THE LARGEST KNOWN PRIMES (Primes with 150,000 or more digits) (selected smaller primes which have comments are included) Originally Compiled by Samuel Yates -- Continued by Chris Caldwell (Fri May 16 23:50:52 CDT 2008) 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 ----- -------------------------------- ------ ---- ---- -------------- 1 2^32582657-1 9808358 G9 2006 Mersenne 44?? 2 2^30402457-1 9152052 G9 2005 Mersenne 43?? 3 2^25964951-1 7816230 G8 2005 Mersenne 42?? 4 2^24036583-1 7235733 G7 2004 Mersenne 41?? 5 2^20996011-1 6320430 G6 2003 Mersenne 40?? 6 2^13466917-1 4053946 G5 2001 Mersenne 39 7 19249*2^13018586+1 3918990 SB10 2007 8 27653*2^9167433+1 2759677 SB8 2005 9 28433*2^7830457+1 2357207 SB7 2004 10 33661*2^7031232+1 2116617 SB11 2007 11 2^6972593-1 2098960 G4 1999 Mersenne 38 12 5359*2^5054502+1 1521561 SB6 2003 13b 265711*2^4858008+1 1462412 g414 2008 14b 3*2^4235414-1 1274988 L606 2008 15c 24518^262144+1 1150678 g413 2008 Generalized Fermat 16f 938237*2^3752950-1 1129757 L521 2007 Woodall 17e 3139*2^3321905-1 999997 L185 2008 18 4847*2^3321063+1 999744 SB9 2005 19a 113983*2^3201175-1 963655 L613 2008 20 3*2^3136255-1 944108 L256 2007 21 2^3021377-1 909526 G3 1998 Mersenne 37 22e 7*2^3015762+1 907836 g279 2008 23 2^2976221-1 895932 G2 1997 Mersenne 36 24 222361*2^2854840+1 859398 g403 2006 25 1372930^131072+1 804474 g236 2003 Generalized Fermat 26 1361244^131072+1 803988 g236 2004 Generalized Fermat 27 1176694^131072+1 795695 g236 2003 Generalized Fermat 28 342673*2^2639439-1 794556 L53 2007 29 572186^131072+1 754652 g0 2004 Generalized Fermat 30 3*2^2478785+1 746190 g245 2003 Divides Fermat F(2478782), GF(2478782,3), GF(2478776,6), GF(2478782,12) 31 26773*2^2465343-1 742147 L197 2006 32 737*2^2382804-1 717299 L191 2007 33 1183953*2^2367907-1 712818 L447 2007 Woodall 34 275293*2^2335007-1 702913 L193 2006 35 3*2^2312734-1 696203 L158 2005 36 450457*2^2307905-1 694755 L172 2006 37 130816^131072+1 670651 g308 2003 Generalized Fermat 38 19*2^2206266+1 664154 p189 2006 39 114487*2^2198389-1 661787 L179 2006 40 196597*2^2178109-1 655682 L175 2006 41 7*2^2167800+1 652574 g279 2007 Divides Fermat F(2167797), GF(2167799,5), GF(2167799,10) 42 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) 43b 23*2^2141626-1 644696 L545 2008 44 7*2^2139912+1 644179 g279 2007 Divides GF(2139911,12) 45 62722^131072+1 628808 g308 2003 Generalized Fermat 46 121*2^2033941-1 612280 L162 2006 47 251749*2^2013995-1 606279 L436 2007 Woodall 48 467917*2^1993429-1 600088 L160 2005 49 137137*2^1993201-1 600019 L321 2007 50 17*2^1990299+1 599141 g267 2006 Divides GF(1990298,3) 51 121*2^1954243-1 588288 L162 2006 52 214519*2^1929114+1 580727 g346 2006 53 345067*2^1876573-1 564911 g59 2005 54 13*2^1861732+1 560439 g267 2005 Divides GF(1861731,6) 55 137*2^1849238-1 556679 L321 2007 56 3*2^1832496+1 551637 p189 2007 Divides GF(1832490,3), GF(1832494,5) 57 21*2^1830919+1 551163 g279 2004 58 417643*2^1800787-1 542097 L134 2005 59 357659*2^1779748-1 535764 L47 2005 60 5*2^1777515+1 535087 p148 2005 Divides GF(1777511,5), GF(1777514,6) 61b 5077*2^1753317-1 527805 L251 2008 62 253*2^1722623-1 518564 L145 2007 63 121*2^1695499-1 510399 L62 2005 64 15*2^1667744+1 502043 g279 2007 65 149183*2^1666957+1 501810 g346 2005 66 469949*2^1649228-1 496473 L160 2007 67 81*2^1606848+1 483712 gt 2007 Generalized Fermat 68 15*2^1597510+1 480900 g279 2006 69 58753*2^1594323-1 479944 p190 2006 70 737*2^1592724-1 479461 L191 2006 71 110413*2^1591999-1 479245 L111 2005 72 1179*2^1591362+1 479051 g387 2006 73 121*2^1589157-1 478387 L65 2005 74 19502212^65536+1 477763 p160 2005 Generalized Fermat 75 17684828^65536+1 474979 g410 2007 Generalized Fermat 76 17655444^65536+1 474932 g410 2007 Generalized Fermat 77 17629398^65536+1 474890 g410 2007 Generalized Fermat 78d 29*2^1574753+1 474050 L391 2008 79 139*2^1567874+1 471980 p189 2006 80 81*2^1544545+1 464957 gt 2007 81 234847*2^1535589-1 462264 L73 2005 82 121*2^1526097-1 459404 L65 2005 83 13*2^1499876+1 451509 g267 2004 Divides GF(1499875,3) 84 7*2^1491852+1 449094 p166 2005 Divides GF(1491851,6) 85 2232007*2^1490605-1 448724 L4 2003 86b 9*2^1481821-1 446074 L503 2008 87 29*2^1478344-1 445028 L10 2005 88 27*2^1476347+1 444427 g279 2005 89 325627*2^1472117-1 443157 L111 2005 90 1467763*2^1467763-1 441847 L381 2007 Woodall 91 77*2^1467554-1 441780 L145 2006 92b 21*2^1452771-1 437329 L503 2008 93d 23*2^1448461+1 436032 L170 2008 94b 19*2^1434165-1 431728 L503 2008 95 21*2^1421741+1 427989 g279 2005 96 15*2^1418605+1 427044 g279 2006 Divides GF(1418600,5), GF(1418601,6) 97 29*2^1416873+1 426523 g305 2007 98 149797*2^1414137-1 425703 L105 2005 99d 127*2^1398889-1 421110 L486 2008 100d 1564347*2^1398269-1 420928 L466 2008 101 2^1398269-1 420921 G1 1996 Mersenne 35 102 192089*2^1395688-1 420150 L49 2004 103 17*2^1388355+1 417938 g267 2005 Divides GF(1388354,10) 104 15*2^1368428+1 411940 g279 2006 105 241489*2^1365062+1 410930 L101 2005 106 1828502^65536+1 410393 GF2 2005 Generalized Fermat 107 35*2^1357881+1 408765 g279 2006 108 338707*2^1354830+1 407850 L124 2005 Cullen 109 1540550^65536+1 405516 GF2 2003 Generalized Fermat 110 15*2^1344313-1 404680 L139 2007 111 1483076^65536+1 404434 GF2 2003 Generalized Fermat 112 11*2^1343347+1 404389 p169 2005 Divides GF(1343346,6) 113 1478036^65536+1 404337 GF2 2002 Generalized Fermat 114 54767*2^1337287+1 402569 SB5 2002 115 1374038^65536+1 402260 GF3 2003 Generalized Fermat 116 1361846^65536+1 402007 GF3 2002 Generalized Fermat 117 1266062^65536+1 399931 g295 2002 Generalized Fermat 118 5*2^1320487+1 397507 g55 2002 Divides GF(1320486,12) 119 1057476^65536+1 394807 g197 2002 Generalized Fermat 120 1024390^65536+1 393902 g299 2003 Generalized Fermat 121 25*2^1298186+1 390795 g279 2005 Generalized Fermat 122b 99*2^1292395-1 389052 L282 2008 123 857678^65536+1 388847 GF0 2002 Generalized Fermat 124 843832^65536+1 388384 GF0 2001 Generalized Fermat 125 138847*2^1283793-1 386466 L2 2003 126 5*2^1282755+1 386149 g55 2002 Divides GF(1282754,3), GF(1282748,5) 127 15*2^1276177+1 384169 g279 2006 Divides GF(1276174,3), GF(1276174,10) 128 1268979*2^1268979-1 382007 L201 2007 Woodall 129 671600^65536+1 381886 g55 2002 Generalized Fermat 130 11*2^1261478-1 379744 L163 2006 131 25*2^1258562+1 378867 g279 2004 Generalized Fermat 132e 2084259*2^1257787-1 378638 L466 2008 133f 26869*2^1257787-1 378637 L466 2007 134 2^1257787-1 378632 SG 1996 Mersenne 34 135b 49*2^1257295-1 378486 L217 2008 136 81*2^1254155+1 377541 gt 2007 137 80857169*2^1251076-1 376620 L10 2004 138 549868^65536+1 376194 g295 2003 Generalized Fermat 139 544118^65536+1 375895 g295 2002 Generalized Fermat 140 15*2^1244377+1 374596 g279 2006 141 257708*5^535176-1 374078 p196 2007 142 21*2^1240067+1 373299 g279 2004 143 43*2^1235298+1 371864 g279 2006 144 3*2^1232255-1 370947 L30 2004 145 15*2^1229600+1 370148 g279 2006 146 440846^65536+1 369904 GC1 2002 Generalized Fermat 147d 177482*117^177482+1 367072 g407 2008 Generalized Cullen 148 25*2^1211488+1 364696 g279 2005 Generalized Fermat, divides GF(1211487,12) 149 357868^65536+1 363969 g266 2003 Generalized Fermat 150 2^1203793-2^601897+1 362378 L192 2006 Gaussian Mersenne norm 37? 151 3*2^1201046-1 361552 L77 2004 152 502541*2^1199930-1 361221 L93 2004 153 1195203*2^1195203-1 359799 L124 2005 Woodall 154e 5*2^1194164-1 359480 L478 2008 155 292550^65536+1 358233 GC2 2002 Generalized Fermat 156 291726^65536+1 358153 GC2 2002 Generalized Fermat 157 71009*2^1185112-1 356760 L47 2004 158 255694^65536+1 354401 g266 2002 Generalized Fermat 159 617*2^1175468-1 353854 L426 2007 160c 21*2^1170083-1 352232 L503 2008 161 27*2^1164664+1 350601 g279 2005 162c 27*2^1163629-1 350289 L503 2008 163c 55*2^1162155-1 349846 L545 2008 164 69109*2^1157446+1 348431 SB4 2002 165 152713*2^1154707-1 347607 g23 2004 166 29*2^1152765+1 347019 g300 2005 Divides GF(1152760,10) 167 189590^65536+1 345887 g262 2002 Generalized Fermat 168 350107*2^1144101-1 344415 L35 2004 169b 31*2^1142093-1 343806 L503 2008 170 209826493*2^1140855-1 343440 L10 2004 171 500621*2^1138518-1 342734 L73 2004 172 504613*2^1136459-1 342114 L84 2004 173 33*2^1130884+1 340432 L165 2006 Divides GF(1130881,12) 174 64*3^712171+1 339794 x28 2006 175 177*2^1121720+1 337674 L129 2006 176 141146^65536+1 337489 g281 2002 Generalized Fermat 177f 165*2^1117217+1 336319 g196 2007 178c 33*2^1115902-1 335922 L488 2008 179c 27*2^1108214-1 333608 L590 2008 180 99*2^1106989-1 333239 L486 2007 181 11*2^1104606-1 332521 L10 2005 182 165*2^1100755+1 331363 g196 2007 183 289*2^1098117-1 330569 L6 2006 184a 19433*2^1096861+1 330193 g411 2008 185 108368^65536+1 329968 g181 2001 Generalized Fermat 186 43*2^1087992+1 327520 g279 2006 187 412717*2^1084409-1 326446 L76 2004 188 15*2^1084010-1 326321 L139 2006 189 150847*2^1076441-1 324047 L73 2004 190c 55*2^1075711-1 323824 L545 2008 191 85*2^1072368+1 322817 g267 2006 192 209826493*2^1071303-1 322503 L10 2004 193 2203*2^1069647-1 322000 L123 2006 194 864316301*2^1055106-1 317628 L426 2007 195 9*2^1051026+1 316392 p156 2004 Generalized Fermat 196 11*2^1044086-1 314303 L10 2005 197 151515*2^1043018-1 313985 L426 2007 198 35*2^1040005+1 313075 g279 2006 199 121*2^1039965-1 313063 L65 2004 200a 958*11^300544+1 312988 p217 2008 201 13*2^1038896+1 312740 g267 2004 202 85*2^1034069-1 311288 L323 2007 203 31838235*2^1025596+1 308743 p190 2006 204 21*2^1022168+1 307705 g279 2004 205 48594^65536+1 307140 g141 2000 Generalized Fermat 206 65567*2^1013803+1 305190 SB2 2002 207 6119*2^1011416-1 304471 L251 2007 208 9*2^1010277-1 304125 L80 2007 209 165*2^1010133+1 304083 g196 2007 210 603*2^1002662+1 301835 p219 2007 211 945*2^1001719+1 301551 p219 2007 212 103*2^1001214+1 301398 p219 2007 213 869*2^1000725+1 301252 p114 2005 214 1611111*2^1000000+1 301037 p197 2007 215 1089927*2^1000000+1 301037 p197 2006 216 32883*2^1000004+1 301036 p86 2002 217 21*2^999599-1 300911 L56 2005 218 81*2^998065+1 300450 gt 2007 219 1515*2^996848-1 300085 L200 2007 220 351351*2^996709-1 300045 L80 2006 221 44131*2^995972+1 299823 SB3 2002 222e 75*2^995721-1 299744 L257 2008 223 3*2^992700-1 298833 L59 2004 224 2^991961-2^495981+1 298611 x28 2005 Gaussian Mersenne norm 36 225 121*2^990219-1 298088 L66 2004 226 21*2^986130-1 296857 L56 2005 227 137137*2^978229-1 294482 L321 2007 228 69*2^978209-1 294473 L260 2007 229 23*2^977541+1 294271 g267 2004 230 99*2^976049+1 293823 p76 2005 231 27*2^974752+1 293432 L57 2005 232d 61*2^971585-1 292479 L80 2008 233c 79*2^969795-1 291940 L80 2008 234c 95*2^968636-1 291591 L80 2008 235 25*2^966414+1 290922 g279 2004 Generalized Fermat 236a 255*2^962590-1 289771 g320 2008 237 11*2^960901+1 289262 g277 2005 Divides Fermat F(960897) 238f 111*2^959671-1 288892 L282 2007 239 231*2^959375-1 288804 L138 2006 240a 135*2^959059-1 288708 L616 2008 241 1515*2^955219-1 287553 L200 2007 242 247*2^952069-1 286604 L138 2006 243b 3234846615*2^949441-1 285820 p113 2008 244 45*2^949353+1 285786 g107 2006 245 12345*2^948054-1 285397 L200 2007 246 87*2^942790-1 283811 L145 2006 247 25*2^942563-1 283742 L183 2006 248 37*2^939364+1 282779 p122 2006 249c 21547*2^936473-1 281911 L284 2008 250 246419198025*2^935249-1 281550 L106 2007 251b 291*2^934097-1 281194 L261 2008 252b 273*2^930663-1 280160 L260 2008 253 165*2^928724+1 279576 g196 2007 254 33*2^922782+1 277787 L165 2006 255 