Small Mersenne Prime Factors (page 4757/5610)

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
12428768063	24857536127	11	~2010
12428811071	24857622143	11	~2010
12428942311	223720961599	12	~2012
12429147623	24858295247	11	~2010
12429237341	74575424047	11	~2011
12429395483	24858790967	11	~2010
12430743719	24861487439	11	~2010
12431156407	198898502513	12	~2012
12431210171	4000...330279	14	2023
12432702097	74596212583	11	~2011
12432725303	24865450607	11	~2010
12434652599	24869305199	11	~2010
12435178621	74611071727	11	~2011
12435237539	24870475079	11	~2010
12435380557	198966088913	12	~2012
12436065731	24872131463	11	~2010
12436274723	24872549447	11	~2010
12436755659	24873511319	11	~2010
12436929619	223864733143	12	~2012
12436994039	24873988079	11	~2010
12437612897	597005419057	12	~2013
12438197879	24876395759	11	~2010
12438816911	398042141153	12	~2013
12440073071	24880146143	11	~2010
12440199181	74641195087	11	~2011

Exponent	Prime Factor	Dig.	Year
12440933573	74645601439	11	~2011
12440962403	24881924807	11	~2010
12441443519	24882887039	11	~2010
12441695219	24883390439	11	~2010
12441959171	24883918343	11	~2010
12442127111	24884254223	11	~2010
12442239239	99537913913	11	~2011
12442567463	24885134927	11	~2010
12443601743	24887203487	11	~2010
12443787179	24887574359	11	~2010
12444303163	124443031631	12	~2012
12445396391	24890792783	11	~2010
12445420139	24890840279	11	~2010
12445838213	74675029279	11	~2011
12445956079	124459560791	12	~2012
12446213771	24892427543	11	~2010
12446360471	24892720943	11	~2010
12446706983	24893413967	11	~2010
12447218783	24894437567	11	~2010
12447684131	24895368263	11	~2010
12448077839	24896155679	11	~2010
12448839899	24897679799	11	~2010
12448879673	74693278039	11	~2011
12448886491	124488864911	12	~2012
12449254943	24898509887	11	~2010

Exponent	Prime Factor	Dig.	Year
12450122423	24900244847	11	~2010
12450202343	24900404687	11	~2010
12450391229	99603129833	11	~2011
12450945161	99607561289	11	~2011
12450990313	74705941879	11	~2011
12451012811	24902025623	11	~2010
12451039091	24902078183	11	~2010
12451068359	24902136719	11	~2010
12451206851	24902413703	11	~2010
12451248143	24902496287	11	~2010
12451266419	24902532839	11	~2010
12451431299	24902862599	11	~2010
12451987577	99615900617	11	~2011
12452883563	24905767127	11	~2010
12453681221	74722087327	11	~2011
12453948527	597789529297	12	~2013
12454006919	24908013839	11	~2010
12454429931	24908859863	11	~2010
12454848037	597832705777	12	~2013
12455683931	24911367863	11	~2010
12455834411	24911668823	11	~2010
12456002633	174384036863	12	~2012
12456180301	199298884817	12	~2012
12456265321	74737591927	11	~2011
12456508289	99652066313	11	~2011

Exponent	Prime Factor	Dig.	Year
12456645497	99653163977	11	~2011
12457374131	24914748263	11	~2010
12457552979	24915105959	11	~2010
12457751083	124577510831	12	~2012
12457829603	24915659207	11	~2010
12459075241	274099655303	12	~2012
12459368711	24918737423	11	~2010
12459826943	24919653887	11	~2010
12459893801	74759362807	11	~2011
12460188317	74761129903	11	~2011
12460251953	174443527343	12	~2012
12460330391	24920660783	11	~2010
12460583939	24921167879	11	~2010
12461381951	24922763903	11	~2010
12461420819	24922841639	11	~2010
12462031259	24924062519	11	~2010
12462958523	24925917047	11	~2010
12463283939	24926567879	11	~2010
12463489799	24926979599	11	~2010
12463679497	74782076983	11	~2011
12464125819	124641258191	12	~2012
12465108983	24930217967	11	~2010
12466853411	24933706823	11	~2010
12466979243	24933958487	11	~2010
12467071391	324143856167	12	~2013

5.307.017 digits

26-01-11