Small Mersenne Prime Factors (page 5535/5745)

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
139899161351	279798322703	12	~2018
139899426083	279798852167	12	~2018
139928225051	279856450103	12	~2018
139928853413	839573120479	12	~2019
139934663333	839607979999	12	~2019
139961328497	839767970983	12	~2019
139969401251	279938802503	12	~2018
139969535437	839817212623	12	~2019
139975258583	279950517167	12	~2018
139992026651	279984053303	12	~2018
139997552003	279995104007	12	~2018
139997590823	279995181647	12	~2018
140001069359	280002138719	12	~2018
140006873417	840041240503	12	~2019
140018039041	840108234247	12	~2019
140018821451	280037642903	12	~2018
140019899879	280039799759	12	~2018
140021689091	280043378183	12	~2018
140026718159	280053436319	12	~2018
140027394803	280054789607	12	~2018
140038663577	2352...480937	14	2024
140045428739	280090857479	12	~2018
140048756051	280097512103	12	~2018
140050733737	840304402423	12	~2019
140051398637	840308391823	12	~2019

Exponent	Prime Factor	Dig.	Year
140053234631	280106469263	12	~2018
140053452373	840320714239	12	~2019
140070503879	280141007759	12	~2018
140097408131	280194816263	12	~2018
140126546159	280253092319	12	~2018
140126608943	280253217887	12	~2018
140138028923	280276057847	12	~2018
140138776331	280277552663	12	~2018
140144607611	280289215223	12	~2018
140149013309	1051...981751	15	2025
140154832943	280309665887	12	~2018
140155211951	280310423903	12	~2018
140162218633	3588...970049	14	2023
140174478551	280348957103	12	~2018
140175739973	841054439839	12	~2019
140179505317	841077031903	12	~2019
140188177763	280376355527	12	~2018
140193701183	280387402367	12	~2018
140197152731	280394305463	12	~2018
140213837831	280427675663	12	~2018
140234104883	280468209767	12	~2018
140240182139	280480364279	12	~2018
140243730541	841462383247	12	~2019
140254772939	280509545879	12	~2018
140270880923	280541761847	12	~2018

Exponent	Prime Factor	Dig.	Year
140275539779	280551079559	12	~2018
140281023257	841686139543	12	~2019
140296092361	841776554167	12	~2019
140304317819	280608635639	12	~2018
140326255763	280652511527	12	~2018
140327367179	280654734359	12	~2018
140342325719	280684651439	12	~2018
140345751911	280691503823	12	~2018
140346719081	842080314487	12	~2019
140354683921	842128103527	12	~2019
140362692191	280725384383	12	~2018
140370670691	280741341383	12	~2018
140371145501	1019...633727	15	2025
140373758663	280747517327	12	~2018
140384576533	3453...827119	14	2023
140387923673	842327542039	12	~2019
140426667971	280853335943	12	~2018
140427561119	280855122239	12	~2018
140453934671	280907869343	12	~2018
140454111659	280908223319	12	~2018
140458035491	280916070983	12	~2018
140474840003	280949680007	12	~2018
140487575699	280975151399	12	~2018
140501681161	843010086967	12	~2019
140506074311	281012148623	12	~2018

Exponent	Prime Factor	Dig.	Year
140523617639	281047235279	12	~2018
140524150139	281048300279	12	~2018
140532304751	281064609503	12	~2018
140534040611	281068081223	12	~2018
140543212559	281086425119	12	~2018
140565692569	2586...432697	14	2025
140577918791	281155837583	12	~2018
140579226803	281158453607	12	~2018
140585650379	281171300759	12	~2018
140587104923	281174209847	12	~2018
140592769643	281185539287	12	~2018
140597462363	281194924727	12	~2018
140602586483	281205172967	12	~2018
140606487251	281212974503	12	~2018
140609751749	3149...391777	14	2024
140613977411	281227954823	12	~2018
140617650671	281235301343	12	~2018
140621901221	843731407327	12	~2019
140624407151	281248814303	12	~2018
140627118461	843762710767	12	~2019
140632903343	281265806687	12	~2018
140635933799	281271867599	12	~2018
140645843951	281291687903	12	~2018
140649112403	281298224807	12	~2018
140653599491	281307198983	12	~2018

5.441.361 digits

26-03-15