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 (Fri Nov 20 16:50:36 CST 2009) 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 2^43112609-1 12978189 G10 2008 Mersenne 47?? 2f 2^42643801-1 12837064 G12 2009 Mersenne 46?? 3 2^37156667-1 11185272 G11 2008 Mersenne 45?? 4 2^32582657-1 9808358 G9 2006 Mersenne 44?? 5 2^30402457-1 9152052 G9 2005 Mersenne 43?? 6 2^25964951-1 7816230 G8 2005 Mersenne 42? 7 2^24036583-1 7235733 G7 2004 Mersenne 41? 8 2^20996011-1 6320430 G6 2003 Mersenne 40? 9 2^13466917-1 4053946 G5 2001 Mersenne 39 10 19249*2^13018586+1 3918990 SB10 2007 11 27653*2^9167433+1 2759677 SB8 2005 12 28433*2^7830457+1 2357207 SB7 2004 13 33661*2^7031232+1 2116617 SB11 2007 14 2^6972593-1 2098960 G4 1999 Mersenne 38 15d 6679881*2^6679881+1 2010852 L917 2009 Cullen 16 1582137*2^6328550+1 1905090 L801 2009 Cullen 17 258317*2^5450519+1 1640776 g414 2008 18 3*2^5082306+1 1529928 L780 2009 Divides GF(5082303,3), GF(5082305,5) 19 5359*2^5054502+1 1521561 SB6 2003 20 265711*2^4858008+1 1462412 g414 2008 21 3*2^4235414-1 1274988 L606 2008 22 24518^262144+1 1150678 g413 2008 Generalized Fermat 23 938237*2^3752950-1 1129757 L521 2007 Woodall 24 485767*2^3609357-1 1086531 L622 2008 25 5*2^3569154-1 1074424 L503 2009 26 7*2^3511774+1 1057151 p236 2008 Divides GF(3511773,6) 27 3139*2^3321905-1 999997 L185 2008 28 4847*2^3321063+1 999744 SB9 2005 29 113983*2^3201175-1 963655 L613 2008 30 3*2^3136255-1 944108 L256 2007 31 5*2^3059698-1 921062 L503 2008 32 2^3021377-1 909526 G3 1998 Mersenne 37 33 7*2^3015762+1 907836 g279 2008 34 4348099*2^2976221-1 895939 L466 2008 35 2^2976221-1 895932 G2 1997 Mersenne 36 36 7*2^2915954+1 877791 g279 2008 Divides GF(2915953,12) [g322] 37 222361*2^2854840+1 859398 g403 2006 38 1372930^131072+1 804474 g236 2003 Generalized Fermat 39 1361244^131072+1 803988 g236 2004 Generalized Fermat 40 1176694^131072+1 795695 g236 2003 Generalized Fermat 41 342673*2^2639439-1 794556 L53 2007 42 572186^131072+1 754652 g0 2004 Generalized Fermat 43 3*2^2478785+1 746190 g245 2003 Divides Fermat F(2478782), GF(2478782,3), GF(2478776,6), GF(2478782,12) 44c 81*2^2468789+1 743182 g418 2009 45 26773*2^2465343-1 742147 L197 2006 46 5*2^2460482-1 740680 L503 2008 47b 386892^131072+1 732377 p259 2009 Generalized Fermat 48 737*2^2382804-1 717299 L191 2007 49 1183953*2^2367907-1 712818 L447 2007 Woodall 50e 127*2^2346377-1 706332 L282 2009 51 275293*2^2335007-1 702913 L193 2006 52 3*2^2312734-1 696203 L158 2005 53 450457*2^2307905-1 694755 L172 2006 54 3*2^2291610+1 689844 L753 2008 Divides GF(2291607,3), GF(2291609,5) 55 130816^131072+1 670651 g308 2003 Generalized Fermat 56 19*2^2206266+1 664154 p189 2006 57 5077*2^2198565-1 661838 L251 2008 58 114487*2^2198389-1 661787 L179 2006 59 196597*2^2178109-1 655682 L175 2006 60 7*2^2167800+1 652574 g279 2007 Divides Fermat F(2167797), GF(2167799,5), GF(2167799,10) 61 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) 62 23*2^2141626-1 644696 L545 2008 63 7*2^2139912+1 644179 g279 2007 Divides GF(2139911,12) 64 62722^131072+1 628808 g308 2003 Generalized Fermat 65 1003*2^2076535-1 625103 L51 2008 66 9*2^2060941-1 620407 L503 2008 67 121*2^2033941-1 612280 L162 2006 68 251749*2^2013995-1 606279 L436 2007 Woodall 69 467917*2^1993429-1 600088 L160 2005 70 137137*2^1993201-1 600019 L321 2007 71 17*2^1990299+1 599141 g267 2006 Divides GF(1990298,3) 72 25*2^1977369-1 595249 L426 2008 73 121*2^1954243-1 588288 L162 2006 74 214519*2^1929114+1 580727 g346 2006 75 345067*2^1876573-1 564911 g59 2005 76 13*2^1861732+1 560439 g267 2005 Divides GF(1861731,6) 77 137*2^1849238-1 556679 L321 2007 78 15*2^1837873-1 553257 L632 2008 79 3*2^1832496+1 551637 p189 2007 Divides GF(1832490,3), GF(1832494,5) 80 21*2^1830919+1 551163 g279 2004 81 33*2^1813526-1 545928 L621 2008 82 417643*2^1800787-1 542097 L134 2005 83 357659*2^1779748-1 535764 L47 2005 84 5*2^1777515+1 535087 p148 2005 Divides GF(1777511,5), GF(1777514,6) 85 5077*2^1753317-1 527805 L251 2008 86 1179*2^1750847+1 527061 g387 2009 87 253*2^1722623-1 518564 L145 2007 88 121*2^1695499-1 510399 L62 2005 89 19*2^1684813-1 507181 L503 2008 90 15*2^1667744+1 502043 g279 2007 91 149183*2^1666957+1 501810 g346 2005 92 63*2^1659338-1 499513 L503 2008 93 61*2^1654383-1 498021 L503 2008 94b 68*23^365239+1 497358 p261 2009 95 69*2^1649423-1 496528 L621 2008 96 469949*2^1649228-1 496473 L160 2007 97 81*2^1643428+1 494724 g418 2009 Generalized Fermat 98 81*2^1606848+1 483712 gt 2007 Generalized Fermat 99 15*2^1597510+1 480900 g279 2006 100 58753*2^1594323-1 479944 p190 2006 101 737*2^1592724-1 479461 L191 2006 102 110413*2^1591999-1 479245 L111 2005 103 99*2^1591984-1 479237 L282 2009 104 1179*2^1591362+1 479051 g387 2006 105 121*2^1589157-1 478387 L65 2005 106 19502212^65536+1 477763 p160 2005 Generalized Fermat 107f 311*2^1581686-1 476138 L623 2009 108 17684828^65536+1 474979 g410 2007 Generalized Fermat 109 17655444^65536+1 474932 g410 2007 Generalized Fermat 110 17629398^65536+1 474890 g410 2007 Generalized Fermat 111 29*2^1574753+1 474050 L391 2008 112 139*2^1567874+1 471980 p189 2006 113 81*2^1544545+1 464957 gt 2007 114 234847*2^1535589-1 462264 L73 2005 115 121*2^1526097-1 459404 L65 2005 116 19709699*2^1521540-1 458037 L421 2008 117 13*2^1499876+1 451509 g267 2004 Divides GF(1499875,3) 118 7*2^1491852+1 449094 p166 2005 Divides GF(1491851,6) 119 2232007*2^1490605-1 448724 L4 2003 120 9*2^1481821-1 446074 L503 2008 121 29*2^1478344-1 445028 L10 2005 122 27*2^1476347+1 444427 g279 2005 123 325627*2^1472117-1 443157 L111 2005 124 1467763*2^1467763-1 441847 L381 2007 Woodall 125 77*2^1467554-1 441780 L145 2006 126 99*2^1461496-1 439957 L282 2009 127 21*2^1452771-1 437329 L503 2008 128 23*2^1448461+1 436032 L170 2008 129 19*2^1434165-1 431728 L503 2008 130 113*2^1425998-1 429271 L257 2008 131 21*2^1421741+1 427989 g279 2005 132 15*2^1418605+1 427044 g279 2006 Divides GF(1418600,5), GF(1418601,6) 133 29*2^1416873+1 426523 g305 2007 134 149797*2^1414137-1 425703 L105 2005 135 127*2^1398889-1 421110 L486 2008 136 1564347*2^1398269-1 420928 L466 2008 137 2^1398269-1 420921 G1 1996 Mersenne 35 138 192089*2^1395688-1 420150 L49 2004 139 113*2^1389674-1 418336 L257 2008 140 17*2^1388355+1 417938 g267 2005 Divides GF(1388354,10) 141 2187182^65536+1 415491 g260 2009 Generalized Fermat 142 2177038^65536+1 415359 g260 2008 Generalized Fermat 143 2162068^65536+1 415162 g260 2008 Generalized Fermat 144 15*2^1368428+1 411940 g279 2006 145 1874512^65536+1 411101 g413 2008 Generalized Fermat 146 241489*2^1365062+1 410930 L101 2005 147 1828502^65536+1 410393 GF2 2005 Generalized Fermat 148e 107*2^1362654-1 410202 L621 2009 149 35*2^1357881+1 408765 g279 2006 150b 299*2^1355004-1 407900 L426 2009 151 338707*2^1354830+1 407850 L124 2005 Cullen 152 1540550^65536+1 405516 GF2 2003 Generalized Fermat 153 15*2^1344313-1 404680 L139 2007 154 1483076^65536+1 404434 GF2 2003 Generalized Fermat 155 11*2^1343347+1 404389 p169 2005 Divides GF(1343346,6) 156 1478036^65536+1 404337 GF2 2002 Generalized Fermat 157 54767*2^1337287+1 402569 SB5 2002 158 1374038^65536+1 402260 GF3 2003 Generalized Fermat 159 81*2^1335675-1 402081 L268 2008 160 1361846^65536+1 402007 GF3 2002 Generalized Fermat 161 1266062^65536+1 399931 g295 2002 Generalized Fermat 162 5*2^1320487+1 397507 g55 2002 Divides GF(1320486,12) 163 1057476^65536+1 394807 g197 2002 Generalized Fermat 164b 1001184681*2^1310640+1 394551 p221 2009 165b 250107985*2^1310642+1 394551 p221 2009 166 1024390^65536+1 393902 g299 2003 Generalized Fermat 167e 19581121*2^1303821-1 392497 p49 2009 168 25*2^1298186+1 390795 g279 2005 Generalized Fermat 169 99*2^1292395-1 389052 L282 2008 170 857678^65536+1 388847 GF0 2002 Generalized Fermat 171 843832^65536+1 388384 GF0 2001 Generalized Fermat 172 138847*2^1283793-1 386466 L2 2003 173 5*2^1282755+1 386149 g55 2002 Divides GF(1282754,3), GF(1282748,5) 174 15*2^1276177+1 384169 g279 2006 Divides GF(1276174,3), GF(1276174,10) 175 1268979*2^1268979-1 382007 L201 2007 Woodall 176 671600^65536+1 381886 g55 2002 Generalized Fermat 177 11*2^1261478-1 379744 L163 2006 178 25*2^1258562+1 378867 g279 2004 Generalized Fermat 179 2084259*2^1257787-1 378638 L466 2008 180 26869*2^1257787-1 378637 L466 2007 181 2^1257787-1 378632 SG 1996 Mersenne 34 182 49*2^1257295-1 378486 L217 2008 183 6201*2^1257068+1 378419 L667 2008 184 81*2^1254155+1 377541 gt 2007 185 27*2^1253870-1 377454 L65 2008 186 80857169*2^1251076-1 376620 L10 2004 187b 57023*6^483561-1 376289 p258 2009 188 549868^65536+1 376194 g295 2003 Generalized Fermat 189 544118^65536+1 375895 g295 2002 Generalized Fermat 190 15*2^1244377+1 374596 g279 2006 191 257708*5^535176-1 374078 p196 2007 192 21*2^1240067+1 373299 g279 2004 193 43*2^1235298+1 371864 g279 2006 194 3*2^1232255-1 370947 L30 2004 195 15*2^1229600+1 370148 g279 2006 196 19581121*2^1229561-1 370143 p49 2008 197 440846^65536+1 369904 GC1 2002 Generalized Fermat 198 177482*117^177482+1 367072 g407 2008 Generalized Cullen 199b 122*18^292318+1 366941 p231 2009 200 25*2^1211488+1 364696 g279 2005 Generalized Fermat, divides GF(1211487,12) 201 357868^65536+1 363969 g266 2003 Generalized Fermat 202 2^1203793-2^601897+1 362378 L192 2006 Gaussian Mersenne norm 37? 203 3*2^1201046-1 361552 L77 2004 204 502541*2^1199930-1 361221 L93 2004 205 1195203*2^1195203-1 359799 L124 2005 Woodall 206 5*2^1194164-1 359480 L478 2008 207a 105*2^1193072-1 359153 L384 2009 208 292550^65536+1 358233 GC2 2002 Generalized Fermat 209 291726^65536+1 358153 GC2 2002 Generalized Fermat 210 71009*2^1185112-1 356760 L47 2004 211b 78959*6^458114-1 356487 p256 2009 212d 21*2^1182083-1 355844 L323 2009 213e 55*2^1177924+1 354593 L669 2009 214 255694^65536+1 354401 g266 2002 Generalized Fermat 215 617*2^1175468-1 353854 L426 2007 216b 59*2^1170231+1 352277 L669 2009 217 21*2^1170083-1 352232 L503 2008 218 27*2^1164664+1 350601 g279 2005 219 27*2^1163629-1 350289 L503 2008 220 55*2^1162155-1 349846 L545 2008 221 69109*2^1157446+1 348431 SB4 2002 222 152713*2^1154707-1 347607 g23 2004 223 29*2^1152765+1 347019 g300 2005 Divides GF(1152760,10) 224 189590^65536+1 345887 g262 2002 Generalized Fermat 225b 1001155863*2^1146800+1 345231 p221 2009 226 350107*2^1144101-1 344415 L35 2004 227 31*2^1142093-1 343806 L503 2008 228 209826493*2^1140855-1 343440 L10 2004 229 500621*2^1138518-1 342734 L73 2004 230 504613*2^1136459-1 342114 L84 2004 231 33*2^1130884+1 340432 L165 2006 Divides GF(1130881,12) 232 64*3^712171+1 339794 x28 2006 233 63*2^1126551-1 339128 L323 2008 234 842711*2^1126138-1 339008 L251 2009 235 177*2^1121720+1 337674 L129 2006 236 141146^65536+1 337489 g281 2002 Generalized Fermat 237 165*2^1117217+1 336319 g196 2007 238 33*2^1115902-1 335922 L488 2008 239a 45*2^1111703+1 334658 L669 2009 240 27*2^1108214-1 333608 L590 2008 241 99*2^1106989-1 333239 L486 2007 242 11*2^1104606-1 332521 L10 2005 243 49*2^1103430+1 332168 L669 2009 Generalized Fermat 244 165*2^1100755+1 331363 g196 2007 245 289*2^1098117-1 330569 L6 2006 246 19433*2^1096861+1 330193 g411 2008 247 108368^65536+1 329968 g181 2001 Generalized Fermat 248 43*2^1087992+1 327520 g279 2006 249 45*2^1086062+1 326939 L669 2009 250 412717*2^1084409-1 326446 L76 2004 251 15*2^1084010-1 326321 L139 2006 252f 103*2^1077739-1 324434 L621 2009 253 150847*2^1076441-1 324047 L73 2004 254 55*2^1075711-1 323824 L545 2008 255 85*2^1072368+1 322817 g267 2006 256 209826493*2^1071303-1 322503 L10 2004 257f 63*2^1070449+1 322240 L669 2009 258 107*2^1070256-1 322182 L621 2008 259 2203*2^1069647-1 322000 L123 2006 260 53*2^1066381+1 321015 L669 2009 261 133*2^1065655-1 320797 L632 2008 262 257*2^1064062-1 320317 L632 2008 263 217*2^1059961-1 319083 L639 2008 264 41*2^1059562-1 318962 L282 2009 265 864316301*2^1055106-1 317628 L426 2007 266 9*2^1051026+1 316392 p156 2004 Generalized Fermat 267 12345*2^1047788-1 315420 L426 2009 268 11*2^1044086-1 314303 L10 2005 269f 105*2^1043063-1 313996 L384 2009 270 151515*2^1043018-1 313985 L426 2007 271 35*2^1040005+1 313075 g279 2006 272 121*2^1039965-1 313063 L65 2004 273 958*11^300544+1 312988 p217 2008 274 13*2^1038896+1 312740 g267 2004 275 85*2^1034069-1 311288 L323 2007 276 217*2^1026869-1 309121 L632 2008 277 91*2^1026521-1 309016 L323 2008 278 31838235*2^1025596+1 308743 p190 2006 279 21*2^1022168+1 307705 g279 2004 280 48594^65536+1 307140 g141 2000 Generalized Fermat 281 205*2^1019679-1 306957 L632 2008 282c 41*2^1018778-1 306685 L282 2009 283 65567*2^1013803+1 305190 SB2 2002 284 6119*2^1011416-1 304471 L251 2007 285a 109*2^1011102+1 304375 g423 2009 286 9*2^1010277-1 304125 L80 2007 287 165*2^1010133+1 304083 g196 2007 288 729*2^1003373-1 302049 L466 2008 289 603*2^1002662+1 301835 p219 2007 290 945*2^1001719+1 301551 p219 2007 291 103*2^1001214+1 301398 p219 2007 292 869*2^1000725+1 301252 p114 2005 293 8009271*2^1000005-1 301039 g396 2009 294 1611111*2^1000000+1 301037 p197 2007 295 1089927*2^1000000+1 301037 p197 2006 296 32883*2^1000004+1 301036 p86 2002 297 21*2^999599-1 300911 L56 2005 298 215*2^999170-1 300783 L323 2008 299 81*2^998065+1 300450 gt 2007 300b 335*2^997912-1 300404 L769 2009 301 243*2^997537+1 300291 L165 2008 302 1515*2^996848-1 300085 L200 2007 303 351351*2^996709-1 300045 L80 2006 304b 53355*2^996559-1 299999 L466 2009 305 291*2^996371-1 299941 L261 2008 306 44131*2^995972+1 299823 SB3 2002 307 75*2^995721-1 299744 L257 2008 308 75*2^995208+1 299590 L669 2009 309b 9945*2^994111-1 299262 L644 2009 310e 371*2^993238-1 298998 L644 2009 311 3*2^992700-1 298833 L59 2004 312 2^991961-2^495981+1 298611 x28 2005 Gaussian Mersenne norm 36 313f 9615*2^991347-1 298430 L644 2009 314 93*2^990684-1 298228 L282 2008 315 121*2^990219-1 298088 L66 2004 316 21*2^986130-1 296857 L56 2005 317c 351*2^985817-1 296764 L536 2009 318d 189*2^984683-1 296422 L384 2009 319 103*2^984667-1 296417 L621 2009 320 395*2^983160-1 295964 L644 2009 321b 1009568601*2^982960+1 295910 p221 2009 322d 333*2^982086-1 295640 L536 2009 323 403*2^981831-1 295564 L284 2008 324 317*2^981378-1 295427 L623 2008 325 303*2^978724-1 294628 L548 2008 326 137137*2^978229-1 294482 L321 2007 327 69*2^978209-1 294473 L260 2007 328 103*2^977951-1 294395 L621 2009 329 23*2^977541+1 294271 g267 2004 330 93*2^977284+1 294194 L669 2009 331a 375*2^976533-1 293969 L644 2009 332 99*2^976049+1 293823 p76 2005 333 57*2^975036+1 293517 p241 2009 334 27*2^974752+1 293432 L57 2005 335e 3003*2^973751-1 293132 L615 2009 336 145*2^972835-1 292855 L639 2008 337 61*2^971585-1 292479 L80 2008 338 79*2^969795-1 291940 L80 2008 339 229*2^969073-1 291723 L268 2008 340d 123*2^968927-1 291679 L384 2009 341 95*2^968636-1 291591 L80 2008 342 143*2^968622-1 291587 L621 2008 343b 141*2^968467+1 291540 L669 2009 344 95*2^966925+1 291076 p241 2009 345f 3001*2^966755-1 291026 L615 2009 346 25*2^966414+1 290922 g279 2004 Generalized Fermat 347a 195*2^963608-1 290078 L323 2009 348c 157*2^963590+1 290072 L669 2009 349 255*2^962590-1 289771 g320 2008 350 135*2^961897-1 289562 L323 2008 351 11*2^960901+1 289262 g277 2005 Divides Fermat F(960897) 352 111*2^959671-1 288892 L282 2007 353 231*2^959375-1 288804 L138 2006 354 135*2^959059-1 288708 L616 2008 355c 123*2^958050-1 288404 L384 2009 356 1845*2^955940-1 287770 L251 2009 357 1515*2^955219-1 287553 L200 2007 358b 194*23^211140-1 287518 p256 2009 359 2*827^98511+1 287407 g404 2009 Divides Phi(827^98511,2) 360 309*2^954323-1 287283 L548 2009 361 10474035*2^953628-1 287078 L18 2008 362 95*2^953153+1 286930 p241 2009 363 247*2^952069-1 286604 L138 2006 364 3234846615*2^949441-1 285820 p113 2008 365 45*2^949353+1 285786 g107 2006 366e 327*2^949109-1 285713 L536 2009 367 1845*2^948584-1 285556 L251 2009 368 12345*2^948054-1 285397 L200 2007 369b 117*2^946852+1 285033 L669 2009 370 143717*96^143717+1 284892 g157 2009 Generalized Cullen 371 1545*2^946280-1 284862 L251 2009 372 167*2^945934-1 284757 L621 2008 373a 189*2^943329+1 283973 L669 2009 374 87*2^942790-1 283811 L145 2006 375 25*2^942563-1 283742 L183 2006 376e 321*2^942046-1 283587 L536 2009 377d 2943*2^940906-1 283245 L862 2009 378 37*2^939364+1 282779 p122 2006 379d 123*2^939098-1 282699 L257 2009 380f 277*2^937325-1 282166 L323 2009 381b 375*2^936717-1 281983 L644 2009 382 21547*2^936473-1 281911 L284 2008 383 246419198025*2^935249-1 281550 L106 2007 384 167*2^934492-1 281313 L621 2008 385 291*2^934097-1 281194 L261 2008 386d 3039469*2^933473-1 281010 L466 2009 387 273*2^930663-1 280160 L260 2008 388 165*2^928724+1 279576 g196 2007 389d 3039469*2^928643-1 279556 L466 2009 390 3313*2^928263-1 279439 L251 2008 391 465*2^928115-1 279394 L198 2009 392 397*2^926925-1 279035 L644 2008 393 95*2^925235+1 278526 L669 2009 394a 127*2^925012+1 278459 g423 2009 395c 125*2^924085+1 278180 L669 2009 396 33*2^922782+1 277787 L165 2006 397 209*2^921484-1 277397 L421 2008 398 75*2^920734+1 277171 p241 2009 399 441*2^920683+1 277156 L798 2009 400b 1575*2^920488-1 277098 L860 2009 401b 663*2^919212+1 276714 L153 2009 402 243163663*2^919087-1 276682 L10 2004 403 125*2^918494-1 276497 L384 2007 404a 127*2^916980+1 276041 g423 2009 405 113*2^916801+1 275987 L153 2009 Divides GF(916800,5), GF(916800,12) 406 3*2^916773+1 275977 g245 2001 Divides GF(916771,3), GF(916772,10) 407 19*2^916763-1 275975 L177 2007 408 263*2^916202-1 275807 L426 2008 409 195*2^915929-1 275725 L323 2009 410 285*2^915913-1 275720 L261 2008 411d 119*2^915371+1 275557 L153 2009 412 63*24^199633-1 275538 x37 2009 413a 525*2^914283+1 275230 L153 2009 414 259*2^914173-1 275196 L639 2008 415 331*2^913201-1 274904 L543 2008 416 207*2^912512-1 274696 L330 2009 417 10474035*2^910955-1 274232 L18 2008 418 83*2^910716-1 274155 L545 2008 419a 171*2^910544+1 274104 L153 2009 420f 3039469*2^908463-1 273482 L466 2009 421 251*2^907478-1 273181 L421 2009 422 399*2^906480-1 272881 L644 2008 423 737*2^906168-1 272787 L191 2006 424b 213*2^906152+1 272782 L153 2009 425 42717*2^905792+1 272676 L159 2005 426b 405*2^904000+1 272134 L153 2009 427 216751*2^903792+1 272074 g346 2004 428 93*2^903187-1 271889 L282 2008 429c 191*2^903061+1 271851 L669 2009 430e 3005*2^902580-1 271708 L615 2009 431 15*2^902474-1 271673 L52 2006 432b 505*2^902346+1 271636 L153 2009 433b 183*2^902241+1 271604 L669 2009 434e 3045*2^902181-1 271588 L615 2009 435 309817*2^901173-1 271286 L64 2004 436 101*2^900358-1 271037 L183 2006 437c 1695*2^899712+1 270844 g336 2009 438f 297*2^899234-1 270699 L421 2009 439f 371*2^898690-1 270536 L644 2009 440 63*2^898308+1 270420 p241 2009 441 6465*2^897008-1 270031 L20 2008 442 43*2^894766+1 269354 g279 2006 Divides GF(894765,5) 443f 153*2^894504-1 269275 L384 2009 444d 133*2^894310+1 269217 L669 2009 445b 195*2^894187+1 269180 L669 2009 446f 345*2^894064-1 269143 L536 2009 447 3333*2^894014+1 269129 g412 2008 448f 333*2^893871-1 269085 L536 2009 449 19581121*2^893547-1 268992 p49 2004 450 85*2^892568+1 268692 g267 2006 451 63*2^892164+1 268570 p241 2009 452f 189*2^891876-1 268484 L621 2009 453 2995125705*2^891645-1 268422 L145 2006 454 95*2^891073+1 268242 p241 2009 455 81*2^889981+1 267913 gt 2007 456 165*2^889902-1 267890 L268 2008 457 7195377*2^888888-1 267589 L284 2008 458f 189*2^888200-1 267378 L323 2009 459 1545*2^887559-1 267186 L251 2008 460 11*2^886071+1 266735 g277 2005 Divides GF(886070,12) 461 167*2^885664-1 266614 L621 2008 462 2809*2^883814+1 266058 L123 2007 Generalized Fermat 463e 3003*2^882106-1 265544 L615 2009 464 5077*2^881829-1 265461 L251 2007 465 285*2^881240-1 265283 L323 2008 466 759375*2^880769-1 265144 L284 2008 467 193*2^880287-1 264996 L323 2008 468c 193*2^880188+1 264966 L669 2009 469 141*2^878798-1 264547 L282 2009 470e 3135*2^878081-1 264333 L615 2009 471 117*2^877874-1 264269 L488 2008 472 81*2^877707+1 264219 gt 2007 473d 153*2^877553+1 264172 L669 2009 474 65*2^877287+1 264092 p189 2006 475 135*2^876997-1 264005 L260 2008 476 85*2^876458+1 263843 g267 2006 477 5775*2^876045+1 263720 p189 2007 478a 123*2^875878+1 263668 g423 2009 479 108045*2^875337-1 263508 L466 2009 480e 129*2^872765+1 262731 L669 2009 481 108045*2^871024-1 262210 L466 2009 482d 135*2^870998+1 262199 L669 2009 483f 2953*2^870435-1 262031 L862 2009 484 3539*2^869868-1 261860 L251 2008 485 327*2^869829-1 261848 L536 2009 486 157*2^869073-1 261620 L585 2008 487e 405405*2^868467-1 261441 L466 2009 488c 193*2^868328+1 261396 L669 2009 489 69*2^867653-1 261192 L138 2006 490 170591*2^866870-1 260960 L47 2004 491 3234846615*2^865933-1 260682 p113 2007 492 93997*2^864401-1 260216 L49 2004 493 1815*2^863743-1 260016 L251 2009 494e 391*2^863459-1 259930 L644 2009 495d 175*2^862436+1 259622 L669 2009 496d 141*2^862248+1 259565 L669 2009 497 19581121*2^862127-1 259534 p49 2003 498 10474035*2^860172-1 258945 L18 2008 499e 143*2^859769+1 258819 L669 2009 500 203*2^859602-1 258769 L268 2008 501 3793717*2^859433-1 258722 L466 2009 502 3512185*2^859433-1 258722 L466 2009 503 2013289*2^859433-1 258722 L466 2007 504 1486245*2^859433-1 258722 L466 2007 505 1283911*2^859433-1 258722 L466 2007 506 24949*2^859435-1 258721 L468 2008 507 95061*2^859433+1 258721 L466 2008 508 2^859433-1 258716 SG 1994 Mersenne 33 509e 151*2^858640+1 258479 p240 2009 510e 119*2^858427+1 258415 L669 2009 511e 405405*2^857986-1 258286 L466 2009 512 692835*2^857593-1 258168 L138 2006 513 21*2^856865+1 257944 g279 2004 514 736320585*2^856778-1 257925 L426 2008 515 265*2^856293-1 257773 L548 2008 516 77*2^855770-1 257615 L56 2005 517 19*2^853546+1 256945 g381 2005 518 2951*2^852818-1 256728 L862 2009 519e 129*2^851306+1 256271 L669 2009 520 83*2^851092-1 256207 L80 2007 521 43541*2^850394-1 255999 L251 2008 522 261*2^850383-1 255994 L478 2007 523f 377*2^850160-1 255927 L644 2009 524 1471*2^848765-1 255507 L421 2008 525 Phi(3,1-3^267414)/3 255178 x28 2005 Generalized unique 526 315*2^846610-1 254858 L585 2009 527 1581823815*2^846116-1 254716 L83 2005 528c 1575*2^845854-1 254631 L251 2009 529 51*2^845494-1 254521 L80 2007 530d 189*2^845142+1 254416 L669 2009 531 147687*2^843689-1 253981 L550 2009 532 97*2^843205-1 253832 L145 2006 533e 325*2^842787-1 253707 L848 2009 534d 211*2^842347-1 253575 L915 2009 535 2039*2^841312-1 253264 L251 2008 536 201*2^840735-1 253089 L282 2007 537 165*2^840038-1 252879 L268 2008 538d 2*3^529680+1 252722 p199 2009 539 57*2^839446-1 252701 L80 2007 540 35*2^839082-1 252591 L325 2007 541 2607*2^838647+1 252462 g61 2007 542c 165*2^838479+1 252410 L669 2009 543 1977*2^838330-1 252366 L621 2008 544 187*2^838101-1 252296 L632 2008 545 175268*5^360870-1 252243 p196 2006 546 43*2^835934+1 251643 g279 2006 547 117*2^834916-1 251337 L261 2007 548 9*2^834810+1 251304 p148 2004 Generalized Fermat 549 367*2^834573-1 251235 L644 2009 550 167*2^832962-1 250749 L621 2008 551 51*2^832630-1 250649 L80 2007 552 333*2^832611-1 250644 L536 2009 553 291*2^832410-1 250583 L261 2007 554 237*2^832053-1 250476 L261 2007 555c 747907*2^832040+1 250475 L466 2009 556 393047*2^832040-1 250475 L466 2008 557 69*2^831617-1 250344 L138 2006 558 35*2^831411+1 250282 g279 2006 Divides GF(831410,3) 559 2*881^84879+1 249967 g404 2009 560 115*2^830103-1 249888 L268 2008 561 95*2^829421+1 249683 p241 2009 562 8331405*2^829367-1 249672 L138 2006 563 71*2^829245+1 249630 p227 2008 564 173*2^828808-1 249499 L145 2007 565 9*2^828709-1 249468 L38 2005 566 261*2^827599-1 249135 L261 2007 567 165*2^826425+1 248781 g196 2006 568 465*2^825730-1 248573 L198 2009 569d 351*2^825586-1 248529 L701 2009 570 359*2^825204-1 248414 L644 2008 571 197*2^825188-1 248409 L282 2007 572 236377*2^824773-1 248287 L251 2008 573 17*2^824451+1 248186 g267 2004 574 229918*12^229918-1 248129 x37 2008 Generalized Woodall 575 181*2^823853-1 248007 L138 2007 576 397*2^823745-1 247975 L644 2008 577 87*2^822164+1 247498 p227 2008 578 2*389^95485+1 247302 g404 2007 579 69*2^820237-1 246918 L138 2006 580 5*2^819739+1 246767 g55 2001 Divides GF(819738,3) 581 1010718321*2^819120+1 246589 p221 2008 582 1009332993*2^819120+1 246589 p221 2008 583 1005748293*2^819120+1 246589 p221 2008 584 1003438725*2^819120+1 246589 p221 2008 585 1002264615*2^819120+1 246589 p221 2008 586 85*2^818760+1 246474 g267 2005 587 45*2^818648-1 246440 L282 2007 588 53*2^816013+1 245647 p227 2008 589 75*2^814857-1 245299 L80 2007 590 105*2^814850-1 245297 L384 2007 591 175*2^814158+1 245089 L669 2009 592 79*2^812726+1 244657 p189 2006 593 149*2^812719+1 244655 L669 2009 594a 201*2^812035+1 244450 L669 2009 595 133977*2^811485-1 244287 L591 2008 596 7*2^811230+1 244206 g148 2002 Divides GF(811228,5) 597 291*2^810347-1 243942 L421 2007 598 507607*2^810012+1 243844 g412 2008 599 183*2^809866+1 243797 L669 2009 600 203*2^809848-1 243791 L632 2008 601 133*2^809755-1 243763 L632 2008 602 151*2^809716+1 243751 L669 2009 603 64*3^510853+1 243741 x28 2005 604f 325*2^809389-1 243653 L848 2009 605e 3135*2^809190-1 243594 L615 2009 606a 261*2^806980+1 242928 L1100 2009 607 2*809^83495+1 242800 g404 2008 608 600921*2^806197+1 242696 g337 2004 609 309*2^805516-1 242487 L548 2008 610 9980*19^189621-1 242483 p237 2008 Generalized Woodall 611 35*2^805222-1 242398 L142 2007 612 7*2^804534+1 242190 g196 2003 Divides GF(804533,12) 613 3997*2^803217-1 241797 L644 2009 614 157*2^802321-1 241525 L585 2008 615 261*2^802123-1 241466 L261 2007 616 105*2^801978-1 241422 L384 2007 617 153*2^801973+1 241421 p241 2009 618 3*2^801978+1 241420 g372 2005 Divides GF(801973,3), GF(801977,5) 619 169*2^801578+1 241302 g246 2008 Generalized Fermat 620 153*2^800567-1 240997 L323 2009 621 659*2^800516-1 240983 g59 2004 622 2294020991*2^800493+1 240982 p157 2004 623 29*2^800191+1 240883 p122 2005 624 99913731*2^800000+1 240832 g279 2004 625 99797893*2^800000+1 240832 g279 2004 626 3882741*2^800000+1 240831 g279 2006 627 3433305*2^800000+1 240831 g279 2004 628 2633527*2^800000+1 240831 g279 2003 629 2169967*2^800000+1 240831 g53 2003 630 1913067*2^800000+1 240831 g279 2003 631 1736913*2^800000+1 240831 g53 2003 632 1122201*2^800000+1 240831 g53 2003 633e 247753*2^800002+1 240830 g300 2009 634 741411*2^800000+1 240830 g53 2003 635 4597*2^799781-1 240762 L251 2008 636 249*2^799771+1 240758 L153 2009 637 7844265*2^799658+1 240728 g336 2009 638 297*2^799620-1 240713 L421 2008 639 201*2^799611-1 240710 L282 2007 640 177*2^798443+1 240358 L129 2005 641 87*2^798432+1 240354 p227 2008 642 87*2^796341-1 239725 L145 2006 643 1695*2^796134+1 239664 g336 2009 644 309*2^795776-1 239555 L548 2008 645 411*2^793944+1 239004 L153 2008 646 161*2^792702-1 238630 L323 2008 647 3645*2^792240-1 238492 L261 2007 648 83*2^791926-1 238396 L425 2008 649 111*2^791502-1 238268 L282 2007 650 7844265*2^790654+1 238018 g336 2008 651 95*2^790508-1 237969 L323 2008 652 187*2^788640+1 237407 p189 2007 653 11174*50432^50432-1 237171 x37 2008 654 91*2^787173-1 236965 L323 2008 655 119*2^787017+1 236918 p189 2007 656e 3003*2^786991-1 236912 L615 2009 657f 375*2^786387-1 236729 L644 2009 658 271*2^786059-1 236630 L585 2008 659 229*2^786034+1 236623 L181 2007 660 108045*2^784973-1 236306 L466 2008 661 333*2^783927-1 235989 L536 2009 662 73*2^783831-1 235959 L145 2006 663 1695*2^782947+1 235694 g336 2009 664 387*2^782853-1 235665 L644 2008 665 60205*2^782665-1 235611 p243 2009 Generalized Woodall 666 1001*2^782313+1 235503 L153 2008 667 1695*2^782114+1 235444 g336 2009 668 165*2^781224+1 235175 L153 2008 669 39*2^781220-1 235173 L138 2006 670 309*2^780395-1 234925 L548 2008 671 285*2^780300-1 234897 L425 2007 672a 9101981*2^780158-1 234858 g405 2009 673e 489*2^780040-1 234819 L647 2009 674 460139*2^779536-1 234670 L47 2004 675 246419198025*2^778905-1 234486 L106 2007 676 7844265*2^778258+1 234286 g336 2008 677 39*2^778233+1 234274 g267 2005 678 115*2^778112+1 234238 p189 2007 679 27*2^777992-1 234201 L151 2005 680 7003141*2^777777-1 234142 L81 2007 681 6982195*2^777777-1 234142 L81 2007 682 6870877*2^777777-1 234142 L81 2007 683 6655117*2^777777-1 234142 L81 2007 684 5901565*2^777777-1 234141 L81 2007 685 5070649*2^777777-1 234141 L81 2006 686 4533949*2^777777-1 234141 L81 2006 687 4105201*2^777777-1 234141 L81 2006 688 3190291*2^777777-1 234141 L81 2006 689 3188689*2^777777-1 234141 L81 2006 690 2298237*2^777777-1 234141 L81 2006 691 2193597*2^777777-1 234141 L81 2006 692 1155681*2^777777-1 234141 L81 2006 693 99926*5^334793+1 234016 p225 2008 694 459*2^777071+1 233925 L116 2009 695 441*2^776036+1 233613 L505 2007 Generalized Fermat 696 63*2^775857+1 233559 p227 2008 697 201*2^775453-1 233437 L282 2007 698 2935*2^775357-1 233410 L698 2009 699 371*2^773762-1 232929 L644 2009 700 67*2^773566+1 232869 p227 2008 Divides GF(773564,5) 701 22183*2^773447-1 232836 L251 2007 702 31*2^773227-1 232767 L330 2007 703 33*2^773030-1 232707 L488 2007 704 8331405*2^772375-1 232515 L138 2006 705 10474035*2^771908-1 232375 L18 2008 706 385*2^771627-1 232286 L644 2009 707 2983*2^771455-1 232235 L251 2008 708 124679*2^769908-1 231771 L284 2008 709 405*2^769828+1 231744 L203 2009 710 177*2^769026-1 231503 L145 2006 711 399*2^768439-1 231326 L644 2009 712 35*2^768063+1 231212 L126 2005 Divides GF(768062,3) 713f 325*2^766545-1 230756 L548 2009 714 159*2^766421-1 230718 L384 2008 715c 5455*2^764293-1 230079 L268 2009 716 265*2^763957-1 229977 L633 2008 717 262*17^186768+1 229811 p231 2008 718 61*2^762417-1 229513 L548 2008 719 43*2^762212+1 229451 g279 2006 720 317*2^762078-1 229411 L623 2008 721 10021136^32768+1 229407 p154 2006 Generalized Fermat 722 169*2^761749-1 229312 L621 2008 723 213*2^760942-1 229069 L261 2007 724c 19861029*2^760416-1 228916 L895 2009 725 51127*2^759513-1 228641 L83 2007 726 246419198025*2^757961-1 228181 L106 2007 727 3512673*2^756839-1 227838 L466 2008 728 1391281*2^756839-1 227838 L466 2007 729 1334079*2^756839-1 227838 L466 2007 730 1081255*2^756839-1 227838 L466 2007 731 755061*2^756839-1 227838 L466 2007 732 360983*2^756840-1 227838 L468 2008 733 33305*2^756839+1 227836 L466 2007 734 2^756839-1 227832 SG 1992 Mersenne 32 735 205*2^756705-1 227794 L268 2008 736 121212121212121*2^756429-1 227722 L736 2009 737 139606*5^325722+1 227676 p224 2008 738e 3993*2^755610-1 227465 L644 2009 739 1575*2^755172-1 227333 L251 2009 740b 1155*2^754851-1 227236 L121 2009 741 22932195*2^754723-1 227202 L138 2006 742 736320585*2^753905-1 226957 L200 2007 743e 369*2^753624-1 226866 L644 2009 744 246419198025*2^752612-1 226571 L106 2007 745 246299*2^752600-1 226561 L42 2004 746 67*2^752396+1 226496 p227 2008 747 57111443*2^751982-1 226377 L402 2008 748 177*2^751028+1 226085 L129 2005 749 205*2^749859-1 225733 L268 2008 750 3389*2^749828-1 225725 L151 2008 751 231*2^749301-1 225565 L138 2006 752 3039469*2^749267-1 225559 L466 2008 753 221*2^749166-1 225524 L282 2008 754a 1341*2^748238-1 225246 L121 2009 755a 1455*2^747443-1 225006 g405 2009 756 39*2^747219-1 224937 L138 2006 757c 5955*2^747206-1 224936 L268 2009 758 165*2^746994+1 224870 g196 2006 759a 1225*2^746353-1 224678 L121 2009 760 253973*2^746152-1 224620 L80 2006 761a 1111*2^745069-1 224292 L121 2009 762a 1239*2^744717-1 224186 L121 2009 763 243*2^744442-1 224102 p48 2005 764 65*2^744095+1 223997 p189 2006 765b 1295*2^743718-1 223885 L121 2009 766 6927*2^743481-1 223814 L541 2008 767 11*2^743322-1 223764 L10 2004 768b 1373*2^743296-1 223758 L121 2009 769b 1341*2^743169-1 223720 L121 2009 770b 1077*2^742958-1 223656 L121 2009 771 273*2^742930-1 223647 L323 2007 772 151515*2^742445-1 223504 L200 2007 773b 1169*2^742268-1 223449 L121 2009 774 29*2^742191+1 223424 p122 2005 775 81*2^741917-1 223342 L268 2007 776b 1279*2^741599-1 223247 L121 2009 777 71098*5^319336+1 223212 p246 2008 778 2933*2^740722-1 222984 L698 2009 779 187*2^739321-1 222561 L268 2008 780 129*2^739023+1 222471 p189 2007 781b 1359*2^738905-1 222436 L121 2009 782 183*2^737805+1 222104 p189 2007 783 3993*2^737800-1 222104 L644 2009 784 2741*2^737586-1 222039 L251 2008 785b 1083*2^737118-1 221898 L121 2009 786 1585*2^736945-1 221846 L282 2009 787 383*2^736876-1 221825 L644 2009 788 159*2^736144-1 221604 L323 2008 789 71*2^735802-1 221501 L97 2005 790 2929*2^735531-1 221421 L698 2009 791a 579*2^735459-1 221398 L548 2009 792 19581121*2^735431-1 221395 p49 2004 793 133*2^734835-1 221210 L621 2008 794 2995125705*2^734584-1 221142 L72 2005 795b 1311*2^734446-1 221094 L121 2009 796 15*2^734400+1 221078 p76 2004 797 Phi(5,(3668*16001#-1)*(378266*16001#/5+1)^7) 221071 x34 2008 Generalized unique 798a 495*2^734277-1 221043 L548 2009 799 1545*2^734144-1 221003 L251 2008 800b 1381*2^734103-1 220991 L121 2009 801b 429*2^733315-1 220753 L548 2009 802c 1259*2^733004-1 220660 L121 2009 803 403*2^732860+1 220616 L203 2008 804b 495*2^732566-1 220528 L548 2009 805a 797*2^732318-1 220453 L548 2009 806a 807*2^731802-1 220298 L644 2009 807c 1119*2^731781-1 220292 L121 2009 808c 1191*2^731434-1 220187 L121 2009 809b 411*2^731153-1 220102 L548 2009 810 343*2^731147-1 220100 L644 2008 811 221*2^730986-1 220052 L426 2008 812c 1221*2^730723-1 219973 L121 2009 813 212893*2^730387-1 219874 g163 2003 814a 695*2^730000-1 219755 L548 2009 815c 1255*2^729795-1 219694 L121 2009 816 237*2^729654-1 219651 L261 2007 817c 1017*2^729384-1 219570 L121 2009 818 27*2^729314-1 219547 L125 2005 819c 1141*2^728749-1 219379 L121 2009 820 289*2^728205-1 219215 L6 2005 821 161957*2^727995+1 219154 g341 2004 822 59*2^727815+1 219096 p227 2008 Divides GF(727814,12) 823 3*2^727699-1 219060 L41 2004 824c 1169*2^727544-1 219016 L121 2009 825b 961*2^726835-1 218803 L644 2009 826c 1125*2^726771-1 218783 L121 2009 827 2937*2^726444-1 218685 L698 2009 828b 957*2^726085-1 218577 L644 2009 829b 519*2^725471-1 218392 L548 2009 830 137137*2^725437-1 218384 L321 2007 831b 775*2^725341-1 218353 L548 2009 832b 741*2^724834-1 218200 L536 2009 833 69*2^724802+1 218189 p227 2008 834 189*2^724746+1 218173 p189 2007 835b 585*2^724530-1 218109 L548 2009 836 19413*2^724320-1 218047 L587 2009 837 1977*2^723820-1 217895 L621 2008 838c 1191*2^723751-1 217874 L121 2009 839a 127*2^723530+1 217807 g423 2009 840c 1089*2^723287-1 217735 L121 2009 841c 1279*2^723005-1 217650 L121 2009 842 2935*2^722817-1 217594 L698 2009 843b 797*2^722812-1 217591 L536 2009 844 67*2^722805-1 217588 L268 2008 845 465*2^722089-1 217374 L198 2008 846c 1143*2^720424-1 216873 L121 2009 847b 651*2^720318-1 216841 L701 2009 848f 355*2^719857-1 216702 L555 2009 849 220033*2^719731-1 216666 g163 2004 850c 471*2^719122-1 216480 L548 2009 851d 1375*2^718989-1 216441 L121 2009 852b 745*2^718939-1 216426 L701 2009 853 3104*22^161188-1 216386 p253 2009 854d 1111*2^718669-1 216344 L121 2009 855 986963835*2^718502+1 216300 L631 2008 856 1977*2^718101-1 216174 L621 2008 857 375*2^717884-1 216108 L644 2009 858 171*2^717731+1 216061 p189 2007 859 135*2^717682+1 216046 p189 2007 860 333*2^717510-1 215995 L536 2009 861d 1005*2^717330-1 215941 L121 2009 862b 699*2^716977-1 215835 L536 2009 863 465*2^716805-1 215783 L198 2008 864 25*2^716769-1 215771 L137 2006 865d 1137*2^715876-1 215504 L121 2009 866f 365*2^715676-1 215443 L548 2009 867 101*2^715503+1 215390 p189 2007 868 229*2^715459-1 215377 L268 2008 869 111546435*2^715180-1 215299 L466 2008 870 215*2^714542-1 215101 L548 2008 871 171*2^714200+1 214998 p189 2007 872 149*2^714199+1 214998 p189 2007 873 5755*2^714077-1 214963 L268 2008 874 1415*2^714058-1 214957 L268 2009 875d 1107*2^713842-1 214891 L121 2009 876d 1179*2^713744-1 214862 L121 2009 877 2*809^73879+1 214837 g404 2008 