Small Mersenne Prime Factors (page 4694/5025)

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
56462766779	112925533559	12	~2015
56463405907	2631...152663	14	2023
56469295429	1168...538031	15	2024
56470549403	112941098807	12	~2015
56471992163	112943984327	12	~2015
56477982839	112955965679	12	~2015
56485545131	112971090263	12	~2015
56488723331	112977446663	12	~2015
56494561379	112989122759	12	~2015
56503282079	113006564159	12	~2015
56515663619	113031327239	12	~2015
56525111033	339150666199	12	~2016
56527063991	113054127983	12	~2015
56533225811	113066451623	12	~2015
56543273603	113086547207	12	~2015
56543866763	113087733527	12	~2015
56546140681	339276844087	12	~2016
56546240039	113092480079	12	~2015
56548759643	113097519287	12	~2015
56549810111	113099620223	12	~2015
56559572947	565595729471	12	~2017
56559620987	452476967897	12	~2016
56563524119	113127048239	12	~2015
56567624891	113135249783	12	~2015
56570787431	113141574863	12	~2015

Exponent	Prime Factor	Dig.	Year
56571063643	565710636431	12	~2017
56572523963	113145047927	12	~2015
56575935131	113151870263	12	~2015
56577306733	339463840399	12	~2016
56578970557	339473823343	12	~2016
56584328701	339505972207	12	~2016
56585149871	113170299743	12	~2015
56585324261	339511945567	12	~2016
56586444637	339518667823	12	~2016
56586646043	113173292087	12	~2015
56588561999	113177123999	12	~2015
56589641291	113179282583	12	~2015
56590649651	113181299303	12	~2015
56596195823	113192391647	12	~2015
56597909891	113195819783	12	~2015
56599351859	113198703719	12	~2015
56603521739	452828173913	12	~2016
56607479651	113214959303	12	~2015
56609511659	113219023319	12	~2015
56611955531	113223911063	12	~2015
56613883223	113227766447	12	~2015
56615846939	113231693879	12	~2015
56620890671	113241781343	12	~2015
56623126691	113246253383	12	~2015
56626349621	339758097727	12	~2016

Exponent	Prime Factor	Dig.	Year
56628552371	113257104743	12	~2015
56631703021	339790218127	12	~2016
56634441599	113268883199	12	~2015
56635627679	113271255359	12	~2015
56636948939	113273897879	12	~2015
56640149939	113280299879	12	~2015
56640584051	113281168103	12	~2015
56641878263	113283756527	12	~2015
56643221473	339859328839	12	~2016
56651084717	339906508303	12	~2016
56655700721	339934204327	12	~2016
56660403497	339962420983	12	~2016
56663868203	113327736407	12	~2015
56664623663	113329247327	12	~2015
56664925571	113329851143	12	~2015
56665990273	339995941639	12	~2016
56671370891	113342741783	12	~2015
56672734141	340036404847	12	~2016
56681275691	113362551383	12	~2015
56681947691	113363895383	12	~2015
56685134039	453481072313	12	~2016
56687158963	4274...858103	14	2024
56687382293	340124293759	12	~2016
56688862343	113377724687	12	~2015
56690595551	113381191103	12	~2015

Exponent	Prime Factor	Dig.	Year
56694143459	113388286919	12	~2015
56694651073	340167906439	12	~2016
56700959411	113401918823	12	~2015
56703974267	453631794137	12	~2016
56705474183	113410948367	12	~2015
56710302263	113420604527	12	~2015
56712146819	113424293639	12	~2015
56718742273	340312453639	12	~2016
56722666943	113445333887	12	~2015
56727431447	453819451577	12	~2016
56727740843	113455481687	12	~2015
56728831897	340372991383	12	~2016
56732866439	113465732879	12	~2015
56734470671	113468941343	12	~2015
56734824203	113469648407	12	~2015
56735689739	113471379479	12	~2015
56735784997	340414709983	12	~2016
56738070023	113476140047	12	~2015
56745824651	113491649303	12	~2015
56752701251	113505402503	12	~2015
56755178213	340531069279	12	~2016
56760317543	113520635087	12	~2015
56761292251	567612922511	12	~2017
56763864071	113527728143	12	~2015
56766157993	340596947959	12	~2016

4.724.182 digits

25-04-13