 L4815 2018 790 1133*2^2599345+1 782484 L4796 2018 791 397*2^2598796+1 782319 L3877 2018 792 1171*2^2595736+1 781398 L3035 2018 793 909548^131072+1 781036 p387 2015 Generalized Fermat 794 2*218^333925+1 780870 L4683 2017 795 1149*2^2593359+1 780682 L1125 2018 796 225*2^2592918+1 780549 L1792 2015 Generalized Fermat 797b 333*2^2591874-1 780235 L2017 2019 798 Phi(3,-883969^65536) 779412 p379 2015 Generalized unique 799 Phi(3,-872989^65536) 778700 p379 2015 Generalized unique 800 703*2^2586728+1 778686 L4256 2018 801 120*825^266904+1 778416 L4001 2018 802 337*2^2585660+1 778364 L2873 2018 803 393*2^2584957+1 778153 L4600 2018 804 151*2^2584480+1 778009 L4043 2015 805 Phi(3,-862325^65536) 778001 p379 2015 Generalized unique 806 385*2^2584280+1 777949 L4600 2018 807 Phi(3,-861088^65536) 777919 p379 2015 Generalized unique 808 65*2^2583720-1 777780 L2484 2015 809 25*2^2583690+1 777770 L3249 2013 Generalized Fermat 810 82*920^262409-1 777727 L4064 2015 811 1041*2^2582112+1 777297 L1456 2018 812 334310*211^334310-1 777037 p350 2012 Generalized Woodall 813 229*2^2581111-1 776995 L1862 2017 814 61*2^2580689-1 776867 L2484 2015 815 1113*2^2580205+1 776723 L4724 2018 816 51*2^2578652+1 776254 L3262 2013 817 173*2^2578197+1 776117 L3035 2015 818 833*2^2578029+1 776067 L4724 2018 819 459*2^2573899+1 774824 L1204 2018 820 Phi(3,-806883^65536) 774218 p379 2015 Generalized unique 821 627*2^2567718+1 772963 L3803 2018 822 933*2^2567598+1 772927 L4724 2018 823 757*2^2566468+1 772587 L2606 2018 824 231*2^2565263+1 772224 L3035 2015 825 4*737^269302+1 772216 L4294 2016 Generalized Fermat 826 941*2^2564867+1 772105 L4724 2018 827 923*2^2563709+1 771757 L1823 2018 828c 151*596^278054+1 771671 L4876 2019 829 Phi(3,-770202^65536) 771570 p379 2015 Generalized unique 830e 303*2^2562423-1 771369 L2017 2018 831 75*2^2562382-1 771356 L2055 2011 832 147559*2^2562218+1 771310 L764 2012 833 829*2^2561730+1 771161 L1823 2018 834 404*12^714558+1 771141 L1471 2011 835 Phi(3,-757576^65536) 770629 p379 2015 Generalized unique 836 1193*2^2559453+1 770476 L2030 2018 837 Phi(3,-731582^65536) 768641 p379 2015 Generalized unique 838 419*2^2552363+1 768341 L4713 2018 839a 34*759^266676-1 768093 L4001 2019 840 315*2^2550412+1 767754 L4712 2017 841 415*2^2549590+1 767506 L4710 2017 842 693*2^2547752+1 766953 L4600 2017 843 673*2^2547226+1 766795 L2873 2017 844 169*2^2545526+1 766282 L2125 2015 Divides GF(2545525,10), generalized Fermat 845 183*2^2545116+1 766159 L3035 2015 846e 311*2^2544778-1 766058 L2017 2018 847 9*2^2543551+1 765687 L1204 2011 Divides Fermat F(2543548), GF(2543549,3), GF(2543549,6), GF(2543549,12) 848 663*2^2542990+1 765520 L4703 2017 849 705*2^2542464+1 765361 L2873 2017 850 689186^131072+1 765243 g429 2013 Generalized Fermat 851 745*2^2540726+1 764838 L4696 2017 852 Phi(3,-682504^65536) 764688 p379 2015 Generalized unique 853 64*177^340147-1 764644 L3610 2015 854 421*2^2539336+1 764419 L4148 2017 855 123287*2^2538167+1 764070 L3054 2012 856 305716*5^1093095-1 764047 L3547 2013 857 223*2^2538080+1 764041 L2125 2015 858 83*2^2537641+1 763908 L1300 2013 859 645*2^2532811+1 762455 L4600 2017 860 953*2^2531601+1 762091 L4404 2017 861 545*2^2528179+1 761061 L1502 2017 862 203*2^2526505+1 760557 L3910 2015 863 967*2^2526276+1 760488 L1204 2017 864 241*2^2522801-1 759442 L2484 2018 865 360307*6^975466-1 759066 p255 2017 866 749*2^2519457+1 758436 L1823 2017 867d 199*2^2518871-1 758259 L2484 2018 868 87*2^2518122-1 758033 L2484 2014 869 Phi(3,-605347^65536) 757859 p379 2015 Generalized unique 870 711*2^2516187+1 757451 L3035 2017 871 967*2^2514698+1 757003 L4600 2017 872 33*2^2513872-1 756753 L3345 2013 873 973*2^2511920+1 756167 L1823 2017 874 679*2^2511814+1 756135 L4598 2017 875 1093*2^2511384+1 756005 L1823 2017 876 45*2^2507894+1 754953 L1349 2012 877 130484*5^1080012-1 754902 L3547 2013 878 572186^131072+1 754652 g0 2004 Generalized Fermat 879b 242*501^279492-1 754586 L4911 2019 880 883*2^2506382+1 754500 L1823 2017 881 847*2^2505540+1 754246 L4600 2017 882 191*2^2504121+1 753818 L3035 2015 883 783*2^2500912+1 752853 L1823 2017 884 165*2^2500130-1 752617 L2055 2011 885 33*2^2499883-1 752542 L3345 2013 886f 319*2^2498685-1 752182 L2017 2018 887f 321*2^2496594-1 751553 L2235 2018 888 365*2^2494991+1 751070 L3035 2017 889 213*2^2493004-1 750472 L1863 2017 890 777*2^2492560+1 750339 L3035 2017 891 57*2^2492031+1 750178 L1230 2013 892 879*2^2491342+1 749972 L4600 2017 893 14*152^343720-1 749945 L3610 2015 894 231*2^2489083+1 749292 L3035 2015 895 255*2^2488562+1 749135 L3035 2015 896 221*780^258841-1 748596 L4001 2018 897 303*2^2486629+1 748553 L3035 2017 898 6*433^283918-1 748548 L3610 2015 899 617*2^2485919+1 748339 L1885 2017 900 515*2^2484885+1 748028 L3035 2017 901 1095*2^2484828+1 748011 L3035 2017 902 1113*2^2484125+1 747800 L3035 2017 903 607*2^2483616+1 747646 L3035 2017 904 625*2^2483272+1 747543 L2487 2017 Generalized Fermat 905 723*2^2482064+1 747179 L3035 2017 906 3*2^2478785+1 746190 g245 2003 Divides Fermat F(2478782), GF(2478782,3), GF(2478776,6), GF(2478782,12) 907 1071*2^2477584+1 745831 L3035 2017 908 22*30^504814-1 745673 p355 2014 909 11*2^2476839+1 745604 L2691 2011 910 825*2^2474996+1 745051 L1300 2017 911 1061*2^2474282-1 744837 L1828 2012 912 435*2^2473905+1 744723 L3035 2017 913 1121*2^2473401+1 744571 L3924 2017 914 325*2^2473267-1 744531 L2017 2018 915 889*2^2471082+1 743873 L1300 2017 916 529*2^2470514+1 743702 L3924 2017 Generalized Fermat 917 883*2^2469268+1 743327 L4593 2017 918 81*2^2468789+1 743182 g418 2009 919 55154*5^1063213+1 743159 L3543 2013 920 119*2^2468556-1 743112 L2484 2018 921 525*2^2467658+1 742842 L3035 2017 922 715*2^2465640+1 742235 L3035 2017 923 26773*2^2465343-1 742147 L197 2006 924 993*2^2464082+1 741766 L3035 2017 925 1179*2^2463746+1 741665 L3035 2017 926 857*2^2463411+1 741564 L3662 2017 927 103*2^2462567-1 741309 L2484 2014 928 12587*2^2462524-1 741298 L2012 2017 929 5*2^2460482-1 740680 L503 2008 930 763*2^2458592+1 740113 L1823 2017 931 453*2^2458461+1 740074 L3035 2017 932 519*2^2458058+1 739952 L3803 2017 933 137*2^2457639+1 739826 L4021 2014 934 41676*7^875197-1 739632 L2777 2012 Generalized Woodall 935 133*2^2455666+1 739232 L2322 2014 936 99*2^2455541-1 739194 L1862 2015 937 377*2^2452639+1 738321 L3035 2017 938 1129*2^2452294+1 738218 L3035 2017 939 1103*2^2451133+1 737868 L4531 2017 940 65*2^2450614-1 737711 L2074 2014 941 549*2^2450523+1 737684 L3035 2017 942 765*2^2448660+1 737123 L4412 2017 943 607*2^2447836+1 736875 L4523 2017 944 1005*2^2446722+1 736540 L4522 2017 945 703*2^2446472+1 736465 L2805 2017 946 75*2^2446050+1 736337 L3035 2013 947 115*26^520277-1 736181 L1471 2014 948 114986*5^1052966-1 735997 L3528 2013 949 1029*2^2444707+1 735934 L3035 2017 950 1035*2^2443369+1 735531 L3173 2017 951 1017*2^2442723+1 735336 L4417 2017 952 1065*2^2441132+1 734857 L1823 2017 953 393*2^2436849+1 733568 L3035 2016 954 386892^131072+1 732377 p259 2009 Generalized Fermat 955 465*2^2431455+1 731944 L3035 2016 956 905*2^2430509+1 731660 L4408 2016 957 223*2^2430490+1 731653 L4016 2014 958a 8*410^279991+1 731557 L4700 2019 959 69*2^2428251-1 730979 L384 2014 960 645*2^2426494+1 730451 L3035 2016 961 665*2^2425789+1 730239 L3173 2016 962 23*2^2425641+1 730193 L2675 2011 963 361*2^2424232+1 729770 L3035 2016 Generalized Fermat 964 753*2^2422914+1 729373 L3035 2016 965 105*2^2422105+1 729129 L2520 2014 966 201*2^2421514-1 728951 L1862 2016 967 239*2^2421404-1 728918 L2484 2018 968 577*2^2420868+1 728757 L4489 2016 969 929*2^2417767+1 727824 L3924 2016 970 4075*2^2417579-1 727768 L1959 2017 971 303*2^2417452-1 727729 L2235 2018 972 895*2^2417396+1 727712 L3035 2016 973 1081*2^2412780+1 726323 L1203 2016 974 333*2^2412735-1 726309 L2017 2018 975 83*2^2411962-1 726075 L1959 2018 976 69*2^2410035-1 725495 L2074 2013 977 12362*1027^240890-1 725462 L4444 2018 978 143157*2^2409056+1 725204 L4504 2016 979 Phi(3,-340594^65536) 725122 p379 2015 Generalized unique 980 339*2^2408337+1 724985 L3029 2016 981 811*2^2408096+1 724913 L2526 2016 982 157*2^2407958+1 724870 L1741 2014 983 243686*5^1036954-1 724806 L3549 2013 984 303*2^2406433+1 724411 L4425 2016 985 345*2^2405701+1 724191 L3035 2016 986 921*2^2405056+1 723997 L2805 2016 987 673*2^2403606+1 723561 L3035 2016 988 475*2^2403220+1 723444 L4445 2016 989 837*2^2402798+1 723318 L3372 2016 990 Phi(3,-329886^65536) 723303 p379 2015 Generalized unique 991 231*2^2402748+1 723302 L3995 2014 992 375*2^2401881+1 723041 L2805 2016 993 107*2^2401731+1 722996 L3998 2014 994 1023*2^2398601+1 722054 L4414 2016 995 539*2^2398227+1 721941 L4061 2016 996 659*2^2397567+1 721743 L4441 2016 997 40*844^246524+1 721416 L4001 2017 998 465*2^2395133+1 721010 L4088 2016 999 667*2^2394430+1 720799 L4408 2016 1000 15*2^2393365+1 720476 L1349 2010 1001 633*2^2391222+1 719833 L3743 2016 1002 273*2^2388104+1 718894 L3668 2014 1003 1485*2^2386037-1 718272 L1134 2017 1004 399*2^2384115+1 717693 L4412 2016 1005 99*2^2383846+1 717612 L1780 2013 1006 737*2^2382804-1 717299 L191 2007 1007 111*2^2382772+1 717288 L3810 2014 1008 61*2^2381887-1 717022 L2432 2012 1009 321*2^2378535-1 716013 L2017 2018 1010 435*2^2378522+1 716010 L1218 2016 1011 147*2^2375995+1 715248 L1130 2014 1012 915*2^2375923+1 715228 L1741 2016 1013 1981*2^2375591-1 715128 L1134 2017 1014 1129*2^2374562+1 714818 L3035 2016 1015 97*2^2374485-1 714794 L2484 2018 1016 1117*2^2373977-1 714642 L1828 2012 1017 949*2^2372902+1 714318 L4408 2016 1018 659*2^2372657+1 714244 L3035 2016 1019 1365*2^2372586+1 714223 L1134 2016 1020 509*2^2370721+1 713661 L1792 2016 1021 99*2^2370390+1 713561 L1204 2013 1022 959*2^2370077+1 713468 L1502 2016 1023 1135*2^2369808+1 713387 L2520 2016 1024 125*2^2369461+1 713281 L3035 2014 1025 1183953*2^2367907-1 712818 L447 2007 Woodall 1026 57671892869766803925...(712708 other digits)...06520121133805600769 712748 p360 2013 1027 119878*5^1019645-1 712707 L3528 2013 1028 453*2^2367388+1 712658 L3035 2016 1029 150209!+1 712355 p3 2011 Factorial 1030 281*2^2363327+1 711435 L1741 2014 1031 2683*2^2360743-1 710658 L1959 2012 1032 409*2^2360166+1 710484 L1199 2016 1033 305*2^2358854-1 710089 L2017 2018 1034 403*2^2357572+1 709703 L3029 2016 1035 155*2^2357111+1 709564 L3975 2014 1036 365*2^2355607+1 709111 L2117 2016 1037 33706*6^910462+1 708482 L587 2014 1038 1087*2^2352830+1 708276 L1492 2016 1039 179*2^2352291+1 708113 L1741 2014 1040 559*2^2351894+1 707994 L3924 2016 1041d 24573*2^2350824+1 707673 p168 2018 1042 1035*2^2350388+1 707541 L2526 2016 1043 433*2^2348252+1 706897 L2322 2016 1044 329*2^2348105+1 706853 L3029 2016 1045 45*2^2347187+1 706576 L1349 2012 1046 127*2^2346377-1 706332 L282 2009 1047 933*2^2345893+1 706188 L3035 2016 1048 903*2^2345013+1 705923 L2006 2016 1049 33*2^2345001+1 705918 L2322 2013 1050 Phi(3,-242079^65536) 705687 p379 2015 Generalized unique 1051 627*2^2343140+1 705359 L3125 2016 1052 83*2^2342345+1 705119 L2626 2013 1053 277*2^2340182+1 704468 L1158 2014 1054 159*2^2339566+1 704282 L3035 2014 1055 335*2^2338972-1 704104 L2235 2017 1056 1149*2^2336638+1 703402 L4388 2016 1057 339*2^2336421-1 703336 L2519 2017 1058 275293*2^2335007-1 702913 L193 2006 1059 105*2^2334755-1 702834 L1959 2018 1060 228188^131072+1 702323 g124 2010 Generalized Fermat 1061 809*2^2333017+1 702312 L2675 2016 1062 795*2^2332488+1 702152 L3029 2016 1063 435*2^2329948+1 701387 L2322 2016 1064 585*2^2329350+1 701207 L2707 2016 1065 213*2^2328530-1 700960 L1863 2017 1066 1107*2^2327472+1 700642 L3601 2016 1067 435*2^2327152+1 700546 L2337 2016 1068 4161*2^2326875-1 700463 L1959 2016 1069 427*2^2326288+1 700286 L2719 2016 1070 147855!-1 700177 p362 2013 Factorial 1071 451*2^2323952+1 699582 L3173 2016 1072 431*2^2323633+1 699486 L3260 2016 1073 1085*2^2323291+1 699384 L1209 2016 1074 15*2^2323205-1 699356 L2484 2011 1075 1131*2^2322167+1 699045 L1823 2016 1076 385*2^2321502+1 698845 L1129 2016 1077 645*2^2320231+1 698462 L3377 2016 1078 165*2^2319575+1 698264 L2627 2014 1079 809*2^2319373+1 698204 L3924 2016 1080 125098*6^896696+1 697771 L587 2014 1081 65536*5^997872+1 697488 L3802 2014 Generalized Fermat 1082 381*2^2314743+1 696810 L4358 2016 1083 120*825^238890+1 696714 L4837 2018 1084 4063*2^2313843-1 696540 L1959 2016 1085 345*2^2313720-1 696502 L2017 2017 1086 361*2^2312832+1 696235 L3415 2016 Generalized Fermat 1087 1983*366^271591-1 696222 L2054 2012 1088 3*2^2312734-1 696203 L158 2005 1089 53653*2^2311848+1 695941 L2012 2017 1090 873*2^2311086+1 695710 L2526 2016 1091 1033*2^2310976+1 695677 L4352 2016 1092 4063*2^2310187-1 695440 L1959 2016 1093 4063*2^2309263-1 695162 L1959 2016 1094 565*2^2308984+1 695077 L2322 2016 1095 450457*2^2307905-1 694755 L172 2006 1096 1185*2^2306324+1 694276 L4347 2016 1097 537*2^2304115+1 693611 L3267 2016 1098 842*1017^230634-1 693594 L4001 2017 1099 729*2^2303162+1 693324 L1204 2016 Generalized Fermat 1100 641*2^2302879+1 693239 L2051 2016 1101 729*2^2300290+1 692460 L1204 2016 Generalized Fermat 1102 189*2^2299959+1 692359 L2627 2014 1103 659*2^2294393+1 690684 L3378 2016 1104 1087*2^2293345-1 690369 L1828 2011 1105 97768*5^987383-1 690157 L1016 2013 1106 3*2^2291610+1 689844 L753 2008 Divides GF(2291607,3), GF(2291609,5) 1107 319*2^2290722+1 689579 L1792 2015 1108 779*2^2290273+1 689444 L3034 2016 1109 971*2^2289135+1 689102 L4198 2016 1110 399*2^2288691+1 688968 L1990 2015 1111 Phi(3,-180139^65536) 688864 p379 2015 Generalized unique 1112 74270*151^315734-1 687982 L4001 2018 1113 417*2^2284402+1 687677 L2322 2015 1114 130*686^242244+1 687085 L4064 2018 1115 427*2^2282080+1 686978 L3260 2015 1116 109*2^2280194+1 686409 L2520 2014 1117 105*2^2280078-1 686374 L2444 2014 1118 1019*2^2278467+1 685890 L4323 2016 1119 213*2^2277870-1 685710 L1863 2017 1120 547*2^2276648+1 685343 L3260 2015 1121 7913*2^2275664-1 685048 L4036 2015 1122 651*2^2275040+1 684859 L4082 2016 1123 155877*2^2273465-1 684387 L541 2014 1124 739*2^2272938+1 684226 L1209 2016 1125 943*2^2269594+1 683219 L1823 2016 1126b 1286*603^245567+1 682758 L4444 2019 1127 329*2^2266631+1 682327 L4109 2015 1128 739*2^2266602+1 682319 L2520 2016 1129 1151*2^2265761+1 682066 L1823 2016 1130 851*2^2265691+1 682044 L3173 2016 1131 977*2^2265655+1 682034 L2413 2016 1132 2*11171^168429+1 681817 g427 2014 Divides Phi(11171^168429,2) 1133 217*2^2264546+1 681699 L3179 2014 1134 841*2^2264184+1 681591 L1823 2016 Generalized Fermat 1135 93*2^2263894+1 681502 L2826 2013 1136 217499*28^470508-1 680905 p366 2013 1137 963*2^2261357+1 680740 L1300 2016 1138 1065*2^2260193+1 680389 L1204 2016 1139 837*2^2259470+1 680172 L1823 2016 1140 927*2^2258112+1 679763 L4287 2016 1141 265*2^2258071-1 679750 L2484 2018 1142 561*2^2256600+1 679308 L3877 2015 1143 495*2^2255944+1 679110 L4119 2015 1144 129*2^2255199+1 678885 L3049 2014 1145 735*2^2254660+1 678724 L4283 2016 1146 973*2^2254320+1 678621 L1204 2016 1147 275102*151^311399-1 678537 L4001 2018 1148 603*2^2252402+1 678044 L1803 2016 1149 1029*2^2252198+1 677983 L3125 2016 1150 39*2^2251104-1 677652 L177 2015 1151 575*2^2250751+1 677547 L1741 2015 1152 725*2^2250697+1 677531 L2859 2016 1153 65*2^2250637+1 677512 L3487 2013 1154 14641*2^2250096+1 677351 L181 2017 Generalized Fermat 1155 187*2^2249974+1 677312 L2322 2014 1156 141*2^2249967+1 677310 L3877 2014 1157 459*2^2249183+1 677075 L3877 2015 1158 319*2^2248914+1 676994 L2322 2015 1159 569*2^2248709+1 676932 L4133 2015 1160 221*2^2248363+1 676828 L1130 2014 1161 144912*151^310514-1 676609 L4001 2018 1162 649*2^2247490+1 676565 L1204 2016 1163 374565*2^2247391+1 676538 L3532 2013 Generalized Cullen 1164 721*2^2246420+1 676243 L3037 2016 1165 875*2^2246363+1 676226 L2859 2016 1166 3888*931^227714-1 676075 L4001 2018 1167 347*2^2245598-1 675995 L2519 2017 1168 1199*2^2244631+1 675705 L3593 2016 1169 197*2^2244347+1 675619 L1129 2014 1170 5055*2^2242777-1 675147 L4036 2015 1171 651*2^2241783+1 674847 L3260 2016 1172 35*2^2241049+1 674625 L2742 2013 1173 4161*2^2240358-1 674419 L1959 2016 1174 164978*151^309413-1 674210 L4001 2018 1175 146*447^254042-1 673292 L4001 2018 1176 675*2^2236244+1 673180 L4191 2016 1177 615*2^2235833+1 673056 L1823 2016 1178 53069*28^465060-1 673021 p257 2016 1179 831*2^2235253+1 672882 L3432 2013 1180 185*2^2235003+1 672806 L2322 2014 1181 103*2^2234536+1 672665 L3865 2014 1182 885*2^2234318+1 672600 L3125 2016 1183 963*2^2234249+1 672579 L1823 2016 1184 305*2^2233655+1 672400 L4118 2015 1185 267*2^2233376+1 672316 L1792 2014 1186 103*2^2232551-1 672067 L2484 2013 1187 889*2^2231034+1 671612 L2526 2016 1188 907*2^2230776+1 671534 L4269 2016 1189 11*2^2230369+1 671410 L2561 2011 Divides GF(2230368,3) 1190 1425*2^2229009+1 671002 L1134 2016 1191 747*2^2228814+1 670943 L2526 2016 1192 969*2^2228379+1 670812 L4262 2016 1193 887*2^2228179+1 670752 L2840 2015 1194 130816^131072+1 670651 g308 2003 Generalized Fermat 1195 1123*2^2227338+1 670499 L3924 2015 1196 213*2^2226329+1 670195 L2125 2014 1197 505*2^2225296+1 669884 L4111 2015 1198 271*2^2223601-1 669374 L2484 2018 1199 325*2^2223243-1 669266 L2235 2016 1200 84363*2^2222321+1 668991 L541 2014 1201 2516745*2^2222222+1 668962 p396 2017 1202 7043*48^397817-1 668831 p255 2016 1203 1137*2^2221062+1 668610 L4040 2015 1204 152*806^229984-1 668413 L4001 2018 1205 1031*2^2218785+1 667924 L1204 2015 1206 911*2^2218151+1 667733 L3260 2015 1207 27*2^2218064+1 667706 L690 2009 1208 587*2^2217355+1 667494 L4109 2015 1209 547*2^2216110+1 667119 L2322 2015 1210 67*2^2215581-1 666959 L268 2010 1211 33*2^2215291-1 666871 L3345 2013 1212 157533*2^2214598-1 666666 L3494 2013 1213 1105*2^2213846+1 666438 L2321 2015 1214 33*2^2212971-1 666173 L3345 2013 1215 101*2^2212769+1 666112 L1741 2014 1216 3*10^665829+1 665830 p300 2012 1217 631*2^2210260+1 665358 L2322 2015 1218 479*2^2209541+1 665141 L4106 2015 1219 165*2^2207550-1 664541 L2055 2011 1220 819*2^2206370+1 664187 L2526 2015 1221 19*2^2206266+1 664154 p189 2006 1222 45*2^2205977-1 664067 L1862 2015 1223 2*179^294739+1 664004 g424 2011 Divides Phi(179^294739,2) 1224 73*416^253392+1 663660 L3610 2015 1225 Phi(3,-16159^78732) 662674 p294 2014 Generalized unique 1226 1041*2^2201196+1 662630 L3719 2015 1227 481*2^2201148+1 662615 L1741 2015 1228 1344*73^355570+1 662545 L3610 2014 1229 783*2^2200256+1 662346 L3924 2015 1230 969*2^2200223+1 662337 L1209 2015 1231 173*2^2199301+1 662058 L1204 2014 1232 5077*2^2198565-1 661838 L251 2008 1233 114487*2^2198389-1 661787 L179 2006 1234 1035*2^2197489+1 661514 L2517 2014 1235 903*2^2197294+1 661455 L2322 2014 1236 404882*43^404882-1 661368 p310 2011 Generalized Woodall 1237b 638*520^243506-1 661366 L4877 2019 1238 256*3^1384608+1 660629 L3802 2014 Generalized Fermat 1239 2*10271^164621+1 660397 g427 2014 Divides Phi(10271^164621,2) 1240 10880*151^302997-1 660228 L4001 2018 1241 1073*2^2193069+1 660183 L2487 2014 1242f 169*2^2193049-1 660176 L2484 2018 1243 202064*151^302700-1 659582 L4001 2018 1244 2*659^233973+1 659544 g424 2015 Divides Phi(659^233973,2) 1245 819*2^2190853+1 659516 L3234 2014 1246 1179*2^2189870+1 659220 L2517 2014 1247 269*2^2189235+1 659028 L1204 2014 1248 39*2^2188855+1 658913 p286 2013 1249 433*2^2188076+1 658680 L3855 2014 1250 815*2^2185439+1 657886 L3035 2014 1251 249*2^2185003+1 657754 L1300 2014 1252 585*2^2184510+1 657606 L3838 2014 1253 1033*2^2183858+1 657410 L3865 2014 1254 1035*2^2183770+1 657384 L3514 2014 1255 193020*151^301686-1 657373 L4001 2018 1256 1179*2^2182691+1 657059 L2163 2014 1257 2*191^287901+1 656713 g424 2015 Divides Phi(191^287901,2) 1258 525*2^2180848+1 656504 L3797 2014 1259 1107*2^2180142+1 656292 L1741 2014 1260 447*2^2180102+1 656279 L3760 2014 1261 315*2^2179612-1 656132 L2235 2015 1262 1423*2^2179023-1 655955 L3887 2015 1263 995*2^2178819+1 655893 L1741 2014 1264 1423*2^2178363-1 655756 L3887 2015 1265 196597*2^2178109-1 655682 L175 2006 1266 879*2^2177186+1 655402 L2981 2014 1267a 67*410^250678+1 654970 L4444 2019 1268 70082*5^936972-1 654921 L3523 2013 1269 699*2^2175031+1 654753 L3865 2014 1270 69*2^2174213-1 654506 L2055 2012 1271 1069*2^2174122+1 654479 L3865 2014 1272 793*2^2173720+1 654358 L2322 2014 1273 651*2^2173159+1 654189 L3864 2014 1274 10001*2^2172615+1 654027 L4405 2018 1275 1011*2^2172063+1 653860 L2826 2014 1276 1105*2^2171956+1 653827 L3035 2014 1277 4165*2^2171145-1 653584 L1959 2017 1278 Phi(3,-96873^65536) 653552 L4026 2014 Generalized unique 1279 739*2^2170786+1 653475 L2121 2014 1280 701*2^2169041+1 652950 L3863 2014 1281 295*2^2168448+1 652771 L1935 2014 1282 7*2^2167800+1 652574 g279 2007 Divides Fermat F(2167797), GF(2167799,5), GF(2167799,10) 1283 359*2^2165551+1 651899 L3838 2014 1284 1059*2^2164149+1 651477 L2322 2014 1285 329*2^2163717+1 651347 L2117 2014 1286 559*2^2163382+1 651246 L1741 2014 1287 775*2^2162344+1 650934 L3588 2014 1288 21*2^2160479-1 650371 L2074 2012 1289 102976*5^929801-1 649909 L3313 2013 1290 1179*2^2158475+1 649769 L3035 2014 Divides GF(2158470,6) 1291 617*2^2156699+1 649234 L1675 2014 1292 65536*3^1360576+1 649165 L3802 2014 Generalized Fermat 1293 2*3^1360104-1 648935 p390 2015 1294 483*2^2155456+1 648860 L3760 2014 1295 105*2^2155392+1 648840 L3580 2014 1296 40*1017^215605+1 648396 L4927 2018 1297 31340*6^833096+1 648280 p271 2013 1298 427*2^2153306+1 648213 L3838 2014 1299 261*2^2152805+1 648062 L1125 2014 1300 371*2^2150871+1 647480 L2545 2014 1301 111*2^2150802-1 647458 L2484 2013 1302 357*2^2148518+1 646771 L1741 2014 1303 993*2^2148205+1 646678 L1741 2014 1304 67*2^2148060+1 646633 L3276 2013 1305 243*2^2147387-1 646431 L2444 2014 1306 693*2^2147024+1 646322 L3862 2014 1307 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) 1308 143157*2^2144728+1 645633 L4504 2016 1309 509*2^2144181+1 645466 L3035 2014 1310 753*2^2143388+1 645227 L2583 2014 Divides GF(2143383,3) 1311 161*2^2142431+1 644939 L3105 2014 1312 25*2^2141884+1 644773 L1741 2011 Divides Fermat F(2141872), GF(2141871,5), GF(2141872,10); generalized Fermat 1313 23*2^2141626-1 644696 L545 2008 1314 519*2^2140311+1 644301 L2659 2014 1315 7*2^2139912+1 644179 g279 2007 Divides GF(2139911,12) 1316 315*2^2139665+1 644106 L3838 2014 1317 193*2^2139400+1 644026 L3538 2014 1318 1113*2^2139060+1 643925 L3914 2014 1319 292402*159^292402+1 643699 g407 2012 Generalized Cullen 1320 307*2^2137553-1 643471 L2235 2015 1321 1051*2^2137440+1 643437 L3865 2014 1322 1185*2^2137344+1 643408 L3877 2014 1323 405*2^2137280-1 643388 L1862 2016 1324 513*2^2135642+1 642896 L3843 2014 1325 241*2^2135279-1 642786 L2484 2018 1326 915*2^2135151+1 642748 L2322 2014 1327 61*2^2134577-1 642574 L2055 2011 1328 711*2^2132477+1 641943 L2125 2014 1329 215*2^2131988-1 641795 L2484 2018 1330 319*2^2130729-1 641416 L1817 2015 1331 78792*151^294324-1 641331 L4001 2018 1332 75*2^2130432-1 641326 L2055 2011 1333 1145*2^2130307+1 641290 L3909 2014 1334 110488*5^917100+1 641031 L3354 2013 1335 37*2^2128328+1 640693 L3422 2013 1336 103*2^2128242+1 640667 L3787 2014 1337c 3762*70^347127+1 640487 L4876 2019 1338 253*2^2126968+1 640284 L1935 2014 1339 583*2^2126166+1 640043 L1741 2014 1340 999*2^2125575+1 639865 L1741 2014 1341 587*2^2124947+1 639676 L3838 2014 1342 451*2^2124636+1 639582 L1741 2014 1343 887*2^2124027+1 639399 L3865 2014 1344 693*2^2121393+1 638606 L3278 2014 1345 8331405*2^2120345-1 638295 L2055 2013 1346 975*2^2119209+1 637949 L1158 2014 1347 33*2^2118570-1 637755 L3345 2013 1348 254*5^911506-1 637118 p292 2010 1349 1139*2^2115949+1 636968 L3865 2014 1350 771*2^2115741+1 636905 L1675 2014 1351 411*2^2115559+1 636850 L2840 2014 1352 189*2^2115473+1 636824 L3784 2014 Divides GF(2115468,6) 1353 929*2^2114679+1 636585 L3035 2014 1354 1065*2^2113463+1 636219 L2826 2014 1355 591*2^2111001+1 635478 L1360 2014 1356 1051*2^2109344+1 634979 L3035 2014 1357 433*2^2109146+1 634919 L1935 2014 1358 519*2^2108910+1 634848 L1356 2014 1359 1047*2^2108751+1 634801 L3824 2014 1360 765*2^2106027+1 633981 L3838 2014 1361 503*2^2106013+1 633976 L1741 2014 1362 316903*10^633806+1 633812 L3532 2014 Generalized Cullen 1363 113*2^2104825+1 633618 L3785 2014 1364 381*2^2103999+1 633370 L2322 2014 1365 1246461300659*2^2103424-1 633206 L2484 2015 1366 57*2^2103370-1 633180 L2055 2011 1367 539*2^2102167+1 632819 L3125 2014 1368 687*2^2100243+1 632239 L3867 2014 1369 329*2^2099771+1 632097 L2507 2014 1370 35*2^2099769+1 632095 L3432 2013 1371 405*2^2099716+1 632081 L3154 2014 1372 575*2^2098483+1 631710 L3168 2014 1373e 208703*2^2097153+1 631312 L466 2018 1374 28401*2^2097152+1 631311 L4547 2017 1375 907*2^2095896+1 630931 L1129 2014 1376a 815730721*2^2095440+1 630800 L466 2019 Generalized Fermat 1377 2503*2^2094587-1 630537 L4113 2017 1378 14641*2^2093384+1 630176 L181 2017 Generalized Fermat 1379 103*2^2093350+1 630164 L3432 2013 1380 4001*2^2093286-1 630146 L1959 2014 1381 14172*1027^209226-1 630103 L4001 2018 1382 369*2^2093022+1 630065 L3514 2014 1383 217*2^2092673-1 629960 L2484 2018 1384 68*920^212407+1 629532 L4001 2017 1385 165*2^2090645+1 629350 L1209 2014 1386 1119*2^2090509+1 629309 L2520 2014 1387 941*2^2090243+1 629229 L1356 2014 1388 62722^131072+1 628808 g308 2003 Generalized Fermat 1389 401*2^2088713+1 628768 L3035 2014 1390 819*2^2088423+1 628681 L3890 2014 1391 1009*2^2087690+1 628461 L3728 2014 1392 85*2^2087651-1 628448 L2338 2013 1393 467*2^2085835+1 627902 L3625 2014 1394 563528*13^563528-1 627745 p262 2009 Generalized Woodall 1395 437960*3^1313880+1 626886 L2777 2012 Generalized Cullen 1396 247*2^2082202+1 626808 L3294 2014 1397 107*2^2081775+1 626679 L3432 2013 Divides GF(2081774,6) 1398b 159*2^2081069-1 626467 L1959 2019 1399 27*634^223550+1 626409 L4001 2018 1400 655*2^2080562+1 626315 L3859 2014 1401 201*2^2080464+1 626285 L1741 2014 1402 269328*211^269328+1 626000 p354 2012 Generalized Cullen 1403 153*2^2079401+1 625965 L3601 2014 1404 279*2^2079167+1 625895 L2413 2014 1405c 692*95^316400-1 625755 L4444 2019 1406 643*2^2078306+1 625636 L3035 2014 1407 79*2^2078162+1 625591 L2117 2013 1408 1485*2^2077172+1 625295 L1134 2015 1409 239*2^2076663+1 625141 L2413 2014 1410 1003*2^2076535-1 625103 L51 2008 1411 2186*7^739474-1 624932 p258 2011 1412 73*2^2075936+1 624921 L3464 2013 1413 807*2^2075519+1 624797 L3555 2014 1414 1425*2^2075382+1 624756 L1134 2015 1415 65*2^2073229+1 624106 L1480 2013 1416 693*2^2072564+1 623907 L3290 2014 1417 375*2^2071598+1 623616 L2413 2014 1418 73*2^2071592+1 623614 L1480 2013 1419 125*2^2071555+1 623603 L3432 2013 1420 1107*2^2071480+1 623581 L2520 2014 1421 6207*28^430803-1 623444 L1471 2014 1422 299*2^2070979+1 623430 L1741 2014 1423 99*2^2070908-1 623408 L1862 2015 1424 19062*1027^206877-1 623029 L4444 2018 1425 891*2^2069024+1 622842 L2520 2014 1426 943*2^2068944+1 622818 L1741 2014 1427 579*2^2068647+1 622728 L2967 2014 1428 911*2^2068497+1 622683 L1741 2014 1429 1005*2^2067272+1 622314 L3895 2014 1430 393*2^2066540+1 622094 L3700 2014 1431 951*2^2065180+1 621685 L1403 2014 1432 915*2^2064663+1 621529 L3035 2014 1433 213*2^2064426-1 621457 L1863 2017 1434 29*468^232718+1 621416 L4832 2018 1435 1455*2^2064103-1 621361 L1134 2016 1436 9*2^2060941-1 620407 L503 2008 1437 1455*2^2059553+1 619991 L1134 2015 1438 659*2^2058623+1 619711 L3860 2014 1439 128448*151^284308-1 619506 L4001 2018 1440 575*2^2056081+1 618945 L1935 2014 1441 1095*2^2055975+1 618914 L3518 2014 1442 3*10^618853+1 618854 p300 2012 1443 819*2^2054470+1 618461 L2826 2014 1444 969*2^2054054+1 618335 L3668 2014 1445 3394*28^427262+1 618320 p385 2015 1446 318564*151^283711-1 618206 L4444 2018 1447 675*2^2053578+1 618192 L1792 2014 1448 178998*151^283702-1 618186 L4001 2018 1449 739*2^2051658+1 617614 L3838 2014 1450 71*2^2051313+1 617509 L1480 2013 1451 265*2^2051155-1 617462 L2484 2018 1452 779*2^2050881+1 617380 L3453 2014 1453 75*2^2050637-1 617306 L2055 2011 1454 935*2^2050113+1 617149 L3696 2014 1455 847*2^2049400+1 616934 L2322 2014 1456 73*2^2048754+1 616739 L3432 2013 1457 527*2^2045751+1 615836 L4123 2014 1458 785*2^2045419+1 615736 L3861 2014 1459 195*2^2044789+1 615546 L3744 2014 1460 537*2^2044162+1 615357 L1741 2014 1461 413*2^2043829+1 615257 L1300 2014 1462 345*2^2042295+1 614795 L2562 2014 1463 216848*151^282017-1 614514 L4700 2018 1464 104*579^222402-1 614428 L4001 2018 1465 1069*2^2039562+1 613973 L1741 2014 1466 625*2^2039416+1 613929 L1741 2014 Generalized Fermat 1467 1085*2^2038005+1 613504 L2520 2014 1468 125*2^2037752-1 613427 L2444 2014 1469 1069*2^2036902+1 613172 L3876 2014 1470 417*2^2036482+1 613045 L1847 2014 1471 701*2^2035955+1 612887 L2823 2014 1472 1025*2^2034405+1 612420 L1741 2014 1473 651*2^2034352+1 612404 L3459 2014 1474 121*2^2033941-1 612280 L162 2006 1475 57*2^2033643+1 612190 L3432 2013 1476 4175*2^2032552-1 611863 L1959 2017 1477 249*2^2031803+1 611637 L2327 2014 1478 783*2^2031629+1 611585 L2126 2014 1479a (290^124116-1)^2-2 611246 p403 2019 1480 4157*2^2029894-1 611063 L1959 2017 1481 293028*151^280273-1 610714 L4001 2018 1482 285*2^2028495+1 610641 L2594 2014 1483 775*2^2027562+1 610360 L1204 2014 1484 199*686^215171-1 610297 L4001 2018 1485 621*2^2026864+1 610150 L3446 2014 1486 357*2^2026846+1 610144 L2163 2014 1487 122112*151^279966-1 610045 L4001 2018 1488 879*2^2026501+1 610041 L1139 2014 1489 4185*2^2026400-1 610011 L1959 2017 1490 787*2^2026242+1 609963 L2122 2014 1491 919*2^2024094+1 609316 L1741 2014 1492 325*2^2024035-1 609298 L4076 2015 1493 235*2^2023486+1 609133 L2594 2014 1494 195*2^2023030+1 608996 L4122 2014 1495 8*10^608989-1 608990 p297 2011 Near-repdigit 1496 1485*2^2022873+1 608949 L1134 2015 1497 233*2^2022801+1 608927 L3767 2014 1498 521*2^2022059+1 608704 L3760 2014 1499 5678*1027^202018-1 608396 L4001 2018 1500 94*790^209857+1 608090 L4001 2018 1501 431*2^2019693+1 607991 L2100 2014 1502 1155*2^2019244+1 607857 L3873 2014 1503 195*2^2018866+1 607742 L2413 2014 1504 59506*6^780877+1 607646 p254 2013 1505 4101*2^2018133-1 607523 L1959 2017 1506 4081*2^2015959-1 606868 L1959 2017 1507 4191*2^2015150-1 606625 L1959 2017 1508 45*2^2014557+1 606444 L1349 2012 Divides GF(2014552,10) 1509 251749*2^2013995-1 606279 L436 2007 Woodall 1510 126*523^222906-1 605973 L4001 2017 1511 1023*2^2012570+1 605847 L1741 2014 1512 403*2^2012412+1 605799 L3538 2014 1513 1173*2^2012185+1 605732 L1413 2014 1514f 85*730^211537+1 605701 L4001 2018 1515 Phi(3,-1449889^49152) 605684 L4142 2017 Generalized unique 1516 751*2^2010924+1 605352 L3859 2014 1517 101*2^2009735+1 604993 L3432 2013 1518 1069*2^2008558+1 604640 L1595 2014 1519 881*2^2008309+1 604565 L3260 2014 1520 959*2^2008035+1 604482 L1422 2014 1521 633*2^2007897+1 604441 L3857 2014 1522 143*2^2007888-1 604437 L384 2016 1523b 4*5^864751-1 604436 L4881 2019 1524 223*2^2007748+1 604395 L1741 2014 1525 461*2^2007631+1 604360 L1300 2014 1526 477*2^2006719+1 604086 L3803 2014 1527 428551*2^2006520+1 604029 g411 2011 1528 1097*2^2005203+1 603630 L3868 2014 1529 Phi(3,-1373894^49152) 603386 L4142 2016 Generalized unique 1530 493*2^2002964+1 602955 L3800 2014 1531 315*2^2002904+1 602937 L3790 2014 1532 77*2^2002742-1 602888 L2074 2013 1533 585*2^2002589+1 602843 L3035 2014 1534 1059*2^2001821+1 602612 L2103 2014 1535 249*2^2001627-1 602553 L1862 2015 1536 1115*2^2000291+1 602151 L3588 2014 1537 891*2^2000268+1 602144 L3440 2014 1538 343388*151^276191-1 601820 L4700 2018 1539 657*2^1998854+1 601718 L2520 2013 Divides GF(1998852,10) 1540 Phi(3,-1316236^49152) 601555 L4142 2016 Generalized unique 1541 573*2^1998232+1 601531 L1300 2013 1542 1323*2^1998103-1 601493 L1828 2016 1543 Phi(3,-1310544^49152) 601370 L4142 2016 Generalized unique 1544 669*2^1995918+1 600835 L2659 2013 1545 19861029*2^1995311-1 600656 L895 2013 1546 261*2^1995105+1 600589 L3378 2013 1547 68398*1027^199397+1 600503 L4001 2018 1548 1031*2^1994741+1 600480 L2626 2014 1549 577*2^1994634+1 600448 L3035 2013 1550 497*2^1994051+1 600272 L2413 2013 1551 8331405*2^1993674-1 600163 L260 2011 1552 467917*2^1993429-1 600088 L160 2005 1553 137137*2^1993201-1 600019 L321 2007 1554 589*2^1992774+1 599888 L2322 2013 1555 209*2^1992071+1 599676 L3422 2013 1556 317*2^1991592-1 599532 L1809 2014 1557 Phi(3,-1249158^49152) 599322 L4142 2016 Generalized unique 1558 547*2^1990606+1 599235 L3173 2013 1559 17*2^1990299+1 599141 g267 2006 Divides GF(1990298,3) 1560 508*1017^199220-1 599122 L4700 2017 1561 105*2^1989208-1 598814 L1959 2014 1562 1019*2^1988959+1 598740 L3514 2013 1563 1455*2^1988795-1 598691 L1134 2015 1564 629*2^1988579+1 598625 L2117 2013 1565 101*2^1988279+1 598534 L3141 2013 Divides GF(1988278,12) 1566 733*2^1988086+1 598477 L3502 2013 1567 135*2^1987735+1 598370 L1300 2013 1568 162434*5^856004-1 598327 L3410 2013 1569 749*2^1986977+1 598143 L1492 2013 1570 4141*2^1986959-1 598138 L1959 2016 1571 174344*5^855138-1 597722 L3354 2013 1572 6292*1027^198459+1 597678 L4001 2018 1573 4125*2^1984855-1 597505 L1959 2017 1574 8331405*2^1984565-1 597421 L260 2011 1575 1133*2^1984488-1 597394 L1828 2016 1576 195*2^1983875-1 597209 L1828 2014 1577 445*2^1980900+1 596313 L3577 2013 1578 731*2^1980503+1 596194 L3035 2013 1579 1147*2^1978390+1 595558 L1741 2013 1580 25*2^1977369-1 595249 L426 2008 1581 245478*151^273168-1 595233 L4001 2018 1582 1197*2^1977152-1 595186 L1828 2016 1583c 1234*95^300749-1 594802 L4444 2019 1584 866*183^262883+1 594763 L3610 2015 1585 1149*2^1975451-1 594674 L1828 2016 1586 381*2^1974841-1 594489 L1809 2014 1587 19920911*2^1974666-1 594441 L806 2017 1588 Phi(3,-1109580^49152) 594264 L4142 2016 Generalized unique 1589 148323*2^1973319-1 594034 L587 2011 1590 705*2^1972428+1 593763 L3043 2013 1591 549*2^1971183+1 593388 L2840 2013 1592 4197*2^1970430-1 593163 L1959 2016 1593 1387*2^1970033-1 593043 L1828 2016 1594 441*2^1968431+1 592560 L3035 2013 1595 1485*2^1968400-1 592551 L1134 2014 1596 1159*2^1968190+1 592488 L3035 2013 1597 731*2^1968039+1 592442 L3682 2013 1598 833*2^1967841+1 592383 L3744 2013 1599 989*2^1967819+1 592376 L3738 2013 1600 1035*2^1967708+1 592343 L3739 2013 1601 1309*2^1967613-1 592314 L1828 2016 1602 4025*2^1966732-1 592049 L1959 2016 1603 203*2^1966689+1 592035 L1408 2013 1604 101594*151^271697-1 592027 L4001 2018 1605 273*2^1966630+1 592018 L2532 2013 1606 93*2^1965880+1 591791 L1210 2011 1607 253*2^1965215-1 591592 L3345 2012 1608 1089*2^1964781+1 591462 L3737 2013 1609 10*173^264234+1 591369 L1471 2015 1610 1089*2^1964474+1 591369 L3736 2013 Generalized Fermat 1611 125*2^1963964-1 591215 L1959 2014 1612 Phi(3,-1020993^49152) 590711 L4142 2016 Generalized unique 1613 175*2^1962288+1 590710 L2137 2013 Divides GF(1962284,10) 1614 4065*2^1961907-1 590597 L1959 2016 1615 113*2^1960341+1 590124 L3091 2013 1616 57406*5^844253-1 590113 L3313 2012 1617 225*2^1960083+1 590047 L3548 2013 Divides GF(1960078,6) 1618 1111*2^1959625-1 589909 L1828 2016 1619 803*2^1959445+1 589855 L2724 2013 1620 45*2^1957377-1 589231 L1862 2014 1621 1065*2^1957291-1 589207 L1828 2016 1622 1149*2^1957223+1 589186 L1935 2013 1623 6326*333^233552+1 589126 L4001 2017 1624 129*2^1956915+1 589093 L2826 2013 1625 229*2^1956294+1 588906 L3548 2013 1626 74*500^218184-1 588874 p355 2013 1627 1045*2^1955356+1 588624 L1186 2013 1628 112*113^286643-1 588503 L426 2012 1629 1137*2^1954730+1 588436 L3733 2013 1630 673*2^1954456+1 588353 L3666 2013 1631 Phi(3,-965206^49152) 588313 L4142 2017 Generalized unique 1632 121*2^1954243-1 588288 L162 2006 1633 351*2^1954003+1 588217 L2413 2013 1634 641*2^1952941+1 587897 L3487 2013 1635 188378*151^269725-1 587730 L4001 2018 1636 4027*2^1951909-1 587587 L1959 2016 1637 Phi(3,94259^59049) 587458 p269 2014 Generalized unique 1638 1173*2^1951169+1 587364 L3171 2013 1639 1101*2^1950812+1 587256 L2719 2013 1640 4007*2^1949916-1 586987 L1959 2016 1641 313*2^1949544+1 586874 L2520 2013 1642 391*2^1949159-1 586758 L2519 2014 1643 539*2^1949135+1 586751 L1130 2013 1644 1167*2^1949013-1 586715 L1828 2016 1645 351*2^1947281-1 586193 L1809 2014 1646 21290*745^203998-1 585919 L4189 2017 1647 111*2^1946322-1 585904 L2484 2012 1648 1209*2^1946260-1 585886 L1828 2016 1649 1339*2^1945965-1 585797 L1828 2016 1650 149*2^1945668-1 585707 L3967 2015 1651 4011*2^1945630-1 585697 L1959 2016 1652 639*2^1945473+1 585649 L2649 2013 