Small Mersenne Prime Factors (page 4373/5025)

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
15630047633	93780285799	11	~2012
15630575399	31261150799	11	~2011
15631096157	93786576943	11	~2012
15633340109	218866761527	12	~2013
15634238563	156342385631	12	~2012
15634402739	31268805479	11	~2011
15635754059	31271508119	11	~2011
15636264781	250180236497	12	~2013
15636441731	31272883463	11	~2011
15637238651	31274477303	11	~2011
15637915883	31275831767	11	~2011
15638226977	125105815817	12	~2012
15639083123	31278166247	11	~2011
15639536161	469186084831	12	~2014
15640063057	93840378343	11	~2012
15640115917	93840695503	11	~2012
15640358423	31280716847	11	~2011
15640643023	250250288369	12	~2013
15641034791	31282069583	11	~2011
15641798489	125134387913	12	~2012
15642312299	31284624599	11	~2011
15642561419	31285122839	11	~2011
15642736871	31285473743	11	~2011
15643396403	31286792807	11	~2011
15645563161	93873378967	11	~2012

Exponent	Prime Factor	Dig.	Year
15645615143	31291230287	11	~2011
15645826741	93874960447	11	~2012
15647590019	31295180039	11	~2011
15647807771	31295615543	11	~2011
15650322977	125202583817	12	~2012
15650466773	93902800639	11	~2012
15651034211	31302068423	11	~2011
15651399733	93908398399	11	~2012
15651495659	31302991319	11	~2011
15652037039	31304074079	11	~2011
15652640183	31305280367	11	~2011
15653232779	31306465559	11	~2011
15653554897	375685317529	12	~2013
15654095591	4132...360241	14	2023
15654394919	31308789839	11	~2011
15655181579	31310363159	11	~2011
15655200971	31310401943	11	~2011
15655522643	31311045287	11	~2011
15655577963	31311155927	11	~2011
15656176631	31312353263	11	~2011
15656285279	31312570559	11	~2011
15656507759	31313015519	11	~2011
15656916659	31313833319	11	~2011
15657125779	375771018697	12	~2013
15657144091	156571440911	12	~2012

Exponent	Prime Factor	Dig.	Year
15657183593	93943101559	11	~2012
15657415211	31314830423	11	~2011
15657888067	156578880671	12	~2012
15658282499	31316564999	11	~2011
15658643437	93951860623	11	~2012
15658725097	250539601553	12	~2013
15658743251	31317486503	11	~2011
15659565371	31319130743	11	~2011
15659636231	31319272463	11	~2011
15660088919	31320177839	11	~2011
15660237011	31320474023	11	~2011
15660343199	31320686399	11	~2011
15660791633	93964749799	11	~2012
15660819731	31321639463	11	~2011
15661156139	31322312279	11	~2011
15661413479	31322826959	11	~2011
15661721279	31323442559	11	~2011
15661890983	31323781967	11	~2011
15662136233	93972817399	11	~2012
15662611799	31325223599	11	~2011
15663061703	31326123407	11	~2011
15664215851	31328431703	11	~2011
15664318301	93985909807	11	~2012
15664759139	31329518279	11	~2011
15665172623	31330345247	11	~2011

Exponent	Prime Factor	Dig.	Year
15665515991	31331031983	11	~2011
15665929859	31331859719	11	~2011
15666512177	125332097417	12	~2012
15666627551	31333255103	11	~2011
15666899639	31333799279	11	~2011
15667605683	31335211367	11	~2011
15667966799	31335933599	11	~2011
15669002047	156690020471	12	~2012
15669872903	31339745807	11	~2011
15669966841	94019801047	11	~2012
15670103357	94020620143	11	~2012
15671787431	31343574863	11	~2011
15672240317	219411364439	12	~2013
15672366791	31344733583	11	~2011
15673750331	31347500663	11	~2011
15673760381	94042562287	11	~2012
15673974623	31347949247	11	~2011
15674292863	31348585727	11	~2011
15675639569	125405116553	12	~2012
15675975743	31351951487	11	~2011
15675985001	125407880009	12	~2012
15676124279	31352248559	11	~2011
15676505951	31353011903	11	~2011
15678161711	31356323423	11	~2011
15678600611	31357201223	11	~2011

4.724.182 digits

25-04-13