Small Mersenne Prime Factors (page 2800/5760)

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
125460383	250920767	9	~1994
125461993	5018479721	10	~1997
125473643	250947287	9	~1994
125475191	250950383	9	~1994
125477981	752867887	9	~1995
125479859	250959719	9	~1994
125481977	1003855817	10	~1996
125484119	250968239	9	~1994
125484691	1254846911	10	~1996
125484839	250969679	9	~1994
125489783	250979567	9	~1994
125490191	250980383	9	~1994
125492879	250985759	9	~1994
125495353	752972119	9	~1995
125497289	3764918671	10	~1997
125499497	752996983	9	~1995
125501723	251003447	9	~1994
125503211	251006423	9	~1994
125503811	251007623	9	~1994
125506919	251013839	9	~1994
125510699	251021399	9	~1994
125512763	251025527	9	~1994
125514419	251028839	9	~1994
125517377	753104263	9	~1995
125519159	3012459817	10	~1997

Exponent	Prime Factor	Digits	Year
125520259	1255202591	10	~1996
125523071	251046143	9	~1994
125524339	1255243391	10	~1996
125525531	251051063	9	~1994
125526371	251052743	9	~1994
125528339	251056679	9	~1994
125528471	251056943	9	~1994
125529191	251058383	9	~1994
125531951	251063903	9	~1994
125534153	753204919	9	~1995
125534891	251069783	9	~1994
125539153	753234919	9	~1995
125543417	753260503	9	~1995
125545837	753275023	9	~1995
125547491	251094983	9	~1994
125548037	1757672519	10	~1996
125549423	251098847	9	~1994
125549771	251099543	9	~1994
125553223	11299790071	11	~1998
125554201	753325207	9	~1995
125555741	1004445929	10	~1996
125563703	251127407	9	~1994
125564951	251129903	9	~1994
125567173	753403039	9	~1995
125568203	251136407	9	~1994

Exponent	Prime Factor	Digits	Year
125576651	251153303	9	~1994
125590541	753543247	9	~1995
125590813	753544879	9	~1995
125591761	2763018743	10	~1997
125593931	251187863	9	~1994
125596199	251192399	9	~1994
125596979	251193959	9	~1994
125597441	753584647	9	~1995
125599361	3767980831	10	~1997
125602927	2009646833	10	~1996
125604331	1256043311	10	~1996
125605349	9043585129	10	~1998
125607329	1004858633	10	~1996
125608811	251217623	9	~1994
125613343	8039253953	10	~1998
125613863	251227727	9	~1994
125615723	251231447	9	~1994
125616131	251232263	9	~1994
125623643	251247287	9	~1994
125625611	251251223	9	~1994
125633411	251266823	9	~1994
125633633	753801799	9	~1995
125635019	251270039	9	~1994
125637119	251274239	9	~1994
125637781	753826687	9	~1995

Exponent	Prime Factor	Digits	Year
125639099	251278199	9	~1994
125641469	1005131753	10	~1996
125643433	753860599	9	~1995
125650453	2010407249	10	~1996
125652239	251304479	9	~1994
125652419	251304839	9	~1994
125654351	251308703	9	~1994
125654591	251309183	9	~1994
125656933	753941599	9	~1995
125658311	251316623	9	~1994
125658803	251317607	9	~1994
125661131	251322263	9	~1994
125662213	15079465561	11	~1999
125663231	251326463	9	~1994
125665271	251330543	9	~1994
125665333	753991999	9	~1995
125665499	251330999	9	~1994
125665517	753993103	9	~1995
125667809	1005342473	10	~1996
125667863	251335727	9	~1994
125668043	251336087	9	~1994
125671043	251342087	9	~1994
125671751	251343503	9	~1994
125671921	2764782263	10	~1997
125673623	251347247	9	~1994

5.456.260 digits

26-03-22