Small Mersenne Prime Factors (page 4326/5025)

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	Dig.	Year
13169917823	26339835647	11	~2010
13170169511	26340339023	11	~2010
13171157063	26342314127	11	~2010
13172890343	26345780687	11	~2010
13173791639	26347583279	11	~2010
13174021037	79044126223	11	~2011
13174137191	26348274383	11	~2010
13174240043	26348480087	11	~2010
13174480439	26348960879	11	~2010
13174995863	26349991727	11	~2010
13175274263	26350548527	11	~2010
13175333113	79051998679	11	~2011
13175423819	26350847639	11	~2010
13175430743	26350861487	11	~2010
13176160031	26352320063	11	~2010
13176761399	26353522799	11	~2010
13177054931	26354109863	11	~2010
13177310593	79063863559	11	~2011
13180451729	105443613833	12	~2012
13180507199	26361014399	11	~2010
13181515187	105452121497	12	~2012
13182083423	26364166847	11	~2010
13182858761	105462870089	12	~2012
13183050431	26366100863	11	~2010
13183055233	79098331399	11	~2011

Exponent	Prime Factor	Dig.	Year
13183493759	26366987519	11	~2010
13183570931	26367141863	11	~2010
13184174123	26368348247	11	~2010
13185262703	26370525407	11	~2010
13185430943	26370861887	11	~2010
13185572447	316453738729	12	~2013
13187668199	26375336399	11	~2010
13187954441	105503635529	12	~2012
13188372979	316520951497	12	~2013
13189150679	26378301359	11	~2010
13189217351	105513738809	12	~2012
13190810693	79144864159	11	~2011
13192035113	79152210679	11	~2011
13192074743	26384149487	11	~2010
13193016251	659650812551	12	~2013
13193777939	26387555879	11	~2010
13193879351	26387758703	11	~2010
13193895257	79163371543	11	~2011
13194029237	79164175423	11	~2011
13194281819	26388563639	11	~2010
13194650813	422228826017	12	~2013
13194974951	26389949903	11	~2010
13195606331	26391212663	11	~2010
13195725971	105565807769	12	~2012
13196628671	26393257343	11	~2010

Exponent	Prime Factor	Dig.	Year
13196638571	26393277143	11	~2010
13197808511	26395617023	11	~2010
13198237043	26396474087	11	~2010
13198940519	26397881039	11	~2010
13198949339	26397898679	11	~2010
13199461343	26398922687	11	~2010
13200174479	26400348959	11	~2010
13200276629	105602213033	12	~2012
13200717539	26401435079	11	~2010
13200768341	79204610047	11	~2011
13200945839	26401891679	11	~2010
13200991781	79205950687	11	~2011
13201283699	105610269593	12	~2012
13201671071	26403342143	11	~2010
13202647807	2777...985929	14	2025
13205652391	211290438257	12	~2012
13205715973	79234295839	11	~2011
13205885471	26411770943	11	~2010
13206077791	765952511879	12	~2014
13206433679	26412867359	11	~2010
13206650003	26413300007	11	~2010
13206659863	211306557809	12	~2012
13208772517	79252635103	11	~2011
13209809471	26419618943	11	~2010
13210013231	26420026463	11	~2010

Exponent	Prime Factor	Dig.	Year
13210514699	26421029399	11	~2010
13210832111	26421664223	11	~2010
13211257511	105690060089	12	~2012
13212144083	26424288167	11	~2010
13212272531	2639...079257	15	2023
13212422291	26424844583	11	~2010
13212742379	26425484759	11	~2010
13212863177	79277179063	11	~2011
13213006979	26426013959	11	~2010
13213051471	211408823537	12	~2012
13214077559	26428155119	11	~2010
13214213219	26428426439	11	~2010
13214371139	26428742279	11	~2010
13215269891	26430539783	11	~2010
13215698123	26431396247	11	~2010
13216250303	26432500607	11	~2010
13216286903	26432573807	11	~2010
13216344143	26432688287	11	~2010
13216774619	26433549239	11	~2010
13217314763	26434629527	11	~2010
13217710283	26435420567	11	~2010
13218503159	26437006319	11	~2010
13218736859	26437473719	11	~2010
13219697891	26439395783	11	~2010
13219948271	26439896543	11	~2010

4.724.182 digits

25-04-13