878b 769*2^712534+1 214497 L635 2009 879c 495*2^712468-1 214477 L701 2009 880 15*2^712294-1 214424 L52 2005 881 1545*2^711570-1 214208 L251 2008 882 91*2^711335-1 214136 L323 2007 883d 1029*2^711315-1 214131 L121 2009 884 3011*2^711301+1 214127 L31 2008 885 176625*2^711112-1 214072 L43 2008 886 333*2^710678-1 213938 L536 2009 887d 945*2^710433-1 213865 L644 2009 888 3*2^709968+1 213723 g372 2005 Divides GF(709962,3), GF(709963,5) 889d 819*2^709803-1 213675 L644 2009 890 213*2^709727-1 213652 L261 2007 891d 1293*2^709702-1 213645 L121 2009 892d 723*2^709152-1 213479 L701 2009 893 5775*2^708795+1 213373 p189 2007 894d 981*2^708677-1 213337 L644 2009 895d 939*2^708275-1 213215 L644 2009 896d 873*2^708190-1 213190 L644 2009 897d 937*2^707457-1 212969 L644 2009 898 3149688^32768+1 212936 g260 2005 Generalized Fermat 899d 5451*2^707323-1 212930 L614 2009 900 57*2^707245-1 212904 L384 2007 901 3134838^32768+1 212868 g260 2004 Generalized Fermat 902 3109540^32768+1 212753 g260 2004 Generalized Fermat 903d 1167*2^706548-1 212696 L121 2009 904d 685*2^706333-1 212631 L802 2009 905d 421*2^706219-1 212596 L701 2009 906a 37850187375*2^706150-1 212583 L257 2009 907 151515*2^705873-1 212495 L200 2007 908 405*2^705795-1 212469 L282 2009 909 75*2^705688+1 212436 p227 2008 Divides GF(705684,12) 910d 1119*2^705503-1 212381 L121 2009 911 3000336^32768+1 212244 g292 2002 Generalized Fermat 912 267*2^705028-1 212238 L260 2007 913 2*269^87347+1 212232 g404 2007 914 7331*2^704842-1 212183 L251 2007 915 649285*2^704721-1 212148 g396 2006 916 2973894^32768+1 212118 g309 2004 Generalized Fermat 917 261917*2^704227+1 211999 g346 2004 918e 495*2^704130-1 211967 L701 2009 919d 1329*2^704091-1 211956 L121 2009 920e 649*2^703917-1 211903 L701 2009 921d 1123*2^703855-1 211885 L121 2009 922e 945*2^703690-1 211835 L644 2009 923 483*2^703479-1 211771 L79 2006 924 105*2^703368+1 211737 p189 2007 925d 1287*2^703172-1 211679 L121 2009 926 3*2^702038-1 211335 L30 2003 927 125*2^701981+1 211320 p189 2007 928 15*2^701902+1 211295 p76 2004 929d 1101*2^701727-1 211244 L121 2009 930 1581823815*2^701702-1 211243 L83 2006 931 499*2^701434+1 211156 L203 2008 932e 639*2^700623-1 210912 L701 2009 933 24067*2^700073-1 210748 L251 2007 934 6215657*2^700000-1 210728 L81 2007 935 4786305*2^700000-1 210728 L81 2007 936 4649865*2^700000-1 210728 L81 2007 937 3762633*2^700000-1 210728 L81 2006 938 3030329*2^700000-1 210728 L81 2006 939 2758665*2^700000-1 210728 L81 2007 940 2599043*2^700000-1 210728 L81 2006 941 2500883*2^700000-1 210728 L81 2007 942 1168043*2^700000-1 210728 L81 2006 943 58153*2^700004+1 210727 g305 2007 944 422367*2^700000-1 210727 L81 2006 945 2696506^32768+1 210725 g309 2003 Generalized Fermat 946 2679502^32768+1 210635 g309 2003 Generalized Fermat 947e 783*2^699340-1 210526 L701 2009 948 143*2^699189+1 210480 p189 2007 949d 1029*2^698968-1 210414 L121 2009 950 2619572^32768+1 210313 g309 2003 Generalized Fermat 951 2^698592-2^349296-1 210298 p168 2009 952 46157*2^698207+1 210186 SB1 2002 953 2585646^32768+1 210128 g309 2003 Generalized Fermat 954 7844265*2^697732+1 210046 g336 2008 955 117*2^697458-1 209958 L261 2007 956 2538626^32768+1 209866 g309 2003 Generalized Fermat 957 6794935*2^696969-1 209816 L81 2007 958 6145851*2^696969-1 209816 L81 2007 959 4549431*2^696969-1 209816 L81 2007 960 4226259*2^696969-1 209816 L81 2007 961 4063867*2^696969-1 209816 L81 2007 962 3649585*2^696969-1 209816 L81 2007 963 3598881*2^696969-1 209816 L81 2007 964 3477939*2^696969-1 209816 L81 2007 965 3425817*2^696969-1 209816 L81 2007 966 2009719*2^696969-1 209815 L81 2007 967 1868755*2^696969-1 209815 L81 2007 968 1846815*2^696969-1 209815 L81 2007 969 1328227*2^696969-1 209815 L81 2007 970 1158589*2^696969-1 209815 L81 2007 971 602031*2^696969-1 209815 L81 2007 972 332269*2^696969-1 209815 L81 2007 973 35*2^696935+1 209800 L126 2005 974 204223*2^696891-1 209791 g163 2003 975f 885*2^696823-1 209768 L644 2009 976 2510928^32768+1 209710 g309 2003 Generalized Fermat 977 1333*2^696471-1 209662 L121 2009 978 11*2^696438-1 209650 L10 2004 979f 421*2^696385-1 209636 L548 2009 980f 429*2^696361-1 209629 L701 2009 981f 1203*2^696279-1 209604 L121 2009 982 1155*2^695822+1 209467 L181 2009 983f 875*2^695742-1 209443 L644 2009 984 47*2^695724-1 209436 L548 2008 985 31431*2^695695-1 209430 p190 2006 986 1417*2^695625-1 209408 L268 2009 987 175*2^695576+1 209392 p189 2007 988 617*2^695452-1 209355 L176 2006 989f 603*2^695447-1 209354 L548 2009 990 47*2^695384-1 209334 L548 2008 991f 435*2^695309-1 209312 L548 2009 992e 3045*2^695273-1 209302 L615 2009 993 2435410^32768+1 209276 g309 2003 Generalized Fermat 994 5855*2^694636-1 209111 L268 2009 995f 699*2^694497-1 209068 L701 2009 996 5775*2^694061+1 208937 p189 2007 997 2354618^32768+1 208796 g242 2003 Generalized Fermat 998 2354572^32768+1 208795 g242 2003 Generalized Fermat 999f 695*2^693588-1 208794 L701 2009 1000 2351172^32768+1 208775 g242 2003 Generalized Fermat 1001a 367*2^693348+1 208722 L714 2009 1002a 605*2^693237+1 208688 L883 2009 1003 2329148^32768+1 208641 g309 2003 Generalized Fermat 1004 187*2^693012+1 208620 p189 2007 1005 Phi(3,-2322573^16384) 208601 p72 2008 Generalized unique 1006 Phi(3,-2313516^16384) 208545 p72 2008 Generalized unique 1007f 945*2^692744-1 208540 L644 2009 1008 12601*2^692732+1 208538 g411 2007 1009 209*2^692692-1 208524 L421 2007 1010a 1135*2^692420+1 208443 L1004 2009 1011a 303*2^692409+1 208439 L1109 2009 Divides xGF(692408,7,6) 1012 2282862^32768+1 208355 g309 2003 Generalized Fermat 1013 2279250^32768+1 208333 g309 2003 Generalized Fermat 1014a 327*2^691951+1 208301 L692 2009 1015f 627*2^691932-1 208296 L548 2009 1016f 999*2^691895-1 208285 L644 2009 1017f 645*2^691682-1 208220 L548 2009 1018 2825*2^691465+1 208156 L31 2008 1019 49*2^691469-1 208155 L217 2007 1020f 1273*2^691383-1 208131 L121 2009 1021e 1193*2^691264-1 208095 L121 2009 1022a 975*2^691009+1 208018 L1102 2009 1023a 285*2^690973+1 208007 L907 2009 1024 129*2^690893-1 207982 L425 2007 1025 19540909*2^690774+1 207951 g393 2005 1026 801923*2^690713+1 207932 g156 2008 1027e 1011*2^690654-1 207911 L121 2009 1028d 8681*30^140627-1 207728 p255 2009 1029 465*2^690044-1 207727 L198 2008 1030 Phi(3,-2182528^16384) 207716 f7 2007 Generalized unique 1031 Phi(3,-2178996^16384) 207692 f7 2007 Generalized unique 1032b 455*2^689757+1 207641 L661 2009 1033 2167350^32768+1 207616 g295 2002 Generalized Fermat 1034 2*683^73237+1 207585 g404 2008 Divides Phi(683^73237,2) 1035b 483*2^689536+1 207574 L673 2009 1036 969*2^689503-1 207565 L644 2009 1037 159*2^689437+1 207544 p189 2007 1038 261221*2^689422-1 207543 L35 2003 1039 2147196^32768+1 207483 g295 2002 Generalized Fermat 1040 709*2^689023-1 207420 L548 2009 1041 1815*2^688939-1 207395 L251 2009 1042e 1191*2^688874-1 207375 L121 2009 1043 497*2^688852-1 207368 L566 2009 1044e 1021*2^688833-1 207363 L121 2009 1045 Phi(3,-2115084^16384) 207269 f7 2007 Generalized unique 1046b 867*2^688456+1 207249 L1095 2009 1047 Phi(3,-2110199^16384) 207236 f7 2007 Generalized unique 1048 403*2^688290+1 207199 L203 2008 1049a 2179*2^688251-1 207188 L268 2009 1050 1845*2^688142-1 207155 L251 2009 1051 1695*2^688026+1 207120 g336 2008 1052 101*2^687897+1 207080 p189 2007 1053 137137*2^687797-1 207053 L321 2007 1054b 497*2^687675+1 207014 L1080 2009 1055 499#/97#*2^687105-1 207009 x37 2008 1056 Phi(3,-2074507^16384) 206993 f7 2007 Generalized unique 1057b 509*2^687055+1 206827 L1078 2009 1058 10293*2^687000+1 206812 L155 2008 1059 429*2^686860-1 206769 L566 2009 1060 777*2^686718-1 206726 L548 2009 1061 2034902^32768+1 206719 g295 2002 Generalized Fermat 1062 555*2^686694-1 206719 L566 2009 1063 21*2^686632+1 206699 g279 2004 1064 1353*2^686610-1 206694 L121 2009 1065 Phi(3,-2029827^16384) 206683 f7 2006 Generalized unique 1066 1575*2^686537-1 206672 L251 2009 1067b 553*2^686506+1 206662 L921 2009 1068 12345*2^686316-1 206606 L200 2007 1069 103*2^686251-1 206585 L488 2008 1070e 1035*2^686194-1 206568 L121 2009 1071 635*2^685706-1 206421 L548 2009 1072b 1089*2^685641+1 206402 L820 2009 1073 Phi(3,-1989801^16384) 206400 f7 2006 Generalized unique 1074 1986700^32768+1 206378 g295 2002 Generalized Fermat 1075 873*2^685480-1 206353 L644 2009 1076b 927*2^685398+1 206329 L1081 2009 1077 Phi(3,-3898771219232^8192) 206290 f14 2007 Generalized unique 1078 999*2^685156-1 206256 L644 2009 1079b 885*2^685064+1 206228 L836 2009 1080b 543*2^684986+1 206205 L1062 2009 1081 155*2^684887+1 206174 p189 2007 1082 Phi(3,-3824990769800^8192) 206154 f14 2007 Generalized unique 1083 Phi(3,-3804263911368^8192) 206116 f14 2007 Generalized unique 1084 Phi(3,-1949616^16384) 206110 f7 2006 Generalized unique 1085 935*2^684668-1 206109 L644 2009 1086 481*2^684665-1 206108 L566 2009 1087 13*2^684560+1 206075 g267 2003 Divides GF(684557,10), GF(684559,6) 1088 1359*2^684535-1 206069 L121 2009 1089 Phi(3,-3775889401250^8192) 206062 f14 2007 Generalized unique 1090 Phi(3,-3757143544200^8192) 206027 f14 2007 Generalized unique 1091 663*2^684374-1 206020 L566 2009 1092 67*2^684258+1 205985 g402 2008 1093 Phi(3,-1932045^16384) 205981 f7 2006 Generalized unique 1094 Phi(3,-1925507^16384) 205932 f7 2006 Generalized unique 1095e 1197*2^684010-1 205911 L121 2009 1096 1922592^32768+1 205911 g295 2002 Generalized Fermat 1097 171*2^684003-1 205908 L91 2005 1098 Phi(3,-1910944^16384) 205824 f7 2006 Generalized unique 1099 1909372^32768+1 205813 g295 2002 Generalized Fermat 1100 Phi(3,-3632746914882^8192) 205787 f14 2007 Generalized unique 1101 Phi(3,-3629324489672^8192) 205781 f14 2007 Generalized unique 1102 85*2^683573-1 205778 L323 2007 1103 513*2^683547-1 205771 L701 2009 1104 543*2^683355-1 205714 L566 2009 1105 563*2^683292-1 205695 L566 2009 1106 609*2^683212-1 205671 L566 2009 1107 Phi(3,-1886204^16384) 205639 f7 2006 Generalized unique 1108 909*2^683019-1 205613 L644 2009 1109b 247*2^682974+1 205599 L1020 2009 1110 321*2^682493-1 205454 L548 2009 1111e 1067*2^682148-1 205351 L121 2009 1112 1977*2^682144-1 205350 L621 2008 1113 Phi(3,-1847091^16384) 205341 f7 2006 Generalized unique 1114 95*2^682055+1 205321 p227 2008 1115 717*2^682046-1 205320 L566 2009 1116 Phi(3,-1833726^16384) 205237 f6 2006 Generalized unique 1117b 553*2^681652+1 205201 L749 2009 1118f 1263*2^681632-1 205195 L121 2009 1119 Phi(3,-3338434976648^8192) 205186 f14 2008 Generalized unique 1120 1313*2^681522-1 205162 L121 2009 1121 185*2^681393+1 205122 p189 2007 1122b 903*2^681374+1 205117 L654 2009 1123b 1023*2^681313+1 205099 L1002 2009 1124 Phi(3,-1799953^16384) 204973 f7 2006 Generalized unique 1125b 1175*2^680791+1 204942 L1021 2009 1126 829*2^680777-1 204938 L644 2009 1127b 351*2^680731+1 204923 L1022 2009 1128 246419198025*2^680688-1 204919 L106 2007 1129b 247*2^680694+1 204912 L749 2009 1130f 1261*2^680627-1 204893 L121 2009 1131b 1049*2^680617+1 204890 L1023 2009 1132 783*2^680388-1 204821 L548 2009 1133 515*2^680196-1 204763 L566 2009 1134 211*2^680135-1 204744 L426 2008 1135e 1181*2^679914-1 204678 L121 2009 1136 965*2^679780-1 204638 L644 2009 1137 1269*2^679747-1 204628 L121 2009 1138 1755378^32768+1 204616 GF2 2002 Generalized Fermat 1139 649*2^679239-1 204475 L548 2009 1140b 889*2^679238+1 204474 L1010 2009 1141c 759*2^679127+1 204441 L635 2009 1142 1695*2^678764+1 204332 g336 2008 1143 160*17^166048+1 204316 p231 2008 1144a 5865*2^678597-1 204282 L121 2009 1145 669*2^678357-1 204209 L566 2009 1146 Phi(3,-1705876^16384) 204209 f7 2006 Generalized unique 1147 Phi(3,-2894735600712^8192) 204172 f17 2008 Generalized unique 1148 881*2^678138-1 204143 L644 2009 1149 6119*2^678080-1 204127 L251 2007 1150b 1183*2^678030+1 204111 L1034 2009 1151 Phi(3,-2866364976672^8192) 204101 f17 2008 Generalized unique 1152c 603*2^677816+1 204046 L687 2009 1153e 1011*2^677791-1 204039 L121 2009 1154c 599*2^677727+1 204019 L717 2009 1155 625*2^677325-1 203898 L566 2009 1156 Phi(3,-1668188^16384) 203891 f7 2006 Generalized unique 1157 Phi(3,-2781445091042^8192) 203887 f17 2007 Generalized unique 1158b 2089*2^677263-1 203880 L268 2009 1159e 1081*2^677035-1 203811 L121 2009 1160 Phi(3,-2750281713792^8192) 203807 f17 2007 Generalized unique 1161 Phi(3,-1656973^16384) 203795 f7 2006 Generalized unique 1162e 1125*2^676903-1 203772 L121 2009 1163 Phi(3,-1648264^16384) 203720 f7 2006 Generalized unique 1164 1261*2^676597-1 203680 L121 2009 1165 Phi(3,-2694769342722^8192) 203662 f17 2007 Generalized unique 1166c 385*2^676460+1 203638 L635 2009 1167 Phi(3,-1636894^16384) 203622 f7 2006 Generalized unique 1168c 385*2^676390+1 203617 L687 2009 1169c 1455*2^676138-1 203541 g405 2009 1170 203*2^676032-1 203509 L384 2008 1171 Phi(3,-1623927^16384) 203508 f7 2006 Generalized unique 1172c 585*2^675972+1 203491 L976 2009 1173 Phi(3,-1620351^16384) 203477 f7 2006 Generalized unique 1174 Phi(3,-2623996861250^8192) 203473 f17 2007 Generalized unique 1175 Phi(3,-2590433963552^8192) 203381 f14 2007 Generalized unique 1176 10474035*2^675578-1 203377 L18 2008 1177 709*2^675411-1 203322 L548 2009 1178c 415*2^675284+1 203284 L739 2009 1179 209*2^675232-1 203268 L421 2007 1180 1455*2^675193+1 203257 g405 2008 1181 Phi(3,-1589754^16384) 203206 f7 2006 Generalized unique 1182 2995125705*2^674974-1 203197 L87 2005 1183 651*2^674785-1 203134 L566 2009 1184 Phi(3,-2490345104258^8192) 203101 f14 2006 Generalized unique 1185 1585*2^674467-1 203038 L282 2009 1186 121*2^674360+1 203005 p189 2007 Generalized Fermat 1187 Phi(3,-2446029620000^8192) 202973 f14 2006 Generalized unique 1188 503*2^674214-1 202962 L566 2009 1189 Phi(3,-1562069^16384) 202956 f7 2006 Generalized unique 1190 Phi(3,-1557862^16384) 202917 f7 2006 Generalized unique 1191 33*2^674050-1 202911 L138 2007 1192d 1085*2^673841+1 202850 L953 2009 1193 423*2^673728-1 202815 L566 2009 1194 55*2^673708+1 202809 p227 2008 1195 2029*2^673583-1 202772 L614 2008 1196 917*2^673570-1 202768 L644 2009 1197 871*2^673565-1 202767 L644 2009 1198 1815*2^673335-1 202698 L251 2009 1199d 577*2^673046+1 202610 L820 2009 1200 849*2^673024-1 202604 L644 2009 1201 605*2^672972-1 202588 L548 2009 1202 357*2^672930-1 202575 L548 2009 1203 1519380^32768+1 202561 g204 2001 Generalized Fermat 1204d 1087*2^672780+1 202530 L813 2009 1205d 991*2^672652+1 202492 L946 2009 1206 Phi(3,-1505290^16384) 202429 f7 2006 Generalized unique 1207 7844265*2^672401+1 202420 g336 2006 1208 597*2^672336-1 202397 L566 2009 1209 34252725*2^672043-1 202313 p113 2005 1210 27*2^672007+1 202296 g279 2005 Divides Fermat F(672005) 1211e 1167*2^671949-1 202280 L121 2009 1212d 465*2^671915+1 202270 L687 2009 1213d 375*2^671720+1 202211 L717 2009 1214 1209*2^671449-1 202130 L121 2009 1215 2933*2^671312-1 202089 L698 2009 1216d 625*2^671200+1 202055 L948 2009 Generalized Fermat 1217 Phi(3,-1464219^16384) 202035 f7 2006 Generalized unique 1218d 633*2^671129+1 202033 L937 2009 1219 666625245*2^671089-1 202027 L545 2008 1220 319*2^671009-1 201997 L548 2009 1221 243*2^670891-1 201961 p48 2004 1222 607*2^670861-1 201953 L548 2009 1223 4*3^423253-1 201944 p228 2009 1224d 217*2^670496+1 201842 L919 2009 1225 683*2^670454-1 201830 L548 2009 1226d 925*2^670294+1 201782 L932 2009 1227 379371*2^670001-1 201696 L185 2007 1228d 911*2^669971+1 201685 L635 2009 1229 Phi(3,-2024357714082^8192) 201627 f20 2007 Generalized unique 1230 1581823815*2^669473-1 201541 L83 2006 1231 Phi(3,-1413863^16384) 201537 f7 2006 Generalized unique 1232 493*2^669151-1 201438 L823 2009 1233 1235*2^669066-1 201413 L121 2009 1234 Phi(3,-1400719^16384) 201404 f7 2006 Generalized unique 1235e 2790659*2^668779+1 201329 g405 2009 1236 2306679*2^668779+1 201329 g405 2009 1237 2238689*2^668779+1 201329 g405 2009 1238 1727217*2^668779+1 201329 g405 2009 1239 829127*2^668779+1 201329 g405 2008 1240 658217*2^668779+1 201329 g405 2008 1241 84945*2^668779+1 201328 g405 2007 1242 465*2^668701-1 201302 L198 2007 1243 177*2^668682-1 201296 L145 2006 1244 52421*469762048^23209-1 201271 x37 2008 1245d 255*2^668348+1 201196 L926 2009 1246 231*2^668218-1 201157 L87 2005 1247 Phi(3,-1894115805122^8192) 201154 f17 2007 Generalized unique 1248 Phi(3,-1869137652722^8192) 201059 f20 2007 Generalized unique 1249 417*2^667878-1 201054 L701 2009 1250 732351*2^667766-1 201024 L402 2008 1251 476267*2^667766-1 201024 L402 2008 1252 272517*2^667766-1 201024 L402 2008 1253 Phi(3,-1362748^16384) 201013 f7 2006 Generalized unique 1254 1177*2^667697-1 201000 L621 2008 1255d 879*2^667629+1 200980 L687 2009 1256 113*2^667533+1 200950 g47 2003 1257 Phi(3,-1837555687682^8192) 200938 f20 2007 Generalized unique 1258 929*2^667460-1 200929 L644 2009 1259e 1139*2^667392-1 200909 L121 2009 1260 Phi(3,-1812760323200^8192) 200841 f20 2006 Generalized unique 1261 979*2^667087-1 200817 L644 2009 1262 667071*2^667071-1 200815 g55 2000 Woodall 1263d 729*2^667013+1 200794 L758 2009 1264 Phi(3,-1787221992200^8192) 200740 f2 2006 Generalized unique 1265e 1053*2^666819-1 200736 L121 2009 1266 321*2^666797-1 200729 L548 2009 1267 Phi(3,-1335473^16384) 200725 f7 2006 Generalized unique 1268 Phi(3,-1779048754632^8192) 200708 f2 2006 Generalized unique 1269d 747*2^666718+1 200705 L692 2009 1270a 368732669415*2^666669-1 200699 L1113 2009 1271a 90703796385*2^666671-1 200699 L950 2009 1272a 358327929585*2^666669-1 200699 L927 2009 1273a 164981026215*2^666670-1 200699 L1111 2009 1274a 327998321145*2^666669-1 200699 L927 2009 1275b 306931805355*2^666669-1 200699 L975 2009 1276a 149563137435*2^666670-1 200699 L1108 2009 1277b 287929150365*2^666669-1 200699 L1087 2009 1278b 140546041845*2^666670-1 200699 L999 2009 1279b 70016722545*2^666671-1 200699 L998 2009 1280b 536939538135*2^666668-1 200699 L1090 2009 1281a 132958718625*2^666670-1 200699 L1101 2009 1282b 63125250705*2^666671-1 200699 L927 2009 1283b 250119696225*2^666669-1 200699 L1019 2009 1284b 996979600575*2^666667-1 200699 L998 2009 1285c 122440922415*2^666670-1 200699 L929 2009 1286c 487311673635*2^666668-1 200699 L999 2009 1287b 969817863705*2^666667-1 200699 L929 2009 1288b 968608928685*2^666667-1 200699 L1082 2009 1289c 119723160885*2^666670-1 200699 L985 2009 1290b 956789972745*2^666667-1 200699 L1064 2009 1291c 478393196715*2^666668-1 200699 L1005 2009 1292b 954914054415*2^666667-1 200699 L928 2009 1293b 462189145575*2^666668-1 200699 L1070 2009 1294b 907289388885*2^666667-1 200699 L1012 2009 1295b 906318452205*2^666667-1 200699 L1009 2009 1296b 901167205455*2^666667-1 200699 L1009 2009 1297c 417228711465*2^666668-1 200699 L992 2009 1298b 819745524885*2^666667-1 200699 L1019 2009 1299c 405387805305*2^666668-1 200699 L998 2009 1300c 198432507075*2^666669-1 200699 L998 2009 1301c 97973729595*2^666670-1 200699 L987 2009 1302c 48355385595*2^666671-1 200699 L963 2009 1303c 372506251095*2^666668-1 200699 L596 2009 1304c 45886199355*2^666671-1 200699 L998 2009 1305a 729243456765*2^666667-1 200699 L997 2009 1306c 45110126025*2^666671-1 200699 L941 2009 1307c 359623309275*2^666668-1 200699 L967 2009 1308c 44891884695*2^666671-1 200699 L982 2009 1309c 716670572385*2^666667-1 200699 L967 2009 1310c 175318235715*2^666669-1 200699 L929 2009 1311c 87008113995*2^666670-1 200699 L967 2009 1312c 168841129875*2^666669-1 200699 L994 2009 1313c 168018725325*2^666669-1 200699 L998 2009 1314c 164012540235*2^666669-1 200699 L998 2009 1315c 327301665705*2^666668-1 200699 L977 2009 1316c 327104331645*2^666668-1 200699 L992 2009 1317c 158487544185*2^666669-1 200699 L967 2009 1318c 78556190265*2^666670-1 200699 L998 2009 1319c 310193250885*2^666668-1 200699 L1007 2009 1320c 141385846245*2^666669-1 200699 L984 2009 1321c 560242258035*2^666667-1 200699 L1001 2009 1322c 539176105425*2^666667-1 200699 L1000 2009 1323b 519559526955*2^666667-1 200699 L998 2009 1324c 128051660985*2^666669-1 200699 L967 2009 1325c 503178989445*2^666667-1 200699 L967 2009 1326c 499278046995*2^666667-1 200699 L967 2009 1327c 495480241725*2^666667-1 200699 L986 2009 1328c 61334327535*2^666670-1 200699 L928 2009 1329d 242445725235*2^666668-1 200699 L952 2009 1330c 484371529005*2^666667-1 200699 L959 2009 1331c 238629177045*2^666668-1 200699 L958 2009 1332c 474684713865*2^666667-1 200699 L998 2009 1333c 236886206865*2^666668-1 200699 L955 2009 1334c 473263441035*2^666667-1 200699 L995 2009 1335c 942293799405*2^666666-1 200699 L966 2009 1336c 930755947245*2^666666-1 200699 L981 2009 1337c 917813702685*2^666666-1 200699 L980 2009 1338c 456144712905*2^666667-1 200699 L941 2009 1339c 7044948195*2^666673-1 200699 L998 2009 1340c 901573351605*2^666666-1 200699 L955 2009 1341d 223713039945*2^666668-1 200699 L941 2009 1342d 111173170965*2^666669-1 200699 L951 2009 1343c 442723827075*2^666667-1 200699 L929 2009 1344d 219627620145*2^666668-1 200699 L949 2009 1345c 430029904575*2^666667-1 200699 L963 2009 1346d 213922956555*2^666668-1 200699 L931 2009 1347c 212061986115*2^666668-1 200699 L950 2009 1348c 52451296455*2^666670-1 200699 L929 2009 1349d 104617481055*2^666669-1 200699 L950 2009 1350c 823835071755*2^666666-1 200699 L990 2009 1351c 812916110205*2^666666-1 200699 L979 2009 1352c 812642988225*2^666666-1 200699 L967 2009 1353c 807402286425*2^666666-1 200699 L975 2009 1354c 49760808705*2^666670-1 200699 L992 2009 1355c 197881823985*2^666668-1 200699 L950 2009 1356c 774922009305*2^666666-1 200699 L1006 2009 1357c 772204518615*2^666666-1 200699 L998 2009 1358c 748060005735*2^666666-1 200699 L998 2009 1359c 92036317215*2^666669-1 200699 L935 2009 1360c 729317390175*2^666666-1 200699 L973 2009 1361b 724298006775*2^666666-1 200699 L997 2009 1362c 359642468835*2^666667-1 200699 L949 2009 1363c 44568164835*2^666670-1 200699 L998 2009 1364c 710658051645*2^666666-1 200699 L974 2009 1365c 349687235415*2^666667-1 200699 L998 2009 1366c 347243391375*2^666667-1 200699 L939 2009 1367c 691885370895*2^666666-1 200699 L977 2009 1368c 86366879835*2^666669-1 200699 L961 2009 1369c 675852195975*2^666666-1 200699 L941 2009 1370d 168722579595*2^666668-1 200699 L950 2009 1371c 658335934095*2^666666-1 200699 L958 2009 1372c 655706329995*2^666666-1 200699 L966 2009 1373c 653229833655*2^666666-1 200699 L949 2009 1374d 80661652935*2^666669-1 200699 L929 2009 1375c 79561903365*2^666669-1 200699 L935 2009 1376d 158287353315*2^666668-1 200699 L950 2009 1377c 316024431645*2^666667-1 200699 L964 2009 1378c 310599873465*2^666667-1 200699 L954 2009 1379c 296452099425*2^666667-1 200699 L941 2009 1380c 581487376725*2^666666-1 200699 L989 2009 1381d 36332767365*2^666670-1 200699 L929 2009 1382c 578250057675*2^666666-1 200699 L971 2009 1383c 279984214005*2^666667-1 200699 L969 2009 1384c 557274054645*2^666666-1 200699 L966 2009 1385c 276681310695*2^666667-1 200699 L955 2009 1386c 270233172825*2^666667-1 200699 L957 2009 1387c 540389681205*2^666666-1 200699 L989 2009 1388c 539748109365*2^666666-1 200699 L991 2009 1389c 539660805675*2^666666-1 200699 L964 2009 1390c 538704377055*2^666666-1 200699 L978 2009 1391d 133340429445*2^666668-1 200699 L596 2009 1392b 528533085225*2^666666-1 200699 L998 2009 1393c 64767237255*2^666669-1 200699 L955 2009 1394b 510050501385*2^666666-1 200699 L997 2009 1395c 245496678195*2^666667-1 200699 L998 2009 1396d 60999971445*2^666669-1 200699 L596 2009 1397c 486134751135*2^666666-1 200699 L956 2009 1398d 241288715085*2^666667-1 200699 L949 2009 1399d 233733565275*2^666667-1 200699 L945 2009 1400c 449065565865*2^666666-1 200699 L997 2009 1401c 445258759155*2^666666-1 200699 L596 2009 1402d 219076353615*2^666667-1 200699 L942 2009 1403d 108940034175*2^666668-1 200699 L931 2009 1404d 108871789005*2^666668-1 200699 L929 2009 1405c 422625250575*2^666666-1 200699 L970 2009 1406d 421810043235*2^666666-1 200699 L944 2009 1407c 419894014365*2^666666-1 200699 L988 2009 1408d 413579272935*2^666666-1 200699 L929 2009 1409d 188910734745*2^666667-1 200699 L934 2009 1410d 177956653035*2^666667-1 200699 L936 2009 1411d 338514940755*2^666666-1 200698 L943 2009 1412c 167983482435*2^666667-1 200698 L965 2009 1413c 165288962355*2^666667-1 200698 L998 2009 1414d 163271945865*2^666667-1 200698 L935 2009 1415d 81519140415*2^666668-1 200698 L596 2009 1416c 325445440785*2^666666-1 200698 L929 2009 1417d 39222855075*2^666669-1 200698 L933 2009 1418d 309213767625*2^666666-1 200698 L634 2009 1419d 295274634975*2^666666-1 200698 L938 2009 1420d 287761939395*2^666666-1 200698 L939 2009 1421d 278052776685*2^666666-1 200698 L940 2009 1422d 68717499255*2^666668-1 200698 L927 2009 1423d 274692251265*2^666666-1 200698 L941 2009 1424c 268483786305*2^666666-1 200698 L993 2009 1425d 16385432895*2^666670-1 200698 L928 2009 1426c 258745609365*2^666666-1 200698 L929 2009 1427b 229399250265*2^666666-1 200698 L1008 2009 1428c 205755621795*2^666666-1 200698 L731 2009 1429d 188178691305*2^666666-1 200698 L731 2009 1430b 122267375055*2^666666-1 200698 L731 2009 1431 38727148425*2^666667-1 200698 L731 2009 1432f 37338495255*2^666667-1 200698 L891 2009 1433 73115782155*2^666666-1 200698 L731 2009 1434f 2256169425*2^666671-1 200698 L731 2009 1435 17985131955*2^666668-1 200698 L731 2009 1436 8802104325*2^666669-1 200698 L731 2009 1437e 63731368545*2^666666-1 200698 L731 2009 1438 29620984455*2^666667-1 200698 L722 2009 1439 52909376355*2^666666-1 200698 L731 2009 1440 45659554125*2^666666-1 200698 L634 2008 1441 43474951665*2^666666-1 200698 L643 2008 1442 5005026675*2^666669-1 200698 L634 2008 1443 9011376825*2^666668-1 200698 L596 2008 1444 32140685925*2^666666-1 200697 L596 2008 1445 29820115785*2^666666-1 200697 L596 2008 1446 7668057255*2^666667-1 200697 L596 2008 1447 4197278295*2^666667-1 200697 L596 2008 1448d 897*2^666688+1 200697 L921 2009 1449 6476615*2^666666-1 200694 L81 2005 1450 5194163*2^666666-1 200694 L81 2006 1451 5135955*2^666666-1 200694 L81 2006 1452 4834137*2^666666-1 200694 L81 2006 1453 4658895*2^666666-1 200694 L81 2006 1454 3028517*2^666666-1 200693 L81 2005 1455 2806367*2^666666-1 200693 L81 2005 1456 2403341*2^666666-1 200693 L81 2005 1457 2172225*2^666666-1 200693 L81 2005 1458 2031801*2^666666-1 200693 L81 2005 1459 323955*2^666667-1 200693 g141 2006 1460 192201*2^666666-1 200692 L81 2005 1461d 537*2^666454+1 200626 L692 2009 1462b 5445*2^666302-1 200581 L121 2009 1463 31*2^666285-1 200574 L330 2007 1464e 1041*2^666034-1 200500 L121 2009 1465 1245*2^665997-1 200489 L121 2009 1466 177*2^665874-1 200451 L145 2006 1467 Phi(3,-1309000^16384) 200440 f7 2006 Generalized unique 1468 Phi(3,-1710250412694^8192) 200427 f18 2006 Generalized unique 1469 2*419^76419+1 200388 g404 2007 Divides Phi(419^76419,2) 1470 Phi(3,-1303833^16384) 200384 p72 2006 Generalized unique 1471d 371*2^665639+1 200380 L907 2009 1472 825*2^665464-1 200328 L268 2008 1473 Phi(3,-1681821221814^8192) 200308 f18 2006 Generalized unique 1474 Phi(3,-1673443651250^8192) 200272 f2 2007 Generalized unique 1475e 1073*2^665176-1 200241 L121 2009 1476 Phi(3,-1287328^16384) 200203 f7 2006 Generalized unique 1477d 561*2^664923+1 200165 L921 2009 1478d 651*2^664899+1 200158 L710 2009 1479 1277444^32768+1 200093 GF2 2002 Generalized Fermat 1480 Phi(3,-1276943^16384) 200088 f7 2006 Generalized unique 1481 Phi(3,-1275383^16384) 200070 f7 2006 Generalized unique 1482 563*2^664568-1 200058 L548 2009 1483c 4866867*2^664385-1 200007 L466 2009 1484c 4827229*2^664385-1 200007 L466 2009 1485 3240639*2^664385-1 200007 L466 2008 1486 2207995*2^664385-1 200007 L466 2008 1487 1749375*2^664385-1 200007 L466 2008 1488 1693305*2^664385-1 200007 L466 2008 1489 1662657*2^664385-1 200007 L466 2008 1490 1197385*2^664385-1 200006 L466 2007 1491 566971*2^664385-1 200006 L466 2007 1492 398355*2^664385-1 200006 L466 2007 1493 415062551*2^664357+1 200001 p221 2008 1494 414489473*2^664357+1 200001 p221 2008 1495 413308331*2^664357+1 200001 p221 2008 1496 57101*2^664369+1 200000 L652 2008 1497 2638216539*2^664351+1 199999 p38 2004 1498b 2065*2^664099-1 199918 L268 2009 1499 Phi(3,-1261293^16384) 199912 f7 2006 Generalized unique 1500e 3005*2^663928-1 199866 L615 2009 1501 Phi(3,-1249815^16384) 199782 f4 2006 Generalized unique 1502 177*2^663601-1 199767 L145 2006 1503 605*2^663508-1 199739 L701 2009 1504 217*2^663509-1 199739 L323 2008 1505e 1435*2^663343-1 199690 L701 2009 1506 875*2^663162-1 199635 L644 2009 1507 812881*2^663152+1 199635 g156 2009 1508 783*2^663015-1 199591 L701 2009 1509d 1161*2^662947+1 199570 L919 2009 1510a 9441*2^662846-1 199541 L323 2009 1511 305*2^662808-1 199528 L543 2008 1512e 1785*2^662755-1 199513 L619 2009 1513 267*2^662524-1 199443 L400 2007 1514 246419198025*2^662444-1 199427 L106 2007 1515 Phi(3,-1218494^16384) 199421 f7 2006 Generalized unique 1516 1217284^32768+1 199407 GF4 2002 Generalized Fermat 1517e 569*2^662317+1 199381 L913 2009 1518 1225*2^662229-1 199354 L121 2009 1519e 931*2^662216+1 199350 L906 2009 1520f 1573*2^662203-1 199347 L543 2009 1521 937*2^662181-1 199340 L644 2009 1522 1210354^32768+1 199325 GF4 2002 Generalized Fermat 1523 12591*2^662053+1 199302 g411 2007 1524e 647*2^661991+1 199282 L710 2009 1525 Phi(3,-1203036^16384) 199239 f7 2006 Generalized unique 1526e 1185*2^661780-1 199219 L121 2009 1527 Phi(3,-1439751774050^8192) 199202 f13 2006 Generalized unique 1528 101670*91^101670+1 199181 g157 2005 Generalized Cullen 1529f 1413*2^661562-1 199154 L543 2009 1530e 1017*2^661485-1 199130 L121 2009 1531b 2151*2^661323-1 199082 L268 2009 1532f 1855*2^661155-1 199031 L800 2009 1533 Phi(3,-1386775296486^8192) 198935 f18 2006 Generalized unique 1534f 1617*2^660752-1 198910 L697 2009 1535 713*2^660750-1 198909 L701 2009 1536 Phi(3,-1381078788338^8192) 198906 f13 2006 Generalized unique 1537 261*2^660709-1 198896 L384 2007 1538e 555*2^660664+1 198883 L665 2009 1539 1171824^32768+1 198865 GF3 2002 Generalized Fermat 1540 Phi(3,-1370075257800^8192) 198849 f13 2006 Generalized unique 1541 1169486^32768+1 198837 GF3 2002 Generalized Fermat 1542 1167528^32768+1 198813 GF3 2002 Generalized Fermat 1543 1161054^32768+1 198734 GF3 2002 Generalized Fermat 1544 1665*2^659957-1 198671 L701 2009 1545 4*3^416337-1 198644 p228 2008 1546 Phi(3,-1323323714952^8192) 198602 f13 2006 Generalized unique 1547 Phi(3,-1148089^16384) 198574 f7 2006 Generalized unique 1548 893*2^659586-1 198559 L644 2009 1549 1313*2^659312-1 198476 L121 2009 1550 125*2^659314-1 198476 L138 2006 1551 Phi(3,-1138316^16384) 198452 f7 2006 Generalized unique 1552 315*2^659232-1 198452 L536 2009 1553 Phi(3,-1295428614498^8192) 198450 f13 2006 Generalized unique 1554 1495*2^659159-1 198430 L697 2009 1555 1815*2^659158-1 198430 L251 2009 1556 3234846615*2^658992-1 198386 p113 2006 1557 Phi(3,-1282439561288^8192) 198379 f13 2006 Generalized unique 1558 149*2^658917+1 198356 p189 2007 1559e 315*2^658900+1 198352 L813 2009 1560 Phi(3,-1277505869400^8192) 198351 f18 2006 Generalized unique 1561f 683*2^658857+1 198339 L685 2009 1562 Phi(3,-1129153^16384) 198337 f7 2006 Generalized unique 1563 Phi(3,-1269203662322^8192) 198305 f14 2009 Generalized unique 1564a 16995*2^658680-1 198287 L644 2009 1565 815*2^658632-1 198271 L644 2009 1566 Phi(3,-1242871618688^8192) 198156 f14 2009 Generalized unique 1567 727*2^658245-1 198155 L548 2009 1568 1113768^32768+1 198142 g274 2002 Generalized Fermat 1569f 993*2^658034+1 198091 L813 2009 1570 745*2^657911-1 198054 L701 2009 1571 573*2^657807-1 198023 L585 2009 1572 51*2^657705-1 197991 L148 2007 1573e 1067*2^657664-1 197980 L121 2009 1574 111546435*2^657608-1 197968 L466 2008 1575 1505*2^657540-1 197943 L700 2009 1576 Phi(3,-1098136^16384) 197941 f4 2005 Generalized unique 1577 1096382^32768+1 197918 GF3 2002 Generalized Fermat 1578 177*2^657458+1 197917 L129 2005 1579b 2089*2^657381-1 197895 L268 2009 1580 459*2^657272-1 197862 L548 2009 1581 1851*2^656958-1 197768 L804 2009 1582 111*2^656935-1 197760 L91 2005 1583 1793*2^656912-1 197754 L697 2009 1584f 659*2^656845+1 197733 L877 2009 1585 Phi(3,-1079569^16384) 197698 f7 2005 Generalized unique 1586 1074542^32768+1 197632 GF3 2001 Generalized Fermat 1587f 429*2^656445+1 197613 L813 2009 1588 1635*2^656285-1 197565 L697 2009 1589 15*2^656264-1 197557 L52 2005 1590 85*2^656039-1 197490 L323 2007 1591 Phi(3,-1063662^16384) 197487 f4 2005 Generalized unique 1592 533*2^656000-1 197479 L548 2009 1593 1485*2^655977+1 197472 g405 2008 1594 1210421*2^655938-1 197464 L536 2009 1595e 1185*2^655936-1 197460 L121 2009 1596f 651*2^655935+1 197459 L888 2009 1597a 9101981*2^655830-1 197432 g405 2009 1598f 871*2^655608+1 197361 L717 2009 1599f 909*2^655606+1 197361 L119 2009 1600 Phi(3,-1052811^16384) 197341 f7 2005 Generalized unique 1601f 1161*2^655507+1 197331 L119 2009 1602f 1071*2^655399+1 197298 L846 2009 1603f 681*2^655393+1 197296 L685 2009 1604 801*2^655362-1 197287 L644 2009 1605f 461*2^655327+1 197276 L651 2009 1606 1007446395*2^655278+1 197268 p221 2009 1607d 1007372815*2^655278+1 197268 p221 2009 1608e 1007265435*2^655278+1 197268 p221 2009 1609e 1007249625*2^655278+1 197268 p221 2009 1610 1005474877*2^655278+1 197268 p221 2009 1611 1003053615*2^655278+1 197268 p221 2009 1612 1002809565*2^655278+1 197268 p221 2009 1613 1001497677*2^655278+1 197268 p221 2009 1614 1000372195*2^655278+1 197268 p221 2009 1615f 617*2^655259+1 197256 L685 2009 1616 1559*2^655252-1 197254 L697 2009 1617 87258*182^87258+1 197215 g392 2006 Generalized Cullen 1618 692835*2^655075-1 197204 L138 2006 1619 181*2^655067-1 197198 L138 2006 1620 1041870^32768+1 197192 g0 2000 Generalized Fermat 1621 561*2^654972+1 197169 L687 2009 1622f 517*2^654868+1 197138 L661 2009 1623 1165*2^654821-1 197124 L268 2008 1624 1991*2^654810-1 197121 L697 2009 1625 Phi(3,-1034698^16384) 197094 f7 2005 Generalized unique 1626 2*797^67907+1 197030 g404 2008 1627 83*2^654488-1 197023 L323 2007 1628 385*2^654349-1 196982 L644 2009 1629 31503*2^654323-1 196976 L71 2008 1630 125115*2^654321-1 196976 L71 2008 1631 22723*2^654323-1 196976 L71 2008 1632 4747*2^654325-1 196976 L71 2008 1633 1049*2^654169+1 196928 L687 2009 1634 1371*2^654118-1 196913 L121 2009 1635 1305*2^654081-1 196902 L121 2009 1636 Phi(3,-1019849^16384) 196888 f7 2005 Generalized unique 1637 1145*2^653963+1 196866 L692 2009 1638f 607*2^653872+1 196838 L689 2009 1639 755*2^653850-1 196832 L548 2009 1640 Phi(3,-1029757567704^8192) 196817 f18 2006 Generalized unique 1641 675*2^653795-1 196815 L701 2009 1642 177*2^653686-1 196782 L145 2006 1643 Phi(3,-1016817857568^8192) 196727 f2 2007 Generalized unique 1644 Phi(3,-1007934^16384) 196721 f4 2005 Generalized unique 1645 435*2^653451+1 196711 L763 2009 1646 Phi(3,-1008401650082^8192) 196668 f2 2007 Generalized unique 1647 Phi(3,-1003271^16384) 196655 f7 2005 Generalized unique 1648 999236^32768+1 196598 g141 2000 Generalized Fermat 1649 943*2^653046+1 196590 L867 2009 1650 465*2^652931+1 196555 L679 2009 1651 905*2^652908-1 196548 L644 2009 1652 5955*2^652721-1 196493 L268 2008 1653 Phi(3,-991824^16384) 196492 f7 2005 Generalized unique 1654 Phi(3,-983319115446^8192) 196489 f18 2006 Generalized unique 1655 Phi(3,-991445^16384) 196486 p72 2005 Generalized unique 1656 1075*2^652659-1 196473 L268 2008 1657 687*2^652368+1 196386 L665 2009 1658 915*2^652353-1 196381 L268 2008 1659 649*2^652103-1 196306 L566 2009 1660 141*2^652057+1 196291 L668 2009 1661 759*2^651993-1 196273 L548 2009 1662 Phi(3,-970312^16384) 196180 f4 2005 Generalized unique 1663 1085*2^651479+1 196118 L763 2009 1664a 58695*2^651444-1 196109 L644 2009 1665 239*2^651413+1 196098 L679 2009 1666e 1035*2^651348-1 