1653 675*2^1945232+1 585577 L3688 2013 1654 30364*1027^194319+1 585210 L4001 2018 1655 417*2^1943755+1 585132 L3173 2013 1656 89*2^1943337+1 585005 L2413 2011 1657 Phi(3,-889529^49152) 584827 L4142 2016 Generalized unique 1658 269*2^1942389+1 584720 L3548 2013 1659 4173*2^1941820-1 584550 L1959 2016 1660 1093*2^1941672+1 584505 L2322 2013 1661 193*2^1940804+1 584243 L3418 2013 1662 827*2^1940747+1 584226 L3206 2013 1663 221*2^1940211+1 584065 L2327 2013 1664 Phi(3,-872232^49152) 583988 L4142 2017 Generalized unique 1665 575*2^1938673+1 583602 L2019 2013 1666 1179*2^1938570+1 583571 L1300 2013 1667 865*2^1938180+1 583454 L3233 2013 1668 17702*1027^193732-1 583442 L4700 2018 1669 1091*2^1937857+1 583357 L3731 2013 1670 555*2^1937595+1 583277 L2826 2013 1671 9299*2^1937309+1 583193 L3886 2014 1672 30*386^225439+1 583120 L3610 2015 1673 34910*430^221380-1 583002 L4001 2015 1674 56064*1027^193573+1 582964 L4700 2018 1675 239*2^1936025+1 582804 L1741 2013 1676 1191*2^1935613-1 582681 L1828 2016 1677 4047*2^1934881-1 582461 L1959 2016 1678 357*2^1934704-1 582407 L1809 2014 1679 182627*2^1934664-1 582398 L3336 2012 1680a 64*497^215875-1 582078 L4925 2019 1681 14172*1027^193213-1 581879 L4001 2018 1682 363*2^1932724+1 581811 L3171 2013 1683 1265*2^1932660-1 581792 L1828 2016 1684 143*2^1932112-1 581626 L1828 2012 1685 48764*5^831946-1 581510 L3313 2012 1686 1095*2^1931213-1 581357 L1828 2016 1687 1365*2^1931200+1 581353 L1134 2016 1688 387*2^1930200+1 581051 L1129 2013 1689 2135489665061*2^1929362-1 580809 L2484 2015 1690 1101*2^1929297-1 580780 L1828 2016 1691 735*2^1929225+1 580758 L3378 2013 1692 214519*2^1929114+1 580727 g346 2006 1693 1071*2^1928515-1 580544 L1828 2016 1694 2*47^346759+1 579816 g424 2011 Divides Phi(47^346759,2) 1695 633*2^1925684+1 579692 L1408 2013 1696 1283*2^1924402-1 579306 L1828 2016 1697 1005*2^1923658+1 579082 L3514 2013 1698 243*2^1923567-1 579054 L2055 2011 1699 4005*2^1923385-1 579001 L1959 2016 1700 319*2^1923378+1 578997 L3548 2013 1701 280992*151^265553-1 578640 L4001 2018 1702 851*2^1922179+1 578637 L3180 2013 1703 625*2^1921056+1 578299 L3378 2013 Generalized Fermat 1704 157*2^1920152+1 578026 L2494 2013 1705d 14066*60^324990+1 577886 L4444 2018 1706 143171*2^1918679+1 577586 L4504 2017 1707 1187*2^1918188-1 577436 L1828 2015 1708 Phi(3,-747624^49152) 577407 L4142 2016 Generalized unique 1709 75492*151^264966-1 577360 L4444 2018 1710 1071*2^1917749-1 577304 L1828 2015 1711 335*2^1917610-1 577261 L1809 2014 1712 51*712^202369-1 577256 L4001 2018 1713 133631*28^398790-1 577118 p255 2013 1714 191*2^1916611+1 576960 L1792 2013 1715 1087*2^1916212+1 576841 L2719 2013 1716 1065*2^1916200-1 576837 L1828 2015 1717 1125*2^1915695+1 576685 L3719 2013 1718 Phi(3,-731896^49152) 576499 L4142 2016 Generalized unique 1719 63348*1027^191392+1 576396 L4001 2018 1720 93788*151^264402-1 576131 L4001 2018 1721 207*2^1913067+1 575893 L1741 2013 1722 80618*151^264291-1 575889 L4001 2018 1723 849*2^1913021+1 575880 L2413 2013 1724 72844*1027^191206+1 575836 L4001 2018 1725 85*2^1910520+1 575126 L2703 2011 1726 267*2^1909876-1 574933 L1828 2013 1727 4103*2^1909766-1 574901 L1959 2016 1728 621*2^1909716+1 574885 L2117 2013 1729 611*2^1909525+1 574828 L2413 2013 1730 379*2^1909097-1 574699 L1809 2014 1731 435*2^1908579+1 574543 L3385 2013 1732 4035*2^1907685-1 574275 L1959 2016 1733 291*2^1907541-1 574230 L2484 2013 1734 573*2^1907450+1 574203 L2520 2013 1735 14*814^197138-1 573796 L4001 2018 1736 263*2^1904406-1 573286 L2484 2015 1737 969*2^1904357+1 573272 L2719 2013 1738 27*2^1902689-1 572768 L1153 2009 1739 553*2^1902102+1 572593 L2520 2013 1740 4171*2^1901433-1 572392 L1959 2016 1741 271562*151^262431-1 571837 L4001 2018 1742 1323*2^1899548-1 571825 L1828 2014 1743 4806*37^364466-1 571560 L4001 2015 1744 633*2^1897632+1 571247 L1741 2013 1745 1131*2^1897379-1 571172 L1828 2014 1746 707*2^1895035+1 570466 L3035 2013 1747 3945*2^1894329-1 570254 L4036 2015 1748 Phi(3,-628716^49152) 570012 L4142 2016 Generalized unique 1749 4157*2^1892772-1 569785 L1959 2015 1750f 154*730^198988+1 569770 L4001 2018 1751 1053*2^1891799-1 569492 L1828 2014 1752 687*2^1891730+1 569471 L3221 2013 1753 87*2^1891391+1 569368 L2673 2011 1754 85287*2^1890011+1 568955 p254 2011 1755 221*2^1889983+1 568944 L1741 2013 1756 585*2^1887819+1 568293 L3171 2013 1757 347*2^1887507+1 568199 L3548 2013 1758 391*2^1886863-1 568005 L1809 2014 1759 791*2^1885961+1 567734 L3075 2013 1760 975*2^1885724+1 567663 L1129 2013 1761 22*615^203539-1 567647 L4001 2018 1762 987*2^1885160+1 567493 L2070 2013 1763 Phi(3,-590826^49152) 567358 L4142 2017 Generalized unique 1764 744716047603963*2^1884575-1 567329 L257 2013 1765 485*2^1884579+1 567318 L3548 2013 1766 879*2^1883385+1 566959 L3223 2013 1767 815730721*2^1882432+1 566678 L466 2018 Generalized Fermat 1768 693*2^1881882+1 566506 L2322 2013 1769 30*7^670289+1 566462 L3610 2014 1770 639*2^1880451+1 566075 L3141 2013 1771 277*2^1880022+1 565946 L3418 2013 1772 46498*1027^187913+1 565918 L4001 2018 1773 2655*2^1879275-1 565722 L2484 2018 1774 89*2^1879132-1 565678 L1828 2013 1775 441*2^1879067+1 565659 L2840 2013 1776 283*2^1879051-1 565654 L2484 2015 1777 729*2^1877995+1 565336 L1792 2013 1778 645*2^1877756+1 565264 L2981 2013 1779 Phi(3,-561180^49152) 565160 L4142 2017 Generalized unique 1780 613*2^1876758+1 564964 L2413 2013 1781 267*2^1876604+1 564917 L1792 2013 1782 345067*2^1876573-1 564911 g59 2005 1783 1063*2^1876427-1 564864 L1828 2014 1784 1389*2^1876376-1 564849 L1828 2014 1785 1183414*3^1183414+1 564639 L2841 2014 Generalized Cullen 1786 4015*2^1875453-1 564572 L1959 2014 1787 1043*2^1875213+1 564499 L2413 2013 1788 1209*2^1874804-1 564376 L1828 2014 1789 4125*2^1874718-1 564350 L1959 2015 1790 1199*2^1874495+1 564283 L2827 2013 1791 495*2^1874077+1 564157 L1344 2013 1792 71*2^1873569+1 564003 L1223 2011 Divides GF(1873568,5) 1793 Phi(3,-544951^49152) 563907 L4142 2017 Generalized unique 1794 21*2^1872923-1 563808 L2074 2012 1795 4039*2^1872875-1 563796 L1959 2015 1796 357*2^1871600-1 563411 L2519 2014 1797 1309*2^1871045-1 563244 L1828 2014 1798 Phi(3,-533612^49152) 563010 L4142 2017 Generalized unique 1799 735*2^1870118+1 562965 L3075 2013 1800 575*2^1869989+1 562926 L3650 2013 1801 315*2^1869119-1 562664 L2235 2012 1802 933*2^1868602+1 562509 L3709 2013 1803 503*2^1868417+1 562453 L3378 2013 1804 1073*2^1867944-1 562311 L1828 2014 1805 1115*2^1866094-1 561754 L1828 2014 1806 70*905^189879-1 561408 L541 2017 1807 407*2^1864735+1 561344 L2520 2013 1808a 10005*2^1864432-1 561254 L4405 2019 1809 489*2^1864339+1 561225 L2520 2013 1810 427*2^1863702+1 561033 L3586 2013 1811 1161*2^1863637+1 561014 L3213 2013 1812 2*3^1175232+1 560729 p199 2010 1813 347*2^1861974-1 560513 L2519 2014 1814 13*2^1861732+1 560439 g267 2005 Divides GF(1861731,6) 1815 411*2^1861627+1 560409 L1741 2013 1816 281*2^1860862-1 560178 L2484 2015 1817 1165*2^1860749-1 560145 L1828 2014 1818 231*2^1860743-1 560142 L1862 2015 1819 103*2^1860103-1 559949 L2484 2012 1820 11726*1027^185913-1 559895 L4001 2018 1821 2655*2^1859692-1 559827 L1862 2018 1822 161*2^1859586-1 559794 L177 2013 1823 51*2^1859193+1 559675 L1204 2011 1824 1177*2^1859144+1 559662 L3625 2013 1825 1455*2^1858634-1 559508 L1134 2015 1826 8331405*2^1858587-1 559498 L260 2011 1827 669*2^1857223+1 559083 L2413 2013 1828 296990*151^256535-1 558990 L4700 2018 1829 1125*2^1856703-1 558927 L1828 2014 1830 1155*2^1855389-1 558531 L1828 2014 1831 4031*2^1855338-1 558516 L1959 2014 1832 Phi(3,-478421^49152) 558349 L4142 2017 Generalized unique 1833 126072*31^374323-1 558257 L2054 2012 1834 3^1170000+3^364398+1 558232 x44 2017 1835 435*2^1853363-1 557921 L4036 2015 1836 1229*2^1853192-1 557870 L1828 2014 1837 3161*618^199877+1 557858 L4714 2018 1838 333*2^1853115-1 557846 L1830 2012 1839 87*2^1852590-1 557688 L2055 2011 1840 765*2^1849609+1 556791 L1792 2013 1841 137*2^1849238-1 556679 L321 2007 1842 639*2^1848903+1 556579 L3439 2013 1843 261*2^1848217+1 556372 L1983 2013 1844 Phi(3,-456551^49152) 556351 L4142 2017 Generalized unique 1845 275*2^1846390-1 555822 L2444 2014 1846 1011*2^1846173+1 555757 L3221 2013 1847 1029*2^1844975+1 555396 L2626 2013 1848 133*2^1843619-1 554987 L1959 2014 1849 261*2^1843555-1 554968 L1828 2013 1850 2^120*611953#*611957^50000+1 554832 p383 2015 1851 73246*1027^184192+1 554713 L4001 2018 1852 953*2^1841461+1 554338 L3612 2013 1853 4171*2^1841157-1 554248 L1959 2016 1854 1089*2^1840695-1 554108 L1828 2014 1855 105*2^1840262-1 553977 L1959 2014 1856 1009*2^1840225-1 553966 L1828 2014 1857 1323*2^1839623-1 553785 L1828 2014 1858 681*2^1839269+1 553678 L3141 2013 1859 399*2^1839019-1 553603 L1809 2014 1860 779*2^1838955+1 553584 L3640 2013 1861 135*2^1838124+1 553333 L3472 2013 1862 15*2^1837873-1 553257 L632 2008 1863 28*392^213295-1 553137 L4001 2017 1864 379*2^1837291-1 553083 L1809 2014 1865 333*2^1837105+1 553027 L3470 2013 1866 4167*2^1836466-1 552835 L1959 2015 1867 309*2^1836139+1 552736 L3460 2013 1868 4061*2^1835582-1 552569 L1959 2014 1869 423*2^1835585+1 552569 L2873 2013 1870 1181*2^1834802-1 552334 L1828 2014 1871 73*2^1834526+1 552250 L1513 2011 1872 309*2^1834379+1 552206 L3471 2013 1873 3748*333^218908+1 552187 L4575 2017 1874 87*2^1834098+1 552121 L1513 2011 1875 1021*2^1833459-1 551930 L1828 2014 1876 34*813^189659-1 551927 L4001 2018 1877 121458*151^253264-1 551862 L4001 2018 1878 1485*2^1832651-1 551687 L1134 2014 1879 3*2^1832496+1 551637 p189 2007 Divides GF(1832490,3), GF(1832494,5) 1880 549*2^1832457+1 551628 L3641 2013 1881 295*2^1832129-1 551529 L2444 2014 1882 761*2^1831569+1 551361 L2117 2013 1883 519*2^1831415+1 551314 L3277 2013 1884 21*2^1830919+1 551163 g279 2004 1885 197*2^1830255+1 550964 L1360 2013 1886 63708*151^252785-1 550818 L4001 2018 1887c 6297*46^330940-1 550277 L4001 2019 1888 1021*2^1827279-1 550069 L1828 2013 1889 825*2^1825439+1 549515 L3289 2013 1890 679*2^1824918+1 549358 L2100 2013 1891 39*2^1824871+1 549343 L2664 2011 Divides GF(1824867,6) 1892 4029*2^1824569-1 549254 L1959 2015 1893 235*2^1824515-1 549237 L2444 2014 1894 162668*5^785748-1 549220 L3190 2012 1895 389*2^1824385+1 549198 L1487 2013 1896 1135*2^1824103-1 549113 L1828 2013 1897 4005*2^1823819-1 549028 L1959 2015 1898 91179*2^1823580-1 548958 L2777 2016 1899 991*2^1822216+1 548545 L1312 2013 1900 1089*2^1821417+1 548305 L1741 2013 1901 993*2^1821088+1 548206 L2131 2013 1902 513*2^1820982+1 548173 L2826 2013 1903 933*2^1820068+1 547899 L2895 2013 1904 921*2^1819560+1 547746 L1741 2013 1905 557*2^1819191+1 547634 L2526 2013 1906 593*2^1818825+1 547524 L3630 2013 1907 1161*2^1818637+1 547468 L2399 2013 1908 1387*2^1818593-1 547455 L1828 2012 1909 875*2^1818427+1 547405 L3035 2013 1910 229*2^1818078+1 547299 L3456 2013 1911 454483*2^1817935-1 547259 p77 2014 1912 127*2^1817862+1 547234 L3452 2013 1913 4065*2^1817502-1 547127 L1959 2015 1914 35*2^1817486-1 547120 L2074 2011 1915 1155*2^1816779-1 546909 L1828 2012 1916 69*2^1816739+1 546895 L1204 2011 1917 4101*2^1816007-1 546677 L1959 2015 1918 875*2^1814911+1 546346 L3691 2013 1919 18092*565^198465-1 546190 L4001 2017 1920 1029*2^1813839+1 546023 L3378 2013 1921 555*2^1813556+1 545938 L3233 2013 1922 33*2^1813526-1 545928 L621 2008 1923 1347*2^1813433-1 545901 L1828 2012 1924 1143*2^1813125+1 545809 L3514 2013 1925 1197*2^1811852+1 545425 L3035 2013 1926 10007*2^1811598-1 545350 L1751 2018 1927 693*2^1811517+1 545324 L2967 2013 1928 1099*2^1810686+1 545074 L3458 2013 1929 92*10^544905-1 544907 L3735 2015 Near-repdigit 1930 1305*2^1809766-1 544797 L1828 2011 1931 1185*2^1809466-1 544707 L1828 2011 1932 659*2^1808691+1 544474 L3625 2013 1933 145*2^1807767-1 544195 L840 2013 1934 9*2^1807574+1 544135 L2419 2011 Generalized Fermat 1935 4117*2^1807085-1 543991 L1959 2014 1936 375*2^1806591+1 543841 L3233 2013 1937 889*2^1806470+1 543805 L2967 2013 1938 1033*2^1805844+1 543617 L1502 2013 1939 4039*2^1805627-1 543552 L1959 2015 1940 981*2^1805368+1 543473 L2413 2013 1941 915*2^1805031+1 543372 L1741 2013 1942 691*2^1804332+1 543161 L3625 2013 1943 4089*2^1803463-1 542901 L1959 2016 1944 1965*2^1803256-1 542838 L4113 2017 1945 385*2^1802362+1 542568 L3279 2013 1946 661*2^1802024+1 542467 L2967 2013 1947 2415*2^1801615-1 542344 L2484 2018 1948 985*2^1801582+1 542334 L3035 2013 1949 301*2^1801207-1 542220 p281 2010 1950 1193*2^1801112-1 542192 L1828 2011 1951 417643*2^1800787-1 542097 L134 2005 1952 1045*2^1800784+1 542094 L3141 2013 1953 4017*2^1800617-1 542044 L1959 2014 1954 33910*1027^179973+1 542006 L4700 2018 1955c 320607*2^1800434-1 541991 g337 2019 1956 1045*2^1800025-1 541865 L1828 2011 1957 4009*2^1799073-1 541579 L1959 2015 1958 43*2^1799016+1 541560 L2562 2011 1959 4079*2^1798192-1 541314 L1959 2014 1960 220502!2+1 541239 p394 2017 Multifactorial 1961 1047*2^1797890+1 541222 L3473 2013 1962 1965*2^1797877-1 541219 L4113 2017 1963 3^1134000+3^360654+1 541056 x44 2017 1964 319*2^1797261-1 541032 L1819 2013 1965 1712*333^214484+1 541028 L4575 2017 1966 1103*2^1796969+1 540945 L2826 2013 1967 197*2^1796284-1 540738 L1862 2015 1968 4137*2^1796226-1 540722 L1959 2015 1969 174*643^192540-1 540696 L4001 2018 1970 10041*2^1795990-1 540651 p168 2017 1971 43*2^1795628+1 540540 L1129 2011 1972 11682*1027^179399+1 540277 L4001 2018 1973 383*2^1794636-1 540242 L1809 2014 1974 14172*1027^179381-1 540223 L4001 2018 1975 4119*2^1794544-1 540216 L1959 2015 1976 423*2^1794546+1 540215 L3131 2013 1977 1101*2^1794417-1 540177 L1828 2014 1978 387*2^1793857-1 540008 L2519 2014 1979 Phi(3,-311095^49152) 539974 L4142 2016 Generalized unique 1980 105*2^1793519-1 539906 L1959 2014 1981 1223*618^193431+1 539867 L4001 2018 1982 1103*2^1792513+1 539604 L3262 2013 1983 431*2^1791441+1 539281 L3453 2013 1984 1185*2^1791429-1 539277 L1828 2014 1985 607*2^1790196+1 538906 L4123 2013 1986 143157*2^1789798+1 538789 L4504 2016 1987 1059*2^1789353+1 538652 L1130 2013 1988 975*2^1789341+1 538649 L2085 2013 1989 273*2^1788926-1 538523 L1828 2013 1990 4125*2^1788660-1 538444 L1959 2015 1991 289184*5^770116-1 538294 p353 2012 1992 1065*2^1787993-1 538243 L1828 2014 1993 441*2^1787789+1 538181 L1209 2013 1994 565*2^1787136+1 537985 L1512 2013 1995 247*2^1786968+1 537934 L2533 2013 1996 227*2^1786779+1 537877 L2058 2013 1997 11812*5^769343-1 537752 p341 2012 1998 933*2^1786320+1 537739 L1505 2013 1999 507*2^1786194+1 537701 L3422 2013 2000 921*2^1785808+1 537585 L3262 2013 2001 179114*151^246711-1 537583 L4700 2018 2002 1187*2^1785707+1 537555 L1753 2013 2003 55555*2^1785446+1 537478 L4828 2018 2004 256*14^468784+1 537289 L3802 2014 Generalized Fermat 2005 63*2^1784498+1 537190 L1415 2011 2006 117134*151^246492-1 537106 L4001 2018 2007 1333*2^1784103-1 537072 L1828 2014 2008 231*2^1783821+1 536986 L3262 2013 2009 3098*565^195049-1 536788 L4001 2017 2010 4069*2^1781691-1 536347 L1959 2014 2011 575*2^1781313+1 536232 L3262 2013 2012 883*2^1780324+1 535934 L2963 2013 2013 391*2^1780155-1 535883 L1809 2014 2014 45*2^1779971+1 535827 L1223 2011 Divides GF(1779969,5) 2015 357659*2^1779748-1 535764 L47 2005 2016 123*2^1779728-1 535754 L3967 2014 2017 1061*2^1779595+1 535715 L3445 2013 2018 455*2^1779315+1 535630 L2121 2013 2019 663251*2^1778899+1 535508 L4789 2018 2020 31521*2^1778899-1 535507 L3519 2015 2021 863*2^1778737+1 535457 L1505 2013 2022 316594*5^766005-1 535421 L3157 2012 2023 99*2^1777688-1 535140 L1862 2011 2024 5*2^1777515+1 535087 p148 2005 Divides GF(1777511,5), GF(1777514,6) 2025 511*2^1777488+1 535080 L2873 2013 2026 243*2^1777467-1 535074 L2055 2011 2027 112*281^218429-1 534871 L4001 2018 2028 177*2^1775674-1 534534 L2101 2012 2029 293*2^1775450-1 534467 L2074 2014 2030 1005*2^1775235-1 534402 L1828 2014 2031 129*2^1774709+1 534243 L2526 2013 Divides GF(1774705,12) 2032 4053*2^1773028-1 533739 L1959 2015 2033 163*2^1771524+1 533285 L1741 2013 2034 381*2^1771493+1 533276 L3444 2013 2035 795*2^1770840+1 533079 L1505 2013 2036 Phi(3,-264017^49152) 532969 L4142 2016 Generalized unique 2037 665*2^1769303+1 532617 L3441 2013 2038 473*2^1769101+1 532556 L3459 2013 2039 855*2^1768644+1 532418 L1675 2013 2040 99*2^1768187+1 532280 L2517 2011 2041 273*2^1766747-1 531847 L1828 2013 2042 191*2^1766221+1 531688 L2539 2013 2043 4045*2^1765913-1 531597 L1959 2015 2044 190088*5^760352-1 531469 L2841 2012 Generalized Woodall 2045 1005*2^1765454-1 531458 L1828 2014 2046 35*2^1765449+1 531455 L1204 2011 2047 1347*2^1765384-1 531437 L1828 2014 2048 981*2^1765221+1 531388 L1204 2013 2049 255*2^1765113+1 531355 L2085 2013 2050 399*2^1764851-1 531276 L1809 2014 2051 65*2^1764687+1 531226 L1125 2011 2052 717*2^1763367+1 530830 L3440 2013 2053 255*2^1763221-1 530785 L2484 2015 2054 43809*6^681994-1 530700 L4521 2018 2055 335*2^1762548-1 530583 L1809 2014 2056 1399*2^1762191-1 530476 L1828 2014 2057 2895*2^1762011-1 530422 L2484 2018 2058 16193*22^395119-1 530421 p255 2013 2059 531*2^1761689+1 530324 L3458 2013 2060 963*2^1761050+1 530132 L1204 2013 2061 1253*2^1760738-1 530039 L1828 2014 2062 62176*1027^175956+1 529909 L4001 2018 2063 4199*2^1760292-1 529905 L1959 2014 2064 1037*2^1760216-1 529881 L1828 2014 2065 969*2^1759430+1 529645 L3262 2013 2066 119*2^1759247+1 529589 L3035 2013 2067 2*191^232149+1 529540 g424 2011 Divides Phi(191^232149,2) 2068 417*2^1759055+1 529531 L2623 2013 2069 2565*2^1758906-1 529487 L2484 2018 2070 787*2^1757702+1 529124 L3436 2013 2071 357*2^1756764-1 528842 L2519 2014 2072 57*2^1756702+1 528822 L1741 2011 2073 135*2^1756478+1 528755 L3127 2013 2074 855*2^1756269+1 528693 L2636 2013 2075 603*2^1756142+1 528655 L2559 2013 2076 71*2^1755965+1 528600 L1741 2011 2077 485*2^1755887+1 528578 L3262 2013 2078 31*2^1755317-1 528405 L330 2011 2079 955*2^1755312+1 528405 L1741 2013 2080 1391*2^1754922-1 528288 L1828 2014 2081 4111*2^1754463-1 528150 L1959 2016 2082 161*2^1754223+1 528076 L3014 2013 2083 4171*2^1754017-1 528016 L1959 2016 2084 5077*2^1753317-1 527805 L251 2008 2085 1261*2^1753021-1 527716 L1828 2014 2086 387*2^1752919+1 527684 L2636 2013 2087 65*2^1752885+1 527673 L1204 2011 2088 355*2^1752713-1 527622 L2519 2014 2089c 4*5^754611-1 527452 L4881 2019 2090 363*2^1752116+1 527443 L2085 2013 2091 641*2^1751823+1 527355 L3459 2013 2092 Phi(3,-231255^49152) 527312 L4142 2016 Generalized unique 2093 261*2^1751160+1 527155 L3192 2013 2094 32*905^178286-1 527131 L541 2017 2095 1179*2^1750847+1 527061 g387 2009 2096 1293*2^1750532-1 526966 L1828 2014 2097 340168*5^753789-1 526882 p323 2012 2098 2955*2^1748957-1 526492 L2484 2018 2099 4147*2^1748201-1 526265 L1959 2016 2100 183*2^1747660+1 526101 L2163 2013 Divides Fermat F(1747656) 2101 1485*2^1745772+1 525533 L1134 2014 2102 265*2^1745450+1 525436 L3423 2013 2103 297*2^1745377-1 525414 L2074 2014 2104 1293*2^1744930-1 525280 L1828 2014 2105 158670*151^241039-1 525224 L4001 2018 2106 1485*2^1744384+1 525116 L1134 2014 2107 325034*151^240969-1 525072 L4001 2018 2108 495*2^1744183+1 525055 L1933 2013 2109 327*2^1743751+1 524924 L1130 2013 2110 415*2^1743176+1 524751 L3428 2013 2111 695*2^1742755+1 524625 L1741 2013 2112 1285*2^1742735-1 524619 L1828 2014 2113 243*2^1742689+1 524605 L1204 2013 2114 345*2^1742652-1 524594 L1830 2012 2115 867*2^1742474+1 524540 L3188 2013 2116 91*2^1742093-1 524425 L2338 2012 2117 905*2^1742026-1 524406 L2012 2014 2118 1295*2^1741794-1 524336 L1828 2014 2119 315*2^1741334-1 524197 L1830 2012 2120 525*2^1740056+1 523812 L1204 2013 2121 319*2^1740047-1 523809 L1819 2013 2122 1157*2^1739902-1 523766 L1828 2014 2123 357*2^1739732+1 523715 L3427 2013 2124 687*2^1739343+1 523598 L2117 2013 2125 1041*2^1739189-1 523552 L1828 2014 2126 627*2^1738864+1 523454 L2117 2013 2127 95*2^1738427+1 523321 L2085 2011 2128 793*2^1738400+1 523314 L3035 2013 2129 144*648^186106+1 523254 L3886 2015 Generalized Fermat 2130 729*2^1737901+1 523164 L2603 2013 2131 1065*2^1736222+1 522658 L1204 2013 2132 111*618^187244+1 522598 L4444 2018 2133 573*2^1735454+1 522427 L2675 2013 2134 545*2^1735043+1 522303 L2131 2013 2135 61*2^1734983-1 522284 L2055 2011 2136 1125*2^1734821-1 522237 L1828 2014 2137 6*10^522127+1 522128 p342 2012 2138 1113*2^1733627-1 521877 L1828 2014 2139 741*2^1733507+1 521841 L2549 2013 2140 53184*1027^173223+1 521678 L4001 2018 2141 471*2^1732587+1 521564 L2085 2013 2142 387*2^1732185-1 521443 L1809 2014 2143 547*2^1731248+1 521161 L2873 2013 2144 4059*2^1730611-1 520970 L1959 2014 2145 245*2^1730188-1 520841 L1862 2014 2146 55*2^1729777-1 520717 L2074 2013 2147 Phi(3,-197845^49152) 520650 L4506 2016 Generalized unique 2148 421*2^1729092+1 520512 L3234 2013 2149 193*2^1728894+1 520452 L2559 2013 2150 213*2^1728847-1 520438 L1863 2014 2151 341*2^1728697+1 520393 L2981 2013 2152 213*2^1728569+1 520354 L2520 2013 2153e 24573*2^1728296+1 520274 p168 2018 2154 277*2^1728302+1 520274 L1130 2013 2155 997*2^1728146+1 520227 L1595 2013 2156 929*2^1728099+1 520213 L1745 2013 2157 4065*2^1727864-1 520143 L1959 2015 2158 879*2^1727602+1 520063 L1935 2013 2159 338948*5^743996-1 520037 p352 2012 2160 600921*2^1727190-1 519942 g337 2013 2161 4129*2^1727119-1 519919 L1959 2015 2162 597*2^1726268+1 519662 L2520 2013 2163 1151*2^1726187+1 519638 L3262 2013 2164 813*2^1725925+1 519559 L3171 2013 2165 4179*2^1725552-1 519447 L1959 2015 2166 27*634^185354+1 519380 L4001 2018 2167 84114*151^238241-1 519127 L4001 2018 2168 729*2^1724434+1 519110 L1484 2013 Generalized Fermat 2169 615*2^1724209+1 519042 L2967 2013 2170 4157*2^1724202-1 519041 L1959 2015 2171 4177*2^1724161-1 519028 L1959 2014 2172 1089*2^1723121-1 518715 L1828 2014 2173 547*2^1723020+1 518684 L1745 2013 2174 253*2^1722623-1 518564 L145 2007 2175 99461233889495567276...(518269 other digits)...53126433719371038957 518309 p384 2015 2176 2*3^1086112+1 518208 p199 2010 2177 113*2^1721438-1 518207 L2484 2011 2178 1299*2^1721369-1 518187 L1828 2014 2179 4071*2^1721361-1 518185 L1959 2015 2180 1195*2^1720342+1 517878 L1935 2013 2181 465*2^1720310+1 517868 L2938 2013 2182 1159*2^1719862+1 517734 L3035 2013 2183 545*2^1719517+1 517629 L2583 2013 2184 57257*2^1719090-1 517503 L4812 2018 2185 235*2^1718787-1 517409 L2444 2014 2186 371*2^1717250-1 516947 L3844 2014 2187 897*2^1716807+1 516814 L2322 2013 2188 383*2^1716780-1 516805 L2519 2014 2189 1307*2^1716556-1 516738 L1828 2014 2190 4179*2^1716052-1 516587 L1959 2015 2191 1017*2^1715060+1 516288 L1204 2013 2192 423*2^1714680+1 516173 L1204 2013 2193 70714*1027^171342+1 516014 L4001 2018 2194 975*2^1714004+1 515970 L2117 2012 2195 1101*2^1712807+1 515610 L1935 2012 2196 175*2^1711779-1 515300 L384 2014 2197 1485*2^1711331-1 515166 L1134 2014 2198 1029*2^1711100-1 515096 L1828 2014 2199 491*2^1710497+1 514914 L3271 2013 2200 237*2^1710490+1 514912 L1408 2013 2201 1967*2^1710052-1 514781 L4113 2017 2202 387*2^1709440-1 514596 L3844 2014 2203 833*2^1708797+1 514403 L1935 2012 2204 1035*2^1708648+1 514358 L2973 2012 2205 333*2^1708106+1 514194 L3154 2013 2206 18656*5^735326-1 513976 p280 2012 2207 183*2^1707182-1 513916 L384 2014 2208 935*2^1707129+1 513901 L1300 2012 2209 889*2^1707094+1 513890 L3262 2012 2210 1520*61^287837-1 513888 p328 2015 2211 267*2^1705793-1 513498 L1828 2013 2212 291*2^1705173-1 513311 L2484 2013 2213 165*2^1705093+1 513287 L1158 2013 2214 109*2^1704658+1 513156 L1751 2012 2215 727*2^1704196+1 513017 L1741 2012 2216 4035*2^1704089-1 512986 L1959 2014 2217 2*3^1074726+1 512775 p199 2010 2218 165*2^1703392+1 512775 L2131 2013 2219 1195*2^1703221-1 512724 L1828 2014 2220 313*2^1703119-1 512693 L1809 2013 2221 855*2^1703065+1 512677 L1741 2012 2222 283*2^1702599-1 512536 L426 2010 2223 851*2^1702569+1 512528 L3344 2012 2224 10071*2^1702501+1 512508 p168 2017 2225 1057*2^1701973-1 512348 L1828 2014 2226 1071*2^1701792+1 512294 L3343 2012 2227 4149*2^1701565-1 512226 L1959 2015 2228 49204*1027^170070+1 512183 L4001 2018 2229 4187*2^1701140-1 512098 L1959 2014 2230 1005*2^1700883-1 512020 L1828 2014 2231 233*2^1700734-1 511975 L426 2010 2232 1642*30^346592-1 511962 p268 2012 2233 2444379546449*2^1699964-1 511753 L2484 2015 2234 2428*333^202852+1 511687 L4001 2017 2235 6*258^212134-1 511588 L3610 2014 2236 927*2^1699446+1 511588 L1741 2012 2237 4133*2^1699380-1 511568 L1959 2015 2238 657*2^1699031+1 511463 L3261 2012 2239 1065*2^1698303+1 511244 L1741 2012 2240 561*2^1697783+1 511087 L1360 2012 2241 5*10^511056-1 511057 p297 2011 Near-repdigit 2242 24510*745^177846-1 510806 L4189 2017 2243 1193*2^1696600-1 510731 L1828 2014 2244 27264*151^234276-1 510487 L4444 2018 2245 259*2^1695723-1 510466 L2444 2014 2246 121*2^1695499-1 510399 L62 2005 2247 4023*2^1695443-1 510383 L1959 2015 2248 141068*151^234228-1 510383 L4001 2018 2249f 154*730^178174+1 510172 L4001 2018 2250 883*2^1694710+1 510162 L1204 2012 2251 985*2^1694268+1 510029 L3167 2012 2252 405*2^1693765+1 509877 L1741 2013 2253 873*2^1692706+1 509559 L1980 2012 2254 299*2^1692271+1 509427 L1741 2013 2255a 59071146^65536+1 509305 L4787 2019 Generalized Fermat 2256a 59015944^65536+1 509279 L4747 2019 Generalized Fermat 2257a 58897838^65536+1 509222 L4928 2019 Generalized Fermat 2258a 58838172^65536+1 509193 L4926 2019 Generalized Fermat 2259a 58665154^65536+1 509109 L4599 2019 Generalized Fermat 2260 993*2^1691212+1 509109 L3262 2012 2261a 58644648^65536+1 509099 L4747 2019 Generalized Fermat 2262a 58528880^65536+1 509043 L4726 2019 Generalized Fermat 2263 1369*2^1690781-1 508979 L1828 2014 2264a 58384684^65536+1 508973 L4599 2019 Generalized Fermat 2265 395*2^1690690-1 508951 L1819 2013 2266 79672*1027^168996+1 508949 L4001 2018 2267 217*2^1690664+1 508943 L3412 2013 2268a 58226162^65536+1 508895 L4921 2019 Generalized Fermat 2269a 58077056^65536+1 508822 L4920 2019 Generalized Fermat 2270a 58065838^65536+1 508817 L4861 2019 Generalized Fermat 2271a 57984540^65536+1 508777 L4387 2019 Generalized Fermat 2272b 57955358^65536+1 508763 L4387 2019 Generalized Fermat 2273b 57666292^65536+1 508620 L4742 2019 Generalized Fermat 2274b 57652882^65536+1 508614 L4880 2019 Generalized Fermat 2275 4135*2^1689399-1 508564 L1959 2015 2276b 57413758^65536+1 508495 L4692 2019 Generalized Fermat 2277b 57117422^65536+1 508348 L4753 2019 Generalized Fermat 2278b 56857098^65536+1 508218 L4817 2019 Generalized Fermat 2279b 56795992^65536+1 508187 L4772 2019 Generalized Fermat 2280b 56749480^65536+1 508164 L4919 2019 Generalized Fermat 2281b 56731448^65536+1 508155 L4734 2019 Generalized Fermat 2282b 56586100^65536+1 508082 L4918 2019 Generalized Fermat 2283 273428*151^233164-1 508065 L4001 2018 2284 599*2^1687659+1 508039 L3262 2012 2285b 56339292^65536+1 507958 L4916 2019 Generalized Fermat 2286b 56318206^65536+1 507947 L4917 2019 Generalized Fermat 2287 20049*2^1687252-1 507918 L1471 2011 2288b 56170642^65536+1 507872 L4880 2019 Generalized Fermat 2289 915*2^1686699+1 507750 L2520 2012 2290b 55837944^65536+1 507703 L4200 2019 Generalized Fermat 2291b 55836122^65536+1 507702 L4734 2019 Generalized Fermat 2292b 55740434^65536+1 507654 L4747 2019 Generalized Fermat 2293 2*3^1063844-1 507583 L426 2012 2294 63*2^1686050+1 507554 L2085 2011 Divides GF(1686047,12) 2295 1191*2^1686001+1 507540 L1935 2012 2296b 55396316^65536+1 507477 L4620 2019 Generalized Fermat 2297b 55317972^65536+1 507437 L4726 2019 Generalized Fermat 2298b 55292592^65536+1 507424 L4745 2019 Generalized Fermat 2299 693*2^1685544+1 507403 L1354 2012 2300b 55110930^65536+1 507330 L4210 2019 Generalized Fermat 2301b 55072040^65536+1 507310 L4591 2019 Generalized Fermat 2302 339*2^1685135+1 507279 L1595 2013 2303b 54949840^65536+1 507247 L4410 2019 Generalized Fermat 2304b 54937732^65536+1 507241 L4726 2019 Generalized Fermat 2305b 54889620^65536+1 507216 L4914 2019 Generalized Fermat 2306 19*2^1684813-1 507181 L503 2008 2307b 54739648^65536+1 507138 L4903 2019 Generalized Fermat 2308 133*2^1684616+1 507123 L2826 2013 2309 110059!+1 507082 p312 2011 Factorial 2310 1119*2^1684471-1 507080 L1828 2014 2311b 54587920^65536+1 507059 L4903 2019 Generalized Fermat 2312b 54435560^65536+1 506979 L4747 2019 Generalized Fermat 2313b 54387024^65536+1 506954 L4395 2019 Generalized Fermat 2314 415*2^1684046+1 506951 L1990 2013 2315b 54377542^65536+1 506949 L4745 2019 Generalized Fermat 2316b 54234920^65536+1 506874 L4201 2019 Generalized Fermat 2317c 12001*42^312245+1 506856 L4001 2019 2318b 53942572^65536+1 506720 L4530 2019 Generalized Fermat 2319b 53874510^65536+1 506684 L4734 2019 Generalized Fermat 2320b 53869266^65536+1 506682 L4774 2019 Generalized Fermat 2321b 53847196^65536+1 506670 L4763 2019 Generalized Fermat 2322b 53797422^65536+1 506644 L4201 2019 Generalized Fermat 2323b 53704982^65536+1 506595 L4734 2019 Generalized Fermat 2324b 53660144^65536+1 506571 L4745 2019 Generalized Fermat 2325b 53607314^65536+1 506543 L4544 2019 Generalized Fermat 2326b 53566068^65536+1 506521 L4774 2019 Generalized Fermat 2327b 53510900^65536+1 506492 L4745 2019 Generalized Fermat 2328b 53507594^65536+1 506490 L4747 2019 Generalized Fermat 2329b 53475642^65536+1 506473 L4410 2019 Generalized Fermat 2330b 53258832^65536+1 506357 L4745 2019 Generalized Fermat 2331b 53146516^65536+1 506297 L4742 2019 Generalized Fermat 2332b 52963984^65536+1 506199 L4880 2019 Generalized Fermat 2333b 52871154^65536+1 506149 L4909 2019 Generalized Fermat 2334 1004*133^238300-1 506117 p289 2013 2335b 52690172^65536+1 506052 L4549 2019 Generalized Fermat 2336 249*2^1681039+1 506046 L1741 2013 2337b 52558020^65536+1 505980 L4745 2019 Generalized Fermat 2338b 52531754^65536+1 505966 L4747 2019 Generalized Fermat 2339b 52462148^65536+1 505928 L4899 2019 Generalized Fermat 2340b 52333192^65536+1 505858 L4765 2019 Generalized Fermat 2341 5374*5^723697-1 505847 p351 2012 2342b 52301890^65536+1 505841 L4755 2019 Generalized Fermat 2343b 52250632^65536+1 505813 L4905 2019 Generalized Fermat 2344b 52186612^65536+1 505778 L4904 2019 Generalized Fermat 2345 555*2^1679952+1 505719 L3262 2012 2346 193*2^1679938+1 505715 L1741 2013 2347b 52067302^65536+1 505713 L4903 2019 Generalized Fermat 2348b 52054552^65536+1 505706 L4549 2019 Generalized Fermat 2349 357*2^1679872+1 505695 L3139 2013 2350 309*2^1679867+1 505693 L2675 2013 2351 985*2^1679754+1 505660 L1741 2012 2352b 51944436^65536+1 505646 L4655 2019 Generalized Fermat 2353b 51927094^65536+1 505637 L4549 2019 Generalized Fermat 2354b 51888044^65536+1 505615 L4760 2019 Generalized Fermat 2355 1065*2^1679402+1 505554 L3262 2012 2356b 51708088^65536+1 505516 L4734 2019 Generalized Fermat 2357b 51686702^65536+1 505504 L4341 2019 Generalized Fermat 2358b 51506978^65536+1 505405 L4767 2019 Generalized Fermat 2359b 51455452^65536+1 505377 L4899 2019 Generalized Fermat 2360b 51443210^65536+1 505370 L4530 2019 Generalized Fermat 2361b 51337006^65536+1 505311 L4898 2019 Generalized Fermat 2362b 50969866^65536+1 505107 L4745 2019 Generalized Fermat 2363 2369*618^180975+1 505103 L4001 2018 2364b 50907674^65536+1 505072 L4897 2019 Generalized Fermat 2365 1109*2^1677760-1 505060 L1828 2014 2366b 50781728^65536+1 505002 L4894 2019 Generalized Fermat 2367 139*666^178851-1 504984 L2054 2011 2368 978329*2^1677461+1 504973 L4094 2018 2369 469779*2^1677462+1 504973 L4094 2017 2370 76141*2^1677464+1 504972 L4094 2015 2371 559*2^1677446+1 504965 L3262 2012 2372 220634*151^231725-1 504929 L4001 2018 2373 411*2^1677196+1 504889 L2734 2013 2374b 50546746^65536+1 504870 L4817 2019 Generalized Fermat 2375 905*2^1677085+1 504856 L3249 2012 2376 60357*2^1676907+1 504805 L587 2011 2377 567*2^1676783+1 504765 L1576 2012 2378 4115*2^1676476-1 504674 L1959 2015 2379b 50164202^65536+1 504654 L4870 2019 Generalized Fermat 2380b 50140536^65536+1 504640 L4591 2019 Generalized Fermat 2381b 50124978^65536+1 504631 L4741 2019 Generalized Fermat 2382b 49975182^65536+1 504546 L4289 2019 Generalized Fermat 2383 255*2^1675403+1 504349 L1741 2013 2384b 49473608^65536+1 504259 L4729 2019 Generalized Fermat 2385b 49433304^65536+1 504236 L4760 2019 Generalized Fermat 2386b 49353010^65536+1 504190 L4897 2019 Generalized Fermat 2387 122*806^173475+1 504179 L4001 2017 2388 95*2^1674777+1 504161 L1224 2011 2389 1043*2^1674573+1 504100 L3338 2012 2390 5854146*15^428616-1 504099 L4786 2018 2391 4175*2^1674484-1 504074 L1959 2015 2392 699*2^1674293+1 504016 L2366 2012 2393b 49008360^65536+1 503990 L4887 2019 Generalized Fermat 2394 1355*2^1674156-1 503975 L1828 2014 2395b 48967836^65536+1 503967 L4286 2019 Generalized Fermat 2396 93*2^1673893+1 503894 L2085 2011 2397b 48843798^65536+1 503894 L4734 2019 Generalized Fermat 2398 173*2^1673881+1 503891 L3234 2013 2399 1333*2^1673867-1 503888 L1828 2014 2400b 48693126^65536+1 503806 L4886 2019 Generalized Fermat 2401b 48683018^65536+1 503800 L4745 2019 Generalized Fermat 2402b 48637118^65536+1 503774 L4791 2019 Generalized Fermat 2403b 48424300^65536+1 503649 L4309 2019 Generalized Fermat 2404b 48210372^65536+1 503523 L4737 2019 Generalized Fermat 2405b 48202934^65536+1 503518 L4526 2019 Generalized Fermat 2406b 48169782^65536+1 503499 L4817 2019 Generalized Fermat 2407 879*2^1672525+1 503484 L1741 2012 2408 987*2^1672475+1 503469 L1745 2012 2409b 48078610^65536+1 503445 L4884 2019 Generalized Fermat 2410b 48036128^65536+1 503420 L4817 2019 Generalized Fermat 2411 1193*2^1672244-1 503399 L1828 2014 2412c 47911922^65536+1 503346 L4252 2019 Generalized Fermat 2413c 47854178^65536+1 503312 L4410 2019 Generalized Fermat 2414c 47831888^65536+1 503298 L4741 2019 Generalized Fermat 2415c 47368516^65536+1 503021 L4734 2019 Generalized Fermat 2416 229*2^1670843-1 502977 L1862 2015 2417c 47124682^65536+1 502875 L4773 2019 Generalized Fermat 2418c 47083532^65536+1 502850 L4747 2019 Generalized Fermat 2419 1365*2^1670208+1 502786 L1134 2015 2420 847*2^1670014+1 502728 L3173 2012 2421 141*2^1669965+1 502712 L3294 2013 2422 55*2^1669798+1 502662 L2518 2011 Divides GF(1669797,12) 2423c 46587924^65536+1 502548 L4867 2019 Generalized Fermat 2424 1089*2^1669361+1 502531 L1584 2012 2425c 46539762^65536+1 502519 L4871 2019 Generalized Fermat 2426c 46475746^65536+1 502480 L4871 2019 Generalized Fermat 2427 161*2^1668927+1 502400 L2520 2013 2428d 46145120^65536+1 502277 L4872 2018 Generalized Fermat 2429d 46131706^65536+1 502268 L4870 2018 Generalized Fermat 2430 525*2^1668316+1 502216 L3221 2012 2431d 45837186^65536+1 502086 L4867 2018 Generalized Fermat 2432 15*2^1667744+1 502043 g279 2007 2433c 45727976^65536+1 502018 L4875 2019 Generalized Fermat 2434d 45660678^65536+1 501976 L4865 2018 Generalized Fermat 2435d 45642558^65536+1 501965 L4747 2018 Generalized Fermat 2436 4101*2^1667313-1 501915 L1959 2015 2437 2^1667321-2^833661+1 501914 L137 2011 Gaussian Mersenne norm 38? 