243163663*2^919087-1 276682 L10 2004 256f 125*2^918494-1 276497 L384 2007 257 3*2^916773+1 275977 g245 2001 Divides GF(916771,3), GF(916772,10) 258 19*2^916763-1 275975 L177 2007 259c 285*2^915913-1 275720 L261 2008 260c 83*2^910716-1 274155 L545 2008 261 737*2^906168-1 272787 L191 2006 262 42717*2^905792+1 272676 L159 2005 263 216751*2^903792+1 272074 g346 2004 264e 93*2^903187-1 271889 L282 2008 265 15*2^902474-1 271673 L52 2006 266 309817*2^901173-1 271286 L64 2004 267 101*2^900358-1 271037 L183 2006 268 43*2^894766+1 269354 g279 2006 Divides GF(894765,5) 269 19581121*2^893547-1 268992 p49 2004 270 85*2^892568+1 268692 g267 2006 271 2995125705*2^891645-1 268422 L145 2006 272 81*2^889981+1 267913 gt 2007 273b 7195377*2^888888-1 267589 L284 2008 274 11*2^886071+1 266735 g277 2005 Divides GF(886070,12) 275 2809*2^883814+1 266058 L123 2007 Generalized Fermat 276 5077*2^881829-1 265461 L251 2007 277e 285*2^881240-1 265283 L323 2008 278e 193*2^880287-1 264996 L323 2008 279e 117*2^877874-1 264269 L488 2008 280 81*2^877707+1 264219 gt 2007 281 65*2^877287+1 264092 p189 2006 282d 135*2^876997-1 264005 L260 2008 283 85*2^876458+1 263843 g267 2006 284 5775*2^876045+1 263720 p189 2007 285 69*2^867653-1 261192 L138 2006 286 170591*2^866870-1 260960 L47 2004 287f 3234846615*2^865933-1 260682 p113 2007 288 93997*2^864401-1 260216 L49 2004 289 19581121*2^862127-1 259534 p49 2003 290 2013289*2^859433-1 258722 L466 2007 291f 1486245*2^859433-1 258722 L466 2007 292f 1283911*2^859433-1 258722 L466 2007 293a 95061*2^859433+1 258721 L466 2008 294 2^859433-1 258716 SG 1994 Mersenne 33 295 692835*2^857593-1 258168 L138 2006 296 21*2^856865+1 257944 g279 2004 297 77*2^855770-1 257615 L56 2005 298 19*2^853546+1 256945 g381 2005 299 83*2^851092-1 256207 L80 2007 300f 261*2^850383-1 255994 L478 2007 301 3^534827-3^267414+1 255178 x28 2005 302 1581823815*2^846116-1 254716 L83 2005 303 51*2^845494-1 254521 L80 2007 304 97*2^843205-1 253832 L145 2006 305 201*2^840735-1 253089 L282 2007 306 57*2^839446-1 252701 L80 2007 307 35*2^839082-1 252591 L325 2007 308 2607*2^838647+1 252462 g61 2007 309 175268*5^360870-1 252243 p196 2006 310 43*2^835934+1 251643 g279 2006 311f 117*2^834916-1 251337 L261 2007 312 9*2^834810+1 251304 p148 2004 Generalized Fermat 313 51*2^832630-1 250649 L80 2007 314f 291*2^832410-1 250583 L261 2007 315f 237*2^832053-1 250476 L261 2007 316b 393047*2^832040-1 250475 L466 2008 317 69*2^831617-1 250344 L138 2006 318 35*2^831411+1 250282 g279 2006 Divides GF(831410,3) 319 8331405*2^829367-1 249672 L138 2006 320 173*2^828808-1 249499 L145 2007 321 9*2^828709-1 249468 L38 2005 322f 261*2^827599-1 249135 L261 2007 323 165*2^826425+1 248781 g196 2006 324 197*2^825188-1 248409 L282 2007 325b 236377*2^824773-1 248287 L251 2008 326 17*2^824451+1 248186 g267 2004 327 181*2^823853-1 248007 L138 2007 328f 2*389^95485+1 247302 g404 2007 329 69*2^820237-1 246918 L138 2006 330 5*2^819739+1 246767 g55 2001 Divides GF(819738,3) 331b 1005748293*2^819120+1 246589 p221 2008 332b 1003438725*2^819120+1 246589 p221 2008 333b 1002264615*2^819120+1 246589 p221 2008 334 85*2^818760+1 246474 g267 2005 335 45*2^818648-1 246440 L282 2007 336 75*2^814857-1 245299 L80 2007 337 105*2^814850-1 245297 L384 2007 338 79*2^812726+1 244657 p189 2006 339 7*2^811230+1 244206 g148 2002 Divides GF(811228,5) 340 291*2^810347-1 243942 L421 2007 341c 507607*2^810012+1 243844 g412 2008 342 64*3^510853+1 243741 x28 2005 343 600921*2^806197+1 242696 g337 2004 344 35*2^805222-1 242398 L142 2007 345 7*2^804534+1 242190 g196 2003 Divides GF(804533,12) 346a 157*2^802321-1 241525 L585 2008 347 261*2^802123-1 241466 L261 2007 348 105*2^801978-1 241422 L384 2007 349 3*2^801978+1 241420 g372 2005 Divides GF(801973,3), GF(801977,5) 350d 169*2^801578+1 241302 g246 2008 Generalized Fermat 351 659*2^800516-1 240983 g59 2004 352 2294020991*2^800493+1 240982 p157 2004 353 29*2^800191+1 240883 p122 2005 354 99913731*2^800000+1 240832 g279 2004 355 99797893*2^800000+1 240832 g279 2004 356 3882741*2^800000+1 240831 g279 2006 357 3433305*2^800000+1 240831 g279 2004 358 2633527*2^800000+1 240831 g279 2003 359 2169967*2^800000+1 240831 g53 2003 360 1913067*2^800000+1 240831 g279 2003 361 1736913*2^800000+1 240831 g53 2003 362 1122201*2^800000+1 240831 g53 2003 363 741411*2^800000+1 240830 g53 2003 364f 201*2^799611-1 240710 L282 2007 365 177*2^798443+1 240358 L129 2005 366 87*2^796341-1 239725 L145 2006 367b 161*2^792702-1 238630 L323 2008 368 3645*2^792240-1 238492 L261 2007 369d 83*2^791926-1 238396 L425 2008 370 111*2^791502-1 238268 L282 2007 371 187*2^788640+1 237407 p189 2007 372c 11174*50432^50432-1 237171 x37 2008 373d 91*2^787173-1 236965 L323 2008 374 119*2^787017+1 236918 p189 2007 375 229*2^786034+1 236623 L181 2007 376 73*2^783831-1 235959 L145 2006 377 39*2^781220-1 235173 L138 2006 378 285*2^780300-1 234897 L425 2007 379 460139*2^779536-1 234670 L47 2004 380 246419198025*2^778905-1 234486 L106 2007 381 39*2^778233+1 234274 g267 2005 382 115*2^778112+1 234238 p189 2007 383 27*2^777992-1 234201 L151 2005 384 7003141*2^777777-1 234142 L81 2007 385 6982195*2^777777-1 234142 L81 2007 386 6870877*2^777777-1 234142 L81 2007 387 6655117*2^777777-1 234142 L81 2007 388 5901565*2^777777-1 234141 L81 2007 389 5070649*2^777777-1 234141 L81 2006 390 4533949*2^777777-1 234141 L81 2006 391 4105201*2^777777-1 234141 L81 2006 392 3190291*2^777777-1 234141 L81 2006 393 3188689*2^777777-1 234141 L81 2006 394 2298237*2^777777-1 234141 L81 2006 395 2193597*2^777777-1 234141 L81 2006 396 1155681*2^777777-1 234141 L81 2006 397 441*2^776036+1 233613 L505 2007 Generalized Fermat 398 201*2^775453-1 233437 L282 2007 399 22183*2^773447-1 232836 L251 2007 400f 31*2^773227-1 232767 L330 2007 401f 33*2^773030-1 232707 L488 2007 402 8331405*2^772375-1 232515 L138 2006 403b 2983*2^771455-1 232235 L251 2008 404c 124679*2^769908-1 231771 L284 2008 405 177*2^769026-1 231503 L145 2006 406 35*2^768063+1 231212 L126 2005 Divides GF(768062,3) 407a 159*2^766421-1 230718 L384 2008 408d 61*2^762417-1 229513 L548 2008 409 43*2^762212+1 229451 g279 2006 410 10021136^32768+1 229407 p154 2006 Generalized Fermat 411 213*2^760942-1 229069 L261 2007 412 51127*2^759513-1 228641 L83 2007 413 246419198025*2^757961-1 228181 L106 2007 414 1391281*2^756839-1 227838 L466 2007 415 1334079*2^756839-1 227838 L466 2007 416 1081255*2^756839-1 227838 L466 2007 417 755061*2^756839-1 227838 L466 2007 418 33305*2^756839+1 227836 L466 2007 419 2^756839-1 227832 SG 1992 Mersenne 32 420 22932195*2^754723-1 227202 L138 2006 421 736320585*2^753905-1 226957 L200 2007 422 246419198025*2^752612-1 226571 L106 2007 423 246299*2^752600-1 226561 L42 2004 424c 57111443*2^751982-1 226377 L402 2008 425 177*2^751028+1 226085 L129 2005 426a 3389*2^749828-1 225725 L151 2008 427 231*2^749301-1 225565 L138 2006 428 39*2^747219-1 224937 L138 2006 429 165*2^746994+1 224870 g196 2006 430 253973*2^746152-1 224620 L80 2006 431 243*2^744442-1 224102 p48 2005 432 65*2^744095+1 223997 p189 2006 433 11*2^743322-1 223764 L10 2004 434 273*2^742930-1 223647 L323 2007 435 151515*2^742445-1 223504 L200 2007 436 29*2^742191+1 223424 p122 2005 437 81*2^741917-1 223342 L268 2007 438 129*2^739023+1 222471 p189 2007 439 183*2^737805+1 222104 p189 2007 440b 2741*2^737586-1 222039 L251 2008 441d 159*2^736144-1 221604 L323 2008 442 71*2^735802-1 221501 L97 2005 443 19581121*2^735431-1 221395 p49 2004 444 2995125705*2^734584-1 221142 L72 2005 445 15*2^734400+1 221078 p76 2004 446d 221*2^730986-1 220052 L426 2008 447 212893*2^730387-1 219874 g163 2003 448 237*2^729654-1 219651 L261 2007 449 27*2^729314-1 219547 L125 2005 450 289*2^728205-1 219215 L6 2005 451 161957*2^727995+1 219154 g341 2004 452 3*2^727699-1 219060 L41 2004 453 137137*2^725437-1 218384 L321 2007 454 189*2^724746+1 218173 p189 2007 455e 67*2^722805-1 217588 L268 2008 456 220033*2^719731-1 216666 g163 2004 457 171*2^717731+1 216061 p189 2007 458 135*2^717682+1 216046 p189 2007 459 25*2^716769-1 215771 L137 2006 460 101*2^715503+1 215390 p189 2007 461 171*2^714200+1 214998 p189 2007 462 149*2^714199+1 214998 p189 2007 463 15*2^712294-1 214424 L52 2005 464 91*2^711335-1 214136 L323 2007 465 3*2^709968+1 213723 g372 2005 Divides GF(709962,3), GF(709963,5) 466 213*2^709727-1 213652 L261 2007 467 5775*2^708795+1 213373 p189 2007 468 3149688^32768+1 212936 g260 2005 Generalized Fermat 469 57*2^707245-1 212904 L384 2007 470 3134838^32768+1 212868 g260 2004 Generalized Fermat 471 3109540^32768+1 212753 g260 2004 Generalized Fermat 472 151515*2^705873-1 212495 L200 2007 473 3000336^32768+1 212244 g292 2002 Generalized Fermat 474 267*2^705028-1 212238 L260 2007 475 2*269^87347+1 212232 g404 2007 476 7331*2^704842-1 212183 L251 2007 477 649285*2^704721-1 212148 g396 2006 478 2973894^32768+1 212118 g309 2004 Generalized Fermat 479 261917*2^704227+1 211999 g346 2004 480 483*2^703479-1 211771 L79 2006 481 105*2^703368+1 211737 p189 2007 482 3*2^702038-1 211335 L30 2003 483 125*2^701981+1 211320 p189 2007 484 15*2^701902+1 211295 p76 2004 485 1581823815*2^701702-1 211243 L83 2006 486 24067*2^700073-1 210748 L251 2007 487 6215657*2^700000-1 210728 L81 2007 488 4786305*2^700000-1 210728 L81 2007 489 4649865*2^700000-1 210728 L81 2007 490 3762633*2^700000-1 210728 L81 2006 491 3030329*2^700000-1 210728 L81 2006 492 2758665*2^700000-1 210728 L81 2007 493 2599043*2^700000-1 210728 L81 2006 494 2500883*2^700000-1 210728 L81 2007 495 1168043*2^700000-1 210728 L81 2006 496 58153*2^700004+1 210727 g305 2007 497 422367*2^700000-1 210727 L81 2006 498 2696506^32768+1 210725 g309 2003 Generalized Fermat 499 2679502^32768+1 210635 g309 2003 Generalized Fermat 500 143*2^699189+1 210480 p189 2007 501 2619572^32768+1 210313 g309 2003 Generalized Fermat 502 46157*2^698207+1 210186 SB1 2002 503 2585646^32768+1 210128 g309 2003 Generalized Fermat 504c 7844265*2^697732+1 210046 g336 2008 505 117*2^697458-1 209958 L261 2007 506 2538626^32768+1 209866 g309 2003 Generalized Fermat 507 6794935*2^696969-1 209816 L81 2007 508 6145851*2^696969-1 209816 L81 2007 509 4549431*2^696969-1 209816 L81 2007 510 4226259*2^696969-1 209816 L81 2007 511 4063867*2^696969-1 209816 L81 2007 512 3649585*2^696969-1 209816 L81 2007 513 3598881*2^696969-1 209816 L81 2007 514 3477939*2^696969-1 209816 L81 2007 515 3425817*2^696969-1 209816 L81 2007 516 2009719*2^696969-1 209815 L81 2007 517 1868755*2^696969-1 209815 L81 2007 518 1846815*2^696969-1 209815 L81 2007 519 1328227*2^696969-1 209815 L81 2007 520 1158589*2^696969-1 209815 L81 2007 521 602031*2^696969-1 209815 L81 2007 522 332269*2^696969-1 209815 L81 2007 523 35*2^696935+1 209800 L126 2005 524 204223*2^696891-1 209791 g163 2003 525 2510928^32768+1 209710 g309 2003 Generalized Fermat 526 11*2^696438-1 209650 L10 2004 527 31431*2^695695-1 209430 p190 2006 528 175*2^695576+1 209392 p189 2007 529 617*2^695452-1 209355 L176 2006 530 2435410^32768+1 209276 g309 2003 Generalized Fermat 531 5775*2^694061+1 208937 p189 2007 532 2354618^32768+1 208796 g242 2003 Generalized Fermat 533 2354572^32768+1 208795 g242 2003 Generalized Fermat 534 2351172^32768+1 208775 g242 2003 Generalized Fermat 535 2329148^32768+1 208641 g309 2003 Generalized Fermat 536 187*2^693012+1 208620 p189 2007 537e Phi(3,-2322573^16384) 208601 p72 2008 Generalized unique 538e Phi(3,-2313516^16384) 208545 p72 2008 