Small Mersenne Prime Factors (page 5393/5775)

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
68594133911	3292...277281	14	2024
68594967491	137189934983	12	~2016
68602908299	137205816599	12	~2016
68605194937	411631169623	12	~2017
68608897583	137217795167	12	~2016
68610783383	137221566767	12	~2016
68611087439	137222174879	12	~2016
68613592163	137227184327	12	~2016
68614867511	137229735023	12	~2016
68614984157	411689904943	12	~2017
68615943023	137231886047	12	~2016
68619269363	137238538727	12	~2016
68627171339	137254342679	12	~2016
68632786811	137265573623	12	~2016
68636582291	137273164583	12	~2016
68636630663	137273261327	12	~2016
68637024581	411822147487	12	~2017
68643353081	411860118487	12	~2017
68650219129	3701...543569	15	2025
68651462543	137302925087	12	~2016
68663168807	549305350457	12	~2017
68666800459	686668004591	12	~2017
68668303331	137336606663	12	~2016
68668422191	137336844383	12	~2016
68678300363	137356600727	12	~2016

Exponent	Prime Factor	Dig.	Year
68678735843	5494...674401	14	2024
68679632831	137359265663	12	~2016
68682047251	686820472511	12	~2017
68682409391	137364818783	12	~2016
68682562919	137365125839	12	~2016
68682855443	137365710887	12	~2016
68685293903	137370587807	12	~2016
68693043959	137386087919	12	~2016
68694362903	137388725807	12	~2016
68694739271	137389478543	12	~2016
68696035679	137392071359	12	~2016
68697763811	137395527623	12	~2016
68699621233	412197727399	12	~2017
68713136963	137426273927	12	~2016
68717067911	137434135823	12	~2016
68722912283	137445824567	12	~2016
68724553211	137449106423	12	~2016
68725734503	137451469007	12	~2016
68728672643	137457345287	12	~2016
68731907339	137463814679	12	~2016
68731967891	137463935783	12	~2016
68733946973	412403681839	12	~2017
68738371853	412430231119	12	~2017
68749070111	137498140223	12	~2016
68753242331	137506484663	12	~2016

Exponent	Prime Factor	Dig.	Year
68756527667	550052221337	12	~2017
68762635031	137525270063	12	~2016
68762679017	550101432137	12	~2017
68764220621	412585323727	12	~2017
68765259863	137530519727	12	~2016
68771876291	137543752583	12	~2016
68775918779	137551837559	12	~2016
68788305923	137576611847	12	~2016
68789113091	137578226183	12	~2016
68792530739	137585061479	12	~2016
68796099901	412776599407	12	~2017
68796105551	137592211103	12	~2016
68797519991	137595039983	12	~2016
68800787603	137601575207	12	~2016
68809986923	137619973847	12	~2016
68811523139	137623046279	12	~2016
68813445013	412880670079	12	~2017
68818484939	137636969879	12	~2016
68818938299	137637876599	12	~2016
68819411183	137638822367	12	~2016
68819446919	137638893839	12	~2016
68820060563	137640121127	12	~2016
68820229559	137640459119	12	~2016
68822898383	137645796767	12	~2016
68825707961	550605663689	12	~2017

Exponent	Prime Factor	Dig.	Year
68826088451	137652176903	12	~2016
68831749631	137663499263	12	~2016
68831750521	412990503127	12	~2017
68834083561	413004501367	12	~2017
68834664541	413007987247	12	~2017
68837719997	550701759977	12	~2017
68841404977	413048429863	12	~2017
68849122031	137698244063	12	~2016
68857350203	137714700407	12	~2016
68858447039	137716894079	12	~2016
68859319979	137718639959	12	~2016
68859801971	137719603943	12	~2016
68867009339	137734018679	12	~2016
68877434663	137754869327	12	~2016
68883289031	137766578063	12	~2016
68884161539	137768323079	12	~2016
68884202531	137768405063	12	~2016
68885181923	137770363847	12	~2016
68888194499	137776388999	12	~2016
68888228663	137776457327	12	~2016
68888306183	137776612367	12	~2016
68888639399	137777278799	12	~2016
68891011577	413346069463	12	~2017
68891034083	137782068167	12	~2016
68895473411	137790946823	12	~2016

5.471.290 digits

26-03-29