Small Mersenne Prime Factors (page 3152/5025)

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	Digits	Year
479542589	3836340713	10	~2000
479545211	959090423	9	~1999
479546077	2877276463	10	~2000
479547307	4795473071	10	~2000
479553419	959106839	9	~1999
479559023	959118047	9	~1999
479561021	3836488169	10	~2000
479582003	959164007	9	~1999
479614139	959228279	9	~1999
479624399	959248799	9	~1999
479649671	959299343	9	~1999
479659919	959319839	9	~1999
479663941	7674623057	10	~2001
479666303	959332607	9	~1999
479688899	959377799	9	~1999
479706203	959412407	9	~1999
479730899	959461799	9	~1999
479733431	959466863	9	~1999
479735831	959471663	9	~1999
479740871	58528386263	11	~2003
479747399	959494799	9	~1999
479760607	7676169713	10	~2001
479782957	2878697743	10	~2000
479800523	959601047	9	~1999
479810879	959621759	9	~1999

Exponent	Prime Factor	Digits	Year
479821961	2878931767	10	~2000
479838743	959677487	9	~1999
479846537	2879079223	10	~2000
479859533	2879157199	10	~2000
479867519	959735039	9	~1999
479873651	959747303	9	~1999
479883083	959766167	9	~1999
479886443	959772887	9	~1999
479889323	959778647	9	~1999
479901431	959802863	9	~1999
479903003	959806007	9	~1999
479904863	959809727	9	~1999
479907959	959815919	9	~1999
479910251	959820503	9	~1999
479919971	959839943	9	~1999
479949013	19197960521	11	~2002
479955059	3839640473	10	~2000
479961011	959922023	9	~1999
479969939	959939879	9	~1999
479977937	2879867623	10	~2000
479979359	959958719	9	~1999
479988263	959976527	9	~1999
480002177	2880013063	10	~2000
480003371	960006743	9	~1999
480034397	2880206383	10	~2000

Exponent	Prime Factor	Digits	Year
480034871	3840278969	10	~2000
480042971	960085943	9	~1999
480048937	2880293623	10	~2000
480073837	2880443023	10	~2000
480081869	3840654953	10	~2000
480093623	960187247	9	~1999
480100163	960200327	9	~1999
480102397	14403071911	11	~2002
480102481	2880614887	10	~2000
480107891	960215783	9	~1999
480118321	2880709927	10	~2000
480134983	11523239593	11	~2001
480135251	960270503	9	~1999
480141743	960283487	9	~1999
480152639	960305279	9	~1999
480159059	960318119	9	~1999
480165977	2880995863	10	~2000
480194411	960388823	9	~1999
480199019	960398039	9	~1999
480228323	960456647	9	~1999
480254303	960508607	9	~1999
480264131	960528263	9	~1999
480270821	2881624927	10	~2000
480304991	960609983	9	~1999
480323939	960647879	9	~1999

Exponent	Prime Factor	Digits	Year
480325343	960650687	9	~1999
480330143	960660287	9	~1999
480330491	960660983	9	~1999
480330743	960661487	9	~1999
480333719	960667439	9	~1999
480337859	960675719	9	~1999
480348551	960697103	9	~1999
480358223	960716447	9	~1999
480360761	2882164567	10	~2000
480369971	960739943	9	~1999
480370799	960741599	9	~1999
480401749	10568838479	11	~2001
480406499	960812999	9	~1999
480408251	960816503	9	~1999
480411059	960822119	9	~1999
480434651	960869303	9	~1999
480445463	960890927	9	~1999
480461477	11531075449	11	~2001
480469597	2882817583	10	~2000
480506641	2883039847	10	~2000
480518281	2883109687	10	~2000
480520511	3844164089	10	~2000
480531791	961063583	9	~1999
480538621	2883231727	10	~2000
480587351	961174703	9	~1999

4.724.182 digits

25-04-13