Small Mersenne Prime Factors (page 4457/5850)

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
3308593583	6617187167	10	~2005
3308800031	6617600063	10	~2005
3308936483	6617872967	10	~2005
3309073981	19854443887	11	~2007
3309167531	6618335063	10	~2005
3309172907	26473383257	11	~2007
3309183743	6618367487	10	~2005
3309357913	72805874087	11	~2008
3309408779	6618817559	10	~2005
3309478297	79427479129	11	~2008
3309546353	46333648943	11	~2007
3309691991	6619383983	10	~2005
3309708851	6619417703	10	~2005
3309830483	6619660967	10	~2005
3309837703	33098377031	11	~2007
3309849251	26478794009	11	~2007
3309898139	6619796279	10	~2005
3309936263	6619872527	10	~2005
3310005659	6620011319	10	~2005
3310033921	52960542737	11	~2008
3310050257	19860301543	11	~2007
3310082459	6620164919	10	~2005
3310155311	6620310623	10	~2005
3310223711	6620447423	10	~2005
3310265197	99307955911	11	~2008

Exponent	Prime Factor	Digits	Year
3310298399	6620596799	10	~2005
3310409171	6620818343	10	~2005
3310446857	19862681143	11	~2007
3310472783	6620945567	10	~2005
3310496471	6620992943	10	~2005
3310745519	6621491039	10	~2005
3310751303	6621502607	10	~2005
3310761437	26486091497	11	~2007
3310860437	26486883497	11	~2007
3310926623	6621853247	10	~2005
3310943903	6621887807	10	~2005
3310961651	6621923303	10	~2005
3310997939	6621995879	10	~2005
3311177003	6622354007	10	~2005
3311248261	19867489567	11	~2007
3311333393	19868000359	11	~2007
3311370119	79472882857	11	~2008
3311502443	6623004887	10	~2005
3311542823	6623085647	10	~2005
3311581613	46362142583	11	~2007
3311591677	132463667081	12	~2009
3311679299	26493434393	11	~2007
3311686439	6623372879	10	~2005
3311932439	6623864879	10	~2005
3312168143	6624336287	10	~2005

Exponent	Prime Factor	Digits	Year
3312245647	59620421647	11	~2008
3312334237	19874005423	11	~2007
3312336323	6624672647	10	~2005
3312377111	6624754223	10	~2005
3312641099	6625282199	10	~2005
3312847679	6625695359	10	~2005
3312889397	19877336383	11	~2007
3313028333	19878169999	11	~2007
3313054813	19878328879	11	~2007
3313063703	6626127407	10	~2005
3313086431	6626172863	10	~2005
3313191293	19879147759	11	~2007
3313260011	6626520023	10	~2005
3313417511	6626835023	10	~2005
3313544951	26508359609	11	~2007
3313591103	6627182207	10	~2005
3313927271	6627854543	10	~2005
3313966091	6627932183	10	~2005
3314029703	6628059407	10	~2005
3314051651	185586892457	12	~2009
3314311589	106057970849	12	~2008
3314372879	6628745759	10	~2005
3314377127	26515017017	11	~2007
3314453273	19886719639	11	~2007
3314477291	6628954583	10	~2005

Exponent	Prime Factor	Digits	Year
3314482931	238642771033	12	~2009
3314578031	6629156063	10	~2005
3314616199	33146161991	11	~2007
3314897279	6629794559	10	~2005
3315194173	19891165039	11	~2007
3315370511	6630741023	10	~2005
3315453083	6630906167	10	~2005
3315589811	6631179623	10	~2005
3315702107	26525616857	11	~2007
3315762287	26526098297	11	~2007
3315948983	6631897967	10	~2005
3315952151	6631904303	10	~2005
3316011791	6632023583	10	~2005
3316072499	6632144999	10	~2005
3316106483	6632212967	10	~2005
3316162439	6632324879	10	~2005
3316256591	6632513183	10	~2005
3316288571	6632577143	10	~2005
3316312379	6632624759	10	~2005
3316314719	26530517753	11	~2007
3316356551	106123409633	12	~2008
3316377191	6632754383	10	~2005
3316410479	6632820959	10	~2005
3316651043	6633302087	10	~2005
3316694977	79600679449	11	~2008

5.546.121 digits

26-05-03