Generalized unique 539 12601*2^692732+1 208538 g411 2007 540 209*2^692692-1 208524 L421 2007 541 2282862^32768+1 208355 g309 2003 Generalized Fermat 542 2279250^32768+1 208333 g309 2003 Generalized Fermat 543c 2825*2^691465+1 208156 L31 2008 544 49*2^691469-1 208155 L217 2007 545 129*2^690893-1 207982 L425 2007 546 19540909*2^690774+1 207951 g393 2005 547 Phi(3,-2182528^16384) 207716 f7 2007 Generalized unique 548 Phi(3,-2178996^16384) 207692 f7 2007 Generalized unique 549 2167350^32768+1 207616 g295 2002 Generalized Fermat 550 159*2^689437+1 207544 p189 2007 551 261221*2^689422-1 207543 L35 2003 552 2147196^32768+1 207483 g295 2002 Generalized Fermat 553 Phi(3,-2115084^16384) 207269 f7 2007 Generalized unique 554 Phi(3,-2110199^16384) 207236 f7 2007 Generalized unique 555 101*2^687897+1 207080 p189 2007 556 137137*2^687797-1 207053 L321 2007 557 Phi(3,-2074507^16384) 206993 f7 2007 Generalized unique 558 2034902^32768+1 206719 g295 2002 Generalized Fermat 559 21*2^686632+1 206699 g279 2004 560 Phi(3,-2029827^16384) 206683 f7 2006 Generalized unique 561 12345*2^686316-1 206606 L200 2007 562c 103*2^686251-1 206585 L488 2008 563 Phi(3,-1989801^16384) 206400 f7 2006 Generalized unique 564 1986700^32768+1 206378 g295 2002 Generalized Fermat 565 Phi(3,-3898771219232^8192) 206290 f14 2007 Generalized unique 566 155*2^684887+1 206174 p189 2007 567 Phi(3,-3824990769800^8192) 206154 f14 2007 Generalized unique 568 Phi(3,-3804263911368^8192) 206116 f14 2007 Generalized unique 569 Phi(3,-1949616^16384) 206110 f7 2006 Generalized unique 570 13*2^684560+1 206075 g267 2003 Divides GF(684557,10), GF(684559,6) 571 Phi(3,-3775889401250^8192) 206062 f14 2007 Generalized unique 572 Phi(3,-3757143544200^8192) 206027 f14 2007 Generalized unique 573e 67*2^684258+1 205985 g402 2008 574 Phi(3,-1932045^16384) 205981 f7 2006 Generalized unique 575 Phi(3,-1925507^16384) 205932 f7 2006 Generalized unique 576 1922592^32768+1 205911 g295 2002 Generalized Fermat 577 171*2^684003-1 205908 L91 2005 578 Phi(3,-1910944^16384) 205824 f7 2006 Generalized unique 579 1909372^32768+1 205813 g295 2002 Generalized Fermat 580 Phi(3,-3632746914882^8192) 205787 f14 2007 Generalized unique 581 Phi(3,-3629324489672^8192) 205781 f14 2007 Generalized unique 582 85*2^683573-1 205778 L323 2007 583 Phi(3,-1886204^16384) 205639 f7 2006 Generalized unique 584 Phi(3,-1847091^16384) 205341 f7 2006 Generalized unique 585 Phi(3,-1833726^16384) 205237 f6 2006 Generalized unique 586 185*2^681393+1 205122 p189 2007 587 Phi(3,-1799953^16384) 204973 f7 2006 Generalized unique 588 246419198025*2^680688-1 204919 L106 2007 589e 211*2^680135-1 204744 L426 2008 590 1755378^32768+1 204616 GF2 2002 Generalized Fermat 591 Phi(3,-1705876^16384) 204209 f7 2006 Generalized unique 592e Phi(3,-2894735600712^8192) 204172 f17 2008 Generalized unique 593 6119*2^678080-1 204127 L251 2007 594e Phi(3,-2866364976672^8192) 204101 f17 2008 Generalized unique 595 Phi(3,-1668188^16384) 203891 f7 2006 Generalized unique 596 Phi(3,-2781445091042^8192) 203887 f17 2007 Generalized unique 597 Phi(3,-2750281713792^8192) 203807 f17 2007 Generalized unique 598 Phi(3,-1656973^16384) 203795 f7 2006 Generalized unique 599 Phi(3,-1648264^16384) 203720 f7 2006 Generalized unique 600 Phi(3,-2694769342722^8192) 203662 f17 2007 Generalized unique 601 Phi(3,-1636894^16384) 203622 f7 2006 Generalized unique 602 Phi(3,-1623927^16384) 203508 f7 2006 Generalized unique 603 Phi(3,-1620351^16384) 203477 f7 2006 Generalized unique 604 Phi(3,-2623996861250^8192) 203473 f17 2007 Generalized unique 605 Phi(3,-2590433963552^8192) 203381 f14 2007 Generalized unique 606 209*2^675232-1 203268 L421 2007 607 Phi(3,-1589754^16384) 203206 f7 2006 Generalized unique 608 2995125705*2^674974-1 203197 L87 2005 609 Phi(3,-2490345104258^8192) 203101 f14 2006 Generalized unique 610 121*2^674360+1 203005 p189 2007 Generalized Fermat 611 Phi(3,-2446029620000^8192) 202973 f14 2006 Generalized unique 612 Phi(3,-1562069^16384) 202956 f7 2006 Generalized unique 613 Phi(3,-1557862^16384) 202917 f7 2006 Generalized unique 614 33*2^674050-1 202911 L138 2007 615 1519380^32768+1 202561 g204 2001 Generalized Fermat 616 Phi(3,-1505290^16384) 202429 f7 2006 Generalized unique 617 7844265*2^672401+1 202420 g336 2006 618 34252725*2^672043-1 202313 p113 2005 619 27*2^672007+1 202296 g279 2005 Divides Fermat F(672005) 620 Phi(3,-1464219^16384) 202035 f7 2006 Generalized unique 621a 666625245*2^671089-1 202027 L545 2008 622 243*2^670891-1 201961 p48 2004 623 379371*2^670001-1 201696 L185 2007 624 Phi(3,-2024357714082^8192) 201627 f20 2007 Generalized unique 625 1581823815*2^669473-1 201541 L83 2006 626 Phi(3,-1413863^16384) 201537 f7 2006 Generalized unique 627 Phi(3,-1400719^16384) 201404 f7 2006 Generalized unique 628a 658217*2^668779+1 201329 g405 2008 629 84945*2^668779+1 201328 g405 2007 630 465*2^668701-1 201302 L198 2007 631 177*2^668682-1 201296 L145 2006 632e 52421*469762048^23209-1 201271 x37 2008 633 231*2^668218-1 201157 L87 2005 634 Phi(3,-1894115805122^8192) 201154 f17 2007 Generalized unique 635 Phi(3,-1869137652722^8192) 201059 f20 2007 Generalized unique 636a 272517*2^667766-1 201024 L402 2008 637 Phi(3,-1362748^16384) 201013 f7 2006 Generalized unique 638 113*2^667533+1 200950 g47 2003 639 Phi(3,-1837555687682^8192) 200938 f20 2007 Generalized unique 640 Phi(3,-1812760323200^8192) 200841 f20 2006 Generalized unique 641 667071*2^667071-1 200815 g55 2000 Woodall 642 Phi(3,-1787221992200^8192) 200740 f2 2006 Generalized unique 643 Phi(3,-1335473^16384) 200725 f7 2006 Generalized unique 644 Phi(3,-1779048754632^8192) 200708 f2 2006 Generalized unique 645a 9011376825*2^666668-1 200698 L596 2008 646b 32140685925*2^666666-1 200697 L596 2008 647b 29820115785*2^666666-1 200697 L596 2008 648b 7668057255*2^666667-1 200697 L596 2008 649b 4197278295*2^666667-1 200697 L596 2008 650 6476615*2^666666-1 200694 L81 2005 651 5194163*2^666666-1 200694 L81 2006 652 5135955*2^666666-1 200694 L81 2006 653 4834137*2^666666-1 200694 L81 2006 654 4658895*2^666666-1 200694 L81 2006 655 3028517*2^666666-1 200693 L81 2005 656 2806367*2^666666-1 200693 L81 2005 657 2403341*2^666666-1 200693 L81 2005 658 2172225*2^666666-1 200693 L81 2005 659 2031801*2^666666-1 200693 L81 2005 660 323955*2^666667-1 200693 g141 2006 661 192201*2^666666-1 200692 L81 2005 662f 31*2^666285-1 200574 L330 2007 663 177*2^665874-1 200451 L145 2006 664 Phi(3,-1309000^16384) 200440 f7 2006 Generalized unique 665 Phi(3,-1710250412694^8192) 200427 f18 2006 Generalized unique 666 2*419^76419+1 200388 g404 2007 Divides Phi(419^76419,2) 667 Phi(3,-1303833^16384) 200384 p72 2006 Generalized unique 668 Phi(3,-1681821221814^8192) 200308 f18 2006 Generalized unique 669 Phi(3,-1673443651250^8192) 200272 f2 2007 Generalized unique 670 Phi(3,-1287328^16384) 200203 f7 2006 Generalized unique 671 1277444^32768+1 200093 GF2 2002 Generalized Fermat 672 Phi(3,-1276943^16384) 200088 f7 2006 Generalized unique 673 Phi(3,-1275383^16384) 200070 f7 2006 Generalized unique 674a 2207995*2^664385-1 200007 L466 2008 675d 1749375*2^664385-1 200007 L466 2008 676d 1693305*2^664385-1 200007 L466 2008 677d 1662657*2^664385-1 200007 L466 2008 678 1197385*2^664385-1 200006 L466 2007 679 566971*2^664385-1 200006 L466 2007 680 398355*2^664385-1 200006 L466 2007 681d 415062551*2^664357+1 200001 p221 2008 682d 414489473*2^664357+1 200001 p221 2008 683d 413308331*2^664357+1 200001 p221 2008 684 2638216539*2^664351+1 199999 p38 2004 685 Phi(3,-1261293^16384) 199912 f7 2006 Generalized unique 686 Phi(3,-1249815^16384) 199782 f4 2006 Generalized unique 687 177*2^663601-1 199767 L145 2006 688 267*2^662524-1 199443 L400 2007 689 246419198025*2^662444-1 199427 L106 2007 690 Phi(3,-1218494^16384) 199421 f7 2006 Generalized unique 691 1217284^32768+1 199407 GF4 2002 Generalized Fermat 692 1210354^32768+1 199325 GF4 2002 Generalized Fermat 693 12591*2^662053+1 199302 g411 2007 694 Phi(3,-1203036^16384) 199239 f7 2006 Generalized unique 695 Phi(3,-1439751774050^8192) 199202 f13 2006 Generalized unique 696 101670*91^101670+1 199181 g157 2005 Generalized Cullen 697 Phi(3,-1386775296486^8192) 198935 f18 2006 Generalized unique 698 Phi(3,-1381078788338^8192) 198906 f13 2006 Generalized unique 699 261*2^660709-1 198896 L384 2007 700 1171824^32768+1 198865 GF3 2002 Generalized Fermat 701 Phi(3,-1370075257800^8192) 198849 f13 2006 Generalized unique 702 1169486^32768+1 198837 GF3 2002 Generalized Fermat 703 1167528^32768+1 198813 GF3 2002 Generalized Fermat 704 1161054^32768+1 198734 GF3 2002 Generalized Fermat 705 Phi(3,-1323323714952^8192) 198602 f13 2006 Generalized unique 706 Phi(3,-1148089^16384) 198574 f7 2006 Generalized unique 707 125*2^659314-1 198476 L138 2006 708 Phi(3,-1138316^16384) 198452 f7 2006 Generalized unique 709 Phi(3,-1295428614498^8192) 198450 f13 2006 Generalized unique 710 3234846615*2^658992-1 198386 p113 2006 711 Phi(3,-1282439561288^8192) 198379 f13 2006 Generalized unique 712 149*2^658917+1 198356 p189 2007 713 Phi(3,-1277505869400^8192) 198351 f18 2006 Generalized unique 714 Phi(3,-1129153^16384) 198337 f7 2006 Generalized unique 715 1113768^32768+1 198142 g274 2002 Generalized Fermat 716 51*2^657705-1 197991 L148 2007 717 Phi(3,-1098136^16384) 197941 f4 2005 Generalized unique 718 1096382^32768+1 197918 GF3 2002 Generalized Fermat 719 177*2^657458+1 197917 L129 2005 720 111*2^656935-1 197760 L91 2005 721 Phi(3,-1079569^16384) 197698 f7 2005 Generalized unique 722 1074542^32768+1 197632 GF3 2001 Generalized Fermat 723 15*2^656264-1 197557 L52 2005 724 85*2^656039-1 197490 L323 2007 725 Phi(3,-1063662^16384) 197487 f4 2005 Generalized unique 726c 1485*2^655977+1 197472 g405 2008 727 Phi(3,-1052811^16384) 197341 f7 2005 Generalized unique 728 87258*182^87258+1 197215 g392 2006 Generalized Cullen 729 692835*2^655075-1 197204 L138 2006 730 181*2^655067-1 197198 L138 2006 731 1041870^32768+1 197192 g0 2000 Generalized Fermat 732 Phi(3,-1034698^16384) 197094 f7 2005 Generalized unique 733 83*2^654488-1 197023 L323 2007 734 Phi(3,-1019849^16384) 196888 f7 2005 Generalized unique 735 Phi(3,-1029757567704^8192) 196817 f18 2006 Generalized unique 736 177*2^653686-1 196782 L145 2006 737 Phi(3,-1016817857568^8192) 196727 f2 2007 Generalized unique 738 Phi(3,-1007934^16384) 196721 f4 2005 Generalized unique 739 Phi(3,-1008401650082^8192) 196668 f2 2007 Generalized unique 740 Phi(3,-1003271^16384) 196655 f7 2005 Generalized unique 741 999236^32768+1 196598 g141 2000 Generalized Fermat 742 Phi(3,-991824^16384) 196492 f7 2005 Generalized unique 743 Phi(3,-983319115446^8192) 196489 f18 2006 Generalized unique 744 Phi(3,-991445^16384) 196486 p72 2005 Generalized unique 745 Phi(3,-970312^16384) 196180 f4 2005 Generalized unique 746 98035*10^196070+1 196075 g157 2007 Generalized Cullen 747 55*2^651015-1 195977 L325 2007 748 159*2^650934+1 195953 p189 2007 749 Phi(3,-910253972322^8192) 195939 f6 2006 Generalized unique 750 Phi(3,-953686^16384) 195934 f4 2005 Generalized unique 751 Phi(3,-902662726688^8192) 195880 f6 2006 Generalized unique 752 Phi(3,-934486^16384) 195644 f7 2005 Generalized unique 753 215503*2^649891-1 195643 g163 2003 754 Phi(3,-932333^16384) 195611 f7 2005 Generalized unique 755 268168*5^279459-1 195339 L189 2007 756 Phi(3,-832576403232^8192) 195305 f6 2006 Generalized unique 