Small Mersenne Prime Factors (page 3643/5070)

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
1485308579	2970617159	10	~2003
1485339851	2970679703	10	~2003
1485369239	2970738479	10	~2003
1485388031	2970776063	10	~2003
1485398767	14853987671	11	~2004
1485455171	2970910343	10	~2003
1485460979	2970921959	10	~2003
1485482561	8912895367	10	~2004
1485493151	2970986303	10	~2003
1485513899	2971027799	10	~2003
1485531263	2971062527	10	~2003
1485586577	8913519463	10	~2004
1485591179	2971182359	10	~2003
1485629339	2971258679	10	~2003
1485739331	2971478663	10	~2003
1485750179	2971500359	10	~2003
1485763343	2971526687	10	~2003
1485776843	2971553687	10	~2003
1485789479	2971578959	10	~2003
1485805903	59432236121	11	~2006
1485892631	2971785263	10	~2003
1485907517	8915445103	10	~2004
1485922133	8915532799	10	~2004
1485931871	2971863743	10	~2003
1485948239	2971896479	10	~2003

Exponent	Prime Factor	Digits	Year
1485968999	2971937999	10	~2003
1486007387	11888059097	11	~2004
1486062311	26749121599	11	~2005
1486120717	8916724303	10	~2004
1486128659	2972257319	10	~2003
1486151759	2972303519	10	~2003
1486183763	2972367527	10	~2003
1486210811	2972421623	10	~2003
1486226699	2972453399	10	~2003
1486320623	2972641247	10	~2003
1486325171	11890601369	11	~2004
1486387583	2972775167	10	~2003
1486419659	2972839319	10	~2003
1486439159	2972878319	10	~2003
1486475519	2972951039	10	~2003
1486513211	2973026423	10	~2003
1486571279	2973142559	10	~2003
1486583363	2973166727	10	~2003
1486596959	2973193919	10	~2003
1486753613	20814550583	11	~2005
1486803917	11894431337	11	~2004
1486864271	2973728543	10	~2003
1486903031	2973806063	10	~2003
1486906873	8921441239	10	~2004
1486909651	26764373719	11	~2005

Exponent	Prime Factor	Digits	Year
1486927223	2973854447	10	~2003
1486943291	2973886583	10	~2003
1486980419	2973960839	10	~2003
1487025959	2974051919	10	~2003
1487068867	14870688671	11	~2004
1487109131	2974218263	10	~2003
1487166491	2974332983	10	~2003
1487345399	2974690799	10	~2003
1487389499	2974778999	10	~2003
1487415733	8924494399	10	~2004
1487432627	11899461017	11	~2004
1487600843	2975201687	10	~2003
1487642963	2975285927	10	~2003
1487706959	2975413919	10	~2003
1487787071	2975574143	10	~2003
1487854559	2975709119	10	~2003
1487857313	8927143879	10	~2004
1488012551	2976025103	10	~2003
1488046919	2976093839	10	~2003
1488056039	2976112079	10	~2003
1488081431	2976162863	10	~2003
1488130271	2976260543	10	~2003
1488245771	2976491543	10	~2003
1488373391	2976746783	10	~2003
1488417811	26791520599	11	~2005

Exponent	Prime Factor	Digits	Year
1488430511	38699193287	11	~2005
1488464591	2976929183	10	~2003
1488469441	8930816647	10	~2004
1488532211	2977064423	10	~2003
1488593999	2977187999	10	~2003
1488606239	2977212479	10	~2003
1488634271	2977268543	10	~2003
1488668543	2977337087	10	~2003
1488747563	2977495127	10	~2003
1488748931	2977497863	10	~2003
1488763631	2977527263	10	~2003
1488801311	2977602623	10	~2003
1488902641	8933415847	10	~2004
1488914699	2977829399	10	~2003
1488977723	2977955447	10	~2003
1489023959	11912191673	11	~2004
1489122779	2978245559	10	~2003
1489127411	11913019289	11	~2004
1489139279	11913114233	11	~2004
1489168619	2978337239	10	~2003
1489178303	2978356607	10	~2003
1489196783	2978393567	10	~2003
1489228859	2978457719	10	~2003
1489245833	20849441663	11	~2005
1489254497	8935526983	10	~2004

4.768.925 digits

25-05-04