Small Mersenne Prime Factors (page 4993/5190)

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
116756226553	9153...617553	14	2024
116761023059	233522046119	12	~2017
116769080357	700614482143	12	~2019
116791825379	233583650759	12	~2017
116792837723	233585675447	12	~2017
116794257337	700765544023	12	~2019
116796011701	700776070207	12	~2019
116804615159	233609230319	12	~2017
116810696759	233621393519	12	~2017
116810852239	2803...537361	14	2024
116816184059	233632368119	12	~2017
116826074303	233652148607	12	~2017
116831770739	233663541479	12	~2017
116833211591	233666423183	12	~2017
116834829457	701008976743	12	~2019
116835071701	701010430207	12	~2019
116839858391	233679716783	12	~2017
116842832303	233685664607	12	~2017
116856713339	233713426679	12	~2017
116867124131	233734248263	12	~2017
116870027363	233740054727	12	~2017
116873758931	233747517863	12	~2017
116890078139	233780156279	12	~2017
116892519059	233785038119	12	~2017
116901802343	233803604687	12	~2017

Exponent	Prime Factor	Dig.	Year
116915170331	233830340663	12	~2017
116933711879	233867423759	12	~2017
116936904121	2221...782991	14	2024
116937220619	233874441239	12	~2017
116950378199	233900756399	12	~2017
116952393419	233904786839	12	~2017
116960801303	6105...280167	14	2024
116964992471	233929984943	12	~2017
116972708519	233945417039	12	~2017
116973988283	233947976567	12	~2017
116978424197	701870545183	12	~2019
117009531851	234019063703	12	~2017
117012604361	702075626167	12	~2019
117019768199	234039536399	12	~2017
117028181771	234056363543	12	~2017
117029118743	234058237487	12	~2017
117032057399	234064114799	12	~2017
117038159039	234076318079	12	~2017
117041159701	702246958207	12	~2019
117045014759	234090029519	12	~2017
117054290051	234108580103	12	~2017
117062705723	234125411447	12	~2017
117065908163	234131816327	12	~2017
117071943179	234143886359	12	~2017
117078326831	234156653663	12	~2017

Exponent	Prime Factor	Dig.	Year
117086123783	234172247567	12	~2017
117090201803	234180403607	12	~2017
117090381173	702542287039	12	~2019
117108795311	234217590623	12	~2017
117118742231	234237484463	12	~2017
117119091203	234238182407	12	~2017
117119253899	234238507799	12	~2017
117122857441	702737144647	12	~2019
117134722223	234269444447	12	~2017
117141495959	234282991919	12	~2017
117170927963	234341855927	12	~2017
117172999319	234345998639	12	~2017
117173540219	234347080439	12	~2017
117185697731	234371395463	12	~2017
117199098491	234398196983	12	~2017
117206256841	703237541047	12	~2019
117210434651	234420869303	12	~2017
117230132231	234460264463	12	~2017
117231494291	234462988583	12	~2017
117234933383	234469866767	12	~2017
117241655231	234483310463	12	~2017
117248427683	234496855367	12	~2017
117262628963	234525257927	12	~2017
117272518823	234545037647	12	~2017
117273717661	703642305967	12	~2019

Exponent	Prime Factor	Dig.	Year
117277869959	234555739919	12	~2017
117277888583	234555777167	12	~2017
117281172433	703687034599	12	~2019
117286806239	234573612479	12	~2017
117287767043	234575534087	12	~2017
117293983463	234587966927	12	~2017
117297709019	234595418039	12	~2017
117309129659	234618259319	12	~2017
117309499091	234618998183	12	~2017
117311726681	703870360087	12	~2019
117321716399	234643432799	12	~2017
117334904591	234669809183	12	~2017
117350942617	704105655703	12	~2019
117352353731	234704707463	12	~2017
117356918579	234713837159	12	~2017
117373560077	704241360463	12	~2019
117376407539	234752815079	12	~2017
117378500303	234757000607	12	~2017
117383442083	234766884167	12	~2017
117386542943	234773085887	12	~2017
117390036119	234780072239	12	~2017
117393937931	234787875863	12	~2017
117406001879	234812003759	12	~2017
117408654683	234817309367	12	~2017
117439624871	234879249743	12	~2017

4.888.230 digits

25-06-29