2438d 45536968^65536+1 501899 L4747 2018 Generalized Fermat 2439 195*2^1667115-1 501854 L1828 2014 2440 149183*2^1666957+1 501810 g346 2005 2441d 45394036^65536+1 501810 L4747 2018 Generalized Fermat 2442d 45340828^65536+1 501776 L4286 2018 Generalized Fermat 2443d 45327802^65536+1 501768 L4863 2018 Generalized Fermat 2444d 45288396^65536+1 501743 L4787 2018 Generalized Fermat 2445d 45254752^65536+1 501722 L4720 2018 Generalized Fermat 2446d 45251962^65536+1 501720 L4760 2018 Generalized Fermat 2447 205*2^1666435-1 501650 L2444 2014 2448d 45126534^65536+1 501641 L4862 2018 Generalized Fermat 2449d 45070994^65536+1 501606 L4861 2018 Generalized Fermat 2450 99*2^1665995+1 501517 L2121 2011 2451e 44836986^65536+1 501458 L4684 2018 Generalized Fermat 2452e 44799596^65536+1 501434 L4859 2018 Generalized Fermat 2453e 44690560^65536+1 501365 L4857 2018 Generalized Fermat 2454e 44533068^65536+1 501265 L4249 2018 Generalized Fermat 2455e 44427620^65536+1 501197 L4387 2018 Generalized Fermat 2456e 44408348^65536+1 501185 L4849 2018 Generalized Fermat 2457e 44401238^65536+1 501180 L4856 2018 Generalized Fermat 2458e 44285794^65536+1 501106 L4787 2018 Generalized Fermat 2459e 44282836^65536+1 501104 L4530 2018 Generalized Fermat 2460 10198*1027^166366+1 501027 L4700 2018 2461 403*2^1664194+1 500975 L2626 2013 2462e 43867006^65536+1 500836 L4853 2018 Generalized Fermat 2463e 43857722^65536+1 500830 L4330 2018 Generalized Fermat 2464e 43748016^65536+1 500758 L4530 2018 Generalized Fermat 2465e 43746498^65536+1 500757 L4645 2018 Generalized Fermat 2466e 43712198^65536+1 500735 L4584 2018 Generalized Fermat 2467e 43662354^65536+1 500703 L4747 2018 Generalized Fermat 2468f 43581628^65536+1 500650 L4817 2018 Generalized Fermat 2469f 43439336^65536+1 500557 L4530 2018 Generalized Fermat 2470 56093*6^643170-1 500489 p366 2015 2471 233*2^1662513+1 500469 L3035 2013 2472f 43242432^65536+1 500428 L4747 2018 Generalized Fermat 2473f 43216120^65536+1 500410 L4747 2018 Generalized Fermat 2474f 43176248^65536+1 500384 L4366 2018 Generalized Fermat 2475f 43173706^65536+1 500382 L4848 2018 Generalized Fermat 2476 441*2^1662069+1 500336 L3113 2013 2477f 43084562^65536+1 500323 L4846 2018 Generalized Fermat 2478f 42757860^65536+1 500107 L4843 2018 Generalized Fermat 2479f 42743760^65536+1 500097 L4387 2018 Generalized Fermat 2480f 42620908^65536+1 500015 L4705 2018 Generalized Fermat 2481 3^1047951-3^375897-1 500000 p269 2015 2482 42439456^65536+1 499894 L4839 2018 Generalized Fermat 2483 533*2^1660425+1 499841 L2117 2012 2484 825*2^1660087+1 499739 L2366 2012 2485 42177946^65536+1 499718 L4836 2018 Generalized Fermat 2486 42045360^65536+1 499628 L4645 2018 Generalized Fermat 2487 41982488^65536+1 499586 L4747 2018 Generalized Fermat 2488 41960754^65536+1 499571 L4823 2018 Generalized Fermat 2489 41956924^65536+1 499569 L4774 2018 Generalized Fermat 2490 63*2^1659338-1 499513 L503 2008 2491 41785194^65536+1 499452 L4831 2018 Generalized Fermat 2492 521*2^1659077+1 499435 L3262 2012 2493 399*2^1659001-1 499412 L1819 2014 2494 41661376^65536+1 499367 L4530 2018 Generalized Fermat 2495 393*2^1658625+1 499299 L3409 2013 2496 239*30^337990-1 499255 p268 2012 2497 171*2^1658303+1 499202 L1300 2013 2498 257*2^1658254-1 499187 L2444 2014 2499 41378136^65536+1 499173 L4387 2018 Generalized Fermat 2500 2925*2^1657921-1 499088 L2484 2018 2501 41023954^65536+1 498929 L4820 2018 Generalized Fermat 2502 40951894^65536+1 498878 L4709 2018 Generalized Fermat 2503 40934648^65536+1 498866 L4819 2018 Generalized Fermat 2504 40858208^65536+1 498813 L4817 2018 Generalized Fermat 2505 40782880^65536+1 498761 L4813 2018 Generalized Fermat 2506 40726656^65536+1 498722 L4584 2018 Generalized Fermat 2507 40547834^65536+1 498596 L4813 2018 Generalized Fermat 2508 40522376^65536+1 498578 L4747 2018 Generalized Fermat 2509 40374324^65536+1 498474 L4811 2018 Generalized Fermat 2510 40348160^65536+1 498456 L4747 2018 Generalized Fermat 2511 6213*2^1655136-1 498250 L4036 2015 2512 1323*2^1655130-1 498247 L1828 2014 2513 297*2^1655042-1 498220 L2074 2013 2514 39822830^65536+1 498083 L4803 2018 Generalized Fermat 2515 39822410^65536+1 498082 L4802 2018 Generalized Fermat 2516 39809082^65536+1 498073 L4387 2018 Generalized Fermat 2517 61*2^1654383-1 498021 L503 2008 2518 39672694^65536+1 497975 L4645 2018 Generalized Fermat 2519 39641632^65536+1 497953 L4747 2018 Generalized Fermat 2520 39641162^65536+1 497953 L4787 2018 Generalized Fermat 2521 39542162^65536+1 497881 L4387 2018 Generalized Fermat 2522 39418466^65536+1 497792 L4387 2018 Generalized Fermat 2523 1047*2^1653096+1 497635 L1792 2012 2524 39162320^65536+1 497607 L4787 2018 Generalized Fermat 2525 39108392^65536+1 497568 L4645 2018 Generalized Fermat 2526 39089796^65536+1 497554 L4200 2018 Generalized Fermat 2527 38951594^65536+1 497453 L4747 2018 Generalized Fermat 2528 1163*2^1652438-1 497437 L1828 2014 2529 38881766^65536+1 497402 L4697 2018 Generalized Fermat 2530 38849156^65536+1 497378 L4747 2018 Generalized Fermat 2531 68*23^365239+1 497358 p261 2009 2532 38770952^65536+1 497321 L4793 2018 Generalized Fermat 2533 499*2^1651814+1 497249 L1842 2013 2534 38670832^65536+1 497247 L4645 2018 Generalized Fermat 2535 38659632^65536+1 497239 L4670 2018 Generalized Fermat 2536 1119*2^1651684-1 497210 L1828 2014 2537 1846*333^197100+1 497178 L4001 2017 2538 689*2^1651563+1 497173 L1204 2012 2539 38542914^65536+1 497153 L4791 2018 Generalized Fermat 2540 30981*14^433735-1 497121 p77 2015 Generalized Woodall 2541 38485606^65536+1 497111 L4366 2018 Generalized Fermat 2542 38481086^65536+1 497107 L4773 2018 Generalized Fermat 2543 38472570^65536+1 497101 L4774 2018 Generalized Fermat 2544 38385824^65536+1 497037 L4774 2018 Generalized Fermat 2545 143*2^1650689+1 496910 L1751 2012 2546 37044*1027^164997+1 496905 L4444 2018 2547 38199804^65536+1 496898 L4720 2018 Generalized Fermat 2548 1485*2^1650597+1 496883 L1134 2014 2549 785*2^1650459+1 496841 L2876 2012 2550 38040628^65536+1 496780 L4788 2018 Generalized Fermat 2551 1383*430^188603-1 496684 L4187 2015 2552 1023*2^1649882-1 496667 L1828 2014 2553 37887878^65536+1 496665 L4747 2018 Generalized Fermat 2554 37878964^65536+1 496658 L4787 2018 Generalized Fermat 2555 233*2^1649741+1 496624 L3405 2013 2556 183*2^1649506+1 496554 L2520 2013 2557 37732056^65536+1 496548 L4478 2018 Generalized Fermat 2558 69*2^1649423-1 496528 L621 2008 2559 925*2^1649360+1 496510 L3262 2012 2560 469949*2^1649228-1 496473 L160 2007 2561 37592308^65536+1 496442 L4747 2018 Generalized Fermat 2562 37463776^65536+1 496345 L4747 2018 Generalized Fermat 2563 19920911*2^1648678-1 496309 L806 2017 2564 1383*2^1648494-1 496250 L1828 2014 2565 37284376^65536+1 496208 L4773 2018 Generalized Fermat 2566 37219594^65536+1 496159 L4550 2018 Generalized Fermat 2567 295*2^1648168+1 496151 L2826 2013 2568 146*447^187198-1 496135 L4001 2018 2569 1071*2^1647962-1 496090 L1828 2014 2570 309*2^1647947-1 496084 L2028 2012 2571 209*2^1647640-1 495992 L2338 2012 2572 199*2^1647595-1 495978 L2074 2014 2573 36968128^65536+1 495966 L4774 2018 Generalized Fermat 2574 283824*151^227580-1 495898 L4001 2018 2575 445*2^1646888+1 495766 L1300 2013 2576 36633974^65536+1 495707 L4478 2018 Generalized Fermat 2577 331*2^1646668+1 495699 L2241 2013 2578 36614838^65536+1 495692 L4774 2018 Generalized Fermat 2579 2325*2^1646536-1 495661 L2484 2018 2580 57054*1027^164579+1 495647 L4001 2018 2581 36427586^65536+1 495546 L4777 2018 Generalized Fermat 2582 49*2^1646042+1 495510 L2516 2011 Generalized Fermat 2583 381*2^1646029-1 495507 L1809 2014 2584 36362214^65536+1 495495 L4775 2018 Generalized Fermat 2585 31347*2^1645868+1 495461 L3886 2014 2586 36279762^65536+1 495431 L4776 2018 Generalized Fermat 2587 36251736^65536+1 495409 L4774 2018 Generalized Fermat 2588 1695*2^1645579-1 495372 L527 2015 2589 36187924^65536+1 495359 L4550 2018 Generalized Fermat 2590d 4990*111^242169+1 495318 L4444 2018 2591 36127768^65536+1 495311 L4729 2018 Generalized Fermat 2592 36037446^65536+1 495240 L4751 2018 Generalized Fermat 2593 72532*5^708453-1 495193 p341 2012 2594 35753376^65536+1 495015 L4550 2018 Generalized Fermat 2595 35648406^65536+1 494931 L4745 2018 Generalized Fermat 2596 35599734^65536+1 494892 L4742 2018 Generalized Fermat 2597 35534500^65536+1 494840 L4758 2018 Generalized Fermat 2598 35458620^65536+1 494779 L4773 2018 Generalized Fermat 2599 35419084^65536+1 494747 L4772 2018 Generalized Fermat 2600 81*2^1643428+1 494724 g418 2009 Generalized Fermat 2601 771*2^1643321+1 494692 L1741 2012 2602 35255372^65536+1 494615 L4745 2018 Generalized Fermat 2603 933*2^1642574+1 494468 L2826 2012 2604 34904540^65536+1 494331 L4726 2018 Generalized Fermat 2605 34640098^65536+1 494114 L4697 2018 Generalized Fermat 2606 34575414^65536+1 494061 L4767 2018 Generalized Fermat 2607 1101*2^1641145-1 494037 L1828 2014 2608 34503816^65536+1 494002 L4525 2018 Generalized Fermat 2609 34397974^65536+1 493915 L4245 2018 Generalized Fermat 2610 1035092*3^1035092-1 493871 L3544 2013 Generalized Woodall 2611 34327650^65536+1 493856 L4622 2018 Generalized Fermat 2612 34197950^65536+1 493749 L4201 2018 Generalized Fermat 2613 2715*2^1640137-1 493734 L2484 2017 2614 33963124^65536+1 493553 L4765 2018 Generalized Fermat 2615 265*2^1639448+1 493526 L2322 2013 2616 315*2^1639432-1 493521 L1827 2011 2617 33910364^65536+1 493508 L4747 2018 Generalized Fermat 2618 4067*2^1639338-1 493494 L1959 2015 2619 33790428^65536+1 493408 L4758 2018 Generalized Fermat 2620 251048373*2^1638322+1 493193 p221 2009 2621 125522417*2^1638323+1 493193 p221 2009 2622 250171825*2^1638322+1 493193 p221 2009 2623 1000628481*2^1638320+1 493193 p221 2009 2624 33531480^65536+1 493189 L4526 2018 Generalized Fermat 2625 33468724^65536+1 493135 L4747 2018 Generalized Fermat 2626 4005*2^1638053-1 493107 L1959 2015 2627 33417368^65536+1 493092 L4760 2018 Generalized Fermat 2628 33406946^65536+1 493083 L4759 2018 Generalized Fermat 2629 33388034^65536+1 493067 L4201 2018 Generalized Fermat 2630 33255290^65536+1 492953 L4756 2018 Generalized Fermat 2631 531*2^1637465+1 492929 L2322 2012 2632 33160366^65536+1 492872 L4755 2018 Generalized Fermat 2633 33112172^65536+1 492830 L4745 2018 Generalized Fermat 2634 2*359^192871+1 492804 g424 2014 Divides Phi(359^192871,2) 2635 33075870^65536+1 492799 L4550 2018 Generalized Fermat 2636 33058194^65536+1 492784 L4745 2018 Generalized Fermat 2637 179*2^1636808-1 492731 L2444 2014 2638 32987968^65536+1 492723 L4753 2018 Generalized Fermat 2639 32778852^65536+1 492542 L4751 2018 Generalized Fermat 2640 32697566^65536+1 492472 L4387 2018 Generalized Fermat 2641 32675102^65536+1 492452 L4747 2018 Generalized Fermat 2642 1135*2^1635787-1 492425 L1828 2014 2643 32574488^65536+1 492364 L4745 2018 Generalized Fermat 2644 765*2^1635531+1 492347 L3035 2012 2645 871*2^1635488+1 492334 L3108 2012 2646 32517922^65536+1 492315 L4745 2018 Generalized Fermat 2647 369*2^1635299-1 492277 L1809 2014 2648 169*2^1635086+1 492213 L1130 2013 Generalized Fermat 2649 4145*2^1635016-1 492193 L1959 2014 2650 32370056^65536+1 492185 L4557 2018 Generalized Fermat 2651 277*2^1634878+1 492150 L1300 2013 2652 32235030^65536+1 492066 L4742 2018 Generalized Fermat 2653 32161210^65536+1 492001 L4741 2018 Generalized Fermat 2654 32056116^65536+1 491908 L4544 2018 Generalized Fermat 2655 31988978^65536+1 491848 L4690 2018 Generalized Fermat 2656 971*2^1633735+1 491807 L2735 2012 2657 31887064^65536+1 491757 L4738 2018 Generalized Fermat 2658 645*2^1633521+1 491742 L3035 2012 2659 31812740^65536+1 491691 L4690 2018 Generalized Fermat 2660 31689074^65536+1 491580 L4737 2018 Generalized Fermat 2661 1185*2^1632895+1 491554 L2989 2012 2662 267*2^1632893-1 491553 L1828 2013 2663 31647504^65536+1 491543 L4736 2018 Generalized Fermat 2664 31613530^65536+1 491512 L4530 2018 Generalized Fermat 2665 539*2^1632705+1 491496 L3237 2012 2666 53*2^1632590-1 491461 L2055 2011 2667 31515202^65536+1 491424 L4734 2018 Generalized Fermat 2668 31492936^65536+1 491403 L4733 2018 Generalized Fermat 2669 675*2^1632285+1 491370 L3260 2012 2670 31448254^65536+1 491363 L4309 2018 Generalized Fermat 2671 937*2^1632080+1 491309 L3221 2012 2672 31380744^65536+1 491302 L4725 2018 Generalized Fermat 2673 213*2^1632054-1 491300 L1863 2014 2674 31342854^65536+1 491267 L4731 2018 Generalized Fermat 2675 2115*2^1631867-1 491245 L1862 2015 2676 31154730^65536+1 491096 L4201 2018 Generalized Fermat 2677 31125356^65536+1 491069 L4729 2018 Generalized Fermat 2678 30946880^65536+1 490906 L4326 2018 Generalized Fermat 2679 30877996^65536+1 490842 L4726 2018 Generalized Fermat 2680 30813412^65536+1 490783 L4201 2018 Generalized Fermat 2681 30799220^65536+1 490769 L4285 2018 Generalized Fermat 2682 2715*2^1629931-1 490662 L2484 2017 2683 4103*2^1629508-1 490535 L1959 2015 2684 1245*2^1629370-1 490493 L1828 2014 2685 321*2^1629307+1 490473 L2981 2013 2686 267*2^1629148-1 490425 L1828 2013 2687 555*2^1629059+1 490399 L1741 2012 2688 30376064^65536+1 490376 L4387 2018 Generalized Fermat 2689 30328508^65536+1 490331 L4726 2018 Generalized Fermat 2690 30250088^65536+1 490257 L4725 2018 Generalized Fermat 2691 907*2^1628548+1 490245 L2826 2012 2692 30216696^65536+1 490226 L4201 2018 Generalized Fermat 2693 69*2^1628378+1 490193 L2507 2011 2694 30101988^65536+1 490118 L4201 2018 Generalized Fermat 2695 30046920^65536+1 490066 L4720 2018 Generalized Fermat 2696 113*2^1627496-1 489928 L2484 2011 2697 29863462^65536+1 489891 L4656 2018 Generalized Fermat 2698 29723118^65536+1 489757 L4530 2018 Generalized Fermat 2699 2115*2^1626565-1 489649 L1862 2015 2700 29585874^65536+1 489625 L4210 2018 Generalized Fermat 2701 63*2^1626259-1 489555 L1828 2011 2702 29509260^65536+1 489552 L4550 2018 Generalized Fermat 2703 29501096^65536+1 489544 L4722 2018 Generalized Fermat 2704 29500622^65536+1 489543 L4201 2018 Generalized Fermat 2705 63*2^1625970+1 489468 L1135 2011 2706 29350290^65536+1 489398 L4672 2018 Generalized Fermat 2707 29340732^65536+1 489389 L4550 2018 Generalized Fermat 2708 29247740^65536+1 489298 L4720 2018 Generalized Fermat 2709 29202654^65536+1 489254 L4285 2018 Generalized Fermat 2710 29097708^65536+1 489152 L4245 2018 Generalized Fermat 2711 975*2^1624794+1 489115 L2085 2012 2712 29048042^65536+1 489103 L4210 2018 Generalized Fermat 2713 715*2^1624000+1 488876 L3335 2012 2714 897*2^1623927+1 488854 L3173 2012 2715 28768058^65536+1 488828 L4530 2018 Generalized Fermat 2716 28580718^65536+1 488642 L4709 2017 Generalized Fermat 2717 28487278^65536+1 488549 L4500 2017 Generalized Fermat 2718 1614*151^224194-1 488517 L4444 2018 2719 1107*2^1622806-1 488517 L1828 2014 2720 28413758^65536+1 488475 L4286 2017 Generalized Fermat 2721a 3706*24^353908+1 488472 L4806 2019 2722 28099080^65536+1 488158 L4252 2017 Generalized Fermat 2723 651*2^1621489+1 488120 L3141 2012 2724 28027008^65536+1 488085 L4705 2017 Generalized Fermat 2725 939*2^1621215+1 488038 L3312 2012 2726 1179*2^1621053-1 487989 L1828 2014 2727 65716*1027^162025+1 487955 L4001 2018 2728 225*2^1620601-1 487852 L2074 2013 2729 27768276^65536+1 487821 L4701 2017 Generalized Fermat 2730 3147*2^1620488-1 487819 L4036 2015 2731 27738902^65536+1 487791 L4295 2017 Generalized Fermat 2732 27678634^65536+1 487729 L4249 2017 Generalized Fermat 2733 27639120^65536+1 487688 L4252 2017 Generalized Fermat 2734 27625562^65536+1 487674 L4697 2017 Generalized Fermat 2735 27548300^65536+1 487595 L4693 2017 Generalized Fermat 2736 27441534^65536+1 487484 L4649 2017 Generalized Fermat 2737 27372028^65536+1 487412 L4649 2017 Generalized Fermat 2738 913*2^1619004+1 487372 L3167 2012 2739 27326204^65536+1 487364 L4649 2017 Generalized Fermat 2740a 12799*24^353083+1 487334 L4806 2019 2741 269*2^1618877+1 487333 L1741 2013 2742 183*2^1618775-1 487303 L384 2014 2743 27264470^65536+1 487300 L4286 2017 Generalized Fermat 2744 27243670^65536+1 487278 L4286 2017 Generalized Fermat 2745 117*2^1618434-1 487200 L384 2014 2746 2*626^174203+1 487172 L1471 2011 2747 1082*117^235482+1 487024 p376 2015 2748 26987486^65536+1 487009 L4672 2017 Generalized Fermat 2749 4041*2^1617699-1 486980 L1959 2015 2750 26916240^65536+1 486934 L4688 2017 Generalized Fermat 2751 26886748^65536+1 486903 L4686 2017 Generalized Fermat 2752 495*2^1616716+1 486683 L2967 2013 2753 26578974^65536+1 486575 L4261 2017 Generalized Fermat 2754 825*2^1616204+1 486529 L3014 2012 2755 87*2^1616138-1 486508 L1828 2011 2756 1039*2^1616090+1 486495 L3173 2012 2757 1305*2^1616072-1 486490 L1828 2014 2758 26484668^65536+1 486474 L4684 2017 Generalized Fermat 2759 26477248^65536+1 486466 L4672 2017 Generalized Fermat 2760 357*2^1615655+1 486364 L3422 2013 2761 4121*2^1615478-1 486311 L1959 2014 2762 25987186^65536+1 485934 L4679 2017 Generalized Fermat 2763 25981818^65536+1 485928 L4595 2017 Generalized Fermat 2764 25939926^65536+1 485882 L4678 2017 Generalized Fermat 2765 25894728^65536+1 485833 L4672 2017 Generalized Fermat 2766 25893048^65536+1 485831 L4672 2017 Generalized Fermat 2767 25815054^65536+1 485745 L4677 2017 Generalized Fermat 2768 9101981*2^1612898-1 485538 L1134 2014 2769 39*2^1612681+1 485467 L1379 2011 2770 231*2^1612617-1 485449 L1862 2015 2771 25369696^65536+1 485250 L4672 2017 Generalized Fermat 2772 25355170^65536+1 485233 L4672 2017 Generalized Fermat 2773 395*2^1611672-1 485165 L1819 2013 2774 25281714^65536+1 485151 L4550 2017 Generalized Fermat 2775 25226438^65536+1 485089 L4550 2017 Generalized Fermat 2776 31*2^1611311-1 485055 L330 2010 2777 343464*151^222581-1 485005 L4001 2018 2778 25069382^65536+1 484911 L4476 2017 Generalized Fermat 2779 713*2^1610773+1 484894 L3110 2012 2780 3193*2^1610098+1 484692 p168 2016 2781 24859030^65536+1 484671 L4660 2017 Generalized Fermat 2782 24813140^65536+1 484618 L4658 2017 Generalized Fermat 2783 133*2^1609799-1 484600 L1959 2014 2784 459*2^1609603+1 484542 L2787 2013 2785 24730888^65536+1 484524 L4655 2017 Generalized Fermat 2786 24722142^65536+1 484514 L4654 2017 Generalized Fermat 2787 1017*2^1609428-1 484490 L1828 2014 2788 569*2^1608879+1 484324 L333 2012 2789 521*2^1608779+1 484294 L2051 2012 2790 24528070^65536+1 484289 L4645 2017 Generalized Fermat 2791 24510980^65536+1 484270 L4629 2017 Generalized Fermat 2792 24293444^65536+1 484016 L4629 2017 Generalized Fermat 2793 1041*2^1607579-1 483933 L1828 2014 2794 24220066^65536+1 483930 L4584 2017 Generalized Fermat 2795 24163706^65536+1 483864 L4623 2017 Generalized Fermat 2796 81*2^1606848+1 483712 gt 2007 Generalized Fermat 2797 10005*2^1606698-1 483669 L4405 2018 2798 1291*2^1606629-1 483647 L1828 2014 2799 23947122^65536+1 483607 L4619 2017 Generalized Fermat 2800 465*2^1606272+1 483539 L2826 2013 2801 1113*2^1606260-1 483536 L1828 2014 2802 1109*2^1606173+1 483510 L1935 2012 2803 23864352^65536+1 483509 L4387 2017 Generalized Fermat 2804 331530*151^221876-1 483469 L4001 2018 2805 288*706^169692+1 483422 p268 2013 2806 183*2^1605657+1 483354 L2085 2013 2807 23582210^65536+1 483170 L4613 2017 Generalized Fermat 2808 486*187^212627+1 483058 p289 2012 2809d 320607*2^1604657-1 483056 g337 2018 2810 16778*745^168179-1 483041 L4189 2016 2811 48*580^174782-1 483000 p355 2013 2812 264530*(9*2^1603956-1)+1 482846 p168 2016 2813 Phi(3,-81422^49152) 482746 L4142 2016 Generalized unique 2814 23138154^65536+1 482629 L4584 2017 Generalized Fermat 2815 23080390^65536+1 482558 L4599 2017 Generalized Fermat 2816 23077164^65536+1 482554 L4584 2017 Generalized Fermat 2817 1009*2^1602478+1 482397 L1300 2012 2818 106*564^175330+1 482384 L4001 2017 2819 22877386^65536+1 482307 L4595 2017 Generalized Fermat 2820 22872882^65536+1 482301 L4596 2017 Generalized Fermat 2821 22858812^65536+1 482283 L4594 2017 Generalized Fermat 2822 2*3^1010743-1 482248 L426 2011 2823 22740816^65536+1 482136 L4544 2017 Generalized Fermat 2824 22738600^65536+1 482133 L4589 2017 Generalized Fermat 2825 22696662^65536+1 482081 L4585 2017 Generalized Fermat 2826 22684548^65536+1 482066 L4587 2017 Generalized Fermat 2827 22677562^65536+1 482057 L4587 2017 Generalized Fermat 2828 22672358^65536+1 482050 L4584 2017 Generalized Fermat 2829 22602162^65536+1 481962 L4581 2017 Generalized Fermat 2830 73187*6^619238-1 481866 L4521 2017 2831 959*2^1600467+1 481792 L1745 2012 2832 1305*2^1600351-1 481757 L1828 2014 2833 22402670^65536+1 481710 L4559 2017 Generalized Fermat 2834 1073*2^1600077+1 481675 L3110 2012 2835 22230230^65536+1 481490 L4559 2017 Generalized Fermat 2836 22191882^65536+1 481441 L4559 2017 Generalized Fermat 2837 4011*2^1599078-1 481375 L1959 2015 2838 27*220^205486+1 481337 L4345 2016 2839 22082900^65536+1 481301 L4559 2017 Generalized Fermat 2840 93*872^163674-1 481289 L4453 2016 2841 21990626^65536+1 481181 L4559 2017 Generalized Fermat 2842 21946386^65536+1 481124 L4559 2017 Generalized Fermat 2843 21928344^65536+1 481101 L4210 2017 Generalized Fermat 2844 335*2^1597932-1 481028 L3844 2014 2845 21844548^65536+1 480992 L4210 2017 Generalized Fermat 2846 555*2^1597517+1 480904 L2366 2012 2847 15*2^1597510+1 480900 g279 2006 2848 21697066^65536+1 480799 L4567 2017 Generalized Fermat 2849 305*2^1597089+1 480775 L2520 2013 2850 216290*167^216290-1 480757 L2777 2012 Generalized Woodall 2851 21632926^65536+1 480715 L4545 2017 Generalized Fermat 2852 235*2^1596836+1 480698 L2085 2013 2853 391*2^1596805-1 480689 L3870 2014 2854 1033*2^1596708+1 480661 L3173 2012 2855 135*2^1596454+1 480583 L2532 2013 2856 1151*2^1596226-1 480515 L1828 2014 2857 21438976^65536+1 480458 L4245 2017 Generalized Fermat 2858 21352892^65536+1 480344 L4563 2017 Generalized Fermat 2859 21298612^65536+1 480271 L4201 2017 Generalized Fermat 2860 659*2^1595363+1 480255 L1935 2012 2861 315*2^1595314+1 480240 L3397 2013 2862 69*2^1595083+1 480170 L2085 2011 2863 21207594^65536+1 480149 L4549 2017 Generalized Fermat 2864 21123886^65536+1 480037 L4559 2017 Generalized Fermat 2865 1163*2^1594568-1 480016 L1828 2014 2866 1113*2^1594402+1 479966 L1300 2012 2867 58753*2^1594323-1 479944 p190 2006 2868 21003082^65536+1 479874 L4557 2017 Generalized Fermat 2869 20958760^65536+1 479814 L4245 2017 Generalized Fermat 2870 555*2^1593788+1 479781 L3035 2012 2871 481*2^1593660+1 479743 L1204 2013 2872 1197*2^1593401-1 479665 L1828 2014 2873 1147*2^1593256+1 479621 L3035 2012 2874 20794390^65536+1 479589 L4249 2017 Generalized Fermat 2875 737*2^1592724-1 479461 L191 2006 2876 20673706^65536+1 479424 L4245 2017 Generalized Fermat 2877 20670628^65536+1 479420 L4245 2017 Generalized Fermat 2878 79*2^1592422+1 479369 L1885 2011 2879 853*2^1592254+1 479320 L3035 2012 2880 110413*2^1591999-1 479245 L111 2005 2881 99*2^1591984-1 479237 L282 2009 2882 4233*28^331135+1 479209 p385 2015 2883 315002*151^219911-1 479187 L4001 2018 2884 20495674^65536+1 479178 L4201 2017 Generalized Fermat 2885b 555*2^1591677-1 479146 L2017 2019 2886 20417546^65536+1 479069 L4286 2017 Generalized Fermat 2887 20416586^65536+1 479068 L4308 2017 Generalized Fermat 2888 1179*2^1591362+1 479051 g387 2006 2889 875*2^1591229+1 479011 L3221 2012 2890 20368808^65536+1 479001 L4201 2017 Generalized Fermat 2891 20338906^65536+1 478959 L4245 2017 Generalized Fermat 2892 20338564^65536+1 478959 L4549 2017 Generalized Fermat 2893 1377*2^1591036-1 478953 L1828 2014 2894 20317650^65536+1 478929 L4252 2017 Generalized Fermat 2895 65623*2^1590940+1 478926 L3886 2014 2896 135*2^1590711+1 478854 L1204 2013 2897 169*2^1590665-1 478841 L2074 2014 2898 1227*2^1590433-1 478772 L1828 2014 2899 279*2^1590369-1 478752 L1828 2013 2900 1135*2^1590353-1 478748 L1828 2014 2901b 427*2^1590349-1 478746 L2017 2019 2902 20109598^65536+1 478636 L4550 2017 Generalized Fermat 2903 740*383^185249+1 478538 L2012 2014 2904 121*2^1589157-1 478387 L65 2005 2905 44*872^162680-1 478365 L4453 2016 2906 19916902^65536+1 478362 L4245 2017 Generalized Fermat 2907 19810832^65536+1 478210 L4549 2017 Generalized Fermat 2908 285*2^1588353+1 478145 L1733 2013 2909 33834*151^219386-1 478042 L4001 2018 2910 1281*2^1587882-1 478004 L1828 2014 2911 263*2^1587302-1 477828 L2101 2012 2912 289*2^1587151-1 477783 L1828 2011 2913 19514276^65536+1 477781 L4201 2017 Generalized Fermat 2914 1197*2^1587140+1 477780 L3260 2012 2915 19502212^65536+1 477763 p160 2005 Generalized Fermat 2916 19451454^65536+1 477689 L4544 2017 Generalized Fermat 2917 19432158^65536+1 477661 L4245 2017 Generalized Fermat 2918 1191*2^1586696+1 477647 L2876 2012 2919 19415886^65536+1 477637 L4545 2017 Generalized Fermat 2920 1039*2^1586474+1 477580 L1502 2012 2921 261*2^1586347+1 477541 L3237 2013 2922 19194688^65536+1 477311 L4245 2017 Generalized Fermat 2923 1221*2^1585485-1 477282 L1828 2014 2924 19165998^65536+1 477268 L4245 2017 Generalized Fermat 2925 19149988^65536+1 477245 L4201 2017 Generalized Fermat 2926 277*2^1584740+1 477057 L1502 2013 2927 4056*703^167545-1 476997 L4001 2016 2928 1908*22^355313+1 476984 L1471 2013 2929 1017*2^1584225-1 476903 L1828 2014 2930 393*2^1583890-1 476801 L3844 2014 2931d 551*2^1583718-1 476750 L3994 2018 2932 18788582^65536+1 476702 L4537 2017 Generalized Fermat 2933 763*2^1583512+1 476688 L1935 2012 2934 277*2^1583097-1 476563 L2484 2013 2935e 433*2^1583059-1 476551 L3994 2018 2936 18682542^65536+1 476541 L4530 2017 Generalized Fermat 2937 855*2^1582921+1 476510 L3035 2012 2938 4009*2^1582889-1 476501 L1959 2015 2939 6326*333^188895+1 476481 L4592 2017 2940 18612352^65536+1 476434 L4245 2017 Generalized Fermat 2941 2955*2^1582609-1 476417 L3887 2017 2942e 471*2^1582593-1 476411 L3994 2018 2943 1098133#-1 476311 p346 2012 Primorial 2944 (2^64-189)*10^476124+1 476144 p342 2013 2945 311*2^1581686-1 476138 L623 2009 2946 18387422^65536+1 476088 L4309 2017 Generalized Fermat 2947 18364744^65536+1 476053 L4387 2017 Generalized Fermat 2948 10038*1027^158056+1 476001 L4001 2018 2949 87*2^1580858+1 475888 L2487 2011 Divides GF(1580856,6) 2950 18255116^65536+1 475883 L4536 2017 Generalized Fermat 2951 1185*2^1580824-1 475879 L1828 2014 2952 989*2^1580147+1 475675 L3333 2012 2953 40962*1027^157930+1 475622 L4001 2018 2954 159*2^1579426+1 475457 L3179 2013 2955 4494381*2^1579256+1 475411 L2425 2011 2956 3437965*2^1579256+1 475410 L2425 2011 2957 552073*2^1579256+1 475410 L2425 2011 2958 396687*2^1579256+1 475410 L2425 2011 2959f 449*2^1579160-1 475378 L3994 2018 2960 17931126^65536+1 475373 L4245 2017 Generalized Fermat 2961 1167*2^1579018+1 475335 L1728 2012 2962 603*2^1578398+1 475148 L333 2012 2963 2488*5^679769-1 475142 p321 2011 2964 17770454^65536+1 475117 L4245 2017 Generalized Fermat 2965 17757426^65536+1 475096 L4530 2017 Generalized Fermat 2966 17716338^65536+1 475030 L4245 2017 Generalized Fermat 2967 600921*2^1577963+1 475020 g337 2018 2968 1195*2^1577839-1 474980 L1828 2014 2969 17684828^65536+1 474979 g410 2007 Generalized Fermat 2970 17655444^65536+1 474932 g410 2007 Generalized Fermat 2971 17629398^65536+1 474890 g410 2007 Generalized Fermat 2972 1712*333^188252+1 474859 L4001 2017 2973 365*2^1577413+1 474852 L1204 2013 2974 17594396^65536+1 474833 L4245 2017 Generalized Fermat 2975 553*2^1577344+1 474831 L3260 2012 2976f 427*2^1577169-1 474778 L3994 2018 2977 17493552^65536+1 474670 L4380 2017 Generalized Fermat 2978 4065*2^1576362-1 474536 L1959 2015 2979 909*2^1576339+1 474529 L2085 2012 2980 805*2^1576258+1 474504 L3035 2012 2981 10^474500+999*10^237249+1 474501 p363 2014 Palindrome 2982 171*2^1575999-1 474426 L384 2014 2983 17328156^65536+1 474399 L4526 2017 Generalized Fermat 2984 99*2^1575803+1 474366 L1500 2011 2985 373*2^1575751-1 474351 L1819 2012 2986 17265602^65536+1 474296 L4525 2017 Generalized Fermat 2987f 557*2^1575504-1 474277 L3994 2018 2988 1003*2^1575486+1 474272 L1484 2012 2989 17157558^65536+1 474118 L4285 2017 Generalized Fermat 2990 29*2^1574753+1 474050 L391 2008 2991 1347*2^1574633-1 474015 L1828 2014 2992 67*2^1573454+1 473659 L1125 2011 2993 16858742^65536+1 473618 L4519 2017 Generalized Fermat 2994 16787702^65536+1 473498 L4295 2017 Generalized Fermat 2995 703*2^1572182+1 473277 L2366 2012 2996 557*2^1571700-1 473132 L3994 2018 2997 2355*2^1571668-1 473123 L2484 2017 2998 175*2^1571521-1 473078 L2074 2013 2999 4067*2^1570800-1 472862 L1959 2015 3000 111*2^1570718-1 472836 L1862 2012 3001 16326986^65536+1 472706 L4508 2016 Generalized Fermat 3002 26*800^162819+1 472680 p355 2012 3003 429*2^1569942+1 472603 L2675 2013 3004c 334*319^188699+1 472466 p365 2019 3005 16120142^65536+1 472343 L4502 2016 Generalized Fermat 3006 4183*2^1568799-1 472260 L1959 2014 3007 197*2^1568755+1 472245 L1204 2013 3008 16034826^65536+1 472192 L4500 2016 Generalized Fermat 3009 483*2^1568404+1 472140 L1204 2013 3010 15948188^65536+1 472037 L4495 2016 Generalized Fermat 3011 199388*233^199388-1 472028 L4780 2018 Generalized Woodall 3012 139*2^1567874+1 471980 p189 2006 3013 15893070^65536+1 471939 L4249 2016 Generalized Fermat 3014 1345*2^1567289-1 471805 L1828 2014 3015 103040!-1 471794 p301 2010 Factorial 3016 331882*5^674961-1 471784 p333 2011 3017 15800506^65536+1 471773 L4252 2016 Generalized Fermat 3018 191*2^1567005+1 471718 L3035 2013 3019d 106*380^182846+1 471706 p365 2018 3020 69*2^1566375-1 471528 L1828 2011 3021 15603948^65536+1 471416 L4456 2016 Generalized Fermat 3022 1079*2^1565923+1 471393 L1344 2012 3023 33910*1027^156522+1 471382 L4700 2018 3024 15499198^65536+1 471225 L4456 2016 Generalized Fermat 3025 285*2^1565353-1 471221 L3202 2013 3026 729*366^183817-1 471215 L2054 2011 3027 15471020^65536+1 471173 L4488 2016 Generalized Fermat 3028 15454262^65536+1 471142 L4456 2016 Generalized Fermat 3029 2925*2^1564031-1 470824 L2484 2017 3030 340020*151^216036-1 470743 L4001 2018 3031 597*2^1563213-1 470577 L2519 2018 3032 285*2^1563167-1 470563 L3202 2013 3033 1047*2^1563150+1 470559 L3221 2012 3034 19000302866132191930...(470418 other digits)...64447092025915867137 470458 p360 2013 3035 15069494^65536+1 470424 L4478 2016 Generalized Fermat 3036 103*2^1562619-1 470398 L2484 2012 3037 15005274^65536+1 470303 L4476 2016 Generalized Fermat 3038 10115*2^1562075+1 470236 p344 2017 3039 149*2^1561951+1 470197 L2322 2013 3040 14947856^65536+1 470194 L4456 2016 Generalized Fermat 3041 891*2^1561849+1 470167 L2626 2012 3042 137132*151^215769-1 470161 L4001 2018 3043 14914430^65536+1 470130 L4467 2016 Generalized Fermat 3044 14914230^65536+1 470130 L4261 2016 Generalized Fermat 3045 93*2^1561686+1 470117 L1741 2011 3046 14832496^65536+1 469973 L4456 2016 Generalized Fermat 3047 14832074^65536+1 469972 L4456 2016 Generalized Fermat 3048 931*2^1561084+1 469937 L1167 2012 3049 14807318^65536+1 469925 L4387 2016 Generalized Fermat 3050 14778298^65536+1 469869 L4456 2016 Generalized Fermat 3051 14750712^65536+1 469816 L4387 2016 Generalized Fermat 3052 695*2^1560515+1 469765 L2117 2012 3053 14705866^65536+1 469729 L4456 2016 Generalized Fermat 3054 219*2^1560099+1 469639 L1505 2013 3055 14518950^65536+1 469365 L4451 2016 Generalized Fermat 3056 371*2^1559073+1 469331 L1745 2013 3057 651*2^1558979+1 469303 L3329 2012 3058 14059910^65536+1 468451 L4387 2016 Generalized Fermat 3059 14050484^65536+1 468432 L4387 2016 Generalized Fermat 3060 3423*2^1555994-1 468405 L860 2017 3061 262904*151^214927-1 468327 L4700 2018 3062 390327*2^1555555+1 468275 L4828 2018 3063 13968798^65536+1 468266 L4429 2016 Generalized Fermat 3064 13944760^65536+1 468217 L4371 2016 Generalized Fermat 3065 3615*2^1555289-1 468193 L860 2017 3066 817*2^1554994+1 468103 L2085 2012 3067 15876*1027^155415-1 468048 L4001 2018 3068 117*2^1554601-1 467984 L3519 2013 3069 13830802^65536+1 467983 L4424 2016 Generalized Fermat 3070 3615*2^1554565-1 467975 L860 2017 3071 1185*2^1553995+1 467803 L2366 2012 3072 161*2^1553570-1 467674 L177 2011 3073 1043*2^1553422-1 467630 L1828 2014 3074 13657452^65536+1 467624 L4410 2016 Generalized Fermat 3075 1361*2^1552370-1 467314 L1828 2014 3076 13466298^65536+1 467223 L4415 2016 Generalized Fermat 3077 1323*2^1551755-1 467128 L1828 2014 3078 13398688^65536+1 467080 L4410 2016 Generalized Fermat 3079 13332130^65536+1 466938 L4411 2016 Generalized Fermat 3080 327542*151^214253-1 466858 L4001 2018 3081d 29009*24^338099+1 466653 L4806 2018 3082 4053*2^1550167-1 466651 L1959 2015 3083 (30^157950+1)^2-2 466623 p392 2016 3084 13029860^65536+1 466285 L4326 2016 Generalized Fermat 3085 1071*2^1548940+1 466281 L1204 2012 3086 71730*1027^154816+1 466245 L4700 2018 3087 1021*2^1548585-1 466174 L1828 2014 3088 12941970^65536+1 466093 L4371 2016 Generalized Fermat 3089 52*701^163776+1 466063 p268 2013 3090 1199*2^1548171+1 466049 L2981 2012 3091 12914686^65536+1 466032 L4400 2016 Generalized Fermat 3092 95*10^466002-1 466004 L3735 2014 Near-repdigit 3093 189*2^1547744-1 465920 L384 2014 3094 363*2^1547344-1 465800 L3870 2014 3095 4113*2^1547054-1 465714 L1959 2015 3096 12764608^65536+1 465700 L4395 2016 Generalized Fermat 3097 4101*2^1546943-1 465680 L1959 2015 3098 63428*151^213670-1 465587 L4001 2018 3099 409*2^1546542+1 465559 L3248 2013 3100 12660574^65536+1 465467 L4391 2016 Generalized Fermat 3101 135*2^1545961+1 465383 L2549 2013 3102 12620940^65536+1 465378 L4389 2016 Generalized Fermat 3103 539*2^1545909+1 465368 L3327 2012 3104 477*2^1545648+1 465290 L1484 2013 3105 4053*2^1545380-1 465210 L1959 2015 3106 12510100^65536+1 465127 L4387 2016 Generalized Fermat 3107 12508790^65536+1 465124 L4380 2016 Generalized Fermat 3108 4087*2^1545033-1 465105 L1959 2014 3109 243828*151^213445-1 465098 L4001 2018 3110 81*2^1544545+1 464957 gt 2007 3111 1003*2^1544288+1 464881 L1129 2012 3112 5*10^464843-1 464844 p297 2011 Near-repdigit 3113 12376146^65536+1 464820 L4380 2016 Generalized Fermat 3114 95*2^1543676-1 464695 L2338 2011 3115 63642*1027^154283+1 464639 L4001 2018 3116 3555*2^1542812-1 464437 L860 2017 3117 227*2^1542323+1 464288 L1204 2013 3118 703*2^1542084+1 464217 L2038 2012 3119 12102810^65536+1 464185 L4371 2016 Generalized Fermat 3120 12084448^65536+1 464141 L4370 2016 Generalized Fermat 3121 149*2^1541152-1 463936 L384 2013 3122 53*2^1541133+1 463929 L1158 2011 3123 11948010^65536+1 463818 L4367 2016 Generalized Fermat 3124 83*2^1540750-1 463814 L1959 2011 3125 1061*2^1540377+1 463703 L2322 2012 3126 11844886^65536+1 463571 L4366 2016 Generalized Fermat 3127 11804536^65536+1 463474 L4363 2016 Generalized Fermat 3128 315*2^1539539-1 463450 L1827 2011 3129 11793760^65536+1 463448 L4362 2016 Generalized Fermat 3130 395*2^1538975+1 463281 L2826 2013 3131 6*643^164915+1 463117 L3610 2013 3132 80883*6^595142-1 463116 L4521 2017 3133 93930*151^212532-1 463108 L4001 2018 3134 11611202^65536+1 463004 L4359 2016 Generalized Fermat 3135 205*2^1537779-1 462920 L2444 2014 3136 333*2^1537644-1 462880 L1827 2011 3137 1077*2^1537453-1 462823 L1828 2013 3138b 16*422^176284+1 462802 L4786 2019 Generalized Fermat 3139 759*2^1537049+1 462701 L1484 2012 3140 1245*2^1536104-1 462417 L1828 2013 3141 1293*2^1536042-1 462398 L1828 2013 3142a 621*2^1535722-1 462302 L2257 2019 3143 699*2^1535678+1 462288 L1122 2012 3144 63*2^1535612-1 462268 L1828 2011 3145 234847*2^1535589-1 462264 L73 2005 3146a 965*2^1535500-1 462235 L2257 2019 3147 11292580^65536+1 462212 L4201 2016 Generalized Fermat 3148 16260*565^167947-1 462203 L4586 2017 3149 11224312^65536+1 462040 L4201 2016 Generalized Fermat 3150 8331405*2^1534807-1 462030 L260 2011 3151 11215796^65536+1 462018 L4201 2016 Generalized Fermat 3152 4039*2^1534551-1 461950 L1959 2015 3153a 849*2^1534483-1 461929 L2257 2019 3154 291*2^1534413-1 461907 L2484 2013 3155 11168512^65536+1 461898 L4201 2016 Generalized Fermat 3156a 5819*2^1534075+1 461807 L1209 2019 3157 393*2^1534045+1 461797 L2826 2013 3158 11110588^65536+1 461750 L4201 2016 Generalized Fermat 3159a 3929*2^1533741+1 461706 L4815 2019 3160a 1317*2^1533608+1 461666 L4732 2019 3161a 1303*2^1533564+1 461652 L1115 2019 3162 165*2^1533368+1 461592 L3149 2013 3163a 1369*2^1533302+1 461574 L4448 2019 Generalized Fermat 3164a 5797*2^1533258+1 461561 L4924 2019 3165 11033686^65536+1 461552 L4201 2016 Generalized Fermat 3166a 1743*2^1533185+1 461538 L4815 2019 3167a 927*2^1533160-1 461531 L2257 2019 3168a 3145*2^1533078+1 461506 L1115 2019 3169a 8913*2^1532938+1 461465 L1204 2019 3170c 747*2^1532798-1 461422 L2257 2019 3171a 7725*2^1532720+1 461399 L1387 2019 3172a 6923*2^1532697+1 461392 L1115 2019 3173 2445*2^1532647-1 461377 L1862 2015 3174a 1311*2^1532596+1 461361 L1209 2019 3175 10957508^65536+1 461355 L4201 2016 Generalized Fermat 3176a 6077*2^1532479+1 461326 L1444 2019 3177b 1289*2^1532239+1 461254 L4754 2019 3178d 939*2^1532143-1 461224 L2257 2018 3179b 9805*2^1532058+1 461200 L4066 2019 3180b 7977*2^1531430+1 461011 L4890 2019 3181d 815*2^1531386-1 460997 L2257 2018 3182b 4345*2^1531330+1 460980 L4723 2019 3183 10808098^65536+1 460964 L4201 2016 Generalized Fermat 3184b 9817*2^1531184+1 460937 L2103 2019 3185 1203*2^1531143-1 460924 L1828 2013 3186b 9813*2^1531088+1 460908 L4890 2019 3187 10771330^65536+1 460867 L4252 2016 Generalized Fermat 3188 146280*151^211496-1 460851 L4001 2018 3189 63*2^1530888+1 460846 L2487 2011 3190 10755500^65536+1 460825 L4201 2016 Generalized Fermat 3191b 4225*2^1530568+1 460751 L4878 2019 Generalized Fermat 3192b 2545*2^1530458+1 460718 L4890 2019 3193 41*2^1530313+1 460672 L2131 2011 3194b 6845*2^1530269+1 460661 L4854 2019 3195b 3315*2^1530270+1 460661 L4746 2019 3196e 951*2^1530151-1 460625 L2257 2018 3197 2484*333^182603+1 460610 L4444 2017 3198b 3009*2^1530070+1 460601 L4824 2019 3199 1195*2^1530031-1 460589 L1828 2013 3200 10663638^65536+1 460581 L4341 2016 Generalized Fermat 3201 1099*2^1529993-1 460577 L1828 