Small Mersenne Prime Factors (page 4994/5190)

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
117445446119	234890892239	12	~2017
117457575611	234915151223	12	~2017
117458523443	234917046887	12	~2017
117458744891	234917489783	12	~2017
117467705281	704806231687	12	~2019
117469667279	234939334559	12	~2017
117470692511	234941385023	12	~2017
117471109859	234942219719	12	~2017
117474501383	234949002767	12	~2017
117476990219	234953980439	12	~2017
117480355763	234960711527	12	~2017
117482612183	234965224367	12	~2017
117485336999	234970673999	12	~2017
117487082819	234974165639	12	~2017
117488139383	234976278767	12	~2017
117488973443	234977946887	12	~2017
117490886963	234981773927	12	~2017
117498684599	234997369199	12	~2017
117508284977	705049709863	12	~2019
117508533011	235017066023	12	~2017
117512471759	235024943519	12	~2017
117526675793	705160054759	12	~2019
117528632579	235057265159	12	~2017
117535291319	235070582639	12	~2017
117537914951	235075829903	12	~2017

Exponent	Prime Factor	Dig.	Year
117541847459	235083694919	12	~2017
117552452123	235104904247	12	~2017
117558437099	235116874199	12	~2017
117572590451	235145180903	12	~2017
117579158891	235158317783	12	~2017
117583823237	705502939423	12	~2019
117587260751	235174521503	12	~2017
117588210191	235176420383	12	~2017
117589510033	705537060199	12	~2019
117590994239	235181988479	12	~2017
117592535639	235185071279	12	~2017
117594252977	705565517863	12	~2019
117599843279	235199686559	12	~2017
117619210199	235238420399	12	~2017
117619831799	235239663599	12	~2017
117621186443	235242372887	12	~2017
117622924943	235245849887	12	~2017
117635667179	235271334359	12	~2017
117636422363	235272844727	12	~2017
117637957763	235275915527	12	~2017
117645235283	235290470567	12	~2017
117651351131	235302702263	12	~2017
117652548683	235305097367	12	~2017
117652831739	235305663479	12	~2017
117654890233	705929341399	12	~2019

Exponent	Prime Factor	Dig.	Year
117657875519	235315751039	12	~2017
117670289813	706021738879	12	~2019
117671476033	706028856199	12	~2019
117673135883	235346271767	12	~2017
117675586019	235351172039	12	~2017
117705871883	235411743767	12	~2017
117729361573	706376169439	12	~2019
117736195523	235472391047	12	~2017
117738387131	235476774263	12	~2017
117754930417	1194...442839	15	2025
117759610853	706557665119	12	~2019
117761145059	235522290119	12	~2017
117761237117	706567422703	12	~2019
117763392251	235526784503	12	~2017
117772964521	2635...597999	15	2023
117774744013	706648464079	12	~2019
117778407479	235556814959	12	~2017
117794941679	235589883359	12	~2017
117797125931	235594251863	12	~2017
117798212771	235596425543	12	~2017
117801867503	235603735007	12	~2017
117807026303	235614052607	12	~2017
117816620891	235633241783	12	~2017
117816751153	706900506919	12	~2019
117817113671	235634227343	12	~2017

Exponent	Prime Factor	Dig.	Year
117817522391	235635044783	12	~2017
117837978241	707027869447	12	~2019
117839475563	235678951127	12	~2017
117841347551	235682695103	12	~2017
117841700159	235683400319	12	~2017
117851388443	235702776887	12	~2017
117853270631	235706541263	12	~2017
117862687619	235725375239	12	~2017
117865244963	235730489927	12	~2017
117870749411	235741498823	12	~2017
117875095181	707250571087	12	~2019
117877491983	235754983967	12	~2017
117877843799	235755687599	12	~2017
117881205419	235762410839	12	~2017
117886025879	235772051759	12	~2017
117886548317	707319289903	12	~2019
117897158831	235794317663	12	~2017
117900219779	235800439559	12	~2017
117908626079	235817252159	12	~2017
117917820659	235835641319	12	~2017
117922254479	235844508959	12	~2017
117922684931	235845369863	12	~2017
117924984791	235849969583	12	~2017
117926869903	3962...287409	14	2023
117928536779	9835...673687	14	2023

4.888.230 digits

25-06-29