Small Mersenne Prime Factors (page 4721/5670)

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
9723749279	19447498559	11	~2009
9725446103	19450892207	11	~2009
9726107399	19452214799	11	~2009
9726205343	19452410687	11	~2009
9726538403	19453076807	11	~2009
9726813359	19453626719	11	~2009
9726856091	19453712183	11	~2009
9726857603	19453715207	11	~2009
9727128923	19454257847	11	~2009
9727355663	19454711327	11	~2009
9728061043	97280610431	11	~2011
9728069831	19456139663	11	~2009
9728111489	77824891913	11	~2011
9728208251	19456416503	11	~2009
9728256077	77826048617	11	~2011
9728369099	19456738199	11	~2009
9729715321	58378291927	11	~2010
9730143457	447586599023	12	~2012
9730691507	77845532057	11	~2011
9731089223	19462178447	11	~2009
9731139623	19462279247	11	~2009
9731484611	19462969223	11	~2009
9731550071	19463100143	11	~2009
9731594891	19463189783	11	~2009
9731810911	175172596399	12	~2011

Exponent	Prime Factor	Dig.	Year
9732077041	291962311231	12	~2012
9732165479	19464330959	11	~2009
9732276923	19464553847	11	~2009
9732488063	19464976127	11	~2009
9732549119	19465098239	11	~2009
9733220531	19466441063	11	~2009
9733412621	77867300969	11	~2011
9733550951	19467101903	11	~2009
9733728839	19467457679	11	~2009
9734061803	19468123607	11	~2009
9734692739	19469385479	11	~2009
9734987201	77879897609	11	~2011
9735573119	19471146239	11	~2009
9735871391	19471742783	11	~2009
9736954079	19473908159	11	~2009
9736962971	19473925943	11	~2009
9736984133	58421904799	11	~2010
9737180483	19474360967	11	~2009
9737186863	97371868631	11	~2011
9737337719	19474675439	11	~2009
9738766643	19477533287	11	~2009
9738842077	389553683081	12	~2012
9739365253	58436191519	11	~2010
9739848791	19479697583	11	~2009
9740010121	155840161937	12	~2011

Exponent	Prime Factor	Dig.	Year
9740308667	253248025343	12	~2012
9740522219	19481044439	11	~2009
9740861771	19481723543	11	~2009
9740935511	19481871023	11	~2009
9741194783	19482389567	11	~2009
9741272423	19482544847	11	~2009
9741609347	77932874777	11	~2011
9741716657	77933733257	11	~2011
9742330079	19484660159	11	~2009
9742627943	19485255887	11	~2009
9742764797	58456588783	11	~2010
9743181131	19486362263	11	~2009
9743621963	19487243927	11	~2009
9743739151	97437391511	11	~2011
9743784749	233850833977	12	~2012
9743961611	19487923223	11	~2009
9744090371	19488180743	11	~2009
9744299267	77954394137	11	~2011
9744447431	19488894863	11	~2009
9745123691	19490247383	11	~2009
9745211039	19490422079	11	~2009
9745509863	19491019727	11	~2009
9745702223	19491404447	11	~2009
9745807391	19491614783	11	~2009
9746227499	19492454999	11	~2009

Exponent	Prime Factor	Dig.	Year
9746643763	97466437631	11	~2011
9747479713	155959675409	12	~2011
9747490619	19494981239	11	~2009
9748122899	19496245799	11	~2009
9748907123	19497814247	11	~2009
9749130557	58494783343	11	~2010
9749405111	19498810223	11	~2009
9749470477	58496822863	11	~2010
9749548163	19499096327	11	~2009
9749806751	19499613503	11	~2009
9750483731	19500967463	11	~2009
9751467611	19502935223	11	~2009
9751884091	97518840911	11	~2011
9751924223	19503848447	11	~2009
9752071151	19504142303	11	~2009
9752106359	19504212719	11	~2009
9752112983	19504225967	11	~2009
9752234099	19504468199	11	~2009
9752563811	19505127623	11	~2009
9752951651	19505903303	11	~2009
9753374723	19506749447	11	~2009
9753386663	19506773327	11	~2009
9753656651	19507313303	11	~2009
9753811631	19507623263	11	~2009
9754060919	19508121839	11	~2009

5.366.787 digits

26-02-08