Small Mersenne Prime Factors (page 4350/5190)

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
9317276939	18634553879	11	~2009
9317513339	18635026679	11	~2009
9317884343	18635768687	11	~2009
9317954819	18635909639	11	~2009
9318738497	130462338959	12	~2011
9318948323	18637896647	11	~2009
9319000343	18638000687	11	~2009
9319027331	18638054663	11	~2009
9319741199	18639482399	11	~2009
9320156771	18640313543	11	~2009
9320619239	223694861737	12	~2012
9320992277	74567938217	11	~2010
9321429011	18642858023	11	~2009
9321538619	18643077239	11	~2009
9321596731	93215967311	11	~2011
9321826433	55930958599	11	~2010
9321954203	18643908407	11	~2009
9322570261	55935421567	11	~2010
9322602337	55935614023	11	~2010
9322703639	18645407279	11	~2009
9322862771	18645725543	11	~2009
9323317931	18646635863	11	~2009
9325293311	18650586623	11	~2009
9325410431	18650820863	11	~2009
9325553899	93255538991	11	~2011

Exponent	Prime Factor	Dig.	Year
9325859771	18651719543	11	~2009
9326134943	18652269887	11	~2009
9327080869	223849940857	12	~2012
9327102563	18654205127	11	~2009
9327855211	93278552111	11	~2011
9327916463	18655832927	11	~2009
9327968063	18655936127	11	~2009
9328951319	74631610553	11	~2010
9329044223	18658088447	11	~2009
9329910311	18659820623	11	~2009
9330304547	223927309129	12	~2012
9330875843	18661751687	11	~2009
9331313063	18662626127	11	~2009
9331376699	18662753399	11	~2009
9331445303	18662890607	11	~2009
9331748177	55990489063	11	~2010
9331762991	18663525983	11	~2009
9332261377	55993568263	11	~2010
9332269313	55993615879	11	~2010
9332317199	18664634399	11	~2009
9332638297	55995829783	11	~2010
9332964911	18665929823	11	~2009
9332981771	18665963543	11	~2009
9333080213	130663122983	12	~2011
9333264071	18666528143	11	~2009

Exponent	Prime Factor	Dig.	Year
9333430451	18666860903	11	~2009
9333460583	18666921167	11	~2009
9333507863	18667015727	11	~2009
9333519737	74668157897	11	~2010
9334007653	56004045919	11	~2010
9334173083	18668346167	11	~2009
9334474703	18668949407	11	~2009
9335331899	18670663799	11	~2009
9335582579	18671165159	11	~2009
9335668103	18671336207	11	~2009
9335815019	18671630039	11	~2009
9336055643	18672111287	11	~2009
9336319243	93363192431	11	~2011
9336847259	18673694519	11	~2009
9337116671	18674233343	11	~2009
9337135823	18674271647	11	~2009
9337581779	74700654233	11	~2010
9337899071	18675798143	11	~2009
9338504801	354863182439	12	~2012
9338548357	56031290143	11	~2010
9338715671	18677431343	11	~2009
9338769491	672391403353	12	~2013
9339172763	18678345527	11	~2009
9339521819	18679043639	11	~2009
9340734131	18681468263	11	~2009

Exponent	Prime Factor	Dig.	Year
9341192279	18682384559	11	~2009
9341284333	56047705999	11	~2010
9341342537	56048055223	11	~2010
9341593111	149465489777	12	~2011
9341606171	18683212343	11	~2009
9343068803	18686137607	11	~2009
9343278701	74746229609	11	~2010
9343487399	18686974799	11	~2009
9343662001	56061972007	11	~2010
9343740743	18687481487	11	~2009
9344285813	56065714879	11	~2010
9344442539	18688885079	11	~2009
9344589301	56067535807	11	~2010
9344681239	93446812391	11	~2011
9344705099	18689410199	11	~2009
9344888939	18689777879	11	~2009
9344907571	168208336279	12	~2011
9344913551	18689827103	11	~2009
9345233113	56071398679	11	~2010
9345332519	74762660153	11	~2010
9345572051	18691144103	11	~2009
9345882599	18691765199	11	~2009
9346308611	74770468889	11	~2010
9346454807	74771638457	11	~2010
9346744019	18693488039	11	~2009

4.888.230 digits

25-06-29