Small Mersenne Prime Factors (page 4353/5190)

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
9401746559	18803493119	11	~2009
9402675071	18805350143	11	~2009
9403069031	18806138063	11	~2009
9404067073	56424402439	11	~2010
9404837399	18809674799	11	~2009
9405301883	18810603767	11	~2009
9405425531	18810851063	11	~2009
9406843403	18813686807	11	~2009
9407158393	56442950359	11	~2010
9407377139	18814754279	11	~2009
9407763971	18815527943	11	~2009
9407803403	18815606807	11	~2009
9407858459	18815716919	11	~2009
9408641953	56451851719	11	~2010
9408815683	94088156831	11	~2011
9408860231	18817720463	11	~2009
9408926321	75271410569	11	~2010
9409460303	18818920607	11	~2009
9409880899	169377856183	12	~2011
9409896487	94098964871	11	~2011
9409963763	18819927527	11	~2009
9410116873	56460701239	11	~2010
9410281799	75282254393	11	~2010
9410871803	18821743607	11	~2009
9411117923	18822235847	11	~2009

Exponent	Prime Factor	Dig.	Year
9411126359	18822252719	11	~2009
9411510653	56469063919	11	~2010
9412061873	56472371239	11	~2010
9412176731	18824353463	11	~2009
9412383439	94123834391	11	~2011
9412440179	18824880359	11	~2009
9413070479	18826140959	11	~2009
9413524343	18827048687	11	~2009
9413791631	18827583263	11	~2009
9413804219	18827608439	11	~2009
9413990879	18827981759	11	~2009
9414469943	18828939887	11	~2009
9415382219	18830764439	11	~2009
9415956323	18831912647	11	~2009
9415989959	18831979919	11	~2009
9416085127	94160851271	11	~2011
9416387339	18832774679	11	~2009
9416715041	56500290247	11	~2010
9416957639	18833915279	11	~2009
9416966543	18833933087	11	~2009
9418143173	56508859039	11	~2010
9418425959	18836851919	11	~2009
9419765359	452148737233	12	~2012
9421200263	18842400527	11	~2009
9421362563	18842725127	11	~2009

Exponent	Prime Factor	Dig.	Year
9422171399	18844342799	11	~2009
9422343383	18844686767	11	~2009
9423622619	18847245239	11	~2009
9423951431	18847902863	11	~2009
9424061099	18848122199	11	~2009
9425081753	56550490519	11	~2010
9425136839	18850273679	11	~2009
9425788019	18851576039	11	~2009
9426787943	18853575887	11	~2009
9426881003	18853762007	11	~2009
9426999773	56561998639	11	~2010
9427190231	18854380463	11	~2009
9427365877	56564195263	11	~2010
9427571963	18855143927	11	~2009
9427660037	56565960223	11	~2010
9428027533	226272660793	12	~2012
9428133161	301700261153	12	~2012
9428435771	18856871543	11	~2009
9428451563	18856903127	11	~2009
9428794073	56572764439	11	~2010
9428973023	18857946047	11	~2009
9429294821	56575768927	11	~2010
9429461423	18858922847	11	~2009
9429507203	18859014407	11	~2009
9429568139	18859136279	11	~2009

Exponent	Prime Factor	Dig.	Year
9429668291	18859336583	11	~2009
9429852983	18859705967	11	~2009
9430019771	18860039543	11	~2009
9430356371	18860712743	11	~2009
9430431617	282912948511	12	~2012
9430479563	18860959127	11	~2009
9431098811	18862197623	11	~2009
9431385011	18862770023	11	~2009
9431667023	18863334047	11	~2009
9431786753	56590720519	11	~2010
9431794873	150908717969	12	~2011
9432100031	18864200063	11	~2009
9432304697	56593828183	11	~2010
9432987023	18865974047	11	~2009
9433332877	56599997263	11	~2010
9433771811	169807892599	12	~2011
9434179343	18868358687	11	~2009
9434236597	56605419583	11	~2010
9434423711	18868847423	11	~2009
9434433247	94344332471	11	~2011
9434565397	56607392383	11	~2010
9434570437	56607422623	11	~2010
9434963519	18869927039	11	~2009
9435174547	226444189129	12	~2012
9435320351	18870640703	11	~2009

4.888.230 digits

25-06-29