Small Mersenne Prime Factors (page 4818/5445)

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
23042514739	1866...938591	14	2023
23043799391	46087598783	11	~2012
23044412837	138266477023	12	~2013
23044904867	184359238937	12	~2013
23048080091	46096160183	11	~2012
23048915783	553173978793	12	~2015
23049328871	46098657743	11	~2012
23049782471	46099564943	11	~2012
23050164239	46100328479	11	~2012
23053614481	138321686887	12	~2013
23053963573	507187198607	12	~2015
23054862731	184438901849	12	~2013
23056632779	46113265559	11	~2012
23057588171	46115176343	11	~2012
23057901613	138347409679	12	~2013
23059155923	46118311847	11	~2012
23059164517	138354987103	12	~2013
23059843811	46119687623	11	~2012
23059991039	46119982079	11	~2012
23062970201	184503761609	12	~2013
23065171453	138391028719	12	~2013
23065736741	138394420447	12	~2013
23065751339	46131502679	11	~2012
23066125217	138396751303	12	~2013
23066434619	46132869239	11	~2012

Exponent	Prime Factor	Dig.	Year
23067144077	138402864463	12	~2013
23068290851	46136581703	11	~2012
23068685879	46137371759	11	~2012
23068774453	138412646719	12	~2013
23069320019	46138640039	11	~2012
23069920747	784377305399	12	~2015
23070403997	138422423983	12	~2013
23070701051	46141402103	11	~2012
23071107457	138426644743	12	~2013
23071472219	46142944439	11	~2012
23071904423	46143808847	11	~2012
23073085799	415315544383	12	~2014
23074942799	46149885599	11	~2012
23077420211	46154840423	11	~2012
23078056619	46156113239	11	~2012
23079179003	46158358007	11	~2012
23080593799	230805937991	12	~2014
23083330163	46166660327	11	~2012
23083721051	46167442103	11	~2012
23083995491	46167990983	11	~2012
23084331973	138505991839	12	~2013
23085733739	46171467479	11	~2012
23086564379	46173128759	11	~2012
23086598351	46173196703	11	~2012
23088893939	46177787879	11	~2012

Exponent	Prime Factor	Dig.	Year
23089911641	138539469847	12	~2013
23091316043	46182632087	11	~2012
23091742057	2710...174919	14	2023
23092081619	46184163239	11	~2012
23092855391	46185710783	11	~2012
23094682057	138568092343	12	~2013
23096367067	415734607207	12	~2014
23096819521	138580917127	12	~2013
23097904121	138587424727	12	~2013
23098354523	46196709047	11	~2012
23100053159	184800425273	12	~2013
23102280191	46204560383	11	~2012
23102676959	46205353919	11	~2012
23104041203	46208082407	11	~2012
23104100039	46208200079	11	~2012
23105637491	46211274983	11	~2012
23106283751	46212567503	11	~2012
23106417913	369702686609	12	~2014
23108318423	46216636847	11	~2012
23108328443	46216656887	11	~2012
23109151931	46218303863	11	~2012
23109790961	138658745767	12	~2013
23110915181	184887321449	12	~2013
23112163859	46224327719	11	~2012
23112381791	46224763583	11	~2012

Exponent	Prime Factor	Dig.	Year
23112500111	46225000223	11	~2012
23115235679	46230471359	11	~2012
23117908727	184943269817	12	~2013
23120434751	46240869503	11	~2012
23121647831	46243295663	11	~2012
23122006837	138732041023	12	~2013
23124376739	46248753479	11	~2012
23124665677	369994650833	12	~2014
23124692231	46249384463	11	~2012
23124775649	184998205193	12	~2013
23126357939	46252715879	11	~2012
23126412299	46252824599	11	~2012
23126457491	185011659929	12	~2013
23127789203	46255578407	11	~2012
23127846023	46255692047	11	~2012
23128923539	46257847079	11	~2012
23132124181	138792745087	12	~2013
23132269031	46264538063	11	~2012
23132956811	46265913623	11	~2012
23133435239	46266870479	11	~2012
23133931451	46267862903	11	~2012
23135842871	46271685743	11	~2012
23136826943	46273653887	11	~2012
23137399679	46274799359	11	~2012
23138964923	46277929847	11	~2012

5.142.307 digits

25-10-26