Small Mersenne Prime Factors (page 3877/5130)

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	Digits	Year
2502605243	5005210487	10	~2004
2502618743	5005237487	10	~2004
2502714503	5005429007	10	~2004
2502733619	5005467239	10	~2004
2502824543	5005649087	10	~2004
2502977287	25029772871	11	~2006
2502995063	5005990127	10	~2004
2503101719	5006203439	10	~2004
2503165559	5006331119	10	~2004
2503178231	5006356463	10	~2004
2503213753	60077130073	11	~2007
2503353119	5006706239	10	~2004
2503359499	25033594991	11	~2006
2503377893	15020267359	11	~2006
2503423031	5006846063	10	~2004
2503481723	5006963447	10	~2004
2503596791	20028774329	11	~2006
2503656059	5007312119	10	~2004
2503668641	155227455743	12	~2008
2503685399	5007370799	10	~2004
2503783771	180272431513	12	~2008
2503879643	5007759287	10	~2004
2503909211	5007818423	10	~2004
2504062349	20032498793	11	~2006
2504193061	15025158367	11	~2006

Exponent	Prime Factor	Digits	Year
2504196899	5008393799	10	~2004
2504221019	5008442039	10	~2004
2504232011	5008464023	10	~2004
2504265983	5008531967	10	~2004
2504308451	5008616903	10	~2004
2504382119	5008764239	10	~2004
2504408891	5008817783	10	~2004
2504470201	15026821207	11	~2006
2504498219	5008996439	10	~2004
2504585939	5009171879	10	~2004
2504643083	5009286167	10	~2004
2504746303	25047463031	11	~2006
2504779703	5009559407	10	~2004
2504985551	5009971103	10	~2004
2505069239	5010138479	10	~2004
2505187747	25051877471	11	~2006
2505247271	5010494543	10	~2004
2505320663	5010641327	10	~2004
2505380651	5010761303	10	~2004
2505416317	15032497903	11	~2006
2505448079	5010896159	10	~2004
2505457547	120261962257	12	~2008
2505527963	5011055927	10	~2004
2505625043	5011250087	10	~2004
2505733463	5011466927	10	~2004

Exponent	Prime Factor	Digits	Year
2505760253	15034561519	11	~2006
2505799721	15034798327	11	~2006
2505890903	5011781807	10	~2004
2505992261	15035953567	11	~2006
2506139183	5012278367	10	~2004
2506195271	5012390543	10	~2004
2506233179	5012466359	10	~2004
2506324319	5012648639	10	~2004
2506334111	5012668223	10	~2004
2506437701	20051501609	11	~2006
2506502891	5013005783	10	~2004
2506561943	5013123887	10	~2004
2506639519	25066395191	11	~2006
2506674011	5013348023	10	~2004
2506715551	25067155511	11	~2006
2506735571	5013471143	10	~2004
2506808123	5013616247	10	~2004
2506828223	5013656447	10	~2004
2506836089	20054688713	11	~2006
2507109623	5014219247	10	~2004
2507232263	5014464527	10	~2004
2507321231	5014642463	10	~2004
2507392417	60177418009	11	~2007
2507408699	5014817399	10	~2004
2507552129	75226563871	11	~2007

Exponent	Prime Factor	Digits	Year
2507573891	5015147783	10	~2004
2507687111	5015374223	10	~2004
2507715251	5015430503	10	~2004
2507845157	15047070943	11	~2006
2507875451	5015750903	10	~2004
2507882849	20063062793	11	~2006
2507950001	15047700007	11	~2006
2508081313	15048487879	11	~2006
2508183101	15049098607	11	~2006
2508206219	5016412439	10	~2004
2508233603	5016467207	10	~2004
2508253921	596964433199	12	~2009
2508309179	5016618359	10	~2004
2508352751	5016705503	10	~2004
2508359773	15050158639	11	~2006
2508586583	5017173167	10	~2004
2508589043	5017178087	10	~2004
2508608603	5017217207	10	~2004
2508654961	40138479377	11	~2007
2508804941	15052829647	11	~2006
2508928817	15053572903	11	~2006
2509141931	5018283863	10	~2004
2509143779	5018287559	10	~2004
2509154783	5018309567	10	~2004
2509380151	25093801511	11	~2006

4.828.532 digits

25-06-01