Small Mersenne Prime Factors (page 4543/5130)

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
21371059327	384679067887	12	~2014
21372181679	42744363359	11	~2012
21374007059	42748014119	11	~2012
21377179331	42754358663	11	~2012
21377726651	42755453303	11	~2012
21377744123	42755488247	11	~2012
21377978393	299291697503	12	~2014
21378765557	171030124457	12	~2013
21379226831	42758453663	11	~2012
21379690621	128278143727	12	~2013
21379728371	42759456743	11	~2012
21379793999	42759587999	11	~2012
21381267749	299337748487	12	~2014
21381956857	128291741143	12	~2013
21382742123	42765484247	11	~2012
21383698559	42767397119	11	~2012
21385744511	42771489023	11	~2012
21389911691	171119293529	12	~2013
21390223919	42780447839	11	~2012
21390857231	171126857849	12	~2013
21392152703	42784305407	11	~2012
21393487679	42786975359	11	~2012
21393879791	42787759583	11	~2012
21395059711	213950597111	12	~2013
21396509639	42793019279	11	~2012

Exponent	Prime Factor	Dig.	Year
21396536279	42793072559	11	~2012
21397293383	42794586767	11	~2012
21397356203	42794712407	11	~2012
21398065043	42796130087	11	~2012
21398535973	128391215839	12	~2013
21401204411	42802408823	11	~2012
21402571199	42805142399	11	~2012
21403348679	42806697359	11	~2012
21403935023	42807870047	11	~2012
21404514671	42809029343	11	~2012
21404581199	42809162399	11	~2012
21404831471	42809662943	11	~2012
21405921269	171247370153	12	~2013
21406551119	42813102239	11	~2012
21407238673	342515818769	12	~2014
21407331229	513775949497	12	~2014
21409679609	171277436873	12	~2013
21409950431	42819900863	11	~2012
21411657863	42823315727	11	~2012
21412557317	128475343903	12	~2013
21414070019	42828140039	11	~2012
21414227867	171313822937	12	~2013
21414362003	42828724007	11	~2012
21416255009	171330040073	12	~2013
21416326979	42832653959	11	~2012

Exponent	Prime Factor	Dig.	Year
21416783351	42833566703	11	~2012
21417016507	342672264113	12	~2014
21418691753	685398136097	12	~2015
21419111017	128514666103	12	~2013
21419743237	128518459423	12	~2013
21420456719	42840913439	11	~2012
21421570991	42843141983	11	~2012
21421901021	128531406127	12	~2013
21423077453	299923084343	12	~2014
21424329163	214243291631	12	~2013
21427695281	128566171687	12	~2013
21429197873	128575187239	12	~2013
21429685643	42859371287	11	~2012
21430492933	128582957599	12	~2013
21432000979	214320009791	12	~2013
21432077399	42864154799	11	~2012
21432391859	42864783719	11	~2012
21433911659	42867823319	11	~2012
21435947051	42871894103	11	~2012
21437207509	514492980217	12	~2014
21437214143	42874428287	11	~2012
21438553991	42877107983	11	~2012
21439223831	42878447663	11	~2012
21441049583	42882099167	11	~2012
21441576983	42883153967	11	~2012

Exponent	Prime Factor	Dig.	Year
21443964023	42887928047	11	~2012
21445516601	171564132809	12	~2013
21446081183	42892162367	11	~2012
21446344609	471819581399	12	~2014
21446642303	42893284607	11	~2012
21446837459	42893674919	11	~2012
21447038581	128682231487	12	~2013
21447128231	42894256463	11	~2012
21447366779	42894733559	11	~2012
21447978337	128687870023	12	~2013
21449504137	128697024823	12	~2013
21451017683	686432565857	12	~2015
21451516451	42903032903	11	~2012
21451591037	171612728297	12	~2013
21452688791	42905377583	11	~2012
21453002699	42906005399	11	~2012
21454213139	42908426279	11	~2012
21454722853	128728337119	12	~2013
21455215403	42910430807	11	~2012
21455532733	128733196399	12	~2013
21455727563	42911455127	11	~2012
21457658821	128745952927	12	~2013
21458799959	42917599919	11	~2012
21460212863	42920425727	11	~2012
21460223699	42920447399	11	~2012

4.828.532 digits

25-06-01