Small Mersenne Prime Factors (page 4080/5025)

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
5742765071	11485530143	11	~2007
5742830771	11485661543	11	~2007
5743117091	11486234183	11	~2007
5743380479	11486760959	11	~2007
5743382159	11486764319	11	~2007
5743461851	11486923703	11	~2007
5743474483	57434744831	11	~2009
5743570559	11487141119	11	~2007
5743799219	11487598439	11	~2007
5744194679	11488389359	11	~2007
5744418191	11488836383	11	~2007
5744878151	11489756303	11	~2007
5745056459	11490112919	11	~2007
5745170293	91922724689	11	~2009
5745281039	11490562079	11	~2007
5745297419	11490594839	11	~2007
5745324707	45962597657	11	~2009
5745731291	11491462583	11	~2007
5745791939	11491583879	11	~2007
5745951311	11491902623	11	~2007
5746112891	11492225783	11	~2007
5746143391	103430581039	12	~2010
5746183979	11492367959	11	~2007
5746329203	11492658407	11	~2007
5746397543	11492795087	11	~2007

Exponent	Prime Factor	Dig.	Year
5746538689	137916928537	12	~2010
5746638119	11493276239	11	~2007
5746639441	34479836647	11	~2008
5746824001	34480944007	11	~2008
5747108747	45976869977	11	~2009
5747364011	11494728023	11	~2007
5747514911	11495029823	11	~2007
5747594159	11495188319	11	~2007
5747661791	11495323583	11	~2007
5747704507	57477045071	11	~2009
5747723393	34486340359	11	~2008
5747780099	11495560199	11	~2007
5748055289	45984442313	11	~2009
5748117839	45984942713	11	~2009
5748229139	11496458279	11	~2007
5748982163	11497964327	11	~2007
5749161193	34494967159	11	~2008
5749303523	11498607047	11	~2007
5749372679	11498745359	11	~2007
5749458791	11498917583	11	~2007
5749567121	34497402727	11	~2008
5749574723	11499149447	11	~2007
5749839083	11499678167	11	~2007
5749947683	11499895367	11	~2007
5750643383	11501286767	11	~2007

Exponent	Prime Factor	Dig.	Year
5750851259	138020430217	12	~2010
5750866061	46006928489	11	~2009
5750884439	11501768879	11	~2007
5750895191	11501790383	11	~2007
5750910479	11501820959	11	~2007
5750942453	34505654719	11	~2008
5751082979	11502165959	11	~2007
5751122309	46008978473	11	~2009
5751292511	11502585023	11	~2007
5751367091	103524607639	12	~2010
5751440753	34508644519	11	~2008
5751510503	11503021007	11	~2007
5751517259	11503034519	11	~2007
5751557099	11503114199	11	~2007
5751720761	34510324567	11	~2008
5752489817	46019918537	11	~2009
5753138771	11506277543	11	~2007
5753365619	11506731239	11	~2007
5753665811	11507331623	11	~2007
5753732423	11507464847	11	~2007
5753941987	57539419871	11	~2009
5753962871	11507925743	11	~2007
5753969383	57539693831	11	~2009
5754469537	34526817223	11	~2008
5754695543	11509391087	11	~2007

Exponent	Prime Factor	Dig.	Year
5754856403	11509712807	11	~2007
5755237357	34531424143	11	~2008
5755650683	11511301367	11	~2007
5755943411	11511886823	11	~2007
5755970459	11511940919	11	~2007
5755996639	57559966391	11	~2009
5756666579	11513333159	11	~2007
5756750231	11513500463	11	~2007
5756826479	11513652959	11	~2007
5757088619	11514177239	11	~2007
5757090931	103627636759	12	~2010
5757514883	11515029767	11	~2007
5757570671	11515141343	11	~2007
5757794303	11515588607	11	~2007
5758068923	11516137847	11	~2007
5758393757	46067150057	11	~2009
5758768019	11517536039	11	~2007
5758777331	11517554663	11	~2007
5758841639	11517683279	11	~2007
5758894657	34553367943	11	~2008
5758928081	34553568487	11	~2008
5759666749	138232001977	12	~2010
5759752763	11519505527	11	~2007
5759763083	11519526167	11	~2007
5759782811	11519565623	11	~2007

4.724.182 digits

25-04-13