Small Mersenne Prime Factors (page 2967/5025)

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
315877241	2527017929	10	~1999
315880199	631760399	9	~1997
315887063	631774127	9	~1997
315887471	631774943	9	~1997
315898559	631797119	9	~1997
315913319	631826639	9	~1997
315932219	631864439	9	~1997
315937201	1895623207	10	~1999
315945577	1895673463	10	~1999
315951899	631903799	9	~1997
315957787	3159577871	10	~1999
315963731	631927463	9	~1997
315964919	631929839	9	~1997
315968903	631937807	9	~1997
315970463	631940927	9	~1997
315972323	631944647	9	~1997
315976439	631952879	9	~1997
315981067	5687659207	10	~2000
315986147	8215639823	10	~2000
315986459	631972919	9	~1997
315994403	631988807	9	~1997
315998279	631996559	9	~1997
316000271	632000543	9	~1997
316015229	47402284351	11	~2002
316024073	7584577753	10	~2000

Exponent	Prime Factor	Digits	Year
316025219	13273059199	11	~2001
316028819	2528230553	10	~1999
316041983	632083967	9	~1997
316042151	632084303	9	~1997
316042943	632085887	9	~1997
316059899	632119799	9	~1997
316061209	9481836271	10	~2000
316082159	632164319	9	~1997
316084343	632168687	9	~1997
316090823	632181647	9	~1997
316101239	632202479	9	~1997
316109663	632219327	9	~1997
316120379	632240759	9	~1997
316121077	1896726463	10	~1999
316130057	4425820799	10	~1999
316134911	632269823	9	~1997
316142041	1896852247	10	~1999
316166681	1897000087	10	~1999
316168799	632337599	9	~1997
316171693	1897030159	10	~1999
316189259	632378519	9	~1997
316203911	632407823	9	~1997
316218599	632437199	9	~1997
316233341	1897400047	10	~1999
316269491	632538983	9	~1997

Exponent	Prime Factor	Digits	Year
316275419	632550839	9	~1997
316275601	1897653607	10	~1999
316276469	2530211753	10	~1999
316278971	632557943	9	~1997
316281191	2530249529	10	~1999
316284233	1897705399	10	~1999
316287551	632575103	9	~1997
316296443	632592887	9	~1997
316297063	3162970631	10	~1999
316304273	1897825639	10	~1999
316305443	632610887	9	~1997
316306583	632613167	9	~1997
316308497	7591403929	10	~2000
316311587	2530492697	10	~1999
316312571	2530500569	10	~1999
316322411	632644823	9	~1997
316325761	1897954567	10	~1999
316331927	2530655417	10	~1999
316338719	632677439	9	~1997
316341677	2530733417	10	~1999
316347371	632694743	9	~1997
316351151	632702303	9	~1997
316358279	632716559	9	~1997
316359887	23410631639	11	~2001
316362383	632724767	9	~1997

Exponent	Prime Factor	Digits	Year
316365653	1898193919	10	~1999
316366139	632732279	9	~1997
316383803	632767607	9	~1997
316399793	17718388409	11	~2001
316406537	1898439223	10	~1999
316408019	632816039	9	~1997
316415051	632830103	9	~1997
316421471	632842943	9	~1997
316422863	632845727	9	~1997
316431611	632863223	9	~1997
316440697	5063051153	10	~2000
316443851	2531550809	10	~1999
316469711	632939423	9	~1997
316470611	632941223	9	~1997
316486559	632973119	9	~1997
316492613	1898955679	10	~1999
316511171	633022343	9	~1997
316512029	2532096233	10	~1999
316523891	633047783	9	~1997
316534139	633068279	9	~1997
316535951	633071903	9	~1997
316537079	633074159	9	~1997
316541999	633083999	9	~1997
316548917	1899293503	10	~1999
316551083	633102167	9	~1997

4.724.182 digits

25-04-13