Small Mersenne Prime Factors (page 4591/5190)

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
21317241721	127903450327	12	~2013
21317861527	341085784433	12	~2014
21318187139	42636374279	11	~2012
21319413281	170555306249	12	~2013
21319857037	127919142223	12	~2013
21320874551	42641749103	11	~2012
21322614563	42645229127	11	~2012
21322851899	42645703799	11	~2012
21323197559	42646395119	11	~2012
21324178283	42648356567	11	~2012
21324265499	42648530999	11	~2012
21325196663	42650393327	11	~2012
21325556963	42651113927	11	~2012
21325978847	170607830777	12	~2013
21327204443	42654408887	11	~2012
21328584911	42657169823	11	~2012
21329226371	42658452743	11	~2012
21330011471	42660022943	11	~2012
21330422819	42660845639	11	~2012
21331378889	170651031113	12	~2013
21331415663	42662831327	11	~2012
21332248631	42664497263	11	~2012
21332518703	42665037407	11	~2012
21332587091	42665174183	11	~2012
21333734483	42667468967	11	~2012

Exponent	Prime Factor	Dig.	Year
21333790259	42667580519	11	~2012
21334022351	42668044703	11	~2012
21335037131	170680297049	12	~2013
21335812919	42671625839	11	~2012
21336241523	42672483047	11	~2012
21337412819	42674825639	11	~2012
21337597511	42675195023	11	~2012
21338499443	42676998887	11	~2012
21338910653	128033463919	12	~2013
21339118523	42678237047	11	~2012
21340141943	42680283887	11	~2012
21340381453	128042288719	12	~2013
21341376383	42682752767	11	~2012
21341383697	170731069577	12	~2013
21341425267	213414252671	12	~2013
21341603659	725614524407	12	~2015
21342814763	42685629527	11	~2012
21343351223	42686702447	11	~2012
21343908011	683005056353	12	~2015
21344701439	42689402879	11	~2012
21345544211	42691088423	11	~2012
21345924371	42691848743	11	~2012
21347285759	42694571519	11	~2012
21348016639	213480166391	12	~2013
21348342863	42696685727	11	~2012

Exponent	Prime Factor	Dig.	Year
21349121399	42698242799	11	~2012
21352954223	42705908447	11	~2012
21352999453	128117996719	12	~2013
21353427671	42706855343	11	~2012
21353918471	42707836943	11	~2012
21355615871	42711231743	11	~2012
21356342999	42712685999	11	~2012
21357517409	2460...055169	14	2023
21357706619	170861652953	12	~2013
21359119451	170872955609	12	~2013
21360230761	341763692177	12	~2014
21360847619	42721695239	11	~2012
21362008331	42724016663	11	~2012
21362046457	128172278743	12	~2013
21363285731	42726571463	11	~2012
21363781511	42727563023	11	~2012
21365743103	42731486207	11	~2012
21366322511	42732645023	11	~2012
21366547619	42733095239	11	~2012
21367098191	42734196383	11	~2012
21367682977	128206097863	12	~2013
21367824851	42735649703	11	~2012
21367954199	42735908399	11	~2012
21369408607	213694086071	12	~2013
21369430223	42738860447	11	~2012

Exponent	Prime Factor	Dig.	Year
21369796709	170958373673	12	~2013
21370109759	42740219519	11	~2012
21370577077	128223462463	12	~2013
21370846859	42741693719	11	~2012
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

4.888.230 digits

25-06-29