Small Mersenne Prime Factors (page 2870/5025)

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	Digits	Year
256185383	512370767	9	~1997
256185557	3586597799	10	~1999
256202711	512405423	9	~1997
256204657	1537227943	10	~1998
256207877	2049663017	10	~1998
256214723	512429447	9	~1997
256214999	512429999	9	~1997
256227683	512455367	9	~1997
256228633	1537371799	10	~1998
256251509	2050012073	10	~1998
256261007	4612698127	10	~1999
256282283	512564567	9	~1997
256287319	4613171743	10	~1999
256288139	512576279	9	~1997
256288559	512577119	9	~1997
256295843	512591687	9	~1997
256298437	1537790623	10	~1998
256299503	512599007	9	~1997
256302479	512604959	9	~1997
256311791	512623583	9	~1997
256321199	512642399	9	~1997
256329431	512658863	9	~1997
256350779	512701559	9	~1997
256354151	512708303	9	~1997
256360763	512721527	9	~1997

Exponent	Prime Factor	Digits	Year
256371383	512742767	9	~1997
256372331	2050978649	10	~1998
256376249	2051009993	10	~1998
256379003	512758007	9	~1997
256380191	512760383	9	~1997
256387823	512775647	9	~1997
256402871	512805743	9	~1997
256412531	512825063	9	~1997
256417541	2051340329	10	~1998
256423091	512846183	9	~1997
256425731	512851463	9	~1997
256425959	512851919	9	~1997
256427419	2564274191	10	~1998
256429993	6154319833	10	~1999
256433579	2051468633	10	~1998
256446143	512892287	9	~1997
256446733	1538680399	10	~1998
256449443	512898887	9	~1997
256453493	1538720959	10	~1998
256455011	512910023	9	~1997
256458989	2051671913	10	~1998
256462751	512925503	9	~1997
256464119	512928239	9	~1997
256465567	4616380207	10	~1999
256467383	512934767	9	~1997

Exponent	Prime Factor	Digits	Year
256474171	4103586737	10	~1999
256485623	512971247	9	~1997
256487879	512975759	9	~1997
256489141	1538934847	10	~1998
256492091	512984183	9	~1997
256501403	513002807	9	~1997
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

Exponent	Prime Factor	Digits	Year
256610831	513221663	9	~1997
256617197	1539703183	10	~1998
256619177	1539715063	10	~1998
256625111	513250223	9	~1997
256633733	1539802399	10	~1998
256646759	513293519	9	~1997
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

4.724.182 digits

25-04-13