Small Mersenne Prime Factors (page 4606/5025)

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
38474144231	76948288463	11	~2014
38476526303	76953052607	11	~2014
38478110591	76956221183	11	~2014
38480523671	76961047343	11	~2014
38480789351	76961578703	11	~2014
38480809121	230884854727	12	~2015
38483102459	307864819673	12	~2015
38484053843	76968107687	11	~2014
38484379163	76968758327	11	~2014
38488691711	76977383423	11	~2014
38488815899	76977631799	11	~2014
38489813111	76979626223	11	~2014
38491708103	76983416207	11	~2014
38492256281	230953537687	12	~2015
38495295659	76990591319	11	~2014
38495397719	7668...256249	14	2024
38499656057	230997936343	12	~2015
38500508723	77001017447	11	~2014
38500635937	4250...074449	14	2023
38502622673	539036717423	12	~2016
38504396603	77008793207	11	~2014
38504525459	77009050919	11	~2014
38507780581	231046683487	12	~2015
38509025699	77018051399	11	~2014
38512535651	77025071303	11	~2014

Exponent	Prime Factor	Dig.	Year
38513117663	77026235327	11	~2014
38515388713	231092332279	12	~2015
38517378671	77034757343	11	~2014
38519559251	77039118503	11	~2014
38519814083	77039628167	11	~2014
38520533483	77041066967	11	~2014
38521102211	77042204423	11	~2014
38521806833	231130840999	12	~2015
38522951407	385229514071	12	~2015
38527409159	77054818319	11	~2014
38527961099	77055922199	11	~2014
38532534851	77065069703	11	~2014
38539119551	77078239103	11	~2014
38539934087	308319472697	12	~2015
38543066951	77086133903	11	~2014
38543220671	77086441343	11	~2014
38545432319	77090864639	11	~2014
38547455129	308379641033	12	~2015
38550695207	2713...425729	14	2023
38553136879	385531368791	12	~2015
38553458519	77106917039	11	~2014
38553472421	308427779369	12	~2015
38553743141	231322458847	12	~2015
38554313297	231325879783	12	~2015
38555421731	77110843463	11	~2014

Exponent	Prime Factor	Dig.	Year
38558449859	77116899719	11	~2014
38558685323	77117370647	11	~2014
38558962703	77117925407	11	~2014
38560736171	77121472343	11	~2014
38561112143	77122224287	11	~2014
38563535851	694143645319	12	~2016
38568291673	617092666769	12	~2016
38568482999	77136965999	11	~2014
38569997699	308559981593	12	~2015
38574225491	77148450983	11	~2014
38576328443	77152656887	11	~2014
38578222223	77156444447	11	~2014
38580001217	308640009737	12	~2015
38580345347	308642762777	12	~2015
38581170443	77162340887	11	~2014
38584420019	77168840039	11	~2014
38585671093	231514026559	12	~2015
38586113099	77172226199	11	~2014
38590407731	77180815463	11	~2014
38592120793	231552724759	12	~2015
38593512173	231561073039	12	~2015
38595981899	77191963799	11	~2014
38596262231	77192524463	11	~2014
38597090039	77194180079	11	~2014
38597107603	617553721649	12	~2016

Exponent	Prime Factor	Dig.	Year
38598937739	308791501913	12	~2015
38600005943	77200011887	11	~2014
38602351589	308818812713	12	~2015
38602688639	77205377279	11	~2014
38603982539	308831860313	12	~2015
38604653123	77209306247	11	~2014
38605460951	308843687609	12	~2015
38605493183	77210986367	11	~2014
38607404993	231644429959	12	~2015
38609442563	77218885127	11	~2014
38610997157	308887977257	12	~2015
38612894279	77225788559	11	~2014
38613451403	77226902807	11	~2014
38618082959	308944663673	12	~2015
38618322191	77236644383	11	~2014
38618800919	77237601839	11	~2014
38618891183	77237782367	11	~2014
38619939361	231719636167	12	~2015
38620145783	77240291567	11	~2014
38620303259	77240606519	11	~2014
38621061263	77242122527	11	~2014
38622860891	77245721783	11	~2014
38623514291	77247028583	11	~2014
38623832707	617981323313	12	~2016
38626397531	77252795063	11	~2014

4.724.182 digits

25-04-13