Small Mersenne Prime Factors (page 3803/5130)

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	Digits	Year
2051017883	4102035767	10	~2004
2051029811	4102059623	10	~2004
2051137859	4102275719	10	~2004
2051177039	4102354079	10	~2004
2051197283	4102394567	10	~2004
2051236823	4102473647	10	~2004
2051265119	4102530239	10	~2004
2051375951	4102751903	10	~2004
2051398799	4102797599	10	~2004
2051466731	4102933463	10	~2004
2051594177	49238260249	11	~2006
2051648717	12309892303	11	~2005
2051649623	4103299247	10	~2004
2051687903	4103375807	10	~2004
2051732183	4103464367	10	~2004
2051771153	49242507673	11	~2006
2051772077	12310632463	11	~2005
2051869511	4103739023	10	~2004
2051872811	4103745623	10	~2004
2051891843	4103783687	10	~2004
2051908571	4103817143	10	~2004
2051952491	4103904983	10	~2004
2052044699	4104089399	10	~2004
2052127691	4104255383	10	~2004
2052180131	4104360263	10	~2004

Exponent	Prime Factor	Digits	Year
2052356759	4104713519	10	~2004
2052413399	4104826799	10	~2004
2052426143	4104852287	10	~2004
2052515123	4105030247	10	~2004
2052527579	4105055159	10	~2004
2052591851	4105183703	10	~2004
2052646241	12315877447	11	~2005
2052646859	4105293719	10	~2004
2052651803	4105303607	10	~2004
2052671303	4105342607	10	~2004
2052710063	4105420127	10	~2004
2052738851	4105477703	10	~2004
2052782231	16422257849	11	~2005
2052790739	4105581479	10	~2004
2052802093	12316812559	11	~2005
2052846791	4105693583	10	~2004
2052879011	4105758023	10	~2004
2052879611	4105759223	10	~2004
2052915671	4105831343	10	~2004
2052945623	4105891247	10	~2004
2052966011	4105932023	10	~2004
2052966133	131389832513	12	~2007
2052982031	4105964063	10	~2004
2052983651	4105967303	10	~2004
2053081091	4106162183	10	~2004

Exponent	Prime Factor	Digits	Year
2053090057	12318540343	11	~2005
2053172183	4106344367	10	~2004
2053222103	4106444207	10	~2004
2053238051	4106476103	10	~2004
2053307939	4106615879	10	~2004
2053310783	4106621567	10	~2004
2053356443	4106712887	10	~2004
2053366649	49280799577	11	~2006
2053464157	12320784943	11	~2005
2053478519	4106957039	10	~2004
2053571783	4107143567	10	~2004
2053584779	4107169559	10	~2004
2053628231	4107256463	10	~2004
2053688059	20536880591	11	~2005
2053700591	4107401183	10	~2004
2053824137	16430593097	11	~2005
2053859999	4107719999	10	~2004
2053950091	36971101639	11	~2006
2053968227	283447615327	12	~2008
2054048411	4108096823	10	~2004
2054126513	12324759079	11	~2005
2054184719	4108369439	10	~2004
2054257739	4108515479	10	~2004
2054292761	12325756567	11	~2005
2054308199	4108616399	10	~2004

Exponent	Prime Factor	Digits	Year
2054345281	12326071687	11	~2005
2054398499	36979172983	11	~2006
2054421197	12326527183	11	~2005
2054448191	4108896383	10	~2004
2054504591	4109009183	10	~2004
2054641103	4109282207	10	~2004
2054654711	4109309423	10	~2004
2054666219	4109332439	10	~2004
2054763199	86300054359	11	~2007
2054773991	4109547983	10	~2004
2054862431	4109724863	10	~2004
2054864351	16438914809	11	~2005
2054879171	4109758343	10	~2004
2054889779	4109779559	10	~2004
2054990831	4109981663	10	~2004
2055093151	776825211079	12	~2009
2055103943	4110207887	10	~2004
2055310511	4110621023	10	~2004
2055379253	12332275519	11	~2005
2055419783	4110839567	10	~2004
2055463691	4110927383	10	~2004
2055473311	98662718929	11	~2007
2055581399	4111162799	10	~2004
2055628727	16445029817	11	~2005
2055658433	12333950599	11	~2005

4.828.532 digits

25-06-01