Small Mersenne Prime Factors (page 2640/5025)

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
158790377	2223065279	10	~1997
158792141	952752847	9	~1996
158798291	317596583	9	~1995
158805371	317610743	9	~1995
158807039	317614079	9	~1995
158811371	317622743	9	~1995
158814143	317628287	9	~1995
158815031	317630063	9	~1995
158819201	952915207	9	~1996
158831591	317663183	9	~1995
158840459	317680919	9	~1995
158840681	953044087	9	~1996
158845103	317690207	9	~1995
158853043	5401003463	10	~1998
158859397	953156383	9	~1996
158860763	317721527	9	~1995
158860991	317721983	9	~1995
158869979	317739959	9	~1995
158891101	3495604223	10	~1998
158897279	317794559	9	~1995
158901059	317802119	9	~1995
158901359	2860224463	10	~1997
158904131	317808263	9	~1995
158905237	2542483793	10	~1997
158911199	317822399	9	~1995

Exponent	Prime Factor	Digits	Year
158914163	317828327	9	~1995
158918531	317837063	9	~1995
158918723	317837447	9	~1995
158923753	953542519	9	~1996
158927893	953567359	9	~1996
158928839	317857679	9	~1995
158930921	953585527	9	~1996
158936669	41959280617	11	~2000
158938127	3814515049	10	~1998
158938691	317877383	9	~1995
158940623	317881247	9	~1995
158941873	953651239	9	~1996
158941883	317883767	9	~1995
158946803	317893607	9	~1995
158947441	7311582287	10	~1998
158948171	317896343	9	~1995
158951483	317902967	9	~1995
158958479	317916959	9	~1995
158962753	953776519	9	~1996
158962799	317925599	9	~1995
158964023	317928047	9	~1995
158965871	317931743	9	~1995
158966683	1589666831	10	~1997
158967239	317934479	9	~1995
158967353	953804119	9	~1996

Exponent	Prime Factor	Digits	Year
158969231	317938463	9	~1995
158972279	317944559	9	~1995
158976343	2543621489	10	~1997
158984543	317969087	9	~1995
158985551	317971103	9	~1995
158986501	953919007	9	~1996
158993651	317987303	9	~1995
158995019	317990039	9	~1995
159008231	318016463	9	~1995
159008371	1590083711	10	~1997
159015133	954090799	9	~1996
159018383	318036767	9	~1995
159022271	318044543	9	~1995
159023471	318046943	9	~1995
159032999	318065999	9	~1995
159043403	318086807	9	~1995
159047111	318094223	9	~1995
159047519	318095039	9	~1995
159047711	318095423	9	~1995
159049571	318099143	9	~1995
159049859	1272398873	10	~1997
159053483	318106967	9	~1995
159056399	318112799	9	~1995
159058943	318117887	9	~1995
159062231	318124463	9	~1995

Exponent	Prime Factor	Digits	Year
159064693	954388159	9	~1996
159066191	318132383	9	~1995
159067739	318135479	9	~1995
159068999	318137999	9	~1995
159076163	318152327	9	~1995
159077123	318154247	9	~1995
159081479	318162959	9	~1995
159083003	318166007	9	~1995
159086303	318172607	9	~1995
159092099	318184199	9	~1995
159093299	318186599	9	~1995
159093419	318186839	9	~1995
159097331	1272778649	10	~1997
159101009	1272808073	10	~1997
159107771	318215543	9	~1995
159108143	318216287	9	~1995
159111299	318222599	9	~1995
159123479	318246959	9	~1995
159125951	318251903	9	~1995
159126323	318252647	9	~1995
159130199	318260399	9	~1995
159135329	1273082633	10	~1997
159135479	318270959	9	~1995
159137831	318275663	9	~1995
159145799	318291599	9	~1995

4.724.182 digits

25-04-13