2013 3202b 6899*2^1529981+1 460575 L3561 2019 3203 347*2^1529964-1 460568 L2235 2013 3204 1455*2^1529868-1 460540 L1134 2015 3205b 372*45^278559-1 460520 L4444 2019 3206b 8495*2^1529743+1 460503 L1444 2019 3207b 3903*2^1529701+1 460490 L4890 2019 3208e 633*2^1529603-1 460460 L2257 2018 3209b 7513*2^1529518+1 460435 L3181 2019 3210b 3823*2^1529518+1 460435 L1115 2019 3211 247*2^1529485-1 460424 L2338 2011 3212b 8997*2^1529424+1 460407 L4739 2019 3213b 4409*2^1529327+1 460377 L3784 2019 3214b 3485*2^1529267+1 460359 L4723 2019 3215 771*2^1529249+1 460353 L3271 2012 3216b 8683*2^1529204+1 460341 L4746 2019 3217 941*2^1529195+1 460337 L3110 2012 3218 505*2^1529188+1 460335 L2826 2012 3219 1105*2^1529161-1 460327 L1828 2013 3220b 3865*2^1529102+1 460310 L2979 2019 3221b 8537*2^1529043+1 460292 L4732 2019 3222b 3005*2^1528923+1 460256 L1204 2019 3223b 5825*2^1528821+1 460225 L1204 2019 3224b 4845*2^1528682+1 460183 L1204 2019 3225b 8263*2^1528602+1 460159 L4754 2019 3226b 8555*2^1528599+1 460159 L4724 2019 3227b 7835*2^1528449+1 460113 L2992 2019 3228f 441466!5+1 460064 x46 2018 Multifactorial 3229 10464954^65536+1 460046 L4201 2016 Generalized Fermat 3230b 5935*2^1528100+1 460008 L4854 2019 3231b 3131*2^1528073+1 460000 L1957 2019 3232b 9809*2^1527889+1 459945 L4882 2019 3233b 6609*2^1527883+1 459943 L2158 2019 3234 1113*2^1527832-1 459927 L1828 2013 3235b 5457*2^1527711+1 459891 L4727 2019 3236b 8359*2^1527674+1 459880 L4882 2019 3237b 6561*2^1527669+1 459879 L4882 2019 3238b 5559*2^1527491+1 459825 L3784 2019 3239b 6067*2^1527390+1 459794 L4761 2019 3240 256*12^426048+1 459786 L3802 2017 Generalized Fermat 3241b 5649*2^1527239+1 459749 L2873 2019 3242b 3579*2^1527207+1 459739 L1444 2019 3243b 9277*2^1527082+1 459702 L4915 2019 3244 171588*151^210942-1 459643 L4001 2018 3245b 3517*2^1526828+1 459625 L4724 2019 3246b 3005*2^1526823+1 459623 L4364 2019 3247b 8649*2^1526755+1 459603 L2873 2019 3248 279*2^1526518+1 459531 L3173 2013 3249b 1829*2^1526443+1 459509 L2873 2019 3250 1071*2^1526401+1 459496 L3221 2012 3251 121*2^1526097-1 459404 L65 2005 3252b 7113*2^1526034+1 459386 L2196 2019 3253 10221008^65536+1 459375 L4201 2016 Generalized Fermat 3254b 1845*2^1525961+1 459364 L4778 2019 3255b 2109*2^1525849+1 459330 L1745 2019 3256b 4051*2^1525812+1 459319 L1444 2019 3257b 9841*2^1525760+1 459304 L4834 2019 3258b 3129*2^1525415+1 459200 L4834 2019 3259b 2113*2^1525388+1 459191 L1209 2019 3260 8515*2^1525105-1 459107 L1884 2017 3261b 2261*2^1525005+1 459076 L1204 2019 3262b 9219*2^1524901+1 459045 L3784 2019 3263 8515*2^1524873-1 459037 L1884 2017 3264b 8643*2^1524849+1 459030 L2564 2019 3265b 6237*2^1524828+1 459023 L2724 2019 3266b 6483*2^1524796+1 459014 L3972 2019 3267 10090890^65536+1 459010 L4201 2016 Generalized Fermat 3268b 7605*2^1524774+1 459007 L4912 2019 3269b 5883*2^1524717+1 458990 L1204 2019 3270b 2229*2^1524714+1 458988 L3035 2019 3271e 28099*24^332519+1 458951 L4806 2018 3272b 5859*2^1524537+1 458936 L1204 2019 3273 Phi(3,-46613^49152) 458933 L4142 2016 Generalized unique 3274b 2163*2^1524409+1 458897 L3784 2019 3275 66048*1027^152369+1 458875 L4001 2018 3276 621*2^1524287-1 458859 L2519 2018 3277 115*2^1524183-1 458827 L2074 2013 3278b 5907*2^1524172+1 458826 L1115 2019 3279b 1799*2^1524147+1 458818 L1204 2019 3280 303*2^1523973+1 458765 L1300 2013 3281b 5945*2^1523967+1 458764 L1115 2019 3282b 8005*2^1523824+1 458721 L4854 2019 3283b 7875*2^1523707+1 458686 L4746 2019 3284b 3271*2^1523664+1 458673 L4906 2019 3285b 1737*2^1523646+1 458667 L1444 2019 3286 1265*2^1523548-1 458637 L1828 2013 3287b 1541*2^1523519+1 458629 L4913 2019 3288b 7191*2^1523427+1 458602 L1204 2019 3289b 7621*2^1523388+1 458590 L4066 2019 3290b 2653*2^1523362+1 458582 L3784 2019 3291b 5305*2^1523216+1 458538 L3972 2019 3292 9920216^65536+1 458525 L4201 2016 Generalized Fermat 3293b 8555*2^1523121+1 458510 L1567 2019 3294b 5751*2^1522991+1 458470 L4854 2019 3295b 6187*2^1522754+1 458399 L4739 2019 3296b 3049*2^1522742+1 458395 L3035 2019 3297 404*3^960707-1 458377 L3610 2018 3298b 5719*2^1522658+1 458370 L4364 2019 3299 289*2^1522650+1 458366 L1741 2013 Generalized Fermat 3300 889*2^1522531-1 458331 L2257 2018 3301b 6279*2^1522467+1 458313 L4834 2019 3302 731*2^1522457+1 458309 L3311 2012 3303 9841672^65536+1 458298 L4245 2016 Generalized Fermat 3304 1221*2^1522283-1 458256 L1828 2013 3305 341351*22^341351-1 458243 p260 2017 Generalized Woodall 3306b 1217*2^1522171+1 458223 L2979 2019 3307 687*2^1522087+1 458197 L2606 2012 3308b 7125*2^1521928+1 458150 L1115 2019 3309 2378*3^960224+1 458147 L3610 2014 3310b 3651*2^1521717+1 458087 L1307 2019 3311 165*2^1521629-1 458059 L2055 2011 3312b 3963*2^1521613+1 458055 L4908 2019 3313b 9471*2^1521609+1 458054 L2973 2019 3314b 6885*2^1521574+1 458044 L4907 2019 3315 19709699*2^1521540-1 458037 L421 2008 3316 1257*2^1521398-1 457990 L1828 2013 3317b 2955*2^1521293+1 457959 L4746 2019 3318b 6029*2^1521279+1 457955 L1204 2019 3319b 4935*2^1521227+1 457939 L4895 2019 3320b 2063*2^1521081+1 457895 L1204 2019 3321b 6885*2^1521067+1 457891 L4824 2019 3322b 6643*2^1520948+1 457855 L4906 2019 3323b 2453*2^1520621+1 457756 L2158 2019 3324 1425*2^1520604-1 457751 L1134 2014 3325b 5469*2^1520581+1 457745 L4890 2019 3326b 8945*2^1520401+1 457691 L4834 2019 3327b 9091*2^1520352+1 457676 L4364 2019 3328 9628238^65536+1 457674 L4299 2016 Generalized Fermat 3329b 9991*2^1520308+1 457663 L4724 2019 3330 9624110^65536+1 457662 L4299 2016 Generalized Fermat 3331f 11873*2^1520269+1 457651 L3432 2018 3332b 7111*2^1520252+1 457646 L4746 2019 3333b 6451*2^1520176+1 457623 L4878 2019 3334 1015*2^1520177-1 457622 L1828 2013 3335 17171*2^1520103+1 457601 L3432 2018 3336b 5437*2^1520074+1 457592 L1204 2019 3337b 3431*2^1520005+1 457571 L4901 2019 3338b 1535*2^1519961+1 457558 L4902 2019 3339 9584088^65536+1 457543 L4324 2016 Generalized Fermat 3340b 7849*2^1519750+1 457495 L1204 2019 3341b 7529*2^1519545+1 457433 L4896 2019 3342 541*2^1519465-1 457408 L3844 2017 3343b 9559*2^1519434+1 457400 L4724 2019 3344 9518248^65536+1 457347 L4326 2016 Generalized Fermat 3345b 2559*2^1519249+1 457343 L4901 2019 3346b 5611*2^1519104+1 457300 L4900 2019 3347 11508*1027^151846+1 457299 L4001 2018 3348b 8759*2^1518959+1 457257 L2724 2019 3349b 2571*2^1518881+1 457233 L4896 2019 3350b 2409*2^1518833+1 457218 L4293 2019 3351 741*2^1518755-1 457194 L2017 2018 3352 375*2^1518534-1 457127 L2235 2013 3353 9444368^65536+1 457125 L4308 2016 Generalized Fermat 3354b 1269*2^1518407+1 457090 L1333 2019 3355b 2571*2^1518381+1 457082 L1204 2019 3356b 3059*2^1518347+1 457072 L1204 2019 3357 731*2^1518257+1 457044 L1204 2012 3358b 8399*2^1518253+1 457044 L1174 2019 3359b 3981*2^1518216+1 457033 L4895 2019 3360b 9213*2^1518181+1 457022 L4891 2019 3361 Phi(3,-44560^49152) 457010 L4142 2016 Generalized unique 3362 9392774^65536+1 456970 L4330 2016 Generalized Fermat 3363b 3071*2^1517917+1 456943 L1567 2019 3364b 3553*2^1517826+1 456915 L4890 2019 3365 9373148^65536+1 456910 L4201 2016 Generalized Fermat 3366b 4455*2^1517775+1 456900 L4746 2019 3367b 2693*2^1517745+1 456891 L1333 2019 3368b 2745*2^1517722+1 456884 L1209 2019 3369 2295*2^1517247-1 456741 L2484 2017 3370b 8799*2^1517241+1 456739 L1444 2019 3371b 3105*2^1517218+1 456732 L4674 2019 3372b 6201*2^1516940+1 456649 L4724 2019 3373b 1517*2^1516855+1 456623 L1753 2019 3374b 5765*2^1516759+1 456594 L4087 2019 3375 20588*745^158967-1 456583 L4189 2016 3376b 6755*2^1516697+1 456576 L4893 2019 3377b 4159*2^1516686+1 456572 L4824 2019 3378 291*2^1516592+1 456543 L2117 2013 3379 243*2^1516368+1 456475 L2038 2013 3380b 8935*2^1516344+1 456469 L1204 2019 3381b 2863*2^1516314+1 456460 L4740 2019 3382 9223072^65536+1 456451 L4328 2016 Generalized Fermat 3383b 8609*2^1516265+1 456446 L1204 2019 3384 9214424^65536+1 456424 L4201 2016 Generalized Fermat 3385 449*2^1516108-1 456397 L3844 2017 3386b 6125*2^1516081+1 456390 L4891 2019 3387b 8097*2^1515963+1 456355 L4890 2019 3388b 4211*2^1515903+1 456336 L2805 2019 3389 135*2^1515894+1 456332 L1129 2013 Divides GF(1515890,10) 3390b 2863*2^1515860+1 456323 L4730 2019 3391 825*2^1515604+1 456246 L3284 2012 3392b 5043*2^1515522+1 456222 L4878 2019 3393b 2389*2^1515470+1 456206 L1209 2019 3394b 4117*2^1515422+1 456192 L4888 2019 3395 9132408^65536+1 456169 L4344 2016 Generalized Fermat 3396b 7721*2^1515337+1 456166 L1567 2019 3397b 4953*2^1515329+1 456164 L4882 2019 3398b 9183*2^1515302+1 456156 L1124 2019 3399b 8257*2^1515132+1 456105 L4739 2019 3400b 5031*2^1515099+1 456094 L4883 2019 3401 1169*2^1515073+1 456086 L3110 2012 3402b 8631*2^1514885+1 456030 L1209 2019 3403 301*2^1514873-1 456025 p281 2010 3404 9074206^65536+1 455987 L4295 2016 Generalized Fermat 3405b 2991*2^1514733+1 455984 L4883 2019 3406b 9681*2^1514679+1 455968 L4719 2019 3407b 7437*2^1514679+1 455968 L1204 2019 3408b 6635*2^1514423+1 455891 L2873 2019 3409 4047*2^1514401-1 455884 L1959 2015 3410b 3037*2^1514062+1 455782 L3784 2019 3411b 4385*2^1513893+1 455731 L1745 2019 3412 293418*151^209141-1 455719 L4001 2018 3413b 6629*2^1513751+1 455689 L1204 2019 3414 37674760044125*2^1513679-67931 455677 p339 2012 3415 1200007*(2^756839-1)*(1200007*(2^756839-1)+1)-1 455675 p168 2014 3416 363*2^1513706-1 455674 L1819 2014 3417 291726*(2^1513678-1)+1 455668 p168 2016 3418b 1677*2^1513450+1 455598 L4148 2019 3419b 2987*2^1513399+1 455582 L3431 2019 3420b 6201*2^1513379+1 455577 L1204 2019 3421b 3855*2^1513215+1 455527 L4754 2019 3422b 3117*2^1513207+1 455525 L2196 2019 3423b 7777*2^1513194+1 455521 L4761 2019 3424 2*839^155785+1 455479 g424 2014 Divides Phi(839^155785,2) 3425b 9259*2^1513038+1 455474 L4885 2019 3426b 8151*2^1513016+1 455468 L3035 2019 3427b 5511*2^1512920+1 455439 L1333 2019 3428c 8853*2^1512850+1 455418 L2158 2019 3429b 5199*2^1512771+1 455394 L1745 2019 3430c 3237*2^1512720+1 455378 L4727 2019 3431c 3751*2^1512644+1 455355 L4724 2019 3432c 8939*2^1512583+1 455337 L4724 2019 3433b 5979*2^1512557+1 455329 L4883 2019 3434b 7771*2^1512552+1 455328 L4882 2019 3435c 3959*2^1512513+1 455316 L4724 2019 3436c 1929*2^1512479+1 455305 L4883 2019 3437c 5169*2^1512429+1 455291 L3091 2019 3438 8844704^65536+1 455258 L4201 2016 Generalized Fermat 3439 689*2^1512316-1 455256 L2257 2018 3440c 2115*2^1512288+1 455248 L1209 2019 3441c 1547*2^1512283+1 455246 L4882 2019 3442c 7169*2^1512255+1 455238 L4842 2019 3443a 2175*2^1512256-1 455238 L1862 2019 3444 237*2^1512216-1 455225 L1828 2013 3445c 2463*2^1512106+1 455193 L4666 2019 3446 871*2^1511925-1 455138 L2257 2018 3447c 4795*2^1511888+1 455128 L3035 2019 3448 1107*2^1511864-1 455120 L1828 2013 3449c 2573*2^1511789+1 455098 L4724 2019 3450 93*2^1511692+1 455067 L1135 2011 3451b 2831*2^1511675+1 455063 L4910 2019 3452c 3731*2^1511623+1 455048 L4878 2019 3453c 6437*2^1511443+1 454994 L1142 2019 3454 945*2^1511373+1 454972 L3276 2012 3455 8749120^65536+1 454949 L4326 2016 Generalized Fermat 3456 165*2^1510977+1 454852 L1349 2012 3457 8718098^65536+1 454848 L4245 2016 Generalized Fermat 3458 607*2^1510953-1 454845 L1978 2018 3459c 3269*2^1510937+1 454841 L4746 2019 3460c 7255*2^1510824+1 454808 L3035 2019 3461c 1573*2^1510780+1 454794 L2676 2019 3462c 2555*2^1510763+1 454789 L3972 2019 3463c 3089*2^1510697+1 454769 L4746 2019 3464 4125*2^1510620-1 454746 L1959 2015 3465c 9103*2^1510422+1 454687 L4874 2019 3466c 7425*2^1510183+1 454615 L1115 2019 3467 3435*2^1510156-1 454606 L860 2016 3468f 21526*24^329368+1 454602 L4806 2018 3469c 9139*2^1510134+1 454600 L1115 2019 3470 176454*151^208611-1 454564 L4794 2018 3471c 6385*2^1509894+1 454528 L1189 2019 3472 625*2^1509873-1 454520 L2257 2018 3473 735*2^1509857+1 454516 L3319 2012 3474 8596942^65536+1 454450 L4324 2016 Generalized Fermat 3475 5376*37^289738-1 454372 L4001 2015 3476c 8673*2^1509344+1 454362 L4873 2019 3477 4159*2^1509203-1 454319 L1959 2015 3478d 9933*2^1509141+1 454301 L4854 2018 3479d 2223*2^1509136+1 454299 L1333 2018 3480 4049*2^1509104-1 454290 L1959 2014 3481d 4257*2^1509010+1 454261 L3166 2018 3482d 4593*2^1508905+1 454230 L4866 2018 3483 8525558^65536+1 454212 L4201 2016 Generalized Fermat 3484d 8655*2^1508726+1 454176 L4746 2018 3485c 9991*2^1508664+1 454158 L3166 2019 3486d 2825*2^1508635+1 454148 L3166 2018 3487 405*2^1508592-1 454135 L1862 2015 3488d 7111*2^1508576+1 454131 L4746 2018 3489d 7537*2^1508266+1 454038 L3035 2018 3490d 5105*2^1508103+1 453988 L3035 2018 3491 4127*2^1508060-1 453975 L1959 2014 3492d 4523*2^1508057+1 453975 L4770 2018 3493d 9907*2^1507872+1 453919 L1333 2018 3494d 11628*111^221902+1 453866 L4001 2018 3495d 9581*2^1507627+1 453845 L4699 2018 3496d 7025*2^1507603+1 453838 L1486 2018 3497 8412634^65536+1 453833 L4324 2016 Generalized Fermat 3498d 8103*2^1507572+1 453829 L3035 2018 3499d 8069*2^1507539+1 453819 L2676 2018 3500 4*83^236470+1 453805 p286 2010 Generalized Fermat 3501 143*2^1507352-1 453761 L1828 2012 3502d 4515*2^1507318+1 453752 L4746 2018 3503 7*566^164827-1 453740 L1471 2011 3504d 8915*2^1507177+1 453710 L4860 2018 3505d 4177*2^1507146+1 453700 L4746 2018 3506d 4959*2^1507013+1 453660 L4732 2018 3507d 5105*2^1507003+1 453657 L4746 2018 3508 4127*2^1506830-1 453605 L1959 2014 3509e 5345*2^1506789+1 453593 L4099 2018 3510 8326702^65536+1 453541 L4295 2016 Generalized Fermat 3511e 8465*2^1506511+1 453509 L4858 2018 3512e 1379*2^1506415+1 453480 L3035 2018 3513e 5317*2^1506378+1 453469 L2066 2018 3514e 8229*2^1506078+1 453379 L4845 2018 3515e 4753*2^1506072+1 453377 L1671 2018 3516e 2585*2^1506031+1 453364 L4746 2018 3517e 8523*2^1505866+1 453315 L4732 2018 3518 1115*2^1505697+1 453264 L3173 2012 3519 65*2^1505640-1 453245 L2055 2011 3520e 4473*2^1505630+1 453244 L4855 2018 3521e 4239*2^1505614+1 453239 L4855 2018 3522e 6747*2^1505542+1 453218 L4600 2018 3523 431*2^1505493+1 453202 L2520 2013 3524e 7047*2^1505475+1 453197 L4778 2018 3525e 7645*2^1505472+1 453197 L1137 2018 3526e 3463*2^1505400+1 453175 L3035 2018 3527e 6185*2^1505211+1 453118 L3035 2018 3528e 8385*2^1505203+1 453116 L4854 2018 3529e 6903*2^1505150+1 453100 L3926 2018 3530e 7749*2^1505087+1 453081 L3035 2018 3531 8188038^65536+1 453063 L4252 2016 Generalized Fermat 3532e 8255*2^1505013+1 453058 L4778 2018 3533e 5857*2^1504998+1 453054 L3035 2018 3534e 1499*2^1504789+1 452990 L4851 2018 3535e 5461*2^1504740+1 452976 L4852 2018 3536 173*2^1504740-1 452975 L2074 2013 3537 1127*2^1504700-1 452963 L1828 2013 3538e 6097*2^1504634+1 452944 L3035 2018 3539e 1703*2^1504617+1 452939 L4851 2018 3540e 8591*2^1504557+1 452921 L4851 2018 3541 8146592^65536+1 452918 L4318 2016 Generalized Fermat 3542 825*2^1504415-1 452877 L1817 2018 3543e 5163*2^1504384+1 452869 L3035 2018 3544f 4195*2^1504340+1 452856 L4304 2018 3545f 2943*2^1504290+1 452840 L3166 2018 3546f 5919*2^1504182+1 452808 L4600 2018 3547f 1209*2^1504153+1 452799 L4304 2018 3548 465*2^1504138-1 452794 L3844 2017 3549 8099100^65536+1 452752 L4281 2016 Generalized Fermat 3550f 1543*2^1503914+1 452727 L4155 2018 3551f 2151*2^1503728+1 452671 L3035 2018 3552f 4659*2^1503682+1 452658 L3035 2018 3553f 8911*2^1503636+1 452644 L1189 2018 3554f 4111*2^1503480+1 452597 L4845 2018 3555f 6369*2^1503458+1 452590 L3166 2018 3556f 5035*2^1503398+1 452572 L4847 2018 3557f 9509*2^1503389+1 452570 L4699 2018 3558 237*2^1503376-1 452564 L1828 2013 3559 143157*2^1503343+1 452557 L4504 2016 3560f 2965*2^1503298+1 452542 L4618 2018 3561 8036146^65536+1 452530 L4201 2016 Generalized Fermat 3562f 2215*2^1503176+1 452505 L4746 2018 3563 691*2^1503141-1 452494 L2257 2018 3564 19512*1027^150245-1 452478 L4700 2018 3565f 9809*2^1503059+1 452470 L2719 2018 3566f 7499*2^1502943+1 452435 L4827 2018 3567f 7403*2^1502685+1 452358 L4842 2018 3568f 1595*2^1502647+1 452346 L4840 2018 3569f 2393*2^1502621+1 452338 L3166 2018 3570f 6981*2^1502616+1 452337 L4841 2018 3571f 8949*2^1502583+1 452327 L4600 2018 3572 7863*2^1502299-1 452241 L860 2017 3573 7954812^65536+1 452240 L4245 2016 Generalized Fermat 3574f 2151*2^1502292+1 452239 L3035 2018 3575 5875*2^1502216+1 452216 L3035 2018 3576 197*2^1502095+1 452178 L2912 2013 3577 1361*2^1502039+1 452162 L3166 2018 3578 2273*2^1502017+1 452156 L4840 2018 3579 40*3^947604+1 452124 L4799 2018 3580 2365*2^1501882+1 452115 L3166 2018 3581 9673*2^1501870+1 452112 L2719 2018 3582 3213*2^1501824+1 452098 L1502 2018 3583 1137*2^1501715+1 452065 L1745 2012 3584 5605*2^1501702+1 452062 L2873 2018 3585 163*806^155542+1 452060 L4001 2017 3586 551*2^1501694-1 452058 L3844 2017 3587 6327*2^1501616+1 452036 L4838 2018 3588 6951*2^1501584+1 452026 L4600 2018 3589 5285*2^1501449+1 451985 L4600 2018 3590 2673*2^1501273+1 451932 L3972 2018 3591 907*2^1501169-1 451900 L860 2010 3592 9669*2^1501149+1 451895 L3760 2018 3593 7945*2^1501112+1 451884 L3166 2018 3594 4163*2^1500990-1 451847 L1959 2015 3595 1075*2^1500964+1 451839 L2066 2012 3596 4209*2^1500869+1 451811 L3166 2018 3597 691*2^1500869-1 451810 L1819 2018 3598 7832756^65536+1 451800 L4315 2016 Generalized Fermat 3599 2529*2^1500549+1 451714 L3035 2018 3600 6229*2^1500478+1 451693 L3035 2018 3601 4269*2^1500469-1 451690 p168 2014 3602 579*2^1500429+1 451677 L1300 2012 3603 6645*2^1500309+1 451642 L4746 2018 3604 5451*2^1499971+1 451541 L4834 2018 3605 13*2^1499876+1 451509 g267 2004 Divides GF(1499875,3) 3606 9055*2^1499838+1 451501 L4833 2018 3607 429*2^1499779+1 451482 L2603 2012 3608 2199*2^1499737+1 451470 L3166 2018 3609 5529*2^1499521+1 451405 L4717 2018 3610 8909*2^1499475+1 451391 L4805 2018 3611 147*2^1499333-1 451347 L1959 2013 3612 9219*2^1499290+1 451336 L3972 2018 3613 4623*2^1499225+1 451316 L3035 2018 3614 4257*2^1499158+1 451296 L3824 2018 3615 533*2^1499097+1 451276 L1741 2012 3616 3131*2^1499031+1 451257 L3166 2018 3617 2859*2^1498901+1 451218 L4829 2018 3618 1535*2^1498813+1 451191 L2622 2018 3619 9967*2^1498720+1 451164 L4448 2018 3620 3285*2^1498719+1 451163 L4600 2018 3621 9171*2^1498487+1 451094 L4825 2018 3622 7634800^65536+1 451072 L4309 2016 Generalized Fermat 3623 95*2^1498399+1 451066 L2494 2011 3624 4737*2^1498384+1 451063 L4717 2018 3625 837*2^1498329-1 451045 L1819 2018 3626 7622010^65536+1 451024 L4313 2016 Generalized Fermat 3627 27994*5^645221-1 450995 p324 2011 3628 855*2^1498084-1 450972 L1819 2018 3629 8637*2^1497959+1 450935 L2714 2018 3630 9333*2^1497898+1 450917 L4099 2018 3631 9505*2^1497650+1 450842 L4461 2018 3632 9155*2^1497559+1 450815 L4827 2018 3633 8969*2^1497491+1 450794 L4600 2018 3634 5845*2^1497480+1 450791 L2873 2018 3635 2861*2^1497459+1 450784 L4717 2018 3636 5555*2^1497403+1 450767 L4761 2018 3637 7161*2^1497385+1 450762 L1160 2018 3638 6829*2^1497310+1 450740 L4600 2018 3639 7473*2^1497216-1 450711 L860 2017 3640c 12042*42^277646+1 450693 L4444 2019 3641 2145*2^1497137-1 450687 L1863 2017 3642 1505*2^1497003+1 450646 L4699 2018 3643 6763*2^1496940+1 450628 L4212 2018 3644 4003*2^1496871-1 450607 L1959 2014 3645 2823*2^1496773+1 450578 L4761 2018 3646 69*28^311336-1 450555 L4001 2014 3647 3723*2^1496513+1 450499 L4674 2018 3648 191*2^1496507+1 450496 L1229 2012 3649 3935*2^1496391+1 450463 L4818 2018 3650 4565*2^1496339+1 450447 L3035 2018 3651 687*2^1496330+1 450444 L1745 2012 3652 7464550^65536+1 450430 L4245 2016 Generalized Fermat 3653 7491*2^1496257+1 450423 L3166 2018 3654 3009*2^1496155+1 450392 L3035 2018 3655 3187*2^1496048+1 450359 L3972 2018 3656 6567*2^1496003+1 450346 L2719 2018 3657 3465*2^1495986-1 450341 L860 2016 3658 7439308^65536+1 450333 L4308 2016 Generalized Fermat 3659 2115*2^1495860+1 450303 L4600 2018 3660 7427232^65536+1 450287 L4201 2016 Generalized Fermat 3661 4275*2^1495506+1 450196 L4805 2018 3662 8071*2^1495476+1 450188 L4728 2018 3663 1351*2^1495467-1 450184 L1828 2013 3664 3405*2^1495461+1 450183 L3926 2018 3665 7101*2^1495395+1 450163 L3166 2018 3666 5193*2^1495292+1 450132 L4600 2018 3667 9567*2^1495156+1 450091 L3972 2018 3668 5217*2^1495136+1 450085 L4796 2018 3669 7373894^65536+1 450082 L4295 2016 Generalized Fermat 3670 6567*2^1495068+1 450065 L3035 2018 3671 32*26^318071+1 450064 L1471 2012 3672 2445*2^1495063-1 450063 L2484 2017 3673 1503*2^1494985+1 450039 L3035 2018 3674 278*315^180134+1 450034 L1471 2015 3675 1047*2^1494761-1 449971 L1828 2013 3676 283*2^1494614+1 449927 L2984 2012 3677 595*2^1494593-1 449921 L2257 2017 3678 703*2^1494427-1 449871 L2257 2018 3679 7307674^65536+1 449825 L4307 2016 Generalized Fermat 3680 745*2^1494273-1 449824 L1819 2018 3681 4299*2^1494233+1 449813 L1741 2018 3682 1649*618^161163+1 449808 L4001 2018 3683 749*2^1494203+1 449803 L2706 2012 3684 1769*2^1494163+1 449792 L4805 2018 3685 3771*2^1494095-1 449771 L860 2016 3686 131*2^1494099+1 449771 L2959 2012 Divides Fermat F(1494096) 3687 1365*2^1493923-1 449719 L1828 2013 3688 93*2^1493877+1 449704 L2085 2011 3689 975*2^1493869-1 449703 L2257 2018 3690 262172*5^643342-1 449683 p323 2011 3691 651*2^1493757+1 449669 L2583 2012 3692 455*2^1493715+1 449656 L2734 2012 3693 1595*2^1493711+1 449656 L4461 2018 3694 2811*2^1493627+1 449630 L4618 2018 3695 2013*2^1493577+1 449615 L3719 2018 3696 6555*2^1493525+1 449600 L4798 2018 3697 3305*2^1493343+1 449545 L4698 2018 3698 2249*2^1493295+1 449530 L3910 2018 3699 711*2^1493231+1 449511 L1842 2012 3700 3585*2^1493179+1 449496 L4804 2018 3701 1287*2^1493088-1 449468 L1828 2013 3702 4491*2^1493004+1 449443 L4600 2018 3703 4304*1027^149224-1 449403 L4001 2018 3704 10107*2^1492855+1 449399 p344 2017 3705 6235*2^1492746+1 449366 L4801 2018 3706 7188654^65536+1 449358 L4305 2016 Generalized Fermat 3707 3913*2^1492606+1 449323 L4798 2018 3708 4717*2^1492604+1 449323 L1336 2018 3709 6825*2^1492542-1 449304 L860 2017 3710 673*2^1492542+1 449303 L2826 2012 3711 1347*2^1492537-1 449302 L1828 2013 3712 3747*2^1492499+1 449291 L3035 2018 3713 1725*2^1492368+1 449251 L4746 2018 3714 7683*2^1492356+1 449248 L4600 2018 3715 3737*2^1492295+1 449230 L4766 2018 3716 1269*2^1492195-1 449199 L1828 2013 3717 1023*2^1492030-1 449149 L1828 2013 3718 3369*2^1492005+1 449142 L4396 2018 3719 5561*2^1491921+1 449117 L3035 2018 3720 7*2^1491852+1 449094 p166 2005 Divides GF(1491851,6) 3721 7917*2^1491824+1 449088 L4699 2018 3722 5619*2^1491762+1 449069 L4797 2018 3723 5331*2^1491683+1 449046 L4796 2018 3724 7107770^65536+1 449036 L4281 2016 Generalized Fermat 3725 357*2^1491595+1 449018 L2960 2012 3726 303*2^1491450+1 448974 L1498 2012 3727 683*2^1491446-1 448973 L2257 2017 3728 2557*2^1491144+1 448883 L4256 2018 3729 8621*2^1490999+1 448840 L2066 2018 3730 2139*2^1490993+1 448837 L4396 2018 3731 5361*2^1490800+1 448780 L3035 2018 3732 8889*2^1490630+1 448729 L4148 2018 3733 2232007*2^1490605-1 448724 L4 2003 3734 3307*2^1490514+1 448693 L3035 2018 3735 9147*2^1490494+1 448688 L2126 2018 3736 4185*2^1490448-1 448674 L1959 2014 3737 147*2^1490274+1 448620 L3030 2012 3738 5301*2^1490188+1 448596 L4724 2018 3739 1155*2^1490176-1 448591 L1828 2013 3740 4111*2^1490155-1 448585 L1959 2014 3741 1905*2^1490126+1 448576 L3035 2018 3742 6909*2^1490057+1 448556 L4746 2018 3743 3537*2^1490038+1 448550 L3035 2018 3744 3801*2^1490004+1 448540 L2682 2018 3745 477*2^1489922-1 448514 L1978 2017 3746 8001*2^1489888+1 448505 L2873 2018 3747 789*2^1489887+1 448504 L1214 2012 3748 1227*2^1489810+1 448481 L4792 2018 3749 6699*2^1489778+1 448472 L3035 2018 3750 4607*2^1489763+1 448468 L1347 2018 3751 1821*2^1489724+1 448455 L2126 2018 3752 8165*2^1489703+1 448450 L4790 2018 3753 3463*2^1489702+1 448449 L4552 2018 3754 12902*565^162944-1 448434 L4187 2017 3755 2557*2^1489460+1 448376 L2676 2018 3756 9243*2^1489301+1 448329 L1129 2018 3757 9741*2^1489148+1 448283 L3035 2018 3758 877*2^1489150+1 448282 L3019 2012 3759 527*2^1489120-1 448273 L2257 2017 3760 6919394^65536+1 448271 L4286 2016 Generalized Fermat 3761 6918698^65536+1 448268 L4302 2016 Generalized Fermat 3762 7085*2^1489083+1 448263 L4766 2018 3763 7215*2^1489053+1 448254 L4155 2018 3764 114*579^162252-1 448253 L4001 2018 3765 6902598^65536+1 448202 L4303 2016 Generalized Fermat 3766 8281*2^1488868+1 448198 L4600 2018 Generalized Fermat 3767 6885798^65536+1 448133 L4299 2016 Generalized Fermat 3768 6165*2^1488627+1 448126 L4600 2018 3769 2031*2^1488517+1 448092 L4600 2018 3770 5071*2^1488440+1 448069 L4746 2018 3771 4967*2^1488307+1 448029 L1741 2018 3772 49568*5^640900-1 447975 p321 2011 3773 2235*2^1488078+1 447960 L4724 2018 3774 6837196^65536+1 447931 L4295 2016 Generalized Fermat 3775 4137*2^1487814-1 447881 L1959 2014 3776 6485*2^1487789+1 447873 L4724 2018 3777 191*2^1487775+1 447868 L1387 2012 3778 1181*2^1487725+1 447853 L1129 2012 3779 9297*2^1487627+1 447825 L4724 2018 3780 9867*2^1487599+1 447816 L4724 2018 3781 8949*2^1487531+1 447796 L4724 2018 3782 46674*1027^148671+1 447738 L4001 2017 3783 7905*2^1487319+1 447732 L4724 2018 3784 8595*2^1487299+1 447726 L4724 2018 3785 1077*2^1487269-1 447716 L1828 2013 3786 6271*2^1487188+1 447692 L2719 2018 3787 8959*2^1487146+1 447680 L3035 2018 3788 61*2^1487125-1 447672 L1828 2011 3789 1275*2^1486961+1 447623 L4785 2018 3790 103*2^1486695-1 447542 L2484 2012 3791 8673*2^1486682+1 447540 L4782 2018 3792 9297*2^1486568+1 447506 L1204 2018 3793 1239*2^1486540-1 447497 L1828 2013 3794 8399*2^1486445+1 447469 L3166 2018 3795 1155*2^1486428+1 447463 L2957 2012 3796 4545*2^1486317+1 447430 L3035 2018 3797 98166!/3-1 447411 p381 2015 3798 5949*2^1486247+1 447409 L3166 2018 3799 57*2^1486214-1 447397 L1828 2011 3800 4051*2^1486200+1 447395 L4766 2018 3801 7837*2^1486160+1 447383 L3910 2018 3802 801*2^1486133-1 447374 L2257 2017 3803 1915*2^1486126+1 447372 L1675 2018 3804 4929*2^1486111+1 447368 L3035 2018 3805 1597*2^1485922+1 447311 L1675 2018 3806 1286*3^937499+1 447304 L2777 2012 Generalized Cullen 3807 1475*2^1485741+1 447256 L4781 2018 3808 6101*2^1485709+1 447247 L4674 2018 3809 2085*2^1485565+1 447203 L2359 2018 3810 7589*2^1485459+1 447172 L1675 2018 3811 5575*2^1485414+1 447158 L4778 2018 3812 1757*2^1485251+1 447109 L2650 2018 3813 6628260^65536+1 447048 L4245 2016 Generalized Fermat 3814 5979*2^1484941+1 447016 L1675 2018 3815 2143*2^1484776+1 446966 L1675 2018 3816 6745*2^1484712+1 446947 L1675 2018 3817 4495*2^1484706+1 446945 L4600 2018 3818 3647*2^1484687+1 446939 L2080 2018 3819 829*2^1484633-1 446922 L2257 2017 3820b 2175*2^1484389-1 446849 L1862 2019 3821 2019*2^1484379+1 446846 L3431 2018 3822 5963*2^1484317+1 446828 L2823 2018 3823 4953*2^1484188+1 446789 L4290 2018 3824 4137*2^1484145-1 446776 L1959 2014 3825 1923*2^1484145+1 446776 L4724 2018 3826 341*2^1484130-1 446771 L1819 2014 3827 567*2^1484069-1 446753 L1978 2017 3828 6553414^65536+1 446725 L4201 2016 Generalized Fermat 3829 5595*2^1483630+1 446621 L1675 2018 3830 2891*2^1483613+1 446616 L4724 2018 3831 377*2^1483586-1 446607 L1819 2013 3832 6526168^65536+1 446606 L4289 2016 Generalized Fermat 3833 4677*2^1483396+1 446551 L4724 2018 3834 6325*2^1483382+1 446547 L4724 2018 3835 5553*2^1483318+1 446527 L4724 2018 3836 2843*2^1483293+1 446520 L4724 2018 3837 8165*2^1483251+1 446507 L4724 2018 3838 1547*2^1483127+1 446469 L4724 2018 3839 6490328^65536+1 446449 L4201 2016 Generalized Fermat 3840 4103*2^1482977+1 446425 L3784 2018 3841 62*107^219967+1 446400 p289 2013 3842 108045*2^1482857-1 446390 L466 2017 3843 8922449*2^1482840-1 446387 L536 2011 3844 3583*2^1482740+1 446353 L1160 2018 3845 12769*2^1482658+1 446329 L3432 2016 Generalized Fermat 3846 588*805^153593+1 446313 L4786 2018 3847 627*2^1482485-1 446276 L1819 2017 3848 355*2^1482390+1 446247 L2734 2012 3849 2283*2^1482369+1 446241 L4724 2018 3850 3927*2^1482207+1 446193 L4724 2018 3851 4447*2^1481968+1 446121 L4724 2018 3852 4533*2^1481910+1 446104 L2979 2018 3853 9*2^1481821-1 446074 L503 2008 3854 8489*2^1481775+1 446063 L4724 2018 3855 9387*2^1481724+1 446048 L4724 2018 3856 4291*2^1481656+1 446027 L4724 2018 3857 6121*2^1481568+1 446001 L4770 2018 3858 6379668^65536+1 445960 L4252 2016 Generalized Fermat 3859 503*2^1481165+1 445878 L1204 2012 3860 2059*2^1481086+1 445855 L4724 2018 3861 583*2^1480974+1 445821 L1935 2012 3862 7389*2^1480966+1 445820 L3784 2018 3863 3213*2^1480860+1 445787 L4724 2018 3864 8905*2^1480850+1 445785 L2196 2018 3865 5*10^445773-1 445774 p297 2011 Near-repdigit 3866 895*2^1480783-1 445764 L1819 2017 3867 9333*2^1480756+1 445756 L4724 2018 3868 5265*2^1480741+1 445752 L4724 2018 3869 395*2^1480715+1 445743 L1792 2012 3870 3995*2^1480657+1 445726 L1448 2018 3871 8947*2^1480636+1 445720 L4724 2018 3872 6441*2^1480571+1 445701 L1444 2018 3873 923*2^1480444-1 445662 L2017 2017 3874 5699*2^1480387+1 445645 L4724 2018 3875 5331*2^1480359+1 445637 L4724 2018 3876 5805*2^1480300+1 445619 L4740 2018 3877 3963*2^1480146+1 445572 L1675 2018 3878 7035*2^1480107+1 445561 L3784 2018 3879 7039*2^1480098+1 445558 L3431 2018 3880 1293*2^1480046-1 445542 L1828 2013 3881 7713*2^1480016+1 445534 L4769 2018 3882 1933*2^1479916+1 445503 L1204 2018 3883 2595*2^1479895+1 445497 L4768 2018 3884 725*2^1479843+1 445480 L2627 2012 3885 9489*2^1479710+1 445442 L1204 2018 3886 4143*2^1479570-1 445399 L1959 2014 3887 9403*2^1479512+1 445382 L4724 2018 3888 2333*2^1479513+1 445382 L1675 2018 3889 2849*2^1479345+1 445331 L4724 2018 3890 2421*2^1479236+1 445298 p335 2012 3891 8739*2^1479125+1 445265 L2222 2018 3892 4229*2^1478973+1 445219 L4674 2018 3893 2271*2^1478969+1 445218 L4771 2018 3894 6307*2^1478940+1 445210 L4770 2018 3895 1715*2^1478859+1 445185 L3784 2018 3896 559*2^1478821-1 445173 L2257 2017 3897 11881*2^1478812+1 445171 L3432 2016 Generalized Fermat 3898 7533*2^1478786+1 445163 L2125 2018 3899 545*2^1478786-1 445162 L2257 2017 3900 3149*2^1478719+1 445143 L2125 2018 3901 2415*2^1478574+1 445099 L1745 2018 3902 1185*2^1478556+1 445093 L2956 2012 3903 3963*2^1478426+1 445055 L3941 2018 3904 609*2^1478341+1 445028 L2987 2012 3905 29*2^1478344-1 445028 L10 2005 3906 705*2^1478286+1 445012 L1158 2012 3907 4815*2^1478143+1 444970 L4730 2018 3908 3045*2^1478108+1 444959 L1204 2018 3909 1071*2^1478005-1 444927 L1828 2013 3910 4689*2^1477865+1 444886 L4716 2018 3911 5383*2^1477764+1 444856 L4066 2018 3912 2547*2^1477754-1 444852 L2484 2017 3913 3453*2^1477665+1 444826 L1448 2018 3914 5069*2^1477413+1 444750 L4290 2018 3915 6661*2^1477324+1 444723 L1444 2018 3916 4127*2^1477320-1 444722 L1959 2014 3917 847*2^1477272+1 444707 L2935 2012 3918 6104728^65536+1 444706 L4286 2016 Generalized Fermat 3919 867*2^1477169-1 444676 L2017 2017 3920 2781*2^1477103+1 444656 L2521 2018 3921 2803*2^1477022+1 444632 L1204 2018 3922 1701*2^1477011+1 444628 L1444 2018 3923 675*2^1476887-1 444591 L1819 2017 3924 5973*2^1476778+1 444559 L4762 2018 3925 5849*2^1476767+1 444555 L4087 2018 3926 7837*2^1476714+1 444540 L4724 2018 3927 6068296^65536+1 444536 L4285 2016 Generalized Fermat 3928 8689*2^1476674+1 444528 L4724 2018 3929 6221*2^1476609+1 444508 L1444 2018 3930 238758*151^203975-1 444463 L4001 2018 3931 18455*2^1476402-1 444446 L2777 2016 3932 138835*2^1476392+1 444444 L3494 2013 3933 27*2^1476347+1 444427 g279 2005 3934 8499*2^1476310+1 444418 L1204 2018 3935 8551*2^1476180+1 444379 L4723 2018 3936 405405*2^1476144-1 444370 L466 2018 3937 6031270^65536+1 444361 L4204 2016 Generalized Fermat 3938 1329*2^1476061-1 444342 L1828 2013 3939 7073*2^1476053+1 444341 L4724 2018 3940 3981*2^1476025+1 444332 L1204 2018 3941 2937*2^1476011+1 444328 L4293 2018 3942 2589*2^1475954+1 444310 L4724 2018 3943 163*2^1475932+1 444303 L2955 2012 3944 6555*2^1475886+1 444290 L4290 2018 3945 7039*2^1475594+1 444202 L4724 2018 3946 2475*2^1475581+1 444198 L3784 2018 3947 9213*2^1475558+1 444192 L4724 2018 3948 371*2^1475337+1 444124 L2958 2012 3949 7931*2^1475259+1 444102 L4724 2018 3950 1159*2^1475217-1 444088 L1828 2013 3951 8973*2^1475176+1 444077 L2808 2018 3952 8787*2^1475091+1 444051 L1204 2018 3953 5709*2^1475078+1 444047 L4766 2018 3954 3435*2^1474966+1 444013 L1204 2018 3955 1733*2^1474941+1 444005 L4761 2018 3956 9573*2^1474838+1 443975 L4716 2018 3957 3633*2^1474764+1 443952 L2080 2018 3958 333*2^1474766-1 443952 L1827 2011 3959 9535278*15^377431-1 443901 L4001 2017 3960 4025*2^1474366-1 443832 L1959 2014 3961 7917*2^1474334+1 443823 L1444 2018 3962 5911446^65536+1 443790 L4281 2016 Generalized Fermat 3963 5905206^65536+1 443760 L4282 2016 Generalized Fermat 3964 2123*2^1474109+1 443755 L4527 2018 3965 8609*2^1474027+1 443731 L4527 2018 3966 3837*2^1473864+1 443681 L4749 2018 3967 9635*2^1473837+1 443674 L4748 2018 3968 9007*2^1473816+1 443667 L3664 2018 3969 2043*2^1473736+1 443643 L1444 2018 3970 7575*2^1473724+1 443640 L1387 2018 3971 2631*2^1473709+1 443635 L1774 2018 3972 5879074^65536+1 443634 L4261 2016 Generalized Fermat 3973 93930*151^203583-1 443608 L4001 2018 3974 7011*2^1473341+1 443524 L4754 2018 3975 176660*18^353320-1 443519 p325 2011 Generalized Woodall 3976 7143*2^1473272+1 443503 L4746 2018 3977 69*2^1473217-1 443485 L2055 2011 3978 327*2^1473201-1 443481 L1827 2011 3979 357*2^1473125-1 443458 L1819 2013 3980 1263*2^1472875-1 443383 L1828 2013 3981 5695*2^1472848+1 443376 L4744 2018 3982 10101*2^1472805+1 443363 p344 2017 3983 127*2^1472718+1 443335 L2954 2012 3984 4097*2^1472683+1 443326 L1444 2018 3985 9789*2^1472645+1 443315 L2117 2018 3986 7737*2^1472568+1 443292 L1355 2018 3987 5227*2^1472458+1 443258 L3784 2018 3988 8695*2^1472420+1 443247 L4740 2018 3989 43994*6^569498-1 443161 p267 2010 3990 325627*2^1472117-1 443157 L111 2005 3991 741*2^1472086-1 443145 L2257 2017 3992 7383*2^1472071-1 443142 L860 2017 3993 4775*2^1472067+1 443141 L2973 2018 3994 8619*2^1472043+1 443134 L4739 2018 3995 1775*2^1471989+1 443117 L3035 2018 3996 6251*2^1471639+1 443012 L4724 2018 3997 4585*2^1471516+1 442975 L4724 2018 3998 1317*2^1471508-1 442972 L1828 2013 3999 133*2^1471408+1 442941 L2139 2012 4000 1197*2^1471378-1 442932 L1828 2013 4001 207*2^1471290+1 442905 L1300 2012 4002 7737*2^1471208+1 442882 L4724 2018 4003 5999*2^1471179+1 442873 L4724 2018 4004 7193*2^1471157+1 442867 L4735 2018 4005 1565*2^1471079+1 442843 L4724 2018 4006 3733*2^1471024+1 442826 L2196 2018 4007 579*2^1471002+1 442819 L2901 2012 4008 1291*2^1470905-1 442790 L1828 2013 4009 9027*2^1470891+1 442787 L4724 2018 4010 6855*2^1470853+1 442775 L1124 2018 4011 2871*2^1470765+1 442748 L4445 2018 4012 5259*2^1470738+1 442740 L4732 2018 4013 6849*2^1470677+1 442722 L4724 2018 4014 8607*2^1470646+1 442713 L4724 2018 4015 5035*2^1470620+1 442705 L3784 2018 4016 1569*2^1470510+1 442671 L4724 2018 4017 2055*2^1470392+1 442636 L4724 2018 4018 2115*2^1470373+1 442630 L3784 2018 4019 1857*2^1470363+1 442627 L4724 2018 4020 5723*2^1470273+1 442601 L2103 2018 4021 5719*2^1470218+1 442584 L1204 2018 4022 4813*2^1470162+1 442567 L1204 2018 4023 269858*151^203101-1 442558 L4700 2018 4024 7645*2^1470074+1 442541 L4724 2018 4025 303*2^1470065+1 442537 L2058 2012 4026 3201*2^1469973+1 442510 L2979 2018 4027 9309*2^1469893+1 442486 L4730 2018 4028 5645768^65536+1 442481 L4201 2016 Generalized Fermat 4029 3561*2^1469839+1 442470 L4724 2018 4030 8025*2^1469759+1 442446 L4724 2018 4031 7701*2^1469744+1 442441 L3664 2018 4032 2877*2^1469660+1 442416 L2891 2018 4033 629*2^1469471+1 442358 L1999 2012 4034 8265*2^1469379+1 442332 L4723 2018 4035 9581*2^1469377+1 442331 L4724 2018 4036 10005*2^1469358-1 442325 L4405 2017 4037 1441*2^1469324+1 442314 L1444 2018 4038 9255*2^1469241+1 442290 L1204 2018 4039 7809*2^1469047+1 442232 L2564 2018 4040 6679*2^1469010+1 442220 L3035 2018 4041 1719*2^1468901+1 442187 L2873 2018 4042 4137*2^1468890+1 442184 L3784 2018 4043 1155*2^1468763-1 442145 L1828 2013 4044 7917*2^1468572-1 442089 L860 2017 4045 3925*2^1468438+1 442048 L4099 2018 4046 55*2^1468439-1 442046 L2074 2013 4047 3901*2^1468312+1 442010 L1174 2018 4048 527*2^1468300-1 442006 L3844 2017 4049 10003*2^1468292+1 442004 L1751 2018 4050 4893*2^1468228+1 441985 L4724 2018 4051 7179*2^1468225+1 441984 L4364 2018 4052 7263*2^1468208+1 441979 L1204 2018 4053 5023*2^1468194+1 441975 L2823 2018 4054 759*2^1468175-1 441968 L2519 2017 4055 1929*2^1468155+1 441962 L4750 2018 4056 4601*2^1468143+1 441959 L1209 2018 4057 6621*2^1468075+1 441939 L2158 2018 4058 3057*2^1468032+1 441926 L3784 2018 4059 1509*2^1467911+1 441889 L2992 2018 4060 