Small Mersenne Prime Factors (page 4453/5130)

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	Dig.	Year
15480948803	30961897607	11	~2011
15481065757	92886394543	11	~2012
15481324753	92887948519	11	~2012
15481617659	30963235319	11	~2011
15483253733	92899522399	11	~2012
15484018919	30968037839	11	~2011
15484172519	30968345039	11	~2011
15484709939	30969419879	11	~2011
15484881911	30969763823	11	~2011
15485130491	30970260983	11	~2011
15485460181	92912761087	11	~2012
15485811701	123886493609	12	~2012
15486033763	154860337631	12	~2012
15486542417	92919254503	11	~2012
15487813499	30975626999	11	~2011
15488054831	30976109663	11	~2011
15488087281	92928523687	11	~2012
15488546159	30977092319	11	~2011
15490322581	92941935487	11	~2012
15490512967	154905129671	12	~2012
15490526351	30981052703	11	~2011
15490639477	92943836863	11	~2012
15491776403	30983552807	11	~2011
15491803237	247868851793	12	~2013
15492041021	123936328169	12	~2012

Exponent	Prime Factor	Dig.	Year
15492565499	30985130999	11	~2011
15493034591	30986069183	11	~2011
15494898539	30989797079	11	~2011
15495262199	30990524399	11	~2011
15495315701	92971894207	11	~2012
15496332011	30992664023	11	~2011
15498351887	123986815097	12	~2012
15499964783	30999929567	11	~2011
15500293967	372007055209	12	~2013
15500323991	31000647983	11	~2011
15500586131	31001172263	11	~2011
15501720833	93010324999	11	~2012
15502437551	31004875103	11	~2011
15502495111	155024951111	12	~2012
15502582031	31005164063	11	~2011
15504046127	124032369017	12	~2012
15505368743	31010737487	11	~2011
15506237063	31012474127	11	~2011
15506981279	31013962559	11	~2011
15507162491	31014324983	11	~2011
15507172223	31014344447	11	~2011
15507663131	31015326263	11	~2011
15507825497	93046952983	11	~2012
15508954091	31017908183	11	~2011
15509768231	31019536463	11	~2011

Exponent	Prime Factor	Dig.	Year
15509866147	248157858353	12	~2013
15510030083	31020060167	11	~2011
15510837239	31021674479	11	~2011
15510869303	31021738607	11	~2011
15511329479	31022658959	11	~2011
15512096651	31024193303	11	~2011
15513248203	155132482031	12	~2012
15514285097	93085710583	11	~2012
15514566323	31029132647	11	~2011
15514606319	31029212639	11	~2011
15515381951	31030763903	11	~2011
15517230191	31034460383	11	~2011
15518119013	93108714079	11	~2012
15518304233	93109825399	11	~2012
15518434021	93110604127	11	~2012
15518653169	372447676057	12	~2013
15519543269	589742644223	12	~2014
15520871383	620834855321	12	~2014
15520977371	31041954743	11	~2011
15521055839	31042111679	11	~2011
15523256579	31046513159	11	~2011
15523276739	31046553479	11	~2011
15523516499	31047032999	11	~2011
15524522159	31049044319	11	~2011
15525204419	31050408839	11	~2011

Exponent	Prime Factor	Dig.	Year
15525239759	31050479519	11	~2011
15525483731	31050967463	11	~2011
15525867719	31051735439	11	~2011
15527085443	31054170887	11	~2011
15528034271	31056068543	11	~2011
15528325277	93169951663	11	~2012
15531593219	31063186439	11	~2011
15531621971	31063243943	11	~2011
15531831817	93190990903	11	~2012
15532454681	93194728087	11	~2012
15532841477	93197048863	11	~2012
15533178293	93199069759	11	~2012
15533236811	31066473623	11	~2011
15533742773	93202456639	11	~2012
15534018683	31068037367	11	~2011
15534068533	93204411199	11	~2012
15535933859	31071867719	11	~2011
15536174561	93217047367	11	~2012
15536203619	31072407239	11	~2011
15536225233	93217351399	11	~2012
15536392211	31072784423	11	~2011
15537627551	31075255103	11	~2011
15538955039	31077910079	11	~2011
15539741909	372953805817	12	~2013
15541306751	31082613503	11	~2011

4.828.532 digits

25-06-01