Small Mersenne Prime Factors (page 4937/5070)

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
161378625923	322757251847	12	~2019
161379828119	322759656239	12	~2019
161387105843	322774211687	12	~2019
161392764563	322785529127	12	~2019
161394657731	322789315463	12	~2019
161400784199	322801568399	12	~2019
161403500543	322807001087	12	~2019
161410099267	3002...463663	14	2024
161417223119	322834446239	12	~2019
161425006559	322850013119	12	~2019
161426007383	322852014767	12	~2019
161451302459	322902604919	12	~2019
161452853363	322905706727	12	~2019
161455208891	322910417783	12	~2019
161469728963	322939457927	12	~2019
161477953883	322955907767	12	~2019
161492640143	322985280287	12	~2019
161498040659	322996081319	12	~2019
161498469551	322996939103	12	~2019
161525182991	323050365983	12	~2019
161536783319	323073566639	12	~2019
161539722791	323079445583	12	~2019
161540758139	323081516279	12	~2019
161546890559	323093781119	12	~2019
161560091351	323120182703	12	~2019

Exponent	Prime Factor	Dig.	Year
161563313819	323126627639	12	~2019
161570570831	323141141663	12	~2019
161582170199	323164340399	12	~2019
161593761911	323187523823	12	~2019
161594878583	323189757167	12	~2019
161618074763	323236149527	12	~2019
161630368271	323260736543	12	~2019
161648451323	323296902647	12	~2019
161649973151	323299946303	12	~2019
161653413563	323306827127	12	~2019
161661243839	323322487679	12	~2019
161667150803	323334301607	12	~2019
161670133211	323340266423	12	~2019
161677459439	4025...003111	15	2023
161681404499	323362808999	12	~2019
161686951691	323373903383	12	~2019
161701092071	323402184143	12	~2019
161718422699	323436845399	12	~2019
161725966019	323451932039	12	~2019
161728756379	323457512759	12	~2019
161730458663	323460917327	12	~2019
161736714803	323473429607	12	~2019
161737507979	323475015959	12	~2019
161750447543	323500895087	12	~2019
161764430963	323528861927	12	~2019

Exponent	Prime Factor	Dig.	Year
161768742119	323537484239	12	~2019
161808126899	323616253799	12	~2019
161810696123	323621392247	12	~2019
161821116059	323642232119	12	~2019
161822828879	323645657759	12	~2019
161843881943	323687763887	12	~2019
161864421203	323728842407	12	~2019
161870053283	323740106567	12	~2019
161891775491	323783550983	12	~2019
161891809091	323783618183	12	~2019
161911393799	323822787599	12	~2019
161912287319	323824574639	12	~2019
161918105159	323836210319	12	~2019
161960326763	323920653527	12	~2019
161961635711	323923271423	12	~2019
161963216531	323926433063	12	~2019
161965510631	323931021263	12	~2019
161966198171	323932396343	12	~2019
161991478079	323982956159	12	~2019
161993700023	323987400047	12	~2019
162015811319	324031622639	12	~2019
162018822851	324037645703	12	~2019
162021471611	324042943223	12	~2019
162029981339	324059962679	12	~2019
162040650071	324081300143	12	~2019

Exponent	Prime Factor	Dig.	Year
162046680671	324093361343	12	~2019
162056404787	2852...242513	14	2024
162057379343	324114758687	12	~2019
162064335239	324128670479	12	~2019
162108283583	324216567167	12	~2019
162127964651	324255929303	12	~2019
162128986931	324257973863	12	~2019
162136820269	4539...675321	14	2024
162182812679	324365625359	12	~2019
162190731383	324381462767	12	~2019
162209220311	324418440623	12	~2019
162212417063	324424834127	12	~2019
162229655891	324459311783	12	~2019
162233184563	324466369127	12	~2019
162234901319	324469802639	12	~2019
162247127039	324494254079	12	~2019
162259035563	324518071127	12	~2019
162288041939	324576083879	12	~2019
162309635051	324619270103	12	~2019
162397918619	324795837239	12	~2019
162400812323	324801624647	12	~2019
162420699191	324841398383	12	~2019
162421689299	324843378599	12	~2019
162434651531	324869303063	12	~2019
162441709799	324883419599	12	~2019

4.768.925 digits

25-05-04