Small Mersenne Prime Factors (page 5590/5790)

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
149072419631	298144839263	12	~2018
149077321619	298154643239	12	~2018
149089367363	298178734727	12	~2018
149103773639	298207547279	12	~2018
149106646763	298213293527	12	~2018
149114297099	298228594199	12	~2018
149125972283	298251944567	12	~2018
149135614763	298271229527	12	~2018
149137182251	298274364503	12	~2018
149139975119	298279950239	12	~2018
149144912459	298289824919	12	~2018
149173559231	298347118463	12	~2018
149173708679	298347417359	12	~2018
149174523203	298349046407	12	~2018
149185010099	298370020199	12	~2018
149188754051	298377508103	12	~2018
149196555251	298393110503	12	~2018
149199553241	895197319447	12	~2019
149200827791	298401655583	12	~2018
149217306239	298434612479	12	~2018
149217515423	298435030847	12	~2018
149220075443	298440150887	12	~2018
149224008623	298448017247	12	~2018
149228429879	1551...707417	14	2024
149231634313	895389805879	12	~2019

Exponent	Prime Factor	Dig.	Year
149233620059	298467240119	12	~2018
149233829963	298467659927	12	~2018
149236240883	298472481767	12	~2018
149239443191	298478886383	12	~2018
149240836499	298481672999	12	~2018
149241332783	298482665567	12	~2018
149242283699	298484567399	12	~2018
149246636771	298493273543	12	~2018
149271399157	895628394943	12	~2019
149273127851	298546255703	12	~2018
149281253879	298562507759	12	~2018
149289396491	298578792983	12	~2018
149289898031	298579796063	12	~2018
149292808499	298585616999	12	~2018
149298996383	298597992767	12	~2018
149299712641	895798275847	12	~2019
149305599761	895833598567	12	~2019
149306171173	895837027039	12	~2019
149307580811	298615161623	12	~2018
149309880803	298619761607	12	~2018
149317321091	298634642183	12	~2018
149317953023	298635906047	12	~2018
149332140323	298664280647	12	~2018
149332282271	298664564543	12	~2018
149333798363	298667596727	12	~2018

Exponent	Prime Factor	Dig.	Year
149338238363	298676476727	12	~2018
149338713971	298677427943	12	~2018
149350017119	298700034239	12	~2018
149355775259	298711550519	12	~2018
149364178211	1890...615127	15	2023
149374444343	298748888687	12	~2018
149377689953	896266139719	12	~2019
149378193383	298756386767	12	~2018
149393417339	298786834679	12	~2018
149399028851	298798057703	12	~2018
149410012259	298820024519	12	~2018
149416842863	298833685727	12	~2018
149417261711	298834523423	12	~2018
149434369223	298868738447	12	~2018
149440051223	298880102447	12	~2018
149440913519	298881827039	12	~2018
149441948963	298883897927	12	~2018
149444491331	298888982663	12	~2018
149447559203	298895118407	12	~2018
149457466871	298914933743	12	~2018
149459986979	298919973959	12	~2018
149461795211	298923590423	12	~2018
149480932619	298961865239	12	~2018
149481076379	298962152759	12	~2018
149481193789	1408...549239	15	2025

Exponent	Prime Factor	Dig.	Year
149482133459	298964266919	12	~2018
149490208151	298980416303	12	~2018
149499937799	298999875599	12	~2018
149512633103	299025266207	12	~2018
149516537171	299033074343	12	~2018
149529488099	299058976199	12	~2018
149532507083	299065014167	12	~2018
149538468743	299076937487	12	~2018
149546375039	299092750079	12	~2018
149575515863	299151031727	12	~2018
149576107643	299152215287	12	~2018
149583258659	299166517319	12	~2018
149598180971	299196361943	12	~2018
149609184503	299218369007	12	~2018
149626275857	897757655143	12	~2019
149626717679	299253435359	12	~2018
149626845317	897761071903	12	~2019
149631029759	299262059519	12	~2018
149640270683	299280541367	12	~2018
149640817691	299281635383	12	~2018
149650554551	299301109103	12	~2018
149652263857	897913583143	12	~2019
149685487517	898112925103	12	~2019
149687565719	299375131439	12	~2018
149693387339	299386774679	12	~2018

5.486.313 digits

26-04-05