Small Mersenne Prime Factors (page 4583/5670)

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
6494400137	51955201097	11	~2009
6494534159	12989068319	11	~2008
6494667659	12989335319	11	~2008
6494777483	12989554967	11	~2008
6494832517	38968995103	11	~2009
6494933111	12989866223	11	~2008
6495011951	12990023903	11	~2008
6495230657	714475372271	12	~2012
6495410819	12990821639	11	~2008
6495657997	38973947983	11	~2009
6495720073	38974320439	11	~2009
6495767363	12991534727	11	~2008
6495925043	12991850087	11	~2008
6496211303	12992422607	11	~2008
6496322801	38977936807	11	~2009
6496565401	38979392407	11	~2009
6496610999	12993221999	11	~2008
6496647233	38979883399	11	~2009
6496661219	12993322439	11	~2008
6496702571	12993405143	11	~2008
6496796951	12993593903	11	~2008
6497370023	12994740047	11	~2008
6497407139	12994814279	11	~2008
6497502503	12995005007	11	~2008
6497508151	64975081511	11	~2009

Exponent	Prime Factor	Dig.	Year
6497711659	64977116591	11	~2009
6497914691	12995829383	11	~2008
6497938709	51983509673	11	~2009
6498049223	12996098447	11	~2008
6498075341	51984602729	11	~2009
6498348011	12996696023	11	~2008
6498376331	12996752663	11	~2008
6498456337	38990738023	11	~2009
6498456383	12996912767	11	~2008
6498482443	220948403063	12	~2011
6498495071	12996990143	11	~2008
6498531511	64985315111	11	~2009
6498561071	12997122143	11	~2008
6498658811	12997317623	11	~2008
6498855431	12997710863	11	~2008
6499054631	12998109263	11	~2008
6499288129	142984338839	12	~2010
6499485803	12998971607	11	~2008
6499496651	12998993303	11	~2008
6499529339	12999058679	11	~2008
6499732919	12999465839	11	~2008
6499860581	38999163487	11	~2009
6500194751	13000389503	11	~2008
6500383859	13000767719	11	~2008
6500657357	195019720711	12	~2011

Exponent	Prime Factor	Dig.	Year
6500817419	13001634839	11	~2008
6501006059	13002012119	11	~2008
6501040661	39006243967	11	~2009
6501261583	104020185329	12	~2010
6501385883	13002771767	11	~2008
6501763091	273074049823	12	~2011
6501972791	13003945583	11	~2008
6502277741	247086554159	12	~2011
6502338299	13004676599	11	~2008
6502442819	13004885639	11	~2008
6502461863	13004923727	11	~2008
6502675199	13005350399	11	~2008
6503149151	13006298303	11	~2008
6503511191	13007022383	11	~2008
6503954533	39023727199	11	~2009
6504310259	13008620519	11	~2008
6504478283	13008956567	11	~2008
6504513503	13009027007	11	~2008
6504581459	13009162919	11	~2008
6504607283	13009214567	11	~2008
6504807839	13009615679	11	~2008
6505127411	13010254823	11	~2008
6505366559	13010733119	11	~2008
6505486583	13010973167	11	~2008
6505531523	13011063047	11	~2008

Exponent	Prime Factor	Dig.	Year
6505553497	39033320983	11	~2009
6505591283	13011182567	11	~2008
6505594883	13011189767	11	~2008
6505632359	52045058873	11	~2009
6505678979	13011357959	11	~2008
6505869431	13011738863	11	~2008
6506274611	52050196889	11	~2009
6506668583	13013337167	11	~2008
6506873771	13013747543	11	~2008
6507036023	13014072047	11	~2008
6507144779	13014289559	11	~2008
6507232717	39043396303	11	~2009
6507680219	13015360439	11	~2008
6507820091	52062560729	11	~2009
6508218863	13016437727	11	~2008
6508226513	39049359079	11	~2009
6508229939	13016459879	11	~2008
6508314563	13016629127	11	~2008
6508484831	13016969663	11	~2008
6508642079	52069136633	11	~2009
6508813019	117158634343	12	~2010
6508825391	13017650783	11	~2008
6508891139	13017782279	11	~2008
6509619191	13019238383	11	~2008
6509861003	13019722007	11	~2008

5.366.787 digits

26-02-08