Small Mersenne Prime Factors (page 3010/5760)

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
181337171	362674343	9	~1996
181347851	362695703	9	~1996
181350901	5440527031	10	~1998
181353713	2538951983	10	~1998
181356011	362712023	9	~1996
181359443	362718887	9	~1996
181359863	4715356439	10	~1998
181361039	362722079	9	~1996
181367183	362734367	9	~1996
181368251	362736503	9	~1996
181368371	362736743	9	~1996
181368659	14509492721	11	~1999
181371301	1088227807	10	~1997
181372511	362745023	9	~1996
181373273	2539225823	10	~1998
181375163	362750327	9	~1996
181376231	362752463	9	~1996
181379459	362758919	9	~1996
181382533	3990415727	10	~1998
181385969	1451087753	10	~1997
181387379	362774759	9	~1996
181389251	362778503	9	~1996
181392773	1088356639	10	~1997
181396199	362792399	9	~1996
181398221	1088389327	10	~1997

Exponent	Prime Factor	Digits	Year
181400099	362800199	9	~1996
181400749	4353617977	10	~1998
181406557	1088439343	10	~1997
181406663	362813327	9	~1996
181417799	1451342393	10	~1997
181421039	362842079	9	~1996
181423331	362846663	9	~1996
181429331	362858663	9	~1996
181434839	362869679	9	~1996
181437779	362875559	9	~1996
181439831	362879663	9	~1996
181440299	362880599	9	~1996
181442057	2540188799	10	~1998
181442099	362884199	9	~1996
181447807	3266060527	10	~1998
181449797	1088698783	10	~1997
181451603	362903207	9	~1996
181453799	362907599	9	~1996
181454543	362909087	9	~1996
181456043	362912087	9	~1996
181457699	1451661593	10	~1997
181458457	1088750743	10	~1997
181461317	1088767903	10	~1997
181463339	362926679	9	~1996
181466231	362932463	9	~1996

Exponent	Prime Factor	Digits	Year
181476959	362953919	9	~1996
181481213	2540736983	10	~1998
181484063	362968127	9	~1996
181484423	362968847	9	~1996
181486523	362973047	9	~1996
181494011	362988023	9	~1996
181496827	1814968271	10	~1997
181499117	1088994703	10	~1997
181499159	362998319	9	~1996
181504331	363008663	9	~1996
181504343	363008687	9	~1996
181505321	1089031927	10	~1997
181505531	363011063	9	~1996
181517411	363034823	9	~1996
181520147	1452161177	10	~1997
181522619	8713085713	10	~1999
181526159	4356627817	10	~1998
181531027	6172054919	10	~1999
181534571	363069143	9	~1996
181536737	2541514319	10	~1998
181540571	363081143	9	~1996
181544399	363088799	9	~1996
181545061	2904720977	10	~1998
181545971	363091943	9	~1996
181546499	363092999	9	~1996

Exponent	Prime Factor	Digits	Year
181551323	363102647	9	~1996
181555739	3268003303	10	~1998
181556339	363112679	9	~1996
181556759	363113519	9	~1996
181558823	363117647	9	~1996
181561883	363123767	9	~1996
181564763	363129527	9	~1996
181566551	363133103	9	~1996
181570979	363141959	9	~1996
181579213	1089475279	10	~1997
181580183	363160367	9	~1996
181582957	1089497743	10	~1997
181584479	363168959	9	~1996
181585511	363171023	9	~1996
181586063	363172127	9	~1996
181598243	363196487	9	~1996
181601839	78451994449	11	~2001
181602023	363204047	9	~1996
181605563	363211127	9	~1996
181609321	5448279631	10	~1998
181610413	2905766609	10	~1998
181616063	363232127	9	~1996
181618631	363237263	9	~1996
181622069	4358929657	10	~1998
181622663	363245327	9	~1996

5.456.260 digits

26-03-22