Small Mersenne Prime Factors (page 4779/5340)

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
27125112191	54250224383	11	~2013
27125493701	217003949609	12	~2014
27126626537	217013012297	12	~2014
27127079183	54254158367	11	~2013
27129648431	54259296863	11	~2013
27129947951	54259895903	11	~2013
27130902217	162785413303	12	~2014
27131774617	162790647703	12	~2014
27132664151	54265328303	11	~2013
27133055123	54266110247	11	~2013
27134903759	54269807519	11	~2013
27134918351	54269836703	11	~2013
27136306679	54272613359	11	~2013
27138469751	54276939503	11	~2013
27139411811	54278823623	11	~2013
27139477223	54278954447	11	~2013
27140306471	54280612943	11	~2013
27140666291	54281332583	11	~2013
27141658301	162849949807	12	~2014
27142956479	54285912959	11	~2013
27144853261	434317652177	12	~2015
27144880583	54289761167	11	~2013
27145725371	54291450743	11	~2013
27145913843	54291827687	11	~2013
27146237999	54292475999	11	~2013

Exponent	Prime Factor	Dig.	Year
27148272421	162889634527	12	~2014
27148958723	54297917447	11	~2013
27152574791	54305149583	11	~2013
27152817557	162916905343	12	~2014
27153018071	54306036143	11	~2013
27154612301	162927673807	12	~2014
27154868483	54309736967	11	~2013
27155193001	2260...926327	15	2023
27155962199	54311924399	11	~2013
27157278503	54314557007	11	~2013
27157373591	54314747183	11	~2013
27158992691	217271941529	12	~2014
27160065899	54320131799	11	~2013
27160167707	217281341657	12	~2014
27160776719	54321553439	11	~2013
27161509031	54323018063	11	~2013
27162598499	217300787993	12	~2014
27163834679	54327669359	11	~2013
27164030129	217312241033	12	~2014
27164266931	54328533863	11	~2013
27164506801	162987040807	12	~2014
27165065579	54330131159	11	~2013
27165651481	162993908887	12	~2014
27167955487	271679554871	12	~2014
27168060659	54336121319	11	~2013

Exponent	Prime Factor	Dig.	Year
27168874091	54337748183	11	~2013
27169908719	54339817439	11	~2013
27171335237	380398693319	12	~2015
27172876859	54345753719	11	~2013
27173629601	163041777607	12	~2014
27174827483	54349654967	11	~2013
27175604783	54351209567	11	~2013
27177791051	54355582103	11	~2013
27177802031	54355604063	11	~2013
27178081499	54356162999	11	~2013
27178493701	163070962207	12	~2014
27179166011	54358332023	11	~2013
27179514091	434872225457	12	~2015
27180867271	271808672711	12	~2014
27181508771	217452070169	12	~2014
27181978211	217455825689	12	~2014
27183113393	163098680359	12	~2014
27183673177	163102039063	12	~2014
27183865883	54367731767	11	~2013
27184496711	54368993423	11	~2013
27185617177	163113703063	12	~2014
27185744801	217485958409	12	~2014
27186388979	54372777959	11	~2013
27186789527	9335...235719	14	2023
27189014603	54378029207	11	~2013

Exponent	Prime Factor	Dig.	Year
27189246793	163135480759	12	~2014
27191815031	217534520249	12	~2014
27192692953	435083087249	12	~2015
27193038923	54386077847	11	~2013
27193086131	54386172263	11	~2013
27193215431	54386430863	11	~2013
27193861151	54387722303	11	~2013
27194069543	54388139087	11	~2013
27196186691	54392373383	11	~2013
27197986199	54395972399	11	~2013
27198150431	54396300863	11	~2013
27198693311	54397386623	11	~2013
27198933527	217591468217	12	~2014
27199732991	54399465983	11	~2013
27199739167	489595305007	12	~2015
27200612423	54401224847	11	~2013
27201722543	54403445087	11	~2013
27202971683	54405943367	11	~2013
27203108063	54406216127	11	~2013
27203668829	217629350633	12	~2014
27203704163	54407408327	11	~2013
27203887253	163223323519	12	~2014
27203994731	54407989463	11	~2013
27204752699	54409505399	11	~2013
27204830651	54409661303	11	~2013

5.037.460 digits

25-09-07