Small Mersenne Prime Factors (page 2881/5070)

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
250935851	501871703	9	~1997
250941503	501883007	9	~1997
250941773	1505650639	10	~1998
250948739	501897479	9	~1997
250951859	501903719	9	~1997
250952363	501904727	9	~1997
250952423	501904847	9	~1997
250953971	501907943	9	~1997
250954883	501909767	9	~1997
250956479	501912959	9	~1997
250964783	501929567	9	~1997
250979371	2509793711	10	~1998
250980683	501961367	9	~1997
250981751	501963503	9	~1997
250983851	501967703	9	~1997
250994363	501988727	9	~1997
250999181	1505995087	10	~1998
251005457	1506032743	10	~1998
251008463	502016927	9	~1997
251030051	502060103	9	~1997
251031191	502062383	9	~1997
251042783	502085567	9	~1997
251049371	502098743	9	~1997
251052773	3514738823	10	~1999
251084243	502168487	9	~1997

Exponent	Prime Factor	Digits	Year
251086279	2510862791	10	~1998
251090039	502180079	9	~1997
251094251	502188503	9	~1997
251112271	14564511719	11	~2000
251134679	502269359	9	~1997
251137811	502275623	9	~1997
251139803	502279607	9	~1997
251141797	1506850783	10	~1998
251142707	2009141657	10	~1998
251144759	502289519	9	~1997
251155763	502311527	9	~1997
251157757	1506946543	10	~1998
251160191	502320383	9	~1997
251160443	502320887	9	~1997
251166791	502333583	9	~1997
251168699	502337399	9	~1997
251172461	2009379689	10	~1998
251185199	502370399	9	~1997
251194313	1507165879	10	~1998
251216723	502433447	9	~1997
251217257	2009738057	10	~1998
251219743	28639050703	11	~2001
251220659	502441319	9	~1997
251229551	502459103	9	~1997
251233867	2512338671	10	~1998

Exponent	Prime Factor	Digits	Year
251236619	502473239	9	~1997
251239343	502478687	9	~1997
251263871	502527743	9	~1997
251274077	3517837079	10	~1999
251274983	502549967	9	~1997
251276611	2512766111	10	~1998
251291681	1507750087	10	~1998
251294723	502589447	9	~1997
251300927	2010407417	10	~1998
251301689	2010413513	10	~1998
251301781	5528639183	10	~1999
251306333	1507837999	10	~1998
251307971	502615943	9	~1997
251324291	502648583	9	~1997
251333591	502667183	9	~1997
251340851	502681703	9	~1997
251341199	502682399	9	~1997
251342219	502684439	9	~1997
251345197	1508071183	10	~1998
251345651	2010765209	10	~1998
251351543	502703087	9	~1997
251353919	502707839	9	~1997
251361179	502722359	9	~1997
251363951	502727903	9	~1997
251367191	502734383	9	~1997

Exponent	Prime Factor	Digits	Year
251368979	502737959	9	~1997
251370593	1508223559	10	~1998
251374031	502748063	9	~1997
251382487	2513824871	10	~1998
251383739	502767479	9	~1997
251387207	6536067383	10	~1999
251392943	502785887	9	~1997
251392961	2011143689	10	~1998
251427359	502854719	9	~1997
251432003	502864007	9	~1997
251441243	502882487	9	~1997
251455049	3520370687	10	~1999
251455199	502910399	9	~1997
251460721	7543821631	10	~1999
251464067	2011712537	10	~1998
251470559	502941119	9	~1997
251487959	502975919	9	~1997
251491043	502982087	9	~1997
251501303	503002607	9	~1997
251501363	503002727	9	~1997
251509031	503018063	9	~1997
251546591	503093183	9	~1997
251552579	503105159	9	~1997
251558663	503117327	9	~1997
251564843	503129687	9	~1997

4.768.925 digits

25-05-04