Small Mersenne Prime Factors (page 3057/5205)

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
318297407	5729353327	10	~2000
318300743	636601487	9	~1997
318301811	636603623	9	~1997
318306491	636612983	9	~1997
318309059	636618119	9	~1997
318310471	21008491087	11	~2001
318323003	636646007	9	~1997
318332519	636665039	9	~1997
318350939	2546807513	10	~1999
318360239	2546881913	10	~1999
318376631	636753263	9	~1997
318381683	636763367	9	~1997
318384191	636768383	9	~1997
318396503	636793007	9	~1997
318398999	636797999	9	~1997
318407597	1910445583	10	~1999
318423353	17831707769	11	~2001
318439883	636879767	9	~1997
318446759	636893519	9	~1997
318447421	1910684527	10	~1999
318458531	636917063	9	~1997
318468071	636936143	9	~1997
318479303	636958607	9	~1997
318480727	3184807271	10	~1999
318485309	2547882473	10	~1999

Exponent	Prime Factor	Digits	Year
318488837	1910933023	10	~1999
318491473	1910948839	10	~1999
318492389	17198589007	11	~2001
318498143	636996287	9	~1997
318499991	636999983	9	~1997
318521387	2548171097	10	~1999
318525503	637051007	9	~1997
318538859	637077719	9	~1997
318543443	637086887	9	~1997
318549743	637099487	9	~1997
318555563	637111127	9	~1997
318567239	637134479	9	~1997
318575891	637151783	9	~1997
318581339	637162679	9	~1997
318586997	2548695977	10	~1999
318588443	637176887	9	~1997
318605051	637210103	9	~1997
318627203	637254407	9	~1997
318631991	637263983	9	~1997
318634817	1911808903	10	~1999
318654839	637309679	9	~1997
318664403	637328807	9	~1997
318665279	637330559	9	~1997
318669251	637338503	9	~1997
318675299	2549402393	10	~1999

Exponent	Prime Factor	Digits	Year
318681431	637362863	9	~1997
318696971	637393943	9	~1997
318697343	637394687	9	~1997
318699281	1912195687	10	~1999
318708161	1912248967	10	~1999
318709271	637418543	9	~1997
318709411	5099350577	10	~2000
318713519	637427039	9	~1997
318718931	637437863	9	~1997
318721583	637443167	9	~1997
318723491	637446983	9	~1997
318732059	637464119	9	~1997
318734159	637468319	9	~1997
318735803	637471607	9	~1997
318739559	637479119	9	~1997
318746501	1912479007	10	~1999
318751523	637503047	9	~1997
318765677	7650376249	10	~2000
318806861	1912841167	10	~1999
318807371	637614743	9	~1997
318808709	2550469673	10	~1999
318813983	637627967	9	~1997
318815363	637630727	9	~1997
318823691	637647383	9	~1997
318824591	637649183	9	~1997

Exponent	Prime Factor	Digits	Year
318825401	1912952407	10	~1999
318833617	1913001703	10	~1999
318833783	637667567	9	~1997
318840323	637680647	9	~1997
318846431	637692863	9	~1997
318848489	2550787913	10	~1999
318851843	637703687	9	~1997
318861563	637723127	9	~1997
318862079	637724159	9	~1997
318863663	637727327	9	~1997
318868217	1913209303	10	~1999
318869179	3188691791	10	~1999
318874859	637749719	9	~1997
318893759	637787519	9	~1997
318899351	637798703	9	~1997
318912263	637824527	9	~1997
318918343	5102693489	10	~2000
318927797	1913566783	10	~1999
318934457	2551475657	10	~1999
318936419	637872839	9	~1997
318938363	637876727	9	~1997
318943463	637886927	9	~1997
318945839	637891679	9	~1997
318978371	637956743	9	~1997
318980003	637960007	9	~1997

4.903.097 digits

25-07-08