Small Mersenne Prime Factors (page 5060/5490)

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
48974623163	97949246327	11	~2015
48974932651	489749326511	12	~2016
48978974963	97957949927	11	~2015
48980994791	97961989583	11	~2015
48982809193	293896855159	12	~2016
48988976759	97977953519	11	~2015
48991547771	97983095543	11	~2015
48992126279	97984252559	11	~2015
48993614759	97987229519	11	~2015
48996183241	293977099447	12	~2016
48996458831	97992917663	11	~2015
49003099559	392024796473	12	~2016
49003667099	98007334199	11	~2015
49005926939	98011853879	11	~2015
49010158679	98020317359	11	~2015
49012300163	98024600327	11	~2015
49013322311	98026644623	11	~2015
49014954077	294089724463	12	~2016
49016378219	98032756439	11	~2015
49017129263	98034258527	11	~2015
49020856091	98041712183	11	~2015
49020963443	98041926887	11	~2015
49022024819	98044049639	11	~2015
49024343591	98048687183	11	~2015
49025710379	98051420759	11	~2015

Exponent	Prime Factor	Dig.	Year
49027066987	490270669871	12	~2016
49027214399	98054428799	11	~2015
49028329529	686396613407	12	~2017
49032102071	98064204143	11	~2015
49032546071	98065092143	11	~2015
49033907953	294203447719	12	~2016
49034909323	490349093231	12	~2016
49035746663	98071493327	11	~2015
49038127739	98076255479	11	~2015
49050011603	98100023207	11	~2015
49050119819	98100239639	11	~2015
49050762647	392406101177	12	~2016
49051104383	98102208767	11	~2015
49053220091	98106440183	11	~2015
49053713627	392429709017	12	~2016
49054535399	98109070799	11	~2015
49056597533	686792365463	12	~2017
49057333777	294344002663	12	~2016
49057581451	784921303217	12	~2017
49057882619	98115765239	11	~2015
49060066739	98120133479	11	~2015
49062901117	294377406703	12	~2016
49064246249	392513969993	12	~2016
49065233543	98130467087	11	~2015
49068000853	294408005119	12	~2016

Exponent	Prime Factor	Dig.	Year
49073140211	98146280423	11	~2015
49074016559	98148033119	11	~2015
49074308243	98148616487	11	~2015
49074811811	2179...064463	15	2023
49076318939	98152637879	11	~2015
49080008891	98160017783	11	~2015
49084108027	490841080271	12	~2016
49089773951	98179547903	11	~2015
49091039819	2474...068777	14	2025
49092224183	98184448367	11	~2015
49094260217	687319643039	12	~2017
49097978533	785567656529	12	~2017
49098950759	98197901519	11	~2015
49099374503	98198749007	11	~2015
49101934499	98203868999	11	~2015
49103092897	294618557383	12	~2016
49104477659	98208955319	11	~2015
49105178819	98210357639	11	~2015
49106241791	392849934329	12	~2016
49109474801	294656848807	12	~2016
49109506571	98219013143	11	~2015
49111823003	98223646007	11	~2015
49111857383	98223714767	11	~2015
49120071311	392960570489	12	~2016
49120698479	98241396959	11	~2015

Exponent	Prime Factor	Dig.	Year
49124759819	98249519639	11	~2015
49125365699	98250731399	11	~2015
49126538231	98253076463	11	~2015
49127486879	98254973759	11	~2015
49129338983	98258677967	11	~2015
49131637679	98263275359	11	~2015
49132647383	98265294767	11	~2015
49133140739	98266281479	11	~2015
49133644403	98267288807	11	~2015
49136486939	98272973879	11	~2015
49137691523	98275383047	11	~2015
49137761243	98275522487	11	~2015
49139362757	294836176543	12	~2016
49139428141	294836568847	12	~2016
49145207879	98290415759	11	~2015
49145801819	98291603639	11	~2015
49147773443	98295546887	11	~2015
49148222723	98296445447	11	~2015
49150190123	98300380247	11	~2015
49157102639	98314205279	11	~2015
49157748851	98315497703	11	~2015
49160695163	98321390327	11	~2015
49160988421	786575814737	12	~2017
49161888977	393295111817	12	~2016
49163521777	294981130663	12	~2016

5.187.277 digits

25-11-17