757 Phi(3,-911498^16384) 195290 f4 2005 Generalized unique 758 Phi(3,-827841700224^8192) 195264 f18 2006 Generalized unique 759 Phi(3,-823701529944^8192) 195228 f18 2006 Generalized unique 760 Phi(3,-819074564802^8192) 195188 f6 2006 Generalized unique 761 43018*5^279020+1 195032 p196 2006 762 65*2^647130-1 194808 L148 2006 763 Phi(3,-872302^16384) 194664 f4 2005 Generalized unique 764 Phi(3,-870765^16384) 194639 f4 2005 Generalized unique 765 Phi(3,-754964889632^8192) 194608 f6 2006 Generalized unique 766e 109*2^646403-1 194589 L426 2008 767 Phi(3,-750746212658^8192) 194569 f6 2006 Generalized unique 768 19581121*2^645943-1 194456 p49 2003 769 855124^32768+1 194381 g141 2001 Generalized Fermat 770 19*2^645555-1 194333 L177 2006 771 45*2^645542-1 194330 L282 2007 772 4331*2^645398-1 194288 L123 2007 773 861*2^645393-1 194286 L79 2006 774 1581823815*2^644836-1 194125 L83 2005 775 12345*2^644708-1 194081 L200 2007 776 11*2^644677+1 194069 g277 2004 777 Phi(3,-693192060000^8192) 194001 f18 2007 Generalized unique 778 831648^32768+1 193985 g199 2002 Generalized Fermat 779 29*2^644044-1 193879 L10 2004 780 825324^32768+1 193876 g199 2002 Generalized Fermat 781f 207*2^643478-1 193709 L330 2007 782 Phi(3,-808691^16384) 193587 f7 2005 Generalized unique 783 93*2^642909+1 193537 g196 2003 784 Phi(3,-796191^16384) 193365 f7 2005 Generalized unique 785 Phi(3,-772447^16384) 192934 f7 2005 Generalized unique 786 Phi(3,-756916^16384) 192645 f7 2005 Generalized unique 787 263927*2^639599+1 192544 g341 2004 788 743788^32768+1 192396 g271 2002 Generalized Fermat 789 Phi(3,-737869^16384) 192282 f4 2005 Generalized unique 790d 1485*2^638597+1 192241 g405 2008 791 393571035*2^638021+1 192073 L122 2007 792 19581121*2^637021-1 191770 p49 2003 793 121*2^636564+1 191627 p189 2007 Generalized Fermat 794 9613*2^636159-1 191507 L251 2007 795 15*2^635989+1 191453 p76 2004 796 133736*3^401209-1 191431 p120 2004 Generalized Woodall 797 255*2^635715-1 191372 g320 2007 798 Phi(3,-691650^16384) 191362 f1 2005 Generalized unique 799 3234846615*2^635652-1 191360 p113 2005 800 9001*2^635264+1 191238 g411 2007 801 197*2^635042-1 191169 L282 2007 802 Phi(3,-681101^16384) 191143 f4 2005 Generalized unique 803 39*2^634441+1 190988 g196 2005 804 35*2^634402-1 190976 L142 2006 805 Phi(3,-672996^16384) 190973 f4 2005 Generalized unique 806 Phi(3,-669646^16384) 190902 f4 2005 Generalized unique 807 2^633888-2^316944-1 190820 p168 2007 808 Phi(3,-657858^16384) 190649 f4 2005 Generalized unique 809 91*2^633169-1 190605 L425 2007 810 151515*2^632955-1 190544 L200 2006 811 Phi(3,-647715^16384) 190428 f4 2005 Generalized unique 812 189*2^632049+1 190268 p189 2007 813 173*2^632000-1 190254 L145 2007 814 75*2^631091-1 189980 L257 2007 815a 885*2^631004-1 189955 L268 2008 816b 22201*2^630916+1 189929 L123 2008 Generalized Fermat 817 129*2^630843+1 189905 p189 2007 818 Phi(3,-621973^16384) 189851 f4 2005 Generalized unique 819 861*2^630463-1 189792 L79 2006 820 109897*2^630221-1 189721 g163 2003 821a 705*2^630007-1 189654 L268 2008 822 Phi(3,-610367^16384) 189583 f4 2004 Generalized unique 823 Phi(3,-604003^16384) 189434 f4 2004 Generalized unique 824 2995125705*2^629062-1 189377 L87 2005 825 2*191^83009+1 189347 g404 2006 Divides Phi(191^83009,2) 826 269*2^628904-1 189322 L426 2007 827f 281*2^628898-1 189320 L426 2007 828b 108045*2^628770-1 189284 L466 2008 829 Phi(3,-595806^16384) 189239 f7 2005 Generalized unique 830 Phi(3,-590124^16384) 189103 f4 2005 Generalized unique 831 Phi(3,-589145^16384) 189079 f7 2005 Generalized unique 832 Phi(3,-586426^16384) 189013 f7 2005 Generalized unique 833 27*2^627794-1 188987 L107 2005 834 25*2^627710+1 188961 g279 2004 Generalized Fermat 835 Phi(3,-582706^16384) 188923 f4 2005 Generalized unique 836 29*2^627167+1 188798 p122 2005 837 Phi(3,-571538^16384) 188647 f7 2005 Generalized unique 838 126667*2^626497-1 188600 g23 2003 839 Phi(3,-559738^16384) 188350 f7 2005 Generalized unique 840 553602^32768+1 188194 g168 2001 Generalized Fermat 841c 119*2^624896-1 188115 L282 2008 842 83*2^624398-1 187965 L323 2007 843 225*2^623720+1 187761 p43 2005 Generalized Fermat 844 179*2^623635+1 187736 p189 2007 845 524552^32768+1 187427 g65 2001 Generalized Fermat 846 5114*5^268127+1 187417 p224 2007 847 1515*2^620928-1 186922 L253 2007 848 499310^32768+1 186725 g295 2001 Generalized Fermat 849f 245*2^619938-1 186623 L426 2007 850 Phi(3,-494093^16384) 186575 f7 2005 Generalized unique 851 141*2^619742-1 186564 L426 2007 852 261*2^618918-1 186316 L145 2007 853 93254*5^266111+1 186009 p196 2007 854 Phi(3,-473198^16384) 185960 f4 2005 Generalized unique 855 393571035*2^617318+1 185840 L122 2007 856 243*2^616662-1 185637 L442 2007 857 8331405*2^616479-1 185586 L87 2005 858 279703*2^616235-1 185511 L53 2004 859 91*2^616072+1 185459 p189 2006 860 279*2^616044-1 185451 L145 2007 861b 615*2^615952-1 185423 L268 2008 862 29399*2^615101+1 185169 g6 2006 863 103259*2^615076-1 185162 g163 2002 864 77*2^614995+1 185134 L56 2005 865 1581823815*2^614637-1 185034 L83 2005 866 5775*2^614179+1 184891 p189 2007 867 69*2^613781-1 184769 L138 2006 868 222997*2^613153-1 184583 g163 2001 869 429370^32768+1 184577 g295 2001 Generalized Fermat 870 35535391*2^612212+1 184302 g267 2007 871 Phi(3,-415159^16384) 184098 f7 2005 Generalized unique 872d 1485*2^611020+1 183939 g405 2008 873 159*2^611020-1 183938 L91 2005 874 289*2^610737-1 183853 L6 2005 875e 63*2^610704-1 183843 L442 2008 876 357491*2^609338-1 183435 g302 2003 877 181*2^608192+1 183087 p189 2007 878 77*2^607920-1 183005 L56 2004 879 267*2^607688-1 182935 L261 2007 880 2*131^86365+1 182859 g404 2007 Divides Phi(131^86365,2) 881 12345*2^607395-1 182849 L183 2006 882 Phi(3,-377716^16384) 182753 f7 2005 Generalized unique 883 245*2^606706-1 182640 L426 2007 884 141*2^605392+1 182244 p43 2005 885 17*2^605394-1 182243 L141 2006 886 225*2^605172+1 182178 p43 2005 Generalized Fermat, divides GF(605169,3) 887 Phi(3,-358446^16384) 182008 f4 2005 Generalized unique 888 173*2^604585+1 182001 p189 2007 889 Phi(3,-357238^16384) 181960 f7 2005 Generalized unique 890 Phi(3,-352694^16384) 181778 f4 2005 Generalized unique 891 131*2^603738-1 181746 L426 2007 892 Phi(3,-350159^16384) 181675 f7 2005 Generalized unique 893 129*2^603488-1 181671 L260 2007 894 Phi(3,-347458^16384) 181565 f7 2005 Generalized unique 895 111*2^602565-1 181393 L91 2005 896e 103*2^602483-1 181368 L488 2008 897 169*2^602070+1 181244 g246 2007 Generalized Fermat 898 255*2^601910-1 181196 g320 2007 899 2607*2^601176+1 180976 g61 2005 900 17*2^601158-1 180968 g267 2004 901 332554^32768+1 180941 GF5 2002 Generalized Fermat 902 330716^32768+1 180862 g232 2001 Generalized Fermat 903 33*2^600270+1 180701 L126 2005 Divides GF(600269,5) 904 Phi(3,-326040^16384) 180659 f7 2005 Generalized unique 905 225*2^600080+1 180645 p43 2005 Generalized Fermat 906 4159449*2^600000-1 180625 L81 2006 907 3672389*2^600000-1 180625 L81 2006 908 3543819*2^600000-1 180625 L81 2006 909 3368853*2^600000-1 180625 L81 2006 910 2666517*2^600000-1 180625 L81 2006 911 2606859*2^600000-1 180625 L81 2006 912 2420747*2^600000-1 180625 L81 2006 913 2220567*2^600000-1 180625 L81 2006 914 2189259*2^600000-1 180625 L81 2006 915 2092353*2^600000-1 180625 L81 2006 916 1484163*2^600000-1 180625 L81 2006 917 339217*2^600002+1 180625 g305 2007 918 20475*2^600004+1 180624 g305 2007 919 13971*2^600004+1 180624 g305 2007 920 162585*2^600000-1 180624 L81 2006 921 3234846615*2^599555-1 180494 p113 2005 922 675*2^599539-1 180483 L79 2007 923 321164^32768+1 180445 g232 2001 Generalized Fermat 924 861*2^599041-1 180333 L79 2006 925 Phi(3,-317790^16384) 180295 f7 2005 Generalized unique 926b 349*2^598831-1 180269 L79 2008 927 22932195*2^598360-1 180132 L138 2006 928 33*2^598248-1 180093 L138 2006 929 10^180004+248797842*10^89998+1 180005 D 2007 Palindrome 930 163*2^597474+1 179860 p43 2005 Divides GF(597473,3) 931 Phi(3,-307866^16384) 179843 f7 2005 Generalized unique 932 1179*2^596423+1 179545 g387 2006 933 Phi(3,-297244^16384) 179343 f7 2005 Generalized unique 934 315940139*2^595620-1 179308 L10 2004 935 1515*2^593203-1 178576 L183 2007 936 149*2^592968-1 178504 L171 2006 937 255*2^592080-1 178237 g320 2007 938 171*2^590818-1 177857 L91 2005 939 Phi(3,-263458^16384) 177626 f7 2005 Generalized unique 940 2*353^69705+1 177593 g404 2007 941a 98682705*2^589915-1 177591 L545 2008 942 123406*5^253626+1 177283 p188 2006 943 Phi(3,-64319462214^8192) 177084 f18 2006 Generalized unique 944 279*2^587881-1 176973 L145 2007 945 39*2^587850+1 176963 g267 2005 946 301*2^587635-1 176899 L79 2007 947 25*2^587585-1 176883 L137 2006 948c 161*2^587570-1 176879 L323 2008 949 249830^32768+1 176871 g242 2001 Generalized Fermat 950 229*2^586795-1 176646 L145 2006 951 93*2^586453+1 176542 g196 2003 952 99*2^586088-1 176433 L167 2006 953 195*2^585988+1 176403 p189 2007 954 999*2^585907+1 176379 L110 2006 955 Phi(3,-241074^16384) 176363 f7 2005 Generalized unique 956 Phi(3,-240513^16384) 176330 p72 2005 Generalized unique 957 8331405*2^585714-1 176325 L87 2005 958 33*2^585400-1 176225 L138 2006 959 191*2^585377+1 176219 p189 2007 960 151*2^585044+1 176118 L446 2007 Divides Fermat F(585042) 961 3*2^584995-1 176102 L24 2003 962e 407*2^584491+1 175952 L203 2008 963 1003*2^584103-1 175836 L51 2004 964 Phi(3,29093^19683) 175722 p16 2002 Generalized unique 965 297*2^583464-1 175643 L421 2007 966 Phi(3,28808^19683) 175554 p16 2002 Generalized unique 967 183*2^583114+1 175538 p189 2007 968 736320585*2^582738-1 175431 L200 2007 969 123*2^582672+1 175404 p189 2007 970a 2199*2^582592-1 175382 L268 2008 971 177*2^582454-1 175339 L145 2006 972 246419198025*2^582194-1 175270 L106 2006 973 53*2^582078-1 175225 L251 2007 974 10^175108+230767032*10^87550+1 175109 D 2007 Palindrome 975 Phi(3,-219682^16384) 175040 f7 2005 Generalized unique 976 199*2^581119-1 174937 L426 2007 977a 2185*2^580861-1 174860 L268 2008 978 99*2^580738+1 174822 p76 2005 979 69*2^580596-1 174779 L138 2006 980 93*2^580482-1 174745 L147 2007 981 339728*5^249588-1 174461 p188 2006 982 1597*2^579373-1 174412 L488 2007 983b 666625245*2^578853-1 174261 L545 2008 984c 108045*2^578856-1 174259 L466 2008 985 122149*2^578806+1 174244 g341 2004 986 675*2^578746-1 174223 L79 2007 987 65*2^578512-1 174152 L132 2005 988 89707*2^578313-1 174095 g173 2003 989 204462^32768+1 174019 g27 2001 Generalized Fermat 990 255*2^577903-1 173969 g320 2006 991 735*2^577763-1 173927 g172 2006 992 Phi(3,-203097^16384) 173923 f4 2005 Generalized unique 993b 163*2^577723-1 173915 L323 2008 994 171*2^576733-1 173617 L91 2005 995c 67*2^576558+1 173564 p227 2008 996 735*2^575880-1 173361 g172 2006 997 331*2^575199-1 173155 g320 2007 998 98939*2^575144-1 173141 g163 2001 999 371697*2^574646-1 172992 g356 2006 1000 45*2^574506+1 172946 g409 2007 Divides GF(574504,3) 1001 1581823815*2^574196-1 172860 L83 2005 1002b 113*2^572966-1 172483 L257 2008 1003 Phi(3,24071^19683) 172482 p16 2002 Generalized unique 1004 Phi(3,-33650405888^8192) 172475 f14 2006 Generalized unique 1005 405*2^572623+1 172380 L203 2007 1006 861*2^572559-1 172361 L79 2006 1007 141*2^572007+1 172194 p43 2005 1008 Phi(3,-32245301250^8192) 172171 f14 2006 Generalized unique 1009 1581823815*2^571773-1 172131 L83 2005 1010f 227968*5^245975-1 171935 p225 2007 1011 2607*2^570948+1 171876 g61 2005 1012 