Small Mersenne Prime Factors (page 4788/5190)

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
45780634859	91561269719	11	~2014
45785649251	91571298503	11	~2014
45788503811	91577007623	11	~2014
45788587991	91577175983	11	~2014
45792513731	91585027463	11	~2014
45802868623	732845897969	12	~2016
45804770699	91609541399	11	~2014
45806968583	91613937167	11	~2014
45808354463	91616708927	11	~2014
45809670479	91619340959	11	~2014
45809782883	91619565767	11	~2014
45810572123	91621144247	11	~2014
45812680811	91625361623	11	~2014
45815380139	91630760279	11	~2014
45816106211	91632212423	11	~2014
45818676221	274912057327	12	~2015
45819358583	91638717167	11	~2014
45820109063	91640218127	11	~2014
45820956059	91641912119	11	~2014
45827652323	91655304647	11	~2014
45835117199	91670234399	11	~2014
45836476561	2420...624209	14	2024
45836963279	91673926559	11	~2014
45838522739	91677045479	11	~2014
45839857379	91679714759	11	~2014

Exponent	Prime Factor	Dig.	Year
45841697963	91683395927	11	~2014
45842959223	91685918447	11	~2014
45843604571	91687209143	11	~2014
45844007483	91688014967	11	~2014
45845140163	91690280327	11	~2014
45845843819	91691687639	11	~2014
45847242923	91694485847	11	~2014
45848207711	91696415423	11	~2014
45851443679	91702887359	11	~2014
45852835751	91705671503	11	~2014
45856066799	91712133599	11	~2014
45857292671	91714585343	11	~2014
45859400579	91718801159	11	~2014
45866987651	91733975303	11	~2014
45870149519	91740299039	11	~2014
45873760511	91747521023	11	~2014
45875145611	91750291223	11	~2014
45875359667	367002877337	12	~2016
45877059731	91754119463	11	~2014
45879946109	367039568873	12	~2016
45885247697	367081981577	12	~2016
45886865699	6827...160113	14	2023
45889921331	91779842663	11	~2014
45890622839	91781245679	11	~2014
45891853391	91783706783	11	~2014

Exponent	Prime Factor	Dig.	Year
45893703743	91787407487	11	~2014
45895787323	734332597169	12	~2016
45897535199	91795070399	11	~2014
45900045491	91800090983	11	~2014
45906325631	91812651263	11	~2014
45909591659	91819183319	11	~2014
45909929603	91819859207	11	~2014
45910284493	275461706959	12	~2015
45910923263	91821846527	11	~2014
45915282901	275491697407	12	~2015
45915359999	91830719999	11	~2014
45915682229	367325457833	12	~2016
45916079483	91832158967	11	~2014
45917408639	91834817279	11	~2014
45917967899	91835935799	11	~2014
45920595923	91841191847	11	~2014
45924758857	3517...284463	14	2023
45926620699	459266206991	12	~2016
45929549411	91859098823	11	~2014
45934315403	91868630807	11	~2014
45934357823	91868715647	11	~2014
45936592631	91873185263	11	~2014
45936771191	367494169529	12	~2016
45937406041	275624436247	12	~2015
45940084871	91880169743	11	~2014

Exponent	Prime Factor	Dig.	Year
45940664717	367525317737	12	~2016
45941410199	91882820399	11	~2014
45941658839	1871...110087	15	2023
45942343283	91884686567	11	~2014
45945664559	91891329119	11	~2014
45949903201	275699419207	12	~2015
45950347193	275702083159	12	~2015
45952873633	275717241799	12	~2015
45954285317	275725711903	12	~2015
45961474723	459614747231	12	~2016
45964883383	735438134129	12	~2017
45965462351	91930924703	11	~2014
45967342511	91934685023	11	~2014
45968554823	91937109647	11	~2014
45969061091	91938122183	11	~2014
45976074359	91952148719	11	~2014
45980381563	459803815631	12	~2016
45981805679	91963611359	11	~2014
45982101479	91964202959	11	~2014
45982912051	735726592817	12	~2017
45983443211	91966886423	11	~2014
45985207811	91970415623	11	~2014
45985587863	91971175727	11	~2014
45987004163	91974008327	11	~2014
45987814273	275926885639	12	~2015

4.888.230 digits

25-06-29