196079 L121 2009 1667 98035*10^196070+1 196075 g157 2007 Generalized Cullen 1668 971*2^651325+1 196072 L691 2009 1669 1877*2^651256-1 196051 L698 2009 1670 10474035*2^651162-1 196027 L18 2008 1671 615*2^651041-1 195986 L268 2008 1672 55*2^651015-1 195977 L325 2007 1673 159*2^650934+1 195953 p189 2007 1674 1787*2^650908-1 195947 L800 2009 1675 Phi(3,-910253972322^8192) 195939 f6 2006 Generalized unique 1676 Phi(3,-953686^16384) 195934 f4 2005 Generalized unique 1677 321*2^650818-1 195919 L548 2009 1678 Phi(3,-902662726688^8192) 195880 f6 2006 Generalized unique 1679 1509*2^650501-1 195824 L698 2009 1680 325*2^650493-1 195821 L548 2009 1681 1745*2^650260-1 195752 L700 2009 1682 1209*2^650107-1 195705 L121 2009 1683a 9525*2^649969-1 195665 L644 2009 1684 Phi(3,-934486^16384) 195644 f7 2005 Generalized unique 1685 215503*2^649891-1 195643 g163 2003 1686 607*2^649860+1 195631 L758 2009 1687 Phi(3,-932333^16384) 195611 f7 2005 Generalized unique 1688 793*2^649747-1 195597 L566 2009 1689 1985*2^649728-1 195591 L697 2009 1690 1791*2^649689-1 195580 L697 2009 1691 741*2^649621-1 195559 L566 2009 1692 1000000001*2^649519+1 195534 p221 2009 1693 1877*2^649526-1 195531 L697 2009 1694 395*2^649445+1 195506 L849 2009 1695b 6705*2^649240-1 195445 L121 2009 1696 829*2^649149-1 195417 L644 2009 1697 1215*2^649121-1 195408 L121 2009 1698 1757*2^649008-1 195375 L697 2009 1699b 7215*2^649002-1 195373 L121 2009 1700 1575*2^648997-1 195371 L251 2009 1701 268168*5^279459-1 195339 p246 2007 1702 337*2^648856+1 195328 L844 2009 1703 201*2^648792+1 195309 p241 2009 1704 Phi(3,-832576403232^8192) 195305 f6 2006 Generalized unique 1705 Phi(3,-911498^16384) 195290 f4 2005 Generalized unique 1706 Phi(3,-827841700224^8192) 195264 f18 2006 Generalized unique 1707a 9735*2^648636-1 195263 L644 2009 1708 Phi(3,-823701529944^8192) 195228 f18 2006 Generalized unique 1709b 9075*2^648450-1 195207 L121 2009 1710 Phi(3,-819074564802^8192) 195188 f6 2006 Generalized unique 1711 921*2^647991-1 195068 L644 2009 1712 43018*5^279020+1 195032 p196 2006 1713a 8145*2^647829-1 195020 L644 2009 1714 307*2^647786+1 195006 L635 2009 1715 1431*2^647763-1 195000 L697 2009 1716f 1167*2^647708-1 194983 L121 2009 1717 1627*2^647673-1 194973 L697 2009 1718 605*2^647639+1 194962 L843 2009 1719 5091*2^647536+1 194932 L31 2008 1720 805*2^647277-1 194853 L644 2009 1721 1191*2^647253+1 194846 L687 2009 1722 65*2^647130-1 194808 L148 2006 1723 849*2^646968-1 194760 L644 2009 1724b 8295*2^646773-1 194702 L257 2009 1725 Phi(3,-872302^16384) 194664 f4 2005 Generalized unique 1726 1185*2^646586+1 194645 L635 2009 1727 Phi(3,-870765^16384) 194639 f4 2005 Generalized unique 1728 Phi(3,-754964889632^8192) 194608 f6 2006 Generalized unique 1729 1263*2^646400-1 194589 L121 2009 1730 109*2^646403-1 194589 L426 2008 1731 Phi(3,-750746212658^8192) 194569 f6 2006 Generalized unique 1732 5955*2^646244-1 194543 L268 2008 1733 1785*2^646070-1 194490 L697 2009 1734 6465*2^645980-1 194464 L20 2008 1735 19581121*2^645943-1 194456 p49 2003 1736 717*2^645897-1 194438 L701 2009 1737f 1097*2^645874-1 194431 L121 2009 1738b 9495*2^645744-1 194393 L644 2009 1739 855124^32768+1 194381 g141 2001 Generalized Fermat 1740f 1073*2^645570-1 194339 L121 2009 1741 19*2^645555-1 194333 L177 2006 1742 45*2^645542-1 194330 L282 2007 1743b 6705*2^645467-1 194309 L257 2009 1744 1455*2^645453-1 194304 L698 2009 1745 4331*2^645398-1 194288 L123 2007 1746 187*2^645401-1 194288 L384 2008 1747 861*2^645393-1 194286 L79 2006 1748 423*2^644966+1 194157 L656 2009 1749 1863*2^644951-1 194153 L804 2009 1750 607*2^644861-1 194126 L548 2009 1751 1581823815*2^644836-1 194125 L83 2005 1752b 5535*2^644781-1 194103 L121 2009 1753e 12399*2^644763+1 194098 p77 2009 1754 12345*2^644708-1 194081 L200 2007 1755 11*2^644677+1 194069 g277 2004 1756b 5445*2^644452-1 194004 L121 2009 1757 Phi(3,-693192060000^8192) 194001 f18 2007 Generalized unique 1758 831648^32768+1 193985 g199 2002 Generalized Fermat 1759f 1119*2^644283-1 193952 L121 2009 1760 797*2^644220-1 193933 L548 2009 1761 609*2^644181-1 193921 L701 2009 1762 1135*2^644167-1 193917 L268 2009 1763 753*2^644053+1 193883 L822 2009 1764 29*2^644044-1 193879 L10 2004 1765 825324^32768+1 193876 g199 2002 Generalized Fermat 1766e 10059*2^643787-1 193804 p77 2009 1767 567*2^643700+1 193776 L821 2009 1768 287626*5^277175-1 193743 p212 2008 1769 207*2^643478-1 193709 L330 2007 1770 783*2^643146-1 193610 L548 2009 1771 Phi(3,-808691^16384) 193587 f7 2005 Generalized unique 1772 1131*2^642993+1 193564 L635 2009 1773 93*2^642909+1 193537 g196 2003 1774b 8475*2^642804-1 193508 L644 2009 1775 5655*2^642799-1 193506 L268 2008 1776 775*2^642772+1 193497 L635 2009 1777 1315*2^642425-1 193393 L121 2009 1778 Phi(3,-796191^16384) 193365 f7 2005 Generalized unique 1779 405405*2^642296-1 193356 L466 2008 1780 699*2^642289-1 193352 L548 2009 1781 417*2^642156+1 193311 L692 2009 1782 1311*2^641605-1 193146 L121 2009 1783 373*2^641606+1 193146 L681 2009 1784 425*2^641553+1 193130 L734 2009 1785 1023*2^641310+1 193057 L705 2009 1786b 26565*2^641266-1 193045 L644 2009 1787 1027*2^641172+1 193016 L820 2009 1788 Phi(3,-772447^16384) 192934 f7 2005 Generalized unique 1789b 2153*2^640890-1 192931 L268 2009 1790 729*2^640874+1 192926 L651 2009 Generalized Fermat 1791 1763*2^640656-1 192860 L697 2009 1792 885*2^640490+1 192810 L689 2009 1793b 2955*2^640259-1 192741 L121 2009 1794 741*2^640175-1 192715 L548 2009 1795 607*2^640146+1 192706 L635 2009 1796 693*2^639986+1 192658 L754 2009 1797 Phi(3,-756916^16384) 192645 f7 2005 Generalized unique 1798 1037*2^639844-1 192616 L121 2009 1799 1305*2^639691-1 192570 L121 2009 1800c 6975*2^639632-1 192553 L121 2009 1801 375*2^639621-1 192548 L644 2009 1802 263927*2^639599+1 192544 g341 2004 1803 639*2^639554+1 192528 L713 2009 1804 893*2^639440-1 192494 L644 2009 1805b 9615*2^639317-1 192458 L644 2009 1806 1695*2^639158+1 192409 g336 2008 1807 743788^32768+1 192396 g271 2002 Generalized Fermat 1808b 9315*2^639067-1 192383 L644 2009 1809 939*2^638941+1 192344 L797 2009 1810 289*2^638902+1 192332 L672 2009 Generalized Fermat 1811 1011*2^638758-1 192289 L121 2009 1812 Phi(3,-737869^16384) 192282 f4 2005 Generalized unique 1813 1485*2^638597+1 192241 g405 2008 1814 881*2^638437+1 192192 L635 2009 1815f 978847155*2^638344-1 192170 L58 2009 1816 983*2^638361+1 192169 L824 2009 1817 507*2^638296-1 192149 L548 2009 1818 393571035*2^638021+1 192073 L122 2007 1819 1733*2^637904-1 192032 L697 2009 1820 845*2^637848-1 192015 L644 2009 1821 1975*2^637595-1 191939 L576 2009 1822c 7215*2^637323-1 191858 L121 2009 1823 697*2^637234+1 191830 L868 2009 1824c 5355*2^637185-1 191816 L121 2009 1825 1741*2^637157-1 191807 L698 2009 1826 19581121*2^637021-1 191770 p49 2003 1827 775*2^637012+1 191763 L651 2009 1828 843*2^636955-1 191746 L644 2009 1829 825*2^636779+1 191693 L687 2009 1830 121*2^636564+1 191627 p189 2007 Generalized Fermat 1831 1995*2^636339-1 191561 L698 2009 1832 849*2^636306+1 191551 L818 2009 1833 381*2^636195+1 191517 L635 2009 1834 9613*2^636159-1 191507 L251 2007 1835 975*2^636054+1 191475 L635 2009 1836 1105*2^636002+1 191459 L809 2009 1837 15*2^635989+1 191453 p76 2004 1838 133736*3^401209-1 191431 p120 2004 Generalized Woodall 1839f 1257*2^635888-1 191425 L121 2009 1840 1539*2^635844-1 191412 L615 2009 1841 255*2^635715-1 191372 g320 2007 1842 Phi(3,-691650^16384) 191362 f1 2005 Generalized unique 1843 3234846615*2^635652-1 191360 p113 2005 1844 2935*2^635629-1 191347 L698 2009 1845 601*2^635375-1 191270 L548 2009 1846 1309*2^635287-1 191244 L121 2009 1847 5955*2^635277-1 191242 L268 2008 1848 9001*2^635264+1 191238 g411 2007 1849 197*2^635042-1 191169 L282 2007 1850 1495*2^635021-1 191164 L615 2009 1851 Phi(3,-681101^16384) 191143 f4 2005 Generalized unique 1852 162454*15^162454-1 191066 p242 2009 Generalized Woodall 1853 405*2^634608-1 191039 L282 2009 1854 39*2^634441+1 190988 g196 2005 1855 35*2^634402-1 190976 L142 2006 1856 Phi(3,-672996^16384) 190973 f4 2005 Generalized unique 1857 1121*2^634222-1 190923 L621 2008 1858 Phi(3,-669646^16384) 190902 f4 2005 Generalized unique 1859 503*2^634134-1 190897 L548 2009 1860 1801*2^634053-1 190873 L700 2009 1861 345*2^633911+1 190829 L656 2009 1862 777*2^633901-1 190827 L548 2009 1863 2^633888-2^316944-1 190820 p168 2007 1864b 9945*2^633726-1 190775 L644 2009 1865e 3005*2^633670-1 190758 L615 2009 1866 387*2^633582-1 190730 L644 2008 1867 845*2^633390-1 190673 L644 2009 1868 Phi(3,-657858^16384) 190649 f4 2005 Generalized unique 1869 359*2^633247+1 190629 L661 2009 1870 1049*2^633217+1 190621 L796 2009 1871 91*2^633169-1 190605 L425 2007 1872c 2295*2^633092-1 190584 L121 2009 1873 3993*2^633086-1 190582 L644 2009 1874 151515*2^632955-1 190544 L200 2006 1875 855*2^632791-1 190493 L644 2009 1876 Phi(3,-647715^16384) 190428 f4 2005 Generalized unique 1877b 9105*2^632565-1 190425 L644 2009 1878 733*2^632387-1 190371 L548 2009 1879 339*2^632297+1 190343 L785 2009 1880 1637*2^632272-1 190337 L697 2009 1881 1299*2^632072-1 190276 L121 2009 1882 189*2^632049+1 190268 p189 2007 1883 173*2^632000-1 190254 L145 2007 1884 1399*2^631967-1 190245 L121 2009 1885 987*2^631666-1 190154 L644 2009 1886 1027*2^631221-1 190020 L268 2008 1887 5091*2^631192+1 190012 L31 2008 1888 69*2^631121+1 189989 p227 2008 1889 75*2^631091-1 189980 L257 2007 1890 885*2^631004-1 189955 L268 2008 1891 959*2^630963+1 189942 L687 2009 1892 22201*2^630916+1 189929 L123 2008 Generalized Fermat 1893f 1187*2^630890-1 189920 L121 2009 1894 1965*2^630845-1 189907 L697 2009 1895 129*2^630843+1 189905 p189 2007 1896 777*2^630736+1 189874 L689 2009 1897 Phi(3,-621973^16384) 189851 f4 2005 Generalized unique 1898 1485*2^630611-1 189836 L697 2009 1899 861*2^630463-1 189792 L79 2006 1900 1975*2^630413-1 189777 L697 2009 1901 109897*2^630221-1 189721 g163 2003 1902 791*2^630135+1 189693 L791 2009 1903 1139*2^630055+1 189669 L656 2009 1904 975*2^630019+1 189658 L678 2009 1905 705*2^630007-1 189654 L268 2008 1906 1841*2^629982-1 189647 L698 2009 1907 519*2^629945+1 189636 L687 2009 1908 1881*2^629917-1 189628 L698 2009 1909b 9645*2^629861-1 189612 L644 2009 1910 399*2^629840-1 189604 L644 2009 1911 1371*2^629822-1 189599 L121 2009 1912 319*2^629783-1 189587 L548 2009 1913 Phi(3,-610367^16384) 189583 f4 2004 Generalized unique 1914 595*2^629757-1 189579 L548 2009 1915 1195*2^629754+1 189578 L789 2009 1916 869*2^629516-1 189507 L644 2009 1917 811*2^629404+1 189473 L656 2009 1918 Phi(3,-604003^16384) 189434 f4 2004 Generalized unique 1919 2995125705*2^629062-1 189377 L87 2005 1920 3333*2^629074+1 189374 g412 2008 1921 2*191^83009+1 189347 g404 2006 Divides Phi(191^83009,2) 1922 1793*2^628976-1 189344 L804 2009 1923 269*2^628904-1 189322 L426 2007 1924 281*2^628898-1 189320 L426 2007 1925c 2925*2^628889-1 189318 L323 2009 1926 108045*2^628770-1 189284 L466 2008 1927 321*2^628734-1 189271 L548 2009 1928 Phi(3,-595806^16384) 189239 f7 2005 Generalized unique 1929b 8325*2^628429-1 189180 L644 2009 1930f 1065*2^628382-1 189165 L121 2009 1931 1115*2^628371+1 189162 L841 2009 1932 169*2^628357-1 189157 L384 2008 1933 Phi(3,-590124^16384) 189103 f4 2005 Generalized unique 1934 Phi(3,-589145^16384) 189079 f7 2005 Generalized unique 1935 1005*2^628092+1 189078 L681 2009 1936b 8475*2^627923-1 189028 L644 2009 1937 Phi(3,-586426^16384) 189013 f7 2005 Generalized unique 1938 1815*2^627840-1 189002 L251 2009 1939 27*2^627794-1 188987 L107 2005 1940 25*2^627710+1 188961 g279 2004 Generalized Fermat 1941 1437*2^627580-1 188924 L697 2009 1942 Phi(3,-582706^16384) 188923 f4 2005 Generalized unique 1943 309*2^627517+1 188904 L708 2009 1944 835*2^627477-1 188893 L644 2009 1945d 209107*2^627318+1 188847 p77 2009 1946 1007*2^627295+1 188838 L656 2009 1947 29*2^627167+1 188798 p122 2005 1948f 1085*2^626920-1 188725 L121 2009 1949 Phi(3,-571538^16384) 188647 f7 2005 Generalized unique 1950c 9015*2^626654-1 188646 L121 2009 1951 126667*2^626497-1 188600 g23 2003 1952 473*2^626184-1 188503 L548 2009 1953 986963835*2^625989+1 188451 L631 2008 1954e 3045*2^625677-1 188352 L615 2009 1955 Phi(3,-559738^16384) 188350 f7 2005 Generalized unique 1956 553602^32768+1 188194 g168 2001 Generalized Fermat 1957 513*2^625011-1 188150 L576 2009 1958 975*2^624927+1 188125 L651 2009 1959 119*2^624896-1 188115 L282 2008 1960 1435*2^624793-1 188085 L698 2009 1961 615*2^624752+1 188072 L761 2009 1962f 1065*2^624740-1 188069 L121 2009 1963 815730721*2^624480+1 187997 L466 2009 Generalized Fermat 1964 83*2^624398-1 187965 L323 2007 1965f 341667*2^624280+1 187933 g378 2009 1966f 280113*2^624280+1 187933 g378 2009 1967 217*2^624208+1 187908 L656 2009 1968 559*2^624122+1 187883 L785 2009 1969 985*2^624114+1 187881 L675 2009 1970f 1125*2^624055-1 187863 L121 2009 1971 1183*2^624042+1 187859 L786 2009 1972 369*2^623979+1 187839 L651 2009 1973 1731*2^623847-1 187800 L697 2009 1974 225*2^623720+1 187761 p43 2005 Generalized Fermat 1975 179*2^623635+1 187736 p189 2007 1976c 102765*2^623247-1 187622 L644 2009 1977 639*2^623113+1 187579 L656 2009 1978c 9675*2^623026-1 187554 L644 2009 1979 329*2^623005+1 187546 L714 2009 1980 95*2^622849+1 187499 p227 2008 1981 297*2^622800+1 187484 L783 2009 1982 1875*2^622639-1 187437 L697 2009 1983 524552^32768+1 187427 g65 2001 Generalized Fermat 1984 5114*5^268127+1 187417 p224 2007 1985 146478*19^146478-1 187315 p237 2008 Generalized Woodall 1986 1865*2^622146-1 187288 L566 2009 1987 1105*2^622142+1 187287 L784 2009 1988 985*2^622033-1 187254 L644 2009 1989c 9105*2^621563-1 187114 L644 2009 1990 501*2^621532+1 187103 L779 2009 1991 313*2^621432+1 187073 L728 2009 1992 531*2^621426-1 187071 L548 2009 1993 539*2^621357+1 187050 L778 2009 1994 627*2^621252+1 187019 L782 2009 1995 1813*2^621119-1 186979 L800 2009 1996 1391*2^621102-1 186974 L121 2009 1997c 8445*2^621095-1 186973 L644 2009 1998 1907*2^621002-1 186944 L697 2009 1999 1515*2^620928-1 186922 L253 2007 2000 655*2^620922+1 186919 L787 2009 2001b 18209*2^620664-1 186843 L323 2009 2002c 8475*2^620629-1 186832 L644 2009 2003 861*2^620508+1 186795 L788 2009 2004 499310^32768+1 186725 g295 2001 Generalized Fermat 2005 1023*2^620205+1 186704 L681 2009 2006 37850187375*2^620089-1 186676 L257 2009 2007 245*2^619938-1 186623 L426 2007 2008 Phi(3,-494093^16384) 186575 f7 2005 Generalized unique 2009 141*2^619742-1 186564 L426 2007 2010 749*2^619737+1 186563 L781 2009 2011 1445*2^619170-1 186392 L700 2009 2012 849*2^619157+1 186388 L775 2009 2013b 22453*2^619095-1 186371 L257 2009 2014 381*2^618929-1 186319 L644 2009 2015 261*2^618918-1 186316 L145 2007 2016c 2925*2^618817-1 186286 L121 2009 2017 1311*2^618754-1 186267 L121 2009 2018 713*2^618606-1 186222 L566 2009 2019f 1081*2^618559-1 186208 L121 2009 2020 1153*2^618328+1 186139 L790 2009 2021 187*2^618293-1 186128 L636 2008 2022 501*2^618284+1 186125 L153 2008 2023 1015*2^618271-1 186122 L121 2009 2024d 7245*2^618242-1 186114 L121 2009 2025f 1137*2^618105-1 186072 L121 2009 2026 69*2^617993+1 186037 p227 2008 2027 731*2^617957+1 186027 L153 2009 2028 93254*5^266111+1 186009 p196 2007 2029 921*2^617888+1 186006 L153 2008 2030 1645*2^617867-1 186000 L697 2009 2031 659*2^617815+1 185984 L732 2009 Divides Fermat F(617813) 2032c 26565*2^617734-1 185961 L644 2009 2033 Phi(3,-473198^16384) 185960 f4 2005 Generalized unique 2034 58882*5^265981-1 185918 p225 2008 2035 485*2^617483+1 185884 L773 2009 2036 393571035*2^617318+1 185840 L122 2007 2037 1401*2^617333-1 185839 L268 2009 2038 1209*2^617307-1 185832 L121 2009 2039 779*2^617133+1 185779 L774 2009 2040 369*2^617047+1 185753 L816 2009 2041 1155*2^616925+1 185716 L181 2008 2042c 9525*2^616921-1 185716 L644 2009 2043 567*2^616877-1 185702 L644 2009 2044 857*2^616824-1 185686 L644 2009 2045 243*2^616662-1 185637 L442 2007 2046 8331405*2^616479-1 185586 L87 2005 2047 1145*2^616423+1 185565 L715 2009 2048 975*2^616335+1 185539 L679 2009 2049 279703*2^616235-1 185511 L53 2004 2050 91*2^616072+1 185459 p189 2006 2051 279*2^616044-1 185451 L145 2007 2052 615*2^615952-1 185423 L268 2008 2053f 1113*2^615855-1 185394 L121 2009 2054 1967*2^615772-1 185370 L698 2009 2055 911*2^615622-1 185324 L644 2009 2056 861*2^615463+1 185276 L771 2009 2057 741*2^615439+1 185269 L656 2009 2058 1275*2^615380-1 185251 L121 2009 2059 331*2^615116+1 185171 L153 2009 2060 29399*2^615101+1 185169 g6 2006 2061 103259*2^615076-1 185162 g163 2002 2062 455*2^615036-1 185147 L644 2009 2063 77*2^614995+1 185134 L56 2005 2064 891*2^614976+1 185130 L785 2009 2065 693*2^614963-1 185126 L566 2009 2066 887*2^614875+1 185099 L776 2009 2067d 19861029*2^614749-1 185066 L895 2009 2068 1581823815*2^614637-1 185034 L83 2005 2069 371*2^614517+1 184991 L754 2009 2070 669*2^614303-1 184927 L548 2009 2071 1031*2^614255+1 184913 L651 2009 2072 837*2^614222+1 184903 L766 2009 2073 5775*2^614179+1 184891 p189 2007 2074 1821*2^613946-1 184820 L697 2009 2075 315*2^613854-1 184791 L548 2009 2076 259*2^613845-1 184789 L621 2008 2077 69*2^613781-1 184769 L138 2006 2078d 5865*2^613568-1 184707 L840 2009 2079 30003*2^613463-1 184676 L550 2008 2080 1081*2^613200+1 184595 L770 2009 2081 222997*2^613153-1 184583 g163 2001 2082 429370^32768+1 184577 g295 2001 Generalized Fermat 2083 619*2^613139-1 184577 L548 2009 2084 345*2^613086+1 184560 L817 2009 2085 1119*2^613033+1 184545 L772 2009 2086 665*2^613004-1 184536 L566 2009 2087 1883*2^612756-1 184462 L697 2009 2088 951*2^612740+1 184457 L768 2009 2089f 1167*2^612633-1 184424 L121 2009 2090b 22453*2^612555-1 184402 L257 2009 2091 185*2^612412-1 184357 L543 2008 2092 973*2^612382+1 184349 L764 2009 2093 363*2^612291-1 184321 L536 2009 2094 1645*2^612263-1 184313 L697 2009 2095 35535391*2^612212+1 184302 g267 2007 2096 281*2^612083+1 184258 L761 2009 2097 363*2^611998+1 184233 L767 2009 2098 1527*2^611818-1 184179 L697 2009 2099 5855*2^611596-1 184113 L268 2008 2100 2929*2^611581-1 184108 L698 2009 2101 Phi(3,-415159^16384) 184098 f7 2005 Generalized unique 2102f 1191*2^611350-1 184038 L121 2009 2103 1345*2^611309-1 184026 L268 2008 2104 1023*2^611208+1 183995 L762 2009 2105 1585*2^611185-1 183989 L282 2009 2106 429*2^611081+1 183957 L153 2009 2107 1485*2^611053-1 183949 L566 2009 2108 1485*2^611020+1 183939 g405 2008 2109 159*2^611020-1 183938 L91 2005 2110 537*2^610990+1 183930 L651 2009 2111 1995*2^610979-1 183927 L697 2009 2112d 4935*2^610888-1 183900 L121 2009 2113 289*2^610737-1 183853 L6 2005 2114 63*2^610704-1 183843 L442 2008 2115d 9441*2^610639-1 183825 L121 2009 2116 10474035*2^610477-1 183779 L18 2008 2117 1799*2^610472-1 183774 L800 2009 2118 1563*2^610386-1 183748 L697 2009 2119 571*2^610371-1 183743 L620 2009 2120 1773*2^610363-1 183741 L701 2009 2121 447*2^610250-1 183707 L555 2009 2122 747*2^610126-1 183670 L594 2009 2123 423*2^609975-1 183624 L576 2009 2124 1137*2^609642+1 183524 L768 2009 2125d 5445*2^609541-1 183494 L121 2009 2126 357491*2^609338-1 183435 g302 2003 2127d 4935*2^609292-1 183419 L121 2009 2128 543*2^609174-1 183383 L653 2009 2129 1745*2^608842-1 183283 L698 2009 2130 1717*2^608773-1 183263 L697 2009 2131 59*2^608687+1 183235 p161 2008 2132 447*2^608666+1 183230 L689 2009 2133 795*2^608479+1 183174 L717 2009 2134 383*2^608340-1 183132 L644 2009 2135 1875*2^608322-1 183127 L698 2009 2136 181*2^608192+1 183087 p189 2007 2137d 7215*2^608122-1 183067 L121 2009 2138 77*2^607920-1 183005 L56 2004 2139 1831*2^607887-1 182996 L698 2009 2140 1013*2^607834-1 182980 L121 2009 2141 267*2^607688-1 182935 L261 2007 2142 2*131^86365+1 182859 g404 2007 Divides Phi(131^86365,2) 2143 12345*2^607395-1 182849 L183 2006 2144 467*2^607118-1 182764 L548 2008 2145 Phi(3,-377716^16384) 182753 f7 2005 Generalized unique 2146 409*2^606805-1 182670 L548 2008 2147 1869*2^606779-1 182662 L576 2009 2148 245*2^606706-1 182640 L426 2007 2149 1305*2^606676-1 182631 L121 2009 2150 633*2^606608-1 182611 L548 2008 2151e 3045*2^606576-1 182602 L615 2009 2152 581*2^606443+1 182561 L705 2009 2153 945*2^606384+1 182543 L656 2009 2154 1441*2^606339-1 182530 L701 2009 2155 441*2^605849-1 182382 L579 2009 2156 1371*2^605798-1 182367 L121 2009 2157c 2295*2^605708-1 182340 L323 2009 2158 3333*2^605640+1 182320 g412 2008 2159 859*2^605575-1 182300 L644 2009 2160 1911*2^605573-1 182299 L697 2009 2161f 1103*2^605478-1 182271 L121 2009 2162 141*2^605392+1 182244 p43 2005 2163 17*2^605394-1 182243 L141 2006 2164 1331*2^605374-1 182239 L121 2009 2165 225*2^605172+1 182178 p43 2005 Generalized Fermat, divides GF(605169,3) 2166 1701*2^605054-1 182143 L697 2009 2167 587*2^605050-1 182141 L579 2008 2168 667*2^605037-1 182138 L644 2008 2169 329*2^604999+1 182126 L153 2008 2170 1631*2^604986-1 182123 L697 2009 2171 1311*2^604858-1 182084 L121 2009 2172 1015*2^604823-1 182073 L121 2009 2173 273*2^604822+1 182073 L777 2009 2174 285*2^604747+1 182050 L758 2009 2175 1247*2^604612-1 182010 L121 2009 2176 Phi(3,-358446^16384) 182008 f4 2005 Generalized unique 2177 1997*2^604582-1 182001 L566 2009 2178 173*2^604585+1 182001 p189 2007 2179 2933*2^604502-1 181977 L698 2009 2180 1587*2^604449-1 181961 L697 2009 2181 585*2^604450+1 181961 L763 2009 2182 Phi(3,-357238^16384) 181960 f7 2005 Generalized unique 2183 837*2^604188+1 181882 L757 2009 2184 1785*2^604151-1 181871 L697 2009 2185 2927*2^604126-1 181864 L698 2009 2186 Phi(3,-352694^16384) 181778 f4 2005 Generalized unique 2187 131*2^603738-1 181746 L426 2007 2188 549*2^603675+1 181728 L794 2009 2189 675*2^603636-1 181716 L548 2008 2190 Phi(3,-350159^16384) 181675 f7 2005 Generalized unique 2191d 8325*2^603486-1 181672 L644 2009 2192 129*2^603488-1 181671 L260 2007 2193 907*2^603448+1 181659 L153 2008 2194d 3975*2^603436-1 181656 L121 2009 2195 978847155*2^603383-1 181646 L58 2009 2196f 1125*2^603350-1 181630 L121 2009 2197 1501*2^603315-1 181620 L697 2009 2198d 9435*2^603169-1 181576 L644 2009 2199 Phi(3,-347458^16384) 181565 f7 2005 Generalized unique 2200 1101*2^602883+1 181489 L795 2009 2201 1673*2^602624-1 181412 L698 2009 2202 3039469*2^602609-1 181410 L466 2008 2203 539*2^602564-1 181393 L548 2008 2204 111*2^602565-1 181393 L91 2005 2205 103*2^602483-1 181368 L488 2008 2206b 54321*2^602423-1 181353 L637 2009 2207 169*2^602070+1 181244 g246 2007 Generalized Fermat 2208 255*2^601910-1 181196 g320 2007 2209 1065*2^601742-1 181146 L121 2009 2210 725*2^601599+1 181103 L153 2008 2211 857*2^601512-1 181077 L644 2008 2212 1883*2^601494-1 181072 L698 2009 2213 863*2^601494-1 181071 L644 2008 2214 969*2^601488-1 181069 L644 2008 2215 986963835*2^601391+1 181046 L631 2008 2216 665*2^601262-1 181001 L566 2008 2217 5955*2^601219-1 180989 L268 2008 2218 1039*2^601187-1 180979 L121 2009 2219 2607*2^601176+1 180976 g61 2005 2220 17*2^601158-1 180968 g267 2004 2221e 3135*2^601146-1 180967 L615 2009 2222 332554^32768+1 180941 GF5 2002 Generalized Fermat 2223 427*2^600836+1 180873 L153 2008 2224d 9285*2^600797-1 180862 L644 2009 2225 330716^32768+1 180862 g232 2001 Generalized Fermat 2226 1021*2^600729-1 180841 L121 2009 2227 1419*2^600379-1 180736 L804 2009 2228 331*2^600339-1 180723 L543 2008 2229 33*2^600270+1 180701 L126 2005 Divides GF(600269,5) 2230 Phi(3,-326040^16384) 180659 f7 2005 Generalized unique 2231 903*2^600124-1 180659 L644 2008 2232 225*2^600080+1 180645 p43 2005 Generalized Fermat 2233 4159449*2^600000-1 180625 L81 2006 2234 3672389*2^600000-1 180625 L81 2006 2235 3543819*2^600000-1 180625 L81 2006 2236 3368853*2^600000-1 180625 L81 2006 2237 2666517*2^600000-1 180625 L81 2006 2238 2606859*2^600000-1 180625 L81 2006 2239 2420747*2^600000-1 180625 L81 2006 2240 2220567*2^600000-1 180625 L81 2006 2241 2189259*2^600000-1 180625 L81 2006 2242 2092353*2^600000-1 180625 L81 2006 2243 1484163*2^600000-1 180625 L81 2006 2244 339217*2^600002+1 180625 g305 2007 2245 20475*2^600004+1 180624 g305 2007 2246 13971*2^600004+1 180624 g305 2007 2247 162585*2^600000-1 180624 L81 2006 2248 1395*2^599977-1 180615 L121 2009 2249 1077*2^599858+1 180579 L656 2009 2250 405405*2^599745-1 180547 L466 2008 2251 3234846615*2^599555-1 180494 p113 2005 2252 675*2^599539-1 180483 L79 2007 2253 455*2^599531+1 180480 L656 2009 2254 429*2^599478+1 180464 L203 2008 2255 321164^32768+1 180445 g232 2001 Generalized Fermat 2256 603*2^599288-1 180407 L543 2008 2257 849*2^599283+1 180406 L658 2009 2258 1021*2^599175-1 180373 L503 2009 2259 1885*2^599049-1 180335 L800 2009 2260 861*2^599041-1 180333 L79 2006 2261 409*2^599013-1 180324 L653 2008 2262 1833*2^598984-1 180316 L701 2009 2263 Phi(3,-317790^16384) 180295 f7 2005 Generalized unique 2264 349*2^598831-1 180269 L79 2008 2265 999999999*10^180230-1 180239 g208 2008 Near-repdigit 2266 1147*2^598616+1 180205 L717 2009 2267 843*2^598482-1 180164 L653 2008 2268 135*2^598478+1 180162 L675 2009 2269 22932195*2^598360-1 180132 L138 2006 2270 397*2^598342+1 180122 L692 2009 2271 677*2^598310-1 180113 L543 2008 2272 33*2^598248-1 180093 L138 2006 2273 1987*2^598201-1 180080 L800 2009 2274 1119*2^598163+1 180069 L679 2009 2275c 10^180054+8*R(58567)*10^60744+1 180055 p235 2009 Tetradic palindrome 2276 519*2^598018+1 180025 L627 2009 2277 1815*2^597967-1 180010 L251 2009 2278 10^180004+248797842*10^89998+1 180005 D 2007 Palindrome 2279 927*2^597860+1 179977 L671 2009 2280 1983*2^597786-1 179955 L698 2009 2281 923*2^597546-1 179883 L566 2008 2282 685*2^597544+1 179882 L656 2009 2283 163*2^597474+1 179860 p43 2005 Divides GF(597473,3) 2284 Phi(3,-307866^16384) 179843 f7 2005 Generalized unique 2285 1209*2^596976-1 179711 L121 2009 2286d 9315*2^596943-1 179702 L644 2009 2287 371*2^596942-1 179701 L543 2008 2288 609*2^596887-1 179684 L548 2008 2289 1011*2^596823-1 179665 L503 2009 2290 1727*2^596746-1 179642 L697 2009 2291 1179*2^596423+1 179545 g387 2006 2292 759*2^596225-1 179485 L657 2008 2293 1309*2^596029-1 179426 L121 2009 2294 1835*2^595990-1 179415 L701 2009 2295 421*2^595801-1 179357 L548 2008 2296 Phi(3,-297244^16384) 179343 f7 2005 Generalized unique 2297 1049*2^595751+1 179342 L742 2009 2298 1043*2^595722-1 179334 L503 2009 2299 315940139*2^595620-1 179308 L10 2004 2300d 9765*2^595454-1 179254 L644 2009 2301c 26375*6^230349+1 179251 p254 2009 2302 205252*5^256435-1 179246 p232 2008 2303 12401*2^595154-1 179164 L536 2009 2304 3039469*2^595009-1 179123 L466 2008 2305 1057*2^594689-1 179023 L268 2008 2306 1449*2^594636-1 179007 L697 2009 2307 471*2^594003-1 178816 L543 2008 2308f 1155*2^593965-1 178805 L121 2009 2309 1043*2^593697+1 178724 L651 2009 2310 965*2^593597+1 178694 L739 2009 2311 695*2^593568-1 178685 L548 2008 2312 685*2^593347-1 178619 L548 2008 2313 459*2^593309+1 178607 L743 2009 2314 1515*2^593203-1 178576 L183 2007 2315b 30015*2^593049-1 178531 L251 2009 2316 511*2^592985-1 178509 L548 2008 2317 149*2^592968-1 178504 L171 2006 2318 1785*2^592848-1 178469 L701 2009 2319 1075*2^592515-1 178368 L268 2008 2320d 9555*2^592349-1 178319 L644 2009 2321 1761*2^592301-1 178304 L697 2009 2322 10474035*2^592237-1 178289 L18 2008 2323 659*2^592243+1 178286 L793 2009 2324 255*2^592080-1 178237 g320 2007 2325 1025*2^592058-1 178231 L121 2009 2326 1719*2^592008-1 178216 L701 2009 2327 485*2^591787+1 178149 L745 2009 2328 555*2^591776+1 178146 L635 2009 2329 739*2^591681-1 178117 L541 2008 2330 1637*2^591668-1 178114 L701 2009 2331 645*2^591556+1 178079 L651 2009 2332e 2547*2^591536-1 178074 L268 2009 2333 789*2^591441-1 178045 L543 2008 2334 1087*2^591382+1 178027 L635 2009 2335a 53625*2^591334-1 178015 L251 2009 2336b 30015*2^591246-1 177988 L251 2009 2337f 1251*2^591194-1 177971 L121 2009 2338 617*2^591187+1 177968 L749 2009 2339 1083*2^590965+1 177902 L792 2009 2340 171*2^590818-1 177857 L91 2005 2341 1037*2^590791+1 177849 L741 2009 2342 719*2^590715+1 177826 L746 2009 2343 1619*2^590620-1 177798 L697 2009 2344 351*2^590579-1 177785 L615 2008 2345 12543*2^590327-1 177711 L647 2009 2346 1981*2^590077-1 177635 L701 2009 2347 Phi(3,-263458^16384) 177626 f7 2005 Generalized unique 2348 1245*2^589954-1 177597 L121 2009 2349 2*353^69705+1 177593 g404 2007 2350 98682705*2^589915-1 177591 L545 2008 2351 317*2^589755+1 177537 L655 2009 2352f 1155*2^589735-1 177531 L121 2009 2353 679*2^589659-1 177508 L548 2008 2354 921*2^589470-1 177452 L566 2008 2355 813*2^589384-1 177426 L566 2008 2356 691*2^589341-1 177413 L576 2008 2357 1519*2^589297-1 177400 L698 2009 2358 1819*2^589189-1 177367 L697 2009 2359f 1225*2^589189-1 177367 L121 2009 2360 1929*2^589136-1 177351 L697 2009 2361 1815*2^589131-1 177350 L251 2009 2362 1101*2^588999-1 177310 L503 2008 2363b 66825*2^588924-1 177289 L251 2009 2364 123406*5^253626+1 177283 p188 2006 2365 981*2^588855+1 177267 L679 2009 2366 973*2^588814+1 177254 L728 2009 2367b 37785*2^588622-1 177198 L251 2009 2368 927*2^588621-1 177196 L566 2008 2369 1189*2^588585-1 177185 L121 2009 2370 1383*2^588560-1 177178 L121 2009 2371 351*2^588325+1 177107 L651 2009 Divides GF(588323,6) 2372 Phi(3,-64319462214^8192) 177084 f18 2006 Generalized unique 2373d 9555*2^588124-1 177047 L644 2009 2374 1973*2^588090-1 177037 L701 2009 2375 1075*2^588029-1 177018 L268 2008 2376 279*2^587881-1 176973 L145 2007 2377 39*2^587850+1 176963 g267 2005 2378c 36739*2^587827-1 176959 p77 2009 Generalized Woodall 2379 301*2^587635-1 176899 L79 2007 2380 25*2^587585-1 176883 L137 2006 2381 161*2^587570-1 176879 L323 2008 2382 249830^32768+1 176871 g242 2001 Generalized Fermat 2383 1741*2^587137-1 176750 L701 2009 2384 1575*2^587013-1 176712 L251 2009 2385d 8745*2^586965-1 176699 L644 2009 2386 229*2^586795-1 176646 L145 2006 2387 1415*2^586778-1 176641 L268 2008 2388 1745*2^586722-1 176625 L555 2009 2389 1179*2^586711-1 176621 L121 2009 2390 1437*2^586702-1 176619 L701 2009 2391 93*2^586453+1 176542 g196 2003 2392 4275*2^586352-1 176514 L268 2008 2393e 2925*2^586347-1 176512 L268 2009 2394 819*2^586330+1 176506 L714 2009 2395 365*2^586189+1 176464 L759 2009 2396 99*2^586088-1 176433 L167 2006 2397 195*2^585988+1 176403 p189 2007 Divides GF(585985,12) [K] 2398 999*2^585907+1 176379 L110 2006 2399 741*2^585865-1 176366 L583 2008 2400 Phi(3,-241074^16384) 176363 f7 2005 Generalized unique 2401 Phi(3,-240513^16384) 176330 p72 2005 Generalized unique 2402 8331405*2^585714-1 176325 L87 2005 2403 1971*2^585723-1 176324 L804 2009 2404 879*2^585649+1 176301 L635 2009 2405d 9855*2^585497-1 176257 L644 2009 2406 841*2^585467-1 176247 L644 2008 2407 237*2^585403+1 176227 L738 2009 2408 33*2^585400-1 176225 L138 2006 2409 711*2^585381+1 176221 L661 2009 2410 191*2^585377+1 176219 p189 2007 2411 447*2^585292-1 176194 L548 2008 2412 151*2^585044+1 176118 L446 2007 Divides Fermat F(585042) 2413d 8235*2^585037-1 176118 L644 2009 2414 3*2^584995-1 176102 L24 2003 2415 843*2^584873+1 176068 L752 2009 2416e 9075*2^584745-1 176030 L121 2009 2417e 5445*2^584652-1 176002 L121 2009 2418 1379*2^584492-1 175953 L121 2009 2419 407*2^584491+1 175952 L203 2008 2420f 1083*2^584474-1 175948 L121 2009 2421 1503*2^584384-1 175921 L697 2009 2422 2931*2^584103-1 175836 L698 2009 2423 1003*2^584103-1 175836 L51 2004 2424a 6283*2^584075-1 175828 L268 2009 2425 1035*2^583882-1 175770 L121 2009 2426 1137*2^583778+1 175738 L765 2009 2427 Phi(3,29093^19683) 175722 p16 2002 Generalized unique 2428 1141*2^583629-1 175693 L121 2009 2429f 1253*2^583560-1 175673 L121 2009 2430 297*2^583464-1 175643 L421 2007 2431 Phi(3,28808^19683) 175554 p16 2002 Generalized unique 2432 183*2^583114+1 175538 p189 2007 2433 1407*2^582881-1 175468 L701 2009 2434 736320585*2^582738-1 175431 L200 2007 2435 1605*2^582712-1 175417 L698 2009 2436 123*2^582672+1 175404 p189 2007 2437 1145*2^582594-1 175382 L284 2009 2438 2199*2^582592-1 175382 L268 2008 2439 177*2^582454-1 175339 L145 2006 2440d 9405*2^582386-1 175320 L644 2009 2441a 6221*2^582370-1 175315 L268 2009 2442d 9885*2^582319-1 175300 L644 2009 2443 795*2^582242+1 175276 L739 2009 2444 246419198025*2^582194-1 175270 L106 2006 2445 1029*2^582099+1 175233 L651 2009 2446 53*2^582078-1 175225 L251 2007 2447 1151*2^581961+1 175191 L692 2009 2448 1749*2^581897-1 175172 L566 2009 2449 1609*2^581865-1 175163 L619 2009 2450 10^175108+230767032*10^87550+1 175109 D 2007 Palindrome 2451 Phi(3,-219682^16384) 175040 f7 2005 Generalized unique 2452 1053*2^581417+1 175027 L740 2009 2453d 26565*2^581356-1 175011 L644 2009 2454 1353*2^581310-1 174995 L121 2009 2455 595*2^581167-1 174952 L644 2008 2456a 6233*2^581152-1 174948 L268 2009 2457 199*2^581119-1 174937 L426 2007 2458 1669*2^581085-1 174928 L697 2009 2459 645*2^580866+1 174861 L735 2009 2460 2185*2^580861-1 174860 L268 2008 2461 1717*2^580825-1 174849 L697 2009 2462 1749*2^580743-1 174825 L555 2009 2463 99*2^580738+1 174822 p76 2005 2464 1507*2^580717-1 174817 L697 2009 2465e 19861029*2^580581-1 174780 L895 2009 2466 69*2^580596-1 174779 L138 2006 2467 93*2^580482-1 174745 L147 2007 2468e 9999*2^580459-1 174740 L268 2009 2469 1221*2^580429-1 174730 L121 2009 2470b 49335*2^580419-1 174729 L860 2009 2471 1143*2^580320-1 174697 L121 2009 2472 1077*2^580294-1 174689 L121 2009 2473 1453*2^580287-1 174687 L701 2009 2474 1909*2^580267-1 174682 L697 2009 2475 569*2^580181+1 174655 L687 2009 2476 1361*2^580082-1 174626 L121 2009 2477 1989*2^580079-1 174625 L697 2009 2478 1621*2^579705-1 174512 L697 2009 2479 339728*5^249588-1 174461 p188 2006 2480 5855*2^579408-1 174423 L268 2008 2481 1597*2^579373-1 174412 L488 2007 2482 775*2^579335-1 174401 L644 2008 2483 1005*2^579154+1 174346 L661 2009 2484f 2715*2^578940-1 174282 L257 2009 2485 666625245*2^578853-1 174261 L545 2008 2486 108045*2^578856-1 174259 L466 2008 2487 122149*2^578806+1 174244 g341 2004 2488 843*2^578747-1 174224 L548 2008 2489 675*2^578746-1 174223 L79 2007 2490 895*2^578637-1 174191 L644 2008 2491 65*2^578512-1 174152 L132 2005 2492 89707*2^578313-1 174095 g173 2003 2493 761*2^578113+1 174033 L755 2009 2494 1113*2^578090-1 174026 L503 2009 2495 1031*2^578089+1 174026 L747 2009 2496e 16995*2^578073-1 174022 L644 2009 2497 1881*2^578065-1 174019 L701 2009 2498 204462^32768+1 174019 g27 2001 Generalized Fermat 2499 255*2^577903-1 173969 g320 2006 2500 1171*2^577863-1 173958 L121 2009 2501 735*2^577763-1 173927 g172 2006 2502 Phi(3,-203097^16384) 173923 f4 2005 Generalized unique 2503 163*2^577723-1 173915 L323 2008 2504 1005*2^577597+1 173878 L737 2009 2505 975*2^577342+1 173801 L692 2009 2506 1239*2^576831-1 173647 L121 2009 2507a 6293*2^576734-1 173619 L268 2009 2508 171*2^576733-1 173617 L91 2005 2509e 9405*2^576564-1 173568 L644 2009 2510 67*2^576558+1 173564 p227 2008 2511f 1225*2^576459-1 173535 L121 2009 2512 791*2^576238-1 173468 L644 2008 2513 1491*2^576227-1 173465 L566 2009 2514 999*2^576128-1 173435 L644 2008 2515 615*2^575972+1 173388 L119 2009 2516 463*2^575902+1 173367 L713 2009 2517 735*2^575880-1 173361 g172 2006 2518d 18869*2^575864-1 173357 L257 2009 2519 1965*2^575717-1 173312 L585 2009 2520 1177*2^575684+1 173302 L717 2009 2521 922141*2^575631-1 173289 L74 2008 2522 850531*2^575631-1 173289 L74 2008 2523c 36315*2^575546-1 173262 L251 2009 2524 1312*45^104779-1 173226 p244 2009 2525 331*2^575199-1 173155 g320 2007 2526 98939*2^575144-1 173141 g163 2001 2527 877*2^575074+1 173118 L734 2009 2528 459*2^574949+1 173080 L196 2009 2529 553*2^574760+1 173023 L656 2009 2530e 9435*2^574701-1 173007 L644 2009 2531 371697*2^574646-1 172992 g356 2006 2532 45*2^574506+1 172946 g409 2007 Divides GF(574504,3) 2533 903*2^574412+1 172919 