1581823815*2^570823-1 171845 L83 2005 1013 40078*5^245766+1 171788 p215 2007 1014 141*2^570401+1 171710 p43 2005 1015a 427*2^570112+1 171624 L203 2008 1016 19580625*2^569850+1 171550 L71 2007 Generalized Fermat 1017b 666625245*2^569811-1 171540 L545 2008 1018b 2759*2^569812-1 171534 L251 2008 1019 197*2^569222-1 171356 L167 2007 1020a 759375*2^568888-1 171259 L284 2008 1021 15*2^568780-1 171222 L52 2005 1022 167176^32768+1 171153 g0 2000 Generalized Fermat 1023 Phi(3,-27745199048^8192) 171102 f6 2006 Generalized unique 1024 5380571*2^567890-1 170959 L81 2005 1025 5256777*2^567890-1 170959 L81 2005 1026 4537013*2^567890-1 170959 L81 2005 1027 4455531*2^567890-1 170959 L81 2005 1028 4206591*2^567890-1 170959 L81 2005 1029 3941273*2^567890-1 170959 L81 2005 1030 3443493*2^567890-1 170959 L81 2005 1031 3399591*2^567890-1 170959 L81 2005 1032 3275663*2^567890-1 170959 L81 2005 1033 2166717*2^567890-1 170959 L81 2005 1034 1699307*2^567890-1 170959 L81 2005 1035 1113315*2^567890-1 170958 L81 2005 1036 829653*2^567890-1 170958 L81 2005 1037 183435*2^567890-1 170958 L81 2005 1038 301*2^566979-1 170681 L79 2007 1039 66242*5^244063+1 170598 p215 2007 1040b 2073*2^566123-1 170424 L268 2008 1041 57*2^565994-1 170383 L261 2007 1042 291*2^565917-1 170361 L261 2007 1043 315*2^565722+1 170302 g361 2007 1044 869688105*2^565266-1 170171 L139 2006 1045 41117*2^564778-1 170020 L6 2005 1046 10^170006+3880883*10^85000+1 170007 D 2006 Palindrome 1047 392113#+1 169966 p16 2001 Primorial 1048b 349*2^564443-1 169917 L79 2008 1049 315*2^564347-1 169888 L79 2007 1050 181*2^563997-1 169783 L145 2006 1051 91*2^563469-1 169624 L145 2006 1052 (2^281621+1)^2-2 169553 p89 2005 1053 13*2^562456+1 169318 g267 2003 Divides GF(562454,5) 1054 7*2^561816+1 169125 g148 2003 Divides GF(561815,5); GF(561815,6) [p149] 1055 1109*2^561705+1 169094 L78 2006 1056d 990267135*2^561576-1 169061 L545 2008 1057 964*7^200026+1 169045 g107 2004 1058 195*2^561444-1 169014 L138 2006 1059 123*2^561012+1 168884 p189 2007 1060 199*2^560987-1 168877 L426 2007 1061 117*2^560848-1 168835 L145 2007 1062 1581823815*2^560649-1 168782 L83 2005 1063 163*2^560576+1 168753 p43 2005 1064 19580625*2^560531+1 168744 L71 2007 1065 229*2^560259-1 168658 L171 2006 1066 861*2^560221-1 168647 L79 2006 1067b 111546435*2^559752-1 168511 L466 2008 1068 64*3^353093+1 168470 x28 2005 1069 Phi(3,-137683^16384) 168391 f2 2005 Generalized unique 1070 861*2^558945-1 168263 L79 2006 1071c 2151*2^558397-1 168098 L268 2008 1072 219*2^558313-1 168072 L91 2005 1073 1485*2^558224+1 168046 g405 2007 1074a 405405*2^558018-1 167986 L466 2008 1075 246419198025*2^557789-1 167923 L106 2006 1076 169719*2^557557+1 167847 g141 2000 1077 446509*2^557118+1 167715 g182 2003 1078b 111546435*2^556240-1 167453 L466 2008 1079 22932195*2^556146-1 167424 L138 2006 1080 235*2^556077-1 167399 L163 2006 1081 243*2^555984+1 167371 L165 2007 Divides GF(555978,3) 1082 39*2^555902+1 167345 g267 2005 1083 5347983*2^555555-1 167246 L81 2006 1084 5184553*2^555555-1 167246 L81 2006 1085 5028771*2^555555-1 167246 L81 2006 1086 4700535*2^555555-1 167246 L81 2006 1087 4258965*2^555555-1 167246 L81 2006 1088 3664525*2^555555-1 167246 L81 2006 1089 3659001*2^555555-1 167246 L81 2006 1090 3516945*2^555555-1 167246 L81 2006 1091 2949993*2^555555-1 167246 L81 2006 1092 2876215*2^555555-1 167246 L81 2006 1093 2169615*2^555555-1 167246 L81 2006 1094 1003323*2^555555-1 167245 L81 2006 1095 827365*2^555555-1 167245 L81 2006 1096 465099*2^555555-1 167245 L81 2006 1097 339559*2^555555-1 167245 L81 2006 1098 135345*2^555555-1 167244 L81 2006 1099d 283076*5^239214-1 167209 p225 2008 1100 99*2^555115+1 167109 p114 2005 1101 301*2^554825-1 167022 L80 2007 1102a 33909*23#^20000-1 166975 p229 2008 1103 181*2^553989-1 166770 L138 2006 1104 2995125705*2^553148-1 166524 L87 2005 1105 855*2^552791+1 166410 L156 2007 1106 1581823815*2^552718-1 166394 L83 2005 1107 191*2^552085+1 166197 p189 2007 1108 5761455*2^551907-1 166148 g393 2005 1109 37*2^551830+1 166119 p122 2005 1110 406033*2^551315-1 165968 L138 2006 1111 81*2^551155+1 165917 gt 2006 1112e 666625245*2^550161-1 165624 L146 2008 1113 195*2^550148+1 165614 p189 2007 1114 Phi(3,-12742963350^8192) 165565 f18 2006 Generalized unique 1115 210885*2^549843-1 165525 L137 2005 1116 231*2^549235+1 165339 p43 2005 1117 11111*2^549034-1 165280 L123 2007 1118 199*2^548533-1 165128 L426 2007 1119d 343*2^548383-1 165083 L79 2008 1120 179*2^548291+1 165055 p189 2007 1121 2^548108-2^274054-1 164997 p168 2006 1122 37*2^548012+1 164970 p122 2005 1123c 435*2^547893+1 164935 L203 2008 1124 458743*2^547791-1 164908 g163 2003 1125 735*2^547661-1 164866 g172 2006 1126 537801*2^547497+1 164819 g356 2006 1127 431595*2^547497+1 164819 g356 2006 1128 143309*2^547497+1 164819 g356 2006 1129 95309*2^547497+1 164818 g356 2006 1130 56781*2^547497+1 164818 g356 2006 1131 1695*2^547141+1 164710 g336 2006 1132 1485*2^547107+1 164699 g405 2007 1133 153*2^545716-1 164280 L91 2005 1134 735*2^544725-1 163982 g172 2006 1135 5761455*2^544162-1 163816 g393 2005 1136 246419198025*2^543820-1 163718 L106 2006 1137 19750825*2^543452+1 163603 g121 2004 1138b 1857*2^543216-1 163528 L468 2008 1139 89*2^543049+1 163476 p189 2006 1140 49*2^542945-1 163445 L217 2007 1141 Phi(3,-96280^16384) 163301 f2 2005 Generalized unique 1142f 407*2^541955+1 163148 L203 2007 1143 199*2^541753-1 163087 L426 2007 1144 121*2^541621-1 163047 L65 2004 1145 255255*2^541578+1 163037 L94 2006 1146f 325*2^541569-1 163032 L79 2007 1147 257*2^541402-1 162981 L145 2006 1148 91*2^541128+1 162898 p189 2006 1149 159503*2^540945+1 162846 g341 2004 1150 201*2^540810-1 162803 L282 2007 1151d 190468*5^232789-1 162718 p225 2008 1152 243*2^539016-1 162263 L442 2007 1153 67531*2^538755-1 162187 L164 2007 1154 21*2^538657-1 162154 L56 2004 1155 163*2^538318+1 162053 p43 2005 1156c 431*2^538215+1 162022 L203 2008 1157b 95662*5^231787-1 162018 p214 2008 1158 465*2^538043-1 161970 L198 2007 1159d 2151*2^537994-1 161956 L268 2008 1160 79*2^537238+1 161727 p189 2006 1161 3721*2^536916+1 161632 L123 2007 Generalized Fermat 1162 417*2^536876-1 161619 g276 2006 1163 129*2^536615-1 161540 L145 2007 1164 685281*2^535827-1 161306 L161 2006 1165 91*2^535819-1 161300 L145 2006 1166 525*2^535741-1 161277 L79 2007 1167 231*2^535713-1 161269 L87 2005 1168d 108045*2^535443-1 161190 L466 2008 1169 37510*3^337592+1 161077 p126 2006 Generalized Cullen 1170 39*2^534973+1 161045 g267 2005 1171 101*2^534891+1 161021 p189 2007 1172 97*2^534602+1 160934 p114 2005 1173 147*2^534558+1 160921 p189 2007 1174 97*2^534310+1 160846 p114 2005 1175c 978847155*2^533895-1 160728 L58 2008 1176 1337*2^533416-1 160578 L51 2004 1177 137*2^533043+1 160465 MC 2004 1178 401143*2^532927-1 160433 g163 2003 1179a 273*2^532597+1 160331 p161 2008 1180 45652*5^229218+1 160222 p215 2007 1181 10^160016+8231328*10^80005+1 160017 D 2006 Palindrome 1182 199*2^531357-1 159957 L426 2007 1183 291*2^531347-1 159954 L171 2007 1184b 209*2^530729+1 159768 p161 2008 1185 33448*5^228454+1 159688 p215 2007 1186 503*2^530429+1 159678 g233 2006 1187 5775*2^530395+1 159669 p189 2007 1188 105*2^530360-1 159657 L325 2007 1189 145*2^530181-1 159603 L163 2006 1190 302627325*2^530101+1 159585 gf 1999 1191 675*2^529997-1 159548 L79 2007 1192b 3039469*2^529893-1 159521 L466 2008 1193 39*2^529642+1 159440 g267 2005 1194c 978847155*2^529577-1 159428 L58 2008 1195 22932195*2^529462-1 159392 L138 2006 1196 175*2^529417-1 159373 L145 2006 1197b 349*2^529251-1 159323 L79 2008 1198d 435*2^529247+1 159322 L203 2008 1199b 273*2^529094+1 159276 p227 2008 1200 2995125705*2^529005-1 159256 L87 2005 1201 2508*1959^48373+1 159249 g261 2005 1202 163*2^528788+1 159184 p43 2005 1203 45*2^528245-1 159020 L167 2007 1204 70906^32768+1 158948 g136 2001 Generalized Fermat 1205 366439#+1 158936 p16 2001 Primorial 1206 19650919*2^527530+1 158810 p147 2004 1207 525*2^527270-1 158727 L79 2007 1208 67*2^527037-1 158656 L268 2007 1209 1603*2^526319-1 158442 L182 2006 1210 345*2^525977+1 158338 g258 2007 Divides GF(525974,6) 1211 11*2^525589+1 158220 p116 2003 Divides GF(525588,6) 1212 135*2^525544-1 158207 L171 2007 1213 287*2^525378-1 158157 L145 2006 1214e 425*2^524997+1 158043 L203 2008 1215 3234846615*2^524946-1 158035 p113 2004 1216a 575600367*2^524288-1 157836 g415 2008 1217a 379482687*2^524288-1 157835 g415 2008 1218b 1557973*2^524288+1 157833 L466 2008 1219b 1359313*2^524288+1 157833 L466 2008 1220c 1292371*2^524288+1 157833 L466 2008 1221c 1267013*2^524288-1 157833 L466 2008 1222d 1204313*2^524288-1 157833 L466 2008 1223d 1109427*2^524288+1 157833 L466 2008 1224e 764017*2^524288+1 157833 L466 2008 1225f 685299*2^524288-1 157833 L466 2007 1226f 677901*2^524288+1 157833 L466 2007 1227f 622867*2^524288+1 157833 L466 2007 1228f 428079*2^524288-1 157833 L466 2007 1229 422943*2^524288+1 157833 L466 2007 1230 358245*2^524288+1 157832 L466 2007 1231 113451*2^524287+1 157832 p152 2004 1232 255255*2^523865+1 157705 L94 2006 1233 27183585*2^523451+1 157582 L122 2007 1234 137*2^523283+1 157527 MC 2004 1235b 405405*2^523129-1 157484 L466 2008 1236 273*2^522287-1 157227 L171 2007 1237 465*2^522168-1 157191 L198 2007 1238 769217*2^522002-1 157145 p90 2007 1239 338271*2^522002-1 157144 p90 2007 1240 268311*2^522002-1 157144 p90 2007 1241 25447*2^522002+1 157143 p90 2006 1242 21735*2^522002-1 157143 p90 2007 1243 3975*2^522004+1 157143 p90 2006 1244 63*2^521925+1 157117 p161 2007 1245b 98682705*2^521820-1 157092 L545 2008 1246 326962*5^224737-1 157090 p225 2007 1247 13*2^521306+1 156930 g267 2003 1248 123*2^521031-1 156849 L91 2005 1249f 21102003*2^520908-1 156817 L458 2007 1250 111*2^520923-1 156816 L91 2005 1251 201*2^520586-1 156715 L282 2007 1252 133138*5^224013-1 156584 p225 2007 1253 1117*2^520148+1 156584 g241 2006 1254 237881*2^520025+1 156549 g167 2003 1255b 405405*2^519961-1 156530 L466 2008 1256 57*2^519892+1 156505 p152 2007 1257 57*2^519862+1 156496 p152 2007 1258e 313*2^519748+1 156463 L153 2008 1259b 657*2^519647+1 156433 p161 2008 1260b 685*2^519476+1 156381 p161 2008 1261 243*2^518736-1 156158 L442 2007 1262 123*2^518540-1 156099 L91 2005 1263f 301*2^517960+1 155924 L153 2007 1264e 233*2^517373+1 155748 p227 2008 1265 293*2^517242-1 155708 L145 2006 1266 5761455*2^517136-1 155681 g393 2005 1267a 721*2^516520+1 155491 p161 2008 1268 123*2^516456-1 155471 L91 2005 1269 405*2^516432-1 155465 L282 2007 1270 83660*72^83660-1 155390 g265 2003 Generalized Woodall 1271 1581823815*2^516152-1 155387 L83 2005 1272e 507*2^516086+1 155361 L153 2008 1273 231*2^516048+1 155349 p43 2005 1274 986963835*2^516018+1 155346 g368 2005 1275 71*2^515885+1 155299 p152 2007 1276d 287*2^515827+1 155282 p227 2008 1277f 501*2^515543+1 155197 L153 2007 1278 736320585*2^515431-1 155170 L183 2007 1279 5775*2^515218+1 155100 p189 2007 1280e 759007755*2^514971-1 155031 L545 2008 1281 159*2^514927+1 155011 p43 2005 1282a 987*2^514910+1 155007 p161 2008 1283d 517*2^514430+1 154862 L153 2008 1284d 926197*2^514229-1 154805 L466 2008 1285d 834961*2^514229-1 154805 L466 2008 1286c 131831*2^514229+1 154804 L466 2008 1287 103939*2^514229-1 154804 L466 2007 1288 14161*2^514229-1 154803 L466 2007 1289 3681*2^514229-1 154802 L466 2007 1290 165452*5^221446-1 154790 p225 2007 1291e 2153*2^514076-1 154756 L268 2008 1292 321*2^514041-1 154745 L79 2007 1293 281065*2^513505-1 154586 