Small Mersenne Prime Factors (page 3608/5025)

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
1458181357	139985410273	12	~2007
1458245963	2916491927	10	~2003
1458284657	55414816967	11	~2006
1458342839	2916685679	10	~2003
1458390539	2916781079	10	~2003
1458488831	2916977663	10	~2003
1458502739	11668021913	11	~2004
1458505931	2917011863	10	~2003
1458588671	2917177343	10	~2003
1458632353	8751794119	10	~2004
1458658031	2917316063	10	~2003
1458662981	8751977887	10	~2004
1458669659	2917339319	10	~2003
1458676601	11669412809	11	~2004
1458688103	2917376207	10	~2003
1458739769	11669918153	11	~2004
1458755183	2917510367	10	~2003
1458803713	8752822279	10	~2004
1458833083	14588330831	11	~2004
1458840419	2917680839	10	~2003
1458859531	26259471559	11	~2005
1458866723	2917733447	10	~2003
1458878101	8753268607	10	~2004
1458970739	2917941479	10	~2003
1459027733	20426388263	11	~2005

Exponent	Prime Factor	Digits	Year
1459051019	2918102039	10	~2003
1459116611	2918233223	10	~2003
1459137731	26264479159	11	~2005
1459142381	8754854287	10	~2004
1459182143	2918364287	10	~2003
1459270277	8755621663	10	~2004
1459395097	8756370583	10	~2004
1459459691	26270274439	11	~2005
1459462583	2918925167	10	~2003
1459512419	2919024839	10	~2003
1459540781	43786223431	11	~2005
1459566551	2919133103	10	~2003
1459567943	2919135887	10	~2003
1459576451	2919152903	10	~2003
1459601483	2919202967	10	~2003
1459614671	2919229343	10	~2003
1459657943	2919315887	10	~2003
1459703093	20435843303	11	~2005
1459798919	11678391353	11	~2004
1459866299	72993314951	11	~2006
1459931171	2919862343	10	~2003
1459962851	2919925703	10	~2003
1460042939	11680343513	11	~2004
1460044361	8760266167	10	~2004
1460087159	2920174319	10	~2003

Exponent	Prime Factor	Digits	Year
1460212913	8761277479	10	~2004
1460231771	2920463543	10	~2003
1460275577	8761653463	10	~2004
1460288051	2920576103	10	~2003
1460316191	2920632383	10	~2003
1460325791	2920651583	10	~2003
1460438459	2920876919	10	~2003
1460445251	2920890503	10	~2003
1460530481	11684243849	11	~2004
1460544359	2921088719	10	~2003
1460547383	2921094767	10	~2003
1460638559	2921277119	10	~2003
1460645471	2921290943	10	~2003
1460664061	8763984367	10	~2004
1460692511	2921385023	10	~2003
1460703311	2921406623	10	~2003
1460729723	2921459447	10	~2003
1460776417	8764658503	10	~2004
1460796191	2921592383	10	~2003
1460846279	2921692559	10	~2003
1460868719	2921737439	10	~2003
1460868911	2921737823	10	~2003
1460874851	2921749703	10	~2003
1460875861	8765255167	10	~2004
1460926451	2921852903	10	~2003

Exponent	Prime Factor	Digits	Year
1461165479	2922330959	10	~2003
1461223163	2922446327	10	~2003
1461228583	58449143321	11	~2006
1461249851	2922499703	10	~2003
1461277801	8767666807	10	~2004
1461294859	26303307463	11	~2005
1461339083	2922678167	10	~2003
1461344051	2922688103	10	~2003
1461351623	2922703247	10	~2003
1461397321	8768383927	10	~2004
1461407459	2922814919	10	~2003
1461413797	8768482783	10	~2004
1461439139	2922878279	10	~2003
1461446219	2922892439	10	~2003
1461451753	8768710519	10	~2004
1461455111	11691640889	11	~2004
1461480623	2922961247	10	~2003
1461486359	2922972719	10	~2003
1461502859	2923005719	10	~2003
1461552623	2923105247	10	~2003
1461744419	11693955353	11	~2004
1461789419	2923578839	10	~2003
1461793103	2923586207	10	~2003
1461841763	2923683527	10	~2003
1461857783	2923715567	10	~2003

4.724.182 digits

25-04-13