Small Mersenne Prime Factors (page 5241/5790)

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
37375713191	74751426383	11	~2014
37376005871	74752011743	11	~2014
37377639479	74755278959	11	~2014
37378861739	74757723479	11	~2014
37378970729	299031765833	12	~2015
37379100743	74758201487	11	~2014
37380544937	897133078489	12	~2016
37380677801	299045422409	12	~2015
37384970039	74769940079	11	~2014
37385145373	822473198207	12	~2016
37385212523	74770425047	11	~2014
37385731319	74771462639	11	~2014
37387346669	897296320057	12	~2016
37393405949	299147247593	12	~2015
37394440859	74788881719	11	~2014
37395318031	1525...756649	14	2023
37396622639	74793245279	11	~2014
37396925963	74793851927	11	~2014
37398323159	74796646319	11	~2014
37402901111	74805802223	11	~2014
37403895143	74807790287	11	~2014
37405277771	74810555543	11	~2014
37405291883	74810583767	11	~2014
37408271933	224449631599	12	~2015
37410614063	74821228127	11	~2014

Exponent	Prime Factor	Dig.	Year
37410745721	224464474327	12	~2015
37411852817	299294822537	12	~2015
37413165239	74826330479	11	~2014
37413874271	74827748543	11	~2014
37415042941	224490257647	12	~2015
37416608699	74833217399	11	~2014
37419772619	74839545239	11	~2014
37420140011	74840280023	11	~2014
37420511603	74841023207	11	~2014
37422109511	299376876089	12	~2015
37423103363	74846206727	11	~2014
37425727951	374257279511	12	~2015
37426527367	374265273671	12	~2015
37427119211	74854238423	11	~2014
37428214511	74856429023	11	~2014
37429225871	74858451743	11	~2014
37430054471	299440435769	12	~2015
37430338093	598885409489	12	~2016
37432896323	74865792647	11	~2014
37434750061	224608500367	12	~2015
37435656689	299485253513	12	~2015
37436578853	224619473119	12	~2015
37436864953	224621189719	12	~2015
37437630071	74875260143	11	~2014
37441036331	74882072663	11	~2014

Exponent	Prime Factor	Dig.	Year
37444388651	74888777303	11	~2014
37444867283	74889734567	11	~2014
37446829163	74893658327	11	~2014
37448393663	74896787327	11	~2014
37449896723	74899793447	11	~2014
37450085521	224700513127	12	~2015
37453905803	74907811607	11	~2014
37460336843	74920673687	11	~2014
37460859731	74921719463	11	~2014
37460888771	74921777543	11	~2014
37465382963	74930765927	11	~2014
37466971439	74933942879	11	~2014
37468033391	74936066783	11	~2014
37472125447	374721254471	12	~2015
37472884303	374728843031	12	~2015
37473228893	224839373359	12	~2015
37474707821	224848246927	12	~2015
37476797951	74953595903	11	~2014
37477756271	74955512543	11	~2014
37479124393	224874746359	12	~2015
37479266771	74958533543	11	~2014
37479266873	224875601239	12	~2015
37480784723	74961569447	11	~2014
37483127471	74966254943	11	~2014
37483313891	74966627783	11	~2014

Exponent	Prime Factor	Dig.	Year
37484756723	74969513447	11	~2014
37484837009	1874...045001	15	2024
37485847103	74971694207	11	~2014
37489782563	74979565127	11	~2014
37490401463	74980802927	11	~2014
37491633983	74983267967	11	~2014
37492366679	74984733359	11	~2014
37492913411	74985826823	11	~2014
37493628563	74987257127	11	~2014
37495176497	299961411977	12	~2015
37495395611	74990791223	11	~2014
37498460459	74996920919	11	~2014
37502366123	75004732247	11	~2014
37505742563	75011485127	11	~2014
37508102363	75016204727	11	~2014
37508569391	75017138783	11	~2014
37509224579	75018449159	11	~2014
37509448799	75018897599	11	~2014
37509593963	75019187927	11	~2014
37510003393	1260...140049	14	2023
37510218671	75020437343	11	~2014
37511489783	75022979567	11	~2014
37512554771	75025109543	11	~2014
37514321063	75028642127	11	~2014
37515516971	75031033943	11	~2014

5.486.313 digits

26-04-05