L80 2005 1294b 393*2^513153+1 154478 p227 2008 1295 121*2^513020+1 154437 p189 2007 Generalized Fermat 1296 39*2^512997+1 154430 g267 2005 Divides GF(512994,5), GF(512995,6) 1297b 795*2^512914+1 154406 p161 2008 1298 65537*2^512895+1 154402 g361 2006 1299b 717*2^512802+1 154372 p161 2008 1300 71*2^512745+1 154354 p152 2007 1301 70013*2^512206-1 154195 g276 2005 1302d 451*2^512076+1 154153 L153 2008 1303 692835*2^511792-1 154071 L138 2005 1304 41*2^511718-1 154045 L290 2007 1305 121125181*2^511347-1 153939 p92 2005 1306 117*2^511361-1 153938 L171 2007 1307d 453*2^511288+1 153916 L153 2008 1308 13131*2^511111-1 153864 L123 2005 1309 1307*2^511011+1 153833 L409 2007 1310 197*2^510940-1 153811 L167 2007 1311 357*2^510812-1 153773 g276 2006 1312 39*2^510595+1 153707 g267 2005 1313 243*2^510491-1 153676 L442 2007 1314 64059*2^510101+1 153561 gt 2001 1315b 487*2^509982+1 153523 L153 2008 1316 147*2^509831+1 153477 p189 2007 1317e 423*2^509720+1 153444 L203 2008 1318 289*2^509401-1 153348 L6 2005 1319c 651*2^509299+1 153318 p161 2008 1320a 5655*2^508993-1 153226 L268 2008 1321 19911001*2^508852+1 153188 g369 2005 1322b 853*2^508240+1 152999 p161 2008 1323b 659*2^508117+1 152962 p161 2008 1324 313*2^508091-1 152954 L79 2007 1325 (2^253987-1)^2-2 152916 p89 2007 1326a 5955*2^507890-1 152894 L268 2008 1327 207*2^507833-1 152876 L330 2007 1328 179*2^507816-1 152871 L145 2006 1329 125*2^507637+1 152817 p189 2007 1330 2*191^66971+1 152764 g404 2006 Divides Phi(191^66971,2) 1331e 253*2^507316+1 152720 p227 2008 1332 43541*2^507098-1 152657 g23 2000 1333 74528*5^218272-1 152571 p188 2006 1334 417*2^506332+1 152424 L203 2007 1335b 395*2^505679+1 152228 p227 2008 1336a 19725*2^505100+1 152055 L541 2008 1337 1224255*2^505050-1 152042 L434 2007 1338 1208955*2^505050-1 152042 L434 2007 1339 817263*2^505050-1 152042 L434 2007 1340 247005*2^505050-1 152041 L434 2007 1341 225507*2^505050-1 152041 L434 2007 1342 395*2^505000-1 152023 L56 2005 1343 2607*2^504959+1 152012 g61 2004 1344 600921*2^504799+1 151966 g337 2004 1345e 611*2^504751+1 151948 L153 2008 1346c 469*2^504610+1 151906 L153 2008 1347a 3389*2^504584-1 151899 L251 2008 1348e 611*2^504137+1 151764 L153 2008 1349e 507*2^504116+1 151757 L153 2008 1350b 863*2^504085+1 151748 p161 2008 1351e 2177*2^503892-1 151690 L268 2008 1352 9*2^503893-1 151688 L38 2004 1353 69*2^503641+1 151613 p114 2002 1354 44312*5^216837+1 151568 p215 2007 1355 89*2^503479+1 151565 p189 2006 1356 964387*2^502793-1 151362 g396 2005 1357 175*2^502646+1 151314 p189 2007 1358c 833*2^502165+1 151170 g267 2008 1359 289*2^501991-1 151117 L6 2005 1360 883*2^501779-1 151054 g219 2007 1361d 295*2^501770+1 151051 p161 2008 1362 99999999321741*2^501205+1 150892 L430 2007 1363 49*2^501238+1 150890 g402 2006 Generalized Fermat 1364 177*2^501106+1 150851 g226 2005 1365b 749*2^501083+1 150844 p161 2008 1366 1581823815*2^500591-1 150703 L83 2005 1367 604189*2^500578+1 150695 g118 2004 1368 211395*2^500025-1 150528 L402 2007 1369 4468523*2^500000-1 150522 L81 2006 1370 3868043*2^500000-1 150522 L81 2006 1371 3809145*2^500000-1 150522 L81 2006 1372 3404927*2^500000-1 150522 L81 2006 1373 2500725*2^500000-1 150522 L81 2006 1374 1972625*2^500000-1 150522 L81 2006 1375 1627497*2^500000-1 150522 L81 2006 1376 1035779*2^500000-1 150522 L81 2006 1377 995547*2^500000-1 150521 L81 2006 1378 367899*2^500000-1 150521 L81 2006 1379 14933*2^500001+1 150520 g305 2004 1380 2089*2^499951-1 150504 L261 2007 1381 135*2^499948+1 150502 g354 2005 1382 439*2^499662+1 150416 L153 2007 1383b 405405*2^499569-1 150391 L466 2008 1384 5775*2^499522+1 150375 p189 2007 1385 407*2^499431+1 150347 L203 2007 1386 73*2^499391-1 150334 L145 2006 1387f 61*2^499175-1 150269 L290 2007 1388 2995125705*2^499082-1 150249 L72 2005 1389 231*2^498961-1 150205 L87 2005 1390 3*346369#+1 150198 p16 2002 1391 471*2^498476+1 150059 L153 2007 1392 19580625*2^498383-1 150036 L71 2007 1393 429*2^498391+1 150034 L153 2007 1394 2*431^56947+1 150026 g404 2007 Divides Phi(431^56947,2) 1395 10^150008+4798974*10^75001+1 150009 D 2006 Palindrome 1396 10^150006+7426247*10^75000+1 150007 p5 2005 Palindrome 1397 2*1931^45605+1 149849 g404 2007 Divides Phi(1931^45605,2) 1398 243*2^495732+1 149233 L165 2007 Divides Fermat F(495728), GF(495726,3), GF(495728,6), GF(495727,12) 1399 81778*66^81778+1 148804 g157 2007 Generalized Cullen 1400 481899*2^481899+1 145072 gm 1998 Cullen 1401b 2*599^51983+1 144380 g404 2008 Divides Phi(599^51983,2) 1402 72048*10^144096+1 144101 g157 2005 Generalized Cullen 1403 34790!-1 142891 p85 2002 Factorial 1404 89*2^472099+1 142118 p114 2004 Divides Fermat F(472097) 1405 64872*145^64872+1 140218 g142 2005 Generalized Cullen 1406 10^140008+4546454*10^70001+1 140009 D 2005 Palindrome 1407 2*191^61303+1 139835 g404 2006 Divides Phi(191^61303,2) [g187] 1408 99*10^139670-1 139672 p200 2006 Near-repdigit 1409 292340*3^292340-1 139488 p120 2004 Generalized Woodall 1410 91848*33^91848+1 139478 g157 2006 Generalized Cullen 1411 9*2^461081+1 138801 g122 2003 Divides Fermat F(461076), GF(461077,3), GF(461077,6), GF(461077,12) 1412 61813*172^61813+1 138190 g407 2007 Generalized Cullen 1413 45*2^458712+1 138088 L170 2007 Divides GF(458709,5), GF(458710,6) [K] 1414 1061839*2^456790-1769267*2^340000-1 137514 p97 2007 Arithmetic progression (3,d=1061839*2^456789-1769267*2^340000) 1415 1061839*2^456789-1 137514 L81 2005 Arithmetic progression (2,d=1061839*2^456789-1769267*2^340000) 1416 76710*61^76710+1 136958 g157 2006 Generalized Cullen 1417 62378*141^62378+1 134069 g407 2007 Generalized Cullen 1418 74460*59^74460+1 131863 g157 2006 Generalized Cullen 1419 9*2^435743+1 131173 g122 2003 Divides GF(435742,10) 1420 58897*166^58897+1 130763 g407 2007 Generalized Cullen 1421c 9999992*10^130127-1 130134 p200 2008 Near-repdigit 1422 10^130036+116010611*10^65014+1 130037 D 2004 Palindrome 1423 10^130022+3761673*10^65008+1 130023 D 2004 Palindrome 1424 17*2^429319-197*2^202534-1 129240 p162 2005 Arithmetic progression (3,d=17*2^429318-197*2^202534) 1425 17*2^429318-1 129239 g267 2003 Arithmetic progression (2,d=17*2^429318-197*2^202534) [p162] 1426 10^127576+1081101080188810801011801*10^63776+1 127577 p185 2006 Tetradic, palindrome 1427 2*23^93337+1 127100 gb1 2006 Divides Phi(23^93337,2) 1428 2*4523^34421+1 125824 gb1 2004 Divides Phi(4523^34421,2) 1429 88900*26^88900+1 125797 g157 2005 Generalized Cullen 1430d 70615*60^70615+1 125569 g157 2008 Generalized Cullen 1431 2*359^49071+1 125382 g404 2007 Divides Phi(359^49071,2) 1432 107*2^414531+1 124789 g233 2005 Divides GF(414530,3) 1433 2*251^51905+1 124556 gb2 2006 Divides Phi(251^51905,2) 1434 61652*103^61652-1 124101 p120 2004 Generalized Woodall 1435 82960*31^82960+1 123729 g157 2002 Generalized Cullen 1436 1207*2^410108+1 123458 g380 2005 Divides Fermat F(410105) 1437 61012*104^61012+1 123069 g142 2005 Generalized Cullen 1438 56773*12^113546+1 122542 g392 2007 Generalized Cullen 1439 2*4079^33873+1 122301 gb2 2007 Divides Phi(4079^33873,2) 1440 89350*23^89350+1 121676 g157 2003 Generalized Cullen 1441 36635*1960^36635-1 120617 p117 2003 Generalized Woodall 1442 10^120016+1726271*10^60005+1 120017 D 2004 Palindrome 1443 10^120002+1617161*10^59998+1 120003 D 2004 Palindrome 1444 3*10^119292-1 119293 p135 2006 Near-repdigit 1445e 69*2^394574+1 118781 p219 2008 Divides GF(394572,12) 1446 64227*2^385362-1 116011 p77 2003 Generalized Woodall 1447f 2*491^42801+1 115182 g404 2007 Divides Phi(491^42801,2) 1448 3*2^382449+1 115130 g132 1999 Divides Fermat F(382447), GF(382447,3), GF(382447,12), GF(382443,6) 1449 119*2^376951+1 113476 g233 2006 Divides GF(376950,12) 1450 8511*2^374486-1 112736 p77 2003 Generalized Woodall 1451 45*2^368554-405769059*2^180009-1 110948 p108 2003 Arithmetic progression (3,d=45*2^368553-405769059*2^180009) 1452 45*2^368553-1 110948 L4 2003 Arithmetic progression (2,d=45*2^368553-405769059*2^180009) [p108] 1453 2^364289-2^182145+1 109662 p58 2001 Gaussian Mersenne norm 35 1454 3*2^362765+1 109204 g245 2002 Divides GF(362763,12), GF(362764,10) 1455 2*8039^27953+1 109163 gb1 2004 Divides Phi(8039^27953,2) 1456 75*2^361614+1 108859 p114 2004 Divides GF(361612,10) 1457 361275*2^361275+1 108761 DS 1998 Cullen 1458 995*10^107888-1 107891 p218 2007 Near-repdigit 1459 26951!+1 107707 p65 2002 Factorial 1460 17883*2^357662-1 107672 p103 2003 Generalized Woodall 1461 9*10^107663-1 107664 p122 2004 Near-repdigit 1462 945*2^353727+1 106486 p114 2006 Divides GF(353724,12) 1463d 10^105022+523111325*10^52507+1 105023 D 2008 Palindrome 1464a 10^105018+920383029*10^52505+1 105019 D 2008 Palindrome 1465e 10^105016+318939813*10^52504+1 105017 D 2008 Palindrome 1466b 10^105014+682787286*10^52503+1 105015 D 2008 Palindrome 1467d 10^105014+424787424*10^52503+1 105015 D 2008 Palindrome 1468d 10^105010+362292263*10^52501+1 105011 D 2008 Palindrome 1469b 10^105002+474575474*10^52497+1 105003 D 2008 Palindrome 1470 10^104281-10^52140-1 104281 p16 2003 Near-repdigit, palindrome 1471 163*2^343190+1 103313 g258 2005 Divides GF(343189,10) 1472 1769267*2^340000-1 102357 L4 2003 Arithmetic progression (1,d=1061839*2^456789-1769267*2^340000) 1473 485*2^338297+1 101841 L203 2007 Divides Fermat F(338295) [K] 1474f 28782838101*2^333333-1 100354 L453 2007 Arithmetic progression (3,d=3371818539*2^333335) [g282] 1475 26273597661*2^333333-1 100354 L329 2007 Arithmetic progression (3,d=38478921*2^333341) [g282] 1476 16422993885*2^333333-1 100354 L392 2007 Arithmetic progression (2,d=38478921*2^333341) [g282] 1477 15295563945*2^333333-1 100354 L271 2007 Arithmetic progression (2,d=3371818539*2^333335) [g282] 1478 14470366551*2^333333-1 100354 L315 2007 Arithmetic progression (1,d=168667635*2^333334) [g348] 1479 6572390109*2^333333-1 100354 L255 2007 Arithmetic progression (1,d=38478921*2^333341) [g282] 1480 1808289789*2^333333-1 100353 L212 2007 Arithmetic progression (1,d=3371818539*2^333335) [g282] 1481 54528*69^54528-1 100274 p120 2004 Generalized Woodall 1482 10^100000-10^61403-1 100000 p62 2001 Near-repdigit 1483 225*2^331990+1 99942 p43 2005 Generalized Fermat, divides GF(331986,5) 1484 2*107^48043+1 97498 gb1 2004 Divides Phi(107^48042,2) 1485 2*419^36895+1 96747 g404 2007 Divides Phi(419^36895,2) 1486 2*258443^17865+1 96693 gb1 2004 Divides Phi(258443^17865,2) 1487 46225*116^46225-1 95435 p120 2003 Generalized Woodall 1488 10^95019-10^47509-1 95019 p16 2003 Near-repdigit, palindrome 1489 99999*10^94039-1 94044 p199 2006 Near-repdigit 1490 891*2^311033+1 93634 p114 2005 Divides GF(311032,10) 1491 2*431^35355+1 93143 g404 2007 Divides Phi(431^35355,2) 1492 99999*10^92226-1 92231 p199 2006 Near-repdigit 1493 9*2^304607+1 91697 g23 1998 Divides GF(304604,6) 1494 3*2^303093+1 91241 Y 1998 Divides Fermat F(303088); GF(303088,3), GF(303086,6), GF(303092,10), GF(303088,12), GF(303092,5) [g0] 1495 48820*72^48820-1 90680 p110 2003 Generalized Woodall 1496 2*1787^27863+1 90615 gb1 2004 Divides Phi(1787^27863,2) 1497 15*2^300488+1 90458 p114 2002 Divides GF(300479,6), GF(300484,10) 1498 1011*2^290748+1 87527 L80 2006 Divides GF(290746,12) 1499 99995*10^87092-1 87097 p199 2006 Near-repdigit 1500 29978*777^29978-1 86654 g267 2002 Generalized Woodall 1501 211*2^287388+1 86515 p43 2004 Divides Fermat F(287384) 1502 357*2^286672+1 86300 p161 2005 Divides GF(286670,6) 1503 26082*1960^26082-1 85874 p117 2003 Generalized Woodall 1504 5*10^85142-1 85143 g243 2005 Near-repdigit 1505 51*2^282719+1 85109 g196 2002 Divides Fermat F(282717) 1506 21480!