Small Mersenne Prime Factors (page 3879/5130)

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
2517026441	15102158647	11	~2006
2517105961	15102635767	11	~2006
2517538379	5035076759	10	~2004
2517610681	15105664087	11	~2006
2517772319	5035544639	10	~2004
2517858071	5035716143	10	~2004
2517866179	25178661791	11	~2006
2518033103	5036066207	10	~2004
2518055843	5036111687	10	~2004
2518077899	5036155799	10	~2004
2518084979	5036169959	10	~2004
2518124069	35253736967	11	~2006
2518302383	5036604767	10	~2004
2518313597	20146508777	11	~2006
2518324871	5036649743	10	~2004
2518340597	35256768359	11	~2006
2518374557	35257243799	11	~2006
2518391399	5036782799	10	~2004
2518423361	15110540167	11	~2006
2518462871	5036925743	10	~2004
2518707371	5037414743	10	~2004
2518817293	15112903759	11	~2006
2518855571	5037711143	10	~2004
2518915439	5037830879	10	~2004
2518946231	5037892463	10	~2004

Exponent	Prime Factor	Digits	Year
2519009219	5038018439	10	~2004
2519051399	5038102799	10	~2004
2519097611	5038195223	10	~2004
2519289683	5038579367	10	~2004
2519299199	5038598399	10	~2004
2519437997	15116627983	11	~2006
2519453641	15116721847	11	~2006
2519478971	5038957943	10	~2004
2519590259	5039180519	10	~2004
2519615711	5039231423	10	~2004
2519625509	20157004073	11	~2006
2519638973	15117833839	11	~2006
2519676371	5039352743	10	~2004
2519875499	5039750999	10	~2004
2519889539	5039779079	10	~2004
2519938643	5039877287	10	~2004
2519959859	5039919719	10	~2004
2519983651	45359705719	11	~2007
2520015143	5040030287	10	~2004
2520017039	5040034079	10	~2004
2520036251	5040072503	10	~2004
2520388571	5040777143	10	~2004
2520474923	5040949847	10	~2004
2520609599	5041219199	10	~2004
2520683897	20165471177	11	~2006

Exponent	Prime Factor	Digits	Year
2520744599	5041489199	10	~2004
2520827591	5041655183	10	~2004
2520888371	5041776743	10	~2004
2520909791	5041819583	10	~2004
2520922553	15125535319	11	~2006
2521136221	15126817327	11	~2006
2521161959	5042323919	10	~2004
2521446419	5042892839	10	~2004
2521451879	20171615033	11	~2006
2521454917	15128729503	11	~2006
2521455791	5042911583	10	~2004
2521463663	5042927327	10	~2004
2521479413	15128876479	11	~2006
2521486391	5042972783	10	~2004
2521499411	5042998823	10	~2004
2521503059	5043006119	10	~2004
2521680803	5043361607	10	~2004
2521757297	15130543783	11	~2006
2521788023	5043576047	10	~2004
2521865039	5043730079	10	~2004
2521961531	5043923063	10	~2004
2522111171	5044222343	10	~2004
2522151683	5044303367	10	~2004
2522282363	5044564727	10	~2004
2522286527	20178292217	11	~2006

Exponent	Prime Factor	Digits	Year
2522299387	40356790193	11	~2007
2522321159	5044642319	10	~2004
2522331353	15133988119	11	~2006
2522405279	5044810559	10	~2004
2522520527	20180164217	11	~2006
2522566979	5045133959	10	~2004
2522573303	5045146607	10	~2004
2522713211	5045426423	10	~2004
2522740991	5045481983	10	~2004
2522793173	15136759039	11	~2006
2522876159	5045752319	10	~2004
2522907433	15137444599	11	~2006
2522926331	5045852663	10	~2004
2522972951	5045945903	10	~2004
2523050171	5046100343	10	~2004
2523250199	5046500399	10	~2004
2523254957	35325569399	11	~2006
2523278423	5046556847	10	~2004
2523313571	5046627143	10	~2004
2523340331	5046680663	10	~2004
2523430319	5046860639	10	~2004
2523438023	5046876047	10	~2004
2523821437	343239715433	12	~2009
2523889499	5047778999	10	~2004
2524077323	5048154647	10	~2004

4.828.532 digits

25-06-01