Small Mersenne Prime Factors (page 4320/5130)

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
9807581999	19615163999	11	~2009
9807911279	78463290233	11	~2011
9808107481	156929719697	12	~2011
9808264777	58849588663	11	~2010
9808527623	19617055247	11	~2009
9808648823	19617297647	11	~2009
9809741783	19619483567	11	~2009
9810110231	19620220463	11	~2009
9810388853	58862333119	11	~2010
9810940619	19621881239	11	~2009
9811606991	19623213983	11	~2009
9812304143	19624608287	11	~2009
9812549963	19625099927	11	~2009
9813341399	19626682799	11	~2009
9813853103	19627706207	11	~2009
9814206791	19628413583	11	~2009
9814246619	19628493239	11	~2009
9814300739	19628601479	11	~2009
9814369931	19628739863	11	~2009
9814400621	58886403727	11	~2010
9814953359	19629906719	11	~2009
9815481419	19630962839	11	~2009
9815755991	19631511983	11	~2009
9816047473	215953044407	12	~2012
9816068077	58896408463	11	~2010

Exponent	Prime Factor	Dig.	Year
9816094919	19632189839	11	~2009
9816167173	215955677807	12	~2012
9816255983	19632511967	11	~2009
9816340811	19632681623	11	~2009
9816455141	78531641129	11	~2011
9817345121	78538760969	11	~2011
9817397699	19634795399	11	~2009
9817492871	19634985743	11	~2009
9818392739	19636785479	11	~2009
9818474663	19636949327	11	~2009
9819028139	19638056279	11	~2009
9820181317	58921087903	11	~2010
9820809731	19641619463	11	~2009
9821169023	19642338047	11	~2009
9821203523	19642407047	11	~2009
9821317223	19642634447	11	~2009
9821520671	19643041343	11	~2009
9821685431	19643370863	11	~2009
9821820059	19643640119	11	~2009
9822200639	19644401279	11	~2009
9822262253	58933573519	11	~2010
9822568541	58935411247	11	~2010
9822661679	19645323359	11	~2009
9822919103	19645838207	11	~2009
9822968591	19645937183	11	~2009

Exponent	Prime Factor	Dig.	Year
9823576211	19647152423	11	~2009
9823638911	19647277823	11	~2009
9823721437	58942328623	11	~2010
9824007293	707328525097	12	~2013
9824231093	58945386559	11	~2010
9824719451	19649438903	11	~2009
9825171431	19650342863	11	~2009
9825293183	19650586367	11	~2009
9825335701	58952014207	11	~2010
9825803789	137561253047	12	~2011
9825813979	334077675287	12	~2012
9825819299	19651638599	11	~2009
9826629383	19653258767	11	~2009
9827832383	19655664767	11	~2009
9827866271	19655732543	11	~2009
9827975231	19655950463	11	~2009
9828026531	19656053063	11	~2009
9828052967	235873271209	12	~2012
9828850541	58973103247	11	~2010
9828888869	137604444167	12	~2011
9829131463	98291314631	11	~2011
9829152719	19658305439	11	~2009
9829269311	19658538623	11	~2009
9829318931	19658637863	11	~2009
9829515431	19659030863	11	~2009

Exponent	Prime Factor	Dig.	Year
9830022569	137620315967	12	~2011
9830392163	19660784327	11	~2009
9830687063	19661374127	11	~2009
9831143237	58986859423	11	~2010
9831275873	58987655239	11	~2010
9831818723	19663637447	11	~2009
9832737683	412974982687	12	~2012
9832809257	58996855543	11	~2010
9832887563	19665775127	11	~2009
9833038001	78664304009	11	~2011
9834510299	19669020599	11	~2009
9834695747	78677565977	11	~2011
9834779291	19669558583	11	~2009
9834946151	19669892303	11	~2009
9834962591	19669925183	11	~2009
9834971099	78679768793	11	~2011
9835174799	19670349599	11	~2009
9835332761	59011996567	11	~2010
9835578299	19671156599	11	~2009
9836128391	19672256783	11	~2009
9836461571	19672923143	11	~2009
9836894051	19673788103	11	~2009
9837172343	19674344687	11	~2009
9837305519	19674611039	11	~2009
9837922379	19675844759	11	~2009

4.828.532 digits

25-06-01