Small Mersenne Prime Factors (page 4514/5025)

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
26429496631	264294966311	12	~2014
26429610611	52859221223	11	~2012
26432910503	52865821007	11	~2012
26433234419	52866468839	11	~2012
26433510839	52867021679	11	~2012
26434638371	52869276743	11	~2012
26436137243	52872274487	11	~2012
26437021043	52874042087	11	~2012
26440584983	52881169967	11	~2012
26440744919	52881489839	11	~2012
26445414371	52890828743	11	~2012
26446787303	52893574607	11	~2012
26446894811	52893789623	11	~2012
26447137763	52894275527	11	~2012
26447692391	52895384783	11	~2012
26448282193	158689693159	12	~2014
26449410623	52898821247	11	~2012
26449879193	158699275159	12	~2014
26451493441	158708960647	12	~2014
26451631307	211613050457	12	~2014
26451808391	52903616783	11	~2012
26452169603	52904339207	11	~2012
26452865353	158717192119	12	~2014
26453070383	52906140767	11	~2012
26454354673	158726128039	12	~2014

Exponent	Prime Factor	Dig.	Year
26454354851	52908709703	11	~2012
26454954563	52909909127	11	~2012
26456073779	52912147559	11	~2012
26458800419	52917600839	11	~2012
26459316083	52918632167	11	~2012
26459678831	52919357663	11	~2012
26459942297	158759653783	12	~2014
26460350053	158762100319	12	~2014
26460551083	264605510831	12	~2014
26462169479	52924338959	11	~2012
26463361871	52926723743	11	~2012
26465054977	423440879633	12	~2015
26465906339	52931812679	11	~2012
26467588267	476416588807	12	~2015
26467739723	52935479447	11	~2012
26467858643	52935717287	11	~2012
26468534723	52937069447	11	~2012
26469829343	52939658687	11	~2012
26470836179	52941672359	11	~2012
26472136991	52944273983	11	~2012
26473576919	52947153839	11	~2012
26473884119	52947768239	11	~2012
26474870171	52949740343	11	~2012
26475858011	52951716023	11	~2012
26476581731	52953163463	11	~2012

Exponent	Prime Factor	Dig.	Year
26479373891	52958747783	11	~2012
26481694691	211853557529	12	~2014
26483495099	52966990199	11	~2012
26484246923	52968493847	11	~2012
26484607823	52969215647	11	~2012
26485984741	7543...542369	14	2024
26486741909	211893935273	12	~2014
26486989583	52973979167	11	~2012
26487639847	264876398471	12	~2014
26489057531	52978115063	11	~2012
26490653177	158943919063	12	~2014
26491213379	52982426759	11	~2012
26492417111	52984834223	11	~2012
26493204371	52986408743	11	~2012
26493849671	52987699343	11	~2012
26494033213	158964199279	12	~2014
26496192377	158977154263	12	~2014
26496508799	52993017599	11	~2012
26496658619	52993317239	11	~2012
26498903939	52997807879	11	~2012
26499141047	211993128377	12	~2014
26499622679	52999245359	11	~2012
26499829019	52999658039	11	~2012
26502224327	212017794617	12	~2014
26502660127	265026601271	12	~2014

Exponent	Prime Factor	Dig.	Year
26504314751	53008629503	11	~2012
26505868757	371082162599	12	~2014
26506350743	53012701487	11	~2012
26506486679	53012973359	11	~2012
26508197363	53016394727	11	~2012
26508284813	159049708879	12	~2014
26508356579	53016713159	11	~2012
26508487139	53016974279	11	~2012
26508603323	53017206647	11	~2012
26508751337	159052508023	12	~2014
26510223479	53020446959	11	~2012
26510479837	159062879023	12	~2014
26511850223	53023700447	11	~2012
26512666919	53025333839	11	~2012
26512912271	53025824543	11	~2012
26513478793	159080872759	12	~2014
26514188977	159085133863	12	~2014
26514747431	53029494863	11	~2012
26514872759	53029745519	11	~2012
26516466299	53032932599	11	~2012
26516814341	159100886047	12	~2014
26516828291	53033656583	11	~2012
26517734219	53035468439	11	~2012
26520007357	159120044143	12	~2014
26520937211	53041874423	11	~2012

4.724.182 digits

25-04-13