Small Mersenne Prime Factors (page 3688/5025)

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
1809651253	10857907519	11	~2004
1809667621	10858005727	11	~2004
1809698483	3619396967	10	~2003
1809855863	3619711727	10	~2003
1809987743	3619975487	10	~2003
1810089419	3620178839	10	~2003
1810095041	10860570247	11	~2004
1810149533	10860897199	11	~2004
1810166951	3620333903	10	~2003
1810229777	10861378663	11	~2004
1810232147	14481857177	11	~2005
1810233241	54306997231	11	~2006
1810270751	3620541503	10	~2003
1810289759	3620579519	10	~2003
1810321451	3620642903	10	~2003
1810400461	10862402767	11	~2004
1810428023	3620856047	10	~2003
1810437659	3620875319	10	~2003
1810489979	14483919833	11	~2005
1810577711	3621155423	10	~2003
1810641179	3621282359	10	~2003
1810662083	3621324167	10	~2003
1810807403	3621614807	10	~2003
1810813859	3621627719	10	~2003
1810817303	3621634607	10	~2003

Exponent	Prime Factor	Digits	Year
1810832099	3621664199	10	~2003
1810838951	3621677903	10	~2003
1810854803	3621709607	10	~2003
1810894223	3621788447	10	~2003
1810921919	3621843839	10	~2003
1810953503	3621907007	10	~2003
1810980491	3621960983	10	~2003
1811207291	3622414583	10	~2003
1811278823	3622557647	10	~2003
1811288471	3622576943	10	~2003
1811313071	3622626143	10	~2003
1811344889	14490759113	11	~2005
1811347339	76076588239	11	~2007
1811352743	3622705487	10	~2003
1811361179	3622722359	10	~2003
1811375123	3622750247	10	~2003
1811394401	14491155209	11	~2005
1811437451	3622874903	10	~2003
1811508599	3623017199	10	~2003
1811599379	3623198759	10	~2003
1811714351	3623428703	10	~2003
1811765603	3623531207	10	~2003
1811791571	3623583143	10	~2003
1811822471	3623644943	10	~2003
1811827943	3623655887	10	~2003

Exponent	Prime Factor	Digits	Year
1811966339	3623932679	10	~2003
1812020143	18120201431	11	~2005
1812040859	3624081719	10	~2003
1812096973	97853236543	11	~2007
1812232211	3624464423	10	~2003
1812233369	14497866953	11	~2005
1812256847	14498054777	11	~2005
1812260519	86988504913	11	~2007
1812280583	3624561167	10	~2003
1812356071	28997697137	11	~2006
1812363731	14498909849	11	~2005
1812372433	39872193527	11	~2006
1812377579	3624755159	10	~2003
1812396601	28998345617	11	~2006
1812418799	3624837599	10	~2003
1812510803	3625021607	10	~2003
1812727811	3625455623	10	~2003
1812746251	18127462511	11	~2005
1812794339	3625588679	10	~2003
1812811163	3625622327	10	~2003
1812871877	14502975017	11	~2005
1812941243	3625882487	10	~2003
1813022611	32634406999	11	~2006
1813185091	18131850911	11	~2005
1813209971	3626419943	10	~2003

Exponent	Prime Factor	Digits	Year
1813375463	3626750927	10	~2003
1813394657	10880367943	11	~2004
1813473611	3626947223	10	~2003
1813568201	14508545609	11	~2005
1813577123	3627154247	10	~2003
1813597631	3627195263	10	~2003
1813600643	3627201287	10	~2003
1813606391	3627212783	10	~2003
1813657691	3627315383	10	~2003
1813717151	3627434303	10	~2003
1813745537	10882473223	11	~2004
1813860599	3627721199	10	~2003
1813907267	14511258137	11	~2005
1813909931	3627819863	10	~2003
1814031143	3628062287	10	~2003
1814056883	3628113767	10	~2003
1814061839	3628123679	10	~2003
1814069561	10884417367	11	~2004
1814127611	3628255223	10	~2003
1814155537	10884933223	11	~2004
1814161637	14513293097	11	~2005
1814209751	3628419503	10	~2003
1814281739	3628563479	10	~2003
1814416889	43546005337	11	~2006
1814430743	3628861487	10	~2003

4.724.182 digits

25-04-13