Small Mersenne Prime Factors (page 5633/5850)

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
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
140659039481	843954236887	12	~2019
140692534889	7496...888593	15	2026
140702293163	281404586327	12	~2018
140704595377	844227572263	12	~2019
140718418751	281436837503	12	~2018
140721269891	281442539783	12	~2018
140736026219	281472052439	12	~2018
140741338319	281482676639	12	~2018
140747547377	4475...065887	14	2024
140756726527	3856...068399	14	2024
140782662539	281565325079	12	~2018
140789042483	281578084967	12	~2018

Exponent	Prime Factor	Dig.	Year
140789420399	281578840799	12	~2018
140790624899	281581249799	12	~2018
140794913411	281589826823	12	~2018
140802469259	2703...097729	14	2024
140805958193	844835749159	12	~2019
140808683333	844852099999	12	~2019
140813009483	281626018967	12	~2018
140822599223	281645198447	12	~2018
140839725443	281679450887	12	~2018
140852386799	281704773599	12	~2018
140872282139	281744564279	12	~2018
140901699623	281803399247	12	~2018
140908228739	281816457479	12	~2018
140911522439	281823044879	12	~2018
140913953261	845483719567	12	~2019
140924879441	845549276647	12	~2019
140926317671	281852635343	12	~2018
140936875151	281873750303	12	~2018
140951571731	281903143463	12	~2018
140959859773	845759158639	12	~2019
140970637211	281941274423	12	~2018
140987670611	281975341223	12	~2018
140993208311	281986416623	12	~2018
141001744813	846010468879	12	~2019
141006891983	282013783967	12	~2018

Exponent	Prime Factor	Dig.	Year
141017284379	282034568759	12	~2018
141019339739	282038679479	12	~2018
141022302923	282044605847	12	~2018
141027660731	282055321463	12	~2018
141032880853	846197285119	12	~2019
141039133199	282078266399	12	~2018
141044074991	282088149983	12	~2018
141047535371	282095070743	12	~2018
141050775623	282101551247	12	~2018
141051038363	282102076727	12	~2018
141051329483	282102658967	12	~2018
141056286073	846337716439	12	~2019
141057324757	846343948543	12	~2019
141057398123	282114796247	12	~2018
141062943023	282125886047	12	~2018
141063522221	846381133327	12	~2019
141064517411	282129034823	12	~2018
141075594119	282151188239	12	~2018
141077132831	282154265663	12	~2018
141081672191	282163344383	12	~2018
141091668551	282183337103	12	~2018
141095667551	282191335103	12	~2018
141095882723	282191765447	12	~2018
141106667993	846640007959	12	~2019
141111157037	846666942223	12	~2019

Exponent	Prime Factor	Dig.	Year
141114685199	282229370399	12	~2018
141117527279	282235054559	12	~2018
141118111331	282236222663	12	~2018
141125494379	282250988759	12	~2018
141126725699	282253451399	12	~2018
141135323519	282270647039	12	~2018
141140268179	282280536359	12	~2018
141147088139	282294176279	12	~2018
141151719481	846910316887	12	~2019
141153168683	282306337367	12	~2018
141178288631	282356577263	12	~2018
141184550723	282369101447	12	~2018
141185351399	282370702799	12	~2018
141203303159	282406606319	12	~2018
141204895691	282409791383	12	~2018
141205056851	282410113703	12	~2018
141209136839	282418273679	12	~2018
141220679819	282441359639	12	~2018
141222171791	282444343583	12	~2018
141222372359	282444744719	12	~2018
141227298419	282454596839	12	~2018
141238559257	847431355543	12	~2019
141248476931	282496953863	12	~2018
141248743271	282497486543	12	~2018
141255445763	282510891527	12	~2018

5.546.121 digits

26-05-03