Small Mersenne Prime Factors (page 4287/5070)

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	Dig.	Year
10205981111	20411962223	11	~2009
10206175103	20412350207	11	~2009
10207811147	81662489177	11	~2011
10207979471	20415958943	11	~2009
10208117663	20416235327	11	~2009
10208828521	61252971127	11	~2010
10209750059	245034001417	12	~2012
10210265063	20420530127	11	~2009
10211063747	81688509977	11	~2011
10211304791	20422609583	11	~2009
10211458693	61268752159	11	~2010
10211479919	20422959839	11	~2009
10211577539	20423155079	11	~2009
10211578961	81692631689	11	~2011
10211931347	81695450777	11	~2011
10212136399	102121363991	12	~2011
10212186119	20424372239	11	~2009
10213385051	20426770103	11	~2009
10213443061	61280658367	11	~2010
10213819787	81710558297	11	~2011
10213840751	183849133519	12	~2012
10213875437	81711003497	11	~2011
10214471903	20428943807	11	~2009
10215231083	20430462167	11	~2009
10215267983	20430535967	11	~2009

Exponent	Prime Factor	Dig.	Year
10215354059	20430708119	11	~2009
10215363659	20430727319	11	~2009
10215574661	61293447967	11	~2010
10216034747	81728277977	11	~2011
10216553603	20433107207	11	~2009
10217740343	20435480687	11	~2009
10217826551	20435653103	11	~2009
10218154211	20436308423	11	~2009
10218167471	20436334943	11	~2009
10218484319	81747874553	11	~2011
10218526229	81748209833	11	~2011
10218981959	20437963919	11	~2009
10219495463	20438990927	11	~2009
10219737623	20439475247	11	~2009
10220704211	20441408423	11	~2009
10221031001	61326186007	11	~2010
10221318797	61327912783	11	~2010
10221453899	183986170183	12	~2012
10221515543	20443031087	11	~2009
10221922723	347545372583	12	~2012
10222514639	20445029279	11	~2009
10222630673	61335784039	11	~2010
10223015651	81784125209	11	~2011
10223392919	20446785839	11	~2009
10224247343	20448494687	11	~2009

Exponent	Prime Factor	Dig.	Year
10224305111	20448610223	11	~2009
10224522023	20449044047	11	~2009
10224722161	61348332967	11	~2010
10224871931	20449743863	11	~2009
10225608779	20451217559	11	~2009
10225873571	20451747143	11	~2009
10226253677	61357522063	11	~2010
10226267483	20452534967	11	~2009
10226625659	20453251319	11	~2009
10226755417	61360532503	11	~2010
10226852243	20453704487	11	~2009
10227117863	20454235727	11	~2009
10227192383	20454384767	11	~2009
10227413771	20454827543	11	~2009
10227894251	20455788503	11	~2009
10228132261	61368793567	11	~2010
10228388231	20456776463	11	~2009
10228886183	20457772367	11	~2009
10229251933	736506139177	12	~2013
10229714743	102297147431	12	~2011
10230909191	20461818383	11	~2009
10231014071	20462028143	11	~2009
10231205879	20462411759	11	~2009
10231331917	61387991503	11	~2010
10232016863	20464033727	11	~2009

Exponent	Prime Factor	Dig.	Year
10232446331	20464892663	11	~2009
10232493569	81859948553	11	~2011
10232642291	20465284583	11	~2009
10232860223	20465720447	11	~2009
10232922881	61397537287	11	~2010
10234055803	102340558031	12	~2011
10234658771	20469317543	11	~2009
10234796531	20469593063	11	~2009
10235619203	20471238407	11	~2009
10236567839	20473135679	11	~2009
10237047479	184266854623	12	~2012
10237235377	61423412263	11	~2010
10237825061	61426950367	11	~2010
10238440559	20476881119	11	~2009
10238493623	20476987247	11	~2009
10238505083	20477010167	11	~2009
10238942783	20477885567	11	~2009
10239191999	20478383999	11	~2009
10239915061	61439490367	11	~2010
10239923411	20479846823	11	~2009
10240039499	20480078999	11	~2009
10240428899	20480857799	11	~2009
10240495879	102404958791	12	~2011
10240931993	143373047903	12	~2011
10241349857	81930798857	11	~2011

4.768.925 digits

25-05-04