Small Mersenne Prime Factors (page 4336/5025)

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
13662314717	81973888303	11	~2011
13662594623	27325189247	11	~2010
13663326983	27326653967	11	~2010
13664597831	109316782649	12	~2012
13665114227	355292969903	12	~2013
13665270683	27330541367	11	~2010
13665892211	27331784423	11	~2010
13666008899	27332017799	11	~2010
13667490371	109339922969	12	~2012
13667907371	27335814743	11	~2010
13668070259	27336140519	11	~2010
13668386279	27336772559	11	~2010
13668402179	27336804359	11	~2010
13668500663	27337001327	11	~2010
13669067459	27338134919	11	~2010
13669953133	82019718799	11	~2011
13670258471	27340516943	11	~2010
13671222269	109369778153	12	~2012
13671726437	109373811497	12	~2012
13672763759	27345527519	11	~2010
13672813571	27345627143	11	~2010
13673142251	27346284503	11	~2010
13673523131	27347046263	11	~2010
13673970899	27347941799	11	~2010
13674820199	27349640399	11	~2010

Exponent	Prime Factor	Dig.	Year
13675205717	109401645737	12	~2012
13676168183	27352336367	11	~2010
13677130807	218834092913	12	~2012
13677157691	27354315383	11	~2010
13677502417	82065014503	11	~2011
13678239073	82069434439	11	~2011
13678296059	27356592119	11	~2010
13678325291	27356650583	11	~2010
13678421093	437709474977	12	~2013
13678750259	27357500519	11	~2010
13679747111	27359494223	11	~2010
13680052471	136800524711	12	~2012
13681144343	27362288687	11	~2010
13681167869	109449342953	12	~2012
13682362871	27364725743	11	~2010
13682734693	82096408159	11	~2011
13684033093	82104198559	11	~2011
13684498673	191582981423	12	~2012
13684541777	82107250663	11	~2011
13684562519	27369125039	11	~2010
13685351627	766379691113	12	~2014
13685359199	27370718399	11	~2010
13685577959	27371155919	11	~2010
13685927939	27371855879	11	~2010
13686040811	27372081623	11	~2010

Exponent	Prime Factor	Dig.	Year
13686432731	27372865463	11	~2010
13686638879	27373277759	11	~2010
13687014983	27374029967	11	~2010
13687150283	27374300567	11	~2010
13688180113	82129080679	11	~2011
13688242619	27376485239	11	~2010
13688416691	27376833383	11	~2010
13688600819	27377201639	11	~2010
13688626823	27377253647	11	~2010
13689930251	27379860503	11	~2010
13690079999	109520639993	12	~2012
13690562939	27381125879	11	~2010
13690959671	27381919343	11	~2010
13691142071	109529136569	12	~2012
13691914763	27383829527	11	~2010
13693638071	27387276143	11	~2010
13693873139	27387746279	11	~2010
13694671717	82168030303	11	~2011
13695127343	27390254687	11	~2010
13696183103	27392366207	11	~2010
13696818197	82180909183	11	~2011
13696829759	27393659519	11	~2010
13697027471	27394054943	11	~2010
13697260847	109578086777	12	~2012
13697276471	27394552943	11	~2010

Exponent	Prime Factor	Dig.	Year
13697709713	767071743929	12	~2014
13698466421	82190798527	11	~2011
13698985463	27397970927	11	~2010
13699450931	27398901863	11	~2010
13699557719	27399115439	11	~2010
13699733291	27399466583	11	~2010
13700082443	27400164887	11	~2010
13700930051	27401860103	11	~2010
13701046277	82206277663	11	~2011
13701047051	27402094103	11	~2010
13701240659	27402481319	11	~2010
13701669659	27403339319	11	~2010
13702583579	27405167159	11	~2010
13703168579	27406337159	11	~2010
13704543613	82227261679	11	~2011
13705095913	219281534609	12	~2012
13705113743	27410227487	11	~2010
13705616159	27411232319	11	~2010
13705696859	27411393719	11	~2010
13705914197	109647313577	12	~2012
13706113691	27412227383	11	~2010
13706496599	27412993199	11	~2010
13706656021	219306496337	12	~2012
13707273071	27414546143	11	~2010
13707571931	27415143863	11	~2010

4.724.182 digits

25-04-13