Small Mersenne Prime Factors (page 4923/5070)

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
147481546871	294963093743	12	~2018
147489546419	294979092839	12	~2018
147499166051	294998332103	12	~2018
147499827179	294999654359	12	~2018
147508219151	295016438303	12	~2018
147508980623	295017961247	12	~2018
147520633523	295041267047	12	~2018
147521426183	295042852367	12	~2018
147528210239	3216...832103	14	2024
147538142519	295076285039	12	~2018
147557407463	295114814927	12	~2018
147558491939	295116983879	12	~2018
147560681669	5784...214249	14	2023
147562128251	295124256503	12	~2018
147562302659	295124605319	12	~2018
147563755523	295127511047	12	~2018
147569593823	295139187647	12	~2018
147597303901	3070...211409	14	2024
147615965891	295231931783	12	~2018
147616983743	295233967487	12	~2018
147620970923	295241941847	12	~2018
147629423099	295258846199	12	~2018
147629895911	295259791823	12	~2018
147635669327	1429...908537	15	2024
147641026103	295282052207	12	~2018

Exponent	Prime Factor	Dig.	Year
147647287043	295294574087	12	~2018
147650644343	295301288687	12	~2018
147656787623	295313575247	12	~2018
147668153351	295336306703	12	~2018
147668926319	295337852639	12	~2018
147678619631	295357239263	12	~2018
147682383427	5552...168553	14	2023
147685923851	295371847703	12	~2018
147687048263	295374096527	12	~2018
147696931883	295393863767	12	~2018
147711838979	295423677959	12	~2018
147727888043	295455776087	12	~2018
147735343823	295470687647	12	~2018
147736715999	295473431999	12	~2018
147740959967	4373...150233	14	2024
147748127519	295496255039	12	~2018
147751388483	295502776967	12	~2018
147753081863	295506163727	12	~2018
147769773059	295539546119	12	~2018
147776113883	295552227767	12	~2018
147786821603	295573643207	12	~2018
147792446759	295584893519	12	~2018
147793552769	3272...830567	15	2025
147797722879	4167...851879	14	2024
147802410611	295604821223	12	~2018

Exponent	Prime Factor	Dig.	Year
147806282639	295612565279	12	~2018
147809696159	295619392319	12	~2018
147825859211	295651718423	12	~2018
147832706999	295665413999	12	~2018
147849841043	295699682087	12	~2018
147851221499	295702442999	12	~2018
147859648679	295719297359	12	~2018
147861152711	295722305423	12	~2018
147870593639	295741187279	12	~2018
147888211739	295776423479	12	~2018
147888885923	295777771847	12	~2018
147903180563	295806361127	12	~2018
147908117783	295816235567	12	~2018
147926814803	295853629607	12	~2018
147954844283	295909688567	12	~2018
147968617991	295937235983	12	~2018
147974732123	295949464247	12	~2018
147995304323	295990608647	12	~2018
147996244283	295992488567	12	~2018
148008342203	296016684407	12	~2018
148010855771	296021711543	12	~2018
148014889679	296029779359	12	~2018
148015470059	296030940119	12	~2018
148019063999	296038127999	12	~2018
148034174219	296068348439	12	~2018

Exponent	Prime Factor	Dig.	Year
148058028539	296116057079	12	~2018
148059638123	296119276247	12	~2018
148092355979	296184711959	12	~2018
148110217991	296220435983	12	~2018
148114118891	296228237783	12	~2018
148131543431	296263086863	12	~2018
148149721799	296299443599	12	~2018
148178235917	1052...501071	15	2023
148179153383	296358306767	12	~2018
148185434363	296370868727	12	~2018
148187059439	296374118879	12	~2018
148195103411	296390206823	12	~2018
148195544663	296391089327	12	~2018
148195900871	296391801743	12	~2018
148217789729	6047...209433	14	2023
148222094411	296444188823	12	~2018
148235574083	296471148167	12	~2018
148237131851	296474263703	12	~2018
148254036863	296508073727	12	~2018
148285590983	296571181967	12	~2018
148292264651	296584529303	12	~2018
148302672263	296605344527	12	~2018
148312012259	296624024519	12	~2018
148313091683	296626183367	12	~2018
148330501619	296661003239	12	~2018

4.768.925 digits

25-05-04