Small Mersenne Prime Factors (page 4797/5190)

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
47580753431	95161506863	11	~2014
47584146119	95168292239	11	~2014
47584633931	95169267863	11	~2014
47592666817	285556000903	12	~2016
47601483179	95202966359	11	~2014
47603003639	95206007279	11	~2014
47603726771	95207453543	11	~2014
47605299431	95210598863	11	~2014
47606868989	380854951913	12	~2016
47611674997	761786799953	12	~2017
47613578003	95227156007	11	~2014
47616204431	95232408863	11	~2014
47617561619	95235123239	11	~2014
47618188031	95236376063	11	~2014
47621343383	95242686767	11	~2014
47621519531	95243039063	11	~2014
47621938583	95243877167	11	~2014
47623731041	285742386247	12	~2016
47629127939	95258255879	11	~2014
47630174687	381041397497	12	~2016
47632351379	95264702759	11	~2014
47632513223	95265026447	11	~2014
47632780619	95265561239	11	~2014
47637306683	95274613367	11	~2014
47639083379	95278166759	11	~2014

Exponent	Prime Factor	Dig.	Year
47641262699	95282525399	11	~2014
47642899277	381143194217	12	~2016
47643881497	285863288983	12	~2016
47644053623	95288107247	11	~2014
47644266179	95288532359	11	~2014
47646121091	95292242183	11	~2014
47647022477	381176179817	12	~2016
47647529903	95295059807	11	~2014
47647621523	95295243047	11	~2014
47648538011	95297076023	11	~2014
47650331243	95300662487	11	~2014
47662378019	95324756039	11	~2014
47667074183	95334148367	11	~2014
47667433763	95334867527	11	~2014
47668532339	95337064679	11	~2014
47671914517	286031487103	12	~2016
47673041233	286038247399	12	~2016
47676333977	286058003863	12	~2016
47676681599	95353363199	11	~2014
47676928441	286061570647	12	~2016
47677401179	95354802359	11	~2014
47678853119	95357706239	11	~2014
47680501079	95361002159	11	~2014
47683118563	476831185631	12	~2016
47684133641	381473069129	12	~2016

Exponent	Prime Factor	Dig.	Year
47684633099	95369266199	11	~2014
47686065683	95372131367	11	~2014
47688186239	95376372479	11	~2014
47689584443	95379168887	11	~2014
47690089763	95380179527	11	~2014
47693865743	95387731487	11	~2014
47694497531	95388995063	11	~2014
47697998423	95395996847	11	~2014
47698242563	95396485127	11	~2014
47701973279	95403946559	11	~2014
47704360499	95408720999	11	~2014
47704631531	95409263063	11	~2014
47707274039	95414548079	11	~2014
47707939283	95415878567	11	~2014
47709805883	95419611767	11	~2014
47710048691	381680389529	12	~2016
47710342081	286262052487	12	~2016
47713515301	286281091807	12	~2016
47713765439	95427530879	11	~2014
47714753923	763436062769	12	~2017
47714916833	3659...109111	15	2023
47716812359	95433624719	11	~2014
47719212683	95438425367	11	~2014
47722358531	95444717063	11	~2014
47725349783	95450699567	11	~2014

Exponent	Prime Factor	Dig.	Year
47725563323	95451126647	11	~2014
47726919817	286361518903	12	~2016
47735286197	668294006759	12	~2016
47735746379	8936...221489	14	2023
47735799263	95471598527	11	~2014
47736289151	95472578303	11	~2014
47738487551	95476975103	11	~2014
47739060779	95478121559	11	~2014
47743632401	286461794407	12	~2016
47745481103	95490962207	11	~2014
47745703919	95491407839	11	~2014
47747314463	95494628927	11	~2014
47748572939	95497145879	11	~2014
47748967559	95497935119	11	~2014
47749981439	95499962879	11	~2014
47750104421	382000835369	12	~2016
47753131823	95506263647	11	~2014
47755056683	95510113367	11	~2014
47757840023	95515680047	11	~2014
47759479517	382075836137	12	~2016
47763463457	286580780743	12	~2016
47766508511	95533017023	11	~2014
47771171411	95542342823	11	~2014
47771488883	95542977767	11	~2014
47776899539	95553799079	11	~2014

4.888.230 digits

25-06-29