Small Mersenne Prime Factors (page 5097/5340)

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
100127054543	200254109087	12	~2017
100137270071	200274540143	12	~2017
100144061051	200288122103	12	~2017
100146688259	200293376519	12	~2017
100149042491	200298084983	12	~2017
100164407279	200328814559	12	~2017
100164596531	200329193063	12	~2017
100165816277	801326530217	12	~2018
100172875277	601037251663	12	~2018
100175685839	200351371679	12	~2017
100176901991	200353803983	12	~2017
100182066683	200364133367	12	~2017
100182106439	200364212879	12	~2017
100183661183	200367322367	12	~2017
100189270931	200378541863	12	~2017
100189290191	200378580383	12	~2017
100193296943	200386593887	12	~2017
100193445659	200386891319	12	~2017
100199736743	200399473487	12	~2017
100208267111	200416534223	12	~2017
100212009731	200424019463	12	~2017
100217660663	200435321327	12	~2017
100218753179	200437506359	12	~2017
100224575651	200449151303	12	~2017
100245527989	2385...661383	14	2024

Exponent	Prime Factor	Dig.	Year
100252031003	200504062007	12	~2017
100252374203	200504748407	12	~2017
100259189197	601555135183	12	~2018
100268435951	200536871903	12	~2017
100276746263	200553492527	12	~2017
100278732781	601672396687	12	~2018
100295995031	200591990063	12	~2017
100296892427	802375139417	12	~2018
100299858479	200599716959	12	~2017
100301591699	200603183399	12	~2017
100303088351	200606176703	12	~2017
100307362223	200614724447	12	~2017
100310031179	200620062359	12	~2017
100311657059	200623314119	12	~2017
100319984123	200639968247	12	~2017
100322592959	200645185919	12	~2017
100326061859	802608494873	12	~2018
100339248553	602035491319	12	~2018
100349160083	200698320167	12	~2017
100350386231	200700772463	12	~2017
100356672659	200713345319	12	~2017
100367745539	200735491079	12	~2017
100372386311	200744772623	12	~2017
100375131299	200750262599	12	~2017
100379562421	602277374527	12	~2018

Exponent	Prime Factor	Dig.	Year
100392967859	200785935719	12	~2017
100396079111	200792158223	12	~2017
100398044963	200796089927	12	~2017
100398893219	200797786439	12	~2017
100403274989	803226199913	12	~2018
100407294203	200814588407	12	~2017
100410741191	200821482383	12	~2017
100433140091	200866280183	12	~2017
100434449051	200868898103	12	~2017
100443440837	803547526697	12	~2018
100445300987	803562407897	12	~2018
100448361521	803586892169	12	~2018
100452301871	200904603743	12	~2017
100457420801	602744524807	12	~2018
100464351719	200928703439	12	~2017
100466778319	2752...259407	14	2025
100468886183	200937772367	12	~2017
100469512439	200939024879	12	~2017
100471168643	200942337287	12	~2017
100484738771	200969477543	12	~2017
100495698851	200991397703	12	~2017
100496099113	602976594679	12	~2018
100507554971	201015109943	12	~2017
100510846451	201021692903	12	~2017
100515246661	7940...862191	14	2025

Exponent	Prime Factor	Dig.	Year
100515416663	201030833327	12	~2017
100516151951	201032303903	12	~2017
100522913801	603137482807	12	~2018
100528592711	201057185423	12	~2017
100531819781	804254558249	12	~2018
100532046977	804256375817	12	~2018
100533207413	1347...793343	14	2024
100542615671	201085231343	12	~2017
100549394531	201098789063	12	~2017
100554092533	603324555199	12	~2018
100562545859	201125091719	12	~2017
100564158659	201128317319	12	~2017
100564465103	201128930207	12	~2017
100588932683	201177865367	12	~2017
100599133247	804793065977	12	~2018
100601087141	603606522847	12	~2018
100612965203	201225930407	12	~2017
100616757011	201233514023	12	~2017
100620766331	201241532663	12	~2017
100620922799	201241845599	12	~2017
100622845451	201245690903	12	~2017
100623919441	603743516647	12	~2018
100624474199	201248948399	12	~2017
100631678123	201263356247	12	~2017
100636069799	201272139599	12	~2017

5.037.460 digits

25-09-07