L656 2009 2534 1581823815*2^574196-1 172860 L83 2005 2535f 2505*2^574175-1 172848 L257 2009 2536 3039469*2^574029-1 172807 L466 2008 2537 6465*2^574035+1 172806 g258 2009 2538a 6279*2^573895-1 172764 L268 2009 2539 1143*2^573894+1 172763 L717 2009 Divides GF(573892,3) 2540 749*2^573524-1 172651 L644 2008 2541 465*2^573441+1 172626 L702 2009 2542 1115*2^573391+1 172611 L656 2009 2543c 37785*2^573364-1 172605 L860 2009 2544 213*2^573332+1 172593 L756 2009 2545 779*2^573211+1 172557 L679 2009 2546e 9945*2^573035-1 172505 L644 2009 2547 9101981*2^572981+1 172492 g405 2009 2548 113*2^572966-1 172483 L257 2008 2549 Phi(3,24071^19683) 172482 p16 2002 Generalized unique 2550 Phi(3,-33650405888^8192) 172475 f14 2006 Generalized unique 2551 929*2^572799+1 172433 L656 2009 2552 855*2^572656-1 172390 L644 2008 2553 389*2^572625+1 172380 L732 2009 2554 405*2^572623+1 172380 L203 2007 2555 861*2^572559-1 172361 L79 2006 2556 439*2^572313-1 172287 L644 2008 2557 1799*2^572228-1 172262 L697 2009 2558 141*2^572007+1 172194 p43 2005 2559 1113*2^571998+1 172192 L744 2009 2560 Phi(3,-32245301250^8192) 172171 f14 2006 Generalized unique 2561 393*2^571884+1 172157 L754 2009 2562 615*2^571871-1 172154 L644 2008 2563e 8505*2^571814-1 172138 L644 2009 2564 1581823815*2^571773-1 172131 L83 2005 2565e 9675*2^571753-1 172119 L644 2009 2566 615*2^571623-1 172079 L644 2008 2567 1815*2^571513-1 172046 L251 2009 2568 459*2^571508-1 172044 L644 2008 2569a 28665*2^571457-1 172031 L268 2009 2570 999*2^571360-1 172000 L644 2008 2571 1077*2^571351+1 171997 L751 2009 2572 227968*5^245975-1 171935 p225 2007 2573a 14895*2^571039-1 171905 L268 2009 2574 371*2^571042-1 171904 L548 2008 2575 1995*2^570951-1 171877 L697 2009 2576 2607*2^570948+1 171876 g61 2005 2577 659*2^570903+1 171862 L729 2009 2578 673*2^570898+1 171861 L656 2009 2579 1581823815*2^570823-1 171845 L83 2005 2580e 9495*2^570824-1 171840 L644 2009 2581f 2955*2^570821-1 171838 L257 2009 2582 40078*5^245766+1 171788 p215 2007 2583a 6219*2^570647-1 171786 L268 2009 2584 217*2^570616+1 171775 L689 2009 2585 699*2^570581+1 171765 L665 2009 2586 571*2^570443-1 171724 L644 2008 2587 141*2^570401+1 171710 p43 2005 2588 309*2^570389+1 171707 L668 2009 2589 1141*2^570348+1 171695 L656 2009 2590 981*2^570197-1 171650 L585 2008 2591 427*2^570112+1 171624 L203 2008 2592a 6279*2^570099-1 171621 L268 2009 2593 753*2^570008-1 171593 L585 2008 2594 5855*2^569974-1 171584 L268 2008 2595f 81411*2^569884+1 171558 p243 2009 2596 19580625*2^569850+1 171550 L71 2007 Generalized Fermat 2597 666625245*2^569811-1 171540 L545 2008 2598 2759*2^569812-1 171534 L251 2008 2599 1797*2^569782-1 171525 L698 2009 2600 1045*2^569617-1 171475 L268 2008 2601 1099*2^569559-1 171458 L503 2008 2602 1143*2^569557+1 171457 L196 2009 2603 197*2^569222-1 171356 L167 2007 2604 703*2^569043-1 171302 L644 2008 2605 759375*2^568888-1 171259 L284 2008 2606e 9645*2^568861-1 171249 L644 2009 2607 15*2^568780-1 171222 L52 2005 2608a 29025*2^568761-1 171219 L268 2009 2609a 6267*2^568686-1 171196 L268 2009 2610 167176^32768+1 171153 g0 2000 Generalized Fermat 2611f 79635*2^568417-1 171116 L860 2009 2612 931*2^568391-1 171106 L548 2008 2613 Phi(3,-27745199048^8192) 171102 f6 2006 Generalized unique 2614b 33855*2^568299-1 171080 L860 2009 2615 707*2^568259+1 171066 L675 2009 2616 1735*2^568151-1 171034 L566 2009 2617 1307*2^567966-1 170978 L121 2009 2618 5380571*2^567890-1 170959 L81 2005 2619 5256777*2^567890-1 170959 L81 2005 2620 4537013*2^567890-1 170959 L81 2005 2621 4455531*2^567890-1 170959 L81 2005 2622 4206591*2^567890-1 170959 L81 2005 2623 3941273*2^567890-1 170959 L81 2005 2624 3443493*2^567890-1 170959 L81 2005 2625 3399591*2^567890-1 170959 L81 2005 2626 3275663*2^567890-1 170959 L81 2005 2627 2166717*2^567890-1 170959 L81 2005 2628 1699307*2^567890-1 170959 L81 2005 2629 1113315*2^567890-1 170958 L81 2005 2630 829653*2^567890-1 170958 L81 2005 2631 183435*2^567890-1 170958 L81 2005 2632a 29925*2^567791-1 170927 L268 2009 2633 1665*2^567736-1 170909 L251 2009 2634 1367*2^567244-1 170761 L121 2009 2635 519*2^567235+1 170758 L656 2009 Divides Fermat F(567233) 2636f 2925*2^567219-1 170754 L268 2009 2637 305*2^567161+1 170735 L679 2009 2638 301*2^566979-1 170681 L79 2007 2639 1187*2^566940-1 170670 L121 2009 2640 1107*2^566777-1 170620 L503 2009 2641 66242*5^244063+1 170598 p215 2007 2642e 7245*2^566594-1 170566 L268 2009 2643 2073*2^566123-1 170424 L268 2008 2644 1371*2^566085-1 170412 L121 2009 2645 57*2^565994-1 170383 L261 2007 2646 291*2^565917-1 170361 L261 2007 2647 1253*2^565904-1 170358 L121 2009 2648f 49335*2^565857-1 170345 L860 2009 2649 1479*2^565777-1 170320 L697 2009 2650 315*2^565722+1 170302 g361 2007 2651f 78795*2^565677-1 170291 L860 2009 2652 435*2^565591+1 170263 L692 2009 2653 1867*2^565489-1 170233 L566 2009 2654 1011*2^565482-1 170231 L503 2009 2655e 9885*2^565447-1 170221 L644 2009 2656 1353*2^565374-1 170198 L121 2009 2657 459*2^565374+1 170198 L728 2009 2658a 23805*2^565351-1 170192 L323 2009 2659 869688105*2^565266-1 170171 L139 2006 2660a 29445*2^565220-1 170153 L323 2009 2661 219*2^565209+1 170148 L754 2009 2662 1893*2^565191-1 170143 L804 2009 2663b 25935*2^565119-1 170123 L860 2009 2664 129*2^564990+1 170082 L675 2009 2665e 9885*2^564947-1 170070 L644 2009 2666e 3345*2^564815-1 170030 L121 2009 2667 41117*2^564778-1 170020 L6 2005 2668 10^170006+3880883*10^85000+1 170007 D 2006 Palindrome 2669 392113#+1 169966 p16 2001 Primorial 2670 349*2^564443-1 169917 L79 2008 2671 315*2^564347-1 169888 L79 2007 2672 895*2^564319-1 169880 L548 2008 2673 1413*2^564298-1 169874 L804 2009 2674 885*2^564282-1 169869 L548 2008 2675f 555555*2^564235-1 169858 L862 2009 2676 181*2^563997-1 169783 L145 2006 2677a 26829*2^563960-1 169774 L268 2009 2678 1047*2^563956+1 169771 L656 2009 2679a 15645*2^563878-1 169749 L268 2009 2680 1627*2^563789-1 169721 L566 2009 2681 1641*2^563774-1 169717 L701 2009 2682 281*2^563713+1 169697 L656 2009 2683 623*2^563618-1 169669 L548 2008 2684a 22095*2^563477-1 169628 L268 2009 2685 91*2^563469-1 169624 L145 2006 2686 825*2^563255-1 169560 L548 2008 2687 453*2^563253+1 169559 L665 2009 2688 1005*2^563235-1 169554 L503 2009 2689 (2^281621+1)^2-2 169553 p89 2005 2690 737*2^563135+1 169524 L705 2009 2691 785*2^562861+1 169441 L750 2009 2692 459*2^562794+1 169421 L725 2009 2693 755*2^562655+1 169379 L656 2009 2694e 6975*2^562591-1 169361 L121 2009 2695 613*2^562536+1 169343 L725 2009 2696 13*2^562456+1 169318 g267 2003 Divides GF(562454,5) 2697a 12753*2^562236-1 169255 L268 2009 2698 1175*2^562177+1 169236 L692 2009 2699 507*2^562132-1 169222 L548 2008 2700 1001*2^562107+1 169215 L725 2009 2701e 5355*2^561953-1 169169 L121 2009 2702 1059*2^561903+1 169153 L692 2009 2703 7*2^561816+1 169125 g148 2003 Divides GF(561815,5); GF(561815,6) [p149] 2704 365*2^561783+1 169117 L725 2009 2705 821*2^561774-1 169114 L566 2008 2706 1109*2^561705+1 169094 L78 2006 2707 349*2^561646+1 169075 L726 2009 2708 815730721*2^561584+1 169063 L466 2009 Generalized Fermat 2709 990267135*2^561576-1 169061 L545 2008 2710 964*7^200026+1 169045 g107 2004 2711 1881*2^561461-1 169020 L576 2009 2712 195*2^561444-1 169014 L138 2006 2713 295*2^561426+1 169009 L725 2009 2714 753*2^561335-1 168982 L548 2008 2715 5555*2^561246-1 168956 L268 2008 2716 2*809^58099+1 168950 g404 2008 2717 978847155*2^561111-1 168921 L58 2008 2718 123*2^561012+1 168884 p189 2007 2719 199*2^560987-1 168877 L426 2007 2720e 8175*2^560870-1 168843 L644 2009 2721 117*2^560848-1 168835 L145 2007 2722 1581823815*2^560649-1 168782 L83 2005 2723 951*2^560599+1 168761 L727 2009 2724 163*2^560576+1 168753 p43 2005 2725 19580625*2^560531+1 168744 L71 2007 2726 249*2^560519+1 168736 L651 2009 2727 4*3^353635-1 168728 p228 2008 2728b 29025*2^560434-1 168712 L268 2009 2729 1909*2^560435-1 168712 L698 2009 2730 1165*2^560367-1 168691 L268 2008 2731 705*2^560319+1 168676 L656 2009 2732 49335*2^560295-1 168671 L860 2009 2733 229*2^560259-1 168658 L171 2006 2734 861*2^560221-1 168647 L79 2006 2735 111546435*2^559752-1 168511 L466 2008 2736 339*2^559637+1 168471 L725 2009 2737 64*3^353093+1 168470 x28 2005 2738 967*2^559594+1 168458 L687 2009 2739 1663*2^559547-1 168444 L701 2009 2740 1173*2^559444+1 168413 L723 2009 2741 1503*2^559427-1 168408 L807 2009 2742 Phi(3,-137683^16384) 168391 f2 2005 Generalized unique 2743 1305*2^559257-1 168357 L121 2009 2744 1821*2^559186-1 168336 L697 2009 2745 1827*2^559128-1 168318 L701 2009 2746c 13236795*2^559033-1 168293 L695 2009 2747 249*2^558959+1 168266 p227 2008 2748 861*2^558945-1 168263 L79 2006 2749 2505*2^558870-1 168241 L268 2009 2750 1111*2^558861-1 168237 L503 2009 2751 1133*2^558656-1 168176 L121 2009 2752 939*2^558605-1 168160 L548 2008 2753 1151*2^558549+1 168144 L721 2009 2754 1155*2^558534+1 168139 L181 2008 2755 1801*2^558523-1 168136 L566 2009 2756 1601*2^558478-1 168122 L566 2009 2757 1683*2^558472-1 168121 L698 2009 2758 975*2^558469-1 168119 L548 2008 2759 1851*2^558458-1 168116 L701 2009 2760 2151*2^558397-1 168098 L268 2008 2761 219*2^558313-1 168072 L91 2005 2762 2355*2^558309-1 168072 L268 2009 2763e 9885*2^558268-1 168060 L644 2009 2764 1485*2^558224+1 168046 g405 2007 2765 1029*2^558220-1 168044 L503 2009 2766 591*2^558045+1 167992 L651 2009 2767 1971*2^558030-1 167988 L697 2009 2768 405405*2^558018-1 167986 L466 2008 2769 1445*2^558010-1 167981 L802 2009 2770 36315*2^557985-1 167975 L251 2009 2771 741*2^557981-1 167972 L566 2008 2772 1911*2^557915-1 167953 L698 2009 2773 246419198025*2^557789-1 167923 L106 2006 2774c 68195*6^215736+1 167881 p256 2009 2775 1951*2^557649-1 167873 L701 2009 2776 169719*2^557557+1 167847 g141 2000 2777e 8655*2^557506-1 167830 L644 2009 2778 2775*2^557490-1 167825 L268 2009 2779 385*2^557488+1 167824 L721 2009 2780 1469*2^557420-1 167804 L268 2009 2781c 2175*2^557361-1 167786 L330 2009 2782b 18525*2^557269-1 167759 L268 2009 2783 446509*2^557118+1 167715 g182 2003 2784 1845*2^557102-1 167708 L18 2009 2785 861*2^557092+1 167705 L681 2009 2786 1085*2^556987+1 167673 L721 2009 2787e 9999*2^556857-1 167635 L268 2009 2788 1875*2^556800-1 167617 L697 2009 2789 53625*2^556611-1 167562 L251 2009 2790 1935*2^556591-1 167554 L251 2008 2791 267*2^556486+1 167522 p227 2008 2792 2547*2^556368-1 167487 L323 2009 2793e 6555*2^556347-1 167481 L121 2009 2794 111546435*2^556240-1 167453 L466 2008 2795 1965*2^556221-1 167443 L566 2009 2796 1171*2^556200+1 167436 L679 2009 2797 22932195*2^556146-1 167424 L138 2006 2798 1877*2^556150-1 167422 L697 2009 2799 37785*2^556108-1 167410 L251 2009 2800 235*2^556077-1 167399 L163 2006 2801 203*2^556069+1 167396 p161 2008 2802 243*2^555984+1 167371 L165 2007 Divides GF(555978,3) 2803 4*3^350767-1 167359 p228 2008 2804 23741*2^555921+1 167354 L541 2008 2805 39*2^555902+1 167345 g267 2005 2806 515*2^555895+1 167344 L670 2009 2807 1427*2^555872-1 167338 L698 2009 2808e 9405*2^555812-1 167321 L644 2009 2809 519*2^555760-1 167304 L615 2008 2810 5347983*2^555555-1 167246 L81 2006 2811 5184553*2^555555-1 167246 L81 2006 2812 5028771*2^555555-1 167246 L81 2006 2813 4700535*2^555555-1 167246 L81 2006 2814 4258965*2^555555-1 167246 L81 2006 2815 3664525*2^555555-1 167246 L81 2006 2816 3659001*2^555555-1 167246 L81 2006 2817 3516945*2^555555-1 167246 L81 2006 2818 2949993*2^555555-1 167246 L81 2006 2819 2876215*2^555555-1 167246 L81 2006 2820 2169615*2^555555-1 167246 L81 2006 2821 1003323*2^555555-1 167245 L81 2006 2822 827365*2^555555-1 167245 L81 2006 2823 465099*2^555555-1 167245 L81 2006 2824 339559*2^555555-1 167245 L81 2006 2825 135345*2^555555-1 167244 L81 2006 2826 879*2^555471-1 167217 L644 2008 2827 283076*5^239214-1 167209 p225 2008 2828 207*2^555422+1 167201 p161 2008 2829 1297*2^555189-1 167132 L121 2009 2830 99*2^555115+1 167109 p114 2005 2831 865*2^555071-1 167096 L644 2008 2832 2937*2^555062-1 167094 L698 2009 2833 897*2^555048+1 167090 L685 2009 2834 301*2^554825-1 167022 L80 2007 2835 1055*2^554686-1 166981 L503 2009 2836 33909*23#^20000-1 166975 p229 2008 2837 1917*2^554596-1 166954 L697 2009 2838e 6975*2^554584-1 166951 L323 2009 2839e 3975*2^554537-1 166936 L323 2009 2840b 6215*2^554300-1 166865 L268 2009 2841 729*2^554074+1 166796 L656 2009 Generalized Fermat 2842 181*2^553989-1 166770 L138 2006 2843 1131*2^553862-1 166733 L121 2009 2844 1213*2^553807-1 166716 L121 2009 2845 1227*2^553552-1 166639 L121 2009 2846 945*2^553388+1 166590 L656 2009 2847 2995125705*2^553148-1 166524 L87 2005 2848b 25905*2^553125-1 166512 L860 2009 2849 877*2^552961-1 166461 L644 2008 2850 327*2^552901-1 166443 L615 2008 2851 855*2^552791+1 166410 L156 2007 2852 1581823815*2^552718-1 166394 L83 2005 2853 1173*2^552630+1 166362 L679 2009 2854 4*12^154142+1 166348 x37 2009 Generalized Fermat 2855 825*2^552348-1 166277 L548 2008 2856 58855*2^552296+1 166263 L541 2008 2857 191*2^552085+1 166197 p189 2007 2858 5761455*2^551907-1 166148 g393 2005 2859 1763*2^551866-1 166132 L697 2009 2860 37*2^551830+1 166119 p122 2005 2861c 30015*2^551787-1 166109 L251 2009 2862b 13845*2^551637-1 166064 L268 2009 2863 406033*2^551315-1 165968 L138 2006 2864 2955*2^551281-1 165956 L268 2009 2865 1187*2^551280-1 165955 L121 2009 2866 81*2^551155+1 165917 gt 2006 2867 1963*2^551139-1 165913 L697 2009 2868 37785*2^550940-1 165855 L251 2009 2869 1023*2^550765+1 165800 L687 2009 2870 601*2^550691-1 165778 L644 2008 2871 587*2^550576-1 165743 L644 2008 2872 1157*2^550426-1 165698 L121 2009 2873d 34297*2^550409-1 165695 L282 2009 2874 563*2^550396-1 165689 L644 2008 2875 666625245*2^550161-1 165624 L146 2008 2876c 21525*2^550165-1 165621 L251 2009 2877 195*2^550148+1 165614 p189 2007 2878 291*2^550040+1 165582 p240 2009 2879 425*2^550026-1 165577 L644 2008 2880 Phi(3,-12742963350^8192) 165565 f18 2006 Generalized unique 2881 1287*2^549917-1 165545 L121 2009 2882b 6215*2^549874-1 165533 L268 2009 2883 210885*2^549843-1 165525 L137 2005 2884 923*2^549734-1 165490 L548 2008 2885e 9465*2^549515-1 165425 L644 2009 2886 36315*2^549422-1 165398 L251 2009 2887 621*2^549331-1 165368 L644 2008 2888 1097*2^549280-1 165353 L503 2008 2889 231*2^549235+1 165339 p43 2005 2890b 6247*2^549177-1 165323 L268 2009 2891 1285*2^549159-1 165317 L268 2008 2892e 9585*2^549120-1 165306 L644 2009 2893 11111*2^549034-1 165280 L123 2007 2894 1547*2^548936-1 165250 L697 2009 2895b 6279*2^548795-1 165208 L268 2009 2896 199*2^548533-1 165128 L426 2007 2897 1935*2^548512-1 165122 L251 2008 2898 343*2^548383-1 165083 L79 2008 2899 415*2^548359-1 165076 L548 2008 2900 627*2^548302+1 165059 L687 2009 2901 179*2^548291+1 165055 p189 2007 2902 861*2^548116+1 165003 L712 2009 2903 2^548108-2^274054-1 164997 p168 2006 2904 1429*2^548083-1 164993 L268 2009 2905 37*2^548012+1 164970 p122 2005 2906 1125*2^547950-1 164953 L121 2009 2907 435*2^547893+1 164935 L203 2008 2908b 6277*2^547881-1 164933 L268 2009 2909 821*2^547803+1 164909 L656 2009 2910 458743*2^547791-1 164908 g163 2003 2911 735*2^547661-1 164866 g172 2006 2912 1293*2^547638-1 164859 L121 2009 2913 537801*2^547497+1 164819 g356 2006 2914 431595*2^547497+1 164819 g356 2006 2915 143309*2^547497+1 164819 g356 2006 2916 95309*2^547497+1 164818 g356 2006 2917 56781*2^547497+1 164818 g356 2006 2918 595*2^547465-1 164807 L579 2008 2919 1987*2^547437-1 164799 L566 2009 2920 239*2^547433+1 164797 L713 2009 2921 1943*2^547370-1 164779 L555 2009 2922 1371*2^547287-1 164753 L121 2009 2923 1695*2^547141+1 164710 g336 2006 2924 1485*2^547107+1 164699 g405 2007 2925 1755*2^547056-1 164684 L585 2009 2926 1453*2^546959-1 164655 L803 2009 2927 969*2^546938+1 164648 L714 2009 2928 2945*2^546922-1 164644 L698 2009 2929 561*2^546613-1 164550 L644 2008 2930 1493*2^546544-1 164530 L698 2009 2931 1559*2^546524-1 164524 L701 2009 2932 217*2^546500+1 164516 p161 2008 2933 375*2^546458+1 164503 L689 2009 2934 1737*2^546368-1 164477 L698 2009 2935 593*2^546309+1 164459 L719 2009 2936 717*2^546174-1 164418 L548 2008 2937 213*2^546146+1 164409 p161 2008 2938 449*2^546076-1 164388 L548 2008 2939 849*2^546031-1 164375 L548 2008 2940 837*2^546024+1 164373 L748 2009 2941 975*2^545986+1 164362 L676 2009 2942 453*2^545863-1 164324 L548 2008 2943 1913*2^545806-1 164308 L803 2009 2944e 2175*2^545721-1 164282 L330 2009 2945 153*2^545716-1 164280 L91 2005 2946a 7723*2^545695-1 164275 L1112 2009 2947 507*2^545696+1 164274 L656 2009 2948a 7609*2^545685-1 164272 L862 2009 2949 1017*2^545589-1 164242 L503 2009 2950a 7747*2^545561-1 164235 L862 2009 2951 1167*2^545551+1 164231 L715 2009 2952e 58695*2^545442-1 164200 L644 2009 2953 2985*2^545391-1 164183 L251 2009 2954a 7367*2^545376-1 164179 L862 2009 2955a 7941*2^545334-1 164166 L862 2009 2956 1047*2^545296+1 164154 L661 2009 2957 737*2^545287+1 164151 L651 2009 2958a 7199*2^545088-1 164092 L862 2009 2959f 6555*2^545008-1 164068 L892 2009 2960 347*2^544887+1 164030 L679 2009 Divides GF(544886,5) 2961 337*2^544852+1 164020 L668 2009 2962a 7007*2^544752-1 163991 L862 2009 2963 735*2^544725-1 163982 g172 2006 2964 1259*2^544692-1 163972 L121 2009 2965e 6975*2^544636-1 163956 L268 2009 2966 1475*2^544628-1 163953 L698 2009 2967a 7007*2^544624-1 163953 L862 2009 2968a 7457*2^544488-1 163912 L862 2009 2969c 18525*2^544286-1 163851 L323 2009 2970 5761455*2^544162-1 163816 g393 2005 2971 1575*2^544152-1 163810 L251 2009 2972 779*2^544147+1 163808 L710 2009 2973a 7335*2^544123-1 163802 L862 2009 2974 1155*2^544104-1 163795 L121 2009 2975 92235*2^544089-1 163793 L251 2009 2976a 7621*2^544015-1 163769 L862 2009 2977 1839*2^543935-1 163745 L617 2009 2978 246419198025*2^543820-1 163718 L106 2006 2979a 7635*2^543621-1 163651 L862 2009 2980 1291*2^543607-1 163646 L121 2009 2981a 7695*2^543543-1 163627 L862 2009 2982a 7617*2^543524-1 163621 L862 2009 2983 19750825*2^543452+1 163603 g121 2004 2984 1195*2^543465-1 163603 L121 2009 2985 37785*2^543314-1 163559 L251 2009 2986 1857*2^543216-1 163528 L468 2008 2987 343*2^543148+1 163507 L119 2009 2988 89*2^543049+1 163476 p189 2006 2989a 7733*2^542974-1 163456 L862 2009 2990 49*2^542945-1 163445 L217 2007 2991a 7491*2^542906-1 163435 L862 2009 2992 1757*2^542894-1 163431 L548 2009 2993 321*2^542876+1 163425 L670 2009 2994 1135*2^542831-1 163412 L268 2008 2995 485*2^542823+1 163409 L651 2009 2996 615*2^542783+1 163397 L709 2009 2997e 9315*2^542607-1 163345 L644 2009 2998 429*2^542500-1 163312 L579 2008 2999 Phi(3,-96280^16384) 163301 f2 2005 Generalized unique 3000 1293*2^542346-1 163266 L121 2009 3001a 7469*2^542324-1 163260 L862 2009 3002 99291*35840^35840-1 163234 x37 2008 3003 459*2^542204-1 163223 L579 2008 3004c 6287*2^542138-1 163204 L268 2009 3005 407*2^541955+1 163148 L203 2007 3006 787*2^541934+1 163142 L651 2009 3007 1867*2^541921-1 163138 L804 2009 3008 1217*2^541878-1 163125 L121 2009 3009a 7529*2^541772-1 163094 L862 2009 3010 199*2^541753-1 163087 L426 2007 3011 669*2^541685+1 163067 L656 2009 3012 933*2^541668+1 163062 L716 2009 3013 121*2^541621-1 163047 L65 2004 3014 255255*2^541578+1 163037 L94 2006 3015 325*2^541569-1 163032 L79 2007 3016 1983*2^541564-1 163031 L701 2009 3017f 3975*2^541557-1 163029 L323 2009 3018e 3045*2^541490-1 163009 L615 2009 3019 1825*2^541409-1 162984 L617 2009 3020 257*2^541402-1 162981 L145 2006 3021a 7223*2^541334-1 162962 L862 2009 3022 91*2^541128+1 162898 p189 2006 3023 635*2^541112-1 162894 L629 2008 3024 805*2^541106+1 162893 L689 2009 3025 1101*2^541091+1 162888 L196 2009 3026 159503*2^540945+1 162846 g341 2004 3027 525*2^540866+1 162820 L717 2009 3028 543*2^540826+1 162808 L754 2009 3029 201*2^540810-1 162803 L282 2007 3030 777*2^540606+1 162742 L711 2009 3031 190468*5^232789-1 162718 p225 2008 3032 47*2^540494-1 162707 L548 2008 3033 249*2^540394+1 162678 p227 2008 3034a 7017*2^540376-1 162674 L862 2009 3035a 7075*2^540355-1 162667 L862 2009 3036a 7365*2^540307-1 162653 L862 2009 3037a 7357*2^539949-1 162545 L893 2009 3038 66505*2^539824+1 162509 L541 2008 3039 1131*2^539823+1 162506 L673 2009 3040a 7985*2^539796-1 162499 L862 2009 3041e 9705*2^539608-1 162443 L644 2009 3042 679*2^539605-1 162441 L548 2008 3043 1665*2^539599-1 162439 L251 2009 3044a 7555*2^539487-1 162406 L862 2009 3045 8*23^119215+1 162340 p238 2008 3046a 7963*2^539187-1 162316 L862 2009 3047 243*2^539016-1 162263 L442 2007 3048a 7607*2^538980-1 162254 L862 2009 3049 67531*2^538755-1 162187 L164 2007 3050 1905*2^538661-1 162157 L697 2009 3051 21*2^538657-1 162154 L56 2004 3052 709*2^538623-1 162145 L548 2008 3053 1183*2^538558+1 162126 L717 2009 3054 1491*2^538543-1 162121 L696 2009 3055c 22701*2^538402-1 162080 L323 2009 3056 163*2^538318+1 162053 p43 2005 3057 431*2^538215+1 162022 L203 2008 3058 95662*5^231787-1 162018 p214 2008 3059 1029*2^538195+1 162016 L689 2009 3060 519*2^538118+1 161993 p161 2008 3061a 7467*2^538080-1 161983 L862 2009 3062 465*2^538043-1 161970 L198 2007 3063 2151*2^537994-1 161956 L268 2008 3064 1843*2^537939-1 161940 L800 2009 3065e 9615*2^537551-1 161823 L644 2009 3066 367*2^537553-1 161823 L594 2008 3067 2235*2^537475-1 161800 L251 2009 3068 1947*2^537464-1 161797 L701 2009 3069 1793*2^537448-1 161792 L566 2009 3070 1353*2^537315-1 161752 L121 2009 3071 1455*2^537289-1 161744 g405 2008 3072 36315*2^537266-1 161738 L251 2009 3073 79*2^537238+1 161727 p189 2006 3074 729*2^537230+1 161726 p161 2008 Generalized Fermat 3075a 7475*2^537132-1 161697 L862 2009 3076c 20145*2^537111-1 161691 L268 2009 3077c 21885*2^537009-1 161661 L268 2009 3078a 7155*2^536959-1 161645 L862 2009 3079a 7917*2^536948-1 161642 L862 2009 3080 3721*2^536916+1 161632 L123 2007 Generalized Fermat 3081a 7249*2^536909-1 161630 L862 2009 3082 417*2^536876-1 161619 g276 2006 3083a 117690*31^108349-1 161593 p256 2009 3084 375*2^536724-1 161573 L617 2008 3085 129*2^536615-1 161540 L145 2007 3086a 7665*2^536586-1 161533 L862 2009 3087 555*2^536460-1 161494 L548 2008 3088 645*2^536435+1 161486 p161 2008 3089a 7395*2^536408-1 161479 L862 2009 3090 1883*2^536160-1 161404 L576 2009 3091c 6267*2^536158-1 161404 L268 2009 3092 178657*2^535974+1 161350 p243 2009 3093 823*2^535955-1 161342 L548 2008 3094c 19635*2^535940-1 161339 L268 2009 3095a 7381*2^535863-1 161315 L862 2009 3096 685281*2^535827-1 161306 L161 2006 3097 91*2^535819-1 161300 L145 2006 3098a 7355*2^535800-1 161296 L862 2009 3099 525*2^535741-1 161277 L79 2007 3100 423261447984375*2^535700+1 161277 L466 2009 3101 231*2^535713-1 161269 L87 2005 3102a 7201*2^535641-1 161248 L862 2009 3103 789*2^535627+1 161243 p161 2008 3104c 28635*2^535597-1 161236 L860 2009 3105 1191*2^535593+1 161233 L656 2009 3106a 7367*2^535548-1 161220 L862 2009 3107 957*2^535472-1 161197 L548 2008 3108 108045*2^535443-1 161190 L466 2008 3109a 7095*2^535403-1 161177 L862 2009 3110a 7647*2^535386-1 161172 L862 2009 3111a 7157*2^535378-1 161169 L862 2009 3112 1065*2^535328+1 161153 L656 2009 3113a 7133*2^535182-1 161110 L862 2009 3114 37510*3^337592+1 161077 p126 2006 Generalized Cullen 3115a 7707*2^535008-1 161058 L862 2009 3116 1939*2^534973-1 161047 L701 2009 3117 39*2^534973+1 161045 g267 2005 3118 101*2^534891+1 161021 p189 2007 3119 1459*2^534807-1 160997 L701 2009 3120 1089*2^534806+1 160996 L605 2009 Generalized Fermat 3121d 29025*2^534750-1 160981 L323 2009 3122 1191*2^534646-1 160948 L121 2009 3123 97*2^534602+1 160934 p114 2005 3124 147*2^534558+1 160921 p189 2007 3125 267253*2^534508+1 160909 p243 2009 3126 385*2^534324+1 160851 p161 2008 3127 1757*2^534312-1 160848 L619 2009 3128 97*2^534310+1 160846 p114 2005 3129 639*2^534159-1 160801 L579 2008 3130a 7063*2^534123-1 160791 L862 2009 3131 978847155*2^533895-1 160728 L58 2008 3132 1923*2^533876-1 160716 L697 2009 3133 975*2^533780+1 160687 p161 2008 3134e 9555*2^533522-1 160611 L644 2009 3135 1337*2^533416-1 160578 L51 2004 3136 1371*2^533414-1 160577 L121 2009 3137 1539*2^533384-1 160568 L566 2009 3138 1487*2^533256-1 160530 L698 2009 3139a 7395*2^533240-1 160526 L862 2009 3140 1575*2^533192-1 160510 L251 2009 3141 723*2^533086-1 160478 L548 2008 3142 137*2^533043+1 160465 MC 2004 3143b 7275*2^532981-1 160448 L862 2009 3144 1797*2^532962-1 160441 L769 2009 3145 401143*2^532927-1 160433 g163 2003 3146 491*2^532821+1 160398 p161 2008 3147 1375*2^532785-1 160388 L121 2009 3148 7179*2^532680-1 160357 L541 2008 3149 8295*2^532615-1 160338 L257 2009 3150 273*2^532597+1 160331 p161 2008 3151 1245*2^532493-1 160300 L121 2009 3152 807*2^532358+1 160259 p161 2008 3153e 9405*2^532343-1 160256 L644 2009 3154 1745*2^532306-1 160244 L698 2009 3155 45652*5^229218+1 160222 p215 2007 3156 1065*2^532082-1 160176 L121 2009 3157 1029*2^532036-1 160162 L503 2009 3158 5655*2^531926-1 160130 L268 2008 3159 1137*2^531881-1 160116 L503 2009 3160 2*1031^53111+1 160038 g404 2009 Divides Phi(1031^53111,2) 3161 10^160016+8231328*10^80005+1 160017 D 2006 Palindrome 3162e 8235*2^531486-1 159998 L644 2009 3163 1033*2^531444+1 159984 L673 2009 3164 1275*2^531404-1 159972 L121 2009 3165 199*2^531357-1 159957 L426 2007 3166 291*2^531347-1 159954 L171 2007 3167b 7683*2^531323-1 159949 L862 2009 3168d 13065*2^531310-1 159945 L268 2009 3169 965*2^531295+1 159939 p161 2008 3170 1763*2^531284-1 159936 L619 2009 3171c 30015*2^531210-1 159915 L860 2009 3172d 2041*2^530985-1 159846 L806 2009 3173 607*2^530957-1 159837 L543 2008 3174f 5445*2^530923-1 159828 L268 2009 3175 1995*2^530872-1 159812 L548 2009 3176 209*2^530729+1 159768 p161 2008 3177 453*2^530675-1 159752 L543 2008 3178 1121*2^530551+1 159715 L656 2009 3179c 6271*2^530541-1 159713 L268 2009 3180 1101*2^530481+1 159694 L668 2009 3181 921*2^530480+1 159694 p161 2008 3182 33448*5^228454+1 159688 p215 2007 3183 503*2^530429+1 159678 g233 2006 3184 5775*2^530395+1 159669 p189 2007 3185 1831*2^530387-1 159666 L555 2009 3186 105*2^530360-1 159657 L325 2007 3187 591*2^530223-1 159616 L579 2008 3188 565*2^530221-1 159616 L579 2008 3189 145*2^530181-1 159603 L163 2006 3190 697*2^530150+1 159594 p161 2008 3191 302627325*2^530101+1 159585 gf 1999 3192 901*2^530103-1 159580 L579 2008 3193 7605*2^530086-1 159576 L323 2009 3194 1121*2^530057+1 159567 L635 2009 3195 1767*2^530014-1 159554 L701 2009 3196 675*2^529997-1 159548 L79 2007 3197 3039469*2^529893-1 159521 L466 2008 3198 549*2^529887+1 159515 p161 2008 3199f 6975*2^529869-1 159511 L268 2009 3200b 7499*2^529840-1 159502 L862 2009 3201b 7719*2^529835-1 159501 L862 2009 3202 39*2^529642+1 159440 g267 2005 3203 1765*2^529603-1 159430 L701 2009 3204d 22701*2^529598-1 159430 L268 2009 3205 978847155*2^529577-1 159428 L58 2008 3206 813*2^529552+1 159414 p161 2008 3207f 248360*35072^35072-1 159407 x37 2009 3208 22932195*2^529462-1 159392 L138 2006 3209 1185*2^529444+1 159382 L707 2009 3210 175*2^529417-1 159373 L145 2006 3211b 7885*2^529355-1 159356 L893 2009 3212b 7173*2^529338-1 159351 L864 2009 3213 349*2^529251-1 159323 L79 2008 3214 435*2^529247+1 159322 L203 2008 3215 273*2^529094+1 159276 p227 2008 3216 2995125705*2^529005-1 159256 L87 2005 3217 2508*1959^48373+1 159249 g261 2005 3218f 9441*2^528999-1 159249 L323 2009 3219b 7857*2^528954-1 159235 L862 2009 3220 163*2^528788+1 159184 p43 2005 3221 79635*2^528729-1 159169 L251 2009 3222 1683*2^528588-1 159125 L555 2009 3223e 2055*2^528561-1 159117 L330 2009 3224b 7149*2^528451-1 159084 L862 2009 3225 335*2^528439+1 159079 p161 2008 3226 2445*2^528423-1 159075 L121 2009 3227 483*2^528297+1 159036 p161 2008 Divides GF(528292,3) 3228 45*2^528245-1 159020 L167 2007 3229b 7381*2^528233-1 159018 L893 2009 3230 1963*2^528211-1 159011 L548 2009 3231a 10003*2^528030+1 158957 g380 2009 3232 70906^32768+1 158948 g136 2001 Generalized Fermat 3233 366439#+1 158936 p16 2001 Primorial 3234 1965*2^527912-1 158921 L698 2009 3235f 9615*2^527772-1 158880 L644 2009 3236e 24097*2^527737-1 158870 L323 2009 3237d 23805*2^527683-1 158853 L268 2009 3238 19650919*2^527530+1 158810 p147 2004 3239 1849*2^527449-1 158782 L566 2009 3240 615*2^527416-1 158771 L548 2008 3241 1845*2^527412-1 158771 L18 2009 3242 7215*2^527378-1 158761 L257 2009 3243 1695*2^527363-1 158756 L698 2009 3244 1047*2^527295+1 158735 L705 2009 3245c 6205*2^527291-1 158735 L268 2009 3246 1517*2^527274-1 158729 L548 2009 3247 525*2^527270-1 158727 L79 2007 3248 1169*2^527225+1 158714 L635 2009 3249 1143*2^527131-1 158686 L121 2009 3250b 7003*2^527055-1 158664 L864 2009 3251 67*2^527037-1 158656 L268 2007 3252 1887*2^526956-1 158633 L548 2009 3253d 2041*2^526919-1 158622 L806 2009 3254 1221*2^526909-1 158619 L121 2009 3255b 7075*2^526825-1 158594 L893 2009 3256b 7311*2^526790-1 158584 L893 2009 3257 757*2^526680+1 158550 p161 2008 3258 949*2^526586+1 158522 p161 2008 3259b 7633*2^526539-1 158508 L862 2009 3260 2941*2^526493-1 158494 L698 2009 3261 1365*2^526329-1 158444 L121 2009 3262 1603*2^526319-1 158442 L182 2006 3263 629*2^526211+1 158409 p161 2008 3264 1757*2^526146-1 158389 L698 2009 3265d 26829*2^526099-1 158377 L268 2009 3266d 22785*2^526091-1 158374 L268 2009 3267b 7225*2^526037-1 158357 L862 2009 3268 1383*2^526031-1 158355 L121 2009 3269 1885*2^525997-1 158345 L555 2009 3270b 6710*13^142143-1 158344 p257 2009 3271 345*2^525977+1 158338 g258 2007 Divides GF(525974,6) 3272 1143*2^525912-1 158319 L121 2009 3273 5445*2^525824-1 158293 L257 2009 3274f 8445*2^525823-1 158293 L644 2009 3275f 9735*2^525696-1 158255 L644 2009 3276 11*2^525589+1 158220 p116 2003 Divides GF(525588,6) 3277 135*2^525544-1 158207 L171 2007 3278 2715*2^525530-1 158204 L268 2009 3279 1497*2^525434-1 158175 L566 2009 3280 287*2^525378-1 158157 L145 2006 3281 1185*2^525340-1 158147 L121 2009 3282 1347*2^525308-1 158137 L121 2009 3283 79635*2^525065-1 158066 L251 2009 3284 4035*2^525066-1 158065 L268 2008 3285 425*2^524997+1 158043 L203 2008 3286 3234846615*2^524946-1 158035 p113 2004 3287e 31838235*2^524946+1 158032 p190 2009 3288 401*2^524862-1 158002 L548 2008 3289b 7643*2^524812-1 157989 L862 2009 3290 1569*2^524755-1 157971 L566 2009 3291 7605*2^524632-1 157934 L323 2009 3292 711*2^524387-1 157860 L548 2008 3293 423261447984375*2^524273+1 157837 L466 2009 3294 575600367*2^524288-1 157836 g415 2008 3295 379482687*2^524288-1 157835 g415 2008 3296c 6085957*2^524288+1 157834 L466 2009 3297a 6048203*2^524288-1 157834 L466 2009 3298c 5926581*2^524288+1 157834 L466 2009 3299b 5909037*2^524288-1 157834 L466 2009 3300e 5456845*2^524288+1 157834 L466 2009 3301f 5226703*2^524288+1 157834 L466 2009 3302f 4988033*2^524288-1 157834 L466 2009 3303 4797425*2^524288-1 157834 L466 2009 3304 4795019*2^524288-1 157834 L466 2009 3305 4636255*2^524288+1 157834 L466 2009 3306 4444973*2^524288-1 157834 L466 2009 3307 4380193*2^524288+1 157834 L466 2009 3308 3905237*2^524288-1 157834 L466 2009 3309 3780035*2^524288-1 157833 L466 2009 3310 3525165*2^524288+1 157833 L466 2008 3311 3459757*2^524288+1 157833 L466 2008 3312 3278729*2^524288-1 157833 L466 2008 3313 3085109*2^524288-1 157833 L466 2008 3314 3077949*2^524288-1 157833 L466 2008 3315 2646507*2^524288+1 157833 L466 2008 3316 1862525*2^524288-1 157833 L466 2008 3317 1557973*2^524288+1 157833 L466 2008 3318 1359313*2^524288+1 157833 L466 2008 3319 1292371*2^524288+1 157833 L466 2008 3320 1267013*2^524288-1 157833 L466 2008 3321 1204313*2^524288-1 157833 L466 2008 3322 1109427*2^524288+1 157833 L466 2008 3323 764017*2^524288+1 157833 L466 2008 3324 685299*2^524288-1 157833 L466 2007 3325 677901*2^524288+1 157833 L466 2007 3326 622867*2^524288+1 157833 L466 2007 3327 428079*2^524288-1 157833 L466 2007 3328 422943*2^524288+1 157833 L466 2007 3329 358245*2^524288+1 157832 L466 2007 3330 113451*2^524287+1 157832 p152 2004 3331 1487*2^524264-1 157823 L701 2009 3332 1339*2^524235-1 157814 L121 2009 3333 595*2^524229-1 157812 L548 2008 3334f 9435*2^524209-1 157807 L644 2009 3335b 7479*2^524153-1 157790 L862 2009 3336 1623*2^524063-1 157762 L566 2009 3337 567*2^524044+1 157756 p161 2008 3338 255255*2^523865+1 157705 L94 2006 3339b 7251*2^523781-1 157678 L862 2009 3340 1139*2^523728-1 157661 L503 2009 3341c 7011*2^523634-1 157634 L862 2009 3342 975*2^523544+1 157606 p161 2008 3343f 15043*2^523519-1 157600 L257 2009 3344 27183585*2^523451+1 157582 L122 2007 3345 137*2^523283+1 157527 MC 2004 3346 405405*2^523129-1 157484 L466 2008 3347 525*2^523046+1 157456 p161 2008 3348 515*2^523017+1 157447 p161 2008 3349 1899*2^522879-1 157406 L701 2009 3350f 555555*2^522870-1 157406 L862 2009 3351b 7753*2^522863-1 157402 L862 2009 3352 1089*2^522759+1 157370 L672 2009 3353 11390625*2^522725-1 157363 L614 2009 3354 1137*2^522714+1 157356 L689 2009 3355 691*2^522556+1 157308 p161 2008 3356 521*2^522422-1 157268 L565 2008 3357b 7657*2^522393-1 157260 L862 2009 3358 1639*2^522361-1 157250 L701 2009 3359 273*2^522287-1 157227 L171 2007 3360 817*2^522253-1 157217 L548 2008 3361 465*2^522168-1 157191 L198 2007 3362 1005*2^522070+1 157162 L717 2009 3363 5445*2^522059-1 157160 L257 2009 3364 769217*2^522002-1 157145 p90 2007 3365 338271*2^522002-1 157144 p90 2007 3366 268311*2^522002-1 157144 p90 2007 3367 25447*2^522002+1 157143 p90 2006 3368 21735*2^522002-1 157143 p90 2007 3369 3975*2^522004+1 157143 p90 2006 3370c 7503*2^521996-1 157141 L864 2009 3371e 23805*2^521958-1 157130 L257 2009 3372c 25935*2^521940-1 157125 L860 2009 3373 63*2^521925+1 157117 p161 2007 3374 1349*2^521900-1 157111 L121 2009 3375 955*2^521891-1 157108 L548 2008 3376 98682705*2^521820-1 157092 L545 2008 3377 326962*5^224737-1 157090 p225 2007 3378 913*2^521804+1 157082 p161 2008 3379 7215*2^521696-1 157051 L268 2009 3380 425*2^521696-1 157049 L585 2008 3381 1785*2^521690-1 157048 L701 2009 3382a 3873*2^521592-1 157019 L860 2009 3383a 3951*2^521470-1 156982 L860 2009 3384 927*2^521468+1 156981 p161 2008 3385 13*2^521306+1 156930 g267 2003 3386d 54321*2^521267-1 156922 L637 2009 3387e 20145*2^521191-1 156899 L257 2009 3388 1001*2^521137+1 156881 L702 2009 3389a 3407*2^521130-1 156880 L860 2009 3390 749*2^521099+1 156870 p161 2008 3391 123*2^521031-1 156849 L91 2005 3392b 7073*2^521022-1 156848 L862 2009 3393b 7405*2^521017-1 156846 L862 2009 3394 21102003*2^520908-1 156817 L458 2007 3395 111*2^520923-1 156816 L91 2005 3396a 3423*2^520902-1 156811 L860 2009 3397 809*2^520875+1 156802 p161 2008 3398 561*2^520850-1 156795 L615 2008 3399 92278*50^92278+1 156783 g157 2008 Generalized Cullen 3400 7245*2^520742-1 156763 L268 2009 3401b 7681*2^520723-1 156758 L862 2009 3402b 7891*2^520687-1 156747 L862 2009 3403c 7293*2^520584-1 156716 L864 2009 3404 201*2^520586-1 156715 L282 2007 3405 895*2^520479-1 156683 L615 2008 3406e 18525*2^520464-1 156680 L323 2009 3407 1575*2^520302-1 156630 L251 2009 3408c 7293*2^520294-1 156628 L860 2009 3409c 7845*2^520240-1 156612 L862 2009 3410 715*2^520195-1 156598 L615 2008 3411 763094475*2^520160-1 156593 L545 2008 3412 731*2^520155+1 156586 p161 2008 3413 133138*5^224013-1 156584 p225 2007 3414 1117*2^520148+1 156584 g241 2006 3415 237881*2^520025+1 156549 g167 2003 3416 1575*2^520003-1 156540 L251 2009 3417 991*2^519993-1 156537 L548 2008 3418 405405*2^519961-1 156530 L466 2008 3419 847*2^519964+1 156528 L153 2008 3420 57*2^519892+1 156505 p152 2007 3421 1287*2^519884+1 156504 p161 2008 3422 57*2^519862+1 156496 p152 2007 3423 2295*2^519749-1 156464 L121 2009 3424 313*2^519748+1 156463 L153 2008 3425 37785*2^519716-1 156455 L251 2009 3426 17861*2^519674-1 156442 L536 2009 3427 657*2^519647+1 156433 p161 2008 3428 1335*2^519561+1 156407 p161 2008 3429d 6203*2^519530-1 156398 L268 2009 3430 685*2^519476+1 