Small Mersenne Prime Factors (page 4942/5610)

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
22413462503	44826925007	11	~2012
22413516179	44827032359	11	~2012
22413709943	44827419887	11	~2012
22414737203	44829474407	11	~2012
22415640397	134493842383	12	~2013
22416922013	134501532079	12	~2013
22418933063	44837866127	11	~2012
22418983271	44837966543	11	~2012
22419503671	224195036711	12	~2014
22419724991	44839449983	11	~2012
22421123111	44842246223	11	~2012
22421155997	313896183959	12	~2014
22421569777	134529418663	12	~2013
22422112283	44844224567	11	~2012
22422817031	44845634063	11	~2012
22422921377	134537528263	12	~2013
22423454363	44846908727	11	~2012
22423517279	44847034559	11	~2012
22423741631	179389933049	12	~2013
22425136031	44850272063	11	~2012
22425743183	44851486367	11	~2012
22426576111	403678369999	12	~2014
22428132119	44856264239	11	~2012
22429129043	44858258087	11	~2012
22429592831	44859185663	11	~2012

Exponent	Prime Factor	Dig.	Year
22430107523	44860215047	11	~2012
22430739371	44861478743	11	~2012
22433348939	44866697879	11	~2012
22433445731	44866891463	11	~2012
22434128771	44868257543	11	~2012
22436133971	44872267943	11	~2012
22436164559	538467949417	12	~2015
22437118339	224371183391	12	~2014
22437370759	403872673663	12	~2014
22437429071	44874858143	11	~2012
22437636323	44875272647	11	~2012
22440402563	44880805127	11	~2012
22440526907	583453699583	12	~2015
22442345063	44884690127	11	~2012
22442974703	6696...513753	14	2025
22444400591	44888801183	11	~2012
22444950013	493788900287	12	~2014
22445865773	134675194639	12	~2013
22445975291	44891950583	11	~2012
22446143399	44892286799	11	~2012
22446374333	314249240663	12	~2014
22447122751	224471227511	12	~2014
22448244443	44896488887	11	~2012
22448752379	404077542823	12	~2014
22448972213	134693833279	12	~2013

Exponent	Prime Factor	Dig.	Year
22449017771	44898035543	11	~2012
22450555199	44901110399	11	~2012
22452782197	134716693183	12	~2013
22453719251	44907438503	11	~2012
22454913973	134729483839	12	~2013
22455667583	44911335167	11	~2012
22455718357	134734310143	12	~2013
22455900193	134735401159	12	~2013
22457355191	44914710383	11	~2012
22457462831	44914925663	11	~2012
22458085393	134748512359	12	~2013
22458958019	44917916039	11	~2012
22459137383	44918274767	11	~2012
22460127887	179681023097	12	~2013
22462940183	44925880367	11	~2012
22463155031	179705240249	12	~2013
22463616577	134781699463	12	~2013
22464080237	134784481423	12	~2013
22464496343	44928992687	11	~2012
22464855863	44929711727	11	~2012
22464906661	359438506577	12	~2014
22465072391	44930144783	11	~2012
22466524043	44933048087	11	~2012
22466691899	44933383799	11	~2012
22467323363	44934646727	11	~2012

Exponent	Prime Factor	Dig.	Year
22468252511	44936505023	11	~2012
22468327751	44936655503	11	~2012
22469032123	224690321231	12	~2014
22469105371	224691053711	12	~2014
22470059159	44940118319	11	~2012
22470870479	44941740959	11	~2012
22471190459	44942380919	11	~2012
22473001619	44946003239	11	~2012
22473567491	44947134983	11	~2012
22473879959	44947759919	11	~2012
22474278803	44948557607	11	~2012
22474495943	44948991887	11	~2012
22475700839	44951401679	11	~2012
22475871577	359613945233	12	~2014
22476057911	44952115823	11	~2012
22476632411	44953264823	11	~2012
22477243559	44954487119	11	~2012
22478025803	44956051607	11	~2012
22478425993	2139...545337	14	2024
22478634203	44957268407	11	~2012
22479356051	44958712103	11	~2012
22480075753	134880454519	12	~2013
22481847491	44963694983	11	~2012
22485840203	44971680407	11	~2012
22486752763	224867527631	12	~2014

5.307.017 digits

26-01-11