Small Mersenne Prime Factors (page 4662/5025)

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
48804347363	97608694727	11	~2014
48805042241	390440337929	12	~2016
48805085291	97610170583	11	~2014
48808204079	97616408159	11	~2014
48812157731	97624315463	11	~2014
48814680731	97629361463	11	~2014
48815218619	97630437239	11	~2014
48816415559	97632831119	11	~2014
48819289219	488192892191	12	~2016
48819360983	97638721967	11	~2014
48821864603	97643729207	11	~2014
48823617851	97647235703	11	~2014
48828503041	292971018247	12	~2016
48829213931	97658427863	11	~2014
48831081011	97662162023	11	~2014
48831742277	292990453663	12	~2016
48832230721	1083...544759	16	2023
48835162001	390681296009	12	~2016
48835583189	390684665513	12	~2016
48836954843	97673909687	11	~2014
48837628943	97675257887	11	~2014
48842483891	390739871129	12	~2016
48843141287	390745130297	12	~2016
48843323783	97686647567	11	~2014
48843680531	97687361063	11	~2014

Exponent	Prime Factor	Dig.	Year
48843823211	97687646423	11	~2014
48846644831	97693289663	11	~2014
48849954113	293099724679	12	~2016
48853830059	97707660119	11	~2014
48854607551	97709215103	11	~2014
48854984831	97709969663	11	~2014
48856464071	97712928143	11	~2014
48856717271	97713434543	11	~2014
48857048543	97714097087	11	~2014
48857512601	390860100809	12	~2016
48866907959	97733815919	11	~2014
48867450431	97734900863	11	~2014
48874966631	97749933263	11	~2014
48875676623	97751353247	11	~2014
48880856291	97761712583	11	~2014
48881046163	488810461631	12	~2016
48884678039	97769356079	11	~2014
48884918591	97769837183	11	~2014
48890590811	97781181623	11	~2014
48891163961	391129311689	12	~2016
48901218083	97802436167	11	~2014
48901332731	97802665463	11	~2014
48905277977	2376...096823	14	2023
48906139133	684685947863	12	~2017
48906849263	97813698527	11	~2014

Exponent	Prime Factor	Dig.	Year
48907806011	97815612023	11	~2014
48908299327	489082993271	12	~2016
48913500001	782616000017	12	~2017
48913906439	97827812879	11	~2014
48917255833	293503534999	12	~2016
48921998843	97843997687	11	~2014
48922337531	391378700249	12	~2016
48923900111	97847800223	11	~2014
48924686939	97849373879	11	~2014
48926138077	293556828463	12	~2016
48929099603	97858199207	11	~2014
48929235539	97858471079	11	~2014
48929722511	97859445023	11	~2014
48932995883	97865991767	11	~2014
48934263863	97868527727	11	~2014
48935620757	293613724543	12	~2016
48936840899	97873681799	11	~2014
48937399627	782998394033	12	~2017
48939645659	97879291319	11	~2014
48945428123	97890856247	11	~2014
48946324799	97892649599	11	~2014
48951675917	685323462839	12	~2017
48953281271	97906562543	11	~2014
48954104159	97908208319	11	~2014
48957709979	391661679833	12	~2016

Exponent	Prime Factor	Dig.	Year
48959204227	489592042271	12	~2016
48961301479	489613014791	12	~2016
48961679857	293770079143	12	~2016
48963311759	97926623519	11	~2014
48966675193	293800051159	12	~2016
48968013119	97936026239	11	~2014
48971132291	97942264583	11	~2014
48973721933	293842331599	12	~2016
48974623163	97949246327	11	~2014
48974932651	489749326511	12	~2016
48978974963	97957949927	11	~2014
48980994791	97961989583	11	~2014
48982809193	293896855159	12	~2016
48991547771	97983095543	11	~2014
48992126279	97984252559	11	~2014
48993614759	97987229519	11	~2014
48996183241	293977099447	12	~2016
48996458831	97992917663	11	~2014
49003099559	392024796473	12	~2016
49003667099	98007334199	11	~2014
49005926939	98011853879	11	~2014
49010158679	98020317359	11	~2014
49012300163	98024600327	11	~2014
49013322311	98026644623	11	~2014
49016378219	98032756439	11	~2014

4.724.182 digits

25-04-13