Small Mersenne Prime Factors (page 4468/5550)

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
5989572419	11979144839	11	~2007
5989576583	11979153167	11	~2007
5989592887	95833486193	11	~2010
5989618499	11979236999	11	~2007
5989813139	11979626279	11	~2007
5989879223	11979758447	11	~2007
5990076479	11980152959	11	~2007
5990077799	11980155599	11	~2007
5990153951	11980307903	11	~2007
5990588873	35943533239	11	~2009
5990652091	59906520911	11	~2009
5990949551	11981899103	11	~2007
5991126091	59911260911	11	~2009
5991157811	11982315623	11	~2007
5991834923	11983669847	11	~2007
5991835163	11983670327	11	~2007
5992338323	11984676647	11	~2007
5992346447	47938771577	11	~2009
5992762511	11985525023	11	~2007
5993416043	11986832087	11	~2007
5993457011	155829882287	12	~2010
5993551537	143845236889	12	~2010
5994320243	11988640487	11	~2007
5994408383	11988816767	11	~2007
5994438479	11988876959	11	~2007

Exponent	Prime Factor	Dig.	Year
5994643703	11989287407	11	~2007
5994751523	11989503047	11	~2007
5994965917	35969795503	11	~2009
5995452623	11990905247	11	~2007
5995764881	47966119049	11	~2009
5995787597	35974725583	11	~2009
5996098813	35976592879	11	~2009
5996257859	11992515719	11	~2007
5996320357	35977922143	11	~2009
5996467231	95943475697	11	~2010
5996664013	131926608287	12	~2010
5996685239	11993370479	11	~2007
5996793563	11993587127	11	~2007
5997269483	11994538967	11	~2007
5997601583	11995203167	11	~2007
5997633959	11995267919	11	~2007
5997789659	11995579319	11	~2007
5997858673	35987152039	11	~2009
5997893519	11995787039	11	~2007
5998019857	35988119143	11	~2009
5998074671	11996149343	11	~2007
5998500037	35991000223	11	~2009
5998612621	239944504841	12	~2011
5998712771	11997425543	11	~2007
5998791101	35992746607	11	~2009

Exponent	Prime Factor	Dig.	Year
5998895531	11997791063	11	~2007
5998965611	11997931223	11	~2007
5999084639	11998169279	11	~2007
5999524523	11999049047	11	~2007
5999534951	11999069903	11	~2007
5999862611	11999725223	11	~2007
6000265261	36001591567	11	~2009
6000412991	156010737767	12	~2010
6000622091	12001244183	11	~2007
6001192523	12002385047	11	~2007
6001410599	12002821199	11	~2007
6001540631	12003081263	11	~2007
6001628957	48013031657	11	~2009
6001636139	12003272279	11	~2007
6002181349	240087253961	12	~2011
6002225123	192071203937	12	~2010
6002317091	12004634183	11	~2007
6002712179	12005424359	11	~2007
6002818313	36016909879	11	~2009
6002996339	12005992679	11	~2007
6003662363	12007324727	11	~2007
6003845873	36023075239	11	~2009
6004103323	60041033231	11	~2009
6004251713	180127551391	12	~2010
6004384097	144105218329	12	~2010

Exponent	Prime Factor	Dig.	Year
6004484831	12008969663	11	~2007
6004642463	12009284927	11	~2007
6004676759	12009353519	11	~2007
6004911629	48039293033	11	~2009
6004961737	96079387793	11	~2010
6005095259	12010190519	11	~2007
6005326391	12010652783	11	~2007
6005329471	60053294711	11	~2009
6005504333	36033025999	11	~2009
6006115943	12012231887	11	~2007
6006458663	12012917327	11	~2007
6006580457	48052643657	11	~2009
6007178447	48057427577	11	~2009
6007315943	12014631887	11	~2007
6007392623	12014785247	11	~2007
6007515713	36045094279	11	~2009
6007775533	36046653199	11	~2009
6007848911	12015697823	11	~2007
6008082191	336452602697	12	~2011
6008155739	12016311479	11	~2007
6008651303	12017302607	11	~2007
6008909057	336498907193	12	~2011
6008912999	12017825999	11	~2007
6009086123	12018172247	11	~2007
6009226991	12018453983	11	~2007

5.247.179 digits

25-12-14