Small Mersenne Prime Factors (page 2750/5145)

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
179663579	359327159	9	~1995
179664113	1077984679	10	~1997
179667221	18326056543	11	~2000
179667773	1078006639	10	~1997
179673419	359346839	9	~1995
179676743	359353487	9	~1995
179679901	3952957823	10	~1998
179680223	359360447	9	~1995
179681291	359362583	9	~1995
179690737	1078144423	10	~1997
179697491	359394983	9	~1995
179702951	1437623609	10	~1997
179703913	1078223479	10	~1997
179707439	359414879	9	~1995
179708497	1078250983	10	~1997
179712119	359424239	9	~1995
179713223	359426447	9	~1995
179717477	1078304863	10	~1997
179722883	359445767	9	~1995
179723543	359447087	9	~1995
179723659	15815681993	11	~1999
179727011	359454023	9	~1995
179728663	6110774543	10	~1998
179728817	1078372903	10	~1997
179729111	359458223	9	~1995

Exponent	Prime Factor	Digits	Year
179731897	1078391383	10	~1997
179734601	1078407607	10	~1997
179735651	359471303	9	~1995
179740919	359481839	9	~1995
179748671	359497343	9	~1995
179749321	3954485063	10	~1998
179755811	359511623	9	~1995
179761061	1078566367	10	~1997
179762351	359524703	9	~1995
179769671	359539343	9	~1995
179772371	359544743	9	~1995
179773799	359547599	9	~1995
179775779	359551559	9	~1995
179777231	359554463	9	~1995
179777831	3236000959	10	~1998
179781359	359562719	9	~1995
179788949	1438311593	10	~1997
179790323	359580647	9	~1995
179794319	359588639	9	~1995
179794817	1078768903	10	~1997
179798471	359596943	9	~1995
179803249	3955671479	10	~1998
179806703	359613407	9	~1995
179809919	359619839	9	~1995
179812739	359625479	9	~1995

Exponent	Prime Factor	Digits	Year
179814779	359629559	9	~1995
179816891	359633783	9	~1995
179816999	1438535993	10	~1997
179817173	1078903039	10	~1997
179818211	359636423	9	~1995
179826557	2517571799	10	~1998
179833583	359667167	9	~1995
179834339	359668679	9	~1995
179834783	359669567	9	~1995
179854061	1079124367	10	~1997
179867759	3237619663	10	~1998
179868191	359736383	9	~1995
179871533	1079229199	10	~1997
179872621	1079235727	10	~1997
179874139	1798741391	10	~1997
179877851	359755703	9	~1995
179880577	1079283463	10	~1997
179880937	2878094993	10	~1998
179882231	14390578481	11	~1999
179883923	359767847	9	~1995
179883971	1439071769	10	~1997
179884559	359769119	9	~1995
179884619	1439076953	10	~1997
179896799	8635046353	10	~1999
179904971	359809943	9	~1995

Exponent	Prime Factor	Digits	Year
179911103	359822207	9	~1995
179912527	1799125271	10	~1997
179916371	359832743	9	~1995
179918159	359836319	9	~1995
179922779	359845559	9	~1995
179926897	1079561383	10	~1997
179931701	8636721649	10	~1999
179942281	3958730183	10	~1998
179943143	359886287	9	~1995
179953703	359907407	9	~1995
179962579	3239326423	10	~1998
179963831	359927663	9	~1995
179963873	1079783239	10	~1997
179968091	359936183	9	~1995
179968559	359937119	9	~1995
179971091	359942183	9	~1995
179978339	359956679	9	~1995
179982851	359965703	9	~1995
179985161	1079910967	10	~1997
179985623	359971247	9	~1995
179987593	1079925559	10	~1997
179988983	359977967	9	~1995
180003881	1440031049	10	~1997
180008399	360016799	9	~1995
180010973	1080065839	10	~1997

4.843.404 digits

25-06-08