Small Mersenne Prime Factors (page 5588/5775)

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
158608937159	2664...442713	14	2024
158611999691	317223999383	12	~2019
158621416463	8660...388799	14	2026
158638672163	317277344327	12	~2019
158651050403	317302100807	12	~2019
158652993409	8249...572681	14	2025
158661329999	317322659999	12	~2019
158662146109	4823...417137	14	2024
158667643331	317335286663	12	~2019
158678595599	317357191199	12	~2019
158679474659	317358949319	12	~2019
158679813979	2161...639399	15	2024
158694398783	317388797567	12	~2019
158705235131	317410470263	12	~2019
158712149231	317424298463	12	~2019
158713794983	317427589967	12	~2019
158714988011	317429976023	12	~2019
158720139899	317440279799	12	~2019
158731108979	317462217959	12	~2019
158733516971	317467033943	12	~2019
158745122411	317490244823	12	~2019
158749414139	317498828279	12	~2019
158773546871	1247...840607	15	2023
158774447543	317548895087	12	~2019
158781755771	317563511543	12	~2019

Exponent	Prime Factor	Dig.	Year
158806973651	317613947303	12	~2019
158811371963	317622743927	12	~2019
158820859511	317641719023	12	~2019
158825027843	317650055687	12	~2019
158829545603	317659091207	12	~2019
158841001439	317682002879	12	~2019
158842109603	317684219207	12	~2019
158848642163	317697284327	12	~2019
158856325703	317712651407	12	~2019
158868822023	317737644047	12	~2019
158878834151	317757668303	12	~2019
158883142139	317766284279	12	~2019
158883847439	317767694879	12	~2019
158897941679	317795883359	12	~2019
158904215663	317808431327	12	~2019
158906987363	317813974727	12	~2019
158913422351	317826844703	12	~2019
158918389859	317836779719	12	~2019
158922971159	317845942319	12	~2019
158934145679	317868291359	12	~2019
158934770051	317869540103	12	~2019
158940973207	3592...944783	14	2023
158952948971	317905897943	12	~2019
158969243483	317938486967	12	~2019
158974028309	8902...853041	14	2025

Exponent	Prime Factor	Dig.	Year
158983467323	317966934647	12	~2019
158996630783	317993261567	12	~2019
159014437277	9000...498783	14	2026
159015114367	4452...022761	14	2025
159022326839	318044653679	12	~2019
159023653703	318047307407	12	~2019
159034272623	318068545247	12	~2019
159045666023	318091332047	12	~2019
159054846371	318109692743	12	~2019
159068300453	7348...809287	14	2026
159079201199	318158402399	12	~2019
159085473251	318170946503	12	~2019
159092537339	318185074679	12	~2019
159094827719	318189655439	12	~2019
159127565903	318255131807	12	~2019
159133487963	318266975927	12	~2019
159139973711	318279947423	12	~2019
159143275391	318286550783	12	~2019
159145954991	318291909983	12	~2019
159150571379	318301142759	12	~2019
159180576851	318361153703	12	~2019
159183637631	318367275263	12	~2019
159201355979	318402711959	12	~2019
159205494923	318410989847	12	~2019
159209499671	318418999343	12	~2019

Exponent	Prime Factor	Dig.	Year
159229991111	318459982223	12	~2019
159230984039	318461968079	12	~2019
159233747891	318467495783	12	~2019
159240483119	318480966239	12	~2019
159247376423	318494752847	12	~2019
159270618959	318541237919	12	~2019
159282408899	318564817799	12	~2019
159286196519	318572393039	12	~2019
159287680823	318575361647	12	~2019
159303195743	318606391487	12	~2019
159313301911	3823...458641	14	2023
159316320563	318632641127	12	~2019
159317201531	318634403063	12	~2019
159326846351	7934...482799	14	2026
159334902803	318669805607	12	~2019
159338546467	1058...854089	15	2025
159357223523	318714447047	12	~2019
159366014651	318732029303	12	~2019
159370485419	318740970839	12	~2019
159376744739	318753489479	12	~2019
159390754847	5100...551041	14	2023
159393714743	318787429487	12	~2019
159407080523	318814161047	12	~2019
159416757299	318833514599	12	~2019
159424858139	318849716279	12	~2019

5.471.290 digits

26-03-29