Small Mersenne Prime Factors (page 4765/5745)

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
9361415711	18722831423	11	~2009
9361833161	56170998967	11	~2010
9361859459	18723718919	11	~2009
9361939679	18723879359	11	~2009
9361955831	18723911663	11	~2009
9362383451	18724766903	11	~2009
9362710499	18725420999	11	~2009
9362891123	18725782247	11	~2009
9363268727	74906149817	11	~2010
9363481163	18726962327	11	~2009
9363662351	168545922319	12	~2011
9363859283	18727718567	11	~2009
9364094849	449476552753	12	~2012
9364308851	18728617703	11	~2009
9364402343	18728804687	11	~2009
9365430323	18730860647	11	~2009
9365473297	149847572753	12	~2011
9365830679	18731661359	11	~2009
9366384803	18732769607	11	~2009
9366428999	18732857999	11	~2009
9367357619	18734715239	11	~2009
9368242379	18736484759	11	~2009
9368923727	168640627087	12	~2011
9369236819	18738473639	11	~2009
9369473051	18738946103	11	~2009

Exponent	Prime Factor	Dig.	Year
9369867239	18739734479	11	~2009
9370000181	56220001087	11	~2010
9370115483	18740230967	11	~2009
9371144381	56226866287	11	~2010
9371657021	56229942127	11	~2010
9371938097	74975504777	11	~2010
9372855077	56237130463	11	~2010
9373011161	74984089289	11	~2010
9373236311	18746472623	11	~2009
9373600051	168724800919	12	~2011
9373692599	18747385199	11	~2009
9373722863	18747445727	11	~2009
9374020457	356212777367	12	~2012
9374484323	18748968647	11	~2009
9374678777	74997430217	11	~2010
9376205159	18752410319	11	~2009
9376241279	18752482559	11	~2009
9376326983	18752653967	11	~2009
9376368191	18752736383	11	~2009
9376447919	18752895839	11	~2009
9376557083	18753114167	11	~2009
9376641119	18753282239	11	~2009
9377016899	18754033799	11	~2009
9377216963	18754433927	11	~2009
9377467259	18754934519	11	~2009

Exponent	Prime Factor	Dig.	Year
9377494883	18754989767	11	~2009
9377501363	18755002727	11	~2009
9377541869	75020334953	11	~2010
9378134543	18756269087	11	~2009
9378241643	18756483287	11	~2009
9378304739	18756609479	11	~2009
9378332633	56269995799	11	~2010
9378384013	206324448287	12	~2011
9378631541	450174313969	12	~2012
9378747239	18757494479	11	~2009
9379110079	93791100791	11	~2011
9379220797	56275324783	11	~2010
9379230611	18758461223	11	~2009
9379456259	18758912519	11	~2009
9379672019	18759344039	11	~2009
9380778371	18761556743	11	~2009
9380979983	18761959967	11	~2009
9381100357	56286602143	11	~2010
9381171203	18762342407	11	~2009
9381340679	18762681359	11	~2009
9381830831	18763661663	11	~2009
9382108643	18764217287	11	~2009
9382220411	18764440823	11	~2009
9382221539	18764443079	11	~2009
9382447499	18764894999	11	~2009

Exponent	Prime Factor	Dig.	Year
9382451843	243943747919	12	~2012
9382467683	18764935367	11	~2009
9382624763	18765249527	11	~2009
9382806659	75062453273	11	~2010
9383489513	56300937079	11	~2010
9383976233	131375667263	12	~2011
9384254003	18768508007	11	~2009
9384475697	56306854183	11	~2010
9384592621	56307555727	11	~2010
9384720731	18769441463	11	~2009
9384831803	18769663607	11	~2009
9384994319	18769988639	11	~2009
9385081859	18770163719	11	~2009
9385441451	18770882903	11	~2009
9385610303	18771220607	11	~2009
9385797623	18771595247	11	~2009
9385843919	18771687839	11	~2009
9386148899	18772297799	11	~2009
9386235539	18772471079	11	~2009
9386670971	18773341943	11	~2009
9386709133	56320254799	11	~2010
9386746331	18773492663	11	~2009
9387000839	18774001679	11	~2009
9387028823	18774057647	11	~2009
9387171727	225292121449	12	~2012

5.441.361 digits

26-03-15