Small Mersenne Prime Factors (page 2877/5040)

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	Digits	Year
256504321	1539025927	10	~1998
256507859	513015719	9	~1997
256508579	513017159	9	~1997
256519727	6669512903	10	~1999
256537223	513074447	9	~1997
256541867	2052334937	10	~1998
256550279	513100559	9	~1997
256559483	513118967	9	~1997
256560067	2565600671	10	~1998
256569067	2565690671	10	~1998
256570211	513140423	9	~1997
256573043	513146087	9	~1997
256584479	513168959	9	~1997
256589231	4618606159	10	~1999
256593143	513186287	9	~1997
256602803	513205607	9	~1997
256603031	513206063	9	~1997
256606873	1539641239	10	~1998
256610303	513220607	9	~1997
256610831	513221663	9	~1997
256617197	1539703183	10	~1998
256619177	1539715063	10	~1998
256625111	513250223	9	~1997
256633733	1539802399	10	~1998
256646759	513293519	9	~1997

Exponent	Prime Factor	Digits	Year
256648739	513297479	9	~1997
256649741	1539898447	10	~1998
256655303	513310607	9	~1997
256657319	513314639	9	~1997
256669019	513338039	9	~1997
256669823	513339647	9	~1997
256680071	513360143	9	~1997
256680071	4620241279	10
256687883	513375767	9	~1997
256688743	2566887431	10	~1998
256689679	4620414223	10	~1999
256693511	513387023	9	~1997
256695839	513391679	9	~1997
256697579	513395159	9	~1997
256703939	513407879	9	~1997
256708979	513417959	9	~1997
256714163	513428327	9	~1997
256714609	22590885593	11	~2001
256740739	4621333303	10	~1999
256743359	513486719	9	~1997
256747333	1540483999	10	~1998
256747451	513494903	9	~1997
256749791	513499583	9	~1997
256750223	513500447	9	~1997
256775801	1540654807	10	~1998

Exponent	Prime Factor	Digits	Year
256783931	513567863	9	~1997
256811111	2054488889	10	~1998
256811279	513622559	9	~1997
256820111	513640223	9	~1997
256820363	513640727	9	~1997
256826411	513652823	9	~1997
256833299	513666599	9	~1997
256834043	513668087	9	~1997
256845839	513691679	9	~1997
256852091	513704183	9	~1997
256857101	2054856809	10	~1998
256858571	513717143	9	~1997
256869367	4623648607	10	~1999
256870511	513741023	9	~1997
256874099	513748199	9	~1997
256881563	513763127	9	~1997
256882271	8220232673	10	~2000
256895363	513790727	9	~1997
256897559	513795119	9	~1997
256902103	2569021031	10	~1998
256909223	513818447	9	~1997
256909259	2055274073	10	~1998
256910183	513820367	9	~1997
256911731	513823463	9	~1997
256924571	513849143	9	~1997

Exponent	Prime Factor	Digits	Year
256929779	513859559	9	~1997
256931611	2569316111	10	~1998
256932323	513864647	9	~1997
256932443	513864887	9	~1997
256937183	513874367	9	~1997
256938023	513876047	9	~1997
256938743	513877487	9	~1997
256941059	513882119	9	~1997
256945439	513890879	9	~1997
256946939	513893879	9	~1997
256960631	513921263	9	~1997
256962731	513925463	9	~1997
256969289	2055754313	10	~1998
256981463	513962927	9	~1997
256987931	513975863	9	~1997
256990183	4111842929	10	~1999
256993657	1541961943	10	~1998
256994483	513988967	9	~1997
256996277	1541977663	10	~1998
257005919	4626106543	10	~1999
257012531	514025063	9	~1997
257031077	1542186463	10	~1998
257032799	514065599	9	~1997
257035397	1542212383	10	~1998
257037551	514075103	9	~1997

4.739.325 digits

25-04-20