-1 83727 p65 2001 Factorial 1507 41*2^274897+1 82754 g305 2004 Divides GF(274896,10) 1508 63*2^270094+1 81309 gt 2002 Divides Fermat F(270091) 1509 (10^40293-1)^2-2 80586 p48 2004 Near-repdigit 1510 18740*3^168662-1 80477 p120 2004 Generalized Woodall 1511 46640*51^46640-1 79646 p120 2004 Generalized Woodall 1512 262419*2^262419+1 79002 DS 1998 Cullen 1513 5*10^78790-1 78791 g243 2005 Near-repdigit 1514c 71761*12^71761-1 77448 x37 2008 Generalized Woodall 1515 53846*3^161539-1 77079 p120 2004 Generalized Woodall 1516 8*10^74318-1 74319 g243 2004 Near-repdigit 1517 99995*10^73668-1 73673 p199 2006 Near-repdigit 1518 5*2^240937+1 72530 Y 1997 Divides GF(240936,5) [g0] 1519 10^72500-7*10^25509-1 72500 p48 2003 Near-repdigit 1520 96*10^71600-1 71602 p194 2006 Near-repdigit 1521 34130*124^34130-1 71454 p120 2004 Generalized Woodall 1522 25093*666^25093-1 70854 p173 2005 Generalized Woodall 1523 99998*10^69842-1 69847 p199 2006 Near-repdigit 1524 165*2^230803+1 69481 g196 2002 Divides GF(230801,12) [p50] 1525 45153*34^45153-1 69156 g112 2001 Generalized Woodall 1526 73*2^227334+1 68437 gt 1999 Divides GF(227333,12) 1527 37*2^218550+1 65792 g67 2001 Divides GF(218547,5), GF(218549,12) 1528 93*10^65121-1 65123 p194 2006 Near-repdigit 1529 2^216091-1 65050 S 1985 Mersenne 31 1530 3*2^213321+1 64217 Y 1997 Divides Fermat F(213319); GF(213319,5), GF(213316,6), GF(213319,12) [g0] 1531 145823#+1 63142 p21 2000 Primorial 1532 659*2^204273+1 61496 p161 2005 Divides GF(204271,10) 1533 2^203789+2^101895+1 61347 O 2000 Gaussian Mersenne norm 34 1534 197*2^202534-1 60972 L40 2004 Arithmetic progression (1,d=17*2^429318-197*2^202534) [p162] 1535 2003663613*2^195000+1 58711 L202 2007 Twin (p+2) 1536 2003663613*2^195000-1 58711 L202 2007 Twin (p) 1537 48047305725*2^172404-1 51910 L99 2007 Sophie Germain (2p+1) 1538 48047305725*2^172403-1 51910 L99 2007 Sophie Germain (p) 1539 137211941292195*2^171961-1 51780 x24 2006 Sophie Germain (2p+1) 1540 194772106074315*2^171960+1 51780 x24 2007 Twin (p+2) 1541 194772106074315*2^171960-1 51780 x24 2007 Twin (p) 1542 137211941292195*2^171960-1 51780 x24 2006 Sophie Germain (p) 1543 100314512544015*2^171960+1 51780 x24 2006 Twin (p+2) 1544 100314512544015*2^171960-1 51780 x24 2006 Twin (p) 1545 16869987339975*2^171960+1 51779 x24 2005 Twin (p+2) 1546 16869987339975*2^171960-1 51779 x24 2005 Twin (p) 1547 33218925*2^169690+1 51090 g259 2002 Twin (p+2) 1548 33218925*2^169690-1 51090 g259 2002 Twin (p) 1549 2^160423-2^80212+1 48293 O 2000 Gaussian Mersenne norm 33 1550 primV(40395,-1,15588) 47759 x23 2007 Generalized Lucas primitive part 1551 3*2^157169+1 47314 Y 1995 Divides Fermat F(157167); GF(157167,3), GF(157168,5), GF(157163,6), GF(157168,10), GF(157167,12) [g0] 1552 primV(53394,-1,15264) 47200 CH4 2007 Generalized Lucas primitive part 1553 151023*2^151023-1 45468 g25 1998 Woodall 1554 57*2^146223+1 44020 g92 2000 Divides Fermat F(146221) 1555 71509*2^143019-1 43058 g23 1998 Woodall, arithmetic progression (2,d=(143018*2^83969-80047)*2^59049) [x12] 1556 159*2^142462+1 42888 g97 2001 Divides Fermat F(142460) 1557 2^132049-1 39751 S 1983 Mersenne 30 1558 371*2^127419+1 38360 g50 2001 Divides GF(127416,10) 1559 5*2^125413+1 37754 Y 1995 Divides Fermat F(125410); GF(125410,5), GF(125408,10) [g0]; GF(125410,5) [p50] 1560 491*2^123281+1 37114 p109 2001 Divides GF(123280,10) 1561 (28839^8317-1)/28838 37090 CH6 2006 Generalized repunit 1562 7068555*2^121302-1 36523 L100 2005 Sophie Germain (2p+1) 1563 7068555*2^121301-1 36523 L100 2005 Sophie Germain (p) 1564 primV(38513,-1,11502) 34668 x23 2006 Generalized Lucas primitive part 1565 2540041185*2^114730-1 34547 g294 2003 Sophie Germain (2p+1) 1566 2540041185*2^114729-1 34547 g294 2003 Sophie Germain (p) 1567 60194061*2^114689+1 34533 g294 2002 Twin (p+2) 1568 60194061*2^114689-1 34533 g294 2002 Twin (p) 1569 primV(9008,1,16200) 34168 x23 2005 Generalized Lucas primitive part 1570 2^110503-1 33265 WC 1988 Mersenne 29 1571 1124044292325*2^108000-1 32524 L99 2006 Sophie Germain (2p+1) 1572 1124044292325*2^107999-1 32523 L99 2006 Sophie Germain (p) 1573 112886032245*2^108001-1 32523 L99 2006 Sophie Germain (2p+1) 1574 112886032245*2^108000-1 32523 L99 2006 Sophie Germain (p) 1575 1765199373*2^107520+1 32376 g182 2002 Twin (p+2) 1576 1765199373*2^107520-1 32376 g182 2002 Twin (p) 1577 318032361*2^107001+1 32220 p100 2001 Twin (p+2) 1578 318032361*2^107001-1 32220 p100 2001 Twin (p) 1579 2^106693+2^53347+1 32118 O 2000 Gaussian Mersenne norm 32 1580 primV(10987,1,14400) 31034 x25 2005 Generalized Lucas primitive part 1581 1046619117*2^100000+1 30113 L467 2007 Twin (p+2) 1582 1046619117*2^100000-1 30113 L467 2007 Twin (p) 1583 49363*2^98727-1 29725 Y 1997 Woodall 1584b U(2341,-1,8819) 29712 x25 2008 Generalized Lucas number 1585 18912879*2^98396-1 29628 p94 2002 Sophie Germain (2p+1) 1586 18912879*2^98395-1 29628 p94 2002 Sophie Germain (p) 1587 1807318575*2^98305+1 29603 g216 2001 Twin (p+2) 1588 1807318575*2^98305-1 29603 g216 2001 Twin (p) 1589 primV(24127,-1,6718) 29433 CH3 2005 Generalized Lucas primitive part 1590 U(16531,1,6721)-U(16531,1,6720) 28347 x36 2007 Lehmer number 1591 90825*2^90825+1 27347 Y 1997 Cullen 1592 primV(5673,1,13500) 27028 CH3 2005 Generalized Lucas primitive part 1593 primV(44368,1,9504) 26768 CH3 2005 Generalized Lucas primitive part 1594 primV(10986,-1,9756) 26185 x23 2005 Generalized Lucas primitive part 1595 2^86243-1 25962 S 1982 Mersenne 28 1596 primV(11076,-1,12000) 25885 x25 2005 Generalized Lucas primitive part 1597 2^85237+2^42619+1 25659 x16 2000 Gaussian Mersenne norm 31 1598 primV(42,-1,23376) 25249 x23 2007 Generalized Lucas primitive part 1599 primV(7577,-1,10692) 25140 x33 2007 Generalized Lucas primitive part 1600 primV(44573,-1,10125) 25105 CH4 2007 Generalized Lucas primitive part 1601 10495740081*2^83126-1 25034 L99 2006 Sophie Germain (2p+1) 1602 10495740081*2^83125-1 25034 L99 2006 Sophie Germain (p) 1603 7473214125*2^83125+1 25033 L99 2006 Twin (p+2) 1604 7473214125*2^83125-1 25033 L99 2006 Twin (p) 1605 11694962547*2^83124+1 25033 L99 2006 Twin (p+2) 1606 11694962547*2^83124-1 25033 L99 2006 Twin (p) 1607 58950603*2^83130+1 25033 L99 2006 Twin (p+2) 1608 58950603*2^83130-1 25033 L99 2006 Twin (p) 1609 61078155*2^82003-1 24694 L99 2006 Sophie Germain (2p+1) 1610 61078155*2^82002-1 24693 L99 2006 Sophie Germain (p) 1611 primV(19285,1,10800) 24683 x25 2005 Generalized Lucas primitive part 1612 (13096^5953-1)/13095 24506 CH6 2007 Generalized repunit 1613 1213822389*2^81132-1 24433 g250 2002 Sophie Germain (2p+1) 1614 1213822389*2^81131-1 24432 g250 2002 Sophie Germain (p) 1615 primV(2425,1,13500) 24370 x23 2006 Generalized Lucas primitive part 1616 5583295473*2^80828+1 24342 g336 2006 Twin (p+2) 1617 5583295473*2^80828-1 24342 g336 2006 Twin (p) 1618 134583*2^80828+1 24337 L99 2005 Twin (p+2) 1619 134583*2^80828-1 24337 L99 2005 Twin (p) 1620 665551035*2^80025+1 24099 g216 2000 Twin (p+2) 1621 665551035*2^80025-1 24099 g216 2000 Twin (p) 1622 3853775193*2^80001+1 24093 L109 2007 Cunningham chain 2nd kind (2p-1) 1623 3853775193*2^80000+1 24092 L109 2007 Cunningham chain 2nd kind (p) 1624 primV(14261,1,10800) 23928 x23 2005 Generalized Lucas primitive part 1625 primV(13964,1,8856) 23876 CH3 2005 Generalized Lucas primitive part 1626 primV(3464,1,6722) 23786 x23 2006 Generalized Lucas primitive part 1627 1504084599*2^78342+1 23593 g290 2004 Cunningham chain 2nd kind (2p-1) 1628 964487139*2^78342+1 23593 g290 2004 Cunningham chain 2nd kind (2p-1) 1629 1504084599*2^78341+1 23593 g290 2004 Cunningham chain 2nd kind (p) 1630 964487139*2^78341+1 23592 g290 2004 Cunningham chain 2nd kind (p) 1631 6917!-1 23560 g1 1998 Factorial 1632 2^77291+2^38646+1 23267 O 2000 Gaussian Mersenne norm 30 1633 primV(3711,1,9882) 23131 x25 2005 Generalized Lucas primitive part 1634 (5855^6121-1)/5854 23058 CH1 2005 Generalized repunit 1635 primV(20384,1,5281) 22754 x25 2003 Generalized Lucas primitive part, cyclotomy 1636 U(19258,-1,5039) 21586 x23 2007 Generalized Lucas number 1637 6380!+1 21507 g1 1998 Factorial 1638 U(15631,1,5040)-U(15631,1,5039) 21134 x25 2003 Lehmer number 1639 2566851867*2^70002-1 21083 L109 2007 Sophie Germain (2p+1) 1640 2566851867*2^70001-1 21082 L109 2007 Sophie Germain (p) 1641 1046886225*2^70000+1 21082 p146 2004 Twin (p+2) 1642 1046886225*2^70000-1 21082 p146 2004 Twin (p) 1643 ((((((2521008887^3+80)^3+12)^3+450)^3+894)^3+3636)^3+70756)^3+97220 20562 FE1 2006 ECPP, Mills' prime 1644 U(11200,-1,5039) 20400 x25 2004 Generalized Lucas number, cyclotomy 1645b 1294767*2^67708+1 20389 L434 2008 Twin (p+2) 1646b 1294767*2^67708-1 20389 L434 2008 Twin (p) 1647 8544353655*2^66666+1 20079 p182 2005 Twin (p+2) 1648 8544353655*2^66666-1 20079 p182 2005 Twin (p) 1649 8179665447*2^66666+1 20079 p182 2006 Twin (p+2) 1650 8179665447*2^66666-1 20079 p182 2006 Twin (p) 1651 1040131975*2^66459+3 20016 g258 2007 Sophie Germain (2p+1) 1652 1040131975*2^66458+1 20015 g258 2007 Sophie Germain (p) 1653 109433307*2^66453-1 20013 g205 2001 Sophie Germain (2p+1) 1654 109433307*2^66452-1 20013 g205 2001 Sophie Germain (p) 1655 984798015*2^66445-1 20011 g205 2001 Sophie Germain (2p+1) 1656 984798015*2^66444-1 20011 g205 2001 Sophie Germain (p) 1657 (14261^4663-1)/14260 19367 c13 2007 Generalized repunit 1658 U(6584,-1,5039) 19238 x23 2007 Generalized Lucas number 1659 (13782^4591-1)/13781 19000 c13 2007 Generalized repunit 1660 (15637^4513-1)/15636 18925 c13 2007 Generalized repunit 1661 42209#+1 18241 p8 1999 Primorial 1662 3714089895285*2^60001-1 18075 IJW 2000 Sophie Germain (2p+1) 1663 3714089895285*2^60000-1 18075 IJW 2000 Sophie Germain (p) 1664 7457*2^59659+1 17964 Y 1997 Cullen 1665 (18067^4201-1)/18066 17879 c13 2002 Generalized repunit 1666e 3379174665*2^58503-1 17621 L402 2008 Sophie Germain (2p+1) 1667e 3379174665*2^58502-1 17621 L402 2008 Sophie Germain (p) 1668c (19026^4051-1)/19025 17332 c13 2008 Generalized repunit 1669 U(9657,1,4321)-U(9657,1,4320) 17215 x23 2005 Lehmer number 1670 909004827*2^56790-1 17105 g336 2005 Sophie Germain (2p+1) 1671 787302705*2^56790+1 17105 g336 2005 Cunningham chain 2nd kind (2p-1) 1672 909004827*2^56789-1 17105 g336 2005 Sophie Germain (p) 1673 787302705*2^56789+1 17105 g336 2005 Cunningham chain 2nd kind (p) 1674 U(81839) 17103 p54 2001 Fibonacci number 1675 (4735^4621-1)/4734 16980 CH3 2005 Generalized repunit 1676 (11031^4177-1)/11030 16882 p54 2005 Generalized repunit 1677 1162665081*2^55650-1 16762 L6 2004 Sophie Germain (2p+1) 1678 1162665081*2^55649-1 16762 L6 2004 Sophie Germain (p) 1679 U(15823,1,3960)-U(15823,1,3959) 16625 x25 2002 Lehmer number, cyclotomy 1680 U(10803,1,4081)-U(10803,1,4080) 16457 x25 2005 Lehmer number, cyclotomy 1681 U(11091,-1,4049) 16375 CH3 2005 Generalized Lucas number 1682 790717071*2^54255-1 16342 L25 2007 Sophie Germain (2p+1) 1683 790717071*2^54254-1 16341 L25 2007 Sophie Germain (p) 1684 U(2554,-1,4751) 16185 CH3 2005 Generalized Lucas number 1685 U(1599,-1,5039) 16141 x23 2007 Generalized Lucas number 1686 40931485*2^53124-3 16000 p222 2007 Cunningham chain 2nd kind (2p-1) 1687 40931485*2^53123-1 16000 p222 2007 Cunningham chain 2nd kind (p) 1688 U(10853,1,3960)+U(10853,1,3959) 