156381 p161 2008 3431c 7111*2^519387-1 156355 L893 2009 3432 353*2^519312-1 156332 L576 2008 3433 1879*2^519269-1 156319 L555 2009 3434c 7703*2^519256-1 156316 L862 2009 3435 1449*2^519251-1 156314 L566 2009 3436 1431*2^519174-1 156291 L698 2009 3437e 23295*2^519113-1 156273 L268 2009 3438 1875*2^519075-1 156261 L566 2009 3439 1103*2^519041+1 156250 p161 2008 3440c 7157*2^519004-1 156240 L862 2009 3441 1195*2^518997-1 156237 L121 2009 3442 789*2^518911-1 156211 L548 2008 3443 243*2^518736-1 156158 L442 2007 3444 847*2^518645-1 156131 L548 2008 3445 123*2^518540-1 156099 L91 2005 3446c 7665*2^518161-1 155986 L860 2009 3447c 7185*2^518126-1 155976 L860 2009 3448 301*2^517960+1 155924 L153 2007 3449 1981*2^517893-1 155905 L701 2009 3450a 3915*2^517581-1 155811 L862 2009 3451f 5355*2^517558-1 155805 L426 2009 3452 (3997*(2^86243-1))^3*((3997*(2^86243-1))^3-1)-1 155792 p168 2009 3453a 3573*2^517463-1 155776 L862 2009 3454c 7209*2^517373-1 155749 L862 2009 3455 233*2^517373+1 155748 p227 2008 3456f 8325*2^517351-1 155743 L644 2009 3457e 16665*2^517348-1 155742 L268 2009 3458e 28605*2^517341-1 155740 L268 2009 3459 92235*2^517249-1 155713 L251 2009 3460 293*2^517242-1 155708 L145 2006 3461a 3543*2^517192-1 155694 L862 2009 3462 5761455*2^517136-1 155681 g393 2005 3463c 7147*2^517101-1 155667 L862 2009 3464 1839*2^516995-1 155635 L698 2009 3465a 3923*2^516904-1 155608 L862 2009 3466 819*2^516883-1 155601 L548 2008 3467 793*2^516715-1 155550 L548 2008 3468 555*2^516529-1 155494 L548 2008 3469 721*2^516520+1 155491 p161 2008 3470 37995*2^516463-1 155476 L251 2009 3471 123*2^516456-1 155471 L91 2005 3472 405*2^516432-1 155465 L282 2007 3473 1093*2^516406+1 155457 p161 2008 3474 561*2^516347+1 155439 L153 2008 3475a 3495*2^516334-1 155436 L862 2009 3476 595*2^516324+1 155432 L153 2008 3477 83660*72^83660-1 155390 g265 2003 Generalized Woodall 3478 1581823815*2^516152-1 155387 L83 2005 3479 507*2^516086+1 155361 L153 2008 3480a 3751*2^516083-1 155361 L862 2009 3481 231*2^516048+1 155349 p43 2005 3482 986963835*2^516018+1 155346 g368 2005 3483 1239*2^515961-1 155323 L121 2009 3484 71*2^515885+1 155299 p152 2007 3485 287*2^515827+1 155282 p227 2008 3486 573*2^515815-1 155279 L543 2008 3487 945*2^515762-1 155263 L576 2008 3488 561*2^515702-1 155245 L548 2008 3489 1235*2^515675+1 155237 p161 2008 3490 501*2^515543+1 155197 L153 2007 3491c 7727*2^515484-1 155181 L862 2009 3492 736320585*2^515431-1 155170 L183 2007 3493 1085*2^515381+1 155149 p161 2008 3494 1925*2^515298-1 155124 L555 2009 3495 5775*2^515218+1 155100 p189 2007 3496a 3609*2^515211-1 155098 L860 2009 3497f 8475*2^515071-1 155056 L644 2009 3498 759007755*2^514971-1 155031 L545 2008 3499 1921*2^514969-1 155025 L548 2009 3500c 7305*2^514952-1 155020 L893 2009 3501 755*2^514952-1 155019 L585 2008 3502c 7857*2^514937-1 155016 L862 2009 3503a 3675*2^514938-1 155016 L860 2009 3504 159*2^514927+1 155011 p43 2005 3505 987*2^514910+1 155007 p161 2008 3506 375*2^514874-1 154996 L620 2008 3507 1849*2^514843-1 154987 L548 2009 3508f 8685*2^514658-1 154932 L644 2009 3509 92235*2^514653-1 154931 L251 2009 3510a 3771*2^514593-1 154912 L860 2009 3511c 7805*2^514476-1 154877 L862 2009 3512 517*2^514430+1 154862 L153 2008 3513 471*2^514399-1 154853 L548 2008 3514 895*2^514336+1 154834 p161 2008 3515e 2677177*2^514229-1 154805 L466 2009 3516f 2554711*2^514229-1 154805 L466 2009 3517f 2548237*2^514229-1 154805 L466 2009 3518 2302315*2^514229-1 154805 L466 2009 3519 1452459*2^514229-1 154805 L466 2008 3520 926197*2^514229-1 154805 L466 2008 3521 834961*2^514229-1 154805 L466 2008 3522 131831*2^514229+1 154804 L466 2008 3523 103939*2^514229-1 154804 L466 2007 3524 14161*2^514229-1 154803 L466 2007 3525 3681*2^514229-1 154802 L466 2007 3526 165452*5^221446-1 154790 p225 2007 3527 2153*2^514076-1 154756 L268 2008 3528 1281*2^514045+1 154747 p161 2008 3529 321*2^514041-1 154745 L79 2007 3530 913*2^514008+1 154735 L153 2008 3531e 29025*2^513989-1 154731 L268 2009 3532 789*2^513943-1 154716 L548 2008 3533 1365*2^513913-1 154707 L121 2009 3534a 3637*2^513869-1 154694 L860 2009 3535 375*2^513834-1 154683 L576 2008 3536e 28215*2^513716-1 154649 L268 2009 3537e 21885*2^513697-1 154643 L268 2009 3538 16175*2^513645+1 154627 L541 2008 3539 281065*2^513505-1 154586 L80 2005 3540 581*2^513506-1 154584 L548 2008 3541c 7003*2^513435-1 154564 L862 2009 3542 1125*2^513375-1 154545 L503 2009 3543 637*2^513284+1 154517 L153 2008 3544c 7385*2^513152-1 154479 L862 2009 3545 393*2^513153+1 154478 p227 2008 3546e 6283*2^513123-1 154470 L268 2009 3547c 7875*2^513091-1 154460 L862 2009 3548 831*2^513082-1 154456 L548 2008 3549 121*2^513020+1 154437 p189 2007 Generalized Fermat 3550a 3647*2^513008-1 154435 L860 2009 3551 39*2^512997+1 154430 g267 2005 Divides GF(512994,5), GF(512995,6) 3552c 7785*2^512960-1 154421 L862 2009 3553 10001*2^512918-1 154408 p249 2009 3554 795*2^512914+1 154406 p161 2008 3555f 13236795*2^512891-1 154403 L695 2009 3556 65537*2^512895+1 154402 g361 2006 3557 717*2^512802+1 154372 p161 2008 3558a 3731*2^512798-1 154372 L860 2009 3559c 7053*2^512774-1 154365 L862 2009 3560c 7969*2^512741-1 154355 L862 2009 3561 71*2^512745+1 154354 p152 2007 3562a 3951*2^512710-1 154345 L860 2009 3563e 6207*2^512584-1 154307 L268 2009 3564 4275*2^512439-1 154264 L268 2008 3565a 3643*2^512427-1 154260 L860 2009 3566a 3609*2^512411-1 154255 L860 2009 3567 70013*2^512206-1 154195 g276 2005 3568 571*2^512192+1 154188 L153 2008 3569c 7635*2^512102-1 154162 L862 2009 3570 451*2^512076+1 154153 L153 2008 3571 1791*2^511967-1 154121 L548 2009 3572a 3767*2^511948-1 154116 L860 2009 3573 875*2^511928-1 154109 L548 2008 3574 692835*2^511792-1 154071 L138 2005 3575 507*2^511794-1 154069 L548 2008 3576c 7791*2^511770-1 154063 L862 2009 3577 78795*2^511766-1 154062 L251 2009 3578 1995*2^511752-1 154057 L701 2009 3579 66825*2^511745-1 154056 L251 2009 3580 1917*2^511741-1 154053 L548 2009 3581 41*2^511718-1 154045 L290 2007 3582a 3945*2^511691-1 154038 L860 2009 3583 1493*2^511680-1 154035 L701 2009 3584 1629*2^511617-1 154016 L548 2009 3585 1371*2^511587-1 154007 L121 2009 3586 121125181*2^511347-1 153939 p92 2005 3587 117*2^511361-1 153938 L171 2007 3588 453*2^511288+1 153916 L153 2008 3589 13131*2^511111-1 153864 L123 2005 3590 5865*2^511085-1 153856 L268 2009 3591 1307*2^511011+1 153833 L409 2007 3592 197*2^510940-1 153811 L167 2007 3593a 3567*2^510921-1 153807 L860 2009 3594 1429*2^510882+1 153794 p161 2008 3595a 3561*2^510823-1 153777 L860 2009 3596 357*2^510812-1 153773 g276 2006 3597 1779*2^510784-1 153765 L698 2009 3598e 6227*2^510762-1 153759 L268 2009 3599a 3445*2^510727-1 153748 L860 2009 3600a 3935*2^510634-1 153720 L860 2009 3601 39*2^510595+1 153707 g267 2005 3602c 7935*2^510576-1 153703 L862 2009 3603 243*2^510491-1 153676 L442 2007 3604 67#*2^510386+1 153667 L466 2009 3605 1835*2^510400-1 153649 L701 2009 3606 53625*2^510237-1 153602 L251 2009 3607 1191*2^510146-1 153573 L121 2009 3608c 7525*2^510129-1 153569 L862 2009 3609 64059*2^510101+1 153561 gt 2001 3610 1121*2^510085+1 153554 p161 2008 3611 1333*2^510067-1 153549 L121 2009 3612 487*2^509982+1 153523 L153 2008 3613 527*2^509836-1 153479 L543 2008 3614 147*2^509831+1 153477 p189 2007 3615 165*2^509812+1 153471 L679 2009 3616d 7809*2^509801-1 153470 L893 2009 3617 423*2^509720+1 153444 L203 2008 3618 1499*2^509708-1 153441 L698 2009 3619 92235*2^509665-1 153430 L251 2009 3620d 7923*2^509550-1 153394 L864 2009 3621c 7465*2^509547-1 153393 L862 2009 3622c 7883*2^509432-1 153359 L862 2009 3623 289*2^509401-1 153348 L6 2005 3624 573*2^509312-1 153321 L548 2008 3625 651*2^509299+1 153318 p161 2008 3626d 36375*2^509264+1 153309 p77 2009 3627d 7157*2^509262-1 153307 L862 2009 3628 639*2^509058+1 153245 L153 2008 3629 1595*2^509046-1 153242 L698 2009 3630 5655*2^508993-1 153226 L268 2008 3631c 7435*2^508957-1 153216 L862 2009 3632 19911001*2^508852+1 153188 g369 2005 3633f 3001*2^508783-1 153163 L615 2009 3634e 6253*2^508663-1 153127 L268 2009 3635c 7937*2^508398-1 153047 L862 2009 3636d 7579*2^508389-1 153045 L862 2009 3637 1127*2^508314-1 153021 L503 2009 3638 853*2^508240+1 152999 p161 2008 3639f 11347*2^508209-1 152991 L257 2009 3640 97305*2^508188-1 152985 L251 2009 3641 1221*2^508190-1 152984 L121 2009 3642 8295*2^508161-1 152976 L268 2009 3643 659*2^508117+1 152962 p161 2008 3644 1431*2^508097-1 152956 L548 2009 3645 313*2^508091-1 152954 L79 2007 3646 2699*2^507972-1 152919 L251 2008 3647 (2^253987-1)^2-2 152916 p89 2007 3648b 3741*2^507929-1 152906 L862 2009 3649 5955*2^507890-1 152894 L268 2008 3650 1431*2^507867+1 152887 p161 2008 3651 207*2^507833-1 152876 L330 2007 3652 179*2^507816-1 152871 L145 2006 3653 829*2^507641-1 152819 L548 2008 3654 5481*2^507634-1 152817 L251 2009 3655 125*2^507637+1 152817 p189 2007 3656 2*191^66971+1 152764 g404 2006 Divides Phi(191^66971,2) 3657d 7857*2^507424-1 152754 L862 2009 3658a 2913*2^507380-1 152741 L548 2009 3659 1385*2^507368-1 152737 L121 2009 3660 253*2^507316+1 152720 p227 2008 3661c 7645*2^507259-1 152705 L862 2009 3662c 7585*2^507257-1 152704 L862 2009 3663 1563*2^507144-1 152669 L555 2009 3664 43541*2^507098-1 152657 g23 2000 3665a 6349*2^507095-1 152655 L862 2009 3666 1623*2^507088-1 152652 L548 2009 3667a 2725*2^507085-1 152652 L548 2009 3668d 7125*2^507041-1 152639 L862 2009 3669a 2163*2^506996-1 152625 L548 2009 3670 74528*5^218272-1 152571 p188 2006 3671 497*2^506812-1 152569 L548 2008 3672e 11655*2^506784-1 152562 L268 2009 3673 39547695*2^506636-1 152521 L277 2008 3674b 3773*2^506618-1 152511 L862 2009 3675d 7329*2^506561-1 152494 L893 2009 3676c 7219*2^506473-1 152468 L862 2009 3677b 3921*2^506471-1 152467 L862 2009 3678 1635*2^506471-1 152467 L701 2009 3679 56271*2^506439+1 152459 p243 2009 Generalized Cullen 3680d 7857*2^506408-1 152448 L862 2009 3681 417*2^506332+1 152424 L203 2007 3682 1131*2^506286-1 152411 L503 2009 3683a 2901*2^506226-1 152393 L910 2009 3684f 17295*2^506161-1 152374 L860 2009 3685 1085*2^506117+1 152360 p161 2008 3686 519*2^506051-1 152340 L576 2008 3687 1815*2^505975-1 152317 L251 2009 3688d 7021*2^505839-1 152277 L864 2009 3689 1505*2^505720-1 152241 L548 2009 3690 395*2^505679+1 152228 p227 2008 3691 1905*2^505618-1 152210 L698 2009 3692b 3933*2^505572-1 152196 L860 2009 3693 1263*2^505568+1 152195 p161 2008 3694 1447*2^505453-1 152160 L698 2009 3695 1995*2^505437-1 152155 L566 2009 3696 827*2^505402-1 152145 L576 2008 3697 741*2^505381-1 152138 L565 2008 3698b 3805*2^505317-1 152120 L862 2009 3699 1441*2^505295-1 152113 L548 2009 3700c 7871*2^505282-1 152109 L862 2009 3701 955*2^505151-1 152069 L565 2008 3702 19725*2^505100+1 152055 L541 2008 3703 507*2^505096-1 152052 L565 2008 3704 1224255*2^505050-1 152042 L434 2007 3705 1208955*2^505050-1 152042 L434 2007 3706 817263*2^505050-1 152042 L434 2007 3707 247005*2^505050-1 152041 L434 2007 3708 225507*2^505050-1 152041 L434 2007 3709c 7931*2^505026-1 152032 L862 2009 3710 477945*2^505001+1 152027 g258 2008 3711a 2397*2^504998-1 152023 L701 2009 3712 395*2^505000-1 152023 L56 2005 3713 2607*2^504959+1 152012 g61 2004 3714 600921*2^504799+1 151966 g337 2004 3715b 3709*2^504777-1 151957 L862 2009 3716 611*2^504751+1 151948 L153 2008 3717 469*2^504610+1 151906 L153 2008 3718 3389*2^504584-1 151899 L251 2008 3719 1689*2^504505-1 151875 L548 2009 3720 1153*2^504495-1 151872 L503 2009 3721a 2427*2^504489-1 151870 L548 2009 3722 1069*2^504441-1 151855 L503 2008 3723a 6377*2^504424-1 151851 L860 2009 3724 899*2^504372-1 151835 L548 2008 3725 999*2^504311-1 151816 L543 2008 3726 611*2^504137+1 151764 L153 2008 3727b 3501*2^504127-1 151761 L862 2009 3728 507*2^504116+1 151757 L153 2008 3729 597*2^504106-1 151754 L548 2008 3730 863*2^504085+1 151748 p161 2008 3731b 275175*2^504031-1 151734 L113 2009 3732d 31407*2^504016-1 151729 L113 2009 3733b 409119*2^504005-1 151727 L113 2009 3734a 6769*2^503903-1 151694 L860 2009 3735a 6933*2^503899-1 151693 L860 2009 3736 2177*2^503892-1 151690 L268 2008 3737 923*2^503892-1 151690 L548 2008 3738 9*2^503893-1 151688 L38 2004 3739a 2043*2^503778-1 151656 L910 2009 3740e 6245*2^503732-1 151643 L268 2009 3741 1047*2^503708-1 151635 L503 2008 3742 829*2^503691-1 151630 L585 2008 3743 1125*2^503666-1 151622 L503 2009 3744 69*2^503641+1 151613 p114 2002 3745 1503*2^503589+1 151599 p161 2008 3746a 6447*2^503553-1 151589 L860 2009 3747 1465*2^503551-1 151588 L268 2009 3748 411*2^503501-1 151572 L548 2008 3749 37850187375*2^503473-1 151572 L257 2008 3750 44312*5^216837+1 151568 p215 2007 3751 89*2^503479+1 151565 p189 2006 3752a 6939*2^503407-1 151545 L860 2009 3753 102765*2^503386-1 151540 L644 2009 3754a 6111*2^503302-1 151513 L860 2009 3755a 6893*2^503254-1 151499 L860 2009 3756 2547*2^503218-1 151488 L323 2009 3757a 6799*2^503155-1 151469 L860 2009 3758f 1665*2^502987+1 151418 L834 2009 3759a 2077*2^502977-1 151415 L548 2009 3760 2377*28^104621+1 151407 p253 2009 3761a 6425*2^502936-1 151403 L860 2009 3762 1503*2^502848-1 151376 L701 2009 3763a 2465*2^502832-1 151371 L548 2009 3764 964387*2^502793-1 151362 g396 2005 3765 4401*2^502789+1 151359 L834 2009 3766d 7413*2^502786-1 151358 L862 2009 3767 6797*2^502783+1 151357 L834 2009 3768a 6543*2^502748-1 151347 L860 2009 3769f 4935*2^502717+1 151337 L834 2009 3770 175*2^502646+1 151314 p189 2007 3771f 4965*2^502617+1 151307 L834 2009 3772f 9015*2^502610+1 151305 L834 2009 3773f 9343*2^502576+1 151295 L834 2009 3774f 6557*2^502507+1 151274 L834 2009 3775 745*2^502499-1 151271 L548 2008 3776f 4619*2^502495+1 151270 L834 2009 3777 1009*2^502463-1 151260 L268 2008 3778f 7665*2^502400+1 151242 L834 2009 3779a 6699*2^502385-1 151237 L860 2009 3780f 2415*2^502357+1 151228 L834 2009 3781f 3707*2^502343+1 151224 L834 2009 3782f 8491*2^502336+1 151223 L834 2009 3783f 8283*2^502329+1 151221 L834 2009 3784a 6429*2^502323-1 151219 L860 2009 3785f 9333*2^502313+1 151216 L834 2009 3786f 5379*2^502271+1 151203 L834 2009 3787c 7053*2^502268-1 151202 L862 2009 3788f 1587*2^502255+1 151198 L834 2009 3789b 3639*2^502247-1 151195 L862 2009 3790e 22785*2^502225-1 151190 L257 2009 3791a 2657*2^502190-1 151178 L548 2009 3792f 2669*2^502187+1 151177 L834 2009 3793 833*2^502165+1 151170 g267 2008 3794a 6841*2^502093-1 151149 L860 2009 3795f 6461*2^502087+1 151148 L834 2009 3796b 3921*2^502039-1 151133 L860 2009 3797f 5739*2^502030+1 151130 L834 2009 3798f 3985*2^502012+1 151125 L834 2009 3799b 2487*2^501991+1 151118 L635 2009 3800 289*2^501991-1 151117 L6 2005 3801 1005*2^501968+1 151111 p227 2008 3802c 7083*2^501950-1 151106 L862 2009 3803 1347*2^501937-1 151102 L121 2009 3804b 2839*2^501926+1 151099 L635 2009 3805a 6351*2^501894-1 151089 L860 2009 3806a 6717*2^501888-1 151088 L860 2009 3807c 2097*2^501836+1 151072 L635 2009 3808c 8709*2^501821+1 151068 L635 2009 3809c 4767*2^501792+1 151059 L635 2009 3810 883*2^501779-1 151054 g219 2007 3811 295*2^501770+1 151051 p161 2008 3812c 7527*2^501759+1 151049 L635 2009 3813d 7597*2^501740+1 151043 L684 2009 3814d 7433*2^501725+1 151039 L635 2009 3815 519*2^501728-1 151038 L548 2008 3816 9441*2^501654-1 151017 L121 2009 3817b 2495*2^501636-1 151011 L548 2009 3818f 3589*2^501586+1 150996 L707 2009 3819a 6063*2^501524-1 150978 L860 2009 3820 451*2^501525-1 150977 L548 2008 3821 9915*2^501404+1 150942 L635 2009 3822 1551*2^501404+1 150941 L669 2009 3823 7329*2^501391+1 150938 L805 2009 3824b 3405*2^501382-1 150935 L862 2009 3825 5409*2^501343+1 150924 L693 2009 3826 9521*2^501253+1 150897 L693 2009 3827 37785*2^501239-1 150893 L251 2009 3828 99999999321741*2^501205+1 150892 L430 2007 3829 9071*2^501235+1 150891 L693 2009 3830 49*2^501238+1 150890 g402 2006 Generalized Fermat 3831 9367*2^501200+1 150881 L635 2009 3832 1357*2^501165-1 150869 L121 2009 3833 1993*2^501120+1 150856 L829 2009 3834 177*2^501106+1 150851 g226 2005 3835 4217*2^501099+1 150850 L669 2009 3836 3689*2^501089+1 150847 L805 2009 3837 749*2^501083+1 150844 p161 2008 3838d 7563*2^501054-1 150837 L864 2009 3839 8965*2^501030+1 150830 L635 2009 3840b 3573*2^501019-1 150826 L862 2009 3841 1995*2^500936+1 150801 p219 2009 3842 5729*2^500925+1 150798 L635 2009 3843 1287*2^500908-1 150792 L121 2009 3844 2459*2^500905+1 150791 p219 2009 3845 1497*2^500894-1 150788 L698 2009 3846 3559*2^500850+1 150775 p219 2009 3847a 6093*2^500780-1 150754 L860 2009 3848 4487*2^500775+1 150752 p219 2009 3849c 7007*2^500734-1 150740 L862 2009 3850 9105*2^500713-1 150734 L251 2009 3851 635*2^500689+1 150726 L153 2008 3852 9505*2^500668+1 150721 L635 2009 3853 3107*2^500623+1 150707 p219 2009 3854 1581823815*2^500591-1 150703 L83 2005 3855 1193*2^500589+1 150696 p161 2008 3856 604189*2^500578+1 150695 g118 2004 3857 3975*2^500545+1 150683 p219 2009 3858b 2967*2^500530-1 150679 L701 2009 3859 2325*2^500521+1 150676 p219 2009 3860 8231*2^500495+1 150668 L669 2009 3861 2949*2^500481-1 150664 L698 2009 3862 1431*2^500443-1 150652 L698 2009 3863 4833*2^500436+1 150650 L690 2009 3864 545*2^500398-1 150638 L548 2008 3865 4437*2^500348+1 150624 L635 2009 3866c 7461*2^500338-1 150621 L862 2009 3867a 6645*2^500338-1 150621 L860 2009 3868 1095*2^500331+1 150618 p161 2008 3869 3709*2^500318+1 150615 p219 2009 3870 2305*2^500310+1 150612 p219 2009 3871 7949*2^500303+1 150611 L635 2009 3872 5475*2^500263+1 150598 L635 2009 3873a 6423*2^500228-1 150588 L860 2009 3874e 23805*2^500218-1 150585 L268 2009 3875b 3597*2^500166-1 150569 L860 2009 3876 2823*2^500090+1 150546 p219 2009 3877 6109*2^500082+1 150544 L805 2009 3878 4425*2^500070+1 150540 L690 2009 3879e 5585*2^500064-1 150539 L614 2009 3880 9281*2^500053+1 150535 L669 2009 3881 9615*2^500034-1 150530 L644 2009 3882 211395*2^500025-1 150528 L402 2007 3883 4468523*2^500000-1 150522 L81 2006 3884 3868043*2^500000-1 150522 L81 2006 3885 3809145*2^500000-1 150522 L81 2006 3886 3404927*2^500000-1 150522 L81 2006 3887 2500725*2^500000-1 150522 L81 2006 3888 1972625*2^500000-1 150522 L81 2006 3889 1627497*2^500000-1 150522 L81 2006 3890 1035779*2^500000-1 150522 L81 2006 3891 995547*2^500000-1 150521 L81 2006 3892 367899*2^500000-1 150521 L81 2006 3893 14933*2^500001+1 150520 g305 2004 3894 9507*2^499952+1 150505 L834 2009 3895 2089*2^499951-1 150504 L261 2007 3896 135*2^499948+1 150502 g354 2005 3897 8577*2^499939+1 150501 L834 2009 3898 7987*2^499910+1 150492 L834 2009 3899 5787*2^499908+1 150492 L834 2009 3900 8611*2^499820+1 150465 L834 2009 3901 7347*2^499794+1 150457 L834 2009 3902 6283*2^499750+1 150444 L834 2009 3903c 7217*2^499732-1 150439 L862 2009 3904c 7547*2^499688-1 150425 L862 2009 3905 9885*2^499676+1 150422 L834 2009 3906 429*2^499671-1 150419 L617 2008 3907 439*2^499662+1 150416 L153 2007 3908 3627*2^499636+1 150409 L834 2009 3909 399*2^499635+1 150408 L153 2008 3910 5727*2^499624+1 150406 L834 2009 3911 1975*2^499588+1 150395 L834 2009 3912 405405*2^499569-1 150391 L466 2008 3913 4407*2^499567+1 150389 L834 2009 3914b 2373*2^499548-1 150383 L548 2009 3915 1365*2^499547+1 150382 L834 2009 3916 5775*2^499522+1 150375 p189 2007 3917 8855*2^499501+1 150369 L834 2009 3918e 6293*2^499454-1 150355 L268 2009 3919 5095*2^499448+1 150353 L834 2009 3920 6069*2^499445+1 150352 L834 2009 3921 407*2^499431+1 150347 L203 2007 3922 5849*2^499425+1 150346 L834 2009 3923b 2753*2^499386-1 150334 L910 2009 3924 73*2^499391-1 150334 L145 2006 3925 9933*2^499349+1 150324 L834 2009 3926 1887*2^499338-1 150319 L555 2009 3927 4719*2^499314+1 150313 L834 2009 3928b 6591*2^499287-1 150305 L862 2009 3929 2613*2^499280+1 150302 L834 2009 3930 6693*2^499265+1 150298 L834 2009 3931 5097*2^499260+1 150296 L834 2009 3932 3705*2^499255+1 150295 L834 2009 3933 61*2^499175-1 150269 L290 2007 3934 2995125705*2^499082-1 150249 L72 2005 3935 2097*2^499086+1 150244 L834 2009 3936c 7317*2^499041-1 150231 L862 2009 3937 9007*2^499038+1 150230 L834 2009 3938b 3499*2^499039-1 150230 L860 2009 3939d 7503*2^499023-1 150225 L862 2009 3940 9735*2^499021-1 150225 L644 2009 3941b 6957*2^498989-1 150215 L862 2009 3942d 6159*2^498971-1 150210 L268 2009 3943 231*2^498961-1 150205 L87 2005 3944 3*346369#+1 150198 p16 2002 3945e 6237*2^498832-1 150168 L268 2009 3946b 2781*2^498778-1 150151 L701 2009 3947b 3531*2^498715-1 150132 L862 2009 3948e 16485*2^498650-1 150113 L323 2009 3949b 6755*2^498634-1 150108 L862 2009 3950 1885*2^498607-1 150099 L769 2009 3951 471*2^498476+1 150059 L153 2007 3952b 2253*2^498443-1 150050 L910 2009 3953c 7685*2^498436-1 150049 L862 2009 3954b 6973*2^498403-1 150039 L860 2009 3955 19580625*2^498383-1 150036 L71 2007 3956 429*2^498391+1 150034 L153 2007 3957 871*2^498385-1 150032 L548 2008 3958 2*431^56947+1 150026 g404 2007 Divides Phi(431^56947,2) 3959b 6893*2^498328-1 150016 L862 2009 3960 10^150008+4798974*10^75001+1 150009 D 2006 Palindrome 3961 763094475*2^498281-1 150007 L545 2008 3962 10^150006+7426247*10^75000+1 150007 p5 2005 Palindrome 3963 315*2^498239+1 149988 L635 2008 3964b 2769*2^498209-1 149980 L910 2009 3965 1393*2^498147-1 149961 L121 2009 3966 63405*2^498116+1 149953 L541 2008 3967b 2757*2^498102-1 149948 L548 2009 3968 144643*2^498079-1 149942 g173 2000 3969 1059*2^498005+1 149918 L675 2009 3970f 5221*2^497996+1 149916 L834 2009 3971b 3945*2^497940-1 149899 L860 2009 3972f 1413*2^497929+1 149895 L834 2009 3973b 2495*2^497928-1 149895 L548 2009 3974 187*2^497926+1 149893 L693 2009 3975 803*2^497908-1 149889 L548 2008 3976b 2439*2^497903-1 149888 L548 2009 3977 (2^248949-1)^2-2 149883 p191 2006 3978f 8747*2^497863+1 149876 L834 2009 3979 1403*2^497854-1 149873 L698 2009 3980 939*2^497824-1 149863 L548 2008 3981f 6779*2^497789+1 149854 L834 2009 3982f 6903*2^497782+1 149852 L834 2009 3983f 2475*2^497777+1 149850 L834 2009 3984 2*1931^45605+1 149849 g404 2007 Divides Phi(1931^45605,2) 3985f 2965*2^497764+1 149846 L834 2009 3986 1595*2^497756-1 149843 L701 2009 3987 1131*2^497745+1 149840 L672 2009 3988 241*2^497679-1 149819 L145 2006 3989f 1461*2^497676+1 149819 L834 2009 3990d 7307*2^497666-1 149817 L862 2009 3991f 5941*2^497656+1 149814 L834 2009 3992b 3751*2^497655-1 149813 L862 2009 3993 1161*2^497617+1 149801 L656 2009 3994 465869*2^497596-1 149797 g302 2003 3995 4275*2^497555-1 149783 L268 2008 3996f 7359*2^497547+1 149781 L834 2009 3997f 5043*2^497546+1 149780 L834 2009 3998b 6893*2^497530-1 149776 L862 2009 3999a 143727375*2^497503-1 149772 L466 2009 4000f 26013585*2^497505-1 149772 L466 2009 4001 46664997*2^497504-1 149772 L466 2009 4002 76567779*2^497503-1 149772 L466 2009 4003 37220487*2^497504-1 149772 L466 2009 4004 4302201*2^497507-1 149772 L466 2009 4005 56712411*2^497503-1 149772 L466 2008 4006 8422839*2^497505-1 149771 L466 2008 4007d 7111*2^497485-1 149762 L862 2009 4008d 7189*2^497439-1 149748 L862 2009 4009b 2429*2^497368-1 149727 L548 2009 4010f 2451*2^497292+1 149704 L834 2009 4011d 7221*2^497279-1 149700 L862 2009 4012f 6169*2^497278+1 149700 L834 2009 4013 124679*2^497244-1 149691 L284 2008 4014f 6419*2^497231+1 149686 L834 2009 4015 747*2^497206+1 149677 L691 2009 4016 469*2^497206+1 149677 L203 2007 4017f 1981*2^497168+1 149666 L834 2009 4018b 6683*2^497154-1 149663 L862 2009 4019 631*2^497092+1 149643 L656 2009 4020 815*2^497063+1 149634 L689 2009 4021b 6807*2^497045-1 149630 L862 2009 4022 189*2^496835-1 149565 L91 2005 4023 9975*2^496816-1 149561 L644 2009 4024b 6733*2^496795-1 149555 L862 2009 4025 3615*2^496718-1 149531 L171 2009 4026b 2291*2^496710-1 149528 L701 2009 4027 953*2^496693+1 149523 L692 2009 4028 2029*2^496685-1 149521 L614 2008 4029 1251*2^496646-1 149509 L503 2009 4030 3345*2^496616-1 149500 L323 2009 4031c 3727*2^496601-1 149496 L860 2009 4032 155*2^496604-1 149495 L163 2006 4033 495*2^496551+1 149480 L153 2008 4034d 7803*2^496480-1 149460 L862 2009 4035 641*2^496430-1 149444 L548 2008 4036 23*2^496422-1 149440 L40 2004 4037 1143*2^496336-1 149416 L503 2009 4038c 3771*2^496225-1 149383 L862 2009 4039 1171*2^496188+1 149371 L672 2009 4040b 2859*2^496176-1 149368 L548 2009 4041c 3897*2^496170-1 149366 L862 2009 4042 399*2^496100-1 149344 g276 2008 4043d 56627*2^496028-1 149325 L806 2009 4044b 2867*2^495986-1 149311 L701 2009 4045c 3743*2^495958-1 149302 L862 2009 4046b 2393*2^495952-1 149300 L701 2009 4047b 2319*2^495880-1 149279 L548 2009 4048c 3481*2^495859-1 149272 L860 2009 4049 895823*2^495837+1 149268 g335 2002 4050 511*2^495800+1 149254 g136 2006 4051 5955*2^495794-1 149253 L268 2008 4052 1875*2^495775-1 149247 L536 2009 4053 243*2^495732+1 149233 L165 2007 Divides Fermat F(495728), GF(495726,3), GF(495728,6), GF(495727,12) 4054 Phi(3,-35822^16384) 149231 f2 2005 Generalized unique 4055 2955*2^495709-1 149227 L268 2009 4056b 2475*2^495698-1 149224 L620 2009 4057d 56627*2^495648-1 149210 L806 2009 4058d 7707*2^495624-1 149202 L862 2009 4059d 7519*2^495589-1 149192 L862 2009 4060 903*2^495560+1 149182 L689 2009 4061c 3403*2^495511-1 149168 L864 2009 4062 6705*2^495407-1 149137 L323 2009 4063 1779*2^495289-1 149101 L698 2009 4064b 2167*2^495281-1 149098 L548 2009 4065 717*2^495026+1 149021 L668 2009 4066 1593*2^494915-1 148988 L701 2009 4067 107*2^494896-1 148981 L138 2006 4068f 11729*2^494856-1 148971 L257 2009 4069e 6257*2^494850-1 148969 L268 2009 4070b 2627*2^494830-1 148963 L701 2009 4071b 6443*2^494800-1 148954 L862 2009 4072 5655*2^494763-1 148943 L268 2008 4073 1175*2^494662-1 148912 L503 2009 4074 35*2^494607+1 148894 g220 2005 4075 187*2^494602+1 148893 L656 2009 4076 123643*2^494568+1 148885 p243 2009 4077 8475*2^494479-1 148857 L644 2009 4078 583*2^494466+1 148852 g233 2007 4079b 2009*2^494352-1 148819 L701 2009 4080 121*2^494317-1 148807 L66 2004 4081c 3893*2^494308-1 148806 L860 2009 4082 81778*66^81778+1 148804 g157 2007 Generalized Cullen 4083c 3577*2^494277-1 148796 L862 2009 4084b 2365*2^494275-1 148795 L548 2009 4085 4*3^311835-1 148784 p228 2008 4086 22932195*2^494150-1 148762 L138 2006 4087c 3495*2^494116-1 148748 L860 2009 4088 521*2^494105+1 148744 g136 2006 4089f 555555*2^494045-1 148729 L862 2009 4090 927*2^494005-1 148714 L565 2008 4091b 6891*2^493959-1 148701 L862 2009 4092 1311*2^493918-1 148688 L503 2009 4093 49335*2^493906-1 148686 L251 2009 4094 11390625*2^493855-1 148673 L614 2009 4095c 3759*2^493805-1 148654 L860 2009 4096 235*2^493738+1 148633 L153 2007 4097 297*2^493726-1 148629 L195 2007 4098b 2583*2^493666-1 148612 L701 2009 4099d 7269*2^493576-1 148586 L862 2009 4100b 6937*2^493489-1 148559 L862 2009 4101 9999*2^493445-1 148546 L268 2009 4102c 3489*2^493411-1 148536 L860 2009 4103 1855*2^493389-1 148529 L701 2009 4104 138724*5^212488+1 148528 p215 2007 4105d 7773*2^493370-1 148524 L862 2009 4106 39547695*2^493338-1 148518 L277 2008 4107 889*2^493346+1 148515 L673 2009 4108e 27615*2^493324-1 148510 L268 2009 4109d 6571*2^493251-1 148488 L862 2009 4110 1695*2^493238+1 148483 g336 2005 4111 983*2^493212-1 148475 L565 2008 4112d 6845*2^493120-1 148448 L862 2009 4113d 6095*2^493106-1 148444 L268 2009 4114 955*2^493082+1 148436 L689 2009 4115d 7831*2^493039-1 148424 L862 2009 4116b 1004*87^76524-1 148423 p261 2009 4117b 2531*2^493038-1 148423 L701 2009 4118 261*2^492999+1 148410 g361 2006 4119 37995*2^492984-1 148408 L251 2009 4120d 7283*2^492982-1 148407 L862 2009 4121 1931*2^492970-1 148403 L698 2009 4122 1611*2^492905-1 148383 L698 2009 4123 1895*2^492900-1 148381 L620 2009 4124d 7863*2^492859-1 148370 L862 2009 4125d 6695*2^492828-1 148360 L862 2009 4126 2029*2^492765-1 148341 L614 2008 4127d 7793*2^492702-1 148322 L862 2009 4128d 3523*2^492687-1 148318 L862 2009 4129 1039*2^492675-1 148313 L503 2008 4130b 2515*2^492565-1 148281 L701 2009 4131d 7017*2^492457-1 148249 L862 2009 4132 297*2^492450-1 148245 L195 2007 4133 609*2^492403-1 148231 L565 2008 4134 2397*2^492334-1 148211 L251 2009 4135b 2787*2^492322-1 148208 L701 2009 4136 1791*2^492279-1 148194 L251 2008 4137 1425*2^492263-1 148190 L701 2009 4138d 7149*2^492220-1 148177 L862 2009 4139 1681*2^492221-1 148177 L555 2009 4140 63405*2^492140+1 148154 L587 2008 4141d 3503*2^492142-1 148154 L862 2009 4142 797*2^492100-1 148140 L565 2008 4143 1113*2^492080+1 148134 L673 2009 4144 1771*2^492075-1 148133 L698 2009 4145 427*2^492076+1 148133 L153 2007 4146 9967*2^492050+1 148126 L635 2009 4147 1559*2^491984-1 148106 L257 2008 4148 563*2^491980-1 148104 L565 2008 4149 36957*2^491967+1 148102 g256 2002 4150f 14895*2^491956-1 148098 L257 2009 4151e 6259*2^491869-1 148072 L268 2009 4152b 103444*3^310332-1 148072 p260 2009 Generalized Woodall 4153b 2127*2^491860-1 148068 L548 2009 4154d 7201*2^491771-1 148042 L862 2009 4155 8295*2^491744-1 148034 L323 2009 4156 1371*2^491730-1 148029 L503 2009 4157 751*2^491695-1 148018 L565 2008 4158 292648*5^211729-1 147998 p225 2007 4159b 2585*2^491518-1 147966 L701 2009 4160 181*2^491487-1 147955 L171 2006 4161 333*2^491436-1 147940 L79 2007 4162d 3423*2^491415-1 147935 L862 2009 4163d 7203*2^491251-1 147886 L862 2009 4164c 6035*2^491198-1 147870 L268 2009 4165 1393*2^491175-1 147862 L503 2009 4166 225*2^491135-1 147849 L91 2005 4167 3803443215*2^491104-1 147847 L167 2006 4168 1623*2^491038-1 147821 L555 2009 4169d 3591*2^491002-1 147810 L862 2009 4170d 7115*2^490968-1 147800 L862 2009 4171c 6129*2^490964-1 147799 L268 2009 4172d 7429*2^490959-1 147798 L862 2009 4173 402335175*2^490928-1 147793 L146 2006 4174 831*2^490927-1 147787 L565 2008 4175b 2633*2^490874-1 147772 L548 2009 4176 277*2^490805-1 147750 L145 2006 4177 179*2^490800-1 147748 L138 2006 4178 157*2^490772+1 147740 p122 2005 4179 789*2^490711-1 147722 L565 2008 4180 31838235*2^490669+1 147714 p190 2009 4181 1023*2^490681+1 147713 L656 2009 4182b 2689*2^490669-1 147710 L910 2009 4183 51*2^490673+1 147709 p114 2004 4184 5077*2^490629-1 147698 L251 2007 4185d 6169*2^490581-1 147684 L862 2009 4186 597*2^490528+1 147667 g387 2006 4187e 6279*2^490511-1 147663 L268 2009 4188 177*2^490500+1 147658 g226 2005 4189b 2613*2^490338-1 147610 L701 2009 4190d 6827*2^490284-1 147595 L862 2009 4191b 2615*2^490218-1 147574 L701 2009 4192 1853*2^490210-1 147572 L566 2009 4193 1973*2^490134-1 147549 L566 2009 4194d 6997*2^490121-1 147545 L862 2009 4195d 7137*2^490118-1 147545 L862 2009 4196 1669*2^490105-1 147540 L701 2009 4197b 2749*2^489977-1 147502 L548 2009 4198 2029*2^489935-1 147489 L614 2008 4199b 2343*2^489900-1 147478 L701 2009 4200 1789*2^489891-1 147476 L698 2009 4201d 7111*2^489885-1 147474 L862 2009 4202 2595*2^489851-1 147464 L261 2008 4203 885*2^489785-1 147443 L565 2008 4204b 2681*2^489782-1 147443 L548 2009 4205 1113*2^489731-1 147427 L503 2009 4206 20030919*2^489643+1 147405 g344 2004 4207 2115*2^489611+1 147391 g380 2008 4208 581*2^489603+1 147388 g233 2007 4209 967*2^489572+1 147379 L687 2009 4210 1035*2^489512+1 147361 L635 2009 4211b 1777*2^489452+1 147343 p240 2009 4212b 2885*2^489376-1 147321 L701 2009 4213 9285*2^489367-1 147319 L644 2009 4214e 3423*2^489336-1 147309 L893 2009 4215 2685*2^489306-1 147300 L121 2009 4216 1185*2^489226+1 147275 L685 2009 4217 1125*2^489225-1 147275 L503 2009 4218 2775*2^489194-1 147266 L121 2009 4219 9765*2^489156-1 147255 L644 2009 4220f 555555*2^489137-1 147251 L862 2009 4221f 12045*2^489088-1 147235 L268 2009 4222d 7825*2^489045-1 147222 L862 2009 4223b 2975*2^488998-1 147207 L910 2009 4224b 1781*2^488939+1 147189 p240 2009 4225c 1595*2^488867+1 147167 p240 2009 4226b 2331*2^488834-1 147158 L548 2009 4227 1085*2^488767+1 147137 L678 2009 4228c 1971*2^488723+1 147124 p241 2009 4229 99*2^488698+1 147115 p114 2005 4230e 6273*2^488666-1 147107 L268 2009 4231 1163*2^488618-1 147092 L503 2009 4232 815*2^488502-1 147057 L565 2008 4233e 1657*2^488340+1 147009 L669 2009 4234e 3489*2^488265-1 146986 L862 2009 4235b 2625*2^488208-1 146969 L548 2009 4236d 6035*2^488038-1 146918 L268 2009 4237 101*2^488039+1 146917 g233 2005 4238d 7311*2^488011-1 146910 L862 2009 4239 165*2^487961-1 146894 L32 2005 4240 243*2^487938+1 146887 p114 2004 4241b 2485*2^487899-1 146876 L548 2009 4242 1901*2^487865+1 146866 p241 2009 4243d 6079*2^487829-1 146855 L268 2009 4244 1529*2^487800-1 146846 L257 2008 4245 869*2^487791+1 146843 p114 2005 4246 725*2^487759+1 146833 p114 2005 4247b 2391*2^487665-1 146806 L548 2009 4248b 2251*2^487617-1 146791 L910 2009 4249 189*2^487601-1 146785 L91 2005 4250b 2439*2^487556-1 146773 L910 2009 4251 869688105*2^487488-1 146758 L139 2006 4252 6585*2^487502-1 146757 L268 2008 4253 999*2^487426+1 146733 p114 2005 4254c 2657*2^487110-1 146639 L548 2009 4255 1095*2^487053-1 146621 L503 2008 4256e 6237*2^486982-1 146600 L268 2009 4257 775*2^486913-1 146579 L565 2008 4258 1507*2^486901-1 146575 L620 2009 4259c 2765*2^486800-1 146545 L548 2009 4260 973*2^486740+1 146527 L635 2009 4261 1323*2^486656-1 146502 L503 2009 4262d 7377*2^486625-1 146493 L862 2009 4263 809*2^486521+1 146461 L668 2009 4264 1167*2^486504-1 146456 L503 2009 4265 1581823815*2^486425-1 146438 L83 2005 4266e 1927*2^486426+1 146433 p240 2009 4267d 6031*2^486419-1 146431 L268 2009 4268e 12045*2^486357-1 146413 L323 2009 4269 1385*2^486346-1 146408 L503 2009 4270 323*2^486322-1 146401 g320 2007 4271 1869*2^486293-1 146393 L566 2009 4272d 1535*2^486293+1 146392 p240 2009 4273c 2629*2^486137-1 146346 L548 2009 4274 8055*2^486016-1 146310 L251 2009 4275a 9015*2^485962+1 146294 L834 2009 4276d 7077*2^485953-1 146291 L862 2009 4277 22932195*2^485935-1 146289 L138 2006 4278a 3615*2^485916+1 146279 L834 2009 4279b 5377*2^485874+1 146267 L834 2009 4280 13236795*2^485854-1 146264 L695 2009 4281b 1781*2^485837+1 146255 p240 2009 4282a 4891*2^485820+1 146251 L834 2009 4283b 3273*2^485801+1 146245 L834 2009 4284 759375*2^485773-1 146239 L284 2008 4285a 8211*2^485740+1 146227 L834 2009 4286 9675*2^485702-1 146215 L644 2009 4287a 3775*2^485702+1 146215 L834 2009 4288 255255*2^485660+1 146204 L94 2005 4289c 1551*2^485611+1 146187 L669 2009 4290 1881*2^485590-1 146181 L701 2009 4291 1605*2^485583-1 146179 L251 2008 4292b 4221*2^485576+1 146177 L834 2009 4293f 32713*2^485539-1 146167 L257 2009 4294 583*2^485520+1 146159 g233 2007 4295a 4899*2^485506+1 146156 L834 2009 4296 275*2^485505+1 146155 L153 2007 4297 1041*2^485490-1 146151 L503 2008 4298b 4551*2^485465+1 146144 L834 2009 4299 375*2^485466+1 146143 g380 2006 4300c 2273*2^485460-1 146142 L548 2009 4301 815*2^485457+1 146141 L672 2009 4302e 3661*2^485423-1 146131 L893 2009 4303b 2287*2^485422+1 146130 L834 2009 4304a 9307*2^485408+1 146127 L834 2009 4305c 2067*2^485376-1 146117 L548 2009 4306c 2433*2^485340-1 146106 L548 2009 4307 801*2^485328+1 146102 L683 2009 4308d 1679*2^485255+1 146080 p240 2009 4309 1577*2^485232-1 146073 L257 2008 4310b 2425*2^485228+1 146072 L834 2009 4311a 9613*2^485214+1 146068 L834 2009 4312a 8951*2^485193+1 146062 L834 2009 4313 253*2^485188+1 146059 L153 2007 4314b 2315*2^485167+1 146054 L834 2009 4315 1347*2^485136+1 146044 p240 2009 4316 1311*2^485133+1 146043 p240 2009 4317a 6813*2^485125+1 146042 L834 2009 4318a 9321*2^485124+1 146041 L834 2009 4319 1649*2^485120-1 146039 L701 2009 4320a 9087*2^485108+1 146037 L834 2009 4321a 9703*2^485074+1 146026 L834 2009 4322a 8751*2^485041+1 146016 L834 2009 4323 891*2^485040+1 146015 L670 2009 4324 857*2^485006-1 146005 L579 2008 4325 9*2^484975-1 145993 L38 2004 4326 1219*2^484954+1 145989 p161 2008 4327 1501*2^484947-1 145987 L698 2009 4328c 2513*2^484932-1 145983 L548 2009 4329c 2469*2^484913-1 145977 L548 2009 4330 8655*2^484899-1 145974 L251 2009 4331 1407*2^484811+1 145946 p240 2009 4332 