Small Mersenne Prime Factors (page 4100/5460)

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
2547480791	5094961583	10	~2004
2547533327	20380266617	11	~2006
2547644699	5095289399	10	~2004
2547770327	20382162617	11	~2006
2547790919	5095581839	10	~2004
2547995423	5095990847	10	~2004
2548016963	5096033927	10	~2004
2548048103	5096096207	10	~2004
2548088723	5096177447	10	~2004
2548190891	5096381783	10	~2004
2548225991	107025491623	12	~2008
2548285511	5096571023	10	~2004
2548302671	5096605343	10	~2004
2548341671	5096683343	10	~2004
2548353383	5096706767	10	~2004
2548354481	20386835849	11	~2006
2548360271	5096720543	10	~2004
2548466003	5096932007	10	~2004
2548541881	117232926527	12	~2008
2548601399	20388811193	11	~2006
2548660391	20389283129	11	~2006
2548803527	20390428217	11	~2006
2548825039	25488250391	11	~2006
2548848959	5097697919	10	~2004
2548890143	5097780287	10	~2004

Exponent	Prime Factor	Digits	Year
2548971059	5097942119	10	~2004
2548971493	15293828959	11	~2006
2548984103	5097968207	10	~2004
2549027531	5098055063	10	~2004
2549034479	5098068959	10	~2004
2549052563	5098105127	10	~2004
2549113163	5098226327	10	~2004
2549121059	5098242119	10	~2004
2549136983	5098273967	10	~2004
2549170187	20393361497	11	~2006
2549379671	5098759343	10	~2004
2549421827	45889592887	11	~2007
2549624939	5099249879	10	~2004
2549697239	5099394479	10	~2004
2549705681	15298234087	11	~2006
2549726303	142784672969	12	~2008
2549755079	20398040633	11	~2006
2549770117	15298620703	11	~2006
2549864363	5099728727	10	~2004
2549877833	76496334991	11	~2007
2549884223	5099768447	10	~2004
2550064799	5100129599	10	~2004
2550073451	5100146903	10	~2004
2550180469	122408662513	12	~2008
2550208231	45903748159	11	~2007

Exponent	Prime Factor	Digits	Year
2550277571	5100555143	10	~2004
2550375323	5100750647	10	~2004
2550469511	5100939023	10	~2004
2550509723	5101019447	10	~2004
2550569663	5101139327	10	~2004
2550588563	5101177127	10	~2004
2550816683	5101633367	10	~2004
2550823661	20406589289	11	~2006
2550966697	15305800183	11	~2006
2550966791	5101933583	10	~2004
2550997439	5101994879	10	~2004
2551071443	5102142887	10	~2004
2551092443	5102184887	10	~2004
2551125491	5102250983	10	~2004
2551178213	15307069279	11	~2006
2551181603	5102363207	10	~2004
2551211783	5102423567	10	~2004
2551235723	5102471447	10	~2004
2551369559	5102739119	10	~2004
2551398803	5102797607	10	~2004
2551426763	5102853527	10	~2004
2551469579	5102939159	10	~2004
2551475471	5102950943	10	~2004
2551496963	5102993927	10	~2004
2551572623	5103145247	10	~2004

Exponent	Prime Factor	Digits	Year
2551588211	5103176423	10	~2004
2551619831	5103239663	10	~2004
2552064737	15312388423	11	~2006
2552072423	5104144847	10	~2004
2552166719	5104333439	10	~2004
2552193359	5104386719	10	~2004
2552208727	25522087271	11	~2006
2552248823	5104497647	10	~2004
2552252161	15313512967	11	~2006
2552286791	5104573583	10	~2004
2552329583	5104659167	10	~2004
2552351773	102094070921	12	~2008
2552412413	15314474479	11	~2006
2552457161	15314742967	11	~2006
2552516117	15315096703	11	~2006
2552602103	5105204207	10	~2004
2552671871	5105343743	10	~2004
2552767559	5105535119	10	~2004
2552897219	5105794439	10	~2004
2552925911	5105851823	10	~2004
2552930903	5105861807	10	~2004
2552931377	15317588263	11	~2006
2552933711	5105867423	10	~2004
2553090383	5106180767	10	~2004
2553246743	5106493487	10	~2004

5.157.210 digits

25-11-02