Small Mersenne Prime Factors (page 4902/5445)

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
31073091719	62146183439	11	~2013
31075578419	62151156839	11	~2013
31077085631	62154171263	11	~2013
31079284277	435109979879	12	~2015
31081496291	62162992583	11	~2013
31082208719	62164417439	11	~2013
31085019611	62170039223	11	~2013
31086637691	62173275383	11	~2013
31087408333	186524449999	12	~2014
31088199011	62176398023	11	~2013
31088432789	248707462313	12	~2014
31089104771	62178209543	11	~2013
31090556699	62181113399	11	~2013
31091331443	62182662887	11	~2013
31093347371	559680252679	12	~2015
31093807799	62187615599	11	~2013
31096389089	248771112713	12	~2014
31097532491	62195064983	11	~2013
31099386749	435391414487	12	~2015
31099396151	62198792303	11	~2013
31100223839	62200447679	11	~2013
31100603459	62201206919	11	~2013
31101412691	62202825383	11	~2013
31104644339	62209288679	11	~2013
31105516661	186633099967	12	~2014

Exponent	Prime Factor	Dig.	Year
31107359359	559932468463	12	~2015
31108258859	62216517719	11	~2013
31110070169	248880561353	12	~2014
31111438063	311114380631	12	~2015
31111551623	62223103247	11	~2013
31111820483	62223640967	11	~2013
31112502203	62225004407	11	~2013
31116175463	62232350927	11	~2013
31116350281	497861604497	12	~2015
31117036799	62234073599	11	~2013
31117521983	62235043967	11	~2013
31119530857	186717185143	12	~2014
31119642269	248957138153	12	~2014
31120404067	311204040671	12	~2015
31122477479	248979819833	12	~2014
31123143251	62246286503	11	~2013
31124092709	435737297927	12	~2015
31125838559	62251677119	11	~2013
31128665759	62257331519	11	~2013
31129158899	62258317799	11	~2013
31130202193	186781213159	12	~2014
31130340119	62260680239	11	~2013
31130449943	62260899887	11	~2013
31133457923	62266915847	11	~2013
31134929183	62269858367	11	~2013

Exponent	Prime Factor	Dig.	Year
31136625683	62273251367	11	~2013
31137022859	62274045719	11	~2013
31137414023	62274828047	11	~2013
31140128291	62280256583	11	~2013
31141731839	62283463679	11	~2013
31143690911	62287381823	11	~2013
31144328471	62288656943	11	~2013
31145208239	62290416479	11	~2013
31145963399	62291926799	11	~2013
31146248521	186877491127	12	~2014
31147598879	62295197759	11	~2013
31148357993	186890147959	12	~2014
31148506439	62297012879	11	~2013
31150243259	62300486519	11	~2013
31150495217	186902971303	12	~2014
31150516643	62301033287	11	~2013
31151014703	62302029407	11	~2013
31152945871	311529458711	12	~2015
31153564781	249228518249	12	~2014
31155126731	62310253463	11	~2013
31156159379	62312318759	11	~2013
31157282531	62314565063	11	~2013
31157722543	747785341033	12	~2016
31157882927	249263063417	12	~2014
31157918213	186947509279	12	~2014

Exponent	Prime Factor	Dig.	Year
31158894131	62317788263	11	~2013
31159273163	62318546327	11	~2013
31160125511	1720...071743	15	2025
31160484209	747851621017	12	~2016
31161953437	186971720623	12	~2014
31162709323	498603349169	12	~2015
31165723079	249325784633	12	~2014
31166117711	62332235423	11	~2013
31168109363	62336218727	11	~2013
31168889039	62337778079	11	~2013
31169915219	62339830439	11	~2013
31171860913	187031165479	12	~2014
31171948259	62343896519	11	~2013
31172229551	62344459103	11	~2013
31176655597	187059933583	12	~2014
31176883421	187061300527	12	~2014
31177957417	187067744503	12	~2014
31179853031	62359706063	11	~2013
31181711843	62363423687	11	~2013
31183737421	187102424527	12	~2014
31186511039	62373022079	11	~2013
31187327651	62374655303	11	~2013
31187508263	62375016527	11	~2013
31188110171	62376220343	11	~2013
31189517039	62379034079	11	~2013

5.142.307 digits

25-10-26