Small Mersenne Prime Factors (page 4451/5130)

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
15379674721	246074795537	12	~2013
15380523853	92283143119	11	~2012
15380659573	92283957439	11	~2012
15381329393	92287976359	11	~2012
15381352391	30762704783	11	~2011
15381411719	30762823439	11	~2011
15381582479	30763164959	11	~2011
15381634999	646028669959	12	~2014
15381889129	1353...433521	14	2023
15381970223	30763940447	11	~2011
15382924499	30765848999	11	~2011
15383453243	30766906487	11	~2011
15383631667	246138106673	12	~2013
15383663411	30767326823	11	~2011
15383799161	92302794967	11	~2012
15383835557	92303013343	11	~2012
15383938553	92303631319	11	~2012
15385038983	30770077967	11	~2011
15385169771	30770339543	11	~2011
15385638083	30771276167	11	~2011
15385670231	30771340463	11	~2011
15386452751	30772905503	11	~2011
15386723543	30773447087	11	~2011
15387631439	30775262879	11	~2011
15388213751	30776427503	11	~2011

Exponent	Prime Factor	Dig.	Year
15388251533	92329509199	11	~2012
15389017739	30778035479	11	~2011
15390054781	615602191241	12	~2014
15390940049	215473160687	12	~2013
15390945677	92345674063	11	~2012
15390994379	30781988759	11	~2011
15391135213	92346811279	11	~2012
15391386359	30782772719	11	~2011
15392597639	30785195279	11	~2011
15392751071	400211527847	12	~2013
15393766403	30787532807	11	~2011
15394224997	92365349983	11	~2012
15394408097	123155264777	12	~2012
15395909411	30791818823	11	~2011
15396375689	123171005513	12	~2012
15396728219	30793456439	11	~2011
15397050479	30794100959	11	~2011
15398083763	30796167527	11	~2011
15398207243	30796414487	11	~2011
15398326763	30796653527	11	~2011
15399410399	30798820799	11	~2011
15399649823	30799299647	11	~2011
15400179191	30800358383	11	~2011
15400216511	123201732089	12	~2012
15400283543	30800567087	11	~2011

Exponent	Prime Factor	Dig.	Year
15400512119	30801024239	11	~2011
15400974983	30801949967	11	~2011
15401107019	30802214039	11	~2011
15402147151	246434354417	12	~2013
15402810491	30805620983	11	~2011
15402924371	30805848743	11	~2011
15403130063	30806260127	11	~2011
15403691531	30807383063	11	~2011
15406454039	30812908079	11	~2011
15406518383	30813036767	11	~2011
15406645679	30813291359	11	~2011
15407272403	30814544807	11	~2011
15407753183	30815506367	11	~2011
15407842091	30815684183	11	~2011
15407927771	123263422169	12	~2012
15408580021	92451480127	11	~2012
15408851303	30817702607	11	~2011
15409139831	30818279663	11	~2011
15409456091	30818912183	11	~2011
15410224657	92461347943	11	~2012
15411202811	277401650599	12	~2013
15411298559	30822597119	11	~2011
15411545339	30823090679	11	~2011
15412303391	30824606783	11	~2011
15412373699	30824747399	11	~2011

Exponent	Prime Factor	Dig.	Year
15412681903	154126819031	12	~2012
15412879523	30825759047	11	~2011
15412965839	30825931679	11	~2011
15414212939	30828425879	11	~2011
15414670697	92488024183	11	~2012
15415600601	92493603607	11	~2012
15417505403	30835010807	11	~2011
15419019683	30838039367	11	~2011
15419436563	30838873127	11	~2011
15419736191	30839472383	11	~2011
15419928827	123359430617	12	~2012
15420199079	30840398159	11	~2011
15420511031	30841022063	11	~2011
15421838639	30843677279	11	~2011
15422095621	246753529937	12	~2013
15422693791	154226937911	12	~2012
15422701691	30845403383	11	~2011
15422968103	30845936207	11	~2011
15424722539	30849445079	11	~2011
15424886051	30849772103	11	~2011
15424893457	246798295313	12	~2013
15424895873	92549375239	11	~2012
15425101859	30850203719	11	~2011
15425405887	740419482577	12	~2014
15425455421	123403643369	12	~2012

4.828.532 digits

25-06-01