Small Mersenne Prime Factors (page 4830/5025)

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
109057340233	654344041399	12	~2018
109057851323	218115702647	12	~2017
109060832711	218121665423	12	~2017
109066366499	218132732999	12	~2017
109084400819	218168801639	12	~2017
109089432721	654536596327	12	~2018
109093775579	218187551159	12	~2017
109119730931	218239461863	12	~2017
109127192159	218254384319	12	~2017
109131022463	218262044927	12	~2017
109131793019	218263586039	12	~2017
109139133683	218278267367	12	~2017
109143784201	654862705207	12	~2018
109150129199	218300258399	12	~2017
109156861403	218313722807	12	~2017
109167740771	218335481543	12	~2017
109175146823	218350293647	12	~2017
109176760151	218353520303	12	~2017
109177231811	218354463623	12	~2017
109177972031	218355944063	12	~2017
109188854531	218377709063	12	~2017
109206733631	218413467263	12	~2017
109212093239	218424186479	12	~2017
109217157443	218434314887	12	~2017
109219948661	655319691967	12	~2018

Exponent	Prime Factor	Dig.	Year
109225926191	218451852383	12	~2017
109227562739	218455125479	12	~2017
109228845923	218457691847	12	~2017
109229831497	655378988983	12	~2018
109236143111	218472286223	12	~2017
109236636923	218473273847	12	~2017
109237464071	218474928143	12	~2017
109240677599	218481355199	12	~2017
109243894379	218487788759	12	~2017
109248750217	3911...577687	14	2023
109257139643	218514279287	12	~2017
109259770811	218519541623	12	~2017
109261915571	218523831143	12	~2017
109266524377	655599146263	12	~2018
109276237943	218552475887	12	~2017
109279335299	218558670599	12	~2017
109288305817	5088...883953	15	2025
109293574979	218587149959	12	~2017
109296274019	218592548039	12	~2017
109302014561	655812087367	12	~2018
109304226623	218608453247	12	~2017
109306815503	218613631007	12	~2017
109307298671	218614597343	12	~2017
109311279443	218622558887	12	~2017
109316115143	218632230287	12	~2017

Exponent	Prime Factor	Dig.	Year
109319342453	655916054719	12	~2018
109323784133	2514...350591	14	2024
109329801359	218659602719	12	~2017
109338151477	656028908863	12	~2018
109349972723	218699945447	12	~2017
109365395353	656192372119	12	~2018
109374199217	656245195303	12	~2018
109379285663	218758571327	12	~2017
109381574033	656289444199	12	~2018
109383510221	656301061327	12	~2018
109385261591	218770523183	12	~2017
109402464191	218804928383	12	~2017
109409365379	218818730759	12	~2017
109430243579	218860487159	12	~2017
109432616963	2626...071121	14	2024
109436344499	218872688999	12	~2017
109443064079	218886128159	12	~2017
109457351999	218914703999	12	~2017
109461062567	1234...575577	15	2025
109476472739	218952945479	12	~2017
109476843683	218953687367	12	~2017
109483948499	218967896999	12	~2017
109489104359	218978208719	12	~2017
109490348111	218980696223	12	~2017
109491853937	656951123623	12	~2018

Exponent	Prime Factor	Dig.	Year
109492694897	656956169383	12	~2018
109513962479	219027924959	12	~2017
109522330199	219044660399	12	~2017
109523884271	219047768543	12	~2017
109537692479	219075384959	12	~2017
109538939063	219077878127	12	~2017
109540304257	657241825543	12	~2018
109552731719	219105463439	12	~2017
109553096903	219106193807	12	~2017
109555630861	657333785167	12	~2018
109577247371	219154494743	12	~2017
109579668983	219159337967	12	~2017
109581128003	219162256007	12	~2017
109581723539	219163447079	12	~2017
109586579197	657519475183	12	~2018
109588752937	657532517623	12	~2018
109595237879	219190475759	12	~2017
109597224083	219194448167	12	~2017
109610931737	657665590423	12	~2018
109619587403	219239174807	12	~2017
109628389463	219256778927	12	~2017
109631816471	219263632943	12	~2017
109638133523	219276267047	12	~2017
109638526619	219277053239	12	~2017
109645681141	8420...116289	14	2024

4.724.182 digits

25-04-13