Small Mersenne Prime Factors (page 4917/5070)

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
141805780751	283611561503	12	~2018
141820371131	283640742263	12	~2018
141826464599	283652929199	12	~2018
141832244303	283664488607	12	~2018
141859522643	283719045287	12	~2018
141860868419	283721736839	12	~2018
141861843479	283723686959	12	~2018
141861993083	283723986167	12	~2018
141868841531	283737683063	12	~2018
141893583311	283787166623	12	~2018
141899711711	283799423423	12	~2018
141903003311	283806006623	12	~2018
141904233743	283808467487	12	~2018
141925793783	283851587567	12	~2018
141937483703	283874967407	12	~2018
141943702343	283887404687	12	~2018
141955268387	2932...487543	15	2023
141963213239	283926426479	12	~2018
141971858771	283943717543	12	~2018
141991578119	283983156239	12	~2018
142003391171	7071...803159	14	2023
142034373083	284068746167	12	~2018
142038365351	284076730703	12	~2018
142040145491	284080290983	12	~2018
142044111431	284088222863	12	~2018

Exponent	Prime Factor	Dig.	Year
142050193451	284100386903	12	~2018
142051066991	284102133983	12	~2018
142071824291	284143648583	12	~2018
142071858583	1591...161297	14	2025
142073957843	284147915687	12	~2018
142074645731	284149291463	12	~2018
142074702083	284149404167	12	~2018
142081695419	284163390839	12	~2018
142096143083	284192286167	12	~2018
142105780403	284211560807	12	~2018
142109878283	284219756567	12	~2018
142110981983	284221963967	12	~2018
142118526239	284237052479	12	~2018
142143028033	3041...999063	14	2024
142147561763	284295123527	12	~2018
142174588823	284349177647	12	~2018
142194154451	284388308903	12	~2018
142197560819	284395121639	12	~2018
142197703783	2303...012847	14	2025
142203408311	284406816623	12	~2018
142208492819	284416985639	12	~2018
142210320251	284420640503	12	~2018
142223305463	284446610927	12	~2018
142256434583	284512869167	12	~2018
142260112391	284520224783	12	~2018

Exponent	Prime Factor	Dig.	Year
142275098039	284550196079	12	~2018
142284498263	284568996527	12	~2018
142289439503	284578879007	12	~2018
142294209923	284588419847	12	~2018
142296135791	284592271583	12	~2018
142303141439	284606282879	12	~2018
142315919699	284631839399	12	~2018
142325927351	284651854703	12	~2018
142328388959	284656777919	12	~2018
142331588471	284663176943	12	~2018
142333162271	284666324543	12	~2018
142334809619	284669619239	12	~2018
142337143271	284674286543	12	~2018
142344601523	284689203047	12	~2018
142344786371	284689572743	12	~2018
142345193723	284690387447	12	~2018
142356234071	284712468143	12	~2018
142361044961	3573...852111	15	2023
142381581239	284763162479	12	~2018
142383065711	284766131423	12	~2018
142396287697	1253...317337	14	2024
142400456183	284800912367	12	~2018
142405627571	284811255143	12	~2018
142410843563	284821687127	12	~2018
142432423019	284864846039	12	~2018

Exponent	Prime Factor	Dig.	Year
142438591343	284877182687	12	~2018
142449139919	284898279839	12	~2018
142450844951	284901689903	12	~2018
142451094671	284902189343	12	~2018
142452784079	284905568159	12	~2018
142469778551	284939557103	12	~2018
142473242399	284946484799	12	~2018
142476307763	284952615527	12	~2018
142487455619	284974911239	12	~2018
142487952779	284975905559	12	~2018
142504467179	285008934359	12	~2018
142510481783	285020963567	12	~2018
142519291319	285038582639	12	~2018
142527166403	285054332807	12	~2018
142547753291	285095506583	12	~2018
142558758983	285117517967	12	~2018
142566832379	285133664759	12	~2018
142568665391	285137330783	12	~2018
142591761131	285183522263	12	~2018
142652783711	285305567423	12	~2018
142666336619	285332673239	12	~2018
142668777983	285337555967	12	~2018
142686102959	285372205919	12	~2018
142688206091	285376412183	12	~2018
142702745819	285405491639	12	~2018

4.768.925 digits

25-05-04