Small Mersenne Prime Factors (page 4381/5130)

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
12010179959	24020359919	11	~2010
12010733543	24021467087	11	~2010
12011257619	24022515239	11	~2010
12011353433	168158948063	12	~2012
12012257639	24024515279	11	~2010
12012947363	24025894727	11	~2010
12013205207	288316924969	12	~2012
12013626721	72081760327	11	~2011
12014305577	96114444617	11	~2011
12014712043	1021...236551	14	2023
12016172053	192258752849	12	~2012
12016458431	24032916863	11	~2010
12016881923	24033763847	11	~2010
12017338979	24034677959	11	~2010
12017438471	216313892479	12	~2012
12018082679	24036165359	11	~2010
12018168359	24036336719	11	~2010
12019334303	24038668607	11	~2010
12019783733	72118702399	11	~2011
12019834583	24039669167	11	~2010
12020216051	24040432103	11	~2010
12020236463	24040472927	11	~2010
12020240279	24040480559	11	~2010
12021385769	96171086153	11	~2011
12021393253	192342292049	12	~2012

Exponent	Prime Factor	Dig.	Year
12021577619	24043155239	11	~2010
12022101431	24044202863	11	~2010
12022239277	72133435663	11	~2011
12022831703	24045663407	11	~2010
12023156759	24046313519	11	~2010
12023413163	24046826327	11	~2010
12023750237	72142501423	11	~2011
12023771041	72142626247	11	~2011
12023928179	24047856359	11	~2010
12024905771	24049811543	11	~2010
12025100471	24050200943	11	~2010
12025162343	24050324687	11	~2010
12026067743	24052135487	11	~2010
12026176139	24052352279	11	~2010
12026260271	24052520543	11	~2010
12026274839	24052549679	11	~2010
12026639231	24053278463	11	~2010
12027117911	24054235823	11	~2010
12027206117	72163236703	11	~2011
12027580751	24055161503	11	~2010
12027607037	96220856297	11	~2011
12028017503	24056035007	11	~2010
12028312451	24056624903	11	~2010
12028514819	24057029639	11	~2010
12028619417	72171716503	11	~2011

Exponent	Prime Factor	Dig.	Year
12028673759	24057347519	11	~2010
12028865111	24057730223	11	~2010
12029005619	24058011239	11	~2010
12029057171	24058114343	11	~2010
12030330359	24060660719	11	~2010
12030398459	24060796919	11	~2010
12030559559	24061119119	11	~2010
12031250579	24062501159	11	~2010
12031571819	24063143639	11	~2010
12031578787	120315787871	12	~2011
12032240963	24064481927	11	~2010
12032980343	24065960687	11	~2010
12033179563	481327182521	12	~2013
12034059491	673907331497	12	~2013
12034194479	24068388959	11	~2010
12034245059	24068490119	11	~2010
12034552339	120345523391	12	~2011
12034553099	24069106199	11	~2010
12035461147	481418445881	12	~2013
12035760251	24071520503	11	~2010
12036613331	24073226663	11	~2010
12036851753	288884442073	12	~2012
12036871271	24073742543	11	~2010
12036878123	24073756247	11	~2010
12037173899	24074347799	11	~2010

Exponent	Prime Factor	Dig.	Year
12037258979	24074517959	11	~2010
12037481831	24074963663	11	~2010
12037501919	24075003839	11	~2010
12037536053	72225216319	11	~2011
12037557419	24075114839	11	~2010
12037675319	96301402553	11	~2011
12037711331	96301690649	11	~2011
12040161383	24080322767	11	~2010
12040310543	24080621087	11	~2010
12040891211	216736041799	12	~2012
12042473111	96339784889	11	~2011
12042901883	24085803767	11	~2010
12042980171	24085960343	11	~2010
12043601939	24087203879	11	~2010
12043643237	650356734799	12	~2013
12044753969	96358031753	11	~2011
12044999633	72269997799	11	~2011
12045498323	24090996647	11	~2010
12046638341	72279830047	11	~2011
12046668131	24093336263	11	~2010
12047166539	24094333079	11	~2010
12048732131	24097464263	11	~2010
12048856511	24097713023	11	~2010
12049616171	24099232343	11	~2010
12050161313	168702258383	12	~2012

4.828.532 digits

25-06-01