1275*2^484801-1 145943 L503 2009 4333b 6523*2^484795-1 145942 L862 2009 4334 210877*2^484789-1 145942 L536 2009 4335b 6613*2^484783-1 145939 L862 2009 4336 807*2^484727+1 145921 L694 2009 4337 1019*2^484704-1 145914 L251 2008 4338 105*2^484658-1 145899 L38 2005 4339 201*2^484583-1 145877 L167 2006 4340c 2637*2^484561-1 145871 L910 2009 4341 903*2^484562+1 145871 L681 2009 4342 193*2^484500+1 145852 L57 2006 4343f 22095*2^484480-1 145848 L268 2009 4344b 6977*2^484390-1 145820 L862 2009 4345b 6935*2^484378-1 145817 L860 2009 4346 4035*2^484360-1 145811 L268 2008 4347a 3061*2^484357-1 145810 L536 2009 4348 247099*2^484190+1 145762 g341 2004 4349f 6365*2^484188-1 145759 L876 2009 4350e 1917*2^484186+1 145758 p240 2009 4351 1245*2^484108+1 145735 p240 2008 4352f 20145*2^484090-1 145730 L268 2009 4353 363*2^484076+1 145724 L153 2008 4354d 1535*2^484053+1 145718 p240 2009 4355 229*2^484018+1 145707 L181 2006 4356 2153*2^483941+1 145685 g380 2009 4357b 1781*2^483935+1 145683 p240 2009 4358 173*2^483932-1 145681 L145 2007 4359 519*2^483915+1 145676 L153 2008 4360e 1859*2^483847+1 145656 p240 2009 4361 5775*2^483844+1 145656 p189 2007 4362c 2467*2^483805-1 145644 L548 2009 4363 253*2^483768+1 145632 L153 2007 4364c 2919*2^483764-1 145631 L910 2009 4365 921*2^483762-1 145630 L548 2008 4366 1317*2^483761-1 145630 L503 2009 4367 835*2^483718+1 145617 L654 2009 4368f 1509*2^483561+1 145570 p240 2009 4369b 6837*2^483553-1 145568 L862 2009 4370 1213*2^483535-1 145562 L503 2009 4371 102765*2^483523-1 145560 L644 2009 4372 8235*2^483521-1 145559 L644 2009 4373e 3851*2^483502-1 145553 L862 2009 4374c 2097*2^483489-1 145549 L548 2009 4375 1951*2^483481-1 145546 L555 2009 4376b 6627*2^483457-1 145539 L862 2009 4377f 6207*2^483337-1 145503 L268 2009 4378c 208502!7+1 145502 p3 2009 Multifactorial 4379f 29445*2^483330-1 145502 L323 2009 4380 1103*2^483326-1 145499 L10 2004 4381b 3175*2^483315-1 145496 L769 2009 4382 1035*2^483288-1 145488 L503 2008 4383 1767*2^483281-1 145486 L698 2009 4384 2685*2^483182-1 145456 L323 2009 4385 187*2^483153-1 145446 L138 2006 4386 8475*2^483095-1 145431 L644 2009 4387 15*2^483098+1 145429 p76 2004 4388b 6663*2^483088-1 145428 L862 2009 4389 1247*2^483070-1 145422 L503 2009 4390 1761*2^483045-1 145415 L701 2009 4391 149*2^483045+1 145414 L57 2006 4392 1217*2^482959+1 145389 p161 2008 4393 1175*2^482920-1 145377 L503 2009 4394 736320585*2^482897-1 145376 L137 2006 4395d 6113*2^482874-1 145364 L268 2009 4396 9429*2^482795-1 145340 L251 2009 4397 219*2^482782+1 145335 g233 2007 4398e 3967*2^482777-1 145334 L862 2009 4399 1105*2^482773-1 145333 L503 2008 4400 393*2^482773+1 145332 L153 2008 4401c 2651*2^482714-1 145315 L548 2009 4402e 19861029*2^482652-1 145301 L895 2009 4403 1003*2^482655-1 145297 L51 2004 4404e 3707*2^482636-1 145292 L862 2009 4405 21525*2^482615-1 145286 L251 2009 4406 1073*2^482585+1 145276 L656 2008 4407 159*2^482581-1 145274 L91 2005 4408 183*2^482384+1 145215 L108 2005 4409e 3631*2^482379-1 145215 L893 2009 4410 53*2^482377+1 145212 p114 2004 4411 1095*2^482338-1 145202 L503 2008 4412 949*2^482315-1 145195 L619 2008 4413 27183585*2^482296+1 145193 L122 2007 4414 79635*2^482295-1 145191 L251 2009 4415c 2789*2^482292-1 145188 L548 2009 4416e 3445*2^482257-1 145178 L862 2009 4417a 3087*2^482252+1 145176 L1105 2009 4418 957*2^482230+1 145169 L635 2008 4419 203*2^482177+1 145153 g233 2006 4420b 3157*2^482157-1 145148 L769 2009 4421b 9265*2^482072+1 145123 L635 2009 Divides GF(482070,10) 4422b 7791*2^482045+1 145114 L707 2009 4423b 5751*2^482040+1 145113 L635 2009 4424b 6943*2^482007-1 145103 L860 2009 4425 1089*2^481919+1 145076 L656 2008 4426 481899*2^481899+1 145072 gm 1998 Cullen 4427 255*2^481837-1 145050 g320 2005 4428 957860475*2^481762-1 145034 L18 2008 4429 9345*2^481642-1 144993 L644 2009 4430 28635*2^481618-1 144986 L251 2009 4431 1623*2^481564-1 144969 L698 2009 4432 6975*2^481543-1 144963 L121 2009 4433c 2649*2^481543-1 144963 L548 2009 4434d 6051*2^481529-1 144959 L268 2009 4435 1401*2^481489+1 144946 p240 2009 4436b 6759*2^481481-1 144945 L862 2009 4437 4035*2^481460-1 144938 L268 2008 4438c 2621*2^481458-1 144937 L548 2009 4439 1377*2^481426+1 144927 p240 2009 4440 207*2^481385-1 144914 L186 2007 4441 577294575*2^481273+1 144887 g42 2008 4442 2355*2^481236-1 144870 L121 2009 4443e 3811*2^481221-1 144866 L893 2009 4444b 3175*2^481131-1 144839 L536 2009 4445 9615*2^481062-1 144819 L644 2009 4446b 6865*2^481009-1 144802 L862 2009 4447 203*2^480918-1 144774 L163 2006 4448 905*2^480913+1 144773 L635 2008 4449f 6289*2^480883-1 144765 L268 2009 4450 189*2^480835-1 144749 L91 2005 4451 9585*2^480781-1 144734 L644 2009 4452c 2631*2^480741-1 144721 L548 2009 4453 1509*2^480731-1 144718 L701 2009 4454 717*2^480680+1 144702 L635 2008 4455 95493!3+1 144697 p119 2006 Multifactorial 4456f 15043*2^480639-1 144691 L257 2009 4457d 6129*2^480587-1 144675 L268 2009 4458b 6445*2^480523-1 144656 L862 2009 4459c 2639*2^480472-1 144640 L548 2009 4460 1737*2^480454-1 144635 L701 2009 4461 677*2^480447+1 144632 L679 2008 4462 309*2^480343-1 144601 L79 2007 4463 1041*2^480229+1 144567 L668 2008 4464 1455*2^480180-1 144552 g405 2007 4465 1761*2^480153-1 144544 L701 2009 4466c 2627*2^480090-1 144525 L548 2009 4467 923*2^480089+1 144525 L678 2008 4468b 6527*2^480032-1 144508 L862 2009 4469 747*2^480003+1 144499 L681 2008 4470b 5559*2^479975+1 144491 L834 2009 4471 1785*2^479966-1 144488 L698 2009 4472b 8481*2^479956+1 144486 L834 2009 4473d 1995*2^479842+1 144451 p240 2009 Divides GF(479838,5) 4474b 5005*2^479770+1 144429 L834 2009 4475b 8373*2^479762+1 144427 L834 2009 4476b 3539*2^479737+1 144419 L834 2009 4477b 7395*2^479730+1 144417 L834 2009 4478b 3281*2^479731+1 144417 L834 2009 4479 937*2^479725-1 144415 L615 2008 4480c 2367*2^479716-1 144413 L548 2009 4481b 8861*2^479645+1 144392 L834 2009 4482b 4471*2^479644+1 144391 L834 2009 4483 1727*2^479638-1 144389 L698 2009 4484 1755*2^479628-1 144386 L555 2009 4485 2*599^51983+1 144380 g404 2008 Divides Phi(599^51983,2) 4486c 2809*2^479577-1 144371 L548 2009 4487 97305*2^479568-1 144370 L251 2009 4488 481*2^479573-1 144369 L615 2008 4489 903*2^479544+1 144361 L671 2009 4490 1653*2^479500-1 144348 L620 2009 4491d 6153*2^479455-1 144335 L268 2009 4492b 8313*2^479433+1 144328 L834 2009 4493 279*2^479437-1 144328 L199 2007 4494b 7219*2^479402+1 144319 L834 2009 4495 736320585*2^479381-1 144317 L137 2006 4496b 4935*2^479381+1 144312 L834 2009 4497b 7887*2^479359+1 144306 L834 2009 4498 1185*2^479344+1 144300 L656 2008 4499b 2463*2^479338+1 144299 L834 2009 4500b 7443*2^479336+1 144299 L834 2009 4501b 9415*2^479328+1 144297 L834 2009 4502d 10003*2^479254+1 144274 g380 2009 4503 692835*2^479214-1 144264 L87 2005 4504b 8921*2^479193+1 144256 L834 2009 4505 425*2^479187+1 144253 L153 2007 4506b 4033*2^479172+1 144249 L834 2009 4507b 5639*2^479163+1 144247 L834 2009 4508b 4963*2^479146+1 144242 L834 2009 4509 4275*2^479132-1 144237 L268 2008 4510 1653*2^479120+1 144233 p240 2009 4511 1531*2^479097-1 144226 L701 2009 4512c 2335*2^479093-1 144225 L548 2009 4513b 3097*2^479088+1 144224 L834 2009 4514 473*2^479081+1 144221 L153 2007 4515c 2581*2^479071-1 144219 L548 2009 4516b 2193*2^479069+1 144218 L834 2009 4517b 2685*2^479042+1 144210 L834 2009 4518b 5727*2^479036+1 144208 L834 2009 4519b 3063*2^479028-1 144206 L769 2009 4520b 6503*2^479001+1 144198 L834 2009 4521 3335*2^478970-1 144188 L261 2008 4522d 108527*6^185267+1 144171 p254 2009 4523 849*2^478885+1 144162 L670 2008 4524a 5139*2^478861+1 144156 L921 2009 4525 1427*2^478831+1 144146 p240 2009 4526a 4391*2^478827+1 144145 L1046 2009 4527a 4879*2^478818+1 144143 L921 2009 4528c 2975*2^478798-1 144137 L548 2009 4529b 6651*2^478778-1 144131 L862 2009 4530 595*2^478771-1 144128 L548 2008 4531a 5055*2^478718+1 144113 L869 2009 4532f 15645*2^478710-1 144111 L268 2009 4533a 3081*2^478707+1 144109 L717 2009 4534b 6701*2^478702-1 144108 L862 2009 4535 72048*10^144096+1 144101 g157 2005 Generalized Cullen 4536a 7725*2^478628+1 144086 L1048 2009 4537c 2335*2^478607-1 144079 L548 2009 4538c 2173*2^478599-1 144076 L548 2009 4539 37785*2^478576-1 144071 L251 2009 4540 129*2^478538+1 144057 L57 2006 4541c 2147*2^478528-1 144055 L548 2009 4542f 1941*2^478377+1 144010 p241 2009 4543e 3723*2^478372-1 144008 L862 2009 4544 6351*2^478354-1 144003 L860 2009 4545a 4521*2^478337+1 143998 L674 2009 4546b 3075*2^478329-1 143995 L536 2009 4547d 206494!7+1 143977 p3 2009 Multifactorial 4548 195*2^478255+1 143972 L108 2006 4549 147639*2^478236-1 143969 g356 2005 4550 10623*2^478236-1 143968 L74 2005 4551e 3513*2^478187-1 143953 L862 2009 4552a 7685*2^478165+1 143946 L1103 2009 4553 66825*2^478138-1 143939 L251 2009 4554b 7437*2^478116+1 143932 L654 2009 4555b 8519*2^478089+1 143924 L717 2009 4556b 5511*2^478069+1 143917 L869 2009 4557c 2867*2^478064-1 143916 L548 2009 4558b 6003*2^478057+1 143914 L1096 2009 4559b 9369*2^477981+1 143891 L1048 2009 4560 2137*2^477970+1 143887 g380 2008 4561b 5481*2^477964+1 143886 L717 2009 4562b 4087*2^477950+1 143881 L1098 2009 4563b 3847*2^477926+1 143874 L1014 2009 4564b 8179*2^477882+1 143861 L717 2009 4565 3039469*2^477833-1 143849 L466 2008 4566c 2085*2^477815-1 143840 L330 2009 4567b 9801*2^477803+1 143838 L1097 2009 4568c 2851*2^477783-1 143831 L910 2009 4569b 7117*2^477780+1 143830 L654 2009 4570b 6419*2^477731+1 143816 L1096 2009 4571b 6001*2^477720+1 143812 L1091 2009 4572b 6951*2^477717+1 143811 L835 2009 4573b 5497*2^477688+1 143803 L883 2009 4574b 3303*2^477685+1 143802 L1046 2009 4575b 3227*2^477647+1 143790 L790 2009 4576 1789*2^477639-1 143787 L698 2009 4577d 2717*2^477604-1 143777 L548 2009 4578 1235*2^477605+1 143777 p161 2008 4579d 2301*2^477586-1 143772 L548 2009 4580 100110001*2^477516+1 143755 p249 2009 4581b 8815*2^477514+1 143750 L685 2009 4582e 3747*2^477510-1 143749 L862 2009 4583b 6839*2^477495+1 143745 L1088 2009 4584c 6467*2^477474-1 143738 L862 2009 4585e 3631*2^477461-1 143734 L862 2009 4586d 2511*2^477451-1 143731 L548 2009 4587b 7401*2^477445+1 143730 L869 2009 4588b 9597*2^477424+1 143723 L1085 2009 4589b 4029*2^477406+1 143718 L1089 2009 4590b 3645*2^477367+1 143706 L1004 2009 4591d 6083*2^477340-1 143698 L268 2009 4592e 3837*2^477338-1 143697 L862 2009 4593 Phi(3,4469^19683) 143695 p16 2002 Generalized unique 4594e 3007*2^477305-1 143687 L615 2009 4595 2211*2^477294-1 143684 L261 2008 4596 1425*2^477283+1 143680 p240 2009 4597b 7631*2^477275+1 143678 L901 2009 4598b 9819*2^477274+1 143678 L1004 2009 4599b 3019*2^477247-1 143670 L769 2009 4600c 6639*2^477219-1 143662 L862 2009 4601b 8421*2^477163+1 143645 L661 2009 4602d 6019*2^477157-1 143643 L268 2009 4603a 4655*2^477111+1 143629 L1106 2009 4604b 9063*2^477078+1 143619 L1026 2009 4605a 6567*2^477064+1 143615 L921 2009 4606b 5365*2^477056+1 143612 L757 2009 4607 Phi(3,-24135^16384) 143611 f2 2005 Generalized unique 4608 59629*2^477037-1 143608 p243 2009 4609 8325*2^477028-1 143604 L644 2009 4610b 7185*2^477018+1 143601 L869 2009 4611e 3845*2^476982-1 143590 L893 2009 4612 1757*2^476948-1 143579 L701 2009 4613b 4143*2^476917+1 143570 L1093 2009 4614c 6933*2^476899-1 143565 L860 2009 4615f 1577*2^476891+1 143562 p240 2009 4616b 2803*2^476856+1 143552 L635 2009 4617b 4119*2^476849+1 143550 L1084 2009 4618e 3647*2^476840-1 143547 L862 2009 4619b 8493*2^476796+1 143534 L717 2009 4620 363*2^476748-1 143519 g276 2006 4621b 8481*2^476659+1 143493 L635 2009 4622b 4083*2^476649+1 143490 L1079 2009 4623b 5097*2^476642+1 143488 L635 2009 4624 651*2^476632+1 143484 L668 2008 Divides Fermat F(476624) 4625b 4671*2^476617+1 143480 L1086 2009 4626b 3995*2^476599+1 143475 L635 2009 4627b 8563*2^476580+1 143469 L1048 2009 4628 1275*2^476581-1 143469 L80 2008 4629f 6279*2^476527-1 143453 L268 2009 4630c 6671*2^476494-1 143443 L862 2009 4631 649*2^476415-1 143419 L617 2008 4632b 4273*2^476390+1 143412 L717 2009 4633b 7887*2^476370+1 143406 L1075 2009 4634b 7093*2^476262+1 143373 L635 2009 4635 1575*2^476247-1 143368 L284 2008 4636b 2067*2^476223+1 143361 L1077 2009 4637a 5795*2^476213+1 143359 L1104 2009 4638b 7947*2^476178+1 143348 L635 2009 4639b 5089*2^476170+1 143346 L1074 2009 4640b 2527*2^476100+1 143324 L883 2009 4641b 2651*2^476097+1 143323 L635 2009 4642b 6769*2^476094+1 143323 L1094 2009 4643 2123*2^476034-1 143304 L261 2007 4644b 8377*2^476032+1 143304 L968 2009 4645b 3597*2^476024+1 143302 L968 2009 4646b 6569*2^476013+1 143299 L968 2009 4647b 5001*2^475991+1 143292 L635 2009 4648 315*2^475986-1 143289 L594 2008 4649 1487*2^475980-1 143288 L701 2009 4650b 5493*2^475977+1 143288 L635 2009 4651a 4323*2^475944+1 143278 L635 2009 4652 943*2^475938+1 143275 L676 2008 4653 1651*2^475928+1 143272 p240 2009 4654a 4005*2^475911+1 143268 L968 2009 4655 1049*2^475896-1 143262 L80 2008 4656b 2609*2^475893+1 143262 L635 2009 4657b 5253*2^475862+1 143253 L833 2009 4658 316751*2^475843+1 143249 L624 2008 4659f 22701*2^475814-1 143239 L621 2009 4660f 6285*2^475806-1 143236 L268 2009 4661 20152491645*2^475768-1 143231 L268 2007 4662b 7805*2^475777+1 143228 L1076 2009 4663b 6153*2^475714+1 143208 L635 2009 4664 106074103*2^475699-1 143208 L163 2006 4665b 2433*2^475689+1 143201 L766 2009 4666 2745*2^475676-1 143197 L323 2009 4667c 6775*2^475669-1 143195 L860 2009 4668c 6405*2^475647-1 143188 L862 2009 4669b 2625*2^475616+1 143179 L635 2009 4670b 9153*2^475613+1 143178 L1048 2009 4671d 2697*2^475606-1 143176 L548 2009 4672 106377*2^475569-1 143166 L550 2008 4673c 6543*2^475516-1 143149 L862 2009 4674b 9305*2^475495+1 143143 L710 2009 4675e 1965*2^475480+1 143138 p240 2009 4676b 4549*2^475418+1 143119 L717 2009 4677 295*2^475400+1 143113 L153 2008 4678 1881*2^475361-1 143102 L698 2009 4679b 6037*2^475358+1 143101 L1046 2009 4680b 9713*2^475357+1 143101 L901 2009 4681d 2581*2^475265-1 143073 L548 2009 4682f 34631*2^475246-1 143068 L323 2009 4683b 9585*2^475229+1 143063 L635 2009 4684b 3015*2^475228+1 143062 L968 2009 4685 6825*2^475188-1 143050 L268 2008 4686b 5785*2^475182+1 143048 L968 2009 4687b 4739*2^475181+1 143048 L968 2009 4688 9885*2^475162-1 143043 L644 2009 4689a 8661*2^475131+1 143033 L968 2009 4690 1090279905*2^474937-1 142980 L545 2008 4691b 7661*2^474939+1 142975 L1063 2009 4692 1299*2^474932-1 142972 L80 2008 4693 801*2^474900+1 142963 L679 2008 4694 1225*2^474797-1 142932 L80 2008 4695b 2031*2^474780+1 142927 L687 2009 4696 5929*2^474778+1 142927 L123 2007 Generalized Fermat 4697 1197*2^474764+1 142922 g387 2007 4698b 9027*2^474759+1 142921 L1053 2009 4699 1663*2^474731-1 142912 L619 2009 4700c 6141*2^474679-1 142897 L862 2009 4701d 2107*2^474673-1 142895 L548 2009 4702 34790!-1 142891 p85 2002 Factorial 4703b 7449*2^474659+1 142891 L635 2009 4704e 3489*2^474583-1 142868 L862 2009 4705 1875*2^474572+1 142864 p240 2009 4706b 4921*2^474536+1 142854 L635 2009 4707e 3575*2^474486-1 142839 L862 2009 4708 2101*2^474364+1 142802 g380 2008 4709b 6841*2^474348+1 142797 L1065 2009 Divides GF(474347,10) 4710 9765*2^474343-1 142796 L644 2009 4711b 3545*2^474339+1 142794 L1071 2009 4712b 8047*2^474302+1 142784 L658 2009 4713a 5915*2^474253+1 142769 L721 2009 4714e 3641*2^474226-1 142760 L862 2009 4715b 7175*2^474225+1 142760 L1067 2009 4716f 20145*2^474205-1 142755 L621 2009 4717 135*2^474178-1 142744 L140 2007 4718b 2759*2^474165+1 142742 L774 2009 4719b 4395*2^474112+1 142726 L635 2009 4720b 9641*2^474073+1 142715 L996 2009 4721 1221*2^474071+1 142713 p161 2008 4722 1145*2^474062-1 142710 L80 2008 4723 1389*2^474039-1 142704 L80 2008 4724b 8541*2^474032+1 142702 L1059 2009 4725b 8687*2^474023+1 142700 L1061 2009 4726 493*2^473996+1 142690 L153 2008 4727b 7701*2^473987+1 142689 L1040 2009 4728b 3547*2^473986+1 142688 L717 2009 4729b 9207*2^473972+1 142684 L717 2009 4730b 3349*2^473970+1 142683 L1068 2009 4731b 5977*2^473944+1 142676 L1047 2009 4732b 4551*2^473911+1 142666 L635 2009 4733b 2335*2^473898+1 142661 L820 2009 4734c 6505*2^473893-1 142660 L862 2009 4735 9855*2^473889-1 142659 L644 2009 4736 1185*2^473876+1 142654 L635 2008 4737f 11655*2^473872-1 142654 L323 2009 4738 507*2^473865-1 142651 L617 2008 4739b 7631*2^473795+1 142631 L1048 2009 4740b 9893*2^473777+1 142626 L836 2009 4741 170388075*2^473759-1 142624 L545 2008 4742b 5369*2^473749+1 142617 L1099 2009 4743b 6045*2^473662+1 142591 L1026 2009 4744 1191*2^473614-1 142576 L80 2008 4745b 3249*2^473609+1 142575 L766 2009 4746 1731*2^473589-1 142568 L566 2009 4747a 2769*2^473581+1 142566 L1110 2009 4748b 3879*2^473573+1 142564 L687 2009 4749d 2739*2^473569-1 142562 L548 2009 4750b 2097*2^473523+1 142548 L1046 2009 4751b 2451*2^473521+1 142548 L1069 2009 4752b 4757*2^473487+1 142538 L717 2009 4753c 6999*2^473468-1 142532 L860 2009 4754b 6333*2^473466+1 142532 L692 2009 4755 276278983*2^473423-1 142523 L10 2004 4756b 3585*2^473426+1 142519 L687 2009 4757b 6367*2^473422+1 142519 L881 2009 4758 663*2^473420-1 142517 L617 2008 4759b 9643*2^473414+1 142516 L1024 2009 4760b 4857*2^473392+1 142509 L844 2009 4761b 5937*2^473379+1 142506 L1024 2009 4762 2109*2^473357+1 142498 g380 2008 4763 1453*2^473330+1 142490 p240 2009 4764b 7071*2^473321+1 142488 L661 2009 4765b 5385*2^473313+1 142486 L1057 2009 4766b 8409*2^473310+1 142485 L1058 2009 4767c 6195*2^473297-1 142481 L282 2009 4768b 7155*2^473226+1 142460 L1099 2009 4769c 3195*2^473205-1 142453 L769 2009 4770b 7205*2^473161+1 142440 L1025 2009 4771 753*2^473164+1 142440 L635 2008 4772 1911*2^473158-1 142439 L698 2009 4773b 4491*2^473155+1 142438 L820 2009 4774 1133*2^473132-1 142430 L80 2008 4775 1957*2^473121-1 142427 L701 2009 4776b 8223*2^473112+1 142425 L1092 2009 4777b 8549*2^473089+1 142418 L924 2009 4778 157*2^473073-1 142412 L163 2006 4779 2745*2^473048-1 142406 L251 2009 4780b 9273*2^473037+1 142403 L1026 2009 4781 105*2^473040+1 142402 g233 2005 4782 221*2^473029+1 142399 g233 2007 4783b 2899*2^473022+1 142398 L1022 2009 4784b 7617*2^473014+1 142396 L1027 2009 4785 1431*2^472973+1 142383 p240 2009 4786e 3579*2^472965-1 142381 L864 2009 4787b 4923*2^472932+1 142371 L1028 2009 4788 6333*2^472911-1 142365 L860 2009 4789b 4551*2^472897+1 142360 L675 2009 4790b 7023*2^472858+1 142349 L1022 2009 4791b 9345*2^472850+1 142347 L766 2009 4792 987*2^472802-1 142331 L565 2008 4793b 3399*2^472799+1 142331 L1029 2009 4794b 6513*2^472749+1 142316 L1030 2009 4795b 5725*2^472744+1 142314 L1031 2009 4796 881*2^472687+1 142296 L635 2008 4797 1749*2^472685+1 142296 p240 2009 4798 1035*2^472684-1 142296 L80 2008 4799 6705*2^472680-1 142295 L268 2009 4800 2655*2^472672-1 142292 L251 2009 4801d 2559*2^472635-1 142281 L548 2009 4802b 6621*2^472631+1 142280 L1032 2009 4803f 12753*2^472607-1 142273 L268 2009 4804b 8301*2^472597+1 142270 L1024 2009 4805b 2457*2^472596+1 142269 L749 2009 4806a 4689*2^472586+1 142267 L1107 2009 4807 283*2^472530+1 142249 L153 2008 4808 429*2^472505+1 142241 L153 2007 4809c 6469*2^472483-1 142236 L862 2009 4810d 2553*2^472474-1 142233 L548 2009 4811b 7821*2^472463+1 142230 L1049 2009 4812f 1941*2^472435+1 142221 p240 2009 4813 105*2^472430-1 142218 L38 2004 4814b 2801*2^472415+1 142215 L739 2009 4815b 7917*2^472407+1 142213 L1050 2009 4816 9961*2^472372+1 142203 L635 2009 4817b 7249*2^472370+1 142202 L1002 2009 4818b 6923*2^472361+1 142199 L1025 2009 4819 5535*2^472351-1 142196 L268 2009 4820b 2077*2^472348+1 142195 L1066 2009 4821 1535*2^472338-1 142192 L698 2009 4822b 7541*2^472271+1 142172 L635 2009 4823 1717*2^472261-1 142168 L536 2009 4824d 2907*2^472249-1 142165 L548 2009 4825b 8347*2^472154+1 142137 L646 2009 4826 1877*2^472147+1 142134 p240 2009 4827b 4595*2^472143+1 142133 L635 2009 4828 1019*2^472119+1 142125 L677 2008 4829b 6021*2^472104+1 142122 L1026 2009 4830 1047*2^472098-1 142119 L80 2008 4831 89*2^472099+1 142118 p114 2004 Divides Fermat F(472097) 4832b 3427*2^472070+1 142111 L1054 2009 4833b 4529*2^472059+1 142108 L1060 2009 4834b 4943*2^472029+1 142099 L1085 2009 4835d 2721*2^472019-1 142096 L548 2009 4836b 9255*2^472016+1 142095 L648 2009 4837f 29445*2^471983-1 142086 L268 2009 4838b 8497*2^471932+1 142070 L1055 2009 4839d 2757*2^471916-1 142065 L548 2009 4840c 3063*2^471902-1 142061 L769 2009 4841 5025*2^471882-1 142055 L268 2009 4842b 4797*2^471878+1 142054 L1036 2009 4843b 3357*2^471858+1 142047 L651 2009 4844b 8913*2^471856+1 142047 L752 2009 4845 659*2^471751+1 142015 L635 2008 4846b 2955*2^471741+1 142012 L739 2009 4847b 7715*2^471687+1 141996 L1022 2009 4848 1199*2^471687+1 141996 L635 2008 4849b 2939*2^471685+1 141995 L1048 2009 4850b 9069*2^471682+1 141995 L748 2009 4851b 6863*2^471657+1 141987 L1072 2009 4852 9555*2^471641-1 141983 L644 2009 4853b 9381*2^471624+1 141977 L1041 2009 4854b 6493*2^471604+1 141971 L681 2009 4855b 4257*2^471583+1 141965 L1056 2009 4856b 6119*2^471565+1 141959 L1045 2009 4857 831*2^471566-1 141959 L565 2008 4858b 6681*2^471561+1 141958 L1038 2009 4859b 3133*2^471530+1 141949 L749 2009 4860 555*2^471517-1 141944 L565 2008 4861e 6063*2^471466-1 141930 L282 2009 4862 133*2^471455-1 141925 L145 2006 4863e 3617*2^471448-1 141924 L862 2009 4864b 7803*2^471436+1 141921 L1035 2009 4865 81*2^471397+1 141907 p114 2004 4866 107*2^471382-1 141903 L145 2006 4867b 3985*2^471342+1 141892 L1044 2009 4868e 6057*2^471340-1 141892 L282 2009 4869b 8497*2^471326+1 141888 L649 2009 4870b 9291*2^471291+1 141877 L689 2009 4871c 6969*2^471273-1 141872 L862 2009 4872 1421*2^471235+1 141860 p240 2009 4873 267*2^471230-1 141857 L171 2006 4874 549*2^471189+1 141845 L153 2008 4875b 4131*2^471173+1 141841 L651 2009 4876c 6489*2^471132-1 141829 L862 2009 4877b 3265*2^471128+1 141828 L689 2009 4878b 6341*2^471109+1 141822 L675 2009 4879b 7505*2^471051+1 141805 L1073 2009 4880b 8617*2^471046+1 141803 L1020 2009 4881 53625*2^471031-1 141800 L251 2009 4882a 7413*2^470970-1 141780 L121 2009 4883b 8697*2^470924+1 141767 L735 2009 4884b 9291*2^470864+1 141749 L1054 2009 4885 9785*2^470862-1 141748 L644 2009 4886e 6043*2^470803-1 141730 L282 2009 4887a 7727*2^470754-1 141715 L121 2009 4888b 3291*2^470720+1 141705 L692 2009 4889d 2525*2^470704-1 141700 L701 2009 4890b 8985*2^470700+1 141699 L1022 2009 4891 58695*2^470697-1 141699 L644 2009 4892e 3461*2^470698-1 141698 L862 2009 4893e 3703*2^470687-1 141695 L862 2009 4894b 2335*2^470686+1 141694 L1053 2009 4895 2385*2^470679-1 141692 L18 2008 4896b 3399*2^470675+1 141691 L1042 2009 4897b 5107*2^470616+1 141674 L1041 2009 4898b 6741*2^470612+1 141673 L713 2009 4899 947*2^470602-1 141669 L565 2008 4900b 8337*2^470595+1 141668 L672 2009 4901 1293*2^470592+1 141666 p240 2009 4902b 8707*2^470584+1 141664 L1002 2009 4903d 2963*2^470580-1 141663 L701 2009 4904b 7137*2^470578+1 141662 L1040 2009 4905d 2113*2^470559-1 141656 L548 2009 4906e 3771*2^470558-1 141656 L862 2009 4907f 26829*2^470531-1 141649 L268 2009 4908b 6619*2^470526+1 141647 L1039 2009 4909 271*2^470529-1 141646 L145 2006 4910b 3815*2^470523+1 141646 L1039 2009 4911b 2319*2^470513+1 141642 L1038 2009 4912b 9783*2^470488+1 141635 L743 2009 4913b 3285*2^470462+1 141627 L1037 2009 4914 3645*2^470421-1 141615 L139 2006 4915b 3747*2^470407+1 141611 L1035 2009 4916d 2169*2^470391-1 141606 L701 2009 4917b 8211*2^470380+1 141603 L1015 2009 4918 1883*2^470382-1 141603 L698 2009 4919b 4209*2^470363+1 141597 L1034 2009 4920 1161*2^470363-1 141597 L80 2008 4921c 6867*2^470294-1 141577 L862 2009 4922b 6625*2^470262+1 141567 L1033 2009 4923 1189*2^470253-1 141564 L80 2008 4924a 19681127*2^470232-1 141562 L466 2009 4925 131*2^470245+1 141560 p114 2005 4926b 3771*2^470223+1 141555 L1052 2009 4927 1125*2^470181+1 141542 L680 2008 4928b 3863*2^470161+1 141537 L1017 2009 4929 401617*2^470149-1 141535 g59 2002 4930f 21825*2^470138-1 141530 L268 2009 4931b 9193*2^470120+1 141525 L689 2009 4932 825*2^470111+1 141521 p114 2006 4933e 3519*2^470108-1 141521 L862 2009 4934b 5865*2^470098+1 141518 L1018 2009 4935 933*2^470094+1 141516 p114 2006 4936b 5255*2^470071+1 141510 L1016 2009 4937 90082*5^202441-1 141506 p204 2007 4938b 7719*2^469999+1 141488 L1046 2009 4939b 6603*2^469985+1 141484 L763 2009 4940e 3771*2^469979-1 141482 L862 2009 4941d 2483*2^469958-1 141475 L548 2009 4942b 4075*2^469950+1 141473 L635 2009 4943d 2001*2^469931-1 141467 L701 2009 4944b 8355*2^469915+1 141463 L1043 2009 4945b 4753*2^469912+1 141462 L635 2009 4946 1215*2^469910-1 141461 L80 2008 4947 413*2^469901+1 141457 L153 2007 4948 1299*2^469839-1 141439 L80 2008 4949b 7331*2^469835+1 141439 L1051 2009 4950 1089*2^469779+1 141421 L656 2008 4951b 4269*2^469769+1 141419 L1011 2009 4952e 3493*2^469759-1 141416 L862 2009 4953e 6795*2^469739-1 141410 L862 2009 4954 801*2^469733+1 141407 L668 2008 4955b 2523*2^469718+1 141403 L968 2009 4956 1887*2^469709-1 141400 L698 2009 4957b 3005*2^469695+1 141396 L968 2009 4958 192908*5^202258-1 141378 p204 2007 4959b 3293*2^469629+1 141376 L1014 2009 4960 883*2^469622+1 141374 L670 2008 4961e 6675*2^469605-1 141370 L862 2009 4962 269*2^469595+1 141365 L153 2007 4963 67*2^469596+1 141365 p114 2004 4964b 6671*2^469585+1 141363 L1014 2009 4965b 5889*2^469581+1 141362 L1013 2009 4966 37850187375*2^469548-1 141359 L257 2008 4967b 5355*2^469490+1 141335 L968 2009 4968a 7723*2^469455-1 141324 L121 2009 4969b 3663*2^469428+1 141316 L635 2009 4970 88195*40^88195+1 141299 x37 2009 Generalized Cullen 4971e 3575*2^469368-1 141298 L862 2009 4972 381*2^469371-1 141298 L548 2008 4973 379*2^469369-1 141297 g276 2007 4974 1213*2^469359-1 141295 L80 2008 4975b 5159*2^469349+1 141292 L1083 2009 4976 1323*2^469330-1 141286 L80 2008 4977c 7545*2^469319+1 141283 L635 2009 4978e 6111*2^469262-1 141266 L862 2009 4979c 4681*2^469204+1 141249 L635 2009 4980c 8485*2^469202+1 141248 L635 2009 4981c 3079*2^469177-1 141240 L536 2009 4982 925*2^469142+1 141229 L674 2008 4983c 9791*2^469069+1 141208 L635 2009 4984c 9485*2^469063+1 141207 L635 2009 4985c 8927*2^469063+1 141206 L723 2009 4986 36231101*2^469002-1 141192 L251 2007 4987 303*2^468977+1 141179 g258 2006 4988b 9285*2^468957+1 141175 L635 2009 4989 1917*2^468959+1 141175 p240 2009 4990a 7385*2^468952-1 141173 L121 2009 4991e 6715*2^468945-1 141171 L862 2009 4992b 6771*2^468944+1 141171 L1013 2009 4993f 22365*2^468941-1 141170 L323 2009 4994c 7257*2^468940+1 141169 L672 2009 4995a 7657*2^468933-1 141167 L121 2009 4996 913*2^468911-1 141160 L565 2008 4997c 8439*2^468902+1 141158 L735 2009 4998 1581*2^468851+1 141142 p240 2009 4999 5655*2^468842-1 141140 L268 2008 5000c 5963*2^468817+1 141132 L968 2009 5001 64872*145^64872+1 140218 g142 2005 Generalized Cullen 5002 10^140008+4546454*10^70001+1 140009 D 2005 Palindrome 5003 2*191^61303+1 139835 g404 2006 Divides Phi(191^61303,2) [g187] 5004 99*10^139670-1 139672 p200 2006 Near-repdigit 5005 292340*3^292340-1 139488 p120 2004 Generalized Woodall 5006 91848*33^91848+1 139478 g157 2006 Generalized Cullen 5007e 3911*2^462579+1 139254 L679 2009 Divides GF(462577,10) 5008 9*2^461081+1 138801 g122 2003 Divides Fermat F(461076), GF(461077,3), GF(461077,6), GF(461077,12) 5009f 1791*2^460696+1 138687 p240 2009 Divides GF(460693,12) 5010f 3203*2^459521+1 138334 L687 2009 Divides GF(459520,6) 5011 61813*172^61813+1 138190 g407 2007 Generalized Cullen 5012 45*2^458712+1 138088 L170 2007 Divides GF(458709,5), GF(458710,6) [K] 5013 1061839*2^456790-1769267*2^340000-1 137514 p97 2007 Arithmetic progression (3,d=1061839*2^456789-1769267*2^340000) 5014 1061839*2^456789-1 137514 L81 2005 Arithmetic progression (2,d=1061839*2^456789-1769267*2^340000) 5015f 4377*2^456708+1 137487 L872 2009 Divides GF(456707,10) 5016 76710*61^76710+1 136958 g157 2006 Generalized Cullen 5017 62378*141^62378+1 134069 g407 2007 Generalized Cullen 5018 74460*59^74460+1 131863 g157 2006 Generalized Cullen 5019 2*863^44857+1 131701 g404 2008 Divides Phi(863^44857,2) 5020 9*2^435743+1 131173 g122 2003 Divides GF(435742,10) 5021 58897*166^58897+1 130763 g407 2007 Generalized Cullen 5022 9999992*10^130127-1 130134 p200 2008 Near-repdigit 5023 10^130048+(9*10^37077-2)/11*10^46486+1 130049 p235 2008 Tetradic palindrome 5024 10^130036+116010611*10^65014+1 130037 D 2004 Palindrome 5025 10^130022+3761673*10^65008+1 130023 D 2004 Palindrome 5026 2*683^45797+1 129809 g404 2008 Divides Phi(683^45797,2) 5027 17*2^429319-197*2^202534-1 129240 p162 2005 Arithmetic progression (3,d=17*2^429318-197*2^202534) 5028 17*2^429318-1 129239 g267 2003 Arithmetic progression (2,d=17*2^429318-197*2^202534) [p162] 5029c 10^127590+10^42297*(9*10^42997-2)/11+1 127591 x40 2009 Tetradic palindrome 5030 10^127576+1081101080188810801011801*10^63776+1 127577 p185 2006 Tetradic, palindrome 5031 2*23^93337+1 127100 gb1 2006 Divides Phi(23^93337,2) 5032 2*4523^34421+1 125824 gb1 2004 Divides Phi(4523^34421,2) 5033 88900*26^88900+1 125797 g157 2005 Generalized Cullen 5034 70615*60^70615+1 125569 g157 2008 Generalized Cullen 5035 2*359^49071+1 125382 g404 2007 Divides Phi(359^49071,2) 5036 2*251^51905+1 124556 gb2 2006 Divides Phi(251^51905,2) 5037 61652*103^61652-1 124101 p120 2004 Generalized Woodall 5038 1207*2^410108+1 123458 g380 2005 Divides Fermat F(410105) 5039 2*4079^33873+1 122301 gb2 2007 Divides Phi(4079^33873,2) 5040 15*2^403929+1 121596 p114 2002 Divides GF(403927,10) 5041 36635*1960^36635-1 120617 p117 2003 Generalized Woodall 5042 10^120016+1726271*10^60005+1 120017 D 2004 Palindrome 5043 10^120002+1617161*10^59998+1 120003 D 2004 Palindrome 5044 3*10^119292-1 119293 p135 2006 Near-repdigit 5045 69*2^394574+1 118781 p219 2008 Divides GF(394572,12) 5046 91850*19^91850-1 117459 p237 2008 Generalized Woodall 5047 92711*18^92711-1 116383 p242 2009 Generalized Woodall 5048 64227*2^385362-1 116011 p77 2003 Generalized Woodall 5049 2*491^42801+1 115182 g404 2007 Divides Phi(491^42801,2) 5050 3*2^382449+1 115130 g132 1999 Divides Fermat F(382447), GF(382447,3), GF(382447,12), GF(382443,6) 5051 119*2^376951+1 113476 g233 2006 Divides GF(376950,12) 5052 145359*6^145359-1 113117 p234 2008 Generalized Woodall 5053 8511*2^374486-1 112736 p77 2003 Generalized Woodall 5054 45*2^368554-405769059*2^180009-1 110948 p108 2003 Arithmetic progression (3,d=45*2^368553-405769059*2^180009) 5055 45*2^368553-1 110948 L4 2003 Arithmetic progression (2,d=45*2^368553-405769059*2^180009) [p108] 5056 2^364289-2^182145+1 109662 p58 2001 Gaussian Mersenne norm 35 5057 3*2^362765+1 109204 g245 2002 Divides GF(362763,12), GF(362764,10) 5058 2*8039^27953+1 109163 gb1 2004 Divides Phi(8039^27953,2) 5059 75*2^361614+1 108859 p114 2004 Divides GF(361612,10) 5060 361275*2^361275+1 108761 DS 1998 Cullen 5061 995*10^107888-1 107891 p218 2007 Near-repdigit 5062 26951!+1 107707 p65 2002 Factorial 5063 17883*2^357662-1 107672 p103 2003 Generalized Woodall 5064 9*10^107663-1 107664 p122 2004 Near-repdigit 5065 65555*42^65555-1 106417 p239 2008 Generalized Woodall 5066 10^105022+523111325*10^52507+1 105023 D 2008 Palindrome 5067 10^105018+920383029*10^52505+1 105019 D 2008 Palindrome 5068 10^105016+318939813*10^52504+1 105017 D 2008 Palindrome 5069 10^105014+682787286*10^52503+1 105015 D 2008 Palindrome 5070 10^105014+424787424*10^52503+1 105015 D 2008 Palindrome 5071 10^104281-10^52140-1 104281 p16 2003 Near-repdigit, palindrome 5072 163*2^343190+1 103313 g258 2005 Divides GF(343189,10) 5073 1769267*2^340000-1 102357 L4 2003 Arithmetic progression (1,d=1061839*2^456789-1769267*2^340000) 5074 485*2^338297+1 101841 L203 2007 Divides Fermat F(338295) [K] 5075d 65516468355*2^333333+1 100355 L923 2009 Twin (p+2) 5076d 65516468355*2^333333-1 100355 L923 2009 Twin (p) 5077 28782838101*2^333333-1 100354 L453 2007 Arithmetic progression (3,d=3371818539*2^333335) [g282] 5078 26273597661*2^333333-1 100354 L329 2007 Arithmetic progression (3,d=38478921*2^333341) [g282] 5079 16422993885*2^333333-1 100354 L392 2007 Arithmetic progression (2,d=38478921*2^333341) [g282] 5080 15295563945*2^333333-1 100354 L271 2007 Arithmetic progression (2,d=3371818539*2^333335) [g282] 5081 14470366551*2^333333-1 100354 L315 2007 Arithmetic progression (1,d=168667635*2^333334) [g348] 5082 6572390109*2^333333-1 100354 L255 2007 Arithmetic progression (1,d=38478921*2^333341) [g282] 5083 1808289789*2^333333-1 100353 L212 2007 Arithmetic progression (1,d=3371818539*2^333335) [g282] 5084 54528*69^54528-1 100274 p120 2004 Generalized Woodall 5085 10^100000-10^61403-1 100000 p62 2001 Near-repdigit 5086 10^95019-10^47509-1 95019 p16 2003 Near-repdigit, palindrome 5087 99999*10^94039-1 94044 p199 2006 Near-repdigit 5088 891*2^311033+1 93634 p114 2005 Divides GF(311032,10) 5089 99999*10^92226-1 92231 p199 2006 Near-repdigit 5090 9*2^304607+1 91697 g23 1998 Divides GF(304604,6) 5091 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] 5092 15*2^300488+1 90458 p114 2002 Divides GF(300479,6), GF(300484,10) 5093 99995*10^87092-1 87097 p199 2006 Near-repdigit 5094 211*2^287388+1 86515 p43 2004 Divides Fermat F(287384) 5095 5*10^85142-1 85143 g243 2005 Near-repdigit 5096 51*2^282719+1 85109 g196 2002 Divides Fermat F(282717) 5097 21480!