Small Mersenne Prime Factors (page 4761/5130)

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
50691436277	709680107879	12	~2017
50693793131	101387586263	12	~2015
50695367003	101390734007	12	~2015
50695787699	101391575399	12	~2015
50696882651	101393765303	12	~2015
50698302923	101396605847	12	~2015
50698576783	506985767831	12	~2016
50700408299	101400816599	12	~2015
50701154171	405609233369	12	~2016
50703291311	101406582623	12	~2015
50704632983	101409265967	12	~2015
50710165199	101420330399	12	~2015
50715167039	101430334079	12	~2015
50717264957	304303589743	12	~2016
50724124499	101448248999	12	~2015
50725003403	101450006807	12	~2015
50726271941	304357631647	12	~2016
50737467491	101474934983	12	~2015
50737710761	304426264567	12	~2016
50738224561	304429347367	12	~2016
50741824319	101483648639	12	~2015
50742343081	304454058487	12	~2016
50742715393	304456292359	12	~2016
50743692347	405949538777	12	~2016
50743719791	101487439583	12	~2015

Exponent	Prime Factor	Dig.	Year
50751629927	406013039417	12	~2016
50760722783	101521445567	12	~2015
50760796679	101521593359	12	~2015
50762098897	304572593383	12	~2016
50767056971	101534113943	12	~2015
50774741651	101549483303	12	~2015
50775312779	101550625559	12	~2015
50777283971	101554567943	12	~2015
50777577803	101555155607	12	~2015
50780289491	101560578983	12	~2015
50784974759	101569949519	12	~2015
50786894831	101573789663	12	~2015
50787557423	101575114847	12	~2015
50792438363	101584876727	12	~2015
50792921951	101585843903	12	~2015
50793182939	101586365879	12	~2015
50793896579	101587793159	12	~2015
50800973651	101601947303	12	~2015
50806894031	101613788063	12	~2015
50810317799	406482542393	12	~2016
50817121241	406536969929	12	~2016
50817806471	101635612943	12	~2015
50819101271	101638202543	12	~2015
50827140263	101654280527	12	~2015
50830457603	101660915207	12	~2015

Exponent	Prime Factor	Dig.	Year
50830994021	406647952169	12	~2016
50835108743	101670217487	12	~2015
50838943943	101677887887	12	~2015
50839662371	101679324743	12	~2015
50840040479	101680080959	12	~2015
50848567823	101697135647	12	~2015
50848877603	101697755207	12	~2015
50848884503	101697769007	12	~2015
50852625191	406821001529	12	~2016
50854309613	305125857679	12	~2016
50854620463	508546204631	12	~2016
50854811669	406838493353	12	~2016
50857653233	305145919399	12	~2016
50858294303	101716588607	12	~2015
50858885663	101717771327	12	~2015
50860061951	101720123903	12	~2015
50871708059	101743416119	12	~2015
50876568719	101753137439	12	~2015
50877129791	101754259583	12	~2015
50883443519	101766887039	12	~2015
50883685571	101767371143	12	~2015
50883894311	101767788623	12	~2015
50886809663	101773619327	12	~2015
50888842079	101777684159	12	~2015
50888900411	101777800823	12	~2015

Exponent	Prime Factor	Dig.	Year
50898625331	101797250663	12	~2015
50905735871	101811471743	12	~2015
50910530687	407284245497	12	~2016
50912165231	101824330463	12	~2015
50913332621	305479995727	12	~2016
50913430873	305480585239	12	~2016
50914765883	101829531767	12	~2015
50916770759	101833541519	12	~2015
50917337171	407338697369	12	~2016
50917503037	305505018223	12	~2016
50918288381	305509730287	12	~2016
50919445469	407355563753	12	~2016
50927564063	101855128127	12	~2015
50936173703	101872347407	12	~2015
50941218491	101882436983	12	~2015
50941365911	101882731823	12	~2015
50944446671	101888893343	12	~2015
50944922783	101889845567	12	~2015
50946892751	101893785503	12	~2015
50948137421	305688824527	12	~2016
50955849397	305735096383	12	~2016
50956823279	101913646559	12	~2015
50959449337	305756696023	12	~2016
50959907777	407679262217	12	~2016
50964417587	1349...770377	15	2025

4.828.532 digits

25-06-01