Small Mersenne Prime Factors (page 4599/5340)

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
14535385211	116283081689	12	~2012
14535937573	87215625439	11	~2012
14536712681	436101380431	12	~2013
14537460853	87224765119	11	~2012
14538007459	610596313279	12	~2014
14538046357	87228278143	11	~2012
14538049703	29076099407	11	~2010
14538289079	29076578159	11	~2010
14538459671	29076919343	11	~2010
14538471329	116307770633	12	~2012
14539564271	29079128543	11	~2010
14540014297	87240085783	11	~2012
14540181599	29080363199	11	~2010
14540291303	29080582607	11	~2010
14540988323	29081976647	11	~2010
14541827411	29083654823	11	~2010
14542351619	29084703239	11	~2010
14542664663	29085329327	11	~2010
14544285787	145442857871	12	~2012
14544942539	29089885079	11	~2010
14545397771	29090795543	11	~2010
14545691183	29091382367	11	~2010
14545994279	349103862697	12	~2013
14546156459	29092312919	11	~2010
14546594339	29093188679	11	~2010

Exponent	Prime Factor	Dig.	Year
14547022811	29094045623	11	~2010
14548303271	29096606543	11	~2010
14548335931	145483359311	12	~2012
14548971191	29097942383	11	~2010
14549378279	29098756559	11	~2010
14549592899	116396743193	12	~2012
14550547223	29101094447	11	~2010
14551930703	29103861407	11	~2010
14552005841	116416046729	12	~2012
14552030123	29104060247	11	~2010
14553017473	232848279569	12	~2013
14553251231	29106502463	11	~2010
14553296039	29106592079	11	~2010
14553435151	145534351511	12	~2012
14554036859	29108073719	11	~2010
14554713119	29109426239	11	~2010
14554770011	29109540023	11	~2010
14554931519	29109863039	11	~2010
14555096603	29110193207	11	~2010
14555115143	29110230287	11	~2010
14555159051	3624...036991	14	2024
14555179511	29110359023	11	~2010
14555209061	116441672489	12	~2012
14555615843	29111231687	11	~2010
14556062519	29112125039	11	~2010

Exponent	Prime Factor	Dig.	Year
14556713669	116453709353	12	~2012
14557120031	29114240063	11	~2010
14557266013	87343596079	11	~2012
14557326851	29114653703	11	~2010
14558002631	29116005263	11	~2010
14558877659	29117755319	11	~2010
14559032639	29118065279	11	~2010
14559036281	436771088431	12	~2013
14559193871	29118387743	11	~2010
14559323231	29118646463	11	~2010
14559780299	29119560599	11	~2010
14560251311	29120502623	11	~2010
14560526411	29121052823	11	~2010
14561097923	29122195847	11	~2010
14562115951	145621159511	12	~2012
14562367103	29124734207	11	~2010
14562442883	29124885767	11	~2010
14562719819	29125439639	11	~2010
14562936623	29125873247	11	~2010
14563160567	116505284537	12	~2012
14563247609	116505980873	12	~2012
14564012759	116512102073	12	~2012
14564638349	116517106793	12	~2012
14564778863	29129557727	11	~2010
14565176317	233042821073	12	~2013

Exponent	Prime Factor	Dig.	Year
14567268953	87403613719	11	~2012
14568142223	29136284447	11	~2010
14568783923	29137567847	11	~2010
14570190073	87421140439	11	~2012
14570432603	29140865207	11	~2010
14572292699	29144585399	11	~2010
14572674299	29145348599	11	~2010
14573934191	29147868383	11	~2010
14574769571	116598156569	12	~2012
14575135583	29150271167	11	~2010
14576372879	29152745759	11	~2010
14576907911	378999605687	12	~2013
14577259283	29154518567	11	~2010
14577328747	233237259953	12	~2013
14577778151	29155556303	11	~2010
14578199879	29156399759	11	~2010
14580482821	87482896927	11	~2012
14580967693	87485806159	11	~2012
14580980923	233295694769	12	~2013
14582091911	29164183823	11	~2010
14582386367	379142045543	12	~2013
14582453843	29164907687	11	~2010
14582750033	87496500199	11	~2012
14582864183	29165728367	11	~2010
14583356951	29166713903	11	~2010

5.037.460 digits

25-09-07