Small Mersenne Prime Factors (page 3009/5760)

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
181037767	3258679807	10	~1998
181042481	1086254887	10	~1997
181043543	362087087	9	~1996
181049087	1448392697	10	~1997
181050179	362100359	9	~1996
181052939	362105879	9	~1996
181055243	362110487	9	~1996
181059577	1086357463	10	~1997
181061597	2534862359	10	~1998
181065917	2534922839	10	~1998
181067651	362135303	9	~1996
181070423	362140847	9	~1996
181072861	1086437167	10	~1997
181077311	362154623	9	~1996
181077979	8691742993	10	~1999
181078739	362157479	9	~1996
181082579	362165159	9	~1996
181083863	362167727	9	~1996
181086137	1448689097	10	~1997
181086443	5794766177	10	~1998
181087237	1086523423	10	~1997
181094477	1086566863	10	~1997
181095311	362190623	9	~1996
181098143	362196287	9	~1996
181100593	51794769599	11	~2001

Exponent	Prime Factor	Digits	Year
181101083	362202167	9	~1996
181104491	1448835929	10	~1997
181108079	362216159	9	~1996
181108751	362217503	9	~1996
181108943	362217887	9	~1996
181115579	362231159	9	~1996
181116059	362232119	9	~1996
181117877	1448943017	10	~1997
181118081	1086708487	10	~1997
181121543	362243087	9	~1996
181122191	362244383	9	~1996
181122419	1448979353	10	~1997
181126987	1811269871	10	~1997
181139111	362278223	9	~1996
181142459	362284919	9	~1996
181149119	362298239	9	~1996
181152073	3985345607	10	~1998
181152353	1086914119	10	~1997
181153919	362307839	9	~1996
181157371	7608609583	10	~1999
181158077	1449264617	10	~1997
181158083	362316167	9	~1996
181158119	362316239	9	~1996
181161089	2536255247	10	~1998
181167839	362335679	9	~1996

Exponent	Prime Factor	Digits	Year
181169999	1449359993	10	~1997
181170809	4348099417	10	~1998
181188191	1449505529	10	~1997
181188383	362376767	9	~1996
181200599	3261610783	10	~1998
181201571	362403143	9	~1996
181206359	362412719	9	~1996
181207111	3261727999	10	~1998
181207223	362414447	9	~1996
181216883	362433767	9	~1996
181218239	362436479	9	~1996
181226183	14498094641	11	~1999
181226411	362452823	9	~1996
181227383	362454767	9	~1996
181229677	1087378063	10	~1997
181250351	362500703	9	~1996
181261231	1812612311	10	~1997
181265177	1450121417	10	~1997
181269073	1087614439	10	~1997
181272239	9063611951	10	~1999
181273343	362546687	9	~1996
181276643	362553287	9	~1996
181278431	362556863	9	~1996
181281143	362562287	9	~1996
181283077	1087698463	10	~1997

Exponent	Prime Factor	Digits	Year
181283951	362567903	9	~1996
181285619	362571239	9	~1996
181288643	362577287	9	~1996
181289861	1087739167	10	~1997
181294499	362588999	9	~1996
181295519	362591039	9	~1996
181304339	362608679	9	~1996
181305539	362611079	9	~1996
181307891	362615783	9	~1996
181308371	362616743	9	~1996
181310303	362620607	9	~1996
181312223	362624447	9	~1996
181313351	362626703	9	~1996
181313683	4351528393	10	~1998
181314803	362629607	9	~1996
181316879	362633759	9	~1996
181318799	362637599	9	~1996
181319459	362638919	9	~1996
181321403	362642807	9	~1996
181322783	362645567	9	~1996
181322881	3989103383	10	~1998
181324721	1087948327	10	~1997
181325999	362651999	9	~1996
181331879	362663759	9	~1996
181334819	362669639	9	~1996

5.456.260 digits

26-03-22