Small Mersenne Prime Factors (page 3694/5025)

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
1838285797	11029714783	11	~2005
1838299627	18382996271	11	~2005
1838343599	3676687199	10	~2003
1838373479	3676746959	10	~2003
1838389823	3676779647	10	~2003
1838445347	14707562777	11	~2005
1838455103	3676910207	10	~2003
1838541907	18385419071	11	~2005
1838578811	3677157623	10	~2003
1838596139	3677192279	10	~2003
1838697019	18386970191	11	~2005
1838719481	14709755849	11	~2005
1838736461	11032418767	11	~2005
1838772251	3677544503	10	~2003
1838850659	3677701319	10	~2003
1838878511	3677757023	10	~2003
1838890717	11033344303	11	~2005
1838897747	14711181977	11	~2005
1839001019	3678002039	10	~2003
1839029303	3678058607	10	~2003
1839164221	11034985327	11	~2005
1839288443	3678576887	10	~2003
1839366577	11036199463	11	~2005
1839391679	3678783359	10	~2003
1839410519	14715284153	11	~2005

Exponent	Prime Factor	Digits	Year
1839434123	3678868247	10	~2003
1839571523	3679143047	10	~2003
1839636923	3679273847	10	~2003
1839662771	3679325543	10	~2003
1839909103	18399091031	11	~2005
1839946403	3679892807	10	~2003
1840088227	18400882271	11	~2005
1840156379	3680312759	10	~2003
1840178477	11041070863	11	~2005
1840234723	18402347231	11	~2005
1840309253	11041855519	11	~2005
1840413299	3680826599	10	~2003
1840426883	3680853767	10	~2003
1840444883	3680889767	10	~2003
1840473263	3680946527	10	~2003
1840488659	3680977319	10	~2003
1840502591	3681005183	10	~2003
1840519283	3681038567	10	~2003
1840591457	11043548743	11	~2005
1840605479	3681210959	10	~2003
1840609451	3681218903	10	~2003
1840621571	3681243143	10	~2003
1840638179	3681276359	10	~2003
1840657631	3681315263	10	~2003
1840696157	11044176943	11	~2005

Exponent	Prime Factor	Digits	Year
1840768571	3681537143	10	~2003
1840782791	3681565583	10	~2003
1840783079	3681566159	10	~2003
1840881893	11045291359	11	~2005
1840940879	3681881759	10	~2003
1840963013	25773482183	11	~2005
1840987553	55229626591	11	~2006
1840997351	14727978809	11	~2005
1841053391	3682106783	10	~2003
1841076551	33139377919	11	~2006
1841078471	3682156943	10	~2003
1841130359	3682260719	10	~2003
1841138723	3682277447	10	~2003
1841164217	14729313737	11	~2005
1841229443	3682458887	10	~2003
1841246779	460311694751	12	~2008
1841266019	3682532039	10	~2003
1841269501	29460312017	11	~2006
1841404739	3682809479	10	~2003
1841487503	3682975007	10	~2003
1841491163	3682982327	10	~2003
1841495651	3682991303	10	~2003
1841504921	132588354313	12	~2007
1841527607	44196662569	11	~2006
1841675639	3683351279	10	~2003

Exponent	Prime Factor	Digits	Year
1841690183	3683380367	10	~2003
1841706563	3683413127	10	~2003
1841760779	3683521559	10	~2003
1841772203	3683544407	10	~2003
1841800379	3683600759	10	~2003
1841917799	3683835599	10	~2003
1841928031	239450644031	12	~2008
1842023231	3684046463	10	~2003
1842031777	99469715959	11	~2007
1842077879	3684155759	10	~2003
1842090751	33157633519	11	~2006
1842113261	14736906089	11	~2005
1842159443	3684318887	10	~2003
1842170831	3684341663	10	~2003
1842183671	3684367343	10	~2003
1842220871	3684441743	10	~2003
1842248543	3684497087	10	~2003
1842255743	3684511487	10	~2003
1842280469	14738243753	11	~2005
1842351971	3684703943	10	~2003
1842370867	33162675607	11	~2006
1842390479	3684780959	10	~2003
1842444599	3684889199	10	~2003
1842459403	18424594031	11	~2005
1842459851	3684919703	10	~2003

4.724.182 digits

25-04-13