Small Mersenne Prime Factors (page 4945/5745)

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
16043206897	96259241383	11	~2012
16043265241	96259591447	11	~2012
16043670163	160436701631	12	~2012
16044127289	224617782047	12	~2013
16044165323	32088330647	11	~2011
16045216841	96271301047	11	~2012
16045642451	32091284903	11	~2011
16045960979	1569...837463	14	2023
16046087231	32092174463	11	~2011
16046497451	32092994903	11	~2011
16047028799	32094057599	11	~2011
16047291791	32094583583	11	~2011
16048868441	96293210647	11	~2012
16049052991	160490529911	12	~2012
16049112791	32098225583	11	~2011
16049911571	128399292569	12	~2012
16050172091	32100344183	11	~2011
16050265691	32100531383	11	~2011
16050288203	32100576407	11	~2011
16050692767	160506927671	12	~2012
16051783717	96310702303	11	~2012
16051920959	32103841919	11	~2011
16052490061	256839840977	12	~2013
16053186923	32106373847	11	~2011
16053824201	128430593609	12	~2012

Exponent	Prime Factor	Dig.	Year
16054652723	32109305447	11	~2011
16055229293	96331375759	11	~2012
16056089303	32112178607	11	~2011
16056455537	96338733223	11	~2012
16056874313	96341245879	11	~2012
16057190297	224800664159	12	~2013
16057283531	32114567063	11	~2011
16057302491	32114604983	11	~2011
16057663943	32115327887	11	~2011
16058103371	32116206743	11	~2011
16059247643	32118495287	11	~2011
16059309611	32118619223	11	~2011
16059675623	32119351247	11	~2011
16060181519	32120363039	11	~2011
16060410851	32120821703	11	~2011
16060536491	32121072983	11	~2011
16060772639	32121545279	11	~2011
16060862651	32121725303	11	~2011
16061129891	32122259783	11	~2011
16061174471	32122348943	11	~2011
16063127471	32126254943	11	~2011
16063393883	32126787767	11	~2011
16063489763	32126979527	11	~2011
16063507679	32127015359	11	~2011
16063659659	32127319319	11	~2011

Exponent	Prime Factor	Dig.	Year
16064362333	96386173999	11	~2012
16064944943	32129889887	11	~2011
16065402341	96392414047	11	~2012
16065768083	32131536167	11	~2011
16066256909	128530055273	12	~2012
16067160601	96402963607	11	~2012
16067341049	128538728393	12	~2012
16069548779	32139097559	11	~2011
16069565047	289252170847	12	~2013
16069782251	128558258009	12	~2012
16070321843	32140643687	11	~2011
16070551643	32141103287	11	~2011
16072107503	32144215007	11	~2011
16072720523	32145441047	11	~2011
16072861481	96437168887	11	~2012
16073420171	32146840343	11	~2011
16073437753	257175004049	12	~2013
16073644591	160736445911	12	~2012
16074242147	128593937177	12	~2012
16075026491	32150052983	11	~2011
16075097063	32150194127	11	~2011
16075738901	128605911209	12	~2012
16076431799	128611454393	12	~2012
16076449919	675210896599	12	~2014
16076612399	32153224799	11	~2011

Exponent	Prime Factor	Dig.	Year
16076988311	32153976623	11	~2011
16077217703	32154435407	11	~2011
16077438977	128619511817	12	~2012
16078466483	32156932967	11	~2011
16078531783	257256508529	12	~2013
16078540733	96471244399	11	~2012
16079285407	160792854071	12	~2012
16081123511	32162247023	11	~2011
16081462591	257303401457	12	~2013
16081608457	96489650743	11	~2012
16081614779	32163229559	11	~2011
16082322017	385975728409	12	~2013
16082347763	32164695527	11	~2011
16082530679	32165061359	11	~2011
16082575871	32165151743	11	~2011
16082761091	32165522183	11	~2011
16082774651	32165549303	11	~2011
16083220493	482496614791	12	~2014
16083303011	32166606023	11	~2011
16083578039	32167156079	11	~2011
16084284053	96505704319	11	~2012
16084679879	32169359759	11	~2011
16085164559	32170329119	11	~2011
16085348963	32170697927	11	~2011
16086255803	32172511607	11	~2011

5.441.361 digits

26-03-15