-1 83727 p65 2001 Factorial 5098 41*2^274897+1 82754 g305 2004 Divides GF(274896,10) 5099 63*2^270094+1 81309 gt 2002 Divides Fermat F(270091) 5100 (10^40293-1)^2-2 80586 p48 2004 Near-repdigit 5101 262419*2^262419+1 79002 DS 1998 Cullen 5102 5*10^78790-1 78791 g243 2005 Near-repdigit 5103a 648621027630345*2^253825-1 76424 x24 2009 Sophie Germain (2p+1) 5104a 620366307356565*2^253825-1 76424 x24 2009 Sophie Germain (2p+1) 5105a 648621027630345*2^253824-1 76424 x24 2009 Sophie Germain (p) 5106a 620366307356565*2^253824-1 76424 x24 2009 Sophie Germain (p) 5107 8*10^74318-1 74319 g243 2004 Near-repdigit 5108 99995*10^73668-1 73673 p199 2006 Near-repdigit 5109 10^72500-7*10^25509-1 72500 p48 2003 Near-repdigit 5110 96*10^71600-1 71602 p194 2006 Near-repdigit 5111 99998*10^69842-1 69847 p199 2006 Near-repdigit 5112 2^216091-1 65050 S 1985 Mersenne 31 5113 3*2^213321+1 64217 Y 1997 Divides Fermat F(213319); GF(213319,5), GF(213316,6), GF(213319,12) [g0] 5114 145823#+1 63142 p21 2000 Primorial 5115 2^203789+2^101895+1 61347 O 2000 Gaussian Mersenne norm 34 5116 197*2^202534-1 60972 L40 2004 Arithmetic progression (1,d=17*2^429318-197*2^202534) [p162] 5117 2003663613*2^195000+1 58711 L202 2007 Twin (p+2) 5118 2003663613*2^195000-1 58711 L202 2007 Twin (p) 5119c 607095*2^176312-1 53081 L983 2009 Sophie Germain (2p+1) 5120c 607095*2^176311-1 53081 L983 2009 Sophie Germain (p) 5121 48047305725*2^172404-1 51910 L99 2007 Sophie Germain (2p+1) 5122 48047305725*2^172403-1 51910 L99 2007 Sophie Germain (p) 5123 137211941292195*2^171961-1 51780 x24 2006 Sophie Germain (2p+1) 5124 194772106074315*2^171960+1 51780 x24 2007 Twin (p+2) 5125 194772106074315*2^171960-1 51780 x24 2007 Twin (p) 5126 137211941292195*2^171960-1 51780 x24 2006 Sophie Germain (p) 5127 100314512544015*2^171960+1 51780 x24 2006 Twin (p+2) 5128 100314512544015*2^171960-1 51780 x24 2006 Twin (p) 5129 16869987339975*2^171960+1 51779 x24 2005 Twin (p+2) 5130 16869987339975*2^171960-1 51779 x24 2005 Twin (p) 5131 33218925*2^169690+1 51090 g259 2002 Twin (p+2) 5132 33218925*2^169690-1 51090 g259 2002 Twin (p) 5133 2^160423-2^80212+1 48293 O 2000 Gaussian Mersenne norm 33 5134 primV(40395,-1,15588) 47759 x23 2007 Generalized Lucas primitive part 5135 primV(53394,-1,15264) 47200 CH4 2007 Generalized Lucas primitive part 5136 151023*2^151023-1 45468 g25 1998 Woodall 5137 71509*2^143019-1 43058 g23 1998 Woodall, arithmetic progression (2,d=(143018*2^83969-80047)*2^59049) [x12] 5138 2^132049-1 39751 S 1983 Mersenne 30 5139f 33759183*2^123459-1 37173 L527 2009 Sophie Germain (2p+1) 5140f 33759183*2^123458-1 37173 L527 2009 Sophie Germain (p) 5141 (28839^8317-1)/28838 37090 CH6 2006 Generalized repunit 5142 7068555*2^121302-1 36523 L100 2005 Sophie Germain (2p+1) 5143 7068555*2^121301-1 36523 L100 2005 Sophie Germain (p) 5144 307259241*2^115599+1 34808 g336 2009 Twin (p+2) 5145 307259241*2^115599-1 34808 g336 2009 Twin (p) 5146 primV(38513,-1,11502) 34668 x23 2006 Generalized Lucas primitive part 5147 2540041185*2^114730-1 34547 g294 2003 Sophie Germain (2p+1) 5148 2540041185*2^114729-1 34547 g294 2003 Sophie Germain (p) 5149 60194061*2^114689+1 34533 g294 2002 Twin (p+2) 5150 60194061*2^114689-1 34533 g294 2002 Twin (p) 5151 primV(9008,1,16200) 34168 x23 2005 Generalized Lucas primitive part 5152 2^110503-1 33265 WC 1988 Mersenne 29 5153 108615*2^110342+1 33222 L113 2008 Twin (p+2) 5154 108615*2^110342-1 33222 L113 2008 Twin (p) 5155 1124044292325*2^108000-1 32524 L99 2006 Sophie Germain (2p+1) 5156 1124044292325*2^107999-1 32523 L99 2006 Sophie Germain (p) 5157 112886032245*2^108001-1 32523 L99 2006 Sophie Germain (2p+1) 5158 112886032245*2^108000-1 32523 L99 2006 Sophie Germain (p) 5159 1765199373*2^107520+1 32376 g182 2002 Twin (p+2) 5160 1765199373*2^107520-1 32376 g182 2002 Twin (p) 5161 318032361*2^107001+1 32220 p100 2001 Twin (p+2) 5162 318032361*2^107001-1 32220 p100 2001 Twin (p) 5163 2^106693+2^53347+1 32118 O 2000 Gaussian Mersenne norm 32 5164a 532323*2^104390+1 31431 L983 2009 Cunningham chain 2nd kind (2p-1) 5165a 532323*2^104389+1 31430 L983 2009 Cunningham chain 2nd kind (p) 5166 primV(10987,1,14400) 31034 x25 2005 Generalized Lucas primitive part 5167 156733989*2^100007+1 30114 L95 2008 Twin (p+2) 5168 156733989*2^100007-1 30114 L95 2008 Twin (p) 5169 1046619117*2^100000+1 30113 L467 2007 Twin (p+2) 5170 1046619117*2^100000-1 30113 L467 2007 Twin (p) 5171 49363*2^98727-1 29725 Y 1997 Woodall 5172 U(2341,-1,8819) 29712 x25 2008 Generalized Lucas number 5173 18912879*2^98396-1 29628 p94 2002 Sophie Germain (2p+1) 5174 18912879*2^98395-1 29628 p94 2002 Sophie Germain (p) 5175 1807318575*2^98305+1 29603 g216 2001 Twin (p+2) 5176 1807318575*2^98305-1 29603 g216 2001 Twin (p) 5177 primV(24127,-1,6718) 29433 CH3 2005 Generalized Lucas primitive part 5178d 744678855*2^95000+1 28607 L922 2009 Twin (p+2) 5179d 744678855*2^95000-1 28607 L922 2009 Twin (p) 5180 primV(205011) 28552 x39 2009 Lucas primitive part 5181 U(16531,1,6721)-U(16531,1,6720) 28347 x36 2007 Lehmer number 5182d 581627055*2^93182+1 28060 p35 2009 Cunningham chain 2nd kind (2p-1) 5183d 581627055*2^93181+1 28060 p35 2009 Cunningham chain 2nd kind (p) 5184 90825*2^90825+1 27347 Y 1997 Cullen 5185 primV(5673,1,13500) 27028 CH3 2005 Generalized Lucas primitive part 5186 3364553235*2^88889-1 26768 L652 2009 Sophie Germain (2p+1) 5187 3364553235*2^88888-1 26768 L652 2009 Sophie Germain (p) 5188 primV(44368,1,9504) 26768 CH3 2005 Generalized Lucas primitive part 5189e (3429^7549-1)/3428 26684 c13 2009 Generalized repunit 5190 primV(10986,-1,9756) 26185 x23 2005 Generalized Lucas primitive part 5191 2^86243-1 25962 S 1982 Mersenne 28 5192 primV(11076,-1,12000) 25885 x25 2005 Generalized Lucas primitive part 5193 2^85237+2^42619+1 25659 x16 2000 Gaussian Mersenne norm 31 5194 primV(42,-1,23376) 25249 x23 2007 Generalized Lucas primitive part 5195 primV(7577,-1,10692) 25140 x33 2007 Generalized Lucas primitive part 5196 primV(44573,-1,10125) 25105 CH4 2007 Generalized Lucas primitive part 5197a 1035928263*2^83200+1 25055 p252 2009 Twin (p+2) 5198a 1035928263*2^83200-1 25055 p252 2009 Twin (p) 5199 10495740081*2^83126-1 25034 L99 2006 Sophie Germain (2p+1) 5200 10495740081*2^83125-1 25034 L99 2006 Sophie Germain (p) 5201 7473214125*2^83125+1 25033 L99 2006 Twin (p+2) 5202 7473214125*2^83125-1 25033 L99 2006 Twin (p) 5203 11694962547*2^83124+1 25033 L99 2006 Twin (p+2) 5204 11694962547*2^83124-1 25033 L99 2006 Twin (p) 5205 58950603*2^83130+1 25033 L99 2006 Twin (p+2) 5206 58950603*2^83130-1 25033 L99 2006 Twin (p) 5207 1030739199*2^82019+1 24700 g258 2009 Twin (p+2) 5208 1030739199*2^82019-1 24700 g258 2009 Twin (p) 5209 61078155*2^82003-1 24694 L99 2006 Sophie Germain (2p+1) 5210 61078155*2^82002-1 24693 L99 2006 Sophie Germain (p) 5211 primV(19285,1,10800) 24683 x25 2005 Generalized Lucas primitive part 5212 (13096^5953-1)/13095 24506 CH6 2007 Generalized repunit 5213 1213822389*2^81132-1 24433 g250 2002 Sophie Germain (2p+1) 5214 1213822389*2^81131-1 24432 g250 2002 Sophie Germain (p) 5215 primV(2425,1,13500) 24370 x23 2006 Generalized Lucas primitive part 5216 3853775193*2^80001+1 24093 L109 2007 Cunningham chain 2nd kind (2p-1) 5217 3853775193*2^80000+1 24092 L109 2007 Cunningham chain 2nd kind (p) 5218 primV(14261,1,10800) 23928 x23 2005 Generalized Lucas primitive part 5219 primV(13964,1,8856) 23876 CH3 2005 Generalized Lucas primitive part 5220 primV(3464,1,6722) 23786 x23 2006 Generalized Lucas primitive part 5221 1504084599*2^78342+1 23593 g290 2004 Cunningham chain 2nd kind (2p-1) 5222 964487139*2^78342+1 23593 g290 2004 Cunningham chain 2nd kind (2p-1) 5223 1504084599*2^78341+1 23593 g290 2004 Cunningham chain 2nd kind (p) 5224 964487139*2^78341+1 23592 g290 2004 Cunningham chain 2nd kind (p) 5225 6917!-1 23560 g1 1998 Factorial 5226 (89^11971-1)/88 23335 CH2 2009 Generalized repunit 5227 (23151^5347-1)/23150 23333 c13 2008 Generalized repunit 5228 2^77291+2^38646+1 23267 O 2000 Gaussian Mersenne norm 30 5229 primV(3711,1,9882) 23131 x25 2005 Generalized Lucas primitive part 5230 (5855^6121-1)/5854 23058 CH1 2005 Generalized repunit 5231 primV(20384,1,5281) 22754 x25 2003 Generalized Lucas primitive part, cyclotomy 5232 64670473*2^74147+3 22329 g422 2009 Sophie Germain (2p+1) 5233 64670473*2^74146+1 22328 L446 2009 Sophie Germain (p) 5234c 232197*2^73458-1 22119 L983 2009 Sophie Germain (2p+1) 5235c 232197*2^73457-1 22119 L983 2009 Sophie Germain (p) 5236 U(19258,-1,5039) 21586 x23 2007 Generalized Lucas number 5237c 398901*2^71470-1 21521 L983 2009 Sophie Germain (2p+1) 5238c 398901*2^71469-1 21520 L983 2009 Sophie Germain (p) 5239 6380!+1 21507 g1 1998 Factorial 5240 U(15631,1,5040)-U(15631,1,5039) 21134 x25 2003 Lehmer number 5241 2566851867*2^70002-1 21083 L109 2007 Sophie Germain (2p+1) 5242 2566851867*2^70001-1 21082 L109 2007 Sophie Germain (p) 5243 ((((((2521008887^3+80)^3+12)^3+450)^3+894)^3+3636)^3+70756)^3+97220 20562 FE1 2006 ECPP, Mills' prime 5244 U(11200,-1,5039) 20400 x25 2004 Generalized Lucas number, cyclotomy 5245 1040131975*2^66459+3 20016 g258 2007 Sophie Germain (2p+1) 5246 1040131975*2^66458+1 20015 g258 2007 Sophie Germain (p) 5247 (9473^4969-1)/9472 19756 CH2 2008 Generalized repunit 5248 (14261^4663-1)/14260 19367 c13 2007 Generalized repunit 5249 U(6584,-1,5039) 19238 x23 2007 Generalized Lucas number 5250 (13782^4591-1)/13781 19000 c13 2007 Generalized repunit 5251 (15637^4513-1)/15636 18925 c13 2007 Generalized repunit 5252 42209#+1 18241 p8 1999 Primorial 5253 7457*2^59659+1 17964 Y 1997 Cullen 5254 (18067^4201-1)/18066 17879 c13 2002 Generalized repunit 5255 (19026^4051-1)/19025 17332 c13 2008 Generalized repunit 5256 U(9657,1,4321)-U(9657,1,4320) 17215 x23 2005 Lehmer number 5257 U(81839) 17103 p54 2001 Fibonacci number 5258 (4735^4621-1)/4734 16980 CH3 2005 Generalized repunit 5259 (11031^4177-1)/11030 16882 p54 2005 Generalized repunit 5260 U(15823,1,3960)-U(15823,1,3959) 16625 x25 2002 Lehmer number, cyclotomy 5261 U(10803,1,4081)-U(10803,1,4080) 16457 x25 2005 Lehmer number, cyclotomy 5262 U(11091,-1,4049) 16375 CH3 2005 Generalized Lucas number 5263 U(2554,-1,4751) 16185 CH3 2005 Generalized Lucas number 5264 U(1599,-1,5039) 16141 x23 2007 Generalized Lucas number 5265 U(10853,1,3960)+U(10853,1,3959) 15977 x25 2002 Lehmer number, cyclotomy 5266 U(9667,1,3960)-U(9667,1,3959) 15778 x25 2002 Lehmer number, cyclotomy 5267 U(14257,-1,3779) 15694 x25 2004 Generalized Lucas number, cyclotomy 5268 (U(9275,1,3961)+U(9275,1,3960))/(U(9275,1,45)+U(9275,1,44)) 15537 x38 2009 Lehmer primitive part 5269 (15134^3697-1)/15133 15450 CH6 2007 Generalized repunit 5270 (16339^3613-1)/16338 15219 c13 2008 Generalized repunit 5271 2638^4405+4405^2638 15071 FE3 2004 ECPP 5272 (4018^4177-1)/4017 15051 c13 2008 Generalized repunit 5273 (7372^3889-1)/7371 15038 CH6 2007 Generalized repunit 5274 U(8747,1,3780)+U(8747,1,3779) 14897 x25 2005 Lehmer number 5275 (2147483647^1597-1)/1361551397315358942 14885 FE7 2009 ECPP 5276 U(25700,1,3360)+U(25700,1,3359) 14813 x25 2004 Lehmer number, cyclotomy 5277 2^49207-2^24604+1 14813 x16 2000 Gaussian Mersenne norm 29 5278 (15679^3499-1)/15678 14676 x25 2003 Generalized repunit 5279 U(1493,-1,4621) 14665 CH3 2005 Generalized Lucas number 5280 U(4951,1,3960)-U(4951,1,3959) 14628 CH3 2005 Lehmer number 5281 (2728^4231-1)/2727 14534 c13 2007 Generalized repunit 5282 U(12924,-12925,3499) 14382 x25 2005 Generalized Lucas number 5283 U(12113,-1,3499) 14284 CH3 2005 Generalized Lucas number 5284 U(5192,1,3841)-U(5192,1,3840) 14267 x23 2005 Lehmer number 5285 U(2441,-1,4201) 14228 CH3 2005 Generalized Lucas number 5286 U(3865,1,3960)+U(3865,1,3959) 14202 x25 2002 Lehmer number, cyclotomy 5287 U(3645,1,3841)-U(3645,1,3840) 13677 x25 2005 Lehmer number 5288 U(11194,-11195,3361) 13605 x25 2004 Generalized Lucas number 5289 U(2219,-1,4049) 13546 CH3 2005 Generalized Lucas number 5290 U(475,-1,5039) 13486 x25 2003 Generalized Lucas number, cyclotomy 5291 U(7644,1,3421)-U(7644,1,3420) 13281 CH3 2005 Lehmer number 5292 U(10206,1,3276)-U(10206,1,3275) 13130 x23 2005 Lehmer number 5293 U(7537,-7538,3361) 13028 x23 2007 Generalized Lucas number 5294 U(7512,-7513,3361) 13023 x25 2004 Generalized Lucas number 5295 U(2783,-1,3779) 13014 CH3 2005 Generalized Lucas number 5296 U(7128,-1,3361) 12946 x25 2004 Generalized Lucas number, cyclotomy 5297 (2^42737+1)/3 12865 M 2007 ECPP, generalized Lucas number, Wagstaff 5298 U(12159,1,3150)-U(12159,1,3149) 12864 x25 2005 Lehmer number, cyclotomy 5299 U(5485,1,3421)+U(5485,1,3420) 12788 CH3 2005 Lehmer number 5300 (V(49596,1,3375)+1)/(V(49596,1,675)+1) 12678 x25 2006 Lehmer primitive part 5301 (V(47025,1,3375)-1)/(V(47025,1,675)-1) 12616 x25 2006 Lehmer primitive part 5302 (V(44524,1,3375)-1)/(V(44524,1,675)-1) 12552 x23 2006 Lehmer primitive part 5303 U(6393,1,3276)-U(6393,1,3275) 12464 x25 2005 Lehmer number, cyclotomy 5304 (V(37511,1,3375)-1)/(V(37511,1,675)-1) 12351 x25 2006 Lehmer primitive part 5305 (V(32362,1,3375)+1)/(V(32362,1,675)+1) 12178 x23 2006 Lehmer primitive part 5306 U(4857,1,3300)-U(4857,1,3299) 12162 x25 2005 Lehmer number, cyclotomy 5307 (V(30226,1,3375)-1)/(V(30226,1,675)-1) 12098 x25 2006 Lehmer primitive part 5308 primV(57724) 12063 p54 2001 Lucas primitive part, cyclotomy 5309 U(5989,1,3169)-U(5989,1,3168) 11967 x25 2005 Lehmer number 5310 111871891*27751#+1 11961 p155 2008 Arithmetic progression (4,d=3624707*27751#) 5311 103098395*27751#+1 11961 p155 2007 Arithmetic progression (4,d=809963*27751#) 5312 102293041*27751#+1 11961 p155 2007 Arithmetic progression (4,d=412064*27751#) 5313 V(56003) 11704 p193 2006 Lucas number 5314 primU(67825) 11336 x23 2007 Fibonacci primitive part 5315 3610!-1 11277 C 1993 Factorial 5316 (V(11258,1,3375)+1)/(V(11258,1,675)+1) 10939 x23 2006 Lehmer primitive part 5317 3507!-1 10912 C 1992 Factorial 5318 (V(10638,1,3375)-1)/(V(10638,1,675)-1) 10873 x25 2006 Lehmer primitive part 5319 (V(983,1,3609)-1)/(V(983,1,9)-1) 10774 x23 2006 Lehmer primitive part 5320 primV(77058) 10729 CH3 2005 Lucas primitive part 5321 (V(9352,1,3375)+1)/(V(9352,1,675)+1) 10722 x25 2005 Lehmer primitive part 5322 V(51169) 10694 p54 2001 Lucas number 5323 U(50833) 10624 CH4 2005 Fibonacci number 5324 46915147*2^35000+1 10544 p43 2007 Arithmetic progression (4,d=9548007*2^35000) 5325 (V(7792,1,3375)-1)/(V(7792,1,675)-1) 10508 x25 2006 Lehmer primitive part 5326 primV(77841) 10496 x25 2005 Lucas primitive part 5327 (V(812,1,3609)+1)/(V(812,1,9)+1) 10475 x25 2006 Lehmer primitive part 5328 24029#+1 10387 C 1993 Primorial 5329 6*Bern(4306)/2153 10342 FE8 2009 Irregular, ECPP 5330 23801#+1 10273 C 1993 Primorial 5331 59056921173*2^34030+7 10255 FE6 2009 ECPP 5332 (U(11987,1,2521)-U(11987,1,2520))/(U(11987,1,36)-U(11987,1,35)) 10136 x38 2009 Lehmer primitive part 5333 1234^3265+3265^1234 10094 FE1 2005 ECPP 5334 Phi(427,-10^28) 10081 FE9 2009 Unique, ECPP 5335 2739^2930+2930^2739 10073 FE1 2005 ECPP 5336 2072644824759*2^33333+5 10047 FE5 2008 Triplet (3), ECPP 5337 2072644824759*2^33333+1 10047 L645 2008 Triplet (2) 5338 2072644824759*2^33333-1 10047 L645 2008 Triplet (1) 5339 409331735*2^33333+1 10043 p155 2007 Arithmetic progression (4,d=104086947*2^33333) 5340 648^3571+3571^648 10041 M 2003 ECPP 5341 10^9999+33603 10000 FE2 2003 ECPP 5342 (U(10227,1,2521)+U(10227,1,2520))/(U(10227,1,36)+U(10227,1,35)) 9965 x38 2009 Lehmer primitive part 5343 (V(8259,1,2517)-1)/(V(8259,1,3)-1) 9848 x25 2005 Lehmer primitive part 5344 32469*2^32469+1 9779 MM 1997 Cullen 5345 8073*2^32294+1 9726 MM 1997 Cullen 5346 (U(6954,1,2521)-U(6954,1,2520))/(U(6954,1,36)-U(6954,1,35)) 9548 x38 2009 Lehmer primitive part 5347 V(44507) 9302 CH3 2005 Lucas number 5348 2658^2659+2659^2658 9106 FE1 2005 ECPP 5349 13^8148+2716^2197 9077 M 2005 ECPP 5350 (V(2247,1,3375)-1)/(V(2247,1,675)-1) 9050 x25 2006 Lehmer primitive part 5351 (V(3798,1,2529)-1)/(V(3798,1,9)-1) 9021 x25 2006 Lehmer primitive part 5352 2319^2680+2680^2319 9020 M 2004 ECPP 5353 (V(8162,1,2307)-1)/(V(8162,1,3)-1) 9013 x25 2005 Lehmer primitive part 5354e 2^29727+20273 8949 c18 2009 ECPP 5355 2^27529-2^13765+1 8288 O 2000 Gaussian Mersenne norm 28 5356 primV(39124) 8176 CH3 2005 Lucas primitive part 5357a 379185609*2^27129-1 8176 L983 2009 Cunningham chain (4p+3) 5358a 379185609*2^27128-1 8175 L983 2009 Cunningham chain (2p+1) 5359a 379185609*2^27127-1 8175 L983 2009 Cunningham chain (p) 5360e Phi(1887,-11758041)/(7549*19070968058734261) 8125 c13 2009 ECPP 5361 1647^2518+2518^1647 8100 FE1 2005 ECPP 5362 197^3514+3514^197 8063 M 2004 ECPP 5363 1995^2438+2438^1995 8046 FE1 2003 ECPP 5364 18523#+1 8002 D 1989 Primorial 5365 164210699973*2^26328-1 7937 p158 2006 Cunningham chain (4p+3) 5366 164210699973*2^26327-1 7937 p158 2006 Cunningham chain (2p+1) 5367 164210699973*2^26326-1 7937 p158 2006 Cunningham chain (p) 5368 U(37511) 7839 x13 2005 Fibonacci number 5369 -E(2762)/2670541 7760 c11 2004 Euler irregular, ECPP 5370 V(36779) 7687 CH3 2005 Lucas number 5371 197418203*2^25000+6089 7535 FE4 2005 ECPP, consecutive primes arithmetic progression (3,d=6090) 5372 197418203*2^25000-1 7535 p164 2005 Consecutive primes arithmetic progression (2,d=6090) 5373 197418203*2^25000-6091 7535 FE4 2005 ECPP, consecutive primes arithmetic progression (1,d=6090) 5374 U(35999) 7523 p54 2001 Fibonacci number, cyclotomy 5375d Phi(4029,-1000) 7488 c47 2009 Unique, ECPP 5376 V(35449) 7409 p12 2001 Lucas number 5377 87*2^24582+2579 7402 c31 2004 ECPP, consecutive primes arithmetic progression (3,d=1290) 5378 87*2^24582+1289 7402 c31 2004 ECPP, consecutive primes arithmetic progression (2,d=1290) 5379 87*2^24582-1 7402 g106 1999 Consecutive primes arithmetic progression (1,d=1290) [c31] 5380 V(34759)/27112021 7257 c33 2005 Lucas cofactor, ECPP 5381 Phi(9455,-10) 7200 c33 2005 Unique, ECPP 5382b Phi(1479,-100000000) 7168 c47 2009 Unique, ECPP 5383 164084347*16229#+1 7009 p155 2009 Arithmetic progression (5,d=20333209*16229#) 5384 primA(82975) 6935 p54 2001 Lucas Aurifeuillian primitive part 5385 23005*2^23005-1 6930 Y 1997 Woodall 5386 22971*2^22971-1 6920 Y 1997 Woodall 5387 2852851249*16001#/5+1 6913 p199 2008 Arithmetic progression (5,d=2653152*16001#) 5388 2399771561*16001#/5+1 6913 p199 2008 Arithmetic progression (5,d=86574302*16001#) 5389 1638535589*16001#/5+1 6913 p199 2008 Arithmetic progression (5,d=2003735*16001#) 5390 Phi(2405,-10000) 6912 c47 2009 Unique,ECPP 5391 15877#-1 6845 CD 1992 Primorial 5392 Phi(10887,10) 6841 c33 2005 Unique, ECPP 5393 primV(48381) 6741 x23 2005 Lucas primitive part 5394 primU(40295) 6737 p12 2001 Fibonacci primitive part 5395 primV(39700) 6621 p54 2001 Lucas primitive part 5396 U(30757) 6428 p54 2001 Fibonacci number, cyclotomy 5397 U(30671)/1141737296775689 6395 c41 2005 Fibonacci cofactor, ECPP 5398 Phi(7357,-10) 6301 c33 2004 Unique, ECPP 5399 Phi(6437,10) 6240 c47 2008 Unique, ECPP 5400c (2^20887-1)/(694257144641*3156563122511*28533972487913*189380444251383\ 6092687) 6229 c4 2009 Mersenne cofactor, ECPP 5401 5612052289*14489#/5+5 6223 c18 2008 Triplet (3), ECPP 5402 5612052289*14489#/5+1 6223 p41 2008 Triplet (2) 5403 5612052289*14489#/5-1 6223 p41 2008 Triplet (1) 5404 4811*2^20219+1 6091 DM 1996 Consecutive primes arithmetic progression (3,d=3738) [c36] 5405 4811*2^20219-3737 6091 c36 2004 ECPP, consecutive primes arithmetic progression (2,d=3738) 5406 4811*2^20219-7475 6091 c36 2004 ECPP, consecutive primes arithmetic progression (1,d=3738) 5407a primV(29657) 6057 c11 2009 Lucas primitive part, ECPP 5408 3020255265*2^20025-1 6038 p133 2005 Cunningham chain (4p+3) 5409 3020255265*2^20024-1 6038 p133 2005 Cunningham chain (2p+1) 5410 3020255265*2^20023-1 6038 p133 2005 Cunningham chain (p) 5411 primV(28844) 6028 p12 2001 Lucas primitive part 5412 13649#+1 5862 D 1987 Primorial 5413 18885*2^18885-1 5690 K 1987 Woodall 5414 1963!-1 5614 CD 1992 Factorial 5415 13033#-1 5610 CD 1992 Primorial 5416c p(25235715) 5588 c46 2009 Partitions, ECPP 5417 p(25102542) 5574 c39 2009 Partitions, ECPP 5418 289*2^18502+1 5573 K 1984 Cullen, generalized Fermat 5419 p(24512858) 5508 c42 2007 Partitions, ECPP 5420 p(24503300) 5507 c42 2007 Partitions, ECPP 5421b 387977793*2^17866+1 5387 L983 2009 Cunningham chain 2nd kind (4p-3) 5422 U(25561) 5342 p54 2001 Fibonacci number 5423 p(23028252) 5338 c42 2008 Partitions, ECPP 5424 p(23010067) 5336 c42 2007 Partitions, ECPP 5425 primV(25504) 5324 F3 2001 Lucas primitive part, APR-CL assisted 5426d p(22857207) 5318 c46 2009 Partitions, ECPP 5427b p(22810361) 5313 c46 2009 Partitions, ECPP 5428c (2^17683-1)/(234000819833373807217*62265855698776681155719328257) 5274 c4 2009 Mersenne cofactor, ECPP 5429 p(22312025) 5254 c39 2007 Partitions, ECPP 5430 2366867925*2^17208+1 5190 p133 2004 Cunningham chain 2nd kind (4p-3) 5431 (99241437759*205881*4001#*(205881*4001#+1)+210)*(205881*4001#-1)/35+7 5132 p179 2006 Triplet (3) 5432 (99241437759*205881*4001#*(205881*4001#+1)+210)*(205881*4001#-1)/35+5 5132 p179 2006 Triplet (2) 5433 (99241437759*205881*4001#*(205881*4001#+1)+210)*(205881*4001#-1)/35+1 5132 p179 2006 Triplet (1) 5434 (91456744909*205881*4001#*(205881*4001#+1)+210)*(205881*4001#-1)/35+11 5132 p179 2006 Triplet (3) 5435 (91456744909*205881*4001#*(205881*4001#+1)+210)*(205881*4001#-1)/35+7 5132 p179 2006 Triplet (2) 5436 (91456744909*205881*4001#*(205881*4001#+1)+210)*(205881*4001#-1)/35+5 5132 p179 2006 Triplet (1) 5437 (84055657369*205881*4001#*(205881*4001#+1)+210)*(205881*4001#-1)/35+13 5132 p179 2006 Consecutive primes arithmetic progression (3,d=6) 5438 (84055657369*205881*4001#*(205881*4001#+1)+210)*(205881*4001#-1)/35+7 5132 p179 2006 Consecutive primes arithmetic progression (2,d=6) 5439 (84055657369*205881*4001#*(205881*4001#+1)+210)*(205881*4001#-1)/35+1 5132 p179 2006 Consecutive primes arithmetic progression (1,d=6) 5440 (63140956174*205881*4001#*(205881*4001#+1)+210)*(205881*4001#-1)/35+7 5132 p179 2005 Triplet (3) 5441 (63140956174*205881*4001#*(205881*4001#+1)+210)*(205881*4001#-1)/35+5 5132 p179 2005 Triplet (2) 5442 (63140956174*205881*4001#*(205881*4001#+1)+210)*(205881*4001#-1)/35+1 5132 p179 2005 Triplet (1) 5443 (61310346529*205881*4001#*(205881*4001#+1)+210)*(205881*4001#-1)/35+13 5132 p179 2005 Consecutive primes arithmetic progression (3,d=6) 5444 (61310346529*205881*4001#*(205881*4001#+1)+210)*(205881*4001#-1)/35+7 5132 p179 2005 Consecutive primes arithmetic progression (2,d=6) 5445 (61310346529*205881*4001#*(205881*4001#+1)+210)*(205881*4001#-1)/35+1 5132 p179 2005 Consecutive primes arithmetic progression (1,d=6) 5446 (51803036889*205881*4001#*(205881*4001#+1)+210)*(205881*4001#-1)/35+7 5132 p179 2007 Arithmetic progression (5,d=(681402540*205881*4001#*(205881*4001#+1)*(205881*4001#-1)/35)) 5447 (2^17029-1)/418879343 5118 c8 2006 Mersenne cofactor, ECPP 5448 33957462*Bern(2370)/40685 5083 c11 2003 Irregular, ECPP 5449 primV(24998) 5033 c48 2008 Lucas primitive part, ECPP 5450 16219299585*2^16614-1 5012 p158 2005 Cunningham chain (4p+3) 5451 16219299585*2^16613-1 5012 p158 2005 Cunningham chain (2p+1) 5452 16219299585*2^16612-1 5011 p158 2005 Cunningham chain (p) 5453d p(20186952) 4998 c46 2009 Partitions, ECPP 5454f primA(95475) 4966 c4 2009 Lucas Aurifeuillian primitive part, ECPP 5455 11549#+1 4951 D 1986 Primorial 5456c primV(24383) 4951 c4 2009 Lucas primitive part, ECPP 5457c primV(27167) 4866 c4 2009 Lucas primitive part, ECPP 5458e primV(28940) 4836 c4 2009 Lucas primitive part, ECPP 5459 2288999415*2^15939-1 4808 p133 2004 Cunningham chain (4p+3) 5460 2288999415*2^15938-1 4808 p133 2004 Cunningham chain (2p+1) 5461 2288999415*2^15937-1 4807 p133 2004 Cunningham chain (p) 5462 7911*2^15823-1 4768 K 1987 Woodall 5463 V(22811)/(2469062641*84961206854418761) 4741 c8 2004 Lucas cofactor, ECPP 5464 primU(25493) 4695 c8 2007 Fibonacci primitive part, ECPP 5465d p(17819598) 4695 c46 2009 Partitions, ECPP 5466 1793349831*2^15257+1 4603 p133 2004 Cunningham chain 2nd kind (4p-3) 5467 p(17120312) 4602 c39 2007 Partitions, ECPP 5468 p(17120303) 4602 c39 2007 Partitions, ECPP 5469 1110159213*2^15166+1 4575 g250 2002 Cunningham chain 2nd kind (4p-3) 5470 primB(95655) 4564 c4 2009 Lucas Aurifeuillian primitive part, ECPP 5471 3345660375*2^15127+1 4564 p94 2002 Cunningham chain 2nd kind (4p-3) 5472 Phi(6685,-10) 4560 c8 2003 Unique, ECPP 5473 primV(29810) 4515 c8 2004 Lucas primitive part, ECPP 5474 E(1736)/(55695515*75284987831*3222089324971117) 4498 c4 2004 Euler irregular, ECPP 5475 U(21577)/(8626362776257*608114436652075009) 4479 c8 2004 Fibonacci cofactor, ECPP 5476e p(16102957) 4463 c46 2009 Partitions, ECPP 5477 p(16026516) 4452 c39 2006 Partitions, ECPP 5478 primU(34593) 4444 c8 2007 Fibonacci primitive part, ECPP 5479 primA(53155) 4444 x25 2002 Lucas Aurifeuillian primitive part, cyclotomy 5480 2^14699+2^7350+1 4425 O 2000 Gaussian Mersenne norm 27 5481 primU(38181) 4414 c8 2007 Fibonacci primitive part, ECPP 5482 primA(52825) 4414 x25 2003 Lucas Aurifeuillian primitive part 5483 primB(79125) 4389 c4 2009 Lucas Aurifeuillian primitive part, ECPP 5484e p(15502228) 4379 c46 2009 Partitions, ECPP 5485 p(15446832) 4371 c8 2006 Partitions, ECPP 5486 p(15432340) 4369 c8 2006 Partitions, ECPP 5487 p(15421217) 4367 c8 2006 Partitions, ECPP 5488 p(15415500) 4366 c8 2006 Partitions, ECPP 5489 (2^14561-1)/8074991336582835391 4365 c8 2004 Mersenne cofactor, ECPP 5490 (2^14621-1)/(1958650799081*9787919624201558678734079) 4365 c4 2008 Mersenne cofactor, ECPP 5491 Phi(3273,-100) 4361 c8 2003 Unique, ECPP 5492 (2^14479+1)/3 4359 c4 2004 Generalized Lucas number, Wagstaff, ECPP 5493 Phi(1087,-10000) 4344 c8 2002 Unique, ECPP 5494 primB(56815) 4314 c4 2009 Lucas Aurifeuillian primitive part, ECPP 5495 primV(20578) 4301 p54 2001 Lucas primitive part 5496 primU(21053) 4274 c8 2007 Fibonacci primitive part, ECPP 5497 primU(31209) 4264 c8 2007 Fibonacci primitive part, ECPP 5498 primV(21298) 4249 c4 2009 Lucas primitive part, ECPP 5499 Phi(483,-10^16) 4224 c8 2002 Unique, ECPP 5500 276474*Bern(2030)/(19426085*24191786327543) 4200 c8 2003 Irregular, ECPP 5501 primU(25115) 4199 CH3 2005 Fibonacci primitive part 5502 primU(30687) 4173 c8 2007 Fibonacci primitive part, ECPP 5503 V(19469) 4069 x25 2002 Lucas number, cyclotomy, APR-CL assisted 5504 1477!+1 4042 D 1984 Factorial 5505 U(19433)/(8200903423639793*124790158973035710313*163702910239586286961\ 573) 4002 c8 2004 Fibonacci cofactor, ECPP 5506 primV(19148) 4001 p12 2001 Lucas primitive part 5507 U(19051)/44198321 3974 c8 2004 Fibonacci cofactor, ECPP 5508 U(18919)/1497228584233 3942 c8 2004 Fibonacci cofactor, ECPP 5509 primU(22939) 3933 c8 2007 Fibonacci primitive part, ECPP 5510 Phi(1959,1000) 3912 c8 2002 Unique, ECPP 5511 primA(52855) 3888 c4 2009 Lucas Aurifeuillian primitive part, ECPP 5512 primU(23009) 3883 c8 2007 Fibonacci primitive part, ECPP 5513 primV(18857) 3882 c4 2009 Lucas primitive part, ECPP 5514 primV(23716) 3863 p54 2001 Lucas primitive part 5515 -2730*Bern(1884)/100983617849 3844 c8 2003 Irregular, ECPP 5516 2840178*Bern(1870)/85 3821 c8 2003 Irregular, ECPP 5517 U(18427)/(1828363793*23130933997*11364458229549793) 3815 c8 2004 Fibonacci cofactor, ECPP 5518 Phi(955,-100000) 3801 c8 2002 Unique, ECPP 5519 -197676570*18851280661*Bern(1836)/(59789*3927024469727) 3734 c8 2003 Irregular, ECPP 5520 12379*2^12379-1 3731 K 1984 Woodall 5521 (2^12391+1)/3 3730 M 1996 Generalized Lucas number, Wagstaff 5522 (2^12451-1)/(4980401*15289230353*1143390212315192593598809) 3708 c4 2008 Mersenne cofactor, ECPP 5523 primU(32985) 3672 x23 2007 Fibonacci primitive part 5524 E(1468)/(95*217158949445380764696306893*597712879321361736404369071) 3671 c4 2003 Euler irregular, ECPP 5525 642*Bern(1802)/15720728189 3641 c8 2003 Irregular, ECPP 5526 primA(42685) 3568 c46 2008 Lucas Aurifeuillian primitive part 5527 U(17137)/328335144266897 3567 c8 2004 Fibonacci cofactor, ECPP 5528 primU(18689) 3549 c8 2007 Fibonacci primitive part, ECPP 5529 U(17011)/42109783293497 3542 c8 2004 Fibonacci cofactor 5530 V(17029)/(9570299*495749440031) 3541 c8 2004 Lucas cofactor, ECPP 5531 (2^11813-1)/(70879*207971134271377) 3537 c8 2002 Mersenne cofactor, ECPP 5532 primU(41055) 3531 c8 2007 Fibonacci primitive part, ECPP 5533 primA(45565) 3512 c4 2009 Lucas Aurifeuillian primitive part, ECPP 5534 primU(34515) 3491 c8 2003 Fibonacci primitive part, ECPP 5535 primU(20665) 3455 DK 1999 Fibonacci primitive part 5536 primU(24699) 3441 p54 2001 Fibonacci primitive part 5537 (2^11279+1)/3 3395 PM 1998 Cyclotomy, generalized Lucas number, Wagstaff 5538 U(16369)/(299022540829*8523458822385578881) 3391 c8 2004 Fibonacci cofactor, ECPP 5539 primU(17221) 3385 c8 2003 Fibonacci primitive part, ECPP 5540 Phi(6135,10) 3265 c8 2001 Unique, ECPP 5541 V(15511)/394599841 3234 c8 2004 Lucas cofactor, ECPP 5542 primU(23211) 3233 DK 1999 Fibonacci primitive part 5543 (2^10691+1)/3 3218 c4 2004 Generalized Lucas number, Wagstaff, ECPP 5544 primA(41665) 3211 c8 2003 Lucas Aurifeuillian primitive part, ECPP 5545 (2^10501+1)/3 3161 M 1996 Generalized Lucas number, Wagstaff 5546 V(14887)/1256071867381 3100 c8 2004 Lucas cofactor 5547 Phi(3341,-10) 3073 c8 2001 Unique, ECPP 5548 2^10141+2^5071+1 3053 O 2000 Gaussian Mersenne norm 26 5549 (2^10169-1)/10402314702094700470118039921523041260063 3022 c8 2002 Mersenne cofactor, ECPP 5550 V(14449) 3020 DK 1995 Lucas number 5551 U(14431) 3016 p54 2001 Fibonacci number 5552 Phi(3011,-10) 3010 F2 2001 Unique, APR-CL assisted 5553 (2^10007-1)/(14477908246561*136255313*10368448917257) 2979 c8 2002 Mersenne cofactor, ECPP 5554 U(14177)/2199986861 2954 c8 2004 Fibonacci cofactor 5555 primU(19415) 2943 c8 2003 Fibonacci primitive part, ECPP 5556 V(13963) 2919 c11 2002 Lucas number, ECPP 5557 primA(51945) 2894 c8 2003 Lucas Aurifeuillian primitive part, ECPP 5558 (2^9697-1)/(724126946527*19092282046942032847) 2888 c8 2002 Mersenne cofactor, ECPP 5559 (2^9733-1)/(2932747561*353435802999708808999*4424579967215442704801447) 2876 c4 2001 Mersenne cofactor, ECPP 5560 9531*2^9531-1 2874 K 1984 Woodall 5561 (2^9901-1)/(87770464009*4512717821471308759*8336998551279784091551*101\ 7688752041649660766793*25146117302614435382787771401*15024406890765276\ 20360606617623599) 2844 c2 2001 Mersenne cofactor, ECPP 5562 6569#-1 2811 D 1992 Primorial 5563 primB(49785) 2774 c8 2003 Lucas Aurifeuillian primitive part, ECPP 5564 U(13063)/(4389169*10370895133369) 2710 c8 2004 Fibonacci cofactor 5565 primA(52275) 2676 c8 2003 Lucas Aurifeuillian primitive part, ECPP 5566 U(12743)/8869129 2656 c8 2004 Fibonacci cofactor 5567 (2^8849-1)/(52368383*15264764469472455023) 2637 c4 2001 Mersenne cofactor, ECPP 5568 primB(48375) 2634 F3 2001 Lucas Aurifeuillian primitive part, APR-CL assisted 5569 V(12503)/4954888889 2604 c8 2004 Lucas cofactor 5570 primB(31145) 2603 p54 2001 Lucas Aurifeuillian primitive part 5571 Phi(3903,10) 2600 p44 2001 Unique 5572 primB(34045) 2584 c8 2003 Lucas Aurifeuillian primitive part, ECPP 5573 V(12457)/(1420099*81953391325049801) 2581 c8 2004 Lucas cofactor, ECPP 5574 -E(1078)/361898544439043 2578 c4 2002 Euler irregular, ECPP 5575 V(12251) 2561 p54 2001 Lucas number 5576 primA(47235) 2538 c8 2003 Lucas Aurifeuillian primitive part, ECPP 5577 primB(53625) 2508 c8 2003 Lucas Aurifeuillian primitive part, ECPP 5578 974!-1 2490 CD 1992 Factorial 5579 U(11807)/(231936709*1129990105451996281) 2441 c8 2004 Fibonacci cofactor, ECPP 5580 E(1028)/(6415*56837916301577) 2433 c4 2002 Euler irregular, ECPP 5581 V(11657)/69172639 2429 c8 2004 Lucas cofactor 5582 primB(45105) 2407 c8 2003 Lucas Aurifeuillian primitive part, ECPP 5583 E(1004)/(579851915*80533376783) 2364 c4 2002 Euler irregular, ECPP 5584 V(11393)/(3076111*5299498382701) 2362 c8 2004 Lucas cofactor 5585 953477584*5501#-1 2355 p133 2005 Cunningham chain (8p+7) 5586 U(11393)/(38772745844002993*2788032223609253801) 2346 c8 2004 Fibonacci cofactor, ECPP 5587 V(11261)/16823009787209 2341 c8 2004 Lucas cofactor 5588 U(11279)/(34987457*70263726073) 2339 c8 2004 Fibonacci cofactor 5589 7755*2^7755-1 2339 K 1984 Woodall 5590 V(11213)/(224261*1476324252027331181) 2320 c8 2004 Lucas cofactor, ECPP 5591 U(11093)/544296421641613 2304 c8 2004 Fibonacci cofactor 5592 (2^7757-1)/233293220467553594643512097574361 2303 c2 2001 Mersenne cofactor, ECPP 5593 (2^7673-1)/2563193011919 2298 M1 1997 Mersenne cofactor, cyclotomy 5594 V(11173)/(25206289*28583254701767411959*24018475125955094159731) 2286 c8 2004 Lucas cofactor, ECPP 5595 -2090369190*Bern(1236)/(103*939551962476779*157517441360851951) 2276 c4 2002 Irregular, ECPP 5596 -36870*Bern(1228)/1043706675925609 2272 c4 2002 Irregular, ECPP 5597 V(10691) 2235 DK 1995 Lucas number 5598 (2^7331-1)/458072843161 2196 EM 1997 Mersenne cofactor, ECPP 5599 (2^7417-1)/(1930694161304071*3888241452787718190543521) 2193 c8 2002 Mersenne cofactor, ECPP 5600 872!+1 2188 D 1983 Factorial 5601 Phi(3261,-10) 2173 F2 2001 Unique, APR-CL assisted 5602e 69705381*5003#+1 2145 p252 2009 Arithmetic progression (6,d=6632285*5003#) 5603 Phi(2137,-10) 2136 c6 2000 Unique, ECPP 5604 V(10223)/61893855542632111 2120 c8 2004 Lucas cofactor, ECPP 5605 (2^7039-1)/(1324401538053479*8541573097*218216841131937276721) 2074 c2 2001 Mersenne cofactor, ECPP 5606 -E(902)/(9756496279*314344516832998594237) 2069 c4 2002 Euler irregular, ECPP 5607 4104082046*4799#+5659 2058 c18 2005 Quadruplet (4), ECPP 5608 4104082046*4799#+5657 2058 c18 2005 Quadruplet (3), ECPP 5609 4104082046*4799#+5653 2058 c18 2005 Quadruplet (2), ECPP 5610 4104082046*4799#+5651 2058 c18 2005 Quadruplet (1), ECPP 5611 V(9839)/491951 2051 c8 2004 Lucas cofactor 5612 (2^6883-1)/(1885943*2043031664890199) 2051 M1 1997 Mersenne cofactor, cyclotomy 5613 -E(886)/68689 2051 c4 2002 Euler irregular, ECPP 5614 4787#+1 2038 D 1984 Primorial 5615 U(9677) 2023 c2 2000 Fibonacci number, ECPP 5616 U(9931)/(3079452003211541*122039293401017981*604956242930486632441) 2022 c8 2004 Fibonacci cofactor 5617 U(9967)/(120801834061*3105570884441*1047583984031437*22727240300133999\ 677*15086016388211003643481) 2003 c8 2005 Fibonacci cofactor, ECPP 5618 6611*2^6611+1 1994 K 1984 Cullen 5619 4583#-1 1953 D 1992 Primorial 5620 U(9311) 1946 DK 1995 Fibonacci number 5621 4547#+1 1939 D 1984 Primorial 5622 V(9209)/(29745071*101409509*547683904686691*4025749704474499) 1879 c8 2004 Lucas cofactor 5623 4297#-1 1844 D 1992 Primorial 5624 V(8807)/356419291 1833 c8 2004 Lucas cofactor 5625 (2^6199-1)/(46113927071*3895469424045161025776010136475884556282201) 1813 c8 2005 Mersenne cofactor, ECPP 5626 2^5900+469721940591 1777 c45 2007 Consecutive primes arithmetic progression (4,d=2880), ECPP 5627 11628008104*4127#+1 1770 p133 2005 Cunningham chain 2nd kind (8p-7) 5628 V(8467) 1770 c2 2000 Lucas number, ECPP 5629 18672891658*4099#+1591789579 1763 c14 2003 ECPP, consecutive primes arithmetic progression (4,d=210) 5630 4093#-1 1750 CD 1992 Primorial 5631 5795*2^5795+1 1749 K 1984 Cullen 5632 (2^5807+1)/3 1748 PM 1998 Cyclotomy, generalized Lucas number, Wagstaff 5633 U(8537)/(900766408671673*558828605201*17191134589117*92295773098952073\ 61) 1725 c8 2004 Fibonacci cofactor 5634 1226756544*4001#+1 1712 p133 2004 Cunningham chain 2nd kind (8p-7) 5635 U(8353)/(176465477*2184683363573*3620673479519515599362549) 1701 c8 2004 Fibonacci cofactor 5636 V(8329)/(5533286033716829*62798306322672929543921*23984131456587054365\ 62211) 1678 c8 2006 Lucas cofactor, ECPP 5637 V(7741) 1618 DK 1995 Lucas number 5638 52069470*3739#+1 1606 p155 2006 Arithmetic progression (6,d=3884057*3739#) 5639 83*2^5318-1 1603 K 1984 Woodall 5640 V(7243)/289721 1509 c8 2004 Lucas cofactor 5641 45496757*3529#+1 1503 p42 2006 Arithmetic progression (6,d=3603821*3529#) 5642 11024895887*3499#+855739 1491 c18 2003 Quadruplet (4), ECPP 5643 11024895887*3499#+855737 1491 c18 2003 Quadruplet (3), ECPP 5644 11024895887*3499#+855733 1491 c18 2003 Quadruplet (2), ECPP 5645 11024895887*3499#+855731 1491 c18 2003 Quadruplet (1), ECPP 5646 4713*2^4713+1 1423 K 1984 Cullen 5647 -54570*Bern(848)/(428478023*5051145078213134269) 1418 c4 2002 Irregular, ECPP 5648 3229#+1 1368 D 1984 Primorial 5649 -E(638)/(7235862947323*11411779188663863*526900327479624797) 1343 c4 2002 Euler irregular, ECPP 5650 41812496896*3067#-1 1316 p133 2004 Cunningham chain (8p+7) 5651 1054831232256*3061#+1 1314 p44 2003 Cunningham chain 2nd kind (8p-7) 5652 191881920*3067#-1 1314 p133 2004 Cunningham chain (8p+7) 5653 23^963+1031392866 1312 c32 2005 Consecutive primes arithmetic progression (4,d=1500) 5654 138*Bern(814)/(28409964671*335055893*351085907*520460183*30348030379*1\ 7043083582983) 1311 c4 2002 Irregular, ECPP 5655 13657785480*3049#-1 1309 p94 2002 Cunningham chain (8p+7) 5656 V(6379)/(9823661*187797761*39735824399) 1308 c8 2004 Lucas cofactor 5657 2853609856*3041#+1 1304 p94 2002 Cunningham chain 2nd kind (8p-7) 5658 49157981*3041#+1 1303 p151 2008 Arithmetic progression (6,d=5151124*3041#) 5659 42261175*3041#+1 1303 p151 2008 Arithmetic progression (6,d=1552212*3041#) 5660 V(6661)/(20413264084399*254844997471*6472729219639*8036635984600095627\ 961*64250170013936618067104660874142964379889) 1292 c8 2005 Lucas cofactor, ECPP 5661 833000864*3011#+1 1290 p155 2006 Arithmetic progression (7,d=114858412*3011#) 5662 821752479*3011#+1 1290 p155 2006 Arithmetic progression (7,d=114379137*3011#) 5663 797311599*3011#+1 1290 p155 2006 Arithmetic progression (7,d=98881303*3011#) 5664 489855608*3011#+1 1290 p155 2006 Arithmetic progression (7,d=1679489*3011#) 5665 1730304995*3001#+1 1287 p73 2004 Arithmetic progression (7,d=230408192*3001#) 5666 10271674954*2999#+3469 1284 p26 2002 Quadruplet (4), ECPP 5667 10271674954*2999#+3467 1284 p26 2002 Quadruplet (3), ECPP 5668 10271674954*2999#+3463 1284 p26 2002 Quadruplet (2), ECPP 5669 10271674954*2999#+3461 1284 p26 2002 Quadruplet (1), ECPP 5670 4919761805*2999#+6763 1284 c23 2003 Consecutive primes arithmetic progression (4,d=30) 5671 546!