15977 x25 2002 Lehmer number, cyclotomy 1689 U(9667,1,3960)-U(9667,1,3959) 15778 x25 2002 Lehmer number, cyclotomy 1690 U(14257,-1,3779) 15694 x25 2004 Generalized Lucas number, cyclotomy 1691 (15134^3697-1)/15133 15450 CH6 2007 Generalized repunit 1692c (16339^3613-1)/16338 15219 c13 2008 Generalized repunit 1693 2638^4405+4405^2638 15071 FE3 2004 ECPP 1694 4127632557*2^50002-1 15062 L109 2007 Sophie Germain (2p+1) 1695 4127632557*2^50001-1 15062 L109 2007 Sophie Germain (p) 1696 (7372^3889-1)/7371 15038 CH6 2007 Generalized repunit 1697 U(8747,1,3780)+U(8747,1,3779) 14897 x25 2005 Lehmer number 1698 U(25700,1,3360)+U(25700,1,3359) 14813 x25 2004 Lehmer number, cyclotomy 1699 2^49207-2^24604+1 14813 x16 2000 Gaussian Mersenne norm 29 1700 (15679^3499-1)/15678 14676 x25 2003 Generalized repunit 1701 U(1493,-1,4621) 14665 CH3 2005 Generalized Lucas number 1702 U(4951,1,3960)-U(4951,1,3959) 14628 CH3 2005 Lehmer number 1703 (2728^4231-1)/2727 14534 c13 2007 Generalized repunit 1704 U(12924,-12925,3499) 14382 x25 2005 Generalized Lucas number, KP proof 1705 (8185^3673-1)/8184 14369 c13 2003 Generalized repunit 1706 U(12113,-1,3499) 14284 CH3 2005 Generalized Lucas number 1707 U(5192,1,3841)-U(5192,1,3840) 14267 x23 2005 Lehmer number 1708c (3894^3967-1)/3893 14240 c13 2008 Generalized repunit 1709 U(2441,-1,4201) 14228 CH3 2005 Generalized Lucas number 1710 U(3865,1,3960)+U(3865,1,3959) 14202 x25 2002 Lehmer number, cyclotomy 1711 U(3645,1,3841)-U(3645,1,3840) 13677 x25 2005 Lehmer number 1712 U(11194,-11195,3361) 13605 x25 2004 Generalized Lucas number 1713 U(2219,-1,4049) 13546 CH3 2005 Generalized Lucas number 1714 (12432^3301-1)/12431 13512 c13 2003 Generalized repunit 1715 U(475,-1,5039) 13486 x25 2003 Generalized Lucas number, cyclotomy 1716 (11398^3319-1)/11397 13461 c13 2007 Generalized repunit 1717 2^44497-1 13395 SN 1979 Mersenne 27 1718 U(7644,1,3421)-U(7644,1,3420) 13281 CH3 2005 Lehmer number 1719 (2963^3821-1)/2962 13263 CH2 2005 Generalized repunit 1720 U(10206,1,3276)-U(10206,1,3275) 13130 x23 2005 Lehmer number 1721 U(7537,-7538,3361) 13028 x23 2007 Generalized Lucas number 1722 U(7512,-7513,3361) 13023 x25 2004 Generalized Lucas number 1723 U(2783,-1,3779) 13014 CH3 2005 Generalized Lucas number 1724 U(7128,-1,3361) 12946 x25 2004 Generalized Lucas number, cyclotomy 1725 (2^42737+1)/3 12865 M 2007 ECPP, generalized Lucas number, Wagstaff 1726 U(12159,1,3150)-U(12159,1,3149) 12864 x25 2005 Lehmer number, cyclotomy 1727 U(5485,1,3421)+U(5485,1,3420) 12788 CH3 2005 Lehmer number 1728 (V(49596,1,3375)+1)/(V(49596,1,675)+1) 12678 x25 2006 Lehmer primitive part 1729 (V(47025,1,3375)-1)/(V(47025,1,675)-1) 12616 x25 2006 Lehmer primitive part 1730 (V(44524,1,3375)-1)/(V(44524,1,675)-1) 12552 x23 2006 Lehmer primitive part 1731 U(6393,1,3276)-U(6393,1,3275) 12464 x25 2005 Lehmer number, cyclotomy 1732 (V(37511,1,3375)-1)/(V(37511,1,675)-1) 12351 x25 2006 Lehmer primitive part 1733 (V(32362,1,3375)+1)/(V(32362,1,675)+1) 12178 x23 2006 Lehmer primitive part 1734 U(4857,1,3300)-U(4857,1,3299) 12162 x25 2005 Lehmer number, cyclotomy 1735 (V(30226,1,3375)-1)/(V(30226,1,675)-1) 12098 x25 2006 Lehmer primitive part 1736 primV(57724) 12063 p54 2001 Lucas primitive part, cyclotomy 1737 U(5989,1,3169)-U(5989,1,3168) 11967 x25 2005 Lehmer number 1738e 111871891*27751#+1 11961 p155 2008 Arithmetic progression (4,d=3624707*27751#) 1739 103098395*27751#+1 11961 p155 2007 Arithmetic progression (4,d=809963*27751#) 1740 102293041*27751#+1 11961 p155 2007 Arithmetic progression (4,d=412064*27751#) 1741 V(56003) 11704 p193 2006 Lucas number 1742 primU(67825) 11336 x23 2007 Fibonacci primitive part 1743 3610!-1 11277 C 1993 Factorial 1744 (V(11258,1,3375)+1)/(V(11258,1,675)+1) 10939 x23 2006 Lehmer primitive part 1745 3507!-1 10912 C 1992 Factorial 1746 (V(10638,1,3375)-1)/(V(10638,1,675)-1) 10873 x25 2006 Lehmer primitive part 1747 (V(983,1,3609)-1)/(V(983,1,9)-1) 10774 x23 2006 Lehmer primitive part 1748 primV(77058) 10729 CH3 2005 Lucas primitive part 1749 (V(9352,1,3375)+1)/(V(9352,1,675)+1) 10722 x25 2005 Lehmer primitive part 1750 V(51169) 10694 p54 2001 Lucas number 1751 U(50833) 10624 CH4 2005 Fibonacci number 1752 46915147*2^35000+1 10544 p43 2007 Arithmetic progression (4,d=9548007*2^35000) 1753 (V(7792,1,3375)-1)/(V(7792,1,675)-1) 10508 x25 2006 Lehmer primitive part 1754 primV(77841) 10496 x25 2005 Lucas primitive part 1755 (V(812,1,3609)+1)/(V(812,1,9)+1) 10475 x25 2006 Lehmer primitive part 1756 24029#+1 10387 C 1993 Primorial 1757 23801#+1 10273 C 1993 Primorial 1758 1234^3265+3265^1234 10094 FE1 2005 ECPP 1759 2739^2930+2930^2739 10073 FE1 2005 ECPP 1760 409331735*2^33333+1 10043 p155 2007 Arithmetic progression (4,d=104086947*2^33333) 1761 648^3571+3571^648 10041 M 2003 ECPP 1762 10^9999+33603 10000 FE2 2003 ECPP 1763 (V(8259,1,2517)-1)/(V(8259,1,3)-1) 9848 x25 2005 Lehmer primitive part 1764 32469*2^32469+1 9779 MM 1997 Cullen 1765 8073*2^32294+1 9726 MM 1997 Cullen 1766 V(44507) 9302 CH3 2005 Lucas number 1767 2658^2659+2659^2658 9106 FE1 2005 ECPP 1768 13^8148+2716^2197 9077 M 2005 ECPP 1769 (V(2247,1,3375)-1)/(V(2247,1,675)-1) 9050 x25 2006 Lehmer primitive part 1770 (V(3798,1,2529)-1)/(V(3798,1,9)-1) 9021 x25 2006 Lehmer primitive part 1771 2319^2680+2680^2319 9020 M 2004 ECPP 1772 (V(8162,1,2307)-1)/(V(8162,1,3)-1) 9013 x25 2005 Lehmer primitive part 1773 (V(8019,1,2307)-1)/(V(8019,1,3)-1) 8996 x25 2005 Lehmer primitive part 1774 (V(14312,1,2151)+1)/(V(14312,1,9)+1) 8902 x25 2005 Lehmer primitive part 1775 (V(2775,1,2529)+1)/(V(2775,1,9)+1) 8678 x25 2006 Lehmer primitive part 1776 (V(2313,1,2529)+1)/(V(2313,1,9)+1) 8478 x25 2006 Lehmer primitive part 1777 2^27529-2^13765+1 8288 O 2000 Gaussian Mersenne norm 28 1778 primV(39124) 8176 CH3 2005 Lucas primitive part 1779 1647^2518+2518^1647 8100 FE1 2005 ECPP 1780 197^3514+3514^197 8063 M 2004 ECPP 1781 1995^2438+2438^1995 8046 FE1 2003 ECPP 1782 18523#+1 8002 D 1989 Primorial 1783 10094619255896577743...(7956 other digits)...63761949451171033763 7996 FE1 2005 Stop gap, ECPP 1784 10094619255896577743...(7956 other digits)...63761949451170696317 7996 FE1 2005 Start gap, ECPP 1785 18517#+39317 7993 c35 2005 ECPP 1786 164210699973*2^26328-1 7937 p158 2006 Cunningham chain (4p+3) 1787 164210699973*2^26327-1 7937 p158 2006 Cunningham chain (2p+1) 1788 164210699973*2^26326-1 7937 p158 2006 Cunningham chain (p) 1789 U(37511) 7839 x13 2005 Fibonacci number 1790 -E(2762)/2670541 7760 c11 2004 Euler irregular, ECPP 1791 V(36779) 7687 CH3 2005 Lucas number 1792 197418203*2^25000+6089 7535 FE4 2005 ECPP, consecutive primes arithmetic progression (3,d=6090) 1793 197418203*2^25000-1 7535 p164 2005 Consecutive primes arithmetic progression (2,d=6090) 1794 197418203*2^25000-6091 7535 FE4 2005 ECPP, consecutive primes arithmetic progression (1,d=6090) 1795 U(35999) 7523 p54 2001 Fibonacci number, cyclotomy 1796 17443#/2-2^17443 7508 c43 2007 ECPP 1797 V(35449) 7409 p12 2001 Lucas number 1798 87*2^24582+2579 7402 c31 2004 ECPP, consecutive primes arithmetic progression (3,d=1290) 1799 87*2^24582+1289 7402 c31 2004 ECPP, consecutive primes arithmetic progression (2,d=1290) 1800 87*2^24582-1 7402 g106 1999 Consecutive primes arithmetic progression (1,d=1290) [c31] 1801 V(34759)/27112021 7257 c33 2005 Lucas cofactor, ECPP 1802 Phi(9455,-10) 7200 c33 2005 Unique, ECPP 1803 2^23209-1 6987 N 1979 Mersenne 26 1804 primA(82975) 6935 p54 2001 Lucas Aurifeuillian primitive part 1805 23005*2^23005-1 6930 Y 1997 Woodall 1806 22971*2^22971-1 6920 Y 1997 Woodall 1807 15877#-1 6845 CD 1992 Primorial 1808 Phi(10887,10) 6841 c33 2005 Unique, ECPP 1809 primV(48381) 6741 x23 2005 Lucas primitive part 1810 primU(40295) 6737 p12 2001 Fibonacci primitive part 1811 primV(39700) 6621 p54 2001 Lucas primitive part 1812 2^21701-1 6533 NN 1978 Mersenne 25 1813 U(30757) 6428 p54 2001 Fibonacci number, cyclotomy 1814 U(30671)/1141737296775689 6395 c41 2005 Fibonacci cofactor, ECPP 1815 Phi(7357,-10) 6301 c33 2004 Unique, ECPP 1816e 5612052289*14489#/5+5 6223 c18 2008 Triplet (3), ECPP 1817e 5612052289*14489#/5+1 6223 p41 2008 Triplet (2) 1818e 5612052289*14489#/5-1 6223 p41 2008 Triplet (1) 1819 4811*2^20219+1 6091 DM 1996 Consecutive primes arithmetic progression (3,d=3738) [c36] 1820 4811*2^20219-3737 6091 c36 2004 ECPP, consecutive primes arithmetic progression (2,d=3738) 1821 4811*2^20219-7475 6091 c36 2004 ECPP, consecutive primes arithmetic progression (1,d=3738) 1822 3020255265*2^20025-1 6038 p133 2005 Cunningham chain (4p+3) 1823 3020255265*2^20024-1 6038 p133 2005 Cunningham chain (2p+1) 1824 3020255265*2^20023-1 6038 p133 2005 Cunningham chain (p) 1825 primV(28844) 6028 p12 2001 Lucas primitive part 1826 13649#+1 5862 D 1987 Primorial 1827 18885*2^18885-1 5690 K 1987 Woodall 1828 1963!-1 5614 CD 1992 Factorial 1829 13033#-1 5610 CD 1992 Primorial 1830 289*2^18502+1 5573 K 1984 Cullen, generalized Fermat 1831 p(24512858) 5508 c42 2007 Partitions, ECPP 1832 p(24503300) 5507 c42 2007 Partitions, ECPP 1833 U(25561) 5342 p54 2001 Fibonacci number 1834 p(23010067) 5336 c42 2007 Partitions, ECPP 1835 primV(25504) 5324 F3 2001 Lucas primitive part, APR-CL assisted 1836 p(22312025) 5254 c39 2007 Partitions, ECPP 1837 2366867925*2^17208+1 5190 p133 2004 Cunningham chain 2nd kind (4p-3) 1838 (99241437759*205881*4001#*(205881*4001#+1)+210)*(205881*4001#-1)/35+7 5132 p179 2006 Triplet (3) 1839 (99241437759*205881*4001#*(205881*4001#+1)+210)*(205881*4001#-1)/35+5 5132 p179 2006 Triplet (2) 1840 (99241437759*205881*4001#*(205881*4001#+1)+210)*(205881*4001#-1)/35+1 5132 p179 2006 Triplet (1) 1841 (91456744909*205881*4001#*(205881*4001#+1)+210)*(205881*4001#-1)/35+11 5132 p179 2006 Triplet (3) 1842 (91456744909*205881*4001#*(205881*4001#+1)+210)*(205881*4001#-1)/35+7 5132 p179 2006 Triplet (2) 1843 (91456744909*205881*4001#*(205881*4001#+1)+210)*(205881*4001#-1)/35+5 5132 p179 2006 Triplet (1) 1844 (84055657369*205881*4001#*(205881*4001#+1)+210)*(205881*4001#-1)/35+13 5132 p179 2006 Consecutive primes arithmetic progression (3,d=6) 1845 (84055657369*205881*4001#*(205881*4001#+1)+210)*(205881*4001#-1)/35+7 5132 p179 2006 Consecutive primes arithmetic progression (2,d=6) 1846 (84055657369*205881*4001#*(205881*4001#+1)+210)*(205881*4001#-1)/35+1 5132 p179 2006 Consecutive primes arithmetic progression (1,d=6) 1847 (63140956174*205881*4001#*(205881*4001#+1)+210)*(205881*4001#-1)/35+7 5132 p179 2005 Triplet (3) 1848 (63140956174*205881*4001#*(205881*4001#+1)+210)*(205881*4001#-1)/35+5 5132 p179 2005 Triplet (2) 1849 (63140956174*205881*4001#*(205881*4001#+1)+210)*(205881*4001#-1)/35+1 5132 p179 2005 Triplet (1) 1850 (63095588824*205881*4001#*(205881*4001#+1)+210)*(205881*4001#-1)/35+13 5132 p179 2005 Triplet (3) 1851 (63095588824*205881*4001#*(205881*4001#+1)+210)*(205881*4001#-1)/35+11 5132 p179 2005 Triplet (2) 1852 (63095588824*205881*4001#*(205881*4001#+1)+210)*(205881*4001#-1)/35+7 5132 p179 2005 Triplet (1) 1853 (61310346529*205881*4001#*(205881*4001#+1)+210)*(205881*4001#-1)/35+13 5132 p179 2005 Consecutive primes arithmetic progression (3,d=6) 1854 (61310346529*205881*4001#*(205881*4001#+1)+210)*(205881*4001#-1)/35+7 5132 p179 2005 Consecutive primes arithmetic progression (2,d=6) 1855 (61310346529*205881*4001#*(205881*4001#+1)+210)*(205881*4001#-1)/35+1