Small Mersenne Prime Factors (page 2426/5190)

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
92815043	185630087	9	~1993
92816377	8167841177	10	~1997
92816771	185633543	9	~1993
92819231	185638463	9	~1993
92821891	928218911	9	~1995
92822117	556932703	9	~1994
92822699	185645399	9	~1993
92827993	556967959	9	~1994
92828591	185657183	9	~1993
92829323	185658647	9	~1993
92831159	742649273	9	~1995
92836151	742689209	9	~1995
92836391	185672783	9	~1993
92837183	185674367	9	~1993
92838191	185676383	9	~1993
92839939	928399391	9	~1995
92843417	557060503	9	~1994
92846339	185692679	9	~1993
92846879	185693759	9	~1993
92847563	185695127	9	~1993
92853119	185706239	9	~1993
92853377	742827017	9	~1995
92853577	557121463	9	~1994
92854103	185708207	9	~1993
92854379	185708759	9	~1993

Exponent	Prime Factor	Digits	Year
92854379	742835033	9
92854633	557127799	9	~1994
92855123	185710247	9	~1993
92856719	185713439	9	~1993
92857931	185715863	9	~1993
92860643	185721287	9	~1993
92861963	185723927	9	~1993
92862323	185724647	9	~1993
92865791	185731583	9	~1993
92867771	58135224647	11	~1999
92869499	185738999	9	~1993
92870279	185740559	9	~1993
92870471	185740943	9	~1993
92872789	2043201359	10	~1996
92875319	185750639	9	~1993
92876939	185753879	9	~1993
92877509	2229060217	10	~1996
92878319	185756639	9	~1993
92880191	743041529	9	~1995
92882039	185764079	9	~1993
92883017	743064137	9	~1995
92887199	185774399	9	~1993
92887799	185775599	9	~1993
92890573	557343439	9	~1994
92892937	1486286993	10	~1995

Exponent	Prime Factor	Digits	Year
92896213	1486339409	10	~1995
92896679	185793359	9	~1993
92899739	185799479	9	~1993
92903159	185806319	9	~1993
92908811	185817623	9	~1993
92914391	743315129	9	~1995
92914631	185829263	9	~1993
92915279	185830559	9	~1993
92915363	185830727	9	~1993
92915891	185831783	9	~1993
92917403	185834807	9	~1993
92920427	743363417	9	~1995
92926391	185852783	9	~1993
92927699	743421593	9	~1995
92927749	2787832471	10	~1996
92928691	1486859057	10	~1995
92928779	185857559	9	~1993
92928937	557573623	9	~1994
92929099	11151491881	11	~1998
92929933	2230318393	10	~1996
92930113	4274785199	10	~1997
92933003	185866007	9	~1993
92933411	185866823	9	~1993
92934077	743472617	9	~1995
92936411	185872823	9	~1993

Exponent	Prime Factor	Digits	Year
92936471	185872943	9	~1993
92937391	1672873039	10	~1996
92940779	185881559	9	~1993
92940839	185881679	9	~1993
92940863	185881727	9	~1993
92942939	185885879	9	~1993
92948711	185897423	9	~1993
92951711	185903423	9	~1993
92955757	557734543	9	~1994
92956091	185912183	9	~1993
92956343	185912687	9	~1993
92957279	185914559	9	~1993
92958113	557748679	9	~1994
92958953	557753719	9	~1994
92959697	743677577	9	~1995
92961199	1673301583	10	~1996
92964383	185928767	9	~1993
92964803	185929607	9	~1993
92968511	185937023	9	~1993
92972591	185945183	9	~1993
92973131	185946263	9	~1993
92973143	185946287	9	~1993
92973317	1301626439	10	~1995
92975111	185950223	9	~1993
92975999	185951999	9	~1993

4.888.230 digits

25-06-29