Small Mersenne Prime Factors (page 4596/5070)

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
31629663419	63259326839	11	~2013
31630635481	695873980583	12	~2016
31632091703	63264183407	11	~2013
31633750667	253070005337	12	~2014
31634873639	63269747279	11	~2013
31636465331	63272930663	11	~2013
31636816091	63273632183	11	~2013
31637837579	63275675159	11	~2013
31640060723	63280121447	11	~2013
31641966599	63283933199	11	~2013
31642221911	63284443823	11	~2013
31642492543	316424925431	12	~2015
31644394091	63288788183	11	~2013
31646444699	63292889399	11	~2013
31646635333	189879811999	12	~2014
31648728983	63297457967	11	~2013
31649023157	189894138943	12	~2014
31650281023	506404496369	12	~2015
31650414083	63300828167	11	~2013
31652364881	189914189287	12	~2014
31652864843	63305729687	11	~2013
31652948387	569753070967	12	~2015
31653767213	189922603279	12	~2014
31654447837	189926687023	12	~2014
31656668623	316566686231	12	~2015

Exponent	Prime Factor	Dig.	Year
31656848159	63313696319	11	~2013
31657122851	63314245703	11	~2013
31660934423	63321868847	11	~2013
31662452819	63324905639	11	~2013
31664902211	63329804423	11	~2013
31666249031	63332498063	11	~2013
31668120079	316681200791	12	~2015
31668514019	63337028039	11	~2013
31670819651	63341639303	11	~2013
31670896571	63341793143	11	~2013
31672997123	63345994247	11	~2013
31673223143	63346446287	11	~2013
31673318221	190039909327	12	~2014
31673385911	63346771823	11	~2013
31676990633	760247775193	12	~2016
31677122999	253416983993	12	~2014
31678799843	63357599687	11	~2013
31679170223	63358340447	11	~2013
31682424857	190094549143	12	~2014
31683029377	190098176263	12	~2014
31686360899	63372721799	11	~2013
31688115743	63376231487	11	~2013
31688689589	253509516713	12	~2014
31690133141	253521065129	12	~2014
31690514423	1701...451511	15	2023

Exponent	Prime Factor	Dig.	Year
31692749663	63385499327	11	~2013
31693945319	63387890639	11	~2013
31697753603	63395507207	11	~2013
31699319843	63398639687	11	~2013
31700248523	63400497047	11	~2013
31701189419	63402378839	11	~2013
31701625391	63403250783	11	~2013
31703471099	63406942199	11	~2013
31704368939	63408737879	11	~2013
31705346819	63410693639	11	~2013
31707454403	63414908807	11	~2013
31708346843	63416693687	11	~2013
31710527879	63421055759	11	~2013
31710960791	63421921583	11	~2013
31713617339	63427234679	11	~2013
31713742283	63427484567	11	~2013
31714443539	63428887079	11	~2013
31715978713	190295872279	12	~2014
31719594311	63439188623	11	~2013
31720315751	63440631503	11	~2013
31720384859	63440769719	11	~2013
31720537921	190323227527	12	~2014
31720679843	63441359687	11	~2013
31722690971	63445381943	11	~2013
31724307311	2918...726121	14	2024

Exponent	Prime Factor	Dig.	Year
31725651383	63451302767	11	~2013
31725993041	253807944329	12	~2014
31726053637	190356321823	12	~2014
31728119183	63456238367	11	~2013
31729825691	63459651383	11	~2013
31731504911	63463009823	11	~2013
31734097379	63468194759	11	~2013
31734302581	507748841297	12	~2015
31735930883	63471861767	11	~2013
31736154479	63472308959	11	~2013
31736554799	63473109599	11	~2013
31737262703	63474525407	11	~2013
31738168739	63476337479	11	~2013
31738639063	317386390631	12	~2015
31740464153	190442784919	12	~2014
31740476063	63480952127	11	~2013
31742131439	253937051513	12	~2015
31743237863	63486475727	11	~2013
31743450059	63486900119	11	~2013
31744066181	190464397087	12	~2014
31747837139	63495674279	11	~2013
31748715623	63497431247	11	~2013
31749871271	63499742543	11	~2013
31750643219	63501286439	11	~2013
31751226959	63502453919	11	~2013

4.768.925 digits

25-05-04