Small Mersenne Prime Factors (page 4715/5460)

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
15712269007	157122690071	12	~2012
15712294343	31424588687	11	~2011
15712419599	125699356793	12	~2012
15712648799	31425297599	11	~2011
15712679711	31425359423	11	~2011
15712781099	31425562199	11	~2011
15712894697	94277368183	11	~2012
15714436739	31428873479	11	~2011
15714653687	125717229497	12	~2012
15714997799	31429995599	11	~2011
15715022243	31430044487	11	~2011
15715865497	94295192983	11	~2012
15715872611	31431745223	11	~2011
15716628881	125733031049	12	~2012
15717017279	31434034559	11	~2011
15717263123	31434526247	11	~2011
15717307883	31434615767	11	~2011
15717452819	31434905639	11	~2011
15717565343	31435130687	11	~2011
15718075463	31436150927	11	~2011
15718082909	220053160727	12	~2013
15718902323	31437804647	11	~2011
15719392511	31438785023	11	~2011
15719434517	94316607103	11	~2012
15719688839	31439377679	11	~2011

Exponent	Prime Factor	Dig.	Year
15720938801	125767510409	12	~2012
15721119857	125768958857	12	~2012
15721520123	31443040247	11	~2011
15721561871	31443123743	11	~2011
15721729739	1197...061119	14	2023
15722763643	157227636431	12	~2012
15722852423	31445704847	11	~2011
15722985119	31445970239	11	~2011
15723223037	125785784297	12	~2012
15724020803	31448041607	11	~2011
15724541233	94347247399	11	~2012
15725381411	31450762823	11	~2011
15726045463	251616727409	12	~2013
15726091637	94356549823	11	~2012
15726810677	94360864063	11	~2012
15727195079	31454390159	11	~2011
15728024051	31456048103	11	~2011
15728610221	94371661327	11	~2012
15728820671	31457641343	11	~2011
15728839991	31457679983	11	~2011
15729647471	31459294943	11	~2011
15729912239	31459824479	11	~2011
15730057613	220220806583	12	~2013
15730952621	94385715727	11	~2012
15731350499	31462700999	11	~2011

Exponent	Prime Factor	Dig.	Year
15732243899	31464487799	11	~2011
15733038553	346126848167	12	~2013
15733518371	31467036743	11	~2011
15733719077	94402314463	11	~2012
15734334179	125874673433	12	~2012
15734467211	31468934423	11	~2011
15734844551	31469689103	11	~2011
15735467837	94412807023	11	~2012
15736051073	472081532191	12	~2014
15736279841	94417679047	11	~2012
15736530203	31473060407	11	~2011
15737027543	31474055087	11	~2011
15739869839	31479739679	11	~2011
15739945043	31479890087	11	~2011
15740847013	94445082079	11	~2012
15741525911	31483051823	11	~2011
15742074863	31484149727	11	~2011
15742292521	251876680337	12	~2013
15742461131	31484922263	11	~2011
15742957501	94457745007	11	~2012
15743670157	472310104711	12	~2014
15743792699	31487585399	11	~2011
15744657829	377871787897	12	~2013
15745384541	125963076329	12	~2012
15746383979	31492767959	11	~2011

Exponent	Prime Factor	Dig.	Year
15746480999	31492961999	11	~2011
15746681903	31493363807	11	~2011
15746889503	31493779007	11	~2011
15746913313	94481479879	11	~2012
15746972713	94481836279	11	~2012
15747993461	94487960767	11	~2012
15749046479	31498092959	11	~2011
15750275171	31500550343	11	~2011
15750584159	31501168319	11	~2011
15751109963	31502219927	11	~2011
15751411211	31502822423	11	~2011
15751473431	31502946863	11	~2011
15752149079	31504298159	11	~2011
15752449319	126019594553	12	~2012
15752683031	31505366063	11	~2011
15752959511	31505919023	11	~2011
15753770531	31507541063	11	~2011
15754167659	31508335319	11	~2011
15754422737	126035381897	12	~2012
15754591103	31509182207	11	~2011
15754723223	31509446447	11	~2011
15755820343	157558203431	12	~2012
15756203399	31512406799	11	~2011
15756311531	31512623063	11	~2011
15756419639	31512839279	11	~2011

5.157.210 digits

25-11-02