Small Mersenne Prime Factors (page 4869/5130)

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
82615261271	165230522543	12	~2016
82617461153	495704766919	12	~2017
82621237199	165242474399	12	~2016
82621258211	165242516423	12	~2016
82622111963	165244223927	12	~2016
82623003863	165246007727	12	~2016
82623960383	165247920767	12	~2016
82626263399	165252526799	12	~2016
82628388553	495770331319	12	~2017
82638948851	165277897703	12	~2016
82643322071	165286644143	12	~2016
82643795771	165287591543	12	~2016
82647418163	165294836327	12	~2016
82652945351	661223562809	12	~2018
82655531363	165311062727	12	~2016
82661763791	165323527583	12	~2016
82663421651	165326843303	12	~2016
82674592331	661396738649	12	~2018
82695205319	165390410639	12	~2016
82695337859	165390675719	12	~2016
82697361503	165394723007	12	~2016
82700565911	165401131823	12	~2016
82701294239	165402588479	12	~2016
82702648993	496215893959	12	~2017
82705136291	165410272583	12	~2016

Exponent	Prime Factor	Dig.	Year
82711093931	165422187863	12	~2016
82715626379	165431252759	12	~2016
82716605123	165433210247	12	~2016
82726699859	165453399719	12	~2016
82732240991	165464481983	12	~2016
82732643303	165465286607	12	~2016
82740414917	496442489503	12	~2017
82746485963	165492971927	12	~2016
82749581111	165499162223	12	~2016
82753501823	165507003647	12	~2016
82754115599	165508231199	12	~2016
82755955577	662047644617	12	~2018
82761846539	165523693079	12	~2016
82763126291	165526252583	12	~2016
82764628981	496587773887	12	~2017
82766669411	165533338823	12	~2016
82767127643	165534255287	12	~2016
82771217653	496627305919	12	~2017
82782939923	165565879847	12	~2016
82790298011	165580596023	12	~2016
82793790503	165587581007	12	~2016
82796898539	165593797079	12	~2016
82799976923	165599953847	12	~2016
82810671491	165621342983	12	~2016
82819704833	496918228999	12	~2017

Exponent	Prime Factor	Dig.	Year
82831107239	165662214479	12	~2016
82834541099	165669082199	12	~2016
82838259071	165676518143	12	~2016
82839119903	165678239807	12	~2016
82847111183	165694222367	12	~2016
82849202759	165698405519	12	~2016
82856817731	165713635463	12	~2016
82858443401	497150660407	12	~2017
82860075131	165720150263	12	~2016
82863798323	165727596647	12	~2016
82869698917	497218193503	12	~2017
82871491679	165742983359	12	~2016
82872326819	165744653639	12	~2016
82877165639	165754331279	12	~2016
82889108639	663112869113	12	~2018
82894658303	165789316607	12	~2016
82894947203	165789894407	12	~2016
82905657917	663245263337	12	~2018
82908657371	165817314743	12	~2016
82908841139	165817682279	12	~2016
82909617803	165819235607	12	~2016
82915635653	2039...370639	14	2024
82917348263	165834696527	12	~2016
82920101353	497520608119	12	~2017
82920403739	165840807479	12	~2016

Exponent	Prime Factor	Dig.	Year
82925965321	497555791927	12	~2017
82927272839	165854545679	12	~2016
82932950123	165865900247	12	~2016
82934512679	165869025359	12	~2016
82942501259	165885002519	12	~2016
82942830721	497656984327	12	~2017
82955931797	497735590783	12	~2017
82963124963	165926249927	12	~2016
82964544671	165929089343	12	~2016
82968998279	165937996559	12	~2016
82981021379	165962042759	12	~2016
82984397591	165968795183	12	~2016
82987754579	165975509159	12	~2016
82995690779	165991381559	12	~2016
82996103797	2971...159327	14	2023
82996968479	165993936959	12	~2016
82998369791	165996739583	12	~2016
83012296079	166024592159	12	~2016
83015355551	166030711103	12	~2016
83016311351	166032622703	12	~2016
83022107591	664176860729	12	~2018
83024066399	166048132799	12	~2016
83025393793	498152362759	12	~2017
83025921941	498155531647	12	~2017
83029084093	498174504559	12	~2017

4.828.532 digits

25-06-01