Small Mersenne Prime Factors (page 4806/5460)

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	Dig.	Year
21226616231	42453232463	11	~2012
21226705859	42453411719	11	~2012
21227031101	127362186607	12	~2013
21227633579	42455267159	11	~2012
21227788783	339644620529	12	~2014
21228146399	42456292799	11	~2012
21229420703	42458841407	11	~2012
21231498779	42462997559	11	~2012
21232161719	42464323439	11	~2012
21232548791	42465097583	11	~2012
21233232359	679463435489	12	~2015
21233631131	42467262263	11	~2012
21233757731	42467515463	11	~2012
21233797859	42467595719	11	~2012
21234221231	42468442463	11	~2012
21235185899	42470371799	11	~2012
21237263843	42474527687	11	~2012
21238175363	42476350727	11	~2012
21238644677	169909157417	12	~2013
21239495171	42478990343	11	~2012
21240065351	42480130703	11	~2012
21240142093	339842273489	12	~2014
21241474777	127448848663	12	~2013
21242803259	42485606519	11	~2012
21243911963	42487823927	11	~2012

Exponent	Prime Factor	Dig.	Year
21244800443	42489600887	11	~2012
21244845179	42489690359	11	~2012
21244959779	42489919559	11	~2012
21245515283	42491030567	11	~2012
21245519363	42491038727	11	~2012
21246222983	42492445967	11	~2012
21247644841	127485869047	12	~2013
21248453771	42496907543	11	~2012
21249910301	127499461807	12	~2013
21250148651	42500297303	11	~2012
21250656299	510015751177	12	~2014
21251823011	42503646023	11	~2012
21252216983	42504433967	11	~2012
21253155743	42506311487	11	~2012
21254027183	42508054367	11	~2012
21255229621	467615051663	12	~2014
21256152383	42512304767	11	~2012
21256261199	170050089593	12	~2013
21257394299	170059154393	12	~2013
21257842283	42515684567	11	~2012
21257938571	42515877143	11	~2012
21258101219	42516202439	11	~2012
21258216383	42516432767	11	~2012
21259413611	42518827223	11	~2012
21259755131	42519510263	11	~2012

Exponent	Prime Factor	Dig.	Year
21260113331	42520226663	11	~2012
21260909977	340174559633	12	~2014
21261279659	42522559319	11	~2012
21265059083	42530118167	11	~2012
21265602191	42531204383	11	~2012
21265868557	127595211343	12	~2013
21266405411	42532810823	11	~2012
21268442099	42536884199	11	~2012
21268845971	42537691943	11	~2012
21269236787	553000156463	12	~2014
21269319889	5270...684943	14	2023
21269950259	42539900519	11	~2012
21271715483	42543430967	11	~2012
21272184833	297810587663	12	~2014
21272382643	212723826431	12	~2013
21272952359	170183618873	12	~2013
21273715937	297832023119	12	~2014
21274691111	42549382223	11	~2012
21275371891	382956694039	12	~2014
21275424497	510610187929	12	~2014
21277225331	42554450663	11	~2012
21279088223	42558176447	11	~2012
21279347741	1123...607249	14	2023
21281461931	42562923863	11	~2012
21283682039	42567364079	11	~2012

Exponent	Prime Factor	Dig.	Year
21284083937	127704503623	12	~2013
21284464403	42568928807	11	~2012
21285567071	42571134143	11	~2012
21285612781	127713676687	12	~2013
21286875763	212868757631	12	~2013
21287052623	42574105247	11	~2012
21289087067	383203567207	12	~2014
21289739291	42579478583	11	~2012
21291677471	42583354943	11	~2012
21291827003	42583654007	11	~2012
21292308419	42584616839	11	~2012
21292880159	42585760319	11	~2012
21294519671	42589039343	11	~2012
21294710939	42589421879	11	~2012
21295004867	553670126543	12	~2014
21295038781	127770232687	12	~2013
21295879571	42591759143	11	~2012
21297684503	42595369007	11	~2012
21298426823	42596853647	11	~2012
21298512563	42597025127	11	~2012
21299249351	42598498703	11	~2012
21299331373	127795988239	12	~2013
21299861651	42599723303	11	~2012
21299942843	42599885687	11	~2012
21299950949	298199313287	12	~2014

5.157.210 digits

25-11-02