Small Mersenne Prime Factors (page 4867/5190)

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
64419615647	515356925177	12	~2017
64426807871	128853615743	12	~2015
64427703779	128855407559	12	~2015
64432621163	128865242327	12	~2015
64436930171	128873860343	12	~2015
64437193259	128874386519	12	~2015
64438660679	515509285433	12	~2017
64438930463	128877860927	12	~2015
64442935573	386657613439	12	~2017
64446789083	128893578167	12	~2015
64448755979	128897511959	12	~2015
64451782951	644517829511	12	~2017
64451816003	128903632007	12	~2015
64452031811	128904063623	12	~2015
64453458119	128906916239	12	~2015
64453785479	128907570959	12	~2015
64457330737	386743984423	12	~2017
64458087779	128916175559	12	~2015
64458198719	128916397439	12	~2015
64458868403	128917736807	12	~2015
64464011159	128928022319	12	~2015
64465740539	128931481079	12	~2015
64469530231	644695302311	12	~2017
64472193413	386833160479	12	~2017
64477797311	128955594623	12	~2015

Exponent	Prime Factor	Dig.	Year
64481254499	128962508999	12	~2015
64484227799	128968455599	12	~2015
64485196571	128970393143	12	~2015
64489300691	128978601383	12	~2015
64491723467	515933787737	12	~2017
64494338423	128988676847	12	~2015
64494872131	644948721311	12	~2017
64497609733	386985658399	12	~2017
64499974271	128999948543	12	~2015
64504718123	129009436247	12	~2015
64506845699	129013691399	12	~2015
64509814151	129019628303	12	~2015
64514169847	645141698471	12	~2017
64514370653	387086223919	12	~2017
64517681339	129035362679	12	~2015
64519312001	387115872007	12	~2017
64532927243	129065854487	12	~2015
64535316119	129070632239	12	~2015
64535806723	645358067231	12	~2017
64538417039	129076834079	12	~2015
64540586063	129081172127	12	~2015
64541518939	1110...575081	15	2025
64541584643	129083169287	12	~2015
64548760823	129097521647	12	~2015
64551744311	129103488623	12	~2015

Exponent	Prime Factor	Dig.	Year
64552015813	387312094879	12	~2017
64564077131	129128154263	12	~2015
64566544597	387399267583	12	~2017
64568693411	129137386823	12	~2015
64568745557	516549964457	12	~2017
64573133843	129146267687	12	~2015
64573578037	387441468223	12	~2017
64574511361	387447068167	12	~2017
64576629959	129153259919	12	~2015
64583154263	129166308527	12	~2015
64583295083	129166590167	12	~2015
64591070111	129182140223	12	~2015
64596220181	516769761449	12	~2017
64596275603	129192551207	12	~2015
64596625031	129193250063	12	~2015
64597131619	1019...694783	15	2024
64606116907	646061169071	12	~2017
64613487047	516907896377	12	~2017
64613835311	129227670623	12	~2015
64614321683	129228643367	12	~2015
64615262879	129230525759	12	~2015
64616196839	129232393679	12	~2015
64620564083	129241128167	12	~2015
64626405127	646264051271	12	~2017
64627564499	129255128999	12	~2015

Exponent	Prime Factor	Dig.	Year
64628300897	387769805383	12	~2017
64629044783	129258089567	12	~2015
64629935171	129259870343	12	~2015
64638911339	129277822679	12	~2015
64640128979	2288...658567	14	2023
64641613979	129283227959	12	~2015
64641795131	129283590263	12	~2015
64644093593	387864561559	12	~2017
64649907197	517199257577	12	~2017
64653033083	129306066167	12	~2015
64653507839	129307015679	12	~2015
64658510099	129317020199	12	~2015
64658929343	129317858687	12	~2015
64661444483	129322888967	12	~2015
64668457499	129336914999	12	~2015
64683796823	129367593647	12	~2015
64688604131	129377208263	12	~2015
64689239819	129378479639	12	~2015
64691604563	129383209127	12	~2015
64692509471	129385018943	12	~2015
64692706493	388156238959	12	~2017
64693112531	129386225063	12	~2015
64693402337	388160414023	12	~2017
64700791733	388204750399	12	~2017
64704932473	388229594839	12	~2017

4.888.230 digits

25-06-29