Small Mersenne Prime Factors (page 2947/5070)

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
288229751	576459503	9	~1997
288241139	576482279	9	~1997
288247493	1729484959	10	~1998
288247969	6341455319	10	~2000
288256517	2306052137	10	~1999
288258203	576516407	9	~1997
288301451	576602903	9	~1997
288303023	576606047	9	~1997
288310931	576621863	9	~1997
288321179	576642359	9	~1997
288321263	576642527	9	~1997
288326209	6919829017	10	~2000
288332111	576664223	9	~1997
288336011	576672023	9	~1997
288336703	4613387249	10	~1999
288341303	576682607	9	~1997
288342611	576685223	9	~1997
288363143	576726287	9	~1997
288364933	1730189599	10	~1998
288366131	576732263	9	~1997
288406093	1730436559	10	~1998
288411131	576822263	9	~1997
288422903	576845807	9	~1997
288423041	2307384329	10	~1999
288434737	1730608423	10	~1998

Exponent	Prime Factor	Digits	Year
288452519	576905039	9	~1997
288464123	14423206151	11	~2000
288466859	576933719	9	~1997
288471817	4615549073	10	~1999
288476491	5192576839	10	~1999
288486551	16155246857	11	~2001
288490151	576980303	9	~1997
288491519	576983039	9	~1997
288511259	577022519	9	~1997
288523919	577047839	9	~1997
288534401	2308275209	10	~1999
288553379	577106759	9	~1997
288555383	577110767	9	~1997
288582083	577164167	9	~1997
288585221	242411585641	12	~2003
288591299	2308730393	10	~1999
288596531	577193063	9	~1997
288606761	1731640567	10	~1998
288606961	1731641767	10	~1998
288608051	577216103	9	~1997
288614863	11544594521	11	~2000
288622979	577245959	9	~1997
288624599	577249199	9	~1997
288628919	577257839	9	~1997
288631157	1731786943	10	~1998

Exponent	Prime Factor	Digits	Year
288634033	8659020991	10	~2000
288640151	577280303	9	~1997
288642083	577284167	9	~1997
288649271	577298543	9	~1997
288657119	577314239	9	~1997
288658943	577317887	9	~1997
288664991	577329983	9	~1997
288667163	577334327	9	~1997
288668903	577337807	9	~1997
288674063	577348127	9	~1997
288675041	1732050247	10	~1998
288681311	577362623	9	~1997
288683819	577367639	9	~1997
288685933	4618974929	10	~1999
288695417	1732172503	10	~1998
288703823	577407647	9	~1997
288708683	577417367	9	~1997
288715799	5196884383	10	~1999
288717197	6929212729	10	~2000
288718691	577437383	9	~1997
288730633	1732383799	10	~1998
288743537	2309948297	10	~1999
288744479	577488959	9	~1997
288756239	577512479	9	~1997
288760601	1732563607	10	~1998

Exponent	Prime Factor	Digits	Year
288769891	2887698911	10	~1999
288770411	577540823	9	~1997
288773063	577546127	9	~1997
288783611	2310268889	10	~1999
288785039	577570079	9	~1997
288799403	577598807	9	~1997
288808313	1732849879	10	~1998
288816467	2310531737	10	~1999
288821257	1732927543	10	~1998
288824531	577649063	9	~1997
288830513	1732983079	10	~1998
288836939	577673879	9	~1997
288848123	577696247	9	~1997
288853633	1733121799	10	~1998
288865463	577730927	9	~1997
288871501	1733229007	10	~1998
288873737	2310989897	10	~1999
288876839	577753679	9	~1997
288877763	577755527	9	~1997
288878861	2311030889	10	~1999
288884249	4044379487	10	~1999
288886931	577773863	9	~1997
288891503	577783007	9	~1997
288901163	577802327	9	~1997
288913139	577826279	9	~1997

4.768.925 digits

25-05-04