Small Mersenne Prime Factors (page 4812/5445)

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
22576570739	45153141479	11	~2012
22576667339	45153334679	11	~2012
22578921731	45157843463	11	~2012
22579465697	135476794183	12	~2013
22580023811	45160047623	11	~2012
22580189783	45160379567	11	~2012
22581708263	45163416527	11	~2012
22582210877	180657687017	12	~2013
22582391003	45164782007	11	~2012
22582826267	541987830409	12	~2015
22582927883	45165855767	11	~2012
22586582339	45173164679	11	~2012
22586987177	135521923063	12	~2013
22587298199	45174596399	11	~2012
22587364703	45174729407	11	~2012
22587599819	45175199639	11	~2012
22588900151	45177800303	11	~2012
22589153459	45178306919	11	~2012
22589306483	45178612967	11	~2012
22590418211	45180836423	11	~2012
22591846619	45183693239	11	~2012
22591911119	45183822239	11	~2012
22591921031	45183842063	11	~2012
22594794641	135568767847	12	~2013
22597118723	45194237447	11	~2012

Exponent	Prime Factor	Dig.	Year
22598429099	45196858199	11	~2012
22598691919	768355525247	12	~2015
22599606131	45199212263	11	~2012
22601605979	45203211959	11	~2012
22602109199	180816873593	12	~2013
22602674863	361642797809	12	~2014
22607419091	45214838183	11	~2012
22607581027	226075810271	12	~2014
22607761931	45215523863	11	~2012
22608130667	587811397343	12	~2015
22610025611	45220051223	11	~2012
22610896103	45221792207	11	~2012
22611236561	180889892489	12	~2013
22611567659	45223135319	11	~2012
22612013003	45224026007	11	~2012
22613223911	45226447823	11	~2012
22614293543	45228587087	11	~2012
22614988391	45229976783	11	~2012
22615468691	45230937383	11	~2012
22617571199	45235142399	11	~2012
22618780031	45237560063	11	~2012
22619232851	45238465703	11	~2012
22620179303	45240358607	11	~2012
22621290287	180970322297	12	~2013
22621480631	45242961263	11	~2012

Exponent	Prime Factor	Dig.	Year
22622014109	316708197527	12	~2014
22622085859	407197545463	12	~2014
22623566111	45247132223	11	~2012
22623571133	316729995863	12	~2014
22624098443	45248196887	11	~2012
22625828077	135754968463	12	~2013
22626574319	45253148639	11	~2012
22626596831	45253193663	11	~2012
22627091297	135762547783	12	~2013
22627346711	45254693423	11	~2012
22627762897	135766577383	12	~2013
22627828799	45255657599	11	~2012
22628261231	45256522463	11	~2012
22628988313	543095719513	12	~2015
22629295163	45258590327	11	~2012
22629434939	45258869879	11	~2012
22630230121	135781380727	12	~2013
22631988083	45263976167	11	~2012
22633515491	45267030983	11	~2012
22633946411	45267892823	11	~2012
22634114093	135804684559	12	~2013
22634706587	181077652697	12	~2013
22637694251	45275388503	11	~2012
22639231019	45278462039	11	~2012
22639753337	181118026697	12	~2013

Exponent	Prime Factor	Dig.	Year
22640527391	45281054783	11	~2012
22641617639	45283235279	11	~2012
22641686003	45283372007	11	~2012
22641864169	543404740057	12	~2015
22642226723	45284453447	11	~2012
22642840019	45285680039	11	~2012
22644390539	45288781079	11	~2012
22644451139	45288902279	11	~2012
22645073123	45290146247	11	~2012
22645276057	135871656343	12	~2013
22645915829	181167326633	12	~2013
22646365019	45292730039	11	~2012
22648885867	362382173873	12	~2014
22649631863	45299263727	11	~2012
22650613523	45301227047	11	~2012
22651204619	45302409239	11	~2012
22652163491	45304326983	11	~2012
22652295389	181218363113	12	~2013
22652309891	45304619783	11	~2012
22652359043	45304718087	11	~2012
22652681783	45305363567	11	~2012
22653782639	45307565279	11	~2012
22654116659	45308233319	11	~2012
22655428937	181243431497	12	~2013
22657399991	45314799983	11	~2012

5.142.307 digits

25-10-26