4335*2^1467856+1 441873 L4728 2018 4061 1467763*2^1467763-1 441847 L381 2007 Woodall 4062 9535278*15^375675-1 441836 L4001 2017 4063 77*2^1467554-1 441780 L145 2006 4064 3849*2^1467527+1 441774 L4148 2018 4065 1073*2^1467421+1 441741 L2121 2012 4066 105*2^1467388-1 441730 L384 2010 4067 8913*2^1467361+1 441724 L1204 2018 4068 3279*2^1467294+1 441704 L4727 2018 4069 4557*2^1467234+1 441686 L1204 2018 4070 3831*2^1467155+1 441662 L1410 2018 4071 1295*2^1467128-1 441653 L1828 2013 4072 9303*2^1466985+1 441611 L4082 2018 4073 4417*2^1466962+1 441604 L4724 2018 4074 9755*2^1466891+1 441583 L1444 2018 4075 8299*2^1466758+1 441543 L4441 2018 4076 2175*2^1466621-1 441501 L1862 2015 4077 2381*2^1466603+1 441495 L1745 2018 4078 9217*2^1466596+1 441494 L3368 2018 4079 6861*2^1466380+1 441429 L1204 2018 4080 7785*2^1466361+1 441423 L1204 2018 4081 3731*2^1466339+1 441416 L4723 2018 4082 8587*2^1466326+1 441413 L4671 2018 4083 76672*1027^146555+1 441366 L4001 2017 4084 7125*2^1466093-1 441342 L860 2017 4085 7987*2^1465960+1 441302 L4082 2018 4086 5416598^65536+1 441302 L4267 2016 Generalized Fermat 4087 253*2^1465908+1 441285 L1498 2012 4088 5205*2^1465831+1 441263 L4724 2018 4089 9395*2^1465797+1 441253 L3431 2018 4090 8361*2^1465797+1 441253 L4724 2018 4091 1993*2^1465686+1 441219 L4716 2018 4092 279*2^1465658+1 441210 L2121 2012 4093 4989*2^1465531+1 441173 L1745 2018 4094 5713*2^1465430+1 441143 L2715 2018 4095 5643*2^1465238+1 441085 L4721 2018 4096 4377*2^1465195+1 441072 L4133 2018 4097 3517*2^1465140+1 441055 L4719 2018 4098 7673*2^1464988-1 441010 L2012 2013 4099 3529*2^1464946+1 440997 L4600 2018 4100 2021*2^1464837+1 440964 L1486 2018 4101 5350408^65536+1 440952 L4201 2016 Generalized Fermat 4102 8413*2^1464751-1 440938 L4113 2015 4103 179*2^1464720-1 440927 L2074 2012 4104 6839*2^1464507+1 440865 L4717 2018 4105 3495*2^1464343+1 440815 L2026 2018 4106 4713*2^1464284+1 440798 L4716 2018 4107 7303*2^1464078+1 440736 L4699 2018 4108 475*2^1464057-1 440728 L3055 2017 4109 4035*2^1463909-1 440685 L1959 2014 4110 955*2^1463821-1 440658 L2257 2017 4111 3423*2^1463697+1 440621 L2606 2017 4112 8517*2^1463683+1 440617 L4708 2017 4113 3509*2^1463591+1 440589 L4708 2017 4114 2059*2^1463470+1 440552 L1502 2017 4115 5693*2^1463369+1 440522 L3166 2017 4116 6955*2^1463326+1 440509 L4707 2017 4117 5263190^65536+1 440484 L4201 2016 Generalized Fermat 4118 1863*2^1463120+1 440447 L3035 2017 4119 8693*2^1463113+1 440445 L2719 2017 4120 7255*2^1463040+1 440423 L2126 2017 4121 4239*2^1463019+1 440417 L3483 2017 4122 3843*2^1462896+1 440380 L1167 2017 4123 1557*2^1462848+1 440365 L2805 2017 4124 2899*2^1462634+1 440301 L2117 2017 4125 533*2^1462557+1 440277 L1186 2012 4126 5222640^65536+1 440264 L4201 2016 Generalized Fermat 4127 165*2^1462368-1 440219 L2101 2011 4128 565*2^1462336+1 440210 L2127 2012 4129 4801*2^1462316+1 440205 L1209 2017 4130 1619*2^1462307+1 440202 L2126 2017 4131 1193*2^1462209+1 440172 L2950 2012 4132 4141*2^1462180+1 440164 L3166 2017 4133 5200658^65536+1 440144 L4201 2016 Generalized Fermat 4134 5589*2^1461914+1 440084 L3531 2017 4135 9753*2^1461822+1 440057 L3035 2017 4136 187*2^1461697-1 440017 L1959 2014 4137 5176028^65536+1 440009 L4261 2015 Generalized Fermat 4138 2127*2^1461607+1 439991 L4698 2017 4139 4809*2^1461581+1 439984 L4699 2017 4140 99*2^1461496-1 439957 L282 2009 4141 821*2^1461453+1 439945 L2085 2012 4142 83*2^1461350-1 439913 L1959 2011 4143 6957*2^1461325-1 439907 L860 2016 4144 9813*2^1461220+1 439876 L3972 2017 4145 647*2^1461075+1 439831 L2734 2012 4146 5143624^65536+1 439830 L4259 2015 Generalized Fermat 4147 9087*2^1460766+1 439739 L1209 2017 4148 8301*2^1460749+1 439734 L1209 2017 4149 765*2^1460683-1 439713 L2519 2017 4150 8711*2^1460583+1 439684 L3035 2017 4151 4073*2^1460504-1 439660 L1959 2014 4152 8589*2^1460366+1 439618 L2790 2017 4153 921*2^1460168+1 439558 L2412 2012 4154 1035*2^1460028-1 439516 L1828 2012 4155 4023*2^1459958-1 439495 L1959 2014 4156 7889*2^1459863+1 439467 L1204 2017 4157 2193*2^1459700+1 439417 L4682 2017 4158 4123*2^1459531-1 439367 L1959 2014 4159 7593*2^1459333+1 439307 L1160 2017 4160 4661*2^1459313+1 439301 L1404 2017 4161 361*2^1459308+1 439299 L1158 2012 Generalized Fermat 4162 315*2^1459160+1 439254 L2127 2012 4163 2325*2^1459157+1 439254 L3299 2017 4164 9199*2^1459086+1 439233 L3166 2017 4165 5189*2^1459077+1 439230 L2613 2017 4166 14104*1027^145834+1 439194 L4001 2017 4167 5125*2^1458922+1 439183 L4681 2017 4168 4961*2^1458889+1 439174 L4680 2017 4169 5715*2^1458885+1 439172 L2606 2017 4170 3585*2^1458624+1 439094 L1444 2017 4171 591*2^1458622-1 439092 L3844 2017 4172 1753*2^1458608+1 439089 L4666 2017 4173 1003*2^1458560+1 439074 L1214 2012 4174 8037*2^1458463+1 439046 L3727 2017 4175 6073*2^1458460+1 439044 L2613 2017 4176 7495*2^1458144+1 438949 L2126 2017 4177 6611*2^1458069+1 438927 L2126 2017 4178 9889*2^1458018+1 438912 L4133 2017 4179 8495*2^1457899+1 438876 L4445 2017 4180 38194*1027^145725+1 438866 L4001 2017 4181 1691*2^1457845+1 438859 L3166 2017 4182 2375*2^1457811+1 438849 L2891 2017 4183 9195*2^1457794+1 438844 L3924 2017 4184 6941*2^1457765+1 438835 L3035 2017 4185 5407*2^1457678+1 438809 L4240 2017 4186 8169*2^1457627+1 438794 L4674 2017 4187 8721*2^1457528+1 438764 L3035 2017 4188 8565*2^1457449+1 438740 L3166 2017 4189 179*2^1457415+1 438728 L1224 2012 4190 2925*2^1457402-1 438726 L2074 2016 4191 505*2^1457394+1 438723 L2121 2012 4192 2813*2^1457293+1 438693 L1444 2017 4193 4389*2^1457095+1 438633 L3035 2017 4194 1179*2^1456957-1 438591 L1828 2012 4195 4407*2^1456904+1 438576 L3035 2017 4196d 192*88^225546+1 438573 L4786 2018 4197 8565*2^1456729+1 438524 L3166 2017 4198 489*2^1456683-1 438508 L3055 2017 4199 413*2^1456498-1 438453 L3844 2017 4200 2703*2^1456473+1 438446 L4240 2017 4201 9591*2^1456427+1 438433 L4671 2017 4202 313*2^1456431-1 438432 L1809 2013 4203 2253*2^1456402+1 438425 L4193 2017 4204 4891596^65536+1 438400 L4201 2015 Generalized Fermat 4205a 20802*351^172225-1 438370 L4001 2019 4206 5557*2^1456112+1 438338 L3035 2017 4207 8149*2^1455990+1 438301 L3035 2017 4208 4855782^65536+1 438191 L4201 2015 Generalized Fermat 4209 301*2^1455620+1 438188 L1999 2012 4210 1551*2^1455459+1 438141 L1204 2017 4211 83*2^1455358-1 438109 L1959 2011 4212 701*2^1455225+1 438070 L2962 2012 4213 4905*2^1455219+1 438069 L1204 2017 4214 35*326^174298-1 438051 L3610 2014 4215 1957*2^1454998+1 438002 L4600 2017 4216 7631*2^1454961+1 437991 L3166 2017 4217 4901*2^1454813+1 437947 L4600 2017 4218 4561*2^1454632+1 437892 L2790 2017 4219 7725*2^1454350+1 437807 L2719 2017 4220 7907*2^1454087+1 437728 L3035 2017 4221 4889*2^1453983+1 437697 L4664 2017 4222 207*2^1453970-1 437691 L330 2013 4223 7301*2^1453903+1 437673 L3035 2017 4224 9395*2^1453811+1 437645 L3035 2017 4225 2863*2^1453714+1 437615 L3037 2017 4226 1085*2^1453676-1 437604 L1828 2012 4227 33570*430^166163-1 437590 L4001 2015 4228 1827*2^1453618+1 437586 L2724 2017 4229 379*2^1453534+1 437560 L2826 2012 4230 8655*2^1453527+1 437560 L4600 2017 4231 8261*2^1453499+1 437551 L4666 2017 4232 281*2^1453426-1 437528 L2101 2012 4233 843*2^1453392-1 437518 L2257 2017 4234 967*2^1453316+1 437495 L2856 2012 4235 8833*2^1453240+1 437473 L4396 2017 4236 6659*2^1453227+1 437469 L4396 2017 4237 2671*2^1453052+1 437416 L2724 2017 4238 6987*2^1452936+1 437382 L4600 2017 4239 9341*2^1452855+1 437357 L1422 2017 4240 21*2^1452771-1 437329 L503 2008 4241 7972*3^916500-1 437286 L3610 2018 4242 4355*2^1452603+1 437281 L2719 2017 4243 8217*2^1452542+1 437263 L3035 2017 4244 3445*2^1452498+1 437250 L2098 2017 4245 2385*2^1452400+1 437220 L3166 2017 4246 513*2^1452354-1 437205 L3844 2017 4247d 320607*2^1452298-1 437191 g337 2018 4248 4191*2^1452211+1 437163 L3035 2017 4249 7383*2^1452124-1 437137 L860 2016 4250 9637*2^1451976+1 437093 L3035 2017 4251 4555*2^1451958+1 437087 L2196 2017 4252 9599*2^1451955+1 437086 L2196 2017 4253 6141*2^1451911+1 437073 L3035 2017 4254 2439*2^1451771+1 437031 L4646 2017 4255 2811*2^1451767+1 437029 L4600 2017 4256 7109*2^1451655+1 436996 L2321 2017 4257 6451*2^1451648+1 436994 L4646 2017 4258 1707*2^1451599+1 436979 L3035 2017 4259 3149*2^1451593+1 436977 L3035 2017 4260 3483*2^1451540+1 436961 L3035 2017 4261 3105*2^1451476+1 436942 L2873 2017 4262 5889*2^1451446+1 436933 L3035 2017 4263 617*2^1451432-1 436928 L2257 2017 4264 2553*2^1451278+1 436882 L3035 2017 4265 4235*2^1451167+1 436849 L3035 2017 4266 2261*2^1451161+1 436847 L2126 2017 4267 4023*2^1451160+1 436847 L4600 2017 4268 8103*2^1451142+1 436842 L3035 2017 4269 8411*2^1450947+1 436783 L4409 2017 4270 4405*2^1450906+1 436770 L3035 2017 4271 9401*2^1450879+1 436763 L3035 2017 4272 911*2^1450865+1 436757 L1158 2012 4273 4615890^65536+1 436749 L4204 2015 Generalized Fermat 4274 9831*2^1450811+1 436742 L3035 2017 4275 3615*2^1450771-1 436730 L860 2016 4276 8949*2^1450758+1 436726 L2873 2017 4277 3015*2^1450731+1 436718 L4193 2017 4278 4603702^65536+1 436674 L4252 2015 Generalized Fermat 4279 5791*2^1450572+1 436670 L2525 2017 4280 995*2^1450439+1 436629 L2139 2012 4281 3795*2^1450429+1 436627 L2790 2017 4282 5757*2^1450227+1 436566 L2714 2017 4283 1101*2^1450203-1 436558 L1828 2012 4284 2259*2^1450110+1 436530 L4625 2017 4285 1139*2^1450029+1 436506 L1509 2012 4286 7107*2^1449990+1 436495 L4600 2017 4287 9101981*2^1449942-1 436483 L1134 2013 4288 1545*2^1449912+1 436471 L4627 2017 4289 7441*2^1449904+1 436469 L3035 2017 4290 4517*2^1449839+1 436449 L2805 2017 4291 6841*2^1449816+1 436442 L4621 2017 4292 5879*2^1449757+1 436425 L3035 2017 4293 5645*2^1449671+1 436399 L4148 2017 4294 1121*2^1449665+1 436396 L2785 2012 4295 855*2^1449637+1 436388 L1336 2012 4296 2395*2^1449510+1 436350 L3727 2017 4297 77743*6^560745-1 436350 p267 2010 4298 2745*2^1449470-1 436338 L3887 2017 4299 7641*2^1449172+1 436249 L3035 2017 4300 909*2^1449002+1 436197 L2125 2012 4301 459*2^1448999-1 436195 L3844 2017 4302 8741*2^1448959+1 436185 L3166 2017 4303 3645*2^1448922-1 436173 L3345 2015 4304 3553*2^1448886+1 436162 L1174 2017 4305 5697*2^1448872+1 436158 L1502 2017 4306 4685*2^1448857+1 436154 L4618 2017 4307 5781*2^1448575+1 436069 L1444 2017 4308 23*2^1448461+1 436032 L170 2008 4309 8229*2^1448451+1 436032 L4616 2017 4310 7267*2^1448444+1 436029 L3035 2017 4311 4935*2^1448410+1 436019 L3035 2017 4312 4061*2^1448270-1 435977 L1959 2014 4313 5303*2^1448249+1 435971 L3877 2017 4314 1027*2^1448217-1 435960 L1828 2013 4315 7791*2^1448172+1 435948 L3824 2017 4316 9299*2^1448067+1 435916 L3035 2017 4317 2577*2^1447980+1 435889 L4404 2017 4318 395*2^1447971+1 435886 L1935 2012 4319 5415*2^1447938+1 435877 L1444 2017 4320 1051*2^1447928+1 435873 L2949 2012 4321 7935*2^1447866+1 435855 L3035 2017 4322 4209*2^1447839+1 435847 L3035 2017 4323 4470420^65536+1 435838 L4249 2015 Generalized Fermat 4324 7821*2^1447627+1 435784 L3035 2017 4325 7471*2^1447520+1 435751 L3803 2017 4326 10107*6^559967+1 435744 p254 2012 4327 1197*2^1447460-1 435732 L1828 2013 4328 4195*2^1447200+1 435655 L3035 2017 4329 3885*2^1447168-1 435645 L860 2017 4330 9547*2^1447084+1 435620 L3035 2017 4331 969*2^1447062+1 435613 L1745 2012 4332 5849*2^1446999+1 435594 L3035 2017 4333 3615*2^1446921-1 435571 L860 2016 4334 6995*2^1446891+1 435562 L3035 2017 4335 1195*2^1446859-1 435552 L1828 2013 4336 3855*2^1446855+1 435551 L3037 2017 4337 3463*2^1446852+1 435550 L4396 2017 4338 1885*2^1446794+1 435532 L4396 2017 4339 6377*2^1446719+1 435510 L3035 2017 4340 711*2^1446472+1 435435 L1224 2012 4341 6263*2^1446429+1 435423 L3035 2017 4342 685*2^1446421-1 435419 L2257 2016 4343 9967*2^1446244+1 435367 L3035 2017 4344 8979*2^1446163+1 435343 L2805 2017 4345 7419*2^1446146+1 435338 L4600 2017 4346 3595*2^1446102+1 435324 L4191 2017 4347 7721*2^1446071+1 435315 L4602 2017 4348 9357*2^1446070+1 435315 L3035 2017 4349 2933*2^1446049+1 435308 L4600 2017 4350 623*2^1445836-1 435243 L2257 2016 4351 4529*2^1445783+1 435228 L4256 2017 4352 1759*2^1445766+1 435223 L3035 2017 4353 9539*2^1445701+1 435204 L3035 2017 4354 1061*2^1445645+1 435186 L2863 2012 4355 1883*2^1445489+1 435139 L3727 2017 4356 1125*2^1445487-1 435138 L1828 2013 4357 8331405*2^1445428-1 435125 L260 2010 4358 923*2^1445405+1 435114 L2942 2012 4359 194*165^196199+1 435071 p289 2012 4360 3715*2^1445254+1 435069 L3472 2017 4361 9645*2^1445245+1 435067 L4598 2017 4362 4125*2^1445206-2723880039837*2^1290000-1 435054 p199 2016 Arithmetic progression (3,d=4125*2^1445205-2723880039837*2^1290000) 4363 4125*2^1445205-1 435054 L1959 2014 Arithmetic progression (2,d=4125*2^1445205-2723880039837*2^1290000) [p199] 4364 7786*3^911800+1 435044 L3610 2018 4365 1233*2^1445171-1 435043 L1828 2013 4366 5685*2^1445127+1 435031 L3877 2017 4367 7795*2^1445110+1 435026 L3035 2017 4368 3191*2^1445003+1 434993 L3035 2017 4369 8263*2^1444862+1 434951 L3727 2017 4370 4317*2^1444732+1 434912 L4246 2017 4371 6957*2^1444729-1 434911 L860 2016 4372 9699*2^1444726+1 434910 L3035 2017 4373 6825*2^1444667+1 434892 L3035 2017 4374 9597*2^1444288+1 434778 L3035 2017 4375 5589*2^1444169+1 434742 L2719 2017 4376 5369*2^1444143+1 434735 L3727 2017 4377 7389*2^1444141+1 434734 L3910 2017 4378 4101*2^1444111+1 434725 L3035 2017 4379 2025*2^1444103+1 434722 L4144 2017 4380 1071*2^1444099-1 434721 L1828 2013 4381 855*2^1444094+1 434719 L2604 2012 4382 6879*2^1443994+1 434690 L3035 2017 4383 8409*2^1443773+1 434623 L3924 2017 4384 4280722^65536+1 434604 L4245 2015 Generalized Fermat 4385 2059*2^1443526+1 434548 L4577 2017 4386 7995*2^1443488+1 434538 L4290 2017 4387 9603*2^1443472+1 434533 L3035 2017 4388 7541*2^1443201+1 434451 L4573 2017 4389 2465*2^1443149+1 434435 L1444 2017 4390 8351*2^1443035+1 434401 L3824 2017 4391 7505*2^1442915+1 434365 L3790 2017 4392 4689*2^1442882+1 434355 L3835 2017 4393 9105*2^1442874+1 434353 L4570 2017 4394 1321*2^1442749-1 434314 L1828 2013 4395 5921*2^1442741+1 434313 L2080 2017 4396 6007*2^1442700+1 434300 L2125 2017 4397 2703*2^1442698+1 434299 L4568 2017 4398 4065*2^1442680+1 434294 L1115 2017 4399 3261*2^1442632+1 434280 L4566 2017 4400 5915*2^1442539+1 434252 L4409 2017 4401 705*2^1442509+1 434242 L2085 2012 4402 2565*2^1442409+1 434212 L2125 2017 4403 7915*2^1442404+1 434211 L4144 2017 4404 6951*2^1442312+1 434184 L1204 2017 4405 2459*2^1442271+1 434171 L1885 2017 4406 4415*2^1441915+1 434064 L2012 2014 4407 345*2^1441905+1 434060 L2604 2012 4408 9419*2^1441873+1 434051 L2790 2017 4409 6687*2^1441807+1 434031 L2125 2017 4410 3299*2^1441747+1 434013 L1307 2017 4411 6239*2^1441701+1 434000 L4290 2017 4412 4155*2^1441677+1 433992 L2125 2017 4413 2701*2^1441660+1 433987 L3803 2017 4414 7827*2^1441599+1 433969 L3035 2017 4415 9831*2^1441403+1 433910 L4556 2017 4416 7615*2^1441226+1 433857 L2125 2017 4417 7365*2^1441142+1 433831 L2125 2017 4418 5531*2^1441137+1 433830 L4374 2017 4419 6877*2^1441110+1 433822 L2125 2017 4420 9405*2^1441012+1 433792 L1444 2017 4421 741*2^1441006-1 433789 L2257 2016 4422 3405*2^1440938+1 433770 L1204 2017 4423 7573*2^1440860+1 433746 L1209 2017 4424 3509*2^1440823+1 433735 L4290 2017 4425 9941*2^1440773+1 433720 L1115 2017 4426 4089*2^1440617+1 433673 L4144 2017 4427 10*802^149319+1 433650 p268 2011 4428 7245*2^1440483+1 433633 L4527 2017 4429 7453*2^1440408+1 433610 L2125 2017 4430 589*2^1440410+1 433610 L1336 2012 4431 9205*2^1440368+1 433598 L4527 2017 4432 3911*2^1440337+1 433589 L1204 2017 4433 3473*2^1440133+1 433527 L2125 2017 4434 6251*2^1440121+1 433524 L4396 2017 4435 7833*2^1439968+1 433478 L1204 2017 4436 1345*2^1439774+1 433419 L4144 2017 4437 1647*2^1439516+1 433341 L4553 2017 4438 7137*2^1439474+1 433329 L1204 2017 4439 7919*2^1439439+1 433319 L2030 2017 4440 4039*2^1439371-1 433298 L1959 2014 4441 1073*2^1439352-1 433292 L1828 2013 4442 1877*2^1439343+1 433289 L1204 2017 4443 7233*2^1439282+1 433271 L1204 2017 4444 417*2^1439196+1 433244 L2604 2012 4445 8291*2^1439181+1 433241 L3035 2017 4446 9319*2^1438998+1 433186 L4144 2017 4447 2171*2^1438969+1 433177 L2125 2017 4448 7119*2^1438962+1 433175 L2125 2017 4449 32771*2^1438879+1 433151 p168 2017 4450 5323*2^1438688+1 433092 L2125 2017 4451 2347*2^1438664+1 433085 L2125 2017 4452 851*2^1438625+1 433073 L1728 2012 4453 685*2^1438521-1 433041 L2257 2016 4454 951*2^1438430-1 433014 L2257 2016 4455 581*2^1438385+1 433000 L2604 2012 4456 7391*2^1438253+1 432962 L3790 2017 4457 637*2^1438112+1 432918 L1524 2012 4458 7385*2^1438105+1 432917 L2125 2017 4459 9135*2^1438018-1 432891 L2338 2013 4460 5705*2^1438003+1 432886 L1204 2017 4461 83*2^1437882-1 432848 L1959 2011 4462 6031*2^1437832+1 432835 L1204 2017 4463 7293*2^1437788+1 432822 L2125 2017 4464 9669*2^1437759+1 432813 L1204 2017 4465 5875*2^1437478+1 432728 L2125 2017 4466 5151*2^1437352+1 432690 L4542 2017 4467 6857*2^1437327+1 432683 L1444 2017 4468 9333*2^1437214+1 432649 L1204 2017 4469 1581*2^1437140+1 432626 L2125 2017 4470 993*2^1437131-1 432623 L2257 2016 4471 9603*2^1437092+1 432612 L2125 2017 4472 6825*2^1437048+1 432599 L2125 2017 4473 133*2^1436963-1 432572 L2074 2014 4474 6219*2^1436922+1 432561 L2125 2017 4475 3539*2^1436865+1 432544 L1204 2017 4476 1397*2^1436799+1 432523 L3483 2017 4477 6511*2^1436732+1 432504 L1204 2017 4478 8183*2^1436661+1 432482 L4461 2017 4479 9549*2^1436549+1 432449 L1204 2017 4480 3966304^65536+1 432432 p329 2015 Generalized Fermat 4481 9135*2^1436354-1 432390 L2338 2013 4482 9755*2^1436303+1 432375 L1204 2017 4483 619*2^1436227-1 432351 L2257 2016 4484 4503*2^1436222+1 432350 L4538 2017 4485 3939670^65536+1 432241 p389 2015 Generalized Fermat 4486 5195*2^1435733+1 432203 L4534 2017 4487 969*2^1435731+1 432202 L1509 2012 4488 6617*2^1435627+1 432171 L1209 2017 4489 957*2^1435600-1 432162 L2257 2016 4490 3279*2^1435566+1 432152 L4540 2017 4491 3231*2^1435528+1 432141 L1204 2017 4492 9955*2^1435502+1 432134 L4533 2017 4493 7545*2^1435466+1 432123 L2125 2017 4494 8985*2^1435423+1 432110 L4364 2017 4495 9085*2^1435304+1 432074 L1204 2017 4496 210092*5^618136-1 432064 L2050 2011 4497 3912496^65536+1 432044 p329 2015 Generalized Fermat 4498 1377*2^1434985-1 431977 L1828 2013 4499 6405*2^1434980+1 431976 L2125 2017 4500 6405*2^1434960+1 431970 L1204 2017 4501 9933*2^1434852+1 431938 L1204 2017 4502 2205*2^1434778+1 431915 L1209 2017 4503 4529*2^1434757+1 431909 L1204 2017 4504 1135*2^1434722+1 431898 L1933 2012 4505 Phi(3,-24743^49152) 431894 L4142 2016 Generalized unique 4506 3475*2^1434684+1 431887 L3035 2017 4507 499*2^1434643-1 431874 L3844 2016 4508 8365*2^1434552+1 431848 L4527 2017 4509 3877352^65536+1 431787 p388 2015 Generalized Fermat 4510 3633*2^1434285+1 431767 L4527 2017 4511 4713*2^1434270+1 431762 L4527 2017 4512 3872228^65536+1 431749 p331 2015 Generalized Fermat 4513 2141*2^1434223+1 431748 L4310 2017 4514 19*2^1434165-1 431728 L503 2008 4515 825*2^1433899+1 431650 L2127 2012 4516 95*2^1433853+1 431635 L2503 2011 Divides GF(1433852,3) 4517 4213*2^1433786+1 431617 L1486 2017 4518 213*2^1433675-1 431582 L1863 2013 4519 141*2^1433536+1 431540 L2560 2012 4520 5265*2^1433521+1 431537 L3924 2017 4521 9009*2^1433509+1 431534 L3942 2017 4522 987*2^1433326+1 431478 L1158 2012 4523 8901*2^1433283+1 431466 L4374 2017 4524 4447*2^1433280+1 431464 L3035 2017 4525 749*2^1433277+1 431463 L2941 2012 4526 825*2^1433131+1 431419 L1991 2012 4527 9225*2^1432997+1 431380 L4374 2017 4528 1395*2^1432992+1 431377 L2549 2017 4529 2503*2^1432934+1 431360 L2549 2017 4530 3101*2^1432929+1 431359 L2549 2017 4531 1255*2^1432761-1 431308 L1828 2013 4532 6293*2^1432653+1 431276 L2549 2017 4533 7511*2^1432637+1 431271 L3035 2017 4534 3803826^65536+1 431242 p319 2015 Generalized Fermat 4535 33450*1027^143193+1 431241 L4001 2017 4536 5001*2^1432451+1 431215 L3972 2017 4537 4329*2^1432341+1 431182 L3035 2017 4538 3363*2^1432325+1 431177 L3972 2017 4539 8437*2^1432298+1 431169 L2549 2017 4540 7787*2^1432295+1 431168 L2549 2017 4541 9119*2^1432167+1 431130 L3035 2017 4542 8457*2^1432166+1 431129 L2549 2017 4543 2453*2^1432097+1 431108 L2549 2017 4544 3785880^65536+1 431107 p386 2015 Generalized Fermat 4545 2687*2^1432003+1 431080 L1444 2017 4546 9507*2^1431974+1 431072 L2549 2017 4547 6643*2^1431844+1 431032 L2549 2017 4548 3825*2^1431720-1 430995 L860 2016 4549 7445*2^1431701+1 430989 L2549 2017 4550 53334*151^197789-1 430983 L4001 2018 4551 8487*2^1431638+1 430970 L3035 2017 4552 2721*2^1431631+1 430968 L3035 2017 4553 3303*112^210284+1 430922 p271 2012 4554 2211*2^1431475+1 430921 L2549 2017 4555 243*2^1431443-1 430910 L2055 2011 4556 1041*2^1431405+1 430899 L1229 2012 4557 7725*2^1431304+1 430870 L2549 2017 4558 3797*2^1431099+1 430808 L3035 2017 4559 5437*2^1431022+1 430785 L3035 2017 4560 2683*2^1430988+1 430774 L3035 2017 4561 6115*2^1430928+1 430757 L2549 2017 4562 5529*2^1430926+1 430756 L3035 2017 4563 729*2^1430906+1 430749 L2002 2011 Generalized Fermat 4564 4551*2^1430903+1 430749 L3035 2017 4565 2409*2^1430894+1 430746 L2549 2017 4566 3345*2^1430731+1 430697 L3035 2017 4567 9465*2^1430655+1 430675 L3035 2017 4568 5879*2^1430627+1 430666 L2549 2017 4569 5163*2^1430388+1 430594 L2549 2016 4570 7833*2^1430357+1 430585 L2549 2016 4571 1079*2^1430317+1 430572 L2940 2012 4572 1031*2^1430239+1 430548 L1129 2012 4573 8725*2^1430096+1 430506 L2549 2016 4574 6905*2^1430043+1 430490 L1444 2016 4575 1193*2^1430037+1 430488 L1555 2012 4576 4677*2^1430031+1 430486 L3035 2016 4577 4473*2^1429916+1 430452 L3035 2016 4578 3879*2^1429703+1 430388 L2038 2016 4579 6699*2^1429651+1 430372 L3035 2016 4580 2715*2^1429628-1 430365 L1959 2014 4581 4615*2^1429550+1 430342 L3035 2016 4582 3343*2^1429548+1 430341 L1486 2016 4583 259410*151^197494-1 430341 L4001 2018 4584 9457*2^1429534+1 430337 L4513 2016 4585 5665*2^1429518+1 430332 L3035 2016 4586 3809*2^1429461+1 430315 L3035 2016 4587 675*2^1429386+1 430291 L1379 2012 4588 4687*2^1429166+1 430226 L3035 2016 4589 267*2^1429060-1 430193 L1828 2013 4590 9645*2^1429021+1 430183 L3035 2016 4591 429*2^1428961-1 430163 L3844 2015 4592 2213*2^1428809+1 430118 L2549 2016 4593 5125*2^1428596+1 430054 L2549 2016 4594 5413*2^1428584+1 430051 L1741 2016 4595 4895*2^1428519+1 430031 L2549 2016 4596 1161*2^1428493-1 430023 L1828 2013 4597 653*2^1428280-1 429958 L2257 2016 4598 6895*2^1428262+1 429954 L2549 2016 4599 3857*2^1428243+1 429948 L4148 2016 4600 501*2^1428194-1 429932 L3994 2015 4601 3735*2^1428107+1 429907 L3035 2016 4602 9897*2^1427948+1 429860 L4507 2016 4603 7745*2^1427909+1 429848 L2549 2016 4604 5119*2^1427870+1 429836 L3035 2016 4605 5775*2^1427829+1 429824 L2549 2016 4606 45*2^1427666+1 429772 L1446 2010 4607 1127*2^1427558-1 429741 L1828 2013 4608 3801*2^1427503-1 429725 L860 2017 4609 7169*2^1427483+1 429720 L2549 2016 4610 6927*2^1427428+1 429703 L3035 2016 4611 270748*5^614625-1 429610 L2050 2011 4612 5669*2^1426981+1 429568 L2549 2016 4613 147*2^1426959+1 429560 L2922 2012 4614 19681127*2^1426862-1 429536 L466 2012 4615 3813*2^1426850-1 429529 L860 2017 4616 8907*2^1426803+1 429515 L2549 2016 4617 6675*2^1426702+1 429484 L4461 2016 4618 2071*2^1426568+1 429444 L1188 2016 4619 6055*2^1426536+1 429434 L2126 2016 4620 9417*2^1426531+1 429433 L4088 2016 4621 1023*2^1426490+1 429420 L1554 2012 4622 94550!-1 429390 p290 2010 Factorial 4623 4137*2^1426269-1 429354 L1959 2014 4624 2018*162^194314-1 429344 p289 2012 4625 8325*2^1426153+1 429319 L3727 2016 4626 9287*2^1426099+1 429303 L2549 2016 4627 3553248^65536+1 429302 p343 2015 Generalized Fermat 4628 2219*2^1426071+1 429294 L3035 2016 4629 113*2^1425998-1 429271 L257 2008 4630 1665*2^1425706+1 429184 L2805 2016 4631 9825*2^1425538+1 429134 L3972 2016 4632 8265*2^1425432+1 429102 L3035 2016 4633 3867*2^1425184-1 429027 L860 2016 4634 5931*2^1425060+1 428990 L3035 2016 4635 783*2^1425060-1 428989 L2257 2016 4636a 2798783*2^1425001+1 428975 L4922 2019 4637a 1870073*2^1425001+1 428975 L4922 2019 4638 4091*2^1424962-1 428960 L1959 2014 4639 8799*2^1424914+1 428946 L1847 2016 4640 31235*430^162872-1 428923 L4001 2015 4641 3503138^65536+1 428898 p343 2015 Generalized Fermat 4642 4855*2^1424730+1 428891 L2805 2016 4643 9547*2^1424512+1 428825 L3035 2016 4644 1129*2^1424494+1 428819 L2939 2012 4645 8331*2^1424440+1 428804 L1502 2016 4646 8233*2^1424438+1 428803 L3727 2016 4647 8899*2^1424382+1 428786 L1885 2016 4648 4039*2^1424325-1 428769 L1959 2014 4649 1077*2^1424277-1 428754 L1828 2013 4650 7597*2^1424110+1 428704 L3035 2016 4651 9417*2^1423991+1 428668 L4408 2016 4652 1169*2^1423969+1 428661 L2948 2012 4653 8993*2^1423933+1 428651 L4479 2016 4654 2715*2^1423777+1 428604 L3035 2016 4655 5169*2^1423715+1 428585 L2805 2016 4656 3462728^65536+1 428568 p343 2014 Generalized Fermat 4657 3461954^65536+1 428561 p316 2014 Generalized Fermat 4658 8703*2^1423566+1 428541 L2615 2016 4659 7697*2^1423519+1 428526 L4374 2016 4660 5327*2^1423499+1 428520 L3035 2016 4661 7753*2^1423442+1 428503 L3035 2016 4662 1299*2^1423389-1 428486 L1828 2013 4663 2715*2^1423318+1 428465 L4461 2016 4664 3446048^65536+1 428430 p316 2014 Generalized Fermat 4665 561*2^1423021+1 428375 L2945 2012 4666 1965*2^1422895+1 428338 L3972 2016 4667 5007*2^1422760+1 428298 L1492 2016 4668 555*2^1422674+1 428271 L2944 2012 4669 4323*2^1422662+1 428268 L2805 2016 4670 6311*2^1422609+1 428252 L3035 2016 4671 1383*2^1422566+1 428239 L3035 2016 4672 3422670^65536+1 428237 p316 2014 Generalized Fermat 4673 5783*2^1422325+1 428167 L2805 2016 4674 255*2^1422283-1 428153 L2074 2012 4675 6639*2^1422171+1 428120 L2805 2016 4676 4585*2^1422156+1 428116 L3972 2016 4677 8835*2^1422152+1 428115 L3727 2016 4678 6291*2^1422123+1 428106 L3483 2016 4679 441*2^1422099-1 428098 L3844 2015 4680 2601*2^1422088+1 428095 L3035 2016 Generalized Fermat 4681 3003*2^1422086+1 428095 L3035 2016 4682 6899*2^1422067+1 428089 L2549 2016 4683 2615*2^1422051+1 428084 L2549 2016 4684 2589*2^1421962+1 428057 L3035 2016 4685 3603*2^1421954-1 428055 L860 2017 4686 3717*2^1421830-1 428018 L860 2017 4687 4545*2^1421743+1 427991 L4452 2016 4688 21*2^1421741+1 427989 g279 2005 4689 537*2^1421571+1 427939 L2557 2012 4690 4199*2^1421561+1 427937 L3263 2016 4691 529*2^1421561-1 427936 L1817 2015 4692 5159*2^1421475+1 427911 L4448 2016 4693 5645*2^1421463+1 427907 L4446 2016 4694 8565*2^1421393+1 427886 L2714 2016 4695 1335*2^1421366-1 427877 L1828 2013 4696 3279*2^1421274+1 427850 L3035 2016 4697 8*3^896701-1 427837 p258 2010 4698 2451*2^1421091+1 427795 L3035 2016 4699 65*2^1421088-1 427792 L1828 2011 4700 7645*2^1421064+1 427787 L2107 2016 4701 5985*2^1421023+1 427775 L3035 2016 4702 3715*2^1420864+1 427727 L3035 2016 4703 6295*2^1420820+1 427714 L3035 2016 4704 973*2^1420727-1 427685 L2257 2016 4705 6911*2^1420713+1 427682 L3035 2016 4706 3465*2^1420684-1 427673 L860 2016 4707 9609*2^1420651+1 427663 L3035 2016 4708 6285*2^1420538+1 427629 L2719 2016 4709 8593*2^1420088+1 427494 L1502 2016 4710 4089*2^1419992-1 427464 L1959 2014 4711 9*2^1419855-1 427420 L323 2009 4712 7395*2^1419423+1 427293 L3037 2016 4713 1425*2^1419356-1 427272 L1134 2013 4714 8427*2^1419347+1 427270 L3035 2016 4715 6205*2^1419276+1 427249 L2520 2016 4716 8449*2^1419154+1 427212 L3035 2016 4717 1665*2^1419149+1 427210 L4414 2016 4718 1018081*2^1419124+1 427205 L123 2018 Generalized Fermat 4719 4405*2^1419028+1 427174 L4440 2016 4720 1047*2^1418968+1 427155 L2093 2012 4721 805*2^1418871-1 427126 L2257 2016 4722 273*2^1418856+1 427121 L2674 2012 4723 473*2^1418790-1 427102 L1817 2015 4724 6405*2^1418647-1 427060 L860 2016 4725 9055*2^1418618+1 427051 L4432 2016 4726 15*2^1418605+1 427044 g279 2006 Divides GF(1418600,5), GF(1418601,6) 4727 4023*2^1418518-1 427021 L1959 2014 4728 4001*2^1418485+1 427011 L3035 2016 4729 1140*1021^141905+1 426999 L4575 2017 4730 399*2^1418376-1 426977 L1819 2013 4731 4525*2^1418258+1 426942 L3179 2016 4732 9925*2^1418158+1 426913 L3035 2016 4733 2717*2^1418127+1 426903 L3035 2016 4734 136*470^159762+1 426902 L4786 2018 4735 9807*2^1418118+1 426901 L3727 2016 4736 2079*2^1418093+1 426892 L3035 2016 4737 989*2^1418056-1 426881 L2257 2016 4738 5523*2^1417932+1 426844 L3035 2016 4739 6081*2^1417843+1 426818 L4428 2016 4740 3543*2^1417834+1 426815 L2549 2016 4741 371*2^1417702-1 426774 L1819 2013 4742 4017*2^1417682-1 426769 L1959 2014 4743 4929*2^1417679+1 426768 L3035 2016 4744 5547*2^1417668+1 426765 L2885 2016 4745 4873*2^1417666+1 426764 L4148 2016 4746 2249*2^1417625+1 426751 L3035 2016 4747 225*2^1417568+1 426733 L2947 2012 Generalized Fermat 4748 8877*2^1417444+1 426698 L3035 2016 4749 7197*2^1417308+1 426657 L1554 2016 4750 8985*2^1417291+1 426652 L3035 2016 4751 8043*2^1417257+1 426641 L4425 2016 4752 8043*2^1416950+1 426549 L1502 2016 4753 303*2^1416878+1 426526 L2937 2012 4754 29*2^1416873+1 426523 g305 2007 4755 3951*2^1416809+1 426506 L3035 2016 4756 7941*2^1416633+1 426453 L2107 2016 4757 7617*2^1416578+1 426437 L3743 2016 4758 6765*2^1416567+1 426433 L4109 2016 4759 7991*2^1416533+1 426423 L3035 2016 4760 61*2^1416365-1 426371 L2055 2011 4761 8969*2^1416319+1 426359 L1204 2016 4762 6757*2^1416084+1 426288 L3587 2016 4763 4723*2^1415856+1 426219 L1180 2016 4764 4133*2^1415841+1 426215 L4409 2016 4765 7595*2^1415805+1 426204 L2549 2016 4766 7071*2^1415591+1 426140 L3824 2016 4767 1457*2^1415467+1 426102 L2126 2016 4768 9937*2^1415272+1 426044 L2126 2016 4769 9315*2^1415223+1 426029 L1122 2016 4770 2163*2^1415017+1 425966 L2126 2016 4771 555*2^1414837-1 425912 L3844 2015 4772 1113*2^1414802-1 425901 L1828 2013 4773 3969*2^1414778+1 425895 L3267 2016 Generalized Fermat 4774 5831*2^1414503+1 425812 L3593 2016 4775 5377*2^1414404+1 425782 L4155 2016 4776 2805*2^1414377+1 425774 L3593 2016 4777 3565*2^1414368+1 425771 L3593 2016 4778 659*2^1414237+1 425731 L2453 2012 4779 149797*2^1414137-1 425703 L105 2005 4780 3617*2^1414087+1 425687 L4418 2016 4781 6405*2^1414047-1 425675 L860 2016 4782 1087*2^1413982+1 425655 L2934 2012 4783 4029*2^1413931+1 425640 L3972 2016 4784 1031*2^1413801+1 425600 L2936 2012 4785 2123*2^1413697+1 425569 L4416 2016 4786 2415*2^1413628-1489088842587*2^1290000-1 425548 p199 2017 Arithmetic progression (3,d=2415*2^1413627-1489088842587*2^1290000) 4787 2415*2^1413627-1 425548 L1959 2014 Arithmetic progression (2,d=2415*2^1413627-1489088842587*2^1290000) [p199] 4788 457*2^1413589-1 425536 L1817 2015 4789 799*2^1413586+1 425535 L2142 2012 4790 4347*2^1413579+1 425534 L3035 2016 4791 2555*2^1413445+1 425493 L3972 2016 4792 4201*2^1413416+1 425485 L2126 2016 4793 3855*2^1413353-1 425466 L860 2017 4794 266206*5^608649-1 425433 L2050 2011 4795 6029*2^1413173+1 425412 L3593 2016 4796 8103*2^1413170+1 425411 L3593 2016 4797 (2^471043+1)^3-2 425395 p392 2016 4798 8145*2^1413104+1 425391 L3593 2016 4799 3155*2^1413105+1 425391 L3035 2016 4800 3095674^65536+1 425379 p343 2013 Generalized Fermat 4801 6461*2^1413011+1 425363 L4414 2016 4802 8725*2^1412910+1 425333 L3727 2016 4803 199*2^1412913-1 425332 L2074 2013 4804 6839*2^1412629+1 425248 L4417 2016 4805 3239*2^1412529+1 425218 L1474 2016 4806 3165*2^1412445+1 425192 L4365 2016 4807 2263*2^1412290+1 425146 L3179 2016 4808 6387*2^1412100+1 425089 L4144 2016 4809 8481*2^1411987+1 425055 L1502 2016 4810 1155*2^1411898-1 425027 L1828 2013 4811 3519*2^1411878+1 425022 L1741 2016 4812 3687*2^1411860-1 425016 L860 2017 4813 8219*2^1411855+1 425015 L4409 2016 4814 6603*2^1411796+1 424997 L3768 2016 4815 6441*2^1411745+1 424982 L2117 2016 4816 5885*2^1411741+1 424981 L3035 2016 4817 5331*2^1411667+1 424958 L2117 2016 4818 6603*2^1411654+1 424955 L3035 2016 4819 8949*2^1411602+1 424939 L3035 2016 4820 2729*2^1411567+1 424928 L4412 2016 4821 2709*2^1411551+1 424923 L4408 2016 4822 559741!7+1 424902 p397 2017 Multifactorial 4823 8043*2^1411466+1 424898 L1387 2016 4824 8875*2^1411456+1 424895 L2142 2016 4825 1311*2^1411417+1 424882 L2126 2016 4826 1077*2^1411370-1 424868 L1828 2013 4827 8579*2^1411193+1 424816 L3035 2016 4828 4761*2^1411093+1 424785 L3727 2016 4829 5354*55^244064-1 424764 L4001 2015 4830 7485*2^1410993+1 424756 L4352 2016 4831 7717*2^1410948+1 424742 L4408 2016 4832 5275*2^1410938+1 424739 L4407 2016 4833 723*2^1410870-1 424718 L2257 2015 4834 9277*2^1410836+1 424708 L3727 2016 4835 1083*2^1410817+1 424702 L1562 2012 4836 339*2^1410789-1 424693 L1830 2011 4837 3867*2^1410726-1 424675 L860 2016 4838 625*2^1410668+1 424657 L1498 2012 Generalized Fermat 4839 6003*2^1410605+1 424639 L4352 2016 4840 5721*2^1410472+1 424599 L3035 2016 4841 4983*2^1410173+1 424509 L2719 2016 4842 9195*2^1410074+1 424479 L2719 2016 4843 7545*2^1409831+1 424406 L2225 2016 4844 8303*2^1409825+1 424404 L4374 2016 4845 9759*2^1409762+1 424385 L1486 2016 4846 11401*2^1409760+1 424385 p400 2018 4847 4723*2^1409754+1 424382 L3035 2016 4848 1263*2^1409755-1 424382 L1828 2013 4849 8745*2^1409673+1 424358 L2719 2016 4850 6507*2^1409602+1 424337 L2225 2016 4851 8707*2^1409397-1 424275 L4113 2016 4852 6495*2^1409216+1 424221 L2520 2016 4853 7901*2^1409209+1 424219 L4404 2016 4854 771*2^1409165-1 424204 L2257 2015 4855 3049*2^1409078+1 424179 L3035 2016 4856 5169*2^1408989+1 424152 L4374 2016 4857 3435*2^1408974+1 424147 L3035 2016 4858 2795*2^1408963+1 424144 L4085 2016 4859 445*2^1408906+1 424126 L2544 2012 4860 5917*2^1408544+1 424018 L3035 2016 4861 6725*2^1408357+1 423962 L2030 2016 4862 2967*2^1408330+1 423954 L3035 2016 4863 439*2^1408326+1 423952 L1546 2012 4864 93*2^1408246+1 423927 L1207 2011 4865 6015*2^1408168+1 423905 L3035 2016 4866 6701*2^1408137+1 423896 L2549 2016 4867 165*2^1408117+1 423888 L2935 2012 4868 3109*2^1407997-1 423853 L4113 2016 4869 1259*2^1407985+1 423849 L4396 2016 4870 7497*2^1407972+1 423846 L4316 2016 4871 8505*2^1407673+1 423756 L3035 2016 4872 105*2^1407665-1 423752 L384 2009 4873 1485*2^1407544+1 423717 L1134 2013 4874 245*2^1407538-1 423714 L1862 2014 4875 6259*2^1407526+1 423712 L2117 2016 4876 9517*2^1407456+1 423691 L3035 2016 4877 2909834^65536+1 423617 L4201 2015 Generalized Fermat 4878 13225*2^1407138+1 423595 L3432 2016 Generalized Fermat 4879 9339*2^1407055+1 423570 L3035 2016 4880 55*2^1406997-1 423551 L1884 2011 4881 5767*2^1406912+1 423527 L4085 2016 4882 8783*2^1406894-1 423522 L4113 2016 4883 543*2^1406895-1 423521 L3844 2015 4884 143*2^1406788-1 423488 L1828 2012 4885 5415*2^1406732+1 423473 L2839 2016 4886 7059*2^1406729-1 423472 L860 2016 4887 5169*2^1406585+1 423428 L2724 2016 4888 549*2^1406577-1 423425 L3844 2015 4889 4261*2^1406536+1 423414 L4144 2016 4890 5301*2^1406295+1 423341 L3035 2016 4891 8613*2^1406280+1 423337 L3035 2016 4892 6771*2^1406280+1 423337 L3035 2016 4893 4521*2^1405865+1 423212 L2520 2016 4894 5631*2^1405664+1 423151 L4033 2016 4895 852*618^151612+1 423151 L4001 2018 4896 5889*2^1405618+1 423137 L3035 2016 4897 8103*2^1405582+1 423127 L2322 2016 4898 7443*2^1405504+1 423103 L4373 2016 4899 2789*2^1405444-1 423085 L4113 2016 4900 2519*2^1405391+1 423069 L3727 2016 4901 4019*2^1405291+1 423039 L3810 2016 4902 6455*2^1405251+1 423027 L4385 2016 4903 8229*2^1405179+1 423005 L4055 2016 4904 3909*2^1405115+1 422986 L1125 2016 4905 4413*2^1404918+1 422927 L4033 2016 4906 10957*2^1404860+1 422910 p400 2018 4907 141*2^1404747+1 422874 L1158 2012 4908 9723*2^1404729+1 422870 L1444 2016 4909 5779*2^1404659-1 422849 L4113 2016 4910 2829122^65536+1 422816 p343 2012 Generalized Fermat 4911 8721*2^1404541+1 422813 L4374 2016 4912 1543*2^1404511-1 422804 L4113 2016 4913 9787*2^1404348+1 422755 L4144 2016 4914 2985*2^1404275-770527213395*2^1290000-1 422733 p199 2017 Arithmetic progression (3,d=2985*2^1404274-770527213395*2^1290000) 4915 2985*2^1404274-1 422733 L1959 2014 Arithmetic progression (2,d=2985*2^1404274-770527213395*2^1290000) [p199] 4916 4143*2^1404267-1 422731 L1959 2014 4917 5829*2^1404265+1 422730 L4375 2016 4918 9735*2^1404228+1 422719 L4374 2016 4919 2715*2^1404211-1 422714 L1959 2014 4920 3413*2^1404209+1 422713 L2719 2016 4921 605*2^1404118-1 422685 L2257 2015 4922 4935*2^1404109+1 422683 L4377 2016 4923 1583*2^1404101+1 422680 L4373 2016 4924 24153*430^160500-1 422677 L4001 2015 4925 8835*2^1404060+1 422669 L4144 2016 4926 3719*2^1403909+1 422623 L4109 2016 4927 11067*2^1403720+1 422566 p400 2018 4928 11757*2^1403508+1 