Small Mersenne Prime Factors (page 4563/5025)

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
32154273817	514468381073	12	~2015
32154282203	64308564407	11	~2013
32155959317	450183430439	12	~2015
32156004613	192936027679	12	~2014
32160284363	64320568727	11	~2013
32162655671	64325311343	11	~2013
32162843819	64325687639	11	~2013
32164017251	64328034503	11	~2013
32164308443	64328616887	11	~2013
32166860897	257334887177	12	~2015
32168916371	64337832743	11	~2013
32170806803	64341613607	11	~2013
32170885619	64341771239	11	~2013
32171085371	64342170743	11	~2013
32171105909	450395482727	12	~2015
32173200551	64346401103	11	~2013
32174044957	514784719313	12	~2015
32177067997	193062407983	12	~2014
32177543113	193065258679	12	~2014
32179040213	193074241279	12	~2014
32179162643	64358325287	11	~2013
32180364347	257442914777	12	~2015
32181775477	193090652863	12	~2014
32181817103	64363634207	11	~2013
32184457031	64368914063	11	~2013

Exponent	Prime Factor	Dig.	Year
32184647657	257477181257	12	~2015
32187606959	64375213919	11	~2013
32188369799	64376739599	11	~2013
32189275463	64378550927	11	~2013
32190746963	64381493927	11	~2013
32191729571	64383459143	11	~2013
32192726843	64385453687	11	~2013
32193014309	450702200327	12	~2015
32193028801	193158172807	12	~2014
32194896659	64389793319	11	~2013
32195884859	64391769719	11	~2013
32196972617	257575780937	12	~2015
32198824583	64397649167	11	~2013
32199804359	64399608719	11	~2013
32200092383	64400184767	11	~2013
32202673199	64405346399	11	~2013
32202768877	193216613263	12	~2014
32203218563	64406437127	11	~2013
32204070911	64408141823	11	~2013
32204132771	64408265543	11	~2013
32205223643	64410447287	11	~2013
32205892091	64411784183	11	~2013
32207780191	579740043439	12	~2015
32208490511	64416981023	11	~2013
32209490437	193256942623	12	~2014

Exponent	Prime Factor	Dig.	Year
32211848351	64423696703	11	~2013
32212219283	64424438567	11	~2013
32212374263	64424748527	11	~2013
32212935743	64425871487	11	~2013
32213589623	64427179247	11	~2013
32214346237	193286077423	12	~2014
32214918341	193289510047	12	~2014
32215063379	64430126759	11	~2013
32215860841	193295165047	12	~2014
32218371131	64436742263	11	~2013
32219239763	64438479527	11	~2013
32219676563	64439353127	11	~2013
32221028639	64442057279	11	~2013
32223069113	193338414679	12	~2014
32223556723	322235567231	12	~2015
32223723611	64447447223	11	~2013
32225081303	64450162607	11	~2013
32227382003	64454764007	11	~2013
32230691761	193384150567	12	~2014
32230973821	709081424063	12	~2016
32231320991	64462641983	11	~2013
32233602451	322336024511	12	~2015
32234642171	257877137369	12	~2015
32235092783	64470185567	11	~2013
32235096791	257880774329	12	~2015

Exponent	Prime Factor	Dig.	Year
32235902411	64471804823	11	~2013
32237831831	257902654649	12	~2015
32239247003	64478494007	11	~2013
32240319623	64480639247	11	~2013
32241171731	64482343463	11	~2013
32242252129	773814051097	12	~2016
32242533097	515880529553	12	~2015
32242921597	773830118329	12	~2016
32243476703	64486953407	11	~2013
32244827281	193468963687	12	~2014
32245019689	773880472537	12	~2016
32246323283	64492646567	11	~2013
32248522643	64497045287	11	~2013
32249439083	64498878167	11	~2013
32249590643	64499181287	11	~2013
32252916659	64505833319	11	~2013
32254348163	64508696327	11	~2013
32259437891	64518875783	11	~2013
32261470331	64522940663	11	~2013
32262186623	64524373247	11	~2013
32264289311	64528578623	11	~2013
32267347547	258138780377	12	~2015
32270088971	64540177943	11	~2013
32270273459	64540546919	11	~2013
32270781839	64541563679	11	~2013

4.724.182 digits

25-04-13