Small Mersenne Prime Factors (page 4852/5025)

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
122581123103	245162246207	12	~2018
122582214299	245164428599	12	~2018
122582244299	245164488599	12	~2018
122586386633	735518319799	12	~2019
122590329863	245180659727	12	~2018
122595102419	245190204839	12	~2018
122607976481	8705...301511	14	2023
122611275491	245222550983	12	~2018
122614470983	245228941967	12	~2018
122615329019	245230658039	12	~2018
122616179351	245232358703	12	~2018
122617642783	2280...557639	14	2025
122620912523	245241825047	12	~2018
122635666151	245271332303	12	~2018
122639239139	245278478279	12	~2018
122639535251	245279070503	12	~2018
122643551039	245287102079	12	~2018
122650601603	245301203207	12	~2018
122657530991	245315061983	12	~2018
122666446163	245332892327	12	~2018
122669614283	245339228567	12	~2018
122689791011	245379582023	12	~2018
122693423999	245386847999	12	~2018
122697388211	245394776423	12	~2018
122703690359	245407380719	12	~2018

Exponent	Prime Factor	Dig.	Year
122706040021	736236240127	12	~2019
122740341299	245480682599	12	~2018
122743328219	245486656439	12	~2018
122767161371	245534322743	12	~2018
122777397923	245554795847	12	~2018
122780166479	245560332959	12	~2018
122793606731	245587213463	12	~2018
122795316431	245590632863	12	~2018
122811602423	245623204847	12	~2018
122825364659	245650729319	12	~2018
122828769611	245657539223	12	~2018
122836262761	737017576567	12	~2019
122836599779	245673199559	12	~2018
122839279763	245678559527	12	~2018
122847703997	737086223983	12	~2019
122854976879	245709953759	12	~2018
122870981153	737225886919	12	~2019
122883322931	245766645863	12	~2018
122893471639	3834...151369	14	2024
122893487471	1808...557313	15	2023
122903262623	245806525247	12	~2018
122912858111	245825716223	12	~2018
122943249311	245886498623	12	~2018
122943474371	245886948743	12	~2018
122945163983	245890327967	12	~2018

Exponent	Prime Factor	Dig.	Year
122951576999	245903153999	12	~2018
122964599423	245929198847	12	~2018
122968753031	245937506063	12	~2018
122969463803	245938927607	12	~2018
122982135011	245964270023	12	~2018
122985694439	245971388879	12	~2018
122985860603	245971721207	12	~2018
122987900603	245975801207	12	~2018
122988102623	245976205247	12	~2018
122994204497	737965226983	12	~2019
123003321797	738019930783	12	~2019
123012837719	246025675439	12	~2018
123037770599	246075541199	12	~2018
123040707299	246081414599	12	~2018
123042290341	738253742047	12	~2019
123049135673	738294814039	12	~2019
123058820459	246117640919	12	~2018
123061013951	246122027903	12	~2018
123076705931	246153411863	12	~2018
123076732283	246153464567	12	~2018
123104636939	246209273879	12	~2018
123105121523	246210243047	12	~2018
123124937951	246249875903	12	~2018
123140007983	246280015967	12	~2018
123143939339	246287878679	12	~2018

Exponent	Prime Factor	Dig.	Year
123150671219	246301342439	12	~2018
123150897839	246301795679	12	~2018
123173358083	246346716167	12	~2018
123181666631	246363333263	12	~2018
123191194151	246382388303	12	~2018
123194190803	246388381607	12	~2018
123210608291	246421216583	12	~2018
123224351903	246448703807	12	~2018
123238968659	246477937319	12	~2018
123249348083	246498696167	12	~2018
123258204623	246516409247	12	~2018
123261387239	246522774479	12	~2018
123269777483	246539554967	12	~2018
123275162243	246550324487	12	~2018
123277607003	246555214007	12	~2018
123277801799	246555603599	12	~2018
123292083203	246584166407	12	~2018
123304304771	246608609543	12	~2018
123316658903	246633317807	12	~2018
123318510929	8287...344289	14	2023
123318683219	246637366439	12	~2018
123325008563	246650017127	12	~2018
123325980383	246651960767	12	~2018
123327418619	246654837239	12	~2018
123327900323	246655800647	12	~2018

4.724.182 digits

25-04-13