422503 p400 2018 4929 643*2^1403415-1 422473 L2257 2015 4930 4065*2^1403376-1 422462 L1959 2014 4931 1717*2^1403258+1 422426 L2719 2016 4932 3187*2^1403206+1 422411 L2724 2016 4933 4449*2^1403167+1 422400 L3972 2016 4934 600921*2^1403045+1 422365 g337 2018 4935 1227*2^1402984+1 422344 L2724 2016 4936 9451*2^1402940+1 422331 L4287 2016 4937 2779470^65536+1 422312 p343 2012 Generalized Fermat 4938 435*2^1402809+1 422291 L2938 2012 4939 6529*2^1402758+1 422277 L3082 2016 4940 4193*2^1402669+1 422250 L2126 2016 4941 2377*2^1402646+1 422242 L4365 2016 4942 825*2^1402592-1 422226 L2257 2015 4943 11613*2^1402454+1 422185 p400 2018 4944 176112*151^193747-1 422176 L4001 2018 4945 1421*2^1402413+1 422172 L2126 2016 4946 11617*2^1402370+1 422160 p400 2018 4947 4643*2^1402297+1 422138 L1354 2016 4948 5375*2^1402283+1 422133 L3035 2016 4949 647*2^1402275+1 422130 L1158 2012 4950 1101*2^1402221+1 422114 L2168 2012 4951 1055*2^1402194-1 422106 L1828 2013 4952 5819*2^1402055+1 422065 L3972 2016 4953 9021*2^1401873+1 422010 L2126 2016 4954 2744940^65536+1 421956 p343 2012 Generalized Fermat 4955 1319*2^1401575+1 421920 L1354 2016 4956 2738848^65536+1 421893 p343 2012 Generalized Fermat 4957 3711*2^1401197+1 421806 L3972 2016 4958 1131*2^1401172+1 421798 L1456 2012 4959 2621*2^1401155+1 421794 L2549 2016 4960 11375*2^1401093+1 421776 p400 2018 4961 48697*2^1400872+1 421710 L2012 2014 4962 6845*2^1400813+1 421691 L1753 2016 4963 10897*2^1400754+1 421674 p400 2017 4964 5151*2^1400749+1 421672 L4033 2016 4965 4971*2^1400708+1 421659 L4356 2016 4966 3637*2^1400646+1 421641 L4355 2016 4967 9241*2^1400567-1 421617 L4113 2016 4968 2379*2^1400453+1 421582 L1498 2016 4969 11275*2^1400364+1 421556 p400 2017 4970 9723*2^1400333+1 421547 L3781 2016 4971 4391*2^1400279+1 421530 L2126 2016 4972 7051*2^1400136+1 421487 L4338 2016 4973 6627*2^1400095+1 421475 L3908 2016 4974 573*2^1400092+1 421473 L2949 2012 4975 429*2^1400083+1 421470 L2930 2012 4976 11257*2^1400050+1 421462 p400 2017 4977 2815*2^1400006+1 421448 L3727 2016 4978 8979*2^1399971+1 421438 L1753 2016 4979 881*2^1399963+1 421434 L1224 2012 4980 8233*2^1399870+1 421407 L1753 2016 4981 23*2^1399841+1 421396 L1158 2011 4982 2689202^65536+1 421372 L4214 2015 Generalized Fermat 4983 2163*2^1399705+1 421357 L3662 2016 4984 107144*151^193349-1 421309 L4001 2018 4985 5471*2^1399419+1 421271 L3813 2016 4986 2679102^65536+1 421265 L4201 2015 Generalized Fermat 4987 8465*2^1399293+1 421234 L3727 2016 4988 405*2^1399165-1 421194 L1862 2014 4989 7575*2^1399124+1 421183 L3813 2016 4990 5741*2^1399025+1 421153 L3261 2016 4991 3835*2^1398992+1 421143 L3855 2016 4992 127*2^1398889-1 421110 L486 2008 4993 5667*2^1398882+1 421110 L1204 2016 4994 241*2^1398869-1 421104 L1828 2013 4995 2985*2^1398863-1 421104 L1959 2014 4996 3661*2^1398760+1 421073 L4349 2016 4997 3339*2^1398758+1 421072 L1204 2016 4998 125*2^1398712-1 421057 L2101 2012 4999 515*2^1398708-1 421056 L3844 2015 5000 6945*2^1398651+1 421040 L3261 2016 5001 2^1398269-1 420921 G1 1996 Mersenne 35 5002 182402*14^364804-1 418118 p325 2011 Generalized Woodall 5003 17*2^1388355+1 417938 g267 2005 Divides GF(1388354,10) 5004 249798*47^249798-1 417693 L4780 2018 Generalized Woodall 5005 6*10^414508-1 414509 p297 2011 Near-repdigit 5006 2*11171^100961+1 408700 g427 2014 Divides Phi(11171^100961,2) 5007 338707*2^1354830+1 407850 L124 2005 Cullen 5008 226400*63^226400-1 407377 L4780 2018 Generalized Woodall 5009 2*12251^99265+1 405813 g427 2017 Divides Phi(12251^99265,2) 5010 11*2^1343347+1 404389 p169 2005 Divides GF(1343346,6) 5011 107*2^1337019+1 402485 L2659 2012 Divides GF(1337018,10) 5012 1389*2^1335434+1 402009 L1209 2015 Divides GF(1335433,10) 5013 248100*41^248100-1 400138 L4779 2018 Generalized Woodall 5014 272970*29^272970-1 399197 p260 2017 Generalized Woodall 5015 209694*79^209694-1 397927 L4780 2018 Generalized Woodall 5016 5*2^1320487+1 397507 g55 2002 Divides GF(1320486,12) 5017 94189*2^1318646+1 396957 L2777 2013 Generalized Cullen 5018 15266*12^366385-1 395401 p325 2011 Generalized Woodall 5019 2*503^145313+1 392574 g424 2014 Divides Phi(503^145313,2) 5020 10^390636+999*10^195317+1 390637 p363 2014 Palindrome 5021 125132*6^500528-1 389492 L2777 2012 Generalized Woodall 5022 99998*10^389150-1 389155 L3432 2016 Near-repdigit 5023 2618163402417*2^1290001-1 388342 L927 2016 Sophie Germain (2p+1) 5024 4704549881115*2^1290000-1 388342 L3494 2016 Arithmetic progression (3,d=496648444065*2^1290002) 5025 3572178694383*2^1290000-1 388342 L3494 2016 Arithmetic progression (3,d=104644852137*2^1290002) 5026 2996863034895*2^1290000+1 388342 L2035 2016 Twin (p+2) 5027 2996863034895*2^1290000-1 388342 L2035 2016 Twin (p) 5028 2723880039837*2^1290000-1 388342 L3829 2016 Arithmetic progression (1,d=4125*2^1445205-2723880039837*2^1290000) [p199] 5029 2618163402417*2^1290000-1 388342 L927 2016 Sophie Germain (p) 5030 2060323099527*2^1290000-1 388342 L3606 2015 Arithmetic progression (2,d=69718264533*2^1290002) [p199] 5031 1958727695745*2^1290000-1 388341 L4132 2015 Arithmetic progression (2,d=10032831585*2^1290001) [p199] 5032 1938662032575*2^1290000-1 388341 L927 2015 Arithmetic progression (1,d=10032831585*2^1290001) [p199] 5033 1781450041395*2^1290000-1 388341 L3203 2015 Arithmetic progression (1,d=69718264533*2^1290002) [p199] 5034 1489088842587*2^1290000-1 388341 L2511 2014 Arithmetic progression (1,d=2415*2^1413627-1489088842587*2^1290000) [p199] 5035 1188581180295*2^1290000-1 388341 L3765 2014 Arithmetic progression (1,d=160128309135*2^1290001) [L3494] 5036 10^388080-10^112433-1 388080 CH8 2014 Near-repdigit 5037 10^388080-10^180868-1 388080 p377 2014 Near-repdigit 5038 10^388080-10^332944-1 388080 p377 2014 Near-repdigit 5039 10^388080-10^342029-1 388080 p377 2014 Near-repdigit 5040 1957*2^1284992+1 386825 L3913 2014 Divides GF(1284991,6) 5041 5*2^1282755+1 386149 g55 2002 Divides GF(1282754,3), GF(1282748,5) 5042 15*2^1276177+1 384169 g279 2006 Divides GF(1276174,3), GF(1276174,10) 5043 1268979*2^1268979-1 382007 L201 2007 Woodall 5044 2^1257787-1 378632 SG 1996 Mersenne 34 5045 329*2^1246017+1 375092 L2085 2012 Divides Fermat F(1246013) 5046 259738*3^779214+1 371785 L2777 2011 Generalized Cullen 5047 531*2^1233440+1 371306 L2803 2011 Divides GF(1233439,5) 5048 3471*2^1224763+1 368694 L3548 2013 Divides GF(1224758,6) 5049 177482*117^177482+1 367072 g407 2008 Generalized Cullen 5050 843301#-1 365851 p302 2010 Primorial 5051 99*2^1211757+1 364778 L1446 2011 Divides GF(1211755,5) 5052 25*2^1211488+1 364696 g279 2005 Generalized Fermat, divides GF(1211487,12) 5053 10^362600+666*10^181299+1 362601 p363 2014 Palindrome 5054 2^1203793-2^601897+1 362378 L192 2006 Gaussian Mersenne norm 37 5055 183500*93^183500+1 361222 g157 2012 Generalized Cullen 5056 1195203*2^1195203-1 359799 L124 2005 Woodall 5057 83*2^1154617+1 347577 L446 2010 Divides GF(1154616,3) 5058 5245*2^1153762+1 347321 L1204 2013 Divides GF(1153761,12) 5059 29*2^1152765+1 347019 g300 2005 Divides GF(1152760,10) 5060 101*2^1142981+1 344074 L1446 2011 Divides GF(1142980,3) 5061 33*2^1130884+1 340432 L165 2006 Divides GF(1130881,12) 5062 163*2^1129934+1 340147 L1751 2010 Divides GF(1129933,10) 5063 2145*2^1099064+1 330855 L1792 2013 Divides Fermat F(1099061) 5064 93*2^1087202+1 327283 L669 2010 Divides GF(1087199,12) 5065 Phi(3,10^160118)+(137*10^160119+731*10^159275)*(10^843-1)/999 320237 p44 2014 Palindrome 5066 Phi(3,10^160048)+(137*10^160049+731*10^157453)*(10^2595-1)/999 320097 p44 2014 Palindrome 5067 1491*2^1050764+1 316315 L2826 2013 Divides GF(1050763,10) 5068 10^314727-8*10^157363-1 314727 p235 2013 Near-repdigit, palindrome 5069 9539*2^1034437+1 311401 L1502 2013 Divides GF(1034434,10) 5070 549*2^1033187+1 311024 L1224 2011 Divides GF(1033186,5) 5071 151*2^1016600+1 306030 L669 2010 Divides GF(1016599,5) 5072 2^991961-2^495981+1 298611 x28 2005 Gaussian Mersenne norm 36 5073 225*2^988695+1 297630 L1446 2010 Divides GF(988693,6) 5074 10^290253-2*10^145126-1 290253 p235 2012 Near-repdigit, Palindrome 5075 11*2^960901+1 289262 g277 2005 Divides Fermat F(960897) 5076 873*2^922545+1 277717 L153 2010 Divides GF(922543,3) 5077 113*2^916801+1 275987 L153 2009 Divides GF(916800,5), GF(916800,12) 5078 3*2^916773+1 275977 g245 2001 Divides GF(916771,3), GF(916772,10) 5079 Phi(3,10^137747)+(137*10^137748+731*10^129293)*(10^8454-1)/999 275495 p44 2012 Palindrome 5080 1705*2^906110+1 272770 L3174 2012 Divides Fermat F(906108) 5081 10^269479-7*10^134739-1 269479 p235 2012 Near-repdigit, Palindrome 5082 43*2^894766+1 269354 g279 2006 Divides GF(894765,5) 5083 11*2^886071+1 266735 g277 2005 Divides GF(886070,12) 5084 2^859433-1 258716 SG 1994 Mersenne 33 5085 249*2^832207+1 250522 L669 2010 Divides GF(832206,5) 5086 1815*2^823632+1 247942 L1741 2012 Divides GF(823629,12) 5087 7*2^804534+1 242190 g196 2003 Divides GF(804533,12) 5088 5215*2^789906+1 237790 L2659 2012 Divides GF(789905,6) 5089 2^756839-1 227832 SG 1992 Mersenne 32 5090 10^223663-454*10^111830-1 223663 p363 2016 Palindrome 5091 10^220285-949*10^110141-1 220285 p363 2016 Palindrome 5092 10^219113-535*10^109555-1 219113 p363 2016 Palindrome 5093 59*2^727815+1 219096 p227 2008 Divides GF(727814,12) 5094 10^214575-20002*10^107285-1 214575 p363 2016 Palindrome 5095 10^214479-535*10^107238-1 214479 p363 2016 Palindrome 5096 Phi(3,10^104279)+(137*10^104280+731*10^93395)*(10^10884-1)/999 208559 p44 2014 Palindrome 5097 Phi(3,10^104276)+(137*10^104277+731*10^99683)*(10^4593-1)/999 208553 p44 2014 Palindrome 5098 Phi(3,10^104257)+(137*10^104258+731*10^99193)*(10^5064-1)/999 208515 p44 2014 Palindrome 5099 Phi(3,10^103289)+(137*10^103290+731*10^90449)*(10^12840-1)/999 206579 p44 2014 Palindrome 5100 Phi(3,10^103282)+(137*10^103283+731*10^85009)*(10^18273-1)/999 206565 p44 2014 Palindrome 5101 Phi(3,10^103182)+(137*10^103183+731*10^66639)*(10^36543-1)/999 206365 x29 2014 Palindrome 5102 13*2^684560+1 206075 g267 2003 Divides GF(684557,10), GF(684559,6) 5103 27*2^672007+1 202296 g279 2005 Divides Fermat F(672005) 5104 667071*2^667071-1 200815 g55 2000 Woodall 5105 18543637900515*2^666668-1 200701 L2429 2012 Sophie Germain (2p+1) 5106 18543637900515*2^666667-1 200701 L2429 2012 Sophie Germain (p) 5107 3756801695685*2^666669+1 200700 L1921 2011 Twin (p+2) 5108 3756801695685*2^666669-1 200700 L1921 2011 Twin (p) 5109 659*2^617815+1 185984 L732 2009 Divides Fermat F(617813) 5110 151*2^585044+1 176118 L446 2007 Divides Fermat F(585042) 5111 519*2^567235+1 170758 L656 2009 Divides Fermat F(567233) 5112 392113#+1 169966 p16 2001 Primorial 5113 366439#+1 158936 p16 2001 Primorial 5114 243*2^495732+1 149233 L165 2007 Divides Fermat F(495728), GF(495726,3), GF(495728,6), GF(495727,12) 5115 481899*2^481899+1 145072 gm 1998 Cullen 5116 651*2^476632+1 143484 L668 2008 Divides Fermat F(476624) 5117 34790!-1 142891 p85 2002 Factorial 5118 2^364289-2^182145+1 109662 p58 2001 Gaussian Mersenne norm 35 5119 361275*2^361275+1 108761 DS 1998 Cullen 5120 26951!+1 107707 p65 2002 Factorial 5121 65516468355*2^333333+1 100355 L923 2009 Twin (p+2) 5122 65516468355*2^333333-1 100355 L923 2009 Twin (p) 5123 (7176^24691-1)/7175 95202 CH2 2017 Generalized repunit 5124 21480!-1 83727 p65 2001 Factorial 5125 183027*2^265441-1 79911 L983 2010 Sophie Germain (2p+1) 5126 183027*2^265440-1 79911 L983 2010 Sophie Germain (p) 5127 262419*2^262419+1 79002 DS 1998 Cullen 5128 648621027630345*2^253825-1 76424 x24 2009 Sophie Germain (2p+1) 5129 620366307356565*2^253825-1 76424 x24 2009 Sophie Germain (2p+1) 5130 648621027630345*2^253824-1 76424 x24 2009 Sophie Germain (p) 5131 620366307356565*2^253824-1 76424 x24 2009 Sophie Germain (p) 5132 (40734^16111-1)/40733 74267 CH2 2015 Generalized repunit 5133 (64758^15373-1)/64757 73960 p170 2018 Generalized repunit 5134 primV(111534,1,27000) 72683 x25 2013 Generalized Lucas primitive part 5135 (58729^15091-1)/58728 71962 CH2 2017 Generalized repunit 5136 12770275971*2^222225+1 66907 L527 2017 Twin (p+2) 5137 12770275971*2^222225-1 66907 L527 2017 Twin (p) 5138 (63847^13339-1)/63846 64091 p170 2013 Generalized repunit 5139 145823#+1 63142 p21 2000 Primorial 5140 2^203789+2^101895+1 61347 O 2000 Gaussian Mersenne norm 34 5141 (26371^13681-1)/26370 60482 p170 2012 Generalized repunit 5142 99064503957*2^200009-1 60220 L95 2016 Sophie Germain (2p+1) 5143 99064503957*2^200008-1 60220 L95 2016 Sophie Germain (p) 5144 70965694293*2^200006+1 60219 L95 2016 Twin (p+2) 5145 70965694293*2^200006-1 60219 L95 2016 Twin (p) 5146 66444866235*2^200003+1 60218 L95 2016 Twin (p+2) 5147 66444866235*2^200003-1 60218 L95 2016 Twin (p) 5148 (4529^16381-1)/4528 59886 CH2 2012 Generalized repunit 5149 4884940623*2^198800+1 59855 L4166 2015 Twin (p+2) 5150 4884940623*2^198800-1 59855 L4166 2015 Twin (p) 5151 (9082^15091-1)/9081 59729 CH2 2014 Generalized repunit 5152 2003663613*2^195000+1 58711 L202 2007 Twin (p+2) 5153 2003663613*2^195000-1 58711 L202 2007 Twin (p) 5154 primV(27655,1,19926) 57566 x25 2013 Generalized Lucas primitive part 5155 (43326^12041-1)/43325 55827 p170 2017 Generalized repunit 5156 607095*2^176312-1 53081 L983 2009 Sophie Germain (2p+1) 5157 607095*2^176311-1 53081 L983 2009 Sophie Germain (p) 5158 7775705415*2^175116+1 52726 p364 2017 Cunningham chain 2nd kind (2p-1) 5159 7775705415*2^175115+1 52725 p364 2017 Cunningham chain 2nd kind (p) 5160 (38284^11491-1)/38283 52659 CH2 2013 Generalized repunit 5161 38529154785*2^173250+1 52165 L3494 2014 Twin (p+2) 5162 38529154785*2^173250-1 52165 L3494 2014 Twin (p) 5163 48047305725*2^172404-1 51910 L99 2007 Sophie Germain (2p+1) 5164 48047305725*2^172403-1 51910 L99 2007 Sophie Germain (p) 5165 137211941292195*2^171961-1 51780 x24 2006 Sophie Germain (2p+1) 5166 194772106074315*2^171960+1 51780 x24 2007 Twin (p+2) 5167 194772106074315*2^171960-1 51780 x24 2007 Twin (p) 5168 137211941292195*2^171960-1 51780 x24 2006 Sophie Germain (p) 5169 100314512544015*2^171960+1 51780 x24 2006 Twin (p+2) 5170 100314512544015*2^171960-1 51780 x24 2006 Twin (p) 5171 16869987339975*2^171960+1 51779 x24 2005 Twin (p+2) 5172 16869987339975*2^171960-1 51779 x24 2005 Twin (p) 5173 9985628193*2^171009+1 51489 L109 2016 Cunningham chain 2nd kind (2p-1) 5174 9985628193*2^171008+1 51489 L109 2016 Cunningham chain 2nd kind (p) 5175 (34120^11311-1)/34119 51269 CH2 2011 Generalized repunit 5176 129431439657*2^170172+1 51238 L3494 2015 Cunningham chain 2nd kind (2p-1) 5177 129431439657*2^170171+1 51238 L3494 2015 Cunningham chain 2nd kind (p) 5178 14380757307*2^170171+1 51237 L3494 2015 Cunningham chain 2nd kind (2p-1) 5179 14380757307*2^170170+1 51237 L3494 2015 Cunningham chain 2nd kind (p) 5180 33218925*2^169690+1 51090 g259 2002 Twin (p+2) 5181 33218925*2^169690-1 51090 g259 2002 Twin (p) 5182 (50091^10357-1)/50090 48671 p170 2016 Generalized repunit 5183 185688291*2^161617+1 48660 p282 2015 Cunningham chain 2nd kind (2p-1) 5184 185688291*2^161616+1 48660 p282 2015 Cunningham chain 2nd kind (p) 5185 2^160423-2^80212+1 48293 O 2000 Gaussian Mersenne norm 33 5186 primV(40395,-1,15588) 47759 x23 2007 Generalized Lucas primitive part 5187 primV(53394,-1,15264) 47200 CH4 2007 Generalized Lucas primitive part 5188 (44497^10093-1)/44496 46911 p170 2016 Generalized repunit 5189 22835841624*7^54321+1 45917 p296 2010 Twin (p+2) 5190 22835841624*7^54321-1 45917 p296 2010 Twin (p) 5191 1679081223*2^151618+1 45651 L527 2012 Twin (p+2) 5192 1679081223*2^151618-1 45651 L527 2012 Twin (p) 5193 9606632571*2^151515+1 45621 p282 2014 Twin (p+2) 5194 9606632571*2^151515-1 45621 p282 2014 Twin (p) 5195 151023*2^151023-1 45468 g25 1998 Woodall 5196 (1852^13477-1)/1851 44035 p170 2015 Generalized repunit 5197 (42417^9337-1)/42416 43203 p170 2015 Generalized repunit 5198 71509*2^143019-1 43058 g23 1998 Woodall, arithmetic progression (2,d=(143018*2^83969-80047)*2^59049) [x12] 5199e U(2449,-1,12671) 42939 x45 2018 Generalized Lucas number, cyclotomy 5200 84966861*2^140219+1 42219 L3121 2012 Twin (p+2) 5201 84966861*2^140219-1 42219 L3121 2012 Twin (p) 5202 31737014565*2^140004-1 42156 L95 2010 Sophie Germain (2p+1) 5203 31737014565*2^140003-1 42156 L95 2010 Sophie Germain (p) 5204 14962863771*2^140002-1 42155 L95 2010 Sophie Germain (2p+1) 5205 12378188145*2^140002+1 42155 L95 2010 Twin (p+2) 5206 12378188145*2^140002-1 42155 L95 2010 Twin (p) 5207 23272426305*2^140001+1 42155 L95 2010 Twin (p+2) 5208 23272426305*2^140001-1 42155 L95 2010 Twin (p) 5209 14962863771*2^140001-1 42155 L95 2010 Sophie Germain (p) 5210 (32556^9283-1)/32555 41887 CH2 2011 Generalized repunit 5211 (1549^12973-1)/1548 41382 p170 2010 Generalized repunit 5212 13375563435*2^137137-1 41293 p364 2018 Sophie Germain (2p+1) 5213 13375563435*2^137136-1 41293 p364 2018 Sophie Germain (p) 5214 10429091973*2^135136-1 40691 p364 2018 Sophie Germain (2p+1) 5215 10429091973*2^135135-1 40690 p364 2018 Sophie Germain (p) 5216 73378515705*2^133148-1 40093 L167 2018 Sophie Germain (2p+1) 5217 73378515705*2^133147-1 40093 L167 2018 Sophie Germain (p) 5218 primV(4836,1,16704) 39616 x25 2013 Generalized Lucas primitive part 5219e U(21041,-1,9059) 39159 x45 2018 Generalized Lucas number, cyclotomy 5220 8151728061*2^125987+1 37936 p35 2010 Twin (p+2) 5221 8151728061*2^125987-1 37936 p35 2010 Twin (p) 5222 (13117^9151-1)/13116 37679 CH2 2016 Generalized repunit 5223 33759183*2^123459-1 37173 L527 2009 Sophie Germain (2p+1) 5224 33759183*2^123458-1 37173 L527 2009 Sophie Germain (p) 5225 (28839^8317-1)/28838 37090 CH6 2006 Generalized repunit 5226 (4366^10099-1)/4365 36758 x14 2011 Generalized repunit 5227 7068555*2^121302-1 36523 L100 2005 Sophie Germain (2p+1) 5228 7068555*2^121301-1 36523 L100 2005 Sophie Germain (p) 5229 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) 5230 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) 5231 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) 5232 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) 5233 2^116224-15905 34987 c87 2017 ECPP 5234 primV(38513,-1,11502) 34668 x23 2006 Generalized Lucas primitive part 5235 2540041185*2^114730-1 34547 g294 2003 Sophie Germain (2p+1) 5236 2540041185*2^114729-1 34547 g294 2003 Sophie Germain (p) 5237 primV(9008,1,16200) 34168 x23 2005 Generalized Lucas primitive part 5238 (14665*10^34110-56641)/9999 34111 c89 2018 ECPP, Palindrome 5239 10000000000000000000...(34053 other digits)...00000000000000532669 34093 c84 2016 ECPP 5240 primV(6586,1,16200) 32993 x25 2013 Generalized Lucas primitive part 5241e U(1624,-1,10169) 32646 x45 2018 Generalized Lucas number, cyclotomy 5242 1124044292325*2^108000-1 32524 L99 2006 Sophie Germain (2p+1) 5243 1124044292325*2^107999-1 32523 L99 2006 Sophie Germain (p) 5244 2^106693+2^53347+1 32118 O 2000 Gaussian Mersenne norm 32 5245 primV(28875,1,13500) 32116 x25 2016 Generalized Lucas primitive part 5246 (V(77786,1,6453)+1)/(V(77786,1,27)+1) 31429 x25 2012 Lehmer primitive part 5247 primV(10987,1,14400) 31034 x25 2005 Generalized Lucas primitive part 5248 V(148091) 30950 c81 2015 Lucas number, ECPP 5249 (V(73570,1,6309)-1)/(V(73570,1,9)-1) 30661 x25 2016 Lehmer primitive part 5250 49363*2^98727-1 29725 Y 1997 Woodall 5251 U(2341,-1,8819) 29712 x25 2008 Generalized Lucas number 5252 -τ(331^2128) 29492 c80 2015 ECPP 5253 primV(24127,-1,6718) 29433 CH3 2005 Generalized Lucas primitive part 5254 primV(12215,-1,13500) 29426 x25 2016 Generalized Lucas primitive part 5255 V(140057) 29271 c76 2014 Lucas number,ECPP 5256e U(1404,-1,9209) 28981 CH10 2018 Generalized Lucas number, cyclotomy 5257 primV(45922,1,11520) 28644 x25 2011 Generalized Lucas primitive part 5258 primV(205011) 28552 x39 2009 Lucas primitive part 5259 U(16531,1,6721)-U(16531,1,6720) 28347 x36 2007 Lehmer number 5260 (V(28286,1,6309)+1)/(V(28286,1,9)+1) 28045 x25 2016 Lehmer primitive part 5261 U(5092,1,7561)+U(5092,1,7560) 28025 x25 2014 Lehmer number 5262 90825*2^90825+1 27347 Y 1997 Cullen 5263 U(5239,1,7350)-U(5239,1,7349) 27333 CH10 2017 Lehmer number 5264 primV(5673,1,13500) 27028 CH3 2005 Generalized Lucas primitive part 5265 primV(44368,1,9504) 26768 CH3 2005 Generalized Lucas primitive part 5266 tau(157^2206) 26643 FE1 2011 ECPP 5267 primV(10986,-1,9756) 26185 x23 2005 Generalized Lucas primitive part 5268a 1025139165*60013#+1 25992 p115 2019 Arithmetic progression (4,d=6205834*60013#) 5269 primV(11076,-1,12000) 25885 x25 2005 Generalized Lucas primitive part 5270 2^85237+2^42619+1 25659 x16 2000 Gaussian Mersenne norm 31 5271 primV(17505,1,11250) 25459 x25 2011 Generalized Lucas primitive part 5272 U(2325,-1,7561) 25451 x20 2013 Generalized Lucas number 5273 Phi(12345,7176)/31531760245313526865033921 25331 c54 2017 ECPP 5274e U(13084,-13085,6151) 25319 x45 2018 Generalized Lucas number, cyclotomy 5275 primV(42,-1,23376) 25249 x23 2007 Generalized Lucas primitive part 5276e U(1064,-1065,8311) 25158 CH10 2018 Generalized Lucas number, cyclotomy 5277 primV(7577,-1,10692) 25140 x33 2007 Generalized Lucas primitive part 5278 (2^83339+1)/3 25088 c54 2014 ECPP, generalized Lucas number, Wagstaff 5279 6753^5122+5122^6753 25050 FE1 2010 ECPP 5280 U(1766,1,7561)-U(1766,1,7560) 24548 x25 2013 Lehmer number 5281 floor((3/2)^137752)+13566 24257 c35 2015 ECPP 5282 492590931*2^80000-1631979959*2^25001-1 24092 p199 2010 Arithmetic progression (4,d=164196977*2^80000-1631979959*2^25000) 5283 -tau(691^1522) 23770 c65 2014 ECPP 5284 U(1383,1,7561)+U(1383,1,7560) 23745 x25 2013 Lehmer number 5285 6917!-1 23560 g1 1998 Factorial 5286 2^77291+2^38646+1 23267 O 2000 Gaussian Mersenne norm 30 5287 (V(59936,1,4863)+1)/(V(59936,1,3)+1) 23220 x25 2013 Lehmer primitive part 5288 U(1118,1,7561)-U(1118,1,7560) 23047 x25 2013 Lehmer number 5289 (V(45366,1,4857)+1)/(V(45366,1,3)+1) 22604 x25 2013 Lehmer primitive part 5290 τ(257^1698) 22506 c72 2014 ECPP 5291 10^22250+57913 22251 c35 2014 ECPP 5292 2^73845+14717 22230 c61 2013 ECPP 5293 2^73360+10711 22084 c61 2014 ECPP 5294 U(104911) 21925 c82 2015 Fibonacci number, ECPP 5295 20170108*10^21700+39 21708 c83 2016 ECPP 5296 U(19258,-1,5039) 21586 x23 2007 Generalized Lucas number 5297 6380!+1 21507 g1 1998 Factorial 5298 U(43100,1,4620)+U(43100,1,4619) 21407 x25 2016 Lehmer number 5299 (V(23354,1,4869)-1)/(V(23354,1,9)-1) 21231 x25 2013 Lehmer primitive part 5300 U(15631,1,5040)-U(15631,1,5039) 21134 x25 2003 Lehmer number 5301 U(35759,1,4620)+U(35759,1,4619) 21033 x25 2016 Lehmer number 5302 U(31321,1,4620)-U(31321,1,4619) 20767 x25 2016 Lehmer number 5303 ((((((2521008887^3+80)^3+12)^3+450)^3+894)^3+3636)^3+70756)^3+97220 20562 FE1 2006 ECPP, Mills' prime 5304 U(11200,-1,5039) 20400 x25 2004 Generalized Lucas number, cyclotomy 5305 τ(41^2296) 20367 c91 2018 ECPP 5306 Phi(23749,-10) 20160 c47 2014 Unique, ECPP 5307 U(22098,1,4620)+U(22098,1,4619) 20067 x25 2016 Lehmer number 5308 U(21412,1,4620)-U(21412,1,4619) 20004 x25 2016 Lehmer number 5309 V(94823) 19817 c73 2014 Lucas number, ECPP 5310 U(19361,1,4620)+U(19361,1,4619) 19802 x25 2016 Lehmer number 5311 U(8454,-1,5039) 19785 x25 2013 Generalized Lucas number 5312 U(6584,-1,5039) 19238 x23 2007 Generalized Lucas number 5313 (2^63703-1)/42808417 19169 c59 2014 Mersenne cofactor, ECPP 5314 V(89849) 18778 c70 2014 Lucas number, ECPP 5315 primV(145353) 18689 c69 2013 ECPP, Lucas primitive part 5316 Phi(14943,-100) 18688 c47 2014 Unique, ECPP 5317 Phi(18827,10) 18480 c47 2014 Unique, ECPP 5318 42209#+1 18241 p8 1999 Primorial 5319 (V(46662,1,3879)-1)/(V(46662,1,9)-1) 18069 x25 2012 Lehmer primitive part 5320 7457*2^59659+1 17964 Y 1997 Cullen 5321 (2^58199-1)/237604901713907577052391 17497 c59 2015 Mersenne cofactor, ECPP 5322 Phi(26031,-10) 17353 c47 2014 Unique, ECPP 5323 (V(561,1,6309)+1)/(V(561,1,9)+1) 17319 x25 2016 Lehmer primitive part 5324e U(5768,-5769,4591) 17264 x45 2018 Generalized Lucas number, cyclotomy 5325 U(9657,1,4321)-U(9657,1,4320) 17215 x23 2005 Lehmer number 5326 (2^57131-1)/61481396117165983261035042726614288722959856631 17152 c59 2015 Mersenne cofactor, ECPP 5327 U(81839) 17103 p54 2001 Fibonacci number 5328 V(81671) 17069 c66 2013 Lucas number, ECPP 5329 primV(86756) 16920 c74 2015 Lucas primitive part, ECPP 5330 6521953289619*2^55555+1 16737 p296 2013 Triplet (3) 5331 6521953289619*2^55555-1 16737 p296 2013 Triplet (2) 5332 6521953289619*2^55555-5 16737 c58 2013 Triplet (1), ECPP 5333 U(15823,1,3960)-U(15823,1,3959) 16625 x25 2002 Lehmer number, cyclotomy 5334 p(221444161) 16569 c77 2017 Partitions, ECPP 5335 U(10803,1,4081)-U(10803,1,4080) 16457 x25 2005 Lehmer number, cyclotomy 5336 U(11091,-1,4049) 16375 CH3 2005 Generalized Lucas number 5337 (V(21151,1,3777)-1)/(V(21151,1,3)-1) 16324 x25 2011 Lehmer primitive part 5338 U(2554,-1,4751) 16185 CH3 2005 Generalized Lucas number 5339 U(1599,-1,5039) 16141 x23 2007 Generalized Lucas number 5340 (2^53381-1)/15588960193/38922536168186976769/1559912715971690629450336\ 68006103 16008 c84 2017 Mersenne cofactor, ECPP 5341 U(2878,1,4620)-U(2878,1,4619) 15978 x25 2013 Lehmer number 5342 U(10853,1,3960)+U(10853,1,3959) 15977 x25 2002 Lehmer number, cyclotomy 5343 -E(5186)/(704695260558899*578291717*726274378546751504461) 15954 c63 2018 Euler irregular, ECPP 5344e U(5797,-5798,4201) 15806 CH11 2018 Generalized Lucas number, cyclotomy 5345 U(9667,1,3960)-U(9667,1,3959) 15778 x25 2002 Lehmer number, cyclotomy 5346 Phi(2949,-100000000) 15713 c47 2013 Unique, ECPP 5347 U(14257,-1,3779) 15694 x25 2004 Generalized Lucas number, cyclotomy 5348 U(551,-1,5669) 15537 x25 2016 Generalized Lucas number 5349 (U(9275,1,3961)+U(9275,1,3960))/(U(9275,1,45)+U(9275,1,44)) 15537 x38 2009 Lehmer primitive part 5350e (2^51487-1)/57410994232247/17292148963401772464767849635553 15455 c77 2018 Mersenne cofactor, ECPP 5351 (V(824,1,5277)-1)/(V(824,1,3)-1) 15379 x25 2013 Lehmer primitive part 5352a primB(183835) 15368 c77 2019 Lucas Aurifeuillian primitive part, ECPP 5353a primU(77387) 15319 c77 2019 Fibonacci primitive part, ECPP 5354 U(13283,1,3697)+U(13283,1,3696) 15240 x25 2011 Lehmer number 5355b primB(181705) 15189 c77 2019 Lucas Aurifeuillian primitive part, ECPP 5356 16481859*35023#-1 15130 p364 2015 Arithmetic progression (4,d=4190788*35023#) 5357 primV(76568) 15034 c74 2015 Lucas primitive part, ECPP 5358e U(71983)/5614673/363946049 15028 c77 2018 Fibonacci cofactor, ECPP 5359 1008075799*34687#+1 15004 p252 2010 Arithmetic progression (4,d=2571033*34687#) 5360 (V(42995,1,3231)+1)/(V(42995,1,9)+1) 14929 x25 2012 Lehmer primitive part 5361 primV(75316) 14897 c74 2015 Lucas primitive part, ECPP 5362 Phi(5015,-10000) 14848 c47 2013 Unique, ECPP 5363 primV(91322) 14847 c74 2016 Lucas primitive part, ECPP 5364 2^49207-2^24604+1 14813 x16 2000 Gaussian Mersenne norm 29 5365 primV(110676) 14713 c74 2016 Lucas primitive part, ECPP 5366 (V(8003,1,3771)+1)/(V(8003,1,9)+1) 14685 x25 2013 Lehmer primitive part 5367 U(69239)/1384781 14464 c77 2018 Fibonacci cofactor, ECPP 5368 primV(112914) 14446 c74 2016 Lucas primitive part, ECPP 5369d primA(170575) 14258 c77 2018 Lucas Aurifeuillian primitive part, ECPP 5370 V(68213)/7290202116115634431 14237 c77 2018 Lucas cofactor, ECPP 5371 (V(5111,1,3789)+1)/(V(5111,1,9)+1) 14019 x25 2013 Lehmer primitive part 5372 (V(5763,1,3753)+1)/(V(5763,1,27)+1) 14013 x25 2011 Lehmer primitive part 5373 primU(67703) 13954 c77 2018 Fibonacci primitive part, ECPP 5374 U(66947)/12485272838388758877279873712131648167413 13951 c77 2017 Fibonacci cofactor, ECPP 5375d V(66533)/2128184670585621839884209100279 13875 c77 2018 Lucas cofactor, ECPP 5376 6*Bern(5534)/(89651360098907*22027790155387*114866371) 13862 c71 2014 Irregular, ECPP 5377 4410546*Bern(5526)/(4931516285027*1969415121333695957254369297) 13840 c63 2018 Irregular,ECPP 5378 (V(5132,1,3753)+1)/(V(5132,1,27)+1) 13825 x25 2011 Lehmer primitive part 5379 primV(82630) 13814 c74 2014 Lucas primitive part, ECPP 5380 (V(4527,1,3771)+1)/(V(4527,1,9)+1) 13754 x25 2013 Lehmer primitive part 5381 primB(163595) 13675 c77 2018 Lucas Aurifeuillian primitive part, ECPP 5382 6*Bern(5462)/(724389557*8572589*3742097186099) 13657 c64 2013 Irregular, ECPP 5383 263821581*2^45001-487069965*2^25002-1 13556 p199 2010 Arithmetic progression (4,d=87940527*2^45001-487069965*2^25001) 5384 (V(3813,1,3771)-1)/(V(3813,1,9)-1) 13473 x25 2011 Lehmer primitive part 5385 (V(3476,1,3771)-1)/(V(3476,1,9)-1) 13322 x25 2011 Lehmer primitive part 5386 (V(3755,1,3753)-1)/(V(3755,1,27)-1) 13319 x25 2011 Lehmer primitive part 5387 1815615642825*2^44046-1 13272 p395 2016 Cunningham chain (4p+3) 5388 1815615642825*2^44045-1 13272 p395 2016 Cunningham chain (2p+1) 5389 1815615642825*2^44044-1 13271 p395 2016 Cunningham chain (p) 5390 primU(94551) 13174 c77 2018 Fibonacci primitive part, ECPP 5391 primB(242295) 13014 c77 2018 Lucas Aurifeuillian primitive part, ECPP 5392d U(61813)/594517433/3761274442997 12897 c77 2018 Fibonacci cofactor, ECPP 5393 (2^42737+1)/3 12865 M 2007 ECPP, generalized Lucas number, Wagstaff 5394 primU(62771) 12791 c77 2018 Fibonacci primitive part, ECPP 5395 p(131328565) 12758 c77 2017 Partitions, ECPP 5396 primA(154415) 12728 c77 2018 Lucas Aurifeuillian primitive part, ECPP 5397 p(130249452) 12705 c85 2017 Partitions, ECPP 5398 p(130243561) 12705 c85 2017 Partitions, ECPP 5399 p(130242827) 12705 c85 2017 Partitions, ECPP 5400 p(130232271) 12705 c85 2017 Partitions, ECPP 5401 p(130201087) 12703 c85 2017 Partitions, ECPP 5402 p(130168020) 12701 c85 2017 Partitions, ECPP 5403 p(130142600) 12700 c85 2017 Partitions, ECPP 5404 p(130123073) 12699 c85 2017 Partitions, ECPP 5405 p(130086648) 12697 c85 2017 Partitions, ECPP 5406 p(130085878) 12697 c85 2017 Partitions, ECPP 5407 p(130060601) 12696 c85 2016 Partitions, ECPP 5408 p(130000231) 12693 c59 2016 Partitions, ECPP 5409 primA(263865) 12570 c77 2018 Lucas Aurifeuillian primitive part, ECPP 5410 6*Bern(5078)/(64424527603*9985070580644364287) 12533 c63 2013 Irregular, ECPP 5411 (2^41681-1)/1052945423/16647332713153/2853686272534246492102086015457 12495 c77 2015 Mersenne cofactor, ECPP 5412 (2^41521-1)/41602235382028197528613357724450752065089 12459 c54 2012 Mersenne cofactor, ECPP 5413 (2^41263-1)/(1402943*983437775590306674647) 12395 c59 2012 Mersenne cofactor, ECPP 5414 U(59369)/2442423669148466039458303756169988568809269383644075940757020\ 9763004757 12337 c79 2015 Fibonacci cofactor, ECPP 5415 primV(73549) 12324 c74 2015 Lucas primitive part, ECPP 5416 p(122110618) 12302 c77 2015 Partitions, ECPP 5417 p(120052058) 12198 c59 2012 Partitions, ECPP 5418 p(120037981) 12197 c59 2014 Partitions, ECPP 5419 742478255901*2^40069+1 12074 p395 2016 Cunningham chain 2nd kind (4p-3) 5420 996824343*2^40074+1 12073 p395 2016 Cunningham chain 2nd kind (4p-3) 5421 primV(57724) 12063 p54 2001 Lucas primitive part, cyclotomy 5422 primV(59018) 11789 c74 2015 Lucas primitive part, ECPP 5423 V(56003) 11704 p193 2006 Lucas number 5424 primA(143705) 11703 c77 2017 Lucas Aurifeuillian primitive part, ECPP 5425 p(110030755) 11677 c59 2014 Partitions, ECPP 5426 primV(77231) 11637 c74 2015 Lucas primitive part, ECPP 5427 primV(83481) 11631 c74 2015 Lucas primitive part, ECPP 5428 primU(73025) 11587 c77 2015 Fibonacci primitive part, ECPP 5429 primU(67781) 11587 c77 2015 Fibonacci primitive part, ECPP 5430 primV(64652) 11577 c74 2015 Lucas primitive part, ECPP 5431 primB(219165) 11557 c77 2015 Lucas Aurifeuillian primitive part, ECPP 5432 primV(56356) 11557 c74 2015 Lucas primitive part, ECPP 5433 primV(58672) 11557 c74 2015 Lucas primitive part, ECPP 5434 primV(131040) 11557 c74 2015 Lucas primitive part, ECPP 5435 198429723072*11^11005+1 11472 L3323 2016 Cunningham chain 2nd kind (4p-3) 5436 U(54799)/4661437953906084533621577211561 11422 c8 2015 Fibonacci cofactor, ECPP 5437 U(54521)/6403194135342743624071073 11370 c8 2015 Fibonacci cofactor, ECPP 5438 primU(67825) 11336 x23 2007 Fibonacci primitive part 5439 primV(64484) 11306 c74 2014 Lucas primitive part, ECPP 5440 3610!-1 11277 C 1993 Factorial 5441 p(100115477) 11138 c59 2016 Partitions, ECPP 5442 p(100090547) 11137 c59 2014 Partitions, ECPP 5443 U(53189)/69431662887136064191105625570683133711989 11075 c8 2014 Fibonacci cofactor, ECPP 5444 primV(63119) 11060 c74 2014 Lucas primitive part, ECPP 5445 primU(61733) 11058 c77 2015 Fibonacci primitive part, ECPP 5446 14059969053*2^36672+1 11050 p364 2018 Triplet (3) 5447 14059969053*2^36672-1 11050 p364 2018 Triplet (2) 5448 14059969053*2^36672-5 11050 c67 2018 Triplet (1), ECPP 5449 778965587811*2^36627-1 11038 p395 2016 Cunningham chain (4p+3) 5450 778965587811*2^36626-1 11038 p395 2016 Cunningham chain (2p+1) 5451 778965587811*2^36625-1 11038 p395 2016 Cunningham chain (p) 5452 272879344275*2^36622-1 11036 p395 2016 Cunningham chain (4p+3) 5453 272879344275*2^36621-1 11036 p395 2016 Cunningham chain (2p+1) 5454 272879344275*2^36620-1 11036 p395 2016 Cunningham chain (p) 5455 V(52859)/1124137922466041911 11029 c8 2014 Lucas cofactor, ECPP 5456 3507!