Small Mersenne Prime Factors (page 4354/5190)

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
9435430561	56612583367	11	~2010
9435549677	132097695479	12	~2011
9436395263	18872790527	11	~2009
9436902071	18873804143	11	~2009
9437020091	18874040183	11	~2009
9437227831	94372278311	11	~2011
9437348183	18874696367	11	~2009
9437408819	18874817639	11	~2009
9437434151	18874868303	11	~2009
9437545739	18875091479	11	~2009
9437603663	18875207327	11	~2009
9438615083	18877230167	11	~2009
9438637139	18877274279	11	~2009
9438850703	18877701407	11	~2009
9438885671	18877771343	11	~2009
9439113511	151025816177	12	~2011
9439167371	75513338969	11	~2010
9439262467	94392624671	11	~2011
9440016073	56640096439	11	~2010
9440114471	18880228943	11	~2009
9440504197	56643025183	11	~2010
9441011351	18882022703	11	~2009
9441745723	94417457231	11	~2011
9442605713	132196479983	12	~2011
9443649487	169985690767	12	~2011

Exponent	Prime Factor	Dig.	Year
9443929619	75551436953	11	~2010
9444747311	18889494623	11	~2009
9445537573	56673225439	11	~2010
9445918763	18891837527	11	~2009
9446014031	18892028063	11	~2009
9446194259	18892388519	11	~2009
9446814121	56680884727	11	~2010
9446849543	18893699087	11	~2009
9446978003	18893956007	11	~2009
9447399191	18894798383	11	~2009
9447829921	56686979527	11	~2010
9448430531	18896861063	11	~2009
9448877519	18897755039	11	~2009
9449575777	56697454663	11	~2010
9449732819	18899465639	11	~2009
9450167543	18900335087	11	~2009
9450291659	18900583319	11	~2009
9451368233	56708209399	11	~2010
9451436699	18902873399	11	~2009
9452406839	18904813679	11	~2009
9452826203	18905652407	11	~2009
9452848571	18905697143	11	~2009
9452941013	56717646079	11	~2010
9453101051	18906202103	11	~2009
9453652459	94536524591	11	~2011

Exponent	Prime Factor	Dig.	Year
9454254059	18908508119	11	~2009
9455736263	18911472527	11	~2009
9455963591	18911927183	11	~2009
9457183559	18914367119	11	~2009
9457319279	18914638559	11	~2009
9457762451	75662099609	11	~2010
9457782353	226986776473	12	~2012
9457863913	208073006087	12	~2011
9457870979	18915741959	11	~2009
9458346983	18916693967	11	~2009
9458456099	18916912199	11	~2009
9458773799	18917547599	11	~2009
9459084683	18918169367	11	~2009
9459126311	18918252623	11	~2009
9459412439	18918824879	11	~2009
9460162661	56760975967	11	~2010
9460373647	170286725647	12	~2011
9460566023	18921132047	11	~2009
9460953941	56765723647	11	~2010
9461070779	18922141559	11	~2009
9461097761	56766586567	11	~2010
9461473201	56768839207	11	~2010
9461486519	18922973039	11	~2009
9462934939	170332828903	12	~2011
9463153223	227115677353	12	~2012

Exponent	Prime Factor	Dig.	Year
9463308317	132486316439	12	~2011
9463451423	18926902847	11	~2009
9463490693	56780944159	11	~2010
9463495403	18926990807	11	~2009
9463640203	94636402031	11	~2011
9463774781	56782648687	11	~2010
9464551717	56787310303	11	~2010
9464684231	18929368463	11	~2009
9464708303	18929416607	11	~2009
9465151459	397536361279	12	~2012
9465340403	18930680807	11	~2009
9465467351	170378412319	12	~2011
9465531479	18931062959	11	~2009
9466242419	18932484839	11	~2009
9466596767	246131515943	12	~2012
9466648463	18933296927	11	~2009
9466837199	18933674399	11	~2009
9466989803	18933979607	11	~2009
9467100677	56802604063	11	~2010
9467214377	75737715017	11	~2010
9467394709	208282683599	12	~2011
9467414711	18934829423	11	~2009
9467446883	18934893767	11	~2009
9467811181	56806867087	11	~2010
9468112811	75744902489	11	~2010

4.888.230 digits

25-06-29