Small Mersenne Prime Factors (page 4924/5070)

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
148348106771	296696213543	12	~2018
148351818431	296703636863	12	~2018
148368950063	296737900127	12	~2018
148401611063	296803222127	12	~2018
148433139971	296866279943	12	~2018
148438534319	296877068639	12	~2018
148440853343	296881706687	12	~2018
148446212171	296892424343	12	~2018
148452379151	1784...739503	15	2024
148453843931	296907687863	12	~2018
148455859151	296911718303	12	~2018
148489970879	296979941759	12	~2018
148496272499	296992544999	12	~2018
148534849271	297069698543	12	~2018
148548663479	297097326959	12	~2018
148555222631	297110445263	12	~2018
148558334003	297116668007	12	~2018
148565166143	297130332287	12	~2018
148568418923	297136837847	12	~2018
148590685739	297181371479	12	~2018
148604601503	297209203007	12	~2018
148605111257	2615...581233	14	2024
148619607431	297239214863	12	~2018
148622740811	297245481623	12	~2018
148623571571	297247143143	12	~2018

Exponent	Prime Factor	Dig.	Year
148626119111	297252238223	12	~2018
148626578819	297253157639	12	~2018
148635281519	297270563039	12	~2018
148660349363	2616...487889	14	2024
148662333899	297324667799	12	~2018
148674212171	297348424343	12	~2018
148674273719	297348547439	12	~2018
148686771503	297373543007	12	~2018
148696194683	297392389367	12	~2018
148703558963	297407117927	12	~2018
148711218923	297422437847	12	~2018
148720896743	297441793487	12	~2018
148728022763	297456045527	12	~2018
148736747651	297473495303	12	~2018
148766246171	297532492343	12	~2018
148770870299	297541740599	12	~2018
148779052679	297558105359	12	~2018
148800683963	297601367927	12	~2018
148826771459	297653542919	12	~2018
148828212719	297656425439	12	~2018
148833979523	297667959047	12	~2018
148838506919	297677013839	12	~2018
148843119983	297686239967	12	~2018
148848019451	297696038903	12	~2018
148848837503	297697675007	12	~2018

Exponent	Prime Factor	Dig.	Year
148852324871	297704649743	12	~2018
148856459231	297712918463	12	~2018
148859570999	297719141999	12	~2018
148883819663	297767639327	12	~2018
148885448339	297770896679	12	~2018
148890061739	297780123479	12	~2018
148896581219	297793162439	12	~2018
148902920641	2501...667689	14	2025
148907364863	297814729727	12	~2018
148912437659	297824875319	12	~2018
148921921559	297843843119	12	~2018
148933232243	297866464487	12	~2018
148935210023	297870420047	12	~2018
148946359223	297892718447	12	~2018
148964858891	297929717783	12	~2018
148979444459	297958888919	12	~2018
148988685479	297977370959	12	~2018
148992003791	297984007583	12	~2018
148993977371	297987954743	12	~2018
148994232479	297988464959	12	~2018
149038688819	298077377639	12	~2018
149044532687	2542...764023	15	2023
149061413411	298122826823	12	~2018
149068175843	298136351687	12	~2018
149070891899	298141783799	12	~2018

Exponent	Prime Factor	Dig.	Year
149072054639	298144109279	12	~2018
149077321619	298154643239	12	~2018
149089367363	298178734727	12	~2018
149103773639	298207547279	12	~2018
149106646763	298213293527	12	~2018
149135614763	298271229527	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
149196555251	298393110503	12	~2018
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
149233620059	298467240119	12	~2018
149233829963	298467659927	12	~2018
149236240883	298472481767	12	~2018
149239443191	298478886383	12	~2018
149240836499	298481672999	12	~2018
149246636771	298493273543	12	~2018

4.768.925 digits

25-05-04