Small Mersenne Prime Factors (page 4436/5025)

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
19682050499	39364100999	11	~2011
19682627963	39365255927	11	~2011
19683640421	157469123369	12	~2013
19684008551	39368017103	11	~2011
19684572503	39369145007	11	~2011
19684590911	39369181823	11	~2011
19684841051	39369682103	11	~2011
19685040757	118110244543	12	~2013
19685310371	39370620743	11	~2011
19686052079	157488416633	12	~2013
19687972393	118127834359	12	~2013
19688998753	118133992519	12	~2013
19689043259	39378086519	11	~2011
19691284859	39382569719	11	~2011
19691792759	157534342073	12	~2013
19692006683	39384013367	11	~2011
19692351083	39384702167	11	~2011
19694336411	39388672823	11	~2011
19694383211	39388766423	11	~2011
19694838941	157558711529	12	~2013
19694913373	118169480239	12	~2013
19695326663	39390653327	11	~2011
19697088371	39394176743	11	~2011
19699326377	118195958263	12	~2013
19699546631	39399093263	11	~2011

Exponent	Prime Factor	Dig.	Year
19699646003	39399292007	11	~2011
19700610491	39401220983	11	~2011
19701180179	39402360359	11	~2011
19702485997	118214915983	12	~2013
19702764239	39405528479	11	~2011
19703005799	39406011599	11	~2011
19703359391	39406718783	11	~2011
19703960981	118223765887	12	~2013
19704226571	39408453143	11	~2011
19705484063	39410968127	11	~2011
19709015171	39418030343	11	~2011
19709805191	39419610383	11	~2011
19709916377	118259498263	12	~2013
19709991263	39419982527	11	~2011
19710694163	39421388327	11	~2011
19710723299	39421446599	11	~2011
19711426919	39422853839	11	~2011
19714693499	39429386999	11	~2011
19715302511	39430605023	11	~2011
19715962163	39431924327	11	~2011
19718089403	39436178807	11	~2011
19718145119	39436290239	11	~2011
19718984171	39437968343	11	~2011
19719158183	39438316367	11	~2011
19719644449	433832177879	12	~2014

Exponent	Prime Factor	Dig.	Year
19719743723	39439487447	11	~2011
19720489979	39440979959	11	~2011
19720971199	197209711991	12	~2013
19721195843	39442391687	11	~2011
19722572483	39445144967	11	~2011
19722890027	157783120217	12	~2013
19723427819	39446855639	11	~2011
19724108699	39448217399	11	~2011
19727393401	315638294417	12	~2014
19728380081	118370280487	12	~2013
19729398659	39458797319	11	~2011
19730226863	39460453727	11	~2011
19730337131	39460674263	11	~2011
19730418899	39460837799	11	~2011
19730466443	39460932887	11	~2011
19732983601	118397901607	12	~2013
19733259743	39466519487	11	~2011
19733320577	118399923463	12	~2013
19734103043	39468206087	11	~2011
19736135483	39472270967	11	~2011
19736408231	39472816463	11	~2011
19736426483	39472852967	11	~2011
19736935949	276317103287	12	~2013
19737237859	197372378591	12	~2013
19737565499	39475130999	11	~2011

Exponent	Prime Factor	Dig.	Year
19738337603	39476675207	11	~2011
19738977059	39477954119	11	~2011
19739066663	39478133327	11	~2011
19739392831	197393928311	12	~2013
19740000719	39480001439	11	~2011
19740076549	592202296471	12	~2014
19740398129	157923185033	12	~2013
19741368299	39482736599	11	~2011
19742123053	118452738319	12	~2013
19742764031	39485528063	11	~2011
19743280223	39486560447	11	~2011
19744582721	118467496327	12	~2013
19744952603	39489905207	11	~2011
19745503319	157964026553	12	~2013
19746521771	39493043543	11	~2011
19747230263	39494460527	11	~2011
19747257311	39494514623	11	~2011
19748714039	39497428079	11	~2011
19750000913	118500005479	12	~2013
19750004591	39500009183	11	~2011
19750973357	158007786857	12	~2013
19752272531	39504545063	11	~2011
19754086211	39508172423	11	~2011
19755526331	39511052663	11	~2011
19757760839	39515521679	11	~2011

4.724.182 digits

25-04-13