Small Mersenne Prime Factors (page 4697/5130)

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
38896419251	77792838503	11	~2014
38896873811	77793747623	11	~2014
38899713071	77799426143	11	~2014
38901293393	233407760359	12	~2015
38902847363	77805694727	11	~2014
38907806051	77815612103	11	~2014
38907847031	77815694063	11	~2014
38908832551	389088325511	12	~2015
38909488897	233456933383	12	~2015
38910164603	77820329207	11	~2014
38911508591	77823017183	11	~2014
38911770791	77823541583	11	~2014
38912668271	77825336543	11	~2014
38913601271	77827202543	11	~2014
38918383319	77836766639	11	~2014
38919297353	233515784119	12	~2015
38920550183	77841100367	11	~2014
38924181311	77848362623	11	~2014
38925120433	233550722599	12	~2015
38927317279	389273172791	12	~2015
38929081951	622865311217	12	~2016
38929522859	311436182873	12	~2015
38929993439	77859986879	11	~2014
38933849291	77867698583	11	~2014
38933872459	389338724591	12	~2015

Exponent	Prime Factor	Dig.	Year
38936025911	77872051823	11	~2014
38936480543	77872961087	11	~2014
38939821391	77879642783	11	~2014
38944426379	77888852759	11	~2014
38944547039	77889094079	11	~2014
38946911207	311575289657	12	~2015
38951469701	233708818207	12	~2015
38951526791	77903053583	11	~2014
38953369919	77906739839	11	~2014
38958823259	77917646519	11	~2014
38959069739	77918139479	11	~2014
38962135741	233772814447	12	~2015
38965347191	77930694383	11	~2014
38965436353	233792618119	12	~2015
38965871363	77931742727	11	~2014
38966114617	233796687703	12	~2015
38966769239	77933538479	11	~2014
38969876531	77939753063	11	~2014
38970079277	233820475663	12	~2015
38973004331	77946008663	11	~2014
38973069683	77946139367	11	~2014
38973885323	77947770647	11	~2014
38979913859	77959827719	11	~2014
38980560427	389805604271	12	~2015
38982566213	233895397279	12	~2015

Exponent	Prime Factor	Dig.	Year
38983683961	233902103767	12	~2015
38986138991	77972277983	11	~2014
38987566979	77975133959	11	~2014
38988293231	77976586463	11	~2014
38989657103	77979314207	11	~2014
38990184251	77980368503	11	~2014
38990220901	233941325407	12	~2015
38992609511	77985219023	11	~2014
38992805399	77985610799	11	~2014
38994459619	701900273143	12	~2016
39000028439	78000056879	11	~2014
39004943699	78009887399	11	~2014
39017530703	78035061407	11	~2014
39019514603	78039029207	11	~2014
39019652219	78039304439	11	~2014
39019676519	78039353039	11	~2014
39020249951	78040499903	11	~2014
39021206459	78042412919	11	~2014
39023811943	390238119431	12	~2015
39024854041	234149124247	12	~2015
39028650119	78057300239	11	~2014
39029055743	78058111487	11	~2014
39030053863	390300538631	12	~2015
39031226099	78062452199	11	~2014
39031603703	78063207407	11	~2014

Exponent	Prime Factor	Dig.	Year
39034557389	312276459113	12	~2015
39035110157	312280881257	12	~2015
39035861219	78071722439	11	~2014
39036252011	78072504023	11	~2014
39037462511	78074925023	11	~2014
39037764329	312302114633	12	~2015
39038668457	234232010743	12	~2015
39042099539	78084199079	11	~2014
39042416879	78084833759	11	~2014
39043974083	78087948167	11	~2014
39044836279	702807053023	12	~2016
39046066991	78092133983	11	~2014
39047142479	78094284959	11	~2014
39049847579	78099695159	11	~2014
39050873423	78101746847	11	~2014
39052464931	702944368759	12	~2016
39053412539	78106825079	11	~2014
39055571561	234333429367	12	~2015
39056042153	234336252919	12	~2015
39057929051	78115858103	11	~2014
39062611691	78125223383	11	~2014
39064149931	625026398897	12	~2016
39064914671	78129829343	11	~2014
39068392061	234410352367	12	~2015
39068652719	78137305439	11	~2014

4.828.532 digits

25-06-01