-1 10912 C 1992 Factorial 5457 V(52201)/70585804042896975505694709575919458733851279868446609 10857 c8 2015 Lucas cofactor, ECPP 5458 V(52009)/39772636393178951550299332730909 10838 c8 2015 Lucas cofactor, ECPP 5459 V(51941)/2808052157610902114547210696868337380250300924116591143641642\ 866931 10789 c8 2015 Lucas cofactor, ECPP 5460 1258566*Bern(4462)/(2231*596141126178107*4970022131749) 10763 c64 2013 Irregular, ECPP 5461 333645655005*2^35549-1 10713 p364 2015 Cunningham chain (4p+3) 5462 333645655005*2^35548-1 10713 p364 2015 Cunningham chain (2p+1) 5463 333645655005*2^35547-1 10713 p364 2015 Cunningham chain (p) 5464 V(51349)/224417260052884218046541 10708 c8 2014 Lucas cofactor, ECPP 5465 V(51169) 10694 p54 2001 Lucas number 5466 U(51031)/95846689435051369 10648 c8 2014 Fibonacci cofactor, ECPP 5467 V(50989)/69818796119453411 10640 c8 2014 Lucas cofactor, ECPP 5468 Phi(13285,-10) 10625 c47 2012 Unique, ECPP 5469 U(50833) 10624 CH4 2005 Fibonacci number 5470 (2^35339-1)/4909884303849890402839544048623503366767426783548098123390\ 4512709297747031041 10562 c77 2015 Mersenne cofactor, ECPP 5471 1213266377*2^35000+4859 10546 c4 2014 ECPP, consecutive primes arithmetic progression (3,d=2430) 5472 1213266377*2^35000+2429 10546 c4 2014 ECPP, consecutive primes arithmetic progression (2,d=2430) 5473 1213266377*2^35000-1 10546 p44 2014 Consecutive primes arithmetic progression (1,d=2430) 5474 1043085905*2^35000+18197 10546 c4 2014 ECPP, consecutive primes arithmetic progression (3,d=18198) 5475 1043085905*2^35000-1 10546 p44 2014 Consecutive primes arithmetic progression (2,d=18198) 5476 1043085905*2^35000-18199 10546 c4 2014 ECPP, consecutive primes arithmetic progression (1,d=18198) 5477 109061779*2^35003+11855 10545 c4 2014 ECPP, consecutive primes arithmetic progression (3,d=5928) 5478 109061779*2^35003+5927 10545 c4 2014 ECPP, consecutive primes arithmetic progression (2,d=5928) 5479 109061779*2^35003-1 10545 p44 2014 Consecutive primes arithmetic progression (1,d=5928) 5480 350049825*2^35000+7703 10545 c4 2014 ECPP, consecutive primes arithmetic progression (3,d=3852) 5481 350049825*2^35000+3851 10545 c4 2014 ECPP, consecutive primes arithmetic progression (2,d=3852) 5482 350049825*2^35000-1 10545 p44 2014 Consecutive primes arithmetic progression (1,d=3852) 5483 146462479*2^35001+8765 10545 c4 2013 ECPP, consecutive primes arithmetic progression (3,d=8766) 5484 146462479*2^35001-1 10545 p44 2013 Consecutive primes arithmetic progression (2,d=8766) 5485 146462479*2^35001-8767 10545 c4 2013 ECPP, consecutive primes arithmetic progression (1,d=8766) 5486 5110664609396115*2^34946-1 10536 p375 2014 Cunningham chain (4p+3) 5487 5110664609396115*2^34945-1 10536 p375 2014 Cunningham chain (2p+1) 5488 5110664609396115*2^34944-1 10535 p375 2014 Cunningham chain (p) 5489 primU(55297) 10483 c8 2014 Fibonacci primitive part, ECPP 5490 primA(219135) 10462 c8 2014 Lucas Aurifeuillian primitive part, ECPP 5491 3221449497221499*2^34567+5 10422 c58 2015 Triplet (3), ECPP 5492 3221449497221499*2^34567+1 10422 p296 2015 Triplet (2) 5493 3221449497221499*2^34567-1 10422 p296 2015 Triplet (1) 5494 1288726869465789*2^34567+1 10421 p296 2014 Triplet (3) 5495 1288726869465789*2^34567-1 10421 p296 2014 Triplet (2) 5496 1288726869465789*2^34567-5 10421 c58 2014 ECPP, Triplet (1) 5497 24029#+1 10387 C 1993 Primorial 5498e 400791048*24001#+1 10378 p155 2018 Arithmetic progression (5,d=59874860*24001#) 5499e 393142614*24001#+1 10378 p155 2018 Arithmetic progression (5,d=54840724*24001#) 5500 221488788*24001#+1 10377 p155 2018 Arithmetic progression (5,d=22703701*24001#) 5501 195262026*24001#+1 10377 p155 2018 Arithmetic progression (5,d=10601738*24001#) 5502 184591880*24001#+1 10377 p155 2018 Arithmetic progression (5,d=17881715*24001#) 5503 6*Bern(4306)/2153 10342 FE8 2009 Irregular, ECPP 5504 V(49391)/298414424560419239 10305 c8 2013 Lucas cofactor, ECPP 5505 23801#+1 10273 C 1993 Primorial 5506b 667674063382677*2^33608+7 10132 c88 2019 Quadruplet (4), ECPP 5507b 667674063382677*2^33608+5 10132 c88 2019 Quadruplet (3), ECPP 5508b 667674063382677*2^33608+1 10132 L4808 2019 Quadruplet (2) 5509b 667674063382677*2^33608-1 10132 L4808 2019 Quadruplet (1) 5510e 655846766879901*2^33505+5 10101 c88 2018 Triplet (1) 5511e 655846766879901*2^33505+1 10101 L4808 2018 Triplet (2) 5512 621988357825221*2^33505+5 10101 c88 2018 Triplet (3) 5513 Phi(427,-10^28) 10081 FE9 2009 Unique, ECPP 5514 9649755890145*2^33335+1 10048 p364 2015 Cunningham chain 2nd kind (4p-3) 5515 15162914750865*2^33219+1 10014 p364 2015 Cunningham chain 2nd kind (4p-3) 5516 32469*2^32469+1 9779 MM 1997 Cullen 5517 (2^32531-1)/(65063*25225122959) 9778 c60 2012 Mersenne cofactor, ECPP 5518 (2^32611-1)/1514800731246429921091778748731899943932296901864652928732\ 838910515860494755367311 9736 c90 2018 Mersenne cofactor, ECPP 5519 8073*2^32294+1 9726 MM 1997 Cullen 5520 V(45953)/4561241750239 9591 c56 2012 Lucas cofactor, ECPP 5521 E(3308)/39308792292493140803643373186476368389461245 9516 c8 2014 Euler irregular, ECPP 5522 Phi(5161,-100) 9505 c47 2012 Unique, ECPP 5523 primA(196035) 9359 c8 2014 Lucas Aurifeuillian primitive part, ECPP 5524 V(44507) 9302 CH3 2005 Lucas number 5525 V(43987)/175949 9188 c8 2014 Lucas cofactor, ECPP 5526 U(43399)/470400609575881344601538056264109423291827366228494341196421 9010 c8 2013 Fibonacci cofactor, ECPP 5527 primU(44113) 8916 c8 2014 Fibonacci primitive part, ECPP 5528 U(42829)/107130175995197969243646842778153077 8916 c8 2014 Fibonacci cofactor, ECPP 5529 (2^29473-1)/(5613392570256862943*24876264677503329001) 8835 c59 2012 Mersenne cofactor, ECPP 5530 primA(159165) 8803 c8 2013 Lucas Aurifeuillian primitive part, ECPP 5531 U(42043)/1681721 8780 c56 2012 Fibonacci cofactor, ECPP 5532 (2^28771-1)/104726441 8653 c56 2012 Mersenne cofactor, ECPP 5533 (2^28759-1)/226160777 8649 c60 2012 Mersenne cofactor, ECPP 5534 Phi(6105,-1000) 8641 c47 2010 Unique, ECPP 5535 Phi(4667,-100) 8593 c47 2009 Unique, ECPP 5536 U(40763)/643247084652261620737 8498 c8 2013 Fibonacci cofactor, ECPP 5537 primU(46711) 8367 c8 2013 Fibonacci primitive part, ECPP 5538 V(39769)/18139109172816581 8295 c8 2013 Lucas cofactor, ECPP 5539 2^27529-2^13765+1 8288 O 2000 Gaussian Mersenne norm 28 5540 primB(148605) 8282 c8 2013 Lucas Aurifeuillian primitive part, ECPP 5541 V(39607)/158429 8273 c46 2011 Lucas cofactor, ECPP 5542 primB(103645) 8202 c8 2013 Lucas Aurifeuillian primitive part, ECPP 5543 primU(62373) 8173 c8 2013 Fibonacci primitive part, ECPP 5544 primB(119945) 8165 c8 2013 Lucas Aurifeuillian primitive part, ECPP 5545 primB(99835) 8126 c8 2013 Lucas Aurifeuillian primitive part, ECPP 5546 primB(96545) 8070 c8 2013 Lucas Aurifeuillian primitive part, ECPP 5547 (2^26903-1)/1113285395642134415541632833178044793 8063 c55 2011 Mersenne cofactor, ECPP 5548 18523#+1 8002 D 1989 Primorial 5549 primU(43121) 7975 c8 2013 Fibonacci primitive part, ECPP 5550 6*Bern(3458)/28329084584758278770932715893606309 7945 c8 2013 Irregular, ECPP 5551 U(37987)/(16117960073*94533840409*1202815961509) 7906 c39 2012 Fibonacci cofactor, ECPP 5552 U(37511) 7839 x13 2005 Fibonacci number 5553 primB(145545) 7824 c8 2013 Lucas Aurifeuillian primitive part, ECPP 5554 V(37357)/20210113386303842894568629 7782 c8 2013 Lucas cofactor, ECPP 5555 U(37217)/4466041 7771 c46 2011 Fibonacci cofactor, ECPP 5556 -E(2762)/2670541 7760 c11 2004 Euler irregular, ECPP 5557 (2^25933-1)/1343522383641330719274248287/55891374030173104216060503792\ 56829183569 7740 c86 2017 Mersenne cofactor 5558 V(36779) 7687 CH3 2005 Lucas number 5559 (2^25243-1)/252431/403889/43014073/449245236879223161338352589831 7551 c84 2016 Mersenne cofactor, ECPP 5560 U(35999) 7523 p54 2001 Fibonacci number, cyclotomy 5561 Phi(4029,-1000) 7488 c47 2009 Unique, ECPP 5562 V(35449) 7409 p12 2001 Lucas number 5563 V(35107)/525110138418084707309 7317 c8 2013 Lucas cofactor, ECPP 5564 primA(161595) 7313 c8 2013 Lucas Aurifeuillian primitive part, ECPP 5565 U(34897)/4599458691503517435329 7272 c8 2013 Fibonacci cofactor, ECPP 5566 V(34759)/27112021 7257 c33 2005 Lucas cofactor, ECPP 5567 U(34807)/551750980997908879677508732866536453 7239 c8 2013 Fibonacci cofactor, ECPP 5568 U(34607)/13088506284255296513 7213 c8 2013 Fibonacci cofactor, ECPP 5569 Phi(9455,-10) 7200 c33 2005 Unique, ECPP 5570 Phi(1479,-100000000) 7168 c47 2009 Unique, ECPP 5571 primB(134415) 7163 c8 2013 Lucas Aurifeuillian primitive part, ECPP 5572 -30*Bern(3176)/(169908471493279*905130251538800883547330531*4349908093\ 09147283469396721753169) 7138 c63 2016 Irregular, ECPP 5573 U(33997)/8119544695419968014626314520991088099382355441843013 7053 c8 2013 Fibonacci cofactor, ECPP 5574 2154675239*16301#+1 7036 p155 2018 Arithmetic progression (6,d=141836149*16301#) 5575 primU(48965) 7012 c8 2013 Fibonacci primitive part, ECPP 5576 -10365630*Bern(3100)/(140592076277*66260150981141825531862457*17930747\ 9508256366206520177467103) 6943 c63 2016 Irregular ECPP 5577 V(33353)/279902102741094707003083072429 6941 c8 2013 Lucas cofactor, ECPP 5578 23005*2^23005-1 6930 Y 1997 Woodall 5579 22971*2^22971-1 6920 Y 1997 Woodall 5580 Phi(2405,-10000) 6912 c47 2009 Unique, ECPP 5581 15877#-1 6845 CD 1992 Primorial 5582 Phi(10887,10) 6841 c33 2005 Unique, ECPP 5583 primU(58773) 6822 c8 2013 Fibonacci primitive part, ECPP 5584 primU(40295) 6737 p12 2001 Fibonacci primitive part 5585 U(32077)/153087505413829037510511957221947361 6669 c8 2013 Fibonacci cofactor, ECPP 5586 6*Bern(2974)/19622040971147542470479091157507 6637 c8 2013 Irregular, ECPP 5587 (2^22193-1)/1482314857/335842152520679489/5501204091835435410769069847\ 32919 6622 c90 2018 Mersenne cofactor 5588 U(30757) 6428 p54 2001 Fibonacci number, cyclotomy 5589 V(31547)/2214098083841440850624929865754025869183488666508931309344798\ 2330346227824686184228977375762399380559492255026457207263132495525655\ 34024996670996378968020508259098756301 6425 c8 2013 Lucas cofactor, ECPP 5590 Phi(7357,-10) 6301 c33 2004 Unique, ECPP 5591 Phi(6437,10) 6240 c47 2008 Unique, ECPP 5592 (2^20887-1)/(694257144641*3156563122511*28533972487913*189380444251383\ 6092687) 6229 c4 2009 Mersenne cofactor, ECPP 5593 (2^20521-1)/123127/2515394736937/1963491988082957280584769807344972887 6124 c84 2017 Mersenne cofactor, ECPP 5594 primU(43653) 6082 CH7 2010 Fibonacci primitive part 5595 primU(70455) 6019 c8 2013 Fibonacci primitive part, ECPP 5596 E(2220)/392431891068600713525 6011 c8 2013 Euler irregular, ECPP 5597 primU(43359) 5939 c8 2013 Fibonacci primitive part, ECPP 5598 -E(2202)/53781055550934778283104432814129020709 5938 c8 2013 Euler irregular, ECPP 5599 primU(28667) 5914 c8 2013 Fibonacci primitive part, ECPP 5600 13649#+1 5862 D 1987 Primorial 5601 V(27827)/3579579016301 5803 c4 2011 Lucas cofactor, ECPP 5602 274386*Bern(2622)/8518594882415401157891061256276973722693 5701 c8 2013 Irregular, ECPP 5603 18885*2^18885-1 5690 K 1987 Woodall 5604 1963!-1 5614 CD 1992 Factorial 5605 13033#-1 5610 CD 1992 Primorial 5606 289*2^18502+1 5573 K 1984 Cullen, generalized Fermat 5607 V(26309)/42316339086094085101 5479 c8 2013 Lucas cofactor, ECPP 5608 E(2028)/11246153954845684745 5412 c55 2011 Euler irregular, ECPP 5609 -30*Bern(2504)/(313*424524649821233650433*117180678030577350578887*801\ 6621720796146291948744439) 5354 c63 2013 Irregular ECPP 5610 U(25561) 5342 p54 2001 Fibonacci number 5611 -E(1990)/8338208577950624722417016286765473477033741642105671913 5258 c8 2013 Euler irregular, ECPP 5612 33957462*Bern(2370)/40685 5083 c11 2003 Irregular, ECPP 5613 4122429552750669*2^16567+7 5003 c83 2016 Quadruplet (4), ECPP 5614 4122429552750669*2^16567+5 5003 c83 2016 Quadruplet (3), ECPP 5615 4122429552750669*2^16567+1 5003 L4342 2016 Quadruplet (2) 5616 4122429552750669*2^16567-1 5003 L4342 2016 Quadruplet (1) 5617 11549#+1 4951 D 1986 Primorial 5618 E(1840)/31237282053878368942060412182384934425 4812 c4 2011 Euler irregular, ECPP 5619 7911*2^15823-1 4768 K 1987 Woodall 5620 Phi(6685,-10) 4560 c8 2003 Unique, ECPP 5621 E(1736)/(55695515*75284987831*3222089324971117) 4498 c4 2004 Euler irregular, ECPP 5622 2^14699+2^7350+1 4425 O 2000 Gaussian Mersenne norm 27 5623 Phi(3273,-100) 4361 c8 2003 Unique, ECPP 5624 (2^14479+1)/3 4359 c4 2004 Generalized Lucas number, Wagstaff, ECPP 5625 276474*Bern(2030)/(19426085*24191786327543) 4200 c8 2003 Irregular, ECPP 5626 V(19469) 4069 x25 2002 Lucas number, cyclotomy, APR-CL assisted 5627 1477!+1 4042 D 1984 Factorial 5628 -2730*Bern(1884)/100983617849 3844 c8 2003 Irregular, ECPP 5629 2840178*Bern(1870)/85 3821 c8 2003 Irregular, ECPP 5630 -197676570*18851280661*Bern(1836)/(59789*3927024469727) 3734 c8 2003 Irregular, ECPP 5631 12379*2^12379-1 3731 K 1984 Woodall 5632 (2^12391+1)/3 3730 M 1996 Generalized Lucas number, Wagstaff 5633 -E(1466)/167900532276654417372106952612534399239 3682 c8 2013 Euler irregular, ECPP 5634 E(1468)/(95*217158949445380764696306893*597712879321361736404369071) 3671 c4 2003 Euler irregular, ECPP 5635 642*Bern(1802)/15720728189 3641 c8 2003 Irregular, ECPP 5636 101406820312263*2^12042+7 3640 c67 2018 Quadruplet (4) 5637 101406820312263*2^12042+5 3640 c67 2018 Quadruplet (3) 5638 101406820312263*2^12042+1 3640 p364 2018 Quadruplet (2) 5639 101406820312263*2^12042-1 3640 p364 2018 Quadruplet (1) 5640 2673092556681*15^3048+4 3598 c67 2015 Quadruplet (4) 5641 2673092556681*15^3048+2 3598 c67 2015 Quadruplet (3) 5642 2673092556681*15^3048-2 3598 c67 2015 Quadruplet (2) 5643 2673092556681*15^3048-4 3598 c67 2015 Quadruplet (1) 5644 2339662057597*10^3490+9 3503 c67 2013 Quadruplet (4) 5645 2339662057597*10^3490+7 3503 c67 2013 Quadruplet (3) 5646 2339662057597*10^3490+3 3503 c67 2013 Quadruplet (2) 5647 2339662057597*10^3490+1 3503 p364 2013 Quadruplet (1) 5648 (2^11279+1)/3 3395 PM 1998 Cyclotomy, generalized Lucas number, Wagstaff 5649 109766820328*7877#-1 3385 p395 2016 Cunningham chain (8p+7) 5650 104052837*7759#-1 3343 p398 2017 Arithmetic progression (6,d=12009836*7759#) 5651 (2^10691+1)/3 3218 c4 2004 Generalized Lucas number, Wagstaff, ECPP 5652 231692481512*7517#-1 3218 p395 2016 Cunningham chain (8p+7) 5653 (2^10501+1)/3 3161 M 1996 Generalized Lucas number, Wagstaff 5654 2^10141+2^5071+1 3053 O 2000 Gaussian Mersenne norm 26 5655 62037039993*7001#+7811555813 3021 x38 2013 Consecutive primes arithmetic progression (4,d=30), ECPP 5656 50946848056*7001#+7811555813 3021 x38 2013 Consecutive primes arithmetic progression (4,d=30), ECPP 5657 26997933312*7001#+7811555753 3020 x38 2013 Consecutive primes arithmetic progression (4,d=30), ECPP 5658 25506692100*7001#+7811555783 3020 x38 2013 Consecutive primes arithmetic progression (4,d=30), ECPP 5659 V(14449) 3020 DK 1995 Lucas number 5660 3124777373*7001#+1 3019 p155 2012 Arithmetic progression (7,d=481789017*7001#) 5661 2996180304*7001#+1 3019 p155 2012 Arithmetic progression (6,d=46793757*7001#) 5662 2946259686*7001#+1 3019 p155 2012 Arithmetic progression (6,d=313558156*7001#) 5663 2915000572*7001#+1 3019 p155 2012 Arithmetic progression (6,d=3093612*7001#) 5664 U(14431) 3016 p54 2001 Fibonacci number 5665 138281163736*6977#+1 3006 p395 2016 Cunningham chain 2nd kind (8p-7) 5666 375967981369*6907#*8-1 2972 p382 2017 Cunningham chain (8p+7) 5667 354362289656*6907#*8-1 2972 p382 2017 Cunningham chain (8p+7) 5668 285993323512*6907#*8-1 2972 p382 2017 Cunningham chain (8p+7) 5669 V(13963) 2919 c11 2002 Lucas number, ECPP 5670 284787490256*6701#+1 2879 p364 2015 Cunningham chain 2nd kind (8p-7) 5671 9531*2^9531-1 2874 K 1984 Woodall 5672 -E(1174)/50550511342697072710795058639332351763 2829 c8 2013 Euler irregular, ECPP 5673 6569#-1 2811 D 1992 Primorial 5674 -E(1142)/6233437695283865492412648122953349079446935570718422828539863\ 59013986902240869 2697 c77 2015 Euler irregular, ECPP 5675 -E(1078)/361898544439043 2578 c4 2002 Euler irregular, ECPP 5676 198267970563*6007#+7811555753 2575 x38 2013 Consecutive primes arithmetic progression (4,d=30), ECPP 5677 V(12251) 2561 p54 2001 Lucas number 5678 974!-1 2490 CD 1992 Factorial 5679 E(1028)/(6415*56837916301577) 2433 c4 2002 Euler irregular, ECPP 5680 E(1004)/(579851915*80533376783) 2364 c4 2002 Euler irregular, ECPP 5681 7755*2^7755-1 2339 K 1984 Woodall 5682 -2090369190*Bern(1236)/(103*939551962476779*157517441360851951) 2276 c4 2002 Irregular, ECPP 5683 -36870*Bern(1228)/1043706675925609 2272 c4 2002 Irregular, ECPP 5684 V(10691) 2235 DK 1995 Lucas number 5685 872!+1 2188 D 1983 Factorial 5686 557387248*5011#+1 2153 p364 2018 Cunningham chain 2nd kind (8p-7) 5687 5045589688*4933#+1 2106 p295 2010 Cunningham chain 2nd kind (8p-7) 5688 -E(902)/(9756496279*314344516832998594237) 2069 c4 2002 Euler irregular, ECPP 5689 -E(886)/68689 2051 c4 2002 Euler irregular, ECPP 5690 4787#+1 2038 D 1984 Primorial 5691 U(9677) 2023 c2 2000 Fibonacci number, ECPP 5692 6611*2^6611+1 1994 K 1984 Cullen 5693 4583#-1 1953 D 1992 Primorial 5694 U(9311) 1946 DK 1995 Fibonacci number 5695 4547#+1 1939 D 1984 Primorial 5696 4297#-1 1844 D 1992 Primorial 5697 125848198864*4253#+1 1829 p199 2010 Cunningham chain 2nd kind (8p-7) 5698 V(8467) 1770 c2 2000 Lucas number, ECPP 5699 4093#-1 1750 CD 1992 Primorial 5700 5795*2^5795+1 1749 K 1984 Cullen 5701 (2^5807+1)/3 1748 PM 1998 Cyclotomy, generalized Lucas number, Wagstaff 5702 54201838768*3917#-1 1681 p395 2016 Cunningham chain (16p+15) 5703 102619722624*3797#+1 1631 p395 2016 Cunningham chain 2nd kind (16p-15) 5704 V(7741) 1618 DK 1995 Lucas number 5705 394254311495*3733#/2+4 1606 c67 2017 Quintuplet (5) 5706 394254311495*3733#/2+2 1606 c67 2017 Quintuplet (4) 5707 394254311495*3733#/2-2 1606 c67 2017 Quintuplet (3) 5708 394254311495*3733#/2-4 1606 c67 2017 Quintuplet (2) 5709 394254311495*3733#/2-8 1606 c67 2017 Quintuplet (1) 5710 83*2^5318-1 1603 K 1984 Woodall 5711 2316765173284*3593#+16073 1543 c18 2016 Quintuplet (5), ECPP 5712 2316765173284*3593#+16069 1543 c18 2016 Quintuplet (4), ECPP 5713 2316765173284*3593#+16067 1543 c18 2016 Quintuplet (3), ECPP 5714 2316765173284*3593#+16063 1543 c18 2016 Quintuplet (2), ECPP 5715 2316765173284*3593#+16061 1543 c18 2016 Quintuplet (1), ECPP 5716 16*199949435137*3499#-1 1494 p382 2016 Cunningham chain (16p+15) 5717 163252711105*3371#/2+4 1443 c67 2014 Quintuplet (5) 5718 163252711105*3371#/2+2 1443 c67 2014 Quintuplet (4) 5719 163252711105*3371#/2-2 1443 c67 2014 Quintuplet (3) 5720 163252711105*3371#/2-4 1443 c67 2014 Quintuplet (2) 5721 163252711105*3371#/2-8 1443 c67 2014 Quintuplet (1) 5722 4713*2^4713+1 1423 K 1984 Cullen 5723 460226463*3301#+1 1402 p252 2010 Arithmetic progression (7,d=30017636*3301#) 5724 9039840848561*3299#/35+7 1401 c67 2013 Quintuplet (5) 5725 9039840848561*3299#/35+5 1401 c67 2013 Quintuplet (4) 5726 9039840848561*3299#/35+1 1401 p364 2013 Quintuplet (3) 5727 9039840848561*3299#/35-1 1401 p364 2013 Quintuplet (2) 5728 9039840848561*3299#/35-5 1401 c67 2013 Quintuplet (1) 5729 E(660)/(19825*3318810147166091*13270662249997061963929586463495619) 1393 c63 2017 Euler irregular, ECPP 5730 E(676)/878618128969410121818976030235415670049335313139115048927177891\ 58174298202475475590955674162377015 1391 c8 2013 Euler irregular, ECPP 5731 3229#+1 1368 D 1984 Primorial 5732 1233917739*3121#+1 1335 p155 2010 Arithmetic progression (7,d=5893725*3121#) 5733 1461401630*3109#+1 1328 p252 2009 Arithmetic progression (7,d=35777939*3109#) 5734 114109760*3041#+1 1303 p151 2017 Arithmetic progression (7,d=18121074*3041#) 5735 5780736564512*3023#-1 1301 p364 2015 Cunningham chain (16p+15) 5736 699549860111847*2^4244+11 1293 c26 2013 Quintuplet (5) 5737 699549860111847*2^4244+7 1293 c26 2013 Quintuplet (4) 5738 699549860111847*2^4244+5 1293 c26 2013 Quintuplet (3) 5739 699549860111847*2^4244+1 1293 p371 2013 Quintuplet (2) 5740 699549860111847*2^4244-1 1293 p371 2013 Quintuplet (1) 5741 898966996992*3001#+1 1289 p364 2015 Cunningham chain 2nd kind (16p-15) 5742 16*2658132486528*2969#+1 1281 p382 2017 Cunningham chain 2nd kind (16p-15) 5743 16*1413951139648*2969#+1 1280 p382 2017 Cunningham chain 2nd kind (16p-15) 5744 546!-1 1260 D 1992 Factorial 5745 V(5851) 1223 DK 1995 Lucas number 5746 406463527990*2801#+1633050403 1209 x38 2013 Consecutive primes arithmetic progression (5,d=30) 5747 68002763264*2749#-1 1185 p35 2012 Cunningham chain (16p+15) 5748 1290733709840*2677#+1 1141 p295 2011 Cunningham chain 2nd kind (16p-15) 5749 U(5387) 1126 WM 1990 Fibonacci number 5750 993530619517*2503#+1633050373 1073 x38 2013 Consecutive primes arithmetic progression (5,d=30) 5751 495690450643*2503#+1633050403 1072 x38 2013 Consecutive primes arithmetic progression (5,d=30) 5752 150822742857*2503#+1633050373 1072 x38 2013 Consecutive primes arithmetic progression (5,d=30) 5753 94807777362*2503#+1633050373 1072 x38 2013 Consecutive primes arithmetic progression (5,d=30) 5754 587027392600*2477#*16-1 1070 p382 2016 Cunningham chain (16p+15) 5755 (2^3539+1)/3 1065 M 1989 First titanic by ECPP, generalized Lucas number, Wagstaff 5756 2968802755*2459#+1 1057 p155 2009 Arithmetic progression (8,d=359463429*2459#) 5757 469!-1 1051 BC 1981 Factorial 5758 28993093368077*2399#+19433 1037 c18 2016 Sextuplet (6), ECPP 5759 28993093368077*2399#+19429 1037 c18 2016 Sextuplet (5), ECPP 5760 28993093368077*2399#+19427 1037 c18 2016 Sextuplet (4), ECPP 5761 28993093368077*2399#+19423 1037 c18 2016 Sextuplet (3), ECPP 5762 28993093368077*2399#+19421 1037 c18 2016 Sextuplet (2), ECPP 5763 6179783529*2411#+1 1037 p102 2003 Arithmetic progression (8,d=176836494*2411#) 5764 R(1031) 1031 WD 1985 Repunit 5765 89595955370432*2371#-1 1017 p364 2015 Cunningham chain (32p+31) 5766 116040452086*2371#+1 1014 p308 2012 Arithmetic progression (9,d=6317280828*2371#) 5767 115248484057*2371#+1 1014 p308 2013 Arithmetic progression (8,d=7327002535*2371#) 5768 113236255068*2371#+1 1014 p308 2013 Arithmetic progression (8,d=6601354956*2371#) 5769 112929231161*2371#+1 1014 p308 2013 Arithmetic progression (8,d=6982118533*2371#) 5770 97336164242*2371#+1 1014 p308 2013 Arithmetic progression (9,d=6350457699*2371#) 5771 93537753980*2371#+1 1014 p308 2013 Arithmetic progression (9,d=3388165411*2371#) 5772 92836168856*2371#+1 1014 p308 2013 Arithmetic progression (9,d=127155673*2371#) 5773 69318339141*2371#+1 1014 p308 2011 Arithmetic progression (9,d=1298717501*2371#) 5774 V(4793) 1002 DK 1995 Lucas number 5775 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 g59 Linton, 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 g305 Berg2, Proth.exe g308 Angel, GFN17Sieve, GFNSearch, Proth.exe g337 Hsieh, NewPGen, PRP, Proth.exe g346 Dausch, ProthSieve, PrimeSierpinski, PRP, Proth.exe g387 Muzik, Proth.exe g403 Yoshimura, ProthSieve, PrimeSierpinski, LLR, Proth.exe g407 HermleGC, MultiSieve, PRP, Proth.exe g410 Anonymous, AthGFNSieve, GFNSearch, GFN16Sieve, 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 gt Taura, Proth.exe K Keller L4 Sun, NewPGen, LLR L10 Ritschel, NewPGen, LLR L47 Bishop_D, ProthSieve, RieselSieve, LLR L51 Hedges, NewPGen, PRP, LLR L53 Zaveri, ProthSieve, RieselSieve, PRP, LLR L62 Ewing, NewPGen, 12121search, LLR L65 Clowes, NewPGen, 12121search, LLR L73 Wallace, ProthSieve, NewPGen, RieselSieve, LLR L95 Urushi, LLR L99 Underbakke, TwinGen, LLR L100 Minovic, TwinGen, LLR L105 Hoof, ProthSieve, RieselSieve, LLR L109 Nair, NewPGen, LLR L111 Fisher, ProthSieve, RieselSieve, LLR L123 Gillion, NewPGen, LLR L124 Rodenkirch, MultiSieve, LLR L129 Snyder, LLR L134 Childers, ProthSieve, RieselSieve, LLR L137 Jaworski, Rieselprime, LLR L145 Minovic, Ksieve, NewPGen, 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 L170 Crosa, 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 L257 Ritschel, Srsieve, Rieselprime, 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 L323 Minovic, Srsieve, NewPGen, Rieselprime, LLR L330 Tjung, Srsieve, Rieselprime, LLR L333 Jogibhai, NewPGen, PrimeGrid, TPS, LLR L381 Mate, Siemelink, Rodenkirch, MultiSieve, LLR L384 Pinho, Srsieve, Rieselprime, LLR L391 Rodenkirch, Srsieve, LLR L421 Bonath, 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 L486 Goforth, Curtis, Srsieve, Rieselprime, LLR L503 Benson, Srsieve, LLR L521 Thompson1, Gcwsieve, MultiSieve, PrimeGrid, LLR L527 Tornberg, TwinGen, LLR L536 Bonath, Srsieve, NPLB, 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 L621 Sutton1, Srsieve, Rieselprime, LLR L622 Cardall, Srsieve, ProthSieve, RieselSieve, LLR L623 Jaworski, Srsieve, NPLB, LLR L632 Stokkedalen, Rieselprime, 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 L806 Stevens, Srsieve, LLR L840 Vogel, Srsieve, Rieselprime, LLR L860 Burt, Srsieve, FreeDCPrimeSearch, 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 L1115 Splain, PSieve, Srsieve, PrimeGrid, LLR L1122 Parker, PSieve, Srsieve, PrimeGrid, LLR L1124 Snow, PSieve, 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 L1135 Frith, PSieve, Srsieve, PrimeGrid, LLR L1137 Brown5, PSieve, Srsieve, PrimeGrid, LLR L1139 Harvey1, PSieve, Srsieve, PrimeGrid, LLR L1142 Dickinson, PSieve, Srsieve, PrimeGrid, LLR L1153 Kaiser1, Srsieve, PrimeGrid, 12121search, LLR L1158 Vogel, PSieve, Srsieve, PrimeGrid, LLR L1160 Sunderland, PSieve, Srsieve, PrimeGrid, LLR L1167 Chambers, PSieve, Srsieve, PrimeGrid, LLR L1174 Brazier, PSieve, Srsieve, PrimeGrid, LLR L1180 Morris1, PSieve, Srsieve, PrimeGrid, LLR L1186 Richard1, PSieve, Srsieve, PrimeGrid, LLR L1188 Faith, PSieve, Srsieve, PrimeGrid, LLR L1189 Hatland, 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 L1207 Storch, PSieve, Srsieve, PrimeGrid, LLR L1209 Wong, PSieve, Srsieve, PrimeGrid, LLR L1210 Rhodes, PSieve, Srsieve, PrimeGrid, LLR L1214 Patterson, PSieve, Srsieve, PrimeGrid, LLR L1218 Winslow, PSieve, Srsieve, PrimeGrid, LLR L1223 Courty, PSieve, Srsieve, PrimeGrid, LLR L1224 Domanov1, PSieve, Srsieve, PrimeGrid, LLR L1229 Gordon1, PSieve, Srsieve, PrimeGrid, LLR L1230 Yooil1, PSieve, Srsieve, PrimeGrid, LLR L1300 Yama, PSieve, Srsieve, PrimeGrid, LLR L1301 Sorbera, Srsieve, CRUS, LLR L1307 Fries, PSieve, Srsieve, PrimeGrid, LLR L1312 Nye, PSieve, Srsieve, PrimeGrid, LLR L1333 Jacques, PSieve, Srsieve, PrimeGrid, LLR L1336 Burt, PSieve, Srsieve, PrimeGrid, LLR L1344 Kobara, PSieve, Srsieve, PrimeGrid, LLR L1347 Vanklein, PSieve, Srsieve, PrimeGrid, LLR L1349 Wallace, Srsieve, NewPGen, PrimeGrid, LLR L1353 Mumper, Srsieve, PrimeGrid, LLR L1354 Vynogradov, PSieve, Srsieve, PrimeGrid, LLR L1355 Beck, PSieve, Srsieve, PrimeGrid, LLR L1356 Gockel, PSieve, Srsieve, PrimeGrid, LLR L1360 Tatterson, PSieve, Srsieve, PrimeGrid, LLR L1379 Uehara1, PSieve, Srsieve, PrimeGrid, LLR L1387 Anonymous, PSieve, Srsieve, PrimeGrid, LLR L1403 Andrews1, PSieve, Srsieve, PrimeGrid, LLR L1404 Klein, PSieve, Srsieve, PrimeGrid, LLR L1408 Emery, PSieve, Srsieve, PrimeGrid, LLR L1410 Canossi, PSieve, Srsieve, PrimeGrid, LLR L1412 Jones_M, PSieve, Srsieve, PrimeGrid, LLR L1413 Morton, PSieve, Srsieve, PrimeGrid, LLR L1415 Englund, 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 L1484 Morris, PSieve, Srsieve, PrimeGrid, LLR L1486 Dinkel, PSieve, Srsieve, PrimeGrid, LLR L1487 Krompolc, PSieve, Srsieve, PrimeGrid, LLR L1492 Eiterig, PSieve, Srsieve, PrimeGrid, LLR L1498 Goral, PSieve, Srsieve, PrimeGrid, LLR L1500 Melvold, PSieve, Srsieve, PrimeGrid, LLR L1502 Champ, PSieve, Srsieve, PrimeGrid, LLR L1505 Watanabe, PSieve, Srsieve, PrimeGrid, LLR L1509 Wallin, PSieve, Srsieve, PrimeGrid, LLR L1512 Obara, PSieve, Srsieve, PrimeGrid, LLR L1513 Miller1, PSieve, Srsieve, PrimeGrid, LLR L1524 Bohl, PSieve, Srsieve, PrimeGrid, LLR L1546 Franke1, PSieve, Srsieve, PrimeGrid, LLR L1554 Melcher, PSieve, Srsieve, PrimeGrid, LLR L1555 Walczak, PSieve, Srsieve, PrimeGrid, LLR L1562 Myllyvirta, PSieve, Srsieve, PrimeGrid, LLR L1567 Schlereth, PSieve, Srsieve, PrimeGrid, LLR L1576 Craig, PSieve, Srsieve, PrimeGrid, LLR L1584 ODonnell, PSieve, Srsieve, PrimeGrid, LLR L1595 Cilliers, PSieve, Srsieve, PrimeGrid, LLR L1671 Donohue, PSieve, Srsieve, PrimeGrid, LLR L1675 Schwieger, PSieve, Srsieve, PrimeGrid, LLR L1728 Gasewicz, PSieve, Srsieve, PrimeGrid, LLR L1733 Murphy, PSieve, Srsieve, PrimeGrid, LLR L1741 Granowski, PSieve, Srsieve, PrimeGrid, LLR L1745 Cholt, PSieve, Srsieve, PrimeGrid, LLR L1751 Eckhard, Srsieve, PrimeGrid, LLR L1753 Iwasaki, PSieve, Srsieve, PrimeGrid, LLR L1774 Schoefer, PSieve, 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 L1809 Vogel, PSieve, Srsieve, NPLB, LLR L1817 Barnes, PSieve, Srsieve, NPLB, LLR L1819 Gunn, PSieve, Srsieve, NPLB, LLR L1823 Larsson, PSieve, Srsieve, PrimeGrid, LLR L1827 Chatfield, PSieve, Srsieve, NPLB, LLR L1828 Benson, PSieve, Srsieve, Rieselprime, LLR L1830 Bonath, PSieve, Srsieve, NPLB, LLR L1842 Ohlsson, PSieve, Srsieve, PrimeGrid, 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 L1933 Ingram, PSieve, Srsieve, PrimeGrid, LLR L1935 Channing, PSieve, Srsieve, PrimeGrid, LLR L1949 Pritchard, Srsieve, PrimeGrid, RieselSieve, LLR L1957 Hemsley, PSieve, Srsieve, PrimeGrid, LLR L1959 Metcalfe, PSieve, Srsieve, Rieselprime, LLR L1978 Chu, PSieve, Srsieve, NPLB, LLR L1979 Tibbott, PSieve, Srsieve, PrimeGrid, LLR L1980 Mueller3, PSieve, Srsieve, PrimeGrid, LLR L1983 Safford, PSieve, Srsieve, PrimeGrid, LLR L1990 Makowski, PSieve, Srsieve, PrimeGrid, LLR L1991 Shaw, PSieve, Srsieve, PrimeGrid, LLR L1999 Obermeyer, PSieve, Srsieve, PrimeGrid, LLR L2002 Gramolin, NewPGen, LLR L2006 Rix, PSieve, Srsieve, PrimeGrid, LLR L2012 Pedersen_K, Srsieve, CRUS, OpenPFGW, LLR L2017 Hubbard, PSieve, Srsieve, NPLB, LLR L2019 Wood_D, PSieve, Srsieve, PrimeGrid, LLR L2026 Schoeler, PSieve, Srsieve, PrimeGrid, LLR L2028 Klein, PSieve, Srsieve, NPLB, LLR L2030 Tonner, PSieve, Srsieve, PrimeGrid, LLR L2035 Greer, TwinGen, PrimeGrid, LLR L2038 Siegert, PSieve, Srsieve, PrimeGrid, LLR L2046 Melvold, Srsieve, PrimeGrid, LLR L2050 Kaiser1, Srsieve, PrimeGrid, SierpinskiRiesel, LLR L2051 Reich, PSieve, Srsieve, PrimeGrid, LLR L2054 Kaiser1, Srsieve, CRUS, LLR L2055 Soule, PSieve, Srsieve, Rieselprime, LLR L2058 Sas, PSieve, Srsieve, PrimeGrid, LLR L2066 Harste, PSieve, Srsieve, PrimeGrid, LLR L2070 Schemmel, PSieve, Srsieve, PrimeGrid, LLR L2074 Minovic, PSieve, Srsieve, Rieselprime, LLR L2080 Schick, PSieve, Srsieve, PrimeGrid, LLR L2085 Dodson1, PSieve, Srsieve, PrimeGrid, LLR L2093 McNeill, PSieve, Srsieve, PrimeGrid, LLR L2098 Shane, PSieve, Srsieve, PrimeGrid, LLR L2100 Christensen, PSieve, Srsieve, PrimeGrid, LLR L2101 Tutusaus, PSieve, Srsieve, Rieselprime, LLR L2103 Schmidt1, PSieve, Srsieve, PrimeGrid, LLR L2107 Hebr, 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 L2127 Scherbakov, PSieve, Srsieve, PrimeGrid, LLR L2131 Johnson4, PSieve, Srsieve, PrimeGrid, LLR L2137 Hayashi1, PSieve, Srsieve, PrimeGrid, LLR L2139 Hagerty, PSieve, Srsieve, PrimeGrid, LLR L2142 Hajek, PSieve, Srsieve, PrimeGrid, LLR L2158 Krauss, PSieve, Srsieve, PrimeGrid, LLR L2163 VanRooijen1, PSieve, Srsieve, PrimeGrid, LLR L2168 Butler, PSieve, Srsieve, PrimeGrid, LLR L2196 Steel, PSieve, Srsieve, PrimeGrid, LLR L2222 Johnson5, PSieve, Srsieve, PrimeGrid, LLR L2225 Maiman, PSieve, Srsieve, PrimeGrid, LLR L2233 Herder, Srsieve, PrimeGrid, LLR L2235 Mullage, PSieve, Srsieve, NPLB, LLR L2241 Wintrip, PSieve, Srsieve, PrimeGrid, LLR L2257 Dettweiler, 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 L2359 Eipert, PSieve, Srsieve, PrimeGrid, LLR L2366 Satoh, PSieve, Srsieve, PrimeGrid, LLR L2371 Luszczek, Srsieve, PrimeGrid, LLR L2373 Tarasov1, Srsieve, PrimeGrid, LLR L2399 Bouch, PSieve, Srsieve, PrimeGrid, LLR L2408 Reinman, Srsieve, PrimeGrid, LLR L2412 Ahn, PSieve, Srsieve, PrimeGrid, LLR L2413 Blyth, PSieve, Srsieve, PrimeGrid, LLR L2419 Gathright, PSieve, Srsieve, PrimeGrid, LLR L2425 DallOsto, LLR L2429 Bliedung, TwinGen, PrimeGrid, LLR L2432 Sutton1, PSieve, Srsieve, Rieselprime, LLR L2444 Batalov, PSieve, Srsieve, Rieselprime, LLR L2453 Bogachov, PSieve, Srsieve, PrimeGrid, LLR L2484 Ritschel, PSieve, Srsieve, Rieselprime, LLR L2487 Liao, PSieve, Srsieve, PrimeGrid, LLR L2494 Javtokas, PSieve, Srsieve, PrimeGrid, LLR L2503 Zhan1, PSieve, Srsieve, PrimeGrid, LLR L2507 Geis, PSieve, Srsieve, PrimeGrid, LLR L2511 Johnson6, TwinGen, PrimeGrid, LLR L2516 Koschewski, PSieve, Srsieve, 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 L2521 Matillek, PSieve, Srsieve, PrimeGrid, LLR L2525 Bliedung, PSieve, Srsieve, PrimeGrid, LLR L2526 Martinik, PSieve, Srsieve, PrimeGrid, LLR L2532 Papp2, PSieve, Srsieve, PrimeGrid, LLR L2533 Yoshikawa, PSieve, Srsieve, PrimeGrid, LLR L2539 Gielkens, PSieve, Srsieve, PrimeGrid, LLR L2544 Tarasov1, PSieve, Srsieve, PrimeGrid, LLR L2545 Nose, PSieve, Srsieve, PrimeGrid, LLR L2549 McKay, PSieve, Srsieve, PrimeGrid, LLR L2552 Foulher, PSieve, Srsieve, PrimeGrid, LLR L2557 Clark3, PSieve, Srsieve, PrimeGrid, LLR L2559 Watanabe1, PSieve, Srsieve, PrimeGrid, LLR L2560 Grube, PSieve, Srsieve, PrimeGrid, LLR L2561 Vinklat, PSieve, Srsieve, PrimeGrid, LLR L2562 Jones3, PSieve, Srsieve, PrimeGrid, LLR L2564 Bravin, PSieve, Srsieve, PrimeGrid, LLR L2583 Nakamura, PSieve, Srsieve, PrimeGrid, LLR L2594 Sheridan, PSieve, Srsieve, PrimeGrid, LLR L2602 Mueller4, PSieve, Srsieve, PrimeGrid, LLR L2603 Hoffman, PSieve, Srsieve, PrimeGrid, LLR L2604 Nobis, PSieve, Srsieve, PrimeGrid, LLR L2606 Slakans, PSieve, Srsieve, PrimeGrid, LLR L2613 Schmidt2, PSieve, Srsieve, PrimeGrid, LLR L2615 Pleva, PSieve, Srsieve, PrimeGrid, LLR L2622 Jeancolas, PSieve, Srsieve, PrimeGrid, LLR L2623 Pabis, PSieve, Srsieve, PrimeGrid, LLR L2626 DeKlerk, PSieve, Srsieve, PrimeGrid, LLR L2627 Graham2, PSieve, Srsieve, PrimeGrid, LLR L2636 Fick, PSieve, Srsieve, PrimeGrid, LLR L2649 Brandstaetter, PSieve, Srsieve, PrimeGrid, LLR L2650 Gordon2, PSieve, Srsieve, PrimeGrid, LLR L2659 Reber, PSieve, Srsieve, PrimeGrid, LLR L2664 Koluvere, PSieve, Srsieve, PrimeGrid, LLR L2673 Burningham, PSieve, Srsieve, PrimeGrid, LLR L2674 Michalowski, PSieve, Srsieve, PrimeGrid, LLR L2675 Ling, PSieve, Srsieve, PrimeGrid, LLR L2676 Cox2, PSieve, Srsieve, PrimeGrid, LLR L2682 Lichtenwimmer, PSieve, Srsieve, PrimeGrid, LLR L2691 Pettersen, PSieve, Srsieve, PrimeGrid, LLR L2703 Armstrong, PSieve, Srsieve, PrimeGrid, LLR L2706 Lane, 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 L2724 AverayJones, PSieve, Srsieve, PrimeGrid, LLR L2734 Mamonov, PSieve, Srsieve, PrimeGrid, LLR L2735 Kenney, PSieve, Srsieve, PrimeGrid, LLR L2742 Fluttert, PSieve, Srsieve, PrimeGrid, LLR L2777 Ritschel, Gcwsieve, TOPS, LLR L2785 Meili, PSieve, Srsieve, PrimeGrid, LLR L2787 Kapicioglu, PSieve, Srsieve, PrimeGrid, LLR L2790 Szymeczko, PSieve, Srsieve, PrimeGrid, LLR L2803 Barbyshev, PSieve, Srsieve, PrimeGrid, LLR L2805 Barr, PSieve, Srsieve, PrimeGrid, LLR L2808 Ferrandis, PSieve, Srsieve, PrimeGrid, LLR L2823 Loureiro, PSieve, Srsieve, PrimeGrid, LLR L2826 Jeudy, PSieve, Srsieve, PrimeGrid, LLR L2827 Melzer, PSieve, Srsieve, PrimeGrid, LLR L2839 Swearingen, PSieve, Srsieve, PrimeGrid, LLR L2840 Santana, PSieve, Srsieve, PrimeGrid, LLR L2841 Minovic, Gcwsieve, MultiSieve, TOPS, LLR L2842 English1, PSieve, Srsieve, PrimeGrid, LLR L2856 Charette, PSieve, Srsieve, PrimeGrid, LLR L2859 Keenan, PSieve, Srsieve, PrimeGrid, LLR L2863 Orr, PSieve, Srsieve, PrimeGrid, LLR L2873 Jurach, PSieve, Srsieve, PrimeGrid, LLR L2876 Pryazhentsev, PSieve, Srsieve, PrimeGrid, LLR L2885 Busacker, PSieve, Srsieve, PrimeGrid, LLR L2891 Lacroix, PSieve, Srsieve, PrimeGrid, LLR L2895 Leonard1, PSieve, Srsieve, PrimeGrid, LLR L2901 Leschek, PSieve, Srsieve, PrimeGrid, LLR L2912 Lantinga, PSieve, Srsieve, PrimeGrid, LLR L2922 Pepper, PSieve, Srsieve, PrimeGrid, LLR L2930 Ruber, PSieve, Srsieve, PrimeGrid, LLR L2934 VanWeers, PSieve, Srsieve, PrimeGrid, LLR L2935 Bamber, PSieve, Srsieve, PrimeGrid, LLR L2936 Preusch, PSieve, Srsieve, PrimeGrid, LLR L2937 Chi, PSieve, Srsieve, PrimeGrid, LLR L2938 VanLeeuwen, PSieve, Srsieve, PrimeGrid, LLR L2939 Brouwer, PSieve, Srsieve, PrimeGrid, LLR L2940 Revol, PSieve, Srsieve, PrimeGrid, LLR L2941 Thompson4, PSieve, Srsieve, PrimeGrid, LLR L2942 Grant1, PSieve, Srsieve, PrimeGrid, LLR L2944 Stahl, PSieve, Srsieve, PrimeGrid, LLR L2945 Schaefer1, PSieve, Srsieve, PrimeGrid, LLR L2947 Si, PSieve, Srsieve, PrimeGrid, LLR L2948 Plentner, PSieve, Srsieve, PrimeGrid, LLR L2949 Kostal, PSieve, Srsieve, PrimeGrid, LLR L2950 Harlass, PSieve, Srsieve, PrimeGrid, LLR L2954 Lee4, PSieve, Srsieve, PrimeGrid, LLR L2955 Hollings, PSieve, Srsieve, PrimeGrid, LLR L2956 Ensink, PSieve, Srsieve, PrimeGrid, LLR L2957 Fitch, PSieve, Srsieve, PrimeGrid, LLR L2958 Hsu1, PSieve, Srsieve, PrimeGrid, LLR L2959 Derrera, PSieve, Srsieve, PrimeGrid, LLR L2960 Huenicke, PSieve, Srsieve, PrimeGrid, LLR L2962 Nagasawa, PSieve, Srsieve, PrimeGrid, LLR L2963 Newberry, PSieve, Srsieve, PrimeGrid, LLR L2967 Ryjkov, PSieve, Srsieve, PrimeGrid, LLR L2973 Kurtovic, Srsieve, PrimeGrid, LLR L2975 Loureiro, GeneferCUDA, AthGFNSieve, PrimeGrid, LLR L2979 Terry, PSieve, Srsieve, PrimeGrid, LLR L2981 Yoshigoe, PSieve, Srsieve, PrimeGrid, LLR L2984 Sey, PSieve, Srsieve, PrimeGrid, LLR L2987 Isetti, PSieve, Srsieve, PrimeGrid, LLR L2989 Jurka, PSieve, Srsieve, PrimeGrid, LLR L2992 Boehm, PSieve, Srsieve, PrimeGrid, LLR L2997 Williams2, PSieve, Srsieve, PrimeGrid, LLR L3014 Janda, PSieve, Srsieve, PrimeGrid, LLR L3019 Pozharski, PSieve, Srsieve, PrimeGrid, LLR L3023 Winslow, PSieve, Srsieve, PrimeGrid, 12121search, LLR L3029 Walsh, PSieve, Srsieve, PrimeGrid, LLR L3030 Harder, 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 L3043 Hayase, PSieve, Srsieve, PrimeGrid, LLR L3049 Tardy, PSieve, Srsieve, PrimeGrid, LLR L3054 Winslow, Srsieve, PrimeGrid, LLR L3055 Heino, PSieve, Srsieve, NPLB, LLR L3075 Goellner, PSieve, Srsieve, PrimeGrid, LLR L3082 Liu2, PSieve, Srsieve, PrimeGrid, LLR L3091 Ridgway, PSieve, Srsieve, PrimeGrid, LLR L3101 Reichard, PSieve, Srsieve, PrimeGrid, LLR L3105 Eldredge, PSieve, Srsieve, PrimeGrid, LLR L3108 Horotan, PSieve, Srsieve, PrimeGrid, LLR L3110 Ruge, PSieve, Srsieve, PrimeGrid, LLR L3113 Utendorf, PSieve, Srsieve, PrimeGrid, LLR L3118 Yama, GeneferCUDA, AthGFNSieve, PrimeGrid, LLR L3121 Kwok, NewPGen, TPS, LLR L3125 Rizman, PSieve, Srsieve, PrimeGrid, LLR L3127 Gilles, PSieve, Srsieve, PrimeGrid, LLR L3131 Kopp, PSieve, Srsieve, PrimeGrid, LLR L3139 Berker, PSieve, Srsieve, PrimeGrid, LLR L3141 Kus, PSieve, Srsieve, PrimeGrid, LLR L3149 Gordiani, PSieve, Srsieve, PrimeGrid, LLR L3154 Hentrich, PSieve, Srsieve, PrimeGrid, LLR L3157 Becker2, Srsieve, PrimeGrid, SierpinskiRiesel, LLR L3166 Jackson1, PSieve, Srsieve, PrimeGrid, LLR L3167 Delisle, 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 L3180 Poon, PSieve, Srsieve, PrimeGrid, LLR L3181 Klucken, PSieve, Srsieve, PrimeGrid, LLR L3183 Haller, Srsieve, PrimeGrid, LLR L3184 Hayslette, GeneferCUDA, AthGFNSieve, PrimeGrid, LLR L3188 Oenen, PSieve, Srsieve, PrimeGrid, LLR L3190 Vogel, Srsieve, PrimeGrid, SierpinskiRiesel, LLR L3192 Gundermann, PSieve, Srsieve, PrimeGrid, LLR L3200 Athanas, PSieve, Srsieve, PrimeGrid, LLR L3202 Sharma, PSieve, Rieselprime, LLR L3203 Scalise, TwinGen, PrimeGrid, LLR L3206 Chang2, PSieve, Srsieve, PrimeGrid, LLR L3209 McArdle, GenefX64, AthGFNSieve, PrimeGrid, LLR L3213 OBrien1, PSieve, Srsieve, PrimeGrid, LLR