Small Mersenne Prime Factors (page 4450/5130)

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
15324809939	30649619879	11	~2011
15327515243	30655030487	11	~2011
15328555943	30657111887	11	~2011
15328853591	30657707183	11	~2011
15329492831	30658985663	11	~2011
15329848619	30659697239	11	~2011
15330962879	30661925759	11	~2011
15331245623	30662491247	11	~2011
15331940891	30663881783	11	~2011
15332231633	91993389799	11	~2012
15332612363	30665224727	11	~2011
15332766181	91996597087	11	~2012
15332890691	30665781383	11	~2011
15333224771	30666449543	11	~2011
15334527371	30669054743	11	~2011
15335408897	92012453383	11	~2012
15335505683	30671011367	11	~2011
15335655809	214699181327	12	~2013
15335742263	30671484527	11	~2011
15336012119	30672024239	11	~2011
15336234721	337397163863	12	~2013
15336823031	30673646063	11	~2011
15337574783	30675149567	11	~2011
15337819279	153378192791	12	~2012
15338697971	30677395943	11	~2011

Exponent	Prime Factor	Dig.	Year
15339240703	153392407031	12	~2012
15340014083	30680028167	11	~2011
15340926071	30681852143	11	~2011
15341057219	30682114439	11	~2011
15341544131	30683088263	11	~2011
15342757823	30685515647	11	~2011
15343780691	30687561383	11	~2011
15344224289	122753794313	12	~2012
15344457263	30688914527	11	~2011
15344633663	30689267327	11	~2011
15345508571	30691017143	11	~2011
15346316173	92077897039	11	~2012
15347289107	122778312857	12	~2012
15347675881	92086055287	11	~2012
15347782721	122782261769	12	~2012
15348367427	276270613687	12	~2013
15349087223	30698174447	11	~2011
15349369837	92096219023	11	~2012
15349628279	30699256559	11	~2011
15350019011	30700038023	11	~2011
15351001637	92106009823	11	~2012
15351057203	30702114407	11	~2011
15351478871	30702957743	11	~2011
15351950279	30703900559	11	~2011
15352594259	30705188519	11	~2011

Exponent	Prime Factor	Dig.	Year
15352972091	30705944183	11	~2011
15353795111	122830360889	12	~2012
15354441383	30708882767	11	~2011
15355535831	30711071663	11	~2011
15356265377	92137592263	11	~2012
15356287871	30712575743	11	~2011
15356591021	92139546127	11	~2012
15357309083	30714618167	11	~2011
15358009363	245728149809	12	~2013
15358489271	30716978543	11	~2011
15359234279	30718468559	11	~2011
15359493683	30718987367	11	~2011
15359669999	30719339999	11	~2011
15360499799	30720999599	11	~2011
15361247711	122889981689	12	~2012
15362797259	30725594519	11	~2011
15363149297	215084090159	12	~2013
15363561431	30727122863	11	~2011
15363976319	30727952639	11	~2011
15364906439	30729812879	11	~2011
15365644583	30731289167	11	~2011
15365693663	30731387327	11	~2011
15366138803	368787331273	12	~2013
15366777659	30733555319	11	~2011
15367881127	153678811271	12	~2012

Exponent	Prime Factor	Dig.	Year
15368083583	30736167167	11	~2011
15368274851	30736549703	11	~2011
15368817047	122950536377	12	~2012
15369582803	30739165607	11	~2011
15370237733	92221426399	11	~2012
15370572293	92223433759	11	~2012
15371167271	122969338169	12	~2012
15371353639	153713536391	12	~2012
15371433251	30742866503	11	~2011
15371435099	30742870199	11	~2011
15371532623	30743065247	11	~2011
15372144779	30744289559	11	~2011
15372828983	30745657967	11	~2011
15374393261	92246359567	11	~2012
15374804099	30749608199	11	~2011
15375986771	30751973543	11	~2011
15376598357	215272376999	12	~2013
15377165819	30754331639	11	~2011
15377453519	30754907039	11	~2011
15377729099	30755458199	11	~2011
15377910563	30755821127	11	~2011
15378360911	30756721823	11	~2011
15378908059	276820345063	12	~2013
15379440361	246071045777	12	~2013
15379574117	123036592937	12	~2012

4.828.532 digits

25-06-01