Small Mersenne Prime Factors (page 3176/5070)

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
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
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

Exponent	Prime Factor	Digits	Year
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
480599543	961199087	9	~1999
480608077	2883648463	10	~2000
480609713	2883658279	10	~2000
480620363	961240727	9	~1999
480631691	3845053529	10	~2000
480633841	2883803047	10	~2000
480635399	961270799	9	~1999
480645721	2883874327	10	~2000
480649199	961298399	9	~1999
480650519	961301039	9	~1999
480677819	961355639	9	~1999
480685559	961371119	9	~1999
480695651	961391303	9	~1999
480702821	2884216927	10	~2000
480710099	961420199	9	~1999

Exponent	Prime Factor	Digits	Year
480712667	3845701337	10	~2000
480713099	961426199	9	~1999
480714911	961429823	9	~1999
480715463	961430927	9	~1999
480724193	2884345159	10	~2000
480732491	961464983	9	~1999
480733139	961466279	9	~1999
480738059	961476119	9	~1999
480750311	961500623	9	~1999
480774251	961548503	9	~1999
480794033	2884764199	10	~2000
480803003	961606007	9	~1999
480840263	961680527	9	~1999
480850823	961701647	9	~1999
480854657	2885127943	10	~2000
480867461	2885204767	10	~2000
480906383	961812767	9	~1999
480909491	961818983	9	~1999
480913841	2885483047	10	~2000
480934277	2885605663	10	~2000
480936299	961872599	9	~1999
480936479	961872959	9	~1999
480948179	961896359	9	~1999
480964639	8657363503	10	~2001
480965483	961930967	9	~1999

Exponent	Prime Factor	Digits	Year
480981173	6733736423	10	~2001
480984599	961969199	9	~1999
480990623	961981247	9	~1999
480995111	961990223	9	~1999
480998351	961996703	9	~1999
481004999	962009999	9	~1999
481005659	962011319	9	~1999
481017611	962035223	9	~1999
481040783	962081567	9	~1999
481042043	962084087	9	~1999
481050023	962100047	9	~1999
481059851	962119703	9	~1999
481065899	962131799	9	~1999
481073783	962147567	9	~1999
481076363	962152727	9	~1999
481078211	962156423	9	~1999
481091531	962183063	9	~1999
481094401	2886566407	10	~2000
481105949	14433178471	11	~2002
481108627	4811086271	10	~2001
481123961	2886743767	10	~2000
481131011	962262023	9	~1999
481139063	962278127	9	~1999
481139333	2886835999	10	~2000
481140431	962280863	9	~1999

4.768.925 digits

25-05-04