Small Mersenne Prime Factors (page 4827/5340)

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
32429919839	259439358713	12	~2015
32432348017	194594088103	12	~2014
32435505863	64871011727	11	~2013
32436435611	64872871223	11	~2013
32436580283	64873160567	11	~2013
32438272439	64876544879	11	~2013
32442744611	64885489223	11	~2013
32442810623	64885621247	11	~2013
32443198223	64886396447	11	~2013
32447603411	64895206823	11	~2013
32450413379	64900826759	11	~2013
32452639537	194715837223	12	~2014
32455164671	64910329343	11	~2013
32456428889	259651431113	12	~2015
32457536981	194745221887	12	~2014
32458036019	259664288153	12	~2015
32458220279	64916440559	11	~2013
32458758719	64917517439	11	~2013
32458946171	64917892343	11	~2013
32460868313	194765209879	12	~2014
32460992423	64921984847	11	~2013
32461588261	519385412177	12	~2015
32461623731	64923247463	11	~2013
32462828351	64925656703	11	~2013
32462941019	64925882039	11	~2013

Exponent	Prime Factor	Dig.	Year
32463268661	194779611967	12	~2014
32463360911	64926721823	11	~2013
32464297717	194785786303	12	~2014
32466600599	64933201199	11	~2013
32467069991	64934139983	11	~2013
32467186991	64934373983	11	~2013
32472368861	259778950889	12	~2015
32472512879	64945025759	11	~2013
32473101179	64946202359	11	~2013
32473566017	259788528137	12	~2015
32474287679	64948575359	11	~2013
32475624539	64951249079	11	~2013
32476475459	64952950919	11	~2013
32477054257	779449302169	12	~2016
32477560091	64955120183	11	~2013
32477920463	64955840927	11	~2013
32479488539	64958977079	11	~2013
32480640431	64961280863	11	~2013
32480642981	194883857887	12	~2014
32483020679	64966041359	11	~2013
32483720891	64967441783	11	~2013
32484629381	259877035049	12	~2015
32484772679	64969545359	11	~2013
32486194757	259889558057	12	~2015
32489918459	64979836919	11	~2013

Exponent	Prime Factor	Dig.	Year
32490014987	259920119897	12	~2015
32491917401	9481...976119	14	2023
32493305311	324933053111	12	~2015
32495320499	64990640999	11	~2013
32495395147	519926322353	12	~2015
32495682371	64991364743	11	~2013
32500039597	195000237583	12	~2014
32502151823	65004303647	11	~2013
32502153479	65004306959	11	~2013
32504583413	455064167783	12	~2015
32505650603	65011301207	11	~2013
32506779923	65013559847	11	~2013
32507730683	65015461367	11	~2013
32507841263	65015682527	11	~2013
32508343799	65016687599	11	~2013
32510979419	65021958839	11	~2013
32511193751	260089550009	12	~2015
32512773719	65025547439	11	~2013
32513096303	65026192607	11	~2013
32514376619	65028753239	11	~2013
32516485751	65032971503	11	~2013
32520809903	65041619807	11	~2013
32520929723	65041859447	11	~2013
32523593183	65047186367	11	~2013
32526028823	65052057647	11	~2013

Exponent	Prime Factor	Dig.	Year
32527592159	65055184319	11	~2013
32529223871	65058447743	11	~2013
32529269041	195175614247	12	~2014
32530336273	780728070553	12	~2016
32530404971	260243239769	12	~2015
32530748111	65061496223	11	~2013
32532540479	65065080959	11	~2013
32533099331	65066198663	11	~2013
32533450657	1561...315361	14	2023
32533526183	65067052367	11	~2013
32534785373	195208712239	12	~2014
32534805851	65069611703	11	~2013
32536289257	195217735543	12	~2014
32538387503	65076775007	11	~2013
32539878577	195239271463	12	~2014
32541310331	65082620663	11	~2013
32544069143	65088138287	11	~2013
32544537479	65089074959	11	~2013
32544542879	65089085759	11	~2013
32544554459	65089108919	11	~2013
32545690091	65091380183	11	~2013
32546382097	520742113553	12	~2015
32547520897	195285125383	12	~2014
32548249271	65096498543	11	~2013
32548967663	65097935327	11	~2013

5.037.460 digits

25-09-07