Small Mersenne Prime Factors (page 4718/5070)

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
52791467411	105582934823	12	~2015
52792217861	422337742889	12	~2016
52792497743	105584995487	12	~2015
52792907633	316757445799	12	~2016
52793203751	105586407503	12	~2015
52794480689	739122729647	12	~2017
52795791421	316774748527	12	~2016
52797449123	105594898247	12	~2015
52801479347	422411834777	12	~2016
52804196413	316825178479	12	~2016
52806647819	105613295639	12	~2015
52810914743	105621829487	12	~2015
52812730823	105625461647	12	~2015
52814166593	316884999559	12	~2016
52815848639	105631697279	12	~2015
52816646651	105633293303	12	~2015
52817037659	105634075319	12	~2015
52818656587	528186565871	12	~2016
52822778483	105645556967	12	~2015
52823163383	105646326767	12	~2015
52826069897	316956419383	12	~2016
52827492359	105654984719	12	~2015
52828629107	422629032857	12	~2016
52828673123	105657346247	12	~2015
52829461621	316976769727	12	~2016

Exponent	Prime Factor	Dig.	Year
52833407651	422667261209	12	~2016
52840199771	105680399543	12	~2015
52841099579	105682199159	12	~2015
52845890963	105691781927	12	~2015
52846668793	317080012759	12	~2016
52847332211	105694664423	12	~2015
52848707753	317092246519	12	~2016
52849141463	105698282927	12	~2015
52850803301	317104819807	12	~2016
52850877473	739912284623	12	~2017
52851293471	422810347769	12	~2016
52855063823	105710127647	12	~2015
52857463643	105714927287	12	~2015
52865200561	317191203367	12	~2016
52869377999	105738755999	12	~2015
52870348679	422962789433	12	~2016
52871297711	105742595423	12	~2015
52872308171	105744616343	12	~2015
52880160563	105760321127	12	~2015
52880325059	105760650119	12	~2015
52886404223	105772808447	12	~2015
52895745443	105791490887	12	~2015
52896429023	105792858047	12	~2015
52897176239	105794352479	12	~2015
52897240703	105794481407	12	~2015

Exponent	Prime Factor	Dig.	Year
52897611359	105795222719	12	~2015
52899153239	105798306479	12	~2015
52904580083	105809160167	12	~2015
52906418759	423251350073	12	~2016
52908142513	317448855079	12	~2016
52910324699	105820649399	12	~2015
52913392577	317480355463	12	~2016
52913592359	105827184719	12	~2015
52914627071	105829254143	12	~2015
52920124571	105840249143	12	~2015
52920522089	423364176713	12	~2016
52922018537	317532111223	12	~2016
52922395973	317534375839	12	~2016
52924441919	105848883839	12	~2015
52928831861	317572991167	12	~2016
52929438251	105858876503	12	~2015
52935538163	105871076327	12	~2015
52935997319	105871994639	12	~2015
52937342669	423498741353	12	~2016
52937701763	105875403527	12	~2015
52945166663	105890333327	12	~2015
52945604879	105891209759	12	~2015
52946901011	105893802023	12	~2015
52947756359	423582050873	12	~2016
52951718783	105903437567	12	~2015

Exponent	Prime Factor	Dig.	Year
52956195251	105912390503	12	~2015
52962647219	105925294439	12	~2015
52965850741	317795104447	12	~2016
52970197919	423761583353	12	~2016
52972396583	105944793167	12	~2015
52976401979	105952803959	12	~2015
52977220391	105954440783	12	~2015
52980744121	317884464727	12	~2016
52982722679	105965445359	12	~2015
52986319439	105972638879	12	~2015
52994515331	105989030663	12	~2015
52994554103	105989108207	12	~2015
52997208431	105994416863	12	~2015
52998075659	105996151319	12	~2015
53000033591	106000067183	12	~2015
53001033383	106002066767	12	~2015
53002624319	106005248639	12	~2015
53009029261	4230...350279	14	2023
53010314891	106020629783	12	~2015
53012657531	424101260249	12	~2016
53014015679	106028031359	12	~2015
53014106459	106028212919	12	~2015
53017428011	106034856023	12	~2015
53020630349	424165042793	12	~2016
53020773623	106041547247	12	~2015

4.768.925 digits

25-05-04