L3221 Vicena, PSieve, Srsieve, PrimeGrid, LLR L3222 Yamamoto, PSieve, Srsieve, PrimeGrid, LLR L3223 Yurgandzhiev, PSieve, Srsieve, PrimeGrid, LLR L3230 Kumagai, GeneferCUDA, AthGFNSieve, PrimeGrid, LLR L3233 Nadeau, PSieve, Srsieve, PrimeGrid, LLR L3234 Parangalan, PSieve, Srsieve, PrimeGrid, LLR L3237 Reifschneider, PSieve, Srsieve, PrimeGrid, LLR L3248 Kumagai, PSieve, Srsieve, PrimeGrid, LLR L3249 Lind, PSieve, Srsieve, PrimeGrid, LLR L3260 Stanko, PSieve, Srsieve, PrimeGrid, LLR L3261 Batalov, PSieve, Srsieve, PrimeGrid, LLR L3262 Molder, PSieve, Srsieve, PrimeGrid, LLR L3263 Gaillard1, PSieve, Srsieve, PrimeGrid, LLR L3267 Cain, PSieve, Srsieve, PrimeGrid, LLR L3271 Hedlund, PSieve, Srsieve, PrimeGrid, LLR L3276 Jeka, PSieve, Srsieve, PrimeGrid, LLR L3277 Wijnen, PSieve, Srsieve, PrimeGrid, LLR L3278 Fischer1, PSieve, Srsieve, PrimeGrid, LLR L3279 Hollander, PSieve, Srsieve, PrimeGrid, LLR L3284 Bosma, PSieve, Srsieve, PrimeGrid, LLR L3289 Evans1, PSieve, Srsieve, PrimeGrid, LLR L3290 Bednar1, PSieve, Srsieve, PrimeGrid, LLR L3294 Bartlett, PSieve, Srsieve, PrimeGrid, LLR L3299 Haller, PSieve, Srsieve, PrimeGrid, LLR L3311 Noon, PSieve, Srsieve, PrimeGrid, LLR L3312 Perchenko, PSieve, Srsieve, PrimeGrid, LLR L3313 Yost, Srsieve, PrimeGrid, SierpinskiRiesel, LLR L3319 Kusig, PSieve, Srsieve, PrimeGrid, LLR L3323 Ritschel, NewPGen, TOPS, LLR L3325 Elvy, PSieve, Srsieve, PrimeGrid, LLR L3327 Mierzejowski, PSieve, Srsieve, PrimeGrid, LLR L3329 Tatearka, PSieve, Srsieve, PrimeGrid, LLR L3333 Romer, PSieve, Srsieve, PrimeGrid, LLR L3335 Kramer2, PSieve, Srsieve, PrimeGrid, LLR L3336 Dongen, Siemelink, Srsieve, LLR L3338 DeJesus, PSieve, Srsieve, PrimeGrid, LLR L3343 Woerner, PSieve, Srsieve, PrimeGrid, LLR L3344 Fausten, PSieve, Srsieve, PrimeGrid, LLR L3345 Domanov1, PSieve, Rieselprime, LLR L3354 Willig, Srsieve, PrimeGrid, SierpinskiRiesel, LLR L3368 Karpin, PSieve, Srsieve, PrimeGrid, LLR L3372 Ryan, PSieve, Srsieve, PrimeGrid, LLR L3377 Ollivier, PSieve, Srsieve, PrimeGrid, LLR L3378 Glasgow, PSieve, Srsieve, PrimeGrid, LLR L3385 Rassokhin, PSieve, Srsieve, PrimeGrid, LLR L3397 Volf, PSieve, Srsieve, PrimeGrid, LLR L3405 Odom, PSieve, Srsieve, PrimeGrid, LLR L3409 Rehnberg, PSieve, Srsieve, PrimeGrid, LLR L3410 Kurtovic, Srsieve, PrimeGrid, SierpinskiRiesel, LLR L3412 Niermann, PSieve, Srsieve, PrimeGrid, LLR L3415 Johnston1, PSieve, Srsieve, PrimeGrid, LLR L3418 Stein, PSieve, Srsieve, PrimeGrid, LLR L3422 Micom, PSieve, Srsieve, PrimeGrid, LLR L3423 Collins, PSieve, Srsieve, PrimeGrid, LLR L3427 Pasanen, PSieve, Srsieve, PrimeGrid, LLR L3428 Cristian, PSieve, Srsieve, PrimeGrid, LLR L3430 Durstewitz, PSieve, Srsieve, PrimeGrid, LLR L3431 Gahan, PSieve, Srsieve, PrimeGrid, LLR L3432 Batalov, Srsieve, LLR L3436 Linder, PSieve, Srsieve, PrimeGrid, LLR L3439 Huang, PSieve, Srsieve, PrimeGrid, LLR L3440 Pelikan, PSieve, Srsieve, PrimeGrid, LLR L3441 Ilves, PSieve, Srsieve, PrimeGrid, LLR L3444 Crane, PSieve, Srsieve, PrimeGrid, LLR L3445 Bishopp, PSieve, Srsieve, PrimeGrid, LLR L3446 Marshall3, PSieve, Srsieve, PrimeGrid, LLR L3452 Resto, PSieve, Srsieve, PrimeGrid, LLR L3453 Benes, PSieve, Srsieve, PrimeGrid, LLR L3456 Murai, 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 L3470 Fisan, PSieve, Srsieve, PrimeGrid, LLR L3471 Gieorgijewski, PSieve, Srsieve, PrimeGrid, LLR L3472 Hernas, PSieve, Srsieve, PrimeGrid, LLR L3473 Mizelle, 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 L3531 Kalus, PSieve, Srsieve, PrimeGrid, 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 L3561 Wrchowetzky, PSieve, Srsieve, PrimeGrid, LLR L3562 Schouten, Srsieve, PrimeGrid, LLR L3564 Jaworski, Srsieve, CRUS, LLR L3566 Slakans, Srsieve, PrimeGrid, LLR L3567 Meili, Srsieve, PrimeGrid, LLR L3577 Sriworarat, PSieve, Srsieve, PrimeGrid, LLR L3580 Nelson1, PSieve, Srsieve, PrimeGrid, LLR L3586 Wharton, PSieve, Srsieve, PrimeGrid, LLR L3587 Henseler, 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 L3612 Smits, PSieve, Srsieve, PrimeGrid, LLR L3625 Haymoz, PSieve, Srsieve, PrimeGrid, LLR L3630 Brebois, PSieve, Srsieve, PrimeGrid, LLR L3640 Stopper, PSieve, Srsieve, PrimeGrid, LLR L3641 Adams4, PSieve, Srsieve, PrimeGrid, LLR L3650 Smit, PSieve, Srsieve, PrimeGrid, LLR L3659 Volynsky, Srsieve, PrimeGrid, LLR L3662 Schawe, PSieve, Srsieve, PrimeGrid, LLR L3664 Kong1, PSieve, Srsieve, PrimeGrid, LLR L3665 Kelava1, PSieve, Srsieve, Rieselprime, LLR L3666 Bielecki, PSieve, Srsieve, PrimeGrid, LLR L3668 Prokopchuk, PSieve, Srsieve, PrimeGrid, LLR L3682 Schaible, PSieve, Srsieve, PrimeGrid, LLR L3686 Yost, Srsieve, PrimeGrid, LLR L3688 Hasznos, PSieve, Srsieve, PrimeGrid, LLR L3691 Williams5, PSieve, Srsieve, PrimeGrid, LLR L3696 Linderson, PSieve, Srsieve, PrimeGrid, LLR L3700 Kim4, PSieve, Srsieve, PrimeGrid, LLR L3709 Buss, PSieve, Srsieve, PrimeGrid, LLR L3719 Skinner, PSieve, Srsieve, PrimeGrid, LLR L3720 Ohno, Srsieve, PrimeGrid, LLR L3727 Ruch, PSieve, Srsieve, PrimeGrid, LLR L3728 Rietveld, PSieve, Srsieve, PrimeGrid, LLR L3731 Deram, PSieve, Srsieve, PrimeGrid, LLR L3733 Bryniarski, PSieve, Srsieve, PrimeGrid, LLR L3735 Kurtovic, Srsieve, LLR L3736 Lukosevisius, PSieve, Srsieve, PrimeGrid, LLR L3737 Cartiaux, PSieve, Srsieve, PrimeGrid, LLR L3738 Larsson1, PSieve, Srsieve, PrimeGrid, LLR L3739 Gournay, PSieve, Srsieve, PrimeGrid, 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 L3768 Natalenko, PSieve, Srsieve, PrimeGrid, LLR L3770 Tang, Srsieve, PrimeGrid, LLR L3772 Ottusch, Srsieve, PrimeGrid, LLR L3781 Kim3, PSieve, 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 L3835 Bauer2, PSieve, Srsieve, PrimeGrid, LLR L3838 Boyden, PSieve, Srsieve, PrimeGrid, LLR L3839 Batalov, EMsieve, LLR L3843 Whiteley, PSieve, Srsieve, PrimeGrid, LLR L3844 Sorbera, PSieve, Srsieve, NPLB, 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 L3870 Inouye, PSieve, Srsieve, NPLB, LLR L3873 Sala, PSieve, Srsieve, PrimeGrid, LLR L3876 Apreutesei, PSieve, Srsieve, PrimeGrid, LLR L3877 Jarne, PSieve, Srsieve, PrimeGrid, LLR L3886 Vogel, Srsieve, CRUS, 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 L3908 Servaz, PSieve, Srsieve, PrimeGrid, 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 L3926 Bruneton, PSieve, Srsieve, PrimeGrid, LLR L3933 Batalov, PSieve, Srsieve, CRUS, Rieselprime, LLR L3941 Lee8, PSieve, Srsieve, PrimeGrid, LLR L3942 Viaene, PSieve, Srsieve, PrimeGrid, LLR L3961 Darimont, Srsieve, PrimeGrid, LLR L3964 Iakovlev, Srsieve, PrimeGrid, LLR L3967 Inouye, PSieve, Srsieve, Rieselprime, LLR L3972 Clark, PSieve, Srsieve, PrimeGrid, LLR L3975 Hou, PSieve, Srsieve, PrimeGrid, LLR L3993 Gushchak, Srsieve, PrimeGrid, LLR L3994 Domanov1, PSieve, Srsieve, NPLB, 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 L4033 Yoshida2, 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 L4055 Mochizuki, PSieve, Srsieve, PrimeGrid, LLR L4061 Lee, PSieve, Srsieve, PrimeGrid, LLR L4064 Davies, Srsieve, CRUS, LLR L4066 Kozulis, PSieve, Srsieve, PrimeGrid, LLR L4076 Lacroix, PSieve, Srsieve, NPLB, LLR L4082 Zimmerman, PSieve, Srsieve, PrimeGrid, LLR L4083 Charrondiere, PSieve, Srsieve, PrimeGrid, LLR L4085 Chell, PSieve, Srsieve, PrimeGrid, LLR L4087 Kecic, PSieve, Srsieve, PrimeGrid, LLR L4088 Graeber, PSieve, Srsieve, PrimeGrid, LLR L4094 Garnett, TwinGen, PSearch, PRP, LLR L4099 Nietering, 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 L4144 Cox1, PSieve, Srsieve, PrimeGrid, 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 L4189 Lawrence, Powell, Srsieve, CRUS, LLR L4190 Fnasek, PSieve, Srsieve, PrimeGrid, LLR L4191 Mahan, PSieve, Srsieve, PrimeGrid, LLR L4193 Basile, 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 L4204 Winslow, GFNSvCUDA, GeneFer, AthGFNSieve, 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 L4212 Swann, PSieve, Srsieve, PrimeGrid, LLR L4214 Haller, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4226 Heath, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4231 Schneider1, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4240 Bussard, PSieve, Srsieve, PrimeGrid, LLR L4245 Greer, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4246 Hu, PSieve, Srsieve, PrimeGrid, LLR L4249 Larsson, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4250 Vogt, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4252 Nietering, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4256 Gniesmer, PSieve, Srsieve, PrimeGrid, LLR L4259 Heikkila, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4261 Webster, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4262 Hutchins, PSieve, Srsieve, PrimeGrid, LLR L4267 Batalov, GFNSvCUDA, GeneFer, AthGFNSieve, 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 L4281 Slakans, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4282 McNeill, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4283 Crawford1, PSieve, Srsieve, PrimeGrid, LLR L4285 Bravin, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4286 Zimmerman, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4287 Suzuki1, PSieve, Srsieve, PrimeGrid, LLR L4289 Ito2, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4290 Ito2, PSieve, Srsieve, PrimeGrid, LLR L4293 Trunov, PSieve, Srsieve, PrimeGrid, LLR L4294 Kurtovic, Srsieve, CRUS, Prime95, LLR L4295 Splain, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4299 Ertemalp, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4302 VanRangelrooij, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4303 Thorson, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4304 Lacis, PSieve, Srsieve, PrimeGrid, LLR L4305 Hill2, 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 L4310 Hayes, PSieve, Srsieve, PrimeGrid, LLR L4313 Lunner, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4314 DeThomas, PSieve, Srsieve, PrimeGrid, LLR L4315 Gielkens, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4316 Nilsson1, PSieve, Srsieve, PrimeGrid, LLR L4318 Marshall1, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4323 Seisums, PSieve, Srsieve, PrimeGrid, LLR L4324 Senftleben, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4326 Steel, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4328 Niederhaus, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4329 Okon, Srsieve, LLR L4330 Hu, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4334 Miller5, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4338 Kryger, PSieve, Srsieve, PrimeGrid, LLR L4340 Becker4, Srsieve, PrimeGrid, LLR L4341 Goetz, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4342 Kaiser1, PolySieve, NewPGen, LLR L4343 Norton, PSieve, Srsieve, PrimeGrid, LLR L4344 Pfob, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4345 Karlsson2, Srsieve, CRUS, LLR L4347 Schaeffer, PSieve, Srsieve, PrimeGrid, LLR L4348 Burridge, Srsieve, PrimeGrid, LLR L4349 Mortensen, PSieve, Srsieve, PrimeGrid, LLR L4352 Fahlenkamp1, PSieve, Srsieve, PrimeGrid, LLR L4355 Huetter, PSieve, Srsieve, PrimeGrid, LLR L4356 Meador, PSieve, Srsieve, PrimeGrid, LLR L4358 Tesarz, PSieve, Srsieve, PrimeGrid, LLR L4359 Andou, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4362 Mochizuki, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4363 Bousquet, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4364 Steinbach, PSieve, Srsieve, PrimeGrid, LLR L4365 Kloppe, PSieve, Srsieve, PrimeGrid, LLR L4366 Grabar, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4367 Bell1, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4370 Steer, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4371 Schmidt2, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4373 Janowiecki, PSieve, Srsieve, PrimeGrid, LLR L4374 Draycott, PSieve, Srsieve, PrimeGrid, LLR L4375 Hall, PSieve, Srsieve, PrimeGrid, LLR L4377 Skinner1, PSieve, Srsieve, PrimeGrid, LLR L4380 Rix, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4385 Liebmann, PSieve, Srsieve, PrimeGrid, LLR L4387 Davies, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4388 Mena, PSieve, Srsieve, PrimeGrid, LLR L4389 Fields, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4391 Schneider4, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4393 Veit1, Srsieve, CRUS, LLR L4395 Nilsson1, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4396 Goforth, PSieve, Srsieve, PrimeGrid, LLR L4398 Greer, Srsieve, PrimeGrid, LLR L4400 Norman, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4404 Stepnicka, PSieve, Srsieve, PrimeGrid, LLR L4405 Eckhard, Srsieve, LLR L4406 Mathers, PSieve, Srsieve, PrimeGrid, LLR L4407 Han, PSieve, Srsieve, PrimeGrid, LLR L4408 Fricke, PSieve, Srsieve, PrimeGrid, LLR L4409 Harvanek, PSieve, Srsieve, PrimeGrid, LLR L4410 Andresson, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4411 Leudesdorff, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4412 Simpson3, PSieve, Srsieve, PrimeGrid, LLR L4414 Falk, PSieve, Srsieve, PrimeGrid, LLR L4415 Jeong1, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4416 Kennedy, PSieve, Srsieve, PrimeGrid, LLR L4417 Rasp, PSieve, Srsieve, PrimeGrid, LLR L4418 Hanson1, PSieve, Srsieve, PrimeGrid, LLR L4424 Miyauchi, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4425 Weber1, PSieve, Srsieve, PrimeGrid, LLR L4428 Gauthier, PSieve, Srsieve, PrimeGrid, LLR L4429 Lacroix, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4432 Peterson1, PSieve, Srsieve, PrimeGrid, LLR L4435 Larsson, Srsieve, PrimeGrid, LLR L4440 Tervooren, PSieve, Srsieve, PrimeGrid, LLR L4441 Miyauchi, PSieve, Srsieve, PrimeGrid, LLR L4444 Terber, Srsieve, CRUS, LLR L4445 Leudesdorff, PSieve, Srsieve, PrimeGrid, LLR L4446 Soupault, PSieve, Srsieve, PrimeGrid, LLR L4448 Bulanov, PSieve, Srsieve, PrimeGrid, LLR L4451 Keller2, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4452 Ohkura, PSieve, Srsieve, PrimeGrid, LLR L4453 Laqua2, Srsieve, CRUS, 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 L4461 Lorenz1, PSieve, Srsieve, PrimeGrid, LLR L4466 Falk, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4467 Weber1, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4472 Harvanek, Gcwsieve, MultiSieve, PrimeGrid, LLR L4476 Shane, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4477 Tennant, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4478 Cox1, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4479 Marquard, PSieve, Srsieve, PrimeGrid, LLR L4482 Mena, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4488 Vrontakis, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4489 Szreter, PSieve, Srsieve, PrimeGrid, LLR L4490 Mazumdar, PSieve, Srsieve, PrimeGrid, LLR L4495 Ostaszewski, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4499 Ohsugi, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4500 Pagola, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4501 Eskam1, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4502 Buzak, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4504 Sesok, NewPGen, LLR L4505 Lind, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4506 Propper, Batalov, CycloSv, EMsieve, PIES, Prime95, LLR L4507 Stavel, PSieve, Srsieve, PrimeGrid, LLR L4508 Doerscheln, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4510 Ming, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4511 Donovan1, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4513 Ward2, PSieve, Srsieve, PrimeGrid, LLR L4518 Primecrunch.com, Hedges, Srsieve, LLR L4519 Zinser, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4521 Curtis, Srsieve, CRUS, LLR L4522 Lorsung, PSieve, Srsieve, PrimeGrid, LLR L4523 Mull, PSieve, Srsieve, PrimeGrid, LLR L4525 Kong1, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4526 Schoefer, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4527 Fruzynski, PSieve, Srsieve, PrimeGrid, LLR L4530 Reynolds1, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4531 Butez, PSieve, Srsieve, PrimeGrid, LLR L4533 Stripes, PSieve, Srsieve, PrimeGrid, LLR L4534 Witte, PSieve, Srsieve, PrimeGrid, LLR L4536 Riedl1, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4537 Mayer1, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4538 Janoska, PSieve, Srsieve, PrimeGrid, LLR L4540 Trigueiro, PSieve, Srsieve, PrimeGrid, LLR L4542 Gingrich, PSieve, Srsieve, PrimeGrid, LLR L4544 Krauss, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4545 Maloney, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4547 Nair, TwinGen, NewPGen, LLR L4548 Sydekum, Srsieve, CRUS, Prime95, LLR L4549 Schick, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4550 Terry, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4552 Koski, PSieve, Srsieve, PrimeGrid, LLR L4553 Racanelli, PSieve, Srsieve, PrimeGrid, LLR L4556 Att, PSieve, Srsieve, PrimeGrid, LLR L4557 Carnevali, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4559 Okazaki, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4561 Propper, Batalov, CycloSv, Cyclo, EMsieve, PIES, LLR L4562 Donovan, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4563 Witte, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4564 DeThomas, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4566 Pagola, PSieve, Srsieve, PrimeGrid, LLR L4567 Chida, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4568 Vrontakis, PSieve, Srsieve, PrimeGrid, LLR L4570 Thomas3, PSieve, Srsieve, PrimeGrid, LLR L4573 Mayer1, PSieve, Srsieve, PrimeGrid, LLR L4575 Gingrich2, Srsieve, CRUS, LLR L4577 Broughton, PSieve, Srsieve, PrimeGrid, LLR L4581 Stein1, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4582 Kinney, PSieve, Srsieve, PrimeGrid, LLR L4583 Rohmann, PSieve, Srsieve, PrimeGrid, LLR L4584 Goforth, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4585 Schawe, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4586 Beaumont, Srsieve, CRUS, LLR L4587 Korhonen, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4589 Melvold, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4591 Schwieger, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4592 Anand, Srsieve, CRUS, LLR L4593 Mangio, PSieve, Srsieve, PrimeGrid, LLR L4594 Conti, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4595 Mangio, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4596 Doussy, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4598 Connaughty, PSieve, Srsieve, PrimeGrid, LLR L4599 Loureiro, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4600 Simbarsky, PSieve, Srsieve, PrimeGrid, LLR L4602 Papini, PSieve, Srsieve, PrimeGrid, LLR L4609 Elgetz, PSieve, Srsieve, PrimeGrid, LLR L4613 Machat, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4616 Sellsted, PSieve, Srsieve, PrimeGrid, LLR L4618 Vieira, PSieve, Srsieve, PrimeGrid, LLR L4619 Harvanek, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4620 Kinney, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4621 McKibbon, PSieve, Srsieve, PrimeGrid, LLR L4622 Jurach, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4623 Dugger, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4625 Chen2, PSieve, Srsieve, PrimeGrid, LLR L4626 Iltus, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4627 Lambson, PSieve, Srsieve, PrimeGrid, LLR L4629 Chen2, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4645 McKibbon, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4646 Kumsta, PSieve, Srsieve, PrimeGrid, LLR L4649 Humphries, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4654 Voskoboynikov, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4655 Hartel, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4656 Beck, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4658 Maguin, 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 L4666 Slade, PSieve, Srsieve, PrimeGrid, LLR L4667 Morelli, LLR L4668 Okazaki, Gcwsieve, MultiSieve, PrimeGrid, LLR L4669 Schwegler, Srsieve, PrimeGrid, LLR L4670 Drumm, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4671 Voskoboynikov, PSieve, Srsieve, PrimeGrid, LLR L4672 Slade, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4673 Okhrimouk, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4674 Adamec, PSieve, Srsieve, PrimeGrid, LLR L4675 Lind, Srsieve, PrimeGrid, LLR L4676 Maloney, Srsieve, PrimeGrid, PrimeSierpinski, LLR L4677 Provencher, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4678 Huber, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4679 Windischmann, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4680 Ertemalp, PSieve, Srsieve, PrimeGrid, LLR L4681 Raynor, PSieve, Srsieve, PrimeGrid, LLR L4682 Taki, PSieve, Srsieve, PrimeGrid, LLR L4683 Bird2, Srsieve, CRUS, LLR L4684 Sveen, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4686 Whiteley1, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4687 Campbell1, PSieve, Srsieve, PrimeGrid, LLR L4688 Treitschke, GFNSvCUDA, GeneFer, AthGFNSieve, 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 L4693 Lee3, 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 L4697 Sellsted, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4698 Eichler, PSieve, Srsieve, PrimeGrid, LLR L4699 Parsonnet, 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 L4705 Jessen, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4706 Kraemer, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4707 Radomski, PSieve, Srsieve, PrimeGrid, LLR L4708 Humphries, PSieve, Srsieve, PrimeGrid, LLR L4709 Wigginton, 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 L4714 James1, Srsieve, CRUS, LLR L4715 Skinner1, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4716 Borowski, PSieve, Srsieve, PrimeGrid, LLR L4717 Wypych, PSieve, Srsieve, PrimeGrid, LLR L4718 Brown1, Gcwsieve, MultiSieve, PrimeGrid, LLR L4719 Miller6, PSieve, Srsieve, PrimeGrid, LLR L4720 Gahan, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4721 Flora, PSieve, Srsieve, PrimeGrid, LLR L4722 Cowles, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4723 Lexut, PSieve, Srsieve, PrimeGrid, LLR L4724 Thonon, PSieve, Srsieve, PrimeGrid, LLR L4725 Barton, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4726 Miller7, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4727 Damstra, PSieve, Srsieve, PrimeGrid, LLR L4728 Read, PSieve, Srsieve, PrimeGrid, LLR L4729 Wimmer1, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4730 Bowe, PSieve, Srsieve, PrimeGrid, LLR L4731 Goodman, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4732 Miller7, PSieve, Srsieve, PrimeGrid, LLR L4733 Brazier, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4734 Howe, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4735 Johnson9, PSieve, Srsieve, PrimeGrid, LLR L4736 Prestemon, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4737 Reinhardt, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4738 Gelhar, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4739 Howe, PSieve, Srsieve, PrimeGrid, LLR L4740 Silva1, PSieve, Srsieve, PrimeGrid, LLR L4741 Wong, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4742 Schlereth, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4743 Plsak, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4744 Goodman, PSieve, Srsieve, PrimeGrid, LLR L4745 Cavnaugh, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4746 Brech, PSieve, Srsieve, PrimeGrid, LLR L4747 Brech, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4748 Lignelli, PSieve, Srsieve, PrimeGrid, LLR L4749 VandeHoef, PSieve, Srsieve, PrimeGrid, LLR L4750 Feng, PSieve, Srsieve, PrimeGrid, LLR L4751 Holmes, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4752 Harvey2, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4753 Riemann, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4754 Calvin, PSieve, Srsieve, PrimeGrid, LLR L4755 Glatte, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4756 Dumange, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4757 Johnson9, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4758 Walling, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4759 Sites, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4760 Sipes, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4761 Romaidis, PSieve, Srsieve, PrimeGrid, LLR L4762 Goetz, PSieve, Srsieve, PrimeGrid, LLR L4763 Guilleminot, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4764 McLean2, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4765 Kumsta, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4766 Brandt, PSieve, Srsieve, PrimeGrid, LLR L4767 Jones4, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4768 Carnevali, PSieve, Srsieve, PrimeGrid, LLR L4769 Dugger, PSieve, Srsieve, PrimeGrid, LLR L4770 Sipes, PSieve, Srsieve, PrimeGrid, LLR L4771 Garza, PSieve, Srsieve, PrimeGrid, LLR L4772 Bird1, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4773 Tohmola, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4774 Boehm, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4775 Steinbach, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4776 Lee7, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4777 Kampmeier, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4778 Somer, PSieve, Srsieve, PrimeGrid, LLR L4779 Harvey, Gcwsieve, MultiSieve, LLR L4780 Harvey, Gcwsieve, MultiSieve, GenWoodall, LLR L4781 Burner, PSieve, Srsieve, PrimeGrid, LLR L4782 Nowosielski, PSieve, Srsieve, PrimeGrid, LLR L4783 Marini, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4784 Bertolotti, Gcwsieve, MultiSieve, PrimeGrid, LLR L4785 Pastula, PSieve, Srsieve, PrimeGrid, LLR L4786 Sydekum, Srsieve, CRUS, LLR L4787 Sunderland, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4788 Griffin1, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4789 Kurtovic, Srsieve, Prime95, LLR L4790 Brandt1, PSieve, Srsieve, PrimeGrid, LLR L4791 Vaisanen, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4792 Hedley, PSieve, Srsieve, PrimeGrid, LLR L4793 Koski, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4794 Clark6, LLR L4795 Lawson2, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4796 White2, PSieve, Srsieve, PrimeGrid, LLR L4797 Sun1, PSieve, Srsieve, PrimeGrid, LLR L4798 Tiller, PSieve, Srsieve, PrimeGrid, LLR L4799 Vanderveen1, LLR L4800 Doenges, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4801 Tohmola, PSieve, Srsieve, PrimeGrid, LLR L4802 Jones5, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4803 Goulis, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4804 Orpen, PSieve, Srsieve, PrimeGrid, LLR L4805 Lowder, PSieve, Srsieve, 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 L4811 Zaugg, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4812 Nezumi, LLR L4813 Ketelsen, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4814 Telesz, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4815 Kozisek, PSieve, Srsieve, PrimeGrid, LLR L4816 Doenges, PSieve, Srsieve, PrimeGrid, LLR L4817 Furr, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4818 Zenker, PSieve, Srsieve, PrimeGrid, LLR L4819 Inci, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4820 Clinton, 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 L4825 Ashden, PSieve, Srsieve, PrimeGrid, LLR L4826 Soraku, PSieve, Srsieve, PrimeGrid, LLR L4827 Silvestre, PSieve, Srsieve, PrimeGrid, LLR L4828 Gahan, LLR L4829 Eisler, PSieve, Srsieve, PrimeGrid, LLR L4830 Eisler1, PSieve, Srsieve, PrimeGrid, LLR L4831 Ash, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4832 Meekins, Srsieve, CRUS, LLR L4833 Kowal, PSieve, Srsieve, PrimeGrid, LLR L4834 Helm, PSieve, Srsieve, PrimeGrid, LLR L4835 Katzur, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4836 Benson, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4837 Hines, Srsieve, CRUS, LLR L4838 Andersson, PSieve, Srsieve, PrimeGrid, LLR L4839 Harris, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4840 Ylijoki, PSieve, Srsieve, PrimeGrid, LLR L4841 Baur, PSieve, Srsieve, PrimeGrid, LLR L4842 Smith11, PSieve, Srsieve, PrimeGrid, LLR L4843 Hutchins, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4844 Valentino, PSieve, Srsieve, PrimeGrid, LLR L4845 Pomerantz, PSieve, Srsieve, PrimeGrid, LLR L4846 Dravers, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4847 Brezovnik, PSieve, Srsieve, PrimeGrid, LLR L4848 Adamec, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4849 Burt, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4850 Jones5, PSieve, Srsieve, PrimeGrid, LLR L4851 Schioler, PSieve, Srsieve, PrimeGrid, LLR L4852 Kaiser2, PSieve, Srsieve, PrimeGrid, LLR L4853 Jackson1, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4854 Gory, PSieve, Srsieve, PrimeGrid, LLR L4855 Thorson, PSieve, Srsieve, PrimeGrid, LLR L4856 Kucherov, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4857 Ylijoki, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4858 Koriabine, PSieve, Srsieve, PrimeGrid, LLR L4859 Wang4, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4860 Joseph, PSieve, Srsieve, PrimeGrid, LLR L4861 Thonon, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4862 McNary, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4863 Belolipetskiy, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4864 Freihube, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4865 Schmeisser, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4866 Parker3, PSieve, Srsieve, PrimeGrid, LLR L4867 Schmeer, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4868 Bergmann, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4869 Ogata, PSieve, Srsieve, PrimeGrid, LLR L4870 Wharton, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4871 Gory, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4872 Raynor, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4873 Liu5, PSieve, Srsieve, PrimeGrid, LLR L4874 Jackson2, PSieve, Srsieve, PrimeGrid, LLR L4875 Parsonnet, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4876 Tennant, Srsieve, CRUS, LLR L4877 Cherenkov, Srsieve, CRUS, LLR L4878 McKernan, PSieve, Srsieve, PrimeGrid, LLR L4879 Propper, Batalov, Srsieve, LLR L4880 Goossens, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4881 Bonath, Srsieve, LLR L4882 Liu6, PSieve, Srsieve, PrimeGrid, LLR L4883 Hewitt1, PSieve, Srsieve, PrimeGrid, LLR L4884 Somer, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4885 Piaive, PSieve, Srsieve, PrimeGrid, LLR L4886 Peele, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4887 Hernas, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4888 Gutierrez, PSieve, Srsieve, PrimeGrid, LLR L4889 Hundhausen, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4890 Frase1, PSieve, Srsieve, PrimeGrid, LLR L4891 Jaros, PSieve, Srsieve, PrimeGrid, LLR L4892 Hewitt1, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4893 Little, PSieve, Srsieve, PrimeGrid, LLR L4894 Bredl, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4895 Ayiomamitis, PSieve, Srsieve, PrimeGrid, LLR L4896 Heyward, PSieve, Srsieve, PrimeGrid, LLR L4897 Tauberger, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4898 Kozisek, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4899 Schioler, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4900 Dumange, PSieve, Srsieve, PrimeGrid, LLR L4901 Skahill, PSieve, Srsieve, PrimeGrid, LLR L4902 Pedersen_K, PSieve, Srsieve, PrimeGrid, LLR L4903 Laurent1, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4904 Dunchouk, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4905 Niegocki, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4906 Furr, PSieve, Srsieve, PrimeGrid, LLR L4907 Reinhardt, PSieve, Srsieve, PrimeGrid, LLR L4908 Block, PSieve, Srsieve, PrimeGrid, LLR L4909 Hall, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4910 Petry, PSieve, Srsieve, PrimeGrid, LLR L4911 Calveley, Srsieve, CRUS, LLR L4912 Brecht, PSieve, Srsieve, PrimeGrid, LLR L4913 Drager, PSieve, Srsieve, PrimeGrid, LLR L4914 Bishop_D, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4915 Laurent1, PSieve, Srsieve, PrimeGrid, LLR L4916 Nguyen, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4917 Corlatti, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4918 Weiss1, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4919 Rigamonti, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4920 Walsh, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4921 Kapicioglu, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4922 Bulba, Sesok, LLR L4923 Koriabine, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4924 Snell, PSieve, Srsieve, PrimeGrid, LLR L4925 Korolev, Srsieve, CRUS, LLR L4926 Shenton, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, LLR L4927 Smith12, Srsieve, CRUS, LLR L4928 Doornink, GFNSvCUDA, GeneFer, AthGFNSieve, PrimeGrid, 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 p160 Ayuchan, AthGFNSieve, 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 p190 DiMaria, NewPGen, OpenPFGW p193 Irvine, Broadhurst, Primo, OpenPFGW p199 Broadhurst, NewPGen, OpenPFGW p221 AndersonLee, 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 p261 Gunn, Srsieve, CRUS, OpenPFGW p262 Vogel, Gcwsieve, MultiSieve, PrimeGrid, OpenPFGW p267 Domanov1, Srsieve, CRUS, Prime95, OpenPFGW p268 Rodenkirch, Srsieve, CRUS, OpenPFGW p269 Zhou, OpenPFGW p271 Dettweiler, Srsieve, CRUS, OpenPFGW p279 Domanov1, Srsieve, Rieselprime, Prime95, OpenPFGW p280 Vogel, Srsieve, SierpinskiRiesel, OpenPFGW p281 Domanov1, Srsieve, NPLB, Prime95, OpenPFGW p282 Rajala, NewPGen, OpenPFGW p286 Batalov, Srsieve, OpenPFGW p289 Steine, Srsieve, CRUS, 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 p316 Yama, GeneFer, AthGFNSieve, PrimeGrid, OpenPFGW p319 Goudie, GeneFer, AthGFNSieve, PrimeGrid, OpenPFGW p321 Dinkel, Srsieve, PrimeGrid, SierpinskiRiesel, OpenPFGW p323 Myllyvirta, Srsieve, PrimeGrid, SierpinskiRiesel, OpenPFGW p324 Bliedung, Srsieve, PrimeGrid, SierpinskiRiesel, OpenPFGW p325 Broadhurst, Gcwsieve, MultiSieve, OpenPFGW p328 Gruenewald, Srsieve, CRUS, OpenPFGW p329 Cholt, GeneFer, AthGFNSieve, PrimeGrid, OpenPFGW p331 Bliedung, GeneFer, AthGFNSieve, PrimeGrid, OpenPFGW p332 Johnson6, GeneferCUDA, AthGFNSieve, PrimeGrid, OpenPFGW p333 Willig, Srsieve, PrimeGrid, SierpinskiRiesel, OpenPFGW p334 Goetz, GeneferCUDA, AthGFNSieve, PrimeGrid, OpenPFGW p335 Tervooren, OpenPFGW p338 Tomecko, GeneferCUDA, AthGFNSieve, PrimeGrid, OpenPFGW p339 Zhou, LLR, OpenPFGW p341 Schmidt2, Srsieve, PrimeGrid, SierpinskiRiesel, OpenPFGW p342 Trice, OpenPFGW p343 Brown1, GeneFer, AthGFNSieve, PrimeGrid, OpenPFGW p344 Tajima, Srsieve, OpenPFGW p346 Burt, Fpsieve, PrimeGrid, OpenPFGW p350 Koen, Gcwsieve, GenWoodall, OpenPFGW p351 Lewis1, Srsieve, PrimeGrid, SierpinskiRiesel, OpenPFGW p352 Hubbard, Srsieve, PrimeGrid, SierpinskiRiesel, OpenPFGW p353 Yost, Srsieve, PrimeGrid, SierpinskiRiesel, 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 p365 Poplin, Srsieve, CRUS, OpenPFGW p366 Demeyer, Siemelink, Srsieve, CRUS, OpenPFGW p371 Keiser, OpenPFGW p373 Morelli, OpenPFGW p375 Gevay, Vatai, Farkas, Jarai, OpenPFGW p376 Moore, Srsieve, CRUS, OpenPFGW p377 Batalov, Ksieve, TOPS, LLR, OpenPFGW p378 Batalov, Srsieve, CRUS, LLR, OpenPFGW p379 Batalov, CycloSv, Cyclo, EMsieve, PIES, OpenPFGW p381 Batalov, Fpsieve, OpenPFGW p382 Oestlin, NewPGen, OpenPFGW p383 Maloy, OpenPFGW p384 Booker, OpenPFGW p385 Rajala, Srsieve, CRUS, OpenPFGW p386 Hughes2, GeneFer, AthGFNSieve, PrimeGrid, OpenPFGW p387 Zimmerman, GeneFer, AthGFNSieve, PrimeGrid, OpenPFGW p388 Schwieger, GeneFer, AthGFNSieve, PrimeGrid, OpenPFGW p389 Okazaki, GeneFer, AthGFNSieve, PrimeGrid, OpenPFGW p390 Jaworski, Srsieve, Rieselprime, Prime95, OpenPFGW p391 Keiser, NewPGen, OpenPFGW p392 Batalov, Cksieve, OpenPFGW p394 Fukui, MultiSieve, OpenPFGW p395 Angel, Augustin, NewPGen, OpenPFGW p396 Ikisugi, OpenPFGW p397 Rodenkirch, Fpsieve, OpenPFGW p398 Stocker, OpenPFGW p400 Batalov, PSieve, Srsieve, 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 x46 Otremba, Fpsieve, OpenPFGW, Unknown Y Young