Small Mersenne Prime Factors (page 4434/5235)

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
10984757363	21969514727	11	~2009
10984938599	21969877199	11	~2009
10985125271	197732254879	12	~2012
10985782751	21971565503	11	~2009
10986187211	21972374423	11	~2009
10986486851	21972973703	11	~2009
10986762637	175788202193	12	~2012
10986810113	153815341583	12	~2012
10987445279	21974890559	11	~2009
10987690211	21975380423	11	~2009
10988011381	65928068287	11	~2011
10988168291	197787029239	12	~2012
10988387051	21976774103	11	~2009
10988445791	21976891583	11	~2009
10988492939	21976985879	11	~2009
10988573003	21977146007	11	~2009
10988701259	21977402519	11	~2009
10988984189	87911873513	11	~2011
10989056069	87912448553	11	~2011
10989175091	21978350183	11	~2009
10990156193	65940937159	11	~2011
10990498559	21980997119	11	~2009
10990546993	175848751889	12	~2012
10991242511	21982485023	11	~2009
10991492279	21982984559	11	~2009

Exponent	Prime Factor	Dig.	Year
10991680163	21983360327	11	~2009
10991997617	65951985703	11	~2011
10992407291	21984814583	11	~2009
10992898859	21985797719	11	~2009
10993145651	21986291303	11	~2009
10993194791	21986389583	11	~2009
10994266463	21988532927	11	~2009
10994343077	65966058463	11	~2011
10994460419	21988920839	11	~2009
10994746403	21989492807	11	~2009
10995027779	21990055559	11	~2009
10995054437	65970326623	11	~2011
10995675083	21991350167	11	~2009
10995977123	21991954247	11	~2009
10996475999	21992951999	11	~2009
10996744873	65980469239	11	~2011
10997147891	21994295783	11	~2009
10997641619	21995283239	11	~2009
10997917583	21995835167	11	~2009
10998327371	87986618969	11	~2011
10998518359	109985183591	12	~2011
10998885251	21997770503	11	~2009
10998974711	21997949423	11	~2009
10999228703	21998457407	11	~2009
10999364843	549968242151	12	~2013

Exponent	Prime Factor	Dig.	Year
10999702211	21999404423	11	~2009
11000037623	22000075247	11	~2009
11000415143	22000830287	11	~2009
11001411419	22002822839	11	~2009
11001427691	22002855383	11	~2009
11002030619	22004061239	11	~2009
11002070771	22004141543	11	~2009
11002840741	66017044447	11	~2011
11003043643	110030436431	12	~2011
11003173319	22006346639	11	~2009
11003208371	22006416743	11	~2009
11003728223	22007456447	11	~2009
11004141371	22008282743	11	~2009
11004426311	22008852623	11	~2009
11005483033	176087728529	12	~2012
11005670759	22011341519	11	~2009
11006187911	22012375823	11	~2009
11006245099	264149882377	12	~2012
11007326399	22014652799	11	~2009
11007425437	176118806993	12	~2012
11008953971	22017907943	11	~2009
11009854099	374335039367	12	~2012
11009883277	264237198649	12	~2012
11010001451	22020002903	11	~2009
11010128963	22020257927	11	~2009

Exponent	Prime Factor	Dig.	Year
11010941597	264262598329	12	~2012
11011894259	22023788519	11	~2009
11012986813	66077920879	11	~2011
11013148633	66078891799	11	~2011
11014174813	66085048879	11	~2011
11014700953	66088205719	11	~2011
11014732541	88117860329	11	~2011
11014876991	22029753983	11	~2009
11014950203	22029900407	11	~2009
11015263463	22030526927	11	~2009
11015400899	22030801799	11	~2009
11015619899	22031239799	11	~2009
11015714993	66094289959	11	~2011
11015990291	22031980583	11	~2009
11017949879	22035899759	11	~2009
11018292617	88146340937	11	~2011
11018827801	66112966807	11	~2011
11018845283	22037690567	11	~2009
11020298479	110202984791	12	~2011
11020739783	22041479567	11	~2009
11021286209	88170289673	11	~2011
11021352323	22042704647	11	~2009
11021388011	22042776023	11	~2009
11021872133	66131232799	11	~2011
11022474371	22044948743	11	~2009

4.933.056 digits

25-07-20