Small Mersenne Prime Factors (page 5294/5610)

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
82908841139	165817682279	12	~2016
82909617803	165819235607	12	~2016
82915635653	2039...370639	14	2024
82917190507	829171905071	12	~2018
82917348263	165834696527	12	~2016
82920101353	497520608119	12	~2017
82920403739	165840807479	12	~2016
82925965321	497555791927	12	~2017
82927272839	165854545679	12	~2016
82932950123	165865900247	12	~2016
82934512679	165869025359	12	~2016
82934739743	165869479487	12	~2016
82936226519	165872453039	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
82974359459	663794875673	12	~2018
82981021379	165962042759	12	~2016
82984397591	165968795183	12	~2016
82987135087	829871350871	12	~2018
82987754579	165975509159	12	~2016
82995690779	165991381559	12	~2016

Exponent	Prime Factor	Dig.	Year
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
83029457501	498176745007	12	~2017
83029592549	664236740393	12	~2018
83030353061	664242824489	12	~2018
83030711053	498184266319	12	~2017
83031300119	166062600239	12	~2016
83034731737	498208390423	12	~2017
83039683799	166079367599	12	~2016
83039902931	166079805863	12	~2016
83041557197	664332457577	12	~2018
83043642443	166087284887	12	~2016
83044272131	166088544263	12	~2016
83047567679	166095135359	12	~2016
83050229831	166100459663	12	~2016
83051454071	166102908143	12	~2016

Exponent	Prime Factor	Dig.	Year
83061581159	166123162319	12	~2016
83063967323	166127934647	12	~2016
83065551311	166131102623	12	~2016
83075429537	498452577223	12	~2017
83079962891	166159925783	12	~2016
83084243399	664673947193	12	~2018
83086276439	166172552879	12	~2016
83088731543	166177463087	12	~2016
83092135739	166184271479	12	~2016
83101208951	166202417903	12	~2016
83102091659	166204183319	12	~2016
83103738911	664829911289	12	~2018
83108232803	166216465607	12	~2016
83108547803	166217095607	12	~2016
83109086843	166218173687	12	~2016
83110490531	166220981063	12	~2016
83111963161	498671778967	12	~2017
83115314939	166230629879	12	~2016
83118019499	166236038999	12	~2016
83118039577	498708237463	12	~2017
83119898473	498719390839	12	~2017
83123413031	166246826063	12	~2016
83123835083	166247670167	12	~2016
83125943423	166251886847	12	~2016
83127241451	166254482903	12	~2016

Exponent	Prime Factor	Dig.	Year
83127342041	665018736329	12	~2018
83134716757	1978...588167	14	2024
83135604263	166271208527	12	~2016
83136439679	166272879359	12	~2016
83138063843	166276127687	12	~2016
83138132911	831381329111	12	~2018
83138172191	166276344383	12	~2016
83138341259	166276682519	12	~2016
83138533979	166277067959	12	~2016
83140307953	498841847719	12	~2017
83141103599	166282207199	12	~2016
83145075427	831450754271	12	~2018
83146979291	166293958583	12	~2016
83148593239	831485932391	12	~2018
83149151003	166298302007	12	~2016
83155442819	166310885639	12	~2016
83159542079	166319084159	12	~2016
83168583731	166337167463	12	~2016
83171368859	166342737719	12	~2016
83174182463	166348364927	12	~2016
83183457713	499100746279	12	~2017
83187730319	166375460639	12	~2016
83190723443	166381446887	12	~2016
83192698019	166385396039	12	~2016
83194927381	499169564287	12	~2017

5.307.017 digits

26-01-11