Small Mersenne Prime Factors (page 5018/5445)

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
48329786171	96659572343	11	~2014
48329804827	483298048271	12	~2016
48331029671	96662059343	11	~2014
48333618083	96667236167	11	~2014
48334497023	96668994047	11	~2014
48336081467	386688651737	12	~2016
48338711411	96677422823	11	~2014
48338891017	290033346103	12	~2016
48348279913	290089679479	12	~2016
48348905953	290093435719	12	~2016
48349251719	96698503439	11	~2014
48349490831	96698981663	11	~2014
48350201717	290101210303	12	~2016
48350504903	96701009807	11	~2014
48357895643	96715791287	11	~2014
48359169251	96718338503	11	~2014
48360184751	96720369503	11	~2014
48360419713	290162518279	12	~2016
48363808679	96727617359	11	~2014
48364396391	386915171129	12	~2016
48365212223	96730424447	11	~2014
48365275379	96730550759	11	~2014
48365807851	773852925617	12	~2017
48366644723	96733289447	11	~2014
48366849959	96733699919	11	~2014

Exponent	Prime Factor	Dig.	Year
48366852119	96733704239	11	~2014
48367973411	96735946823	11	~2014
48369964763	96739929527	11	~2014
48371201003	96742402007	11	~2014
48371478791	96742957583	11	~2014
48371881421	386975051369	12	~2016
48371907599	96743815199	11	~2014
48375742379	96751484759	11	~2014
48379961177	387039689417	12	~2016
48385083419	96770166839	11	~2014
48385855799	96771711599	11	~2014
48387372959	96774745919	11	~2014
48388646147	387109169177	12	~2016
48394698743	96789397487	11	~2014
48395900699	96791801399	11	~2014
48397902851	96795805703	11	~2014
48398687171	96797374343	11	~2014
48398856491	96797712983	11	~2014
48401243797	290407462783	12	~2016
48402964117	290417784703	12	~2016
48403053899	96806107799	11	~2014
48404194859	96808389719	11	~2014
48404597639	96809195279	11	~2014
48407615279	96815230559	11	~2014
48409763123	96819526247	11	~2014

Exponent	Prime Factor	Dig.	Year
48411462563	96822925127	11	~2014
48415749803	96831499607	11	~2014
48416629991	96833259983	11	~2014
48424070951	96848141903	11	~2014
48427153031	96854306063	11	~2014
48427956683	96855913367	11	~2014
48428570381	290571422287	12	~2016
48430685581	290584113487	12	~2016
48430758119	96861516239	11	~2014
48431426399	96862852799	11	~2014
48431491523	96862983047	11	~2014
48433851863	96867703727	11	~2014
48434618381	387476947049	12	~2016
48437876579	96875753159	11	~2014
48439730039	96879460079	11	~2014
48442966259	96885932519	11	~2014
48445271401	290671628407	12	~2016
48447278843	96894557687	11	~2014
48448768391	387590147129	12	~2016
48452836571	96905673143	11	~2014
48457170007	775314720113	12	~2017
48460609699	484606096991	12	~2016
48463306439	96926612879	11	~2014
48463649183	96927298367	11	~2014
48466210057	290797260343	12	~2016

Exponent	Prime Factor	Dig.	Year
48467303897	290803823383	12	~2016
48468175139	96936350279	11	~2014
48468979211	96937958423	11	~2014
48470073551	96940147103	11	~2014
48471690341	290830142047	12	~2016
48472002203	96944004407	11	~2014
48473311559	96946623119	11	~2014
48474379111	484743791111	12	~2016
48475188059	96950376119	11	~2014
48476850491	96953700983	11	~2014
48483439307	387867514457	12	~2016
48483568321	775737093137	12	~2017
48485734523	96971469047	11	~2014
48486626099	96973252199	11	~2014
48489438191	96978876383	11	~2014
48491304863	96982609727	11	~2014
48491349721	290948098327	12	~2016
48498368183	96996736367	11	~2014
48499307639	96998615279	11	~2014
48499950659	96999901319	11	~2014
48501633359	97003266719	11	~2014
48503856161	291023136967	12	~2016
48505308623	97010617247	11	~2014
48508106243	97016212487	11	~2014
48512226131	97024452263	11	~2014

5.142.307 digits

25-10-26