Small Mersenne Prime Factors (page 2878/5040)

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
257049959	514099919	9	~1997
257055719	514111439	9	~1997
257056259	514112519	9	~1997
257059129	20050612063	11	~2001
257075099	514150199	9	~1997
257075639	514151279	9	~1997
257075711	514151423	9	~1997
257077081	7712312431	10	~2000
257087339	514174679	9	~1997
257089643	514179287	9	~1997
257092457	1542554743	10	~1998
257095703	514191407	9	~1997
257107703	514215407	9	~1997
257116259	514232519	9	~1997
257121503	514243007	9	~1997
257125607	2057004857	10	~1998
257140511	514281023	9	~1997
257144663	514289327	9	~1997
257147171	514294343	9	~1997
257158463	514316927	9	~1997
257163239	514326479	9	~1997
257173747	2571737471	10	~1998
257176721	1543060327	10	~1998
257177339	514354679	9	~1997
257177951	514355903	9	~1997

Exponent	Prime Factor	Digits	Year
257179081	4114865297	10	~1999
257179661	2057437289	10	~1998
257181863	514363727	9	~1997
257182559	514365119	9	~1997
257186101	1543116607	10	~1998
257188703	514377407	9	~1997
257204999	514409999	9	~1997
257216159	514432319	9	~1997
257222411	514444823	9	~1997
257222629	22635591353	11	~2001
257226059	514452119	9	~1997
257241431	514482863	9	~1997
257241923	514483847	9	~1997
257250551	514501103	9	~1997
257254559	514509119	9	~1997
257261821	1543570927	10	~1998
257264099	514528199	9	~1997
257268359	514536719	9	~1997
257277899	514555799	9	~1997
257282699	514565399	9	~1997
257286203	514572407	9	~1997
257288963	514577927	9	~1997
257291633	1543749799	10	~1998
257299151	514598303	9	~1997
257301683	514603367	9	~1997

Exponent	Prime Factor	Digits	Year
257316133	1543896799	10	~1998
257328733	1543972399	10	~1998
257331671	514663343	9	~1997
257334659	514669319	9	~1997
257337911	514675823	9	~1997
257342297	1544053783	10	~1998
257352157	1544112943	10	~1998
257352301	1544113807	10	~1998
257363591	514727183	9	~1997
257371451	514742903	9	~1997
257374079	514748159	9	~1997
257374919	514749839	9	~1997
257378519	514757039	9	~1997
257378783	514757567	9	~1997
257381123	514762247	9	~1997
257382659	514765319	9	~1997
257393231	514786463	9	~1997
257394251	514788503	9	~1997
257398391	514796783	9	~1997
257401271	514802543	9	~1997
257406839	514813679	9	~1997
257416337	1544498023	10	~1998
257417603	514835207	9	~1997
257421947	6692970623	10	~1999
257426531	514853063	9	~1997

Exponent	Prime Factor	Digits	Year
257435543	514871087	9	~1997
257443919	514887839	9	~1997
257449859	29349283927	11	~2001
257450027	2059600217	10	~1998
257452883	514905767	9	~1997
257453351	514906703	9	~1997
257455223	514910447	9	~1997
257463191	514926383	9	~1997
257469263	514938527	9	~1997
257472263	514944527	9	~1997
257479283	514958567	9	~1997
257481683	514963367	9	~1997
257496779	514993559	9	~1997
257498159	514996319	9	~1997
257506043	515012087	9	~1997
257516159	515032319	9	~1997
257525699	515051399	9	~1997
257542003	6181008073	10	~1999
257543411	515086823	9	~1997
257545933	4120734929	10	~1999
257545943	515091887	9	~1997
257553761	1545322567	10	~1998
257554679	515109359	9	~1997
257565131	515130263	9	~1997
257566219	2575662191	10	~1998

4.739.325 digits

25-04-20