Small Mersenne Prime Factors (page 5270/5610)

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
74937316631	149874633263	12	~2016
74946372911	149892745823	12	~2016
74947700231	149895400463	12	~2016
74952039191	149904078383	12	~2016
74952370151	149904740303	12	~2016
74953270571	599626164569	12	~2017
74954635499	149909270999	12	~2016
74956597559	149913195119	12	~2016
74965985639	149931971279	12	~2016
74969058551	149938117103	12	~2016
74972362403	149944724807	12	~2016
74972830343	149945660687	12	~2016
74973991979	149947983959	12	~2016
74975644259	149951288519	12	~2016
74977650239	599821201913	12	~2017
74979139597	449874837583	12	~2017
74982486851	149964973703	12	~2016
74983062379	749830623791	12	~2018
74998292639	149996585279	12	~2016
74998826159	149997652319	12	~2016
75005667059	150011334119	12	~2016
75009445883	150018891767	12	~2016
75015073829	600120590633	12	~2017
75017788049	600142304393	12	~2017
75018429331	750184293311	12	~2018

Exponent	Prime Factor	Dig.	Year
75024007739	150048015479	12	~2016
75033522749	2986...054103	14	2023
75034572211	750345722111	12	~2018
75038471533	450230829199	12	~2017
75038846033	450233076199	12	~2017
75043436009	600347488073	12	~2017
75044201891	150088403783	12	~2016
75047009003	150094018007	12	~2016
75048586499	150097172999	12	~2016
75061080119	150122160239	12	~2016
75061705331	150123410663	12	~2016
75061964531	150123929063	12	~2016
75062721479	600501771833	12	~2017
75063441371	150126882743	12	~2016
75064417277	600515338217	12	~2017
75070020899	4384...205017	14	2024
75075491651	150150983303	12	~2016
75077025851	150154051703	12	~2016
75079431683	150158863367	12	~2016
75081673211	150163346423	12	~2016
75085869877	450515219263	12	~2017
75087468383	150174936767	12	~2016
75089878043	150179756087	12	~2016
75092580811	750925808111	12	~2018
75093658259	150187316519	12	~2016

Exponent	Prime Factor	Dig.	Year
75097088303	150194176607	12	~2016
75102510239	150205020479	12	~2016
75103411499	150206822999	12	~2016
75104109779	150208219559	12	~2016
75106556099	600852448793	12	~2017
75108179339	600865434713	12	~2017
75114293621	450685761727	12	~2017
75116782859	150233565719	12	~2016
75117843139	751178431391	12	~2018
75119668199	150239336399	12	~2016
75122165843	150244331687	12	~2016
75122201243	150244402487	12	~2016
75126987527	601015900217	12	~2017
75127659671	150255319343	12	~2016
75128827799	150257655599	12	~2016
75135367781	450812206687	12	~2017
75136335959	150272671919	12	~2016
75141816371	150283632743	12	~2016
75146079923	150292159847	12	~2016
75148101659	150296203319	12	~2016
75150029771	150300059543	12	~2016
75152727431	150305454863	12	~2016
75153305159	150306610319	12	~2016
75154196807	601233574457	12	~2017
75164082011	150328164023	12	~2016

Exponent	Prime Factor	Dig.	Year
75166212659	150332425319	12	~2016
75170424839	150340849679	12	~2016
75171753053	451030518319	12	~2017
75172509299	150345018599	12	~2016
75174620723	150349241447	12	~2016
75181611023	150363222047	12	~2016
75184879877	601479039017	12	~2017
75185090663	150370181327	12	~2016
75185501603	150371003207	12	~2016
75188015603	150376031207	12	~2016
75192954671	150385909343	12	~2016
75196499593	451178997559	12	~2017
75199961519	150399923039	12	~2016
75202057937	451212347623	12	~2017
75202363823	150404727647	12	~2016
75205706711	601645653689	12	~2017
75207402443	150414804887	12	~2016
75208472051	150416944103	12	~2016
75209197379	150418394759	12	~2016
75212603581	451275621487	12	~2017
75214883171	150429766343	12	~2016
75217200983	150434401967	12	~2016
75217856579	150435713159	12	~2016
75231607151	150463214303	12	~2016
75233830211	150467660423	12	~2016

5.307.017 digits

26-01-11