Small Mersenne Prime Factors (page 4487/5070)

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
20786143043	41572286087	11	~2012
20786286071	41572572143	11	~2012
20786431559	41572863119	11	~2012
20786453063	41572906127	11	~2012
20786502433	332584038929	12	~2014
20787354191	374172375439	12	~2014
20787378217	124724269303	12	~2013
20787490943	41574981887	11	~2012
20787834359	166302674873	12	~2013
20789148599	41578297199	11	~2012
20789367419	41578734839	11	~2012
20792109251	41584218503	11	~2012
20792919263	41585838527	11	~2012
20793308423	41586616847	11	~2012
20794014383	41588028767	11	~2012
20796742283	41593484567	11	~2012
20796862451	41593724903	11	~2012
20797880297	124787281783	12	~2013
20798709539	41597419079	11	~2012
20799408517	124796451103	12	~2013
20800899061	124805394367	12	~2013
20802322657	124813935943	12	~2013
20802467099	41604934199	11	~2012
20802826139	41605652279	11	~2012
20803986239	41607972479	11	~2012

Exponent	Prime Factor	Dig.	Year
20804276903	41608553807	11	~2012
20804471483	41608942967	11	~2012
20804522699	41609045399	11	~2012
20804665499	41609330999	11	~2012
20805531899	41611063799	11	~2012
20808258983	41616517967	11	~2012
20808938173	124853629039	12	~2013
20810003341	332960053457	12	~2014
20810026571	41620053143	11	~2012
20811292919	41622585839	11	~2012
20811649403	41623298807	11	~2012
20811685679	41623371359	11	~2012
20812851599	41625703199	11	~2012
20813093351	41626186703	11	~2012
20813196791	41626393583	11	~2012
20813451083	41626902167	11	~2012
20813795557	333020728913	12	~2014
20814891959	41629783919	11	~2012
20815149101	124890894607	12	~2013
20815290851	41630581703	11	~2012
20815514609	166524116873	12	~2013
20815569499	374680250983	12	~2014
20815802783	41631605567	11	~2012
20816116151	41632232303	11	~2012
20816306831	41632613663	11	~2012

Exponent	Prime Factor	Dig.	Year
20816461439	41632922879	11	~2012
20817828491	41635656983	11	~2012
20818404539	41636809079	11	~2012
20820216611	41640433223	11	~2012
20821066691	41642133383	11	~2012
20823101963	41646203927	11	~2012
20824596731	41649193463	11	~2012
20825391179	41650782359	11	~2012
20826994691	41653989383	11	~2012
20827962359	41655924719	11	~2012
20829234983	41658469967	11	~2012
20829381539	41658763079	11	~2012
20830690271	41661380543	11	~2012
20830996973	124985981839	12	~2013
20831357663	41662715327	11	~2012
20832618203	41665236407	11	~2012
20832951263	41665902527	11	~2012
20834383463	41668766927	11	~2012
20834473501	125006841007	12	~2013
20835366059	41670732119	11	~2012
20836086727	208360867271	12	~2013
20836284503	41672569007	11	~2012
20837022131	41674044263	11	~2012
20837211181	125023267087	12	~2013
20837245697	125023474183	12	~2013

Exponent	Prime Factor	Dig.	Year
20838613343	41677226687	11	~2012
20838925319	41677850639	11	~2012
20839636511	41679273023	11	~2012
20840082937	125040497623	12	~2013
20841095897	125046575383	12	~2013
20841123119	41682246239	11	~2012
20843703547	708685920599	12	~2015
20843866091	41687732183	11	~2012
20845350059	41690700119	11	~2012
20846079731	375229435159	12	~2014
20846273963	41692547927	11	~2012
20846593861	333545501777	12	~2014
20848061303	41696122607	11	~2012
20848107503	41696215007	11	~2012
20848479097	125090874583	12	~2013
20848518959	41697037919	11	~2012
20849952419	41699904839	11	~2012
20850407531	41700815063	11	~2012
20851474571	41702949143	11	~2012
20851759619	41703519239	11	~2012
20851851737	166814813897	12	~2013
20852330003	41704660007	11	~2012
20853483971	41706967943	11	~2012
20853889079	166831112633	12	~2013
20855092259	41710184519	11	~2012

4.768.925 digits

25-05-04