-1 1260 D 1992 Factorial 5672 354*Bern(754)/(377*883462452530494157) 1225 c4 2002 Irregular, ECPP 5673 V(5851) 1223 DK 1995 Lucas number 5674 19743490208*2801#-1 1208 p133 2005 Cunningham chain (8p+7) 5675 -690*Bern(748)/(720511*138192830377045750339532383) 1201 c8 2002 Irregular, ECPP 5676 6*Bern(734)/(377231593*75401119*170508089) 1178 c4 2002 Irregular, ECPP 5677 2722420456827*2^3800+7 1157 c44 2007 Quadruplet (4) 5678 2722420456827*2^3800+5 1157 c44 2007 Quadruplet (3) 5679 2722420456827*2^3800+1 1157 L467 2007 Quadruplet (2) 5680 2722420456827*2^3800-1 1157 L467 2007 Quadruplet (1) 5681 477707955423*2^3802+7 1157 c44 2007 Quadruplet (4) 5682 477707955423*2^3802+5 1157 c44 2007 Quadruplet (3) 5683 477707955423*2^3802+1 1157 L467 2007 Quadruplet (2) 5684 477707955423*2^3802-1 1157 L467 2007 Quadruplet (1) 5685 U(5387) 1126 WM 1990 Fibonacci number 5686 2657#+1 1115 BC 1981 Primorial 5687 424232794973*2593#+43789 1107 c18 2009 Quintuplet (5) , ECPP 5688 424232794973*2593#+43787 1107 c18 2009 Quintuplet (4) , ECPP 5689 424232794973*2593#+43783 1107 c18 2009 Quintuplet (3) , ECPP 5690 424232794973*2593#+43781 1107 c18 2009 Quintuplet (2) , ECPP 5691 424232794973*2593#+43777 1107 c18 2009 Quintuplet (1) , ECPP 5692 -88230*Bern(688)/(465776197109*1913589601207) 1088 c4 2002 Irregular, ECPP 5693 6*Bern(674)/337 1077 c4 2002 Irregular, ECPP 5694 283534892623*2477#+1091273 1069 c18 2006 Quintuplet (5), ECPP 5695 283534892623*2477#+1091269 1069 c18 2006 Quintuplet (4), ECPP 5696 283534892623*2477#+1091267 1069 c18 2006 Quintuplet (3), ECPP 5697 283534892623*2477#+1091263 1069 c18 2006 Quintuplet (2), ECPP 5698 283534892623*2477#+1091261 1069 c18 2006 Quintuplet (1), ECPP 5699 (2^3539+1)/3 1065 M 1989 First titanic by ECPP, generalized Lucas number, Wagstaff 5700 -E(510) 1062 c4 2002 Euler irregular, ECPP 5701 -E(526)/(5062100689*71096484738291757946225730043997) 1060 c4 2002 Euler irregular, ECPP 5702 2968802755*2459#+1 1057 p155 2009 Arithmetic progression (8,d=359463429*2459#) 5703 2519951928*2459#+1 1057 p155 2009 Cunningham chain 2nd kind (8p-7) 5704 469!-1 1051 BC 1981 Factorial 5705 11^1008+998672782 1050 c32 2005 Consecutive primes arithmetic progression (4,d=1080) 5706 142661157626*2411#+71427877 1038 c14 2002 Consecutive primes arithmetic progression (5,d=30) 5707 6179783529*2411#+1 1037 p102 2003 Arithmetic progression (8,d=176836494*2411#) 5708 31969211688*2399#+16073 1034 c18 2002 Quintuplet (5), ECPP 5709 31969211688*2399#+16069 1034 c18 2002 Quintuplet (4), ECPP 5710 31969211688*2399#+16067 1034 c18 2002 Quintuplet (3), ECPP 5711 31969211688*2399#+16063 1034 c18 2002 Quintuplet (2), ECPP 5712 31969211688*2399#+16061 1034 c18 2002 Quintuplet (1), ECPP 5713 R(1031) 1031 WD 1985 Repunit 5714 2377#-1 1007 D 1992 Primorial 5715 V(4793) 1002 DK 1995 Lucas number 5716 V(4787) 1001 DK 1995 Lucas number ----- -------------------------------- ------ ---- ---- -------------- KEY TO PROOF-CODES (primality provers): BC Penk, Buhler, Crandall C Caldwell, Cruncher c2 Water, Primo c4 Broadhurst, Primo c6 Larrosa, Primo c8 Water, Broadhurst, Primo c11 Oakes, Primo c13 Steward, OpenPFGW, Primo c14 Fougeron, Primo c18 Luhn, Primo c23 Andersen, Alm, OpenPFGW, Primo c31 Andersen, Alm, Rosenthal, OpenPFGW, Primo c32 DavisK, OpenPFGW, Primo c33 Chaglassian, Primo c36 Andersen, Willegen, Rosenthal, OpenPFGW, Primo c39 Minovic, OpenPFGW, Primo c41 Andersen, Rosenthal, Primo c42 Peets, Primo c44 Barnes, LLR, NewPGen, Primo c45 DavisK, NewPGen, Primo c46 Boncompagni, Primo c47 Chandler, Primo c48 Peets, OpenPFGW, Primo CD Dubner, Caldwell, Cruncher CH1 Soule, Minovic, CHG, Primo, OpenPFGW CH2 Wu_T, CHG, Primo, OpenPFGW CH3 Water, Broadhurst, CHG, Primo, OpenPFGW CH4 Irvine, Water, Broadhurst, CHG, Primo, OpenPFGW CH6 Steward, CHG, Primo, OpenPFGW D Dubner, Cruncher DK Dubner, Keller, Cruncher DM Demichel DS Smith_Darren, Proth.exe EM Morain, Mayer f1 Chaglassian, ForEis, PhiSieve, PIES f2 Harvey, ForEis, PhiSieve, PIES F2 Broadhurst, Primo, OpenPFGW, VFYPR F3 Water, Broadhurst, VFYPR f4 Bruen, Carmody, ForEis, PhiSieve, PIES f6 Carmody, ForEis, PhiSieve, PIES f7 Heuer, ForEis, PhiSieve, OpenPFGW, PIES f13 Rodenkirch, ForEis, PhiSieve, PIES f14 Hillegas, ForEis, PhiSieve, PIES f17 Grinbergs, ForEis, PhiSieve, PIES f18 AndersonLee, ForEis, PhiSieve, PIES f20 Willegen, ForEis, PhiSieve, PIES FE1 Morain, FastECPP FE2 Wirth, Kleinjung, Franke, FastECPP FE3 Wirth, Kleinjung, Franke, Morain, FastECPP FE4 Morain, Broadhurst, FastECPP, OpenPFGW FE5 Luhn, Morain, FastECPP FE6 Jordan, Morain, FastECPP, LLR FE7 Deng, 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 g6 Brazier, Proth.exe 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 g23 Ballinger, Proth.exe g25 OHare, Proth.exe g27 Hanson, Proth.exe g42 Brennen, Proth.exe g47 Svallmark, Proth.exe g53 Casey, Cooper, PRP, NewPGen, Proth.exe g55 Toplic, Proth.exe g59 Linton, Proth.exe g61 Fleuren, Proth.exe g65 Johnson_L, Proth.exe g106 Kuechler, Proth.exe g107 Riesen, Proth.exe g118 Schroeder, Proth.exe g121 Liddle, Proth.exe g122 Nohara, Proth.exe g132 Cosgrave, Proth.exe g136 Saridis, Proth.exe g141 Scott, Proth.exe g142 HermleGC, Proth.exe g148 Samidoost, Proth.exe g156 Morenus, Proth.exe g157 Loeh, Proth.exe g163 Haeberle, Proth.exe g167 DeMaio, Proth.exe g168 Hewgill, Proth.exe g172 Chaffey, Proth.exe g173 Heylen, Proth.exe g181 Bodenstein, Proth.exe g182 McElhatton, Proth.exe g196 Odermatt, Proth.exe g197 Muischnek, Proth.exe g199 Carmody, Proth.exe g204 Anderson, Robinson, Proth.exe g208 Tawaris, Proth.exe g216 Underbakke, Carmody, PRP, NewPGen, Proth.exe g219 Andrews, NPLB, Proth.exe g220 Keiser, Proth.exe g226 Snyder, Proth.exe g232 Angel, Proth.exe g233 Overmann, Proth.exe g236 Heuer, GFNSearch, GFN17Sieve, Proth.exe g241 Brittenham, Proth.exe g242 Heuer, Proth.exe g243 Sorensen, Proth.exe g245 Cosgrave, PRP, NewPGen, Proth.exe g246 Choliy, Proth.exe g250 Angel, Jobling, Augustin, NewPGen, Proth.exe g256 Arntzen, Proth.exe g258 Neves, PRP, NewPGen, Proth.exe g259 Papp, Proth.exe g260 AYENI, Proth.exe g261 Polster_Peter, Proth.exe g262 Kapek, Proth.exe g265 Wolter, MultiSieve, GenWoodall, Proth.exe g266 Hagel, Proth.exe g267 Grobstich, PRP, NewPGen, Proth.exe g271 Welsch, Proth.exe g274 Hemsen, Proth.exe g276 Oita, Proth.exe g277 Eaton, PRP, NewPGen, Proth.exe g279 Cooper, PRP, NewPGen, Proth.exe g281 Berndt, Proth.exe g290 Sun, PRP, NewPGen, Proth.exe g292 Sun, Proth.exe g294 Underbakke, TwinGen, PRP, Proth.exe g295 Underbakke, AthGFNSieve, Proth.exe g299 Dowd, Scott, Proth.exe g300 Zilmer, Proth.exe g302 Schmid, Proth.exe g305 Berg2, Proth.exe g308 Angel, GFNSearch, GFN17Sieve, Proth.exe g309 Heuer, GFNSearch, GFN15Sieve, Proth.exe g320 Griffin, PRP, NewPGen, NPLB, Proth.exe g335 Herranen, PRP, Proth.exe g336 Tornberg, PRP, NewPGen, Proth.exe g337 Hsieh, PRP, NewPGen, Proth.exe g341 Wallace, ProthSieve, PRP, PrimeSierpinski, Proth.exe g344 Ohigashi, Proth.exe g346 Dausch, ProthSieve, PRP, PrimeSierpinski, Proth.exe g354 Jobling, Gusev, Woltman, Proth.exe g356 Hughes1, Proth.exe g361 Molne, Proth.exe g368 Davis, PRP, NewPGen, Proth.exe g369 Tamai, Proth.exe g372 Adney, PRP, NewPGen, Proth.exe g378 Elagouz, Proth.exe g380 Tajima, PRP, NewPGen, Proth.exe g381 Bohanon, LLR, Proth.exe g387 Muzik, Proth.exe g392 HermleGC, MultiSieve, OpenPFGW, Proth.exe g393 Tamai, PRP, NewPGen, Proth.exe g396 Boncompagni, PRP, NewPGen, Proth.exe g402 Van_der_Westhuizen, Proth.exe g403 Yoshimura, ProthSieve, LLR, PrimeSierpinski, Proth.exe g404 Taniguchi, Proth.exe g405 Ogawa, LLR, NewPGen, Proth.exe g407 HermleGC, MultiSieve, PRP, Proth.exe g409 Melo, PRP, NewPGen, Proth.exe g410 Anonymous, AthGFNSieve, GFNSearch, GFN16Sieve, Proth.exe g411 Brittenham, PRP, NewPGen, Proth.exe g412 Kamenyuk, Proth.exe g413 Scott, AthGFNSieve, Proth.exe g414 Gilvey, Srsieve, LLR, PrimeGrid, PrimeSierpinski, Proth.exe g415 Scott, PRP, NewPGen, Proth.exe g418 Taura, PRP, NewPGen, Proth.exe g422 Saridis, NewPGen, Proth.exe g423 Ballinger, PRP, NewPGen, Proth.exe gb1 Buechel, Keller, PRP, Proth.exe gb2 Buechel, Keller, PRP, NewPGen, Proth.exe GC1 Angel, GFNSearch, GFN16Sieve, Proth.exe GC2 Hluchan, GFNSearch, GFN16Sieve, Proth.exe gf Jobling, Nash, Burrowes, Dunaieff, Proth.exe GF0 Gallot, Proth.exe, GFNSieve, GFNSearch GF2 Heuer, Proth.exe, GFNSieve, GFNSearch GF3 Penrose, Proth.exe, GFNSieve, GFNSearch GF4 Rosenthal, Proth.exe, GFNSieve, GFNSearch GF5 Angel, Proth.exe, GFNSieve, GFNSearch gm Morii, Proth.exe gt Taura, Proth.exe K Keller L2 Penne, NewPGen, LLR L4 Sun, NewPGen, LLR L6 Xiao, LLR L10 Ritschel, NewPGen, LLR L18 Burt, NewPGen, 15k, LLR L20 Kapek, LLR L24 Kochergin, NewPGen, 321search, LLR L30 Ritschel, NewPGen, 321search, LLR L31 Metcalf, NewPGen, LLR L32 Minovic, NewPGen, 15k, LLR L35 Faith, RieselSieve, LLR L38 Sax, NewPGen, LLR L40 AndersonM, Ksieve, 15k, LLR L41 Morelli, NewPGen, 321search, LLR L42 OHare, ProthSieve, RieselSieve, LLR L43 Lipinski, LLR L47 Bishop_D, ProthSieve, RieselSieve, LLR L49 Stolz, ProthSieve, RieselSieve, LLR L51 Hedges, PRP, NewPGen, LLR L52 Smith_Robert, NewPGen, LLR L53 Zaveri, ProthSieve, PRP, RieselSieve, LLR L56 Minovic, Ksieve, NewPGen, LLR L57 Rodenkirch, NewPGen, LLR L58 Nilsson_R, 15k, LLR L59 Kowzun, NewPGen, 321search, LLR L62 Ewing, NewPGen, 12121search, LLR L64 Michel, ProthSieve, RieselSieve, LLR L65 Clowes, NewPGen, 12121search, LLR L66 Haas, NewPGen, 12121search, LLR L71 Ayuchan, NewPGen, LLR L72 Depereyra, 15k, LLR L73 Wallace, ProthSieve, NewPGen, RieselSieve, LLR L74 Hughes1, LLR L76 Meissner, ProthSieve, RieselSieve, LLR L77 Depereyra, 321search, LLR L78 Depereyra, NewPGen, LLR L79 Benson, NewPGen, NPLB, LLR L80 Benson, NewPGen, LLR L81 Heuer, NewPGen, LLR L83 Voznyy, NewPGen, Proth.exe, LLR L84 Mischel, RieselSieve, LLR L87 Soule, 15k, LLR L91 Masser, ProthSieve, NewPGen, LLR L93 Sefko, ProthSieve, RieselSieve, LLR L94 Abraham, LLR L95 Urushi, LLR L97 Minovic, Penne, Underwood, Keller, Broadhurst, OpenPFGW, NewPGen, LLR L99 Underbakke, TwinGen, LLR L100 Minovic, TwinGen, LLR L101 Aggarwal, ProthSieve, PrimeSierpinski, LLR L105 Hoof, ProthSieve, RieselSieve, LLR L106 Brod, Ksieve, LLR L107 Chatfield, NewPGen, 12121search, LLR L108 Bedwell, NewPGen, LLR L109 Nair, NewPGen, LLR L110 Rosink, NewPGen, LLR L111 Fisher, ProthSieve, RieselSieve, LLR L113 Chatfield, NewPGen, LLR L116 Wallace, NewPGen, LLR L119 Hidy, Srsieve, PrimeGrid, LLR L121 Benson, Srsieve, Rieselprime, LLR L122 Stones, LLR L123 Gillion, NewPGen, LLR L124 Rodenkirch, MultiSieve, LLR L125 Mikrut, NewPGen, 12121search, LLR L126 Keiser, NewPGen, LLR L129 Snyder, LLR L132 Richard, 15k, LLR L134 Childers, ProthSieve, RieselSieve, LLR L137 Jaworski, Rieselprime, LLR L138 Soule, NewPGen, Rieselprime, LLR L139 Metcalfe, NewPGen, Rieselprime, LLR L140 Schlesser, Rieselprime, LLR L141 Depereyra, Rieselprime, LLR L142 Chatfield, NewPGen, Rieselprime, LLR L145 Minovic, Ksieve, NewPGen, Rieselprime, LLR L146 AndersonM, Ksieve, Rieselprime, LLR L147 Goudt, Rieselprime, LLR L148 Brunson, Rieselprime, LLR L151 Burt, NewPGen, 12121search, LLR L153 Eckhard, LLR L155 Brazier, NewPGen, LLR L156 Benson, FermFact, LLR L158 Underwood, NewPGen, 321search, LLR L159 Penne, NewPGen, Base4Sierpinski, LLR L160 Wong, ProthSieve, RieselSieve, LLR L161 Schafer, NewPGen, LLR L162 Banka, NewPGen, 12121search, LLR L163 Ritschel, NewPGen, Rieselprime, LLR L164 Chiovato, LLR L165 Keiser, OpenPFGW, NewPGen, LLR L167 Curtis, NewPGen, Rieselprime, LLR L170 Crosa, LLR L171 Metcalfe, ProthSieve, Rieselprime, LLR L172 Smith, ProthSieve, RieselSieve, LLR L175 Du, ProthSieve, RieselSieve, LLR L176 Jaworski, NewPGen, NPLB, LLR L177 Kwok, Rieselprime, LLR L179 White, ProthSieve, RieselSieve, LLR L181 Siegert, LLR L182 Keller88, NewPGen, LLR L183 Jaworski, NewPGen, Rieselprime, LLR L185 Hassler, NewPGen, LLR L186 Tjung, NewPGen, Rieselprime, LLR L191 Banka, NewPGen, LLR L192 Jaworski, LLR L193 Rosink, ProthSieve, RieselSieve, LLR L195 Bonath, NewPGen, Rieselprime, LLR L196 Reiter, Srsieve, PrimeGrid, LLR L197 DaltonJ, ProthSieve, RieselSieve, LLR L198 Mathew, NewPGen, NPLB, LLR L199 Ritschel, ProthSieve, Rieselprime, LLR L200 Jaworski, Ksieve, NewPGen, Rieselprime, LLR L201 Siemelink, LLR L202 Vautier, McKibbon, Gribenko, NewPGen, PrimeGrid, TPS, LLR L203 Murata, LLR L212 Apps, NewPGen, PrimeGrid, TPS, LLR L217 Lehmann, Rieselprime, LLR L251 Burt, NewPGen, Rieselprime, LLR L253 Jaworski, Srsieve, NewPGen, Rieselprime, LLR L255 Kramer, NewPGen, PrimeGrid, TPS, LLR L256 Underwood, Srsieve, NewPGen, 321search, LLR L257 Ritschel, Srsieve, Rieselprime, LLR L260 Soule, Srsieve, Rieselprime, LLR L261 Metcalfe, Srsieve, ProthSieve, Rieselprime, LLR L268 Metcalfe, Srsieve, Rieselprime, LLR L271 Klahn, NewPGen, PrimeGrid, TPS, LLR L277 Liiv, Rieselprime, LLR L282 Curtis, Srsieve, Rieselprime, LLR L284 Burt, NewPGen, LLR L290 Sax, Srsieve, Rieselprime, LLR L315 Rhodes, NewPGen, PrimeGrid, TPS, LLR L321 Broadhurst, OpenPFGW, NewPGen, LLR L323 Minovic, Srsieve, NewPGen, Rieselprime, LLR L325 Chatfield, Srsieve, NewPGen, Rieselprime, LLR L329 Schoenrogge, NewPGen, PrimeGrid, TPS, LLR L330 Tjung, Srsieve, Rieselprime, LLR L381 Mate, Siemelink, Rodenkirch, MultiSieve, LLR L384 Pinho, Srsieve, Rieselprime, LLR L391 Rodenkirch, Srsieve, LLR L392 Rodenkirk, NewPGen, PrimeGrid, TPS, LLR L400 Anonymous, Srsieve, NewPGen, Rieselprime, LLR L402 McKibbon, NewPGen, LLR L409 Minet, LLR L421 Bonath, Srsieve, Rieselprime, LLR L425 Goforth, Minovic, Srsieve, Rieselprime, LLR L426 Jaworski, Srsieve, Rieselprime, LLR L430 Carpenter3, LLR L434 Metcalfe, NewPGen, LLR L436 Andersen2, Gcwsieve, MultiSieve, PrimeGrid, LLR L442 Barnes, Srsieve, Rieselprime, LLR L446 Saridis, NewPGen, Proth.exe, LLR L447 Kohlman, Gcwsieve, MultiSieve, PrimeGrid, LLR L453 Straubinger, NewPGen, PrimeGrid, TPS, LLR L458 Rajh, NewPGen, LLR L466 Zhou, NewPGen, LLR L467 Barnes, NewPGen, LLR L468 Findley_S, RMA, NewPGen, 15k, LLR L478 Sutton1, Goforth, Srsieve, Rieselprime, LLR L486 Goforth, Curtis, Srsieve, Rieselprime, LLR L488 Sutton1, Srsieve, NewPGen, Rieselprime, LLR L503 Benson, Srsieve, LLR L505 Gaillard, NewPGen, LLR L521 Thompson1, Gcwsieve, MultiSieve, PrimeGrid, LLR L527 Tornberg, TwinGen, LLR L536 Bonath, Srsieve, NPLB, LLR L541 Barnes, Srsieve, CRUS, LLR L543 Pinho, Srsieve, NPLB, LLR L545 AndersonM, NewPGen, Rieselprime, LLR L548 Barnes, Srsieve, NPLB, LLR L550 Bonath, Srsieve, CRUS, LLR L555 Chatfield, Srsieve, NPLB, LLR L565 Burt, Srsieve, NPLB, LLR L566 James, Srsieve, NPLB, LLR L576 Kaiser, Srsieve, NPLB, LLR L579 Sorbera, Srsieve, NPLB, LLR L583 Goforth, Srsieve, NPLB, LLR L585 Dettweiler, Srsieve, NPLB, LLR L587 Dettweiler, Srsieve, CRUS, LLR L590 Padro, NewPGen, 12121search, LLR L591 Penne, Srsieve, CRUS, LLR L594 Lucas, Srsieve, NPLB, LLR L596 Vogel, TwinGen, PrimeGrid, LLR L605 Dunn, Srsieve, PrimeGrid, LLR L606 Bennett, Srsieve, NewPGen, PrimeGrid, 321search, LLR L613 Keogh, Srsieve, ProthSieve, RieselSieve, LLR L614 Vanklein, LLR L615 Vogel, Srsieve, NPLB, LLR L616 Schmeer, Srsieve, Rieselprime, LLR L617 Slade, Srsieve, NPLB, LLR L619 Vaes, Srsieve, NPLB, LLR L620 Stevens, NPLB, LLR L621 Sutton1, Srsieve, Rieselprime, LLR L622 Cardall, Srsieve, ProthSieve, RieselSieve, LLR L623 Jaworski, Srsieve, NPLB, LLR L624 Walker2, PRP, NewPGen, LLR L627 Elliott, Srsieve, PrimeGrid, LLR L629 Schmeer, Srsieve, NPLB, LLR L631 Davis, Srsieve, NewPGen, LLR L632 Stokkedalen, Rieselprime, LLR L633 Slade, Barnes, Srsieve, NPLB, LLR L634 Ueda, TwinGen, PrimeGrid, LLR L635 Vogel, Srsieve, PrimeGrid, LLR L636 Jordan, Rieselprime, LLR L637 DeTroia, PRP, OpenPFGW, NewPGen, LLR L639 Depereyra, Srsieve, Rieselprime, LLR L643 DeRidder, TwinGen, PrimeGrid, LLR L644 Gunn, Srsieve, NPLB, LLR L645 Luhn, LLR L646 Strang, Srsieve, PrimeGrid, LLR L647 Micheli, NewPGen, Proth.exe, LLR L648 Poisson, Srsieve, PrimeGrid, LLR L649 Champ, Srsieve, PrimeGrid, LLR L651 Courty, Srsieve, PrimeGrid, LLR L652 Wu_T, NewPGen, LLR L653 McArthur, Srsieve, NPLB, LLR L654 Dickinson, Srsieve, PrimeGrid, LLR L655 Englund, Srsieve, PrimeGrid, LLR L656 Yama, Srsieve, PrimeGrid, LLR L657 Platzer1, Srsieve, NPLB, LLR L658 Birnie, Srsieve, PrimeGrid, LLR L661 Adolfsson, Srsieve, PrimeGrid, LLR L665 Yakovlev, Srsieve, PrimeGrid, LLR L667 Riesen, NewPGen, LLR L668 Ueda, Srsieve, PrimeGrid, LLR L669 Harvey, Srsieve, PrimeGrid, LLR L670 McKibbon, Srsieve, PrimeGrid, LLR L671 Wong, Srsieve, PrimeGrid, LLR L672 Hron, Srsieve, PrimeGrid, LLR L673 Samidoost, Srsieve, PrimeGrid, LLR L674 Steine, Srsieve, PrimeGrid, LLR L675 Yuki, Srsieve, PrimeGrid, LLR L676 Slatkevicius, Srsieve, PrimeGrid, LLR L677 Mendrik, Srsieve, PrimeGrid, LLR L678 Burt, Srsieve, PrimeGrid, LLR L679 Foody, Srsieve, PrimeGrid, LLR L680 Ziebell, Srsieve, PrimeGrid, LLR L681 Tibbott, Srsieve, PrimeGrid, LLR L683 Milbrandt, Srsieve, PrimeGrid, LLR L684 Fries, Srsieve, PrimeGrid, LLR L685 Weis, Srsieve, PrimeGrid, LLR L687 Slomma, Srsieve, PrimeGrid, LLR L689 Brown1, Srsieve, PrimeGrid, LLR L690 Cholt, Srsieve, PrimeGrid, LLR L691 Chambers, Srsieve, PrimeGrid, LLR L692 Rickard, Srsieve, PrimeGrid, LLR L693 Schoefer, Srsieve, PrimeGrid, LLR L694 Stockalis, Srsieve, PrimeGrid, LLR L695 Vonck, Rieselprime, LLR L696 Nicol, Srsieve, NPLB, LLR L697 Kloska1, Srsieve, NPLB, LLR L698 Lody, Srsieve, NPLB, LLR L700 Luckham, Srsieve, NPLB, LLR L701 Davies, Srsieve, NPLB, LLR L702 Wood_D, Srsieve, PrimeGrid, LLR L705 Chaton, Srsieve, PrimeGrid, LLR L707 Dinkel, Srsieve, PrimeGrid, LLR L708 Ballentyne, Srsieve, PrimeGrid, LLR L709 Rudnik, Srsieve, PrimeGrid, LLR L710 Desmond, Srsieve, PrimeGrid, LLR L711 Smith3, Srsieve, PrimeGrid, LLR L712 Bergman, Srsieve, PrimeGrid, LLR L713 Ingram, Srsieve, PrimeGrid, LLR L714 Sunderland, Srsieve, PrimeGrid, LLR L715 Schoenrogge, Srsieve, PrimeGrid, LLR L716 AparisiHermoso, Srsieve, PrimeGrid, LLR L717 Laluk, Srsieve, PrimeGrid, LLR L719 Suchi, Srsieve, PrimeGrid, LLR L721 Parker, Srsieve, PrimeGrid, LLR L722 Bulka, Rodenkirch, TwinGen, PrimeGrid, LLR L723 Chu, Srsieve, PrimeGrid, LLR L725 Moody, Srsieve, PrimeGrid, LLR L726 Johnson2, Srsieve, PrimeGrid, LLR L727 James, Srsieve, PrimeGrid, LLR L728 Usai, Srsieve, PrimeGrid, LLR L729 Hill1, Srsieve, PrimeGrid, LLR L731 Bulka, TwinGen, PrimeGrid, LLR L732 Embling, Srsieve, PrimeGrid, LLR L734 Koskinen, Srsieve, PrimeGrid, LLR L735 Morton, Srsieve, PrimeGrid, LLR L736 Byrom, Srsieve, LLR L737 Biesterbosch, Srsieve, PrimeGrid, LLR L738 Durzinsky, Srsieve, PrimeGrid, LLR L739 Snow, Srsieve, PrimeGrid, LLR L740 Wunder, Srsieve, PrimeGrid, LLR L741 Trussell, Srsieve, PrimeGrid, LLR L742 Renting, Srsieve, PrimeGrid, LLR L743 Tamasko, Srsieve, PrimeGrid, LLR L744 Brienen, Srsieve, PrimeGrid, LLR L745 Yates, Srsieve, PrimeGrid, LLR L746 Yoshida, Srsieve, PrimeGrid, LLR L747 Tuttle, Srsieve, PrimeGrid, LLR L748 Eiterig, Srsieve, PrimeGrid, LLR L749 Steinmetz, Srsieve, PrimeGrid, LLR L750 Joyner, Srsieve, PrimeGrid, LLR L751 Lachance, Srsieve, PrimeGrid, LLR L752 Sackrow, Srsieve, PrimeGrid, LLR L753 Wolfram, Srsieve, PrimeGrid, LLR L754 Codding, Srsieve, PrimeGrid, LLR L755 Brase, Srsieve, PrimeGrid, LLR L756 Pendry, Srsieve, PrimeGrid, LLR L757 Millette, Srsieve, PrimeGrid, LLR L758 Nish, Srsieve, PrimeGrid, LLR L759 Barker, Srsieve, PrimeGrid, LLR L761 Corrall, Srsieve, PrimeGrid, LLR L762 Medcalf, Srsieve, PrimeGrid, LLR L763 Rhodes, Srsieve, PrimeGrid, LLR L764 Ewing, Srsieve, PrimeGrid, LLR L765 Wagner, Srsieve, PrimeGrid, LLR L766 Nye, Srsieve, PrimeGrid, LLR L767 Cyr, Srsieve, PrimeGrid, LLR L768 Valk, Srsieve, PrimeGrid, LLR L769 Chu, Srsieve, NPLB, LLR L770 Douglass, Srsieve, PrimeGrid, LLR L771 Liberato, Srsieve, PrimeGrid, LLR L772 Pfeiffer1, Srsieve, PrimeGrid, LLR L773 Reeves, Srsieve, PrimeGrid, LLR L774 Vecchia, Srsieve, PrimeGrid, LLR L775 W�jtowicz, Srsieve, PrimeGrid, LLR L776 Guichard, Srsieve, PrimeGrid, LLR L777 Beane, Srsieve, PrimeGrid, LLR L778 Tatterson, Srsieve, PrimeGrid, LLR L779 Gilvey, Srsieve, PrimeGrid, LLR L780 Brady, Srsieve, PrimeGrid, LLR L781 Andrews1, Srsieve, PrimeGrid, LLR L782 Potter2, Srsieve, PrimeGrid, LLR L783 Turner1, Srsieve, PrimeGrid, LLR L784 Vajro, Srsieve, PrimeGrid, LLR L785 Spall, Srsieve, PrimeGrid, LLR L786 Pedigo, Srsieve, PrimeGrid, LLR L787 Wakayama, Srsieve, PrimeGrid, LLR L788 Bohlke, Srsieve, PrimeGrid, LLR L789 Little, Srsieve, PrimeGrid, LLR L790 Ferralli, Srsieve, PrimeGrid, LLR L791 Schwarz, Srsieve, PrimeGrid, LLR L792 Brand, Srsieve, PrimeGrid, LLR L793 Jones_M, Srsieve, PrimeGrid, LLR L794 Mikula, Srsieve, PrimeGrid, LLR L795 Rodriguez, Srsieve, PrimeGrid, LLR L796 Labuiga, Srsieve, PrimeGrid, LLR L797 Bouchard, Srsieve, PrimeGrid, LLR L798 Le_Bouec, Gaillard, NewPGen, LLR L800 Gilchrist, Srsieve, NPLB, LLR L801 Gesker, Gcwsieve, MultiSieve, PrimeGrid, LLR L802 Zachariassen, Srsieve, NPLB, LLR L803 Chapman, Srsieve, NPLB, LLR L804 Brown4, Srsieve, NPLB, LLR L805 Carpenter1, Srsieve, PrimeGrid, LLR L806 Stevens, Srsieve, LLR L807 Lawyer, Srsieve, NPLB, LLR L809 Russell1, Srsieve, PrimeGrid, LLR L813 Beck, Srsieve, PrimeGrid, LLR L816 Haines, Srsieve, PrimeGrid, LLR L817 Helvich, Srsieve, PrimeGrid, LLR L818 Dunlop, Srsieve, PrimeGrid, LLR L820 Morales, Srsieve, PrimeGrid, LLR L821 Reed, Srsieve, PrimeGrid, LLR L822 Marsh, Srsieve, PrimeGrid, LLR L823 Park, Srsieve, NPLB, LLR L824 Barnett, Srsieve, PrimeGrid, LLR L829 Vanklein, Srsieve, PrimeGrid, LLR L833 Saksanen, Srsieve, PrimeGrid, LLR L834 Kaiser1, Srsieve, PrimeGrid, LLR L835 Ohyanagi1, Srsieve, PrimeGrid, LLR L836 Morris, Srsieve, PrimeGrid, LLR L840 Vogel, Srsieve, Rieselprime, LLR L841 Wolven, Srsieve, PrimeGrid, LLR L843 Parker1, Srsieve, PrimeGrid, LLR L844 Sheckler, Srsieve, PrimeGrid, LLR L846 Emery, Srsieve, PrimeGrid, LLR L848 Stockmann, Srsieve, NPLB, LLR L849 Domanov, Srsieve, PrimeGrid, LLR L860 Burt, Srsieve, FreeDCPrimeSearch, LLR L862 Lody, Srsieve, FreeDCPrimeSearch, LLR L864 Blair, Srsieve, FreeDCPrimeSearch, LLR L867 Grankin, Srsieve, PrimeGrid, LLR L868 Anonymous, Srsieve, PrimeGrid, LLR L869 Schoenberger1, Srsieve, PrimeGrid, LLR L872 Gronow, Srsieve, PrimeGrid, LLR L876 Pinho, Srsieve, FreeDCPrimeSearch, LLR L877 Keller88, Srsieve, PrimeGrid, LLR L881 Thomas, Srsieve, PrimeGrid, LLR L883 Straubinger1, Srsieve, PrimeGrid, LLR L888 Moreno_A, Srsieve, PrimeGrid, LLR L891 Dinkel, TwinGen, PrimeGrid, LLR L892 Soule, Minovic, Srsieve, Rieselprime, LLR L893 Blench, Srsieve, FreeDCPrimeSearch, LLR L895 Dinkel, Srsieve, LLR L901 Gallagher, Srsieve, PrimeGrid, LLR L906 Silva, Srsieve, PrimeGrid, LLR L907 Bartholomew, Srsieve, PrimeGrid, LLR L910 Zaveri, Srsieve, NPLB, LLR L913 Roberts, Srsieve, PrimeGrid, LLR L915 Buzschwitz, Srsieve, Rieselprime, LLR L917 Bergman1, Gcwsieve, MultiSieve, PrimeGrid, LLR L919 Bielecki, Srsieve, PrimeGrid, LLR L921 Kobara, Srsieve, PrimeGrid, LLR L922 Vogel, NewPGen, PrimeGrid, LLR L923 Kaiser1, Klahn, NewPGen, PrimeGrid, TPS, SunGard, LLR L924 Kinomoto, Srsieve, PrimeGrid, LLR L926 Dick, Srsieve, PrimeGrid, LLR L927 Brown1, TwinGen, PrimeGrid, LLR L928 Cure, TwinGen, PrimeGrid, LLR L929 Hidy, TwinGen, PrimeGrid, LLR L931 Lynch1, TwinGen, PrimeGrid, LLR L932 Manganiello, Srsieve, PrimeGrid, LLR L933 Edstrom, TwinGen, PrimeGrid, LLR L934 Desmond, TwinGen, PrimeGrid, LLR L935 Klahn, TwinGen, PrimeGrid, LLR L936 Payne, TwinGen, PrimeGrid, LLR L937 Hollings, Srsieve, PrimeGrid, LLR L938 Anja, TwinGen, PrimeGrid, LLR L939 Hartel, TwinGen, PrimeGrid, LLR L940 Walker4, TwinGen, PrimeGrid, LLR L941 Silva, TwinGen, PrimeGrid, LLR L942 Schuetz, TwinGen, PrimeGrid, LLR L943 Wood_D, TwinGen, PrimeGrid, LLR L944 Pollock, TwinGen, PrimeGrid, LLR L945 Bowman, TwinGen, PrimeGrid, LLR L946 Wiesemann, Srsieve, PrimeGrid, LLR L948 Gillet, Srsieve, PrimeGrid, LLR L949 Leps, TwinGen, PrimeGrid, LLR L950 Kobara, TwinGen, PrimeGrid, LLR L951 Roberts, TwinGen, PrimeGrid, LLR L952 Crowe, TwinGen, PrimeGrid, LLR L953 Lorenz, Srsieve, PrimeGrid, LLR L954 Beran, TwinGen, PrimeGrid, LLR L955 Domanov, TwinGen, PrimeGrid, LLR L956 Engler, TwinGen, PrimeGrid, LLR L957 Rawlins, TwinGen, PrimeGrid, LLR L958 Schoefer, TwinGen, PrimeGrid, LLR L959 Cordeiro, TwinGen, PrimeGrid, LLR L961 Pitts, TwinGen, PrimeGrid, LLR L963 Koskinen, TwinGen, PrimeGrid, LLR L964 Nascimento, TwinGen, PrimeGrid, LLR L965 Klaussen1, TwinGen, PrimeGrid, LLR L966 Slomma, TwinGen, PrimeGrid, LLR L967 Courty, TwinGen, PrimeGrid, LLR L968 Fredriksen, Srsieve, PrimeGrid, LLR L969 Cassez, TwinGen, PrimeGrid, LLR L970 Schadeli1, TwinGen, PrimeGrid, LLR L971 Auer, TwinGen, PrimeGrid, LLR L973 Lorenz, TwinGen, PrimeGrid, LLR L974 VanSickle, TwinGen, PrimeGrid, LLR L975 Hnizdil, TwinGen, PrimeGrid, LLR L976 Persch, Srsieve, PrimeGrid, LLR L977 Richard1, TwinGen, PrimeGrid, LLR L978 Schatte, TwinGen, PrimeGrid, LLR L979 Pilarski, TwinGen, PrimeGrid, LLR L980 Garrison, TwinGen, PrimeGrid, LLR L981 Seppala, TwinGen, PrimeGrid, LLR L982 Kaiser1, TwinGen, PrimeGrid, LLR L983 Wu_T, LLR L984 Sjoberg, TwinGen, PrimeGrid, LLR L985 Presley, TwinGen, PrimeGrid, LLR L986 Chamouleau, TwinGen, PrimeGrid, LLR L987 Gallagher, TwinGen, PrimeGrid, LLR L988 Kairl, TwinGen, PrimeGrid, LLR L989 Cavecchia, TwinGen, PrimeGrid, LLR L990 Uehara1, TwinGen, PrimeGrid, LLR L991 Garbarenko, TwinGen, PrimeGrid, LLR L992 Vandaele, TwinGen, PrimeGrid, LLR L993 Harvey1, TwinGen, PrimeGrid, LLR L994 Bougneit, TwinGen, PrimeGrid, LLR L995 Kindarji, TwinGen, PrimeGrid, LLR L996 Becking, Srsieve, PrimeGrid, LLR L997 Anonymous, TwinGen, PrimeGrid, LLR L998 TwinGen, PrimeGrid, SunGard, LLR L999 Schick, TwinGen, PrimeGrid, LLR L1000 Becking, TwinGen, PrimeGrid, LLR L1001 McElvain, TwinGen, PrimeGrid, LLR L1002 Richard1, Srsieve, PrimeGrid, LLR L1004 Siegrist, Srsieve, PrimeGrid, LLR L1005 Witt, TwinGen, PrimeGrid, LLR L1006 Mihrmeister, TwinGen, PrimeGrid, LLR L1007 Ricciardelli, TwinGen, PrimeGrid, LLR L1008 Fries, TwinGen, PrimeGrid, LLR L1009 McKibbon, TwinGen, PrimeGrid, LLR L1010 Koyama, Srsieve, PrimeGrid, LLR L1011 Cisler, Srsieve, PrimeGrid, LLR L1012 Pan, TwinGen, PrimeGrid, LLR L1013 Morinaga, Srsieve, PrimeGrid, LLR L1014 Nicodemus, Srsieve, PrimeGrid, LLR L1015 Okubo, Srsieve, PrimeGrid, LLR L1016 Hartel, Srsieve, PrimeGrid, LLR L1017 Bohl, Srsieve, PrimeGrid, LLR L1018 Walker4, Srsieve, PrimeGrid, LLR L1019 Fredriksen, TwinGen, PrimeGrid, LLR L1020 Zutter, Srsieve, PrimeGrid, LLR L1021 Steikert, Srsieve, PrimeGrid, LLR L1022 Webster, Srsieve, PrimeGrid, LLR L1023 John, Srsieve, PrimeGrid, LLR L1024 Goral, Srsieve, PrimeGrid, LLR L1025 Alexander, Srsieve, PrimeGrid, LLR L1026 Wallin, Srsieve, PrimeGrid, LLR L1027 Zalewski, Srsieve, PrimeGrid, LLR L1028 Haesslich, Srsieve, PrimeGrid, LLR L1029 Ritter1, Srsieve, PrimeGrid, LLR L1030 Kriz, Srsieve, PrimeGrid, LLR L1031 Bauer, Srsieve, PrimeGrid, LLR L1032 Walczak, Srsieve, PrimeGrid, LLR L1033 VanderVeen, Srsieve, PrimeGrid, LLR L1034 Garbarenko, Srsieve, PrimeGrid, LLR L1035 Pletsch, Srsieve, PrimeGrid, LLR L1036 England, Srsieve, PrimeGrid, LLR L1037 Martin2, Srsieve, PrimeGrid, LLR L1038 Onodera, Srsieve, PrimeGrid, LLR L1039 Splain, Srsieve, PrimeGrid, LLR L1040 Czirpka, Srsieve, PrimeGrid, LLR L1041 Bonthuis, Srsieve, PrimeGrid, LLR L1042 Niklas, Srsieve, PrimeGrid, LLR L1043 Abraham1, Srsieve, PrimeGrid, LLR L1044 Kohne, Srsieve, PrimeGrid, LLR L1045 Canje, Srsieve, PrimeGrid, LLR L1046 Scullin, Srsieve, PrimeGrid, LLR L1047 Layec, Srsieve, PrimeGrid, LLR L1048 Frith, Srsieve, PrimeGrid, LLR L1049 Gillaspy, Srsieve, PrimeGrid, LLR L1050 Klausing, Srsieve, PrimeGrid, LLR L1051 BaratLeloup, Srsieve, PrimeGrid, LLR L1052 Klein1, Srsieve, PrimeGrid, LLR L1053 Puck, Srsieve, PrimeGrid, LLR L1054 Koczubik, Srsieve, PrimeGrid, LLR L1055 Heindl, Srsieve, PrimeGrid, LLR L1056 Schwieger, Srsieve, PrimeGrid, LLR L1057 Ferguson, Srsieve, PrimeGrid, LLR L1058 Huggett, Srsieve, PrimeGrid, LLR L1059 Thompson2, Srsieve, PrimeGrid, LLR L1060 Imai, Srsieve, PrimeGrid, LLR L1061 Borgne, Srsieve, PrimeGrid, LLR L1062 Mattiszik, Srsieve, PrimeGrid, LLR L1063 Adams1, Srsieve, PrimeGrid, LLR L1064 Benz, TwinGen, PrimeGrid, LLR L1065 Gockel, Srsieve, PrimeGrid, LLR L1066 Senftleben, Srsieve, PrimeGrid, LLR L1067 Shearman, Srsieve, PrimeGrid, LLR L1068 Kuchler, Srsieve, PrimeGrid, LLR L1069 Fahlenkamp1, Srsieve, PrimeGrid, LLR L1070 Sheckler, TwinGen, PrimeGrid, LLR L1071 Radke, Srsieve, PrimeGrid, LLR L1072 Hodel, Srsieve, PrimeGrid, LLR L1073 Smith4, Srsieve, PrimeGrid, LLR L1074 Grandy, Srsieve, PrimeGrid, LLR L1075 Harvey1, Srsieve, PrimeGrid, LLR L1076 Kirsten, Srsieve, PrimeGrid, LLR L1077 Iwasaki, Srsieve, PrimeGrid, LLR L1078 Nicholls1, Srsieve, PrimeGrid, LLR L1079 McGregor, Srsieve, PrimeGrid, LLR L1080 Schell, Srsieve, PrimeGrid, LLR L1081 Loshak1, Srsieve, PrimeGrid, LLR L1082 Millette, TwinGen, PrimeGrid, LLR L1083 Asao1, Srsieve, PrimeGrid, LLR L1084 Winter, Srsieve, PrimeGrid, LLR L1085 Kiyomiya, Srsieve, PrimeGrid, LLR L1086 Hopman, Srsieve, PrimeGrid, LLR L1087 Grafton, TwinGen, PrimeGrid, LLR L1088 Stevens1, Srsieve, PrimeGrid, LLR L1089 Brouwers, Srsieve, PrimeGrid, LLR L1090 Chambers1, TwinGen, PrimeGrid, LLR L1091 Balza, Srsieve, PrimeGrid, LLR L1092 Izuhara, Srsieve, PrimeGrid, LLR L1093 Anderson1, Srsieve, PrimeGrid, LLR L1094 Steen, Srsieve, PrimeGrid, LLR L1095 Baca, Srsieve, PrimeGrid, LLR L1096 Woodward, Srsieve, PrimeGrid, LLR L1097 Anja, Srsieve, PrimeGrid, LLR L1098 Patterson, Srsieve, PrimeGrid, LLR L1099 VanOs, Srsieve, PrimeGrid, LLR L1100 Dressner, NewPGen, LLR L1101 Gouge, TwinGen, PrimeGrid, LLR L1102 Borovsky1, Srsieve, PrimeGrid, LLR L1103 Elliott1, Srsieve, PrimeGrid, LLR L1104 Gusynin, Srsieve, PrimeGrid, LLR L1105 Sch�pstuhl, Srsieve, PrimeGrid, LLR L1106 Jung1, Srsieve, PrimeGrid, LLR L1107 Klaus, Srsieve, PrimeGrid, SGBooster1, LLR L1108 Hron, TwinGen, PrimeGrid, LLR L1109 Busler, Srsieve, PrimeGrid, LLR L1110 Yooil1, Srsieve, PrimeGrid, LLR L1111 Jeancolas, TwinGen, PrimeGrid, LLR L1112 Gilchrist, FreeDCPrimeSearch, LLR L1113 Sobczyk, TwinGen, PrimeGrid, LLR M Morain M1 Mayer, Mihailescu MC McCranie, Proth.exe MM Morii O Oakes p3 Dohmen, OpenPFGW p5 Jobling, OpenPFGW p8 Caldwell, OpenPFGW p12 Water, OpenPFGW p16 Heuer, OpenPFGW p21 Anderson, Robinson, OpenPFGW p26 Bell, OpenPFGW p35 Augustin, NewPGen, OpenPFGW p38 Ecob, OpenPFGW p41 Luhn, OpenPFGW p42 Oakes, OpenPFGW p43 Fougeron, OpenPFGW p44 Broadhurst, OpenPFGW p48 Binnekamp, OpenPFGW p49 Berg, OpenPFGW p54 Water, Broadhurst, OpenPFGW p58 Glover, Oakes, OpenPFGW p62 Underwood, PrimeForm_egroup, OpenPFGW p65 DavisK, Kuosa, OpenPFGW p72 Caldwell, ForEis, PhiSieve, PIES, OpenPFGW p73 Fougeron, Rosenthal, OpenPFGW p76 Samidoost, PRP, NewPGen, OpenPFGW p77 Harvey, MultiSieve, GenWoodall, OpenPFGW p85 Marchal, Carmody, Kuosa, OpenPFGW p86 Cousins, TwinGen, PRP, PSearch, OpenPFGW p89 Emmanuel, OpenPFGW p90 Brown_Ian, OpenPFGW p92 Kapek, OpenPFGW p94 Angel, Jobling, Augustin, NewPGen, OpenPFGW p97 Andersen, OpenPFGW p100 Underbakke, Carmody, PRP, NewPGen, OpenPFGW p102 Underwood, Frind, OpenPFGW p103 Harvey, MultiSieve, OpenPFGW p108 Sun, OpenPFGW p113 Anderegg, OpenPFGW p114 Samidoost, FermFact, PRP, OpenPFGW p116 Eaton, NewPGen, OpenPFGW p117 Rodenkirch, MultiSieve, GenWoodall, OpenPFGW p119 Harvey, MultiSieve, MultiF, OpenPFGW p120 Minovic, MultiSieve, GenWoodall, OpenPFGW p122 Sun, PRP, NewPGen, OpenPFGW p126 Minovic, MultiSieve, OpenPFGW p133 Sun, NewPGen, OpenPFGW p135 Heuer, PRP, NewPGen, OpenPFGW p147 Ayuchan, PRP, NewPGen, OpenPFGW p148 Yama, Noda, Nohara, PRP, NewPGen, MatGFN, OpenPFGW p151 Kubota, NewPGen, OpenPFGW p152 Harvey, PRP, NewPGen, OpenPFGW p154 Sakai, OpenPFGW p155 DavisK, NewPGen, OpenPFGW p156 Murata, Noda, Nohara, PRP, NewPGen, MatGFN, OpenPFGW p157 P_Ba, De_Geest, Rivera, OpenPFGW p158 Paridon, NewPGen, OpenPFGW p160 Ayuchan, AthGFNSieve, OpenPFGW p161 Harvey, FermFact, OpenPFGW p162 AndersonM, Grobstich, Broadhurst, OpenPFGW p164 Morain, Broadhurst, OpenPFGW p166 Yamada, Noda, Nohara, PRP, NewPGen, MatGFN, OpenPFGW p168 Cami, OpenPFGW p169 Eaton, PRP, NewPGen, OpenPFGW p179 DavisK, APTreeSieve, OpenPFGW p185 Carmody, Ksieve, Tetradic, OpenPFGW p188 Masser, PRP, NewPGen, Riesel5, OpenPFGW p189 Bohanon, LLR, OpenPFGW p190 DiMaria, NewPGen, OpenPFGW p191 Rosink, MultiSieve, OpenPFGW p193 Irvine, Broadhurst, Primo, OpenPFGW p194 Soule, NewPGen, OpenPFGW p196 Masser, Srsieve, PRP, Riesel5, OpenPFGW p197 Sakai, PRP, NewPGen, OpenPFGW p199 Broadhurst, NewPGen, OpenPFGW p200 Soule, LLR, NewPGen, OpenPFGW p204 Lucas, Srsieve, PRP, Riesel5, OpenPFGW p212 Pinho, Srsieve, PRP, Riesel5, OpenPFGW p214 Bird, Srsieve, PRP, Riesel5, OpenPFGW p215 Lody, Srsieve, PRP, Riesel5, OpenPFGW p217 Rodenkirch, 3Ps, Srsieve, CRUS, OpenPFGW p218 Minovic, NewPGen, OpenPFGW p219 Samidoost, FermFact, LLR, OpenPFGW p221 AndersonLee, NewPGen, OpenPFGW p224 Over, Srsieve, PRP, Riesel5, OpenPFGW p225 Benson1, Srsieve, PRP, Riesel5, OpenPFGW p227 Harvey, Srsieve, PRP, OpenPFGW p228 Jaworski, Srsieve, PRP, OpenPFGW p229 Zhou, PRP, NewPGen, OpenPFGW p231 Petat, Srsieve, PRP, CRUS, OpenPFGW p232 Gunn, Srsieve, PRP, Riesel5, OpenPFGW p234 Reynolds, Gcwsieve, PRP, GenWoodall, OpenPFGW p235 Bedwell, OpenPFGW p236 Cooper, PRP, NewPGen, OpenPFGW p237 Platzer1, Gcwsieve, 3Ps, GenWoodall, OpenPFGW p238 Dettweiler, 3Ps, Srsieve, CRUS, OpenPFGW p239 Koen, MultiSieve, GenWoodall, OpenPFGW p240 Harvey, FermFact, LLR, OpenPFGW p241 Harvey, Srsieve, LLR, PrimeGrid, OpenPFGW p242 Rodenkirch, Gcwsieve, 3Ps, MultiSieve, GenWoodall, OpenPFGW p243 Harvey, Gcwsieve, MultiSieve, LLR, OpenPFGW p244 Gunn, 3Ps, Srsieve, CRUS, OpenPFGW p246 Rodenkirch, Srsieve, LLR, Riesel5, OpenPFGW p249 Makarchuk, LLR, OpenPFGW p252 Oakes, NewPGen, OpenPFGW p253 Barnes, 3Ps, Srsieve, CRUS, OpenPFGW p254 Vogel, Srsieve, CRUS, OpenPFGW p255 Siemelink, Srsieve, CRUS, OpenPFGW p256 Chatfield, 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 PM Mihailescu S Slowinski SB1 Gibson, Proth.exe, SB, PRP SB10 Agafonov, SoBSieve, ProthSieve, Ksieve, Proth.exe, SB, PRP SB11 Sunde, SoBSieve, ProthSieve, Ksieve, Proth.exe, SB, PRP SB2 Burt, Proth.exe, SB, PRP SB3 Anonymous, Proth.exe, SB, PRP SB4 DiMichele, Proth.exe, SB, PRP SB5 Coels, Proth.exe, SB, PRP SB6 Sundquist, SoBSieve, ProthSieve, Ksieve, Proth.exe, SB, PRP SB7 Team_Prime_Rib, SoBSieve, ProthSieve, Ksieve, SB, PRP SB8 Gordon, SoBSieve, ProthSieve, Ksieve, Proth.exe, SB, PRP SB9 Hassler, SoBSieve, ProthSieve, Ksieve, Proth.exe, SB, PRP SG Slowinski, Gage WC Colquitt, Welsh WD Dubner, Williams, Cruncher WM Morain, Williams x13 Renze x16 Doumen, Beelen x23 Water, Renze, Broadhurst, Primo, OpenPFGW x24 Jarai_Z, Farkas, Csajbok, Kasza, Jarai x25 Water, Broadhurst, Primo, OpenPFGW x28 Iskra x33 Carmody, Water, Renze, Broadhurst, Primo, OpenPFGW x34 Caldwell, Broadhurst, OpenPFGW x36 Irvine, Carmody, Water, Renze, Broadhurst, Primo, OpenPFGW x37 Zhou, LLR x38 Broadhurst, Primo, OpenPFGW x39 Dubner, Keller, Broadhurst, Primo, OpenPFGW x40 Bedwell, Broadhurst, OpenPFGW Y Young