Small Mersenne Prime Factors (page 4234/5550)

Small Mersenne Prime Factors
Prime numbers of the form M_p= 2^p − 1 are called Mersenne primes. For M_p to be prime, p must also be prime.
Any factor q of a Mersenne number 2^p − 1 must be of the form 2kp + 1, where integer k ≥ 0. Furthermore, q must be 1 or 7 mod 8.

Exponent	Prime Factor	Digits	Year
3118139639	6236279279	10	~2005
3118192039	31181920391	11	~2007
3118196699	6236393399	10	~2005
3118263779	6236527559	10	~2005
3118272803	6236545607	10	~2005
3118494571	31184945711	11	~2007
3118571591	24948572729	11	~2007
3118641221	18711847327	11	~2006
3118671203	6237342407	10	~2005
3118671581	18712029487	11	~2006
3118801199	24950409593	11	~2007
3118863431	380501338583	12	~2010
3118991951	6237983903	10	~2005
3119032867	31190328671	11	~2007
3119035631	24952285049	11	~2007
3119073731	6238147463	10	~2005
3119265203	6238530407	10	~2005
3119371511	6238743023	10	~2005
3119417831	6238835663	10	~2005
3119422951	31194229511	11	~2007
3119533883	6239067767	10	~2005
3119597161	18717582967	11	~2006
3119648681	18717892087	11	~2006
3119772619	74874542857	11	~2008
3119836813	68636409887	11	~2008

Exponent	Prime Factor	Digits	Year
3119837471	6239674943	10	~2005
3119844011	6239688023	10	~2005
3119876951	6239753903	10	~2005
3119892263	6239784527	10	~2005
3119972861	24959782889	11	~2007
3120143723	6240287447	10	~2005
3120323399	6240646799	10	~2005
3120327911	6240655823	10	~2005
3120497123	6240994247	10	~2005
3120501641	18723009847	11	~2006
3120510493	18723062959	11	~2006
3120532379	6241064759	10	~2005
3120722723	6241445447	10	~2005
3121010573	18726063439	11	~2006
3121018163	6242036327	10	~2005
3121285991	6242571983	10	~2005
3121289909	24970319273	11	~2007
3121490159	6242980319	10	~2005
3121499663	6242999327	10	~2005
3121581899	6243163799	10	~2005
3121796039	6243592079	10	~2005
3121851539	6243703079	10	~2005
3121862171	6243724343	10	~2005
3121931077	668093250479	12	~2010
3121968191	6243936383	10	~2005

Exponent	Prime Factor	Digits	Year
3122048459	6244096919	10	~2005
3122302871	6244605743	10	~2005
3122547611	6245095223	10	~2005
3122673973	49962783569	11	~2007
3122780917	93683427511	11	~2008
3122791229	24982329833	11	~2007
3123002471	6246004943	10	~2005
3123011063	6246022127	10	~2005
3123214379	6246428759	10	~2005
3123300031	49972800497	11	~2007
3123339623	6246679247	10	~2005
3123343451	6246686903	10	~2005
3123455053	18740730319	11	~2006
3123465721	18740794327	11	~2006
3123596803	31235968031	11	~2007
3123800891	6247601783	10	~2005
3124056979	31240569791	11	~2007
3124129643	6248259287	10	~2005
3124199777	74980794649	11	~2008
3124383791	6248767583	10	~2005
3124568087	24996544697	11	~2007
3124598111	6249196223	10	~2005
3124752899	6249505799	10	~2005
3124757963	6249515927	10	~2005
3124918387	124996735481	12	~2008

Exponent	Prime Factor	Digits	Year
3124948163	6249896327	10	~2005
3124961783	6249923567	10	~2005
3125156351	6250312703	10	~2005
3125271731	6250543463	10	~2005
3125273351	6250546703	10	~2005
3125302283	6250604567	10	~2005
3125348903	6250697807	10	~2005
3125531159	6251062319	10	~2005
3125614799	6251229599	10	~2005
3125749481	25005995849	11	~2007
3125887753	93776632591	11	~2008
3125917477	50014679633	11	~2007
3126015587	25008124697	11	~2007
3126087179	6252174359	10	~2005
3126121081	50017937297	11	~2007
3126278339	6252556679	10	~2005
3126392897	18758357383	11	~2006
3126555319	75037327657	11	~2008
3126603737	18759622423	11	~2006
3126606071	6253212143	10	~2005
3126658043	6253316087	10	~2005
3126841043	6253682087	10	~2005
3126845483	6253690967	10	~2005
3126868343	131328470407	12	~2008
3126983291	6253966583	10	~2005

5.247.179 digits

25-12-14