Small Mersenne Prime Factors (page 4936/5025)

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
212319740663	424639481327	12	~2019
212329262063	424658524127	12	~2019
212358620543	424717241087	12	~2019
212385597503	424771195007	12	~2019
212432634299	424865268599	12	~2019
212445970543	2549...465161	14	2024
212447818883	424895637767	12	~2019
212459375123	424918750247	12	~2019
212493842063	424987684127	12	~2019
212513257499	425026514999	12	~2019
212514562499	425029124999	12	~2019
212519735783	425039471567	12	~2019
212520745189	1270...623023	15	2023
212525474099	425050948199	12	~2019
212544348829	4080...975169	14	2023
212550409763	425100819527	12	~2019
212568732179	425137464359	12	~2019
212572290839	425144581679	12	~2019
212576463083	425152926167	12	~2019
212587393079	425174786159	12	~2019
212597831399	425195662799	12	~2019
212608969931	425217939863	12	~2019
212647052077	3912...582169	14	2024
212660736803	425321473607	12	~2019
212663824883	425327649767	12	~2019

Exponent	Prime Factor	Dig.	Year
212664514943	425329029887	12	~2019
212667216851	425334433703	12	~2019
212714477099	425428954199	12	~2019
212773790123	425547580247	12	~2019
212777815433	2681...744559	14	2024
212789357279	425578714559	12	~2019
212789886539	425579773079	12	~2019
212815382579	425630765159	12	~2019
212817399863	425634799727	12	~2019
212849973299	425699946599	12	~2019
212876555399	425753110799	12	~2019
212885243099	425770486199	12	~2019
212904026039	425808052079	12	~2019
212906374319	425812748639	12	~2019
212907022703	425814045407	12	~2019
212912377547	2427...040359	14	2024
212917883531	3747...501457	14	2024
212923251683	425846503367	12	~2019
212930047559	425860095119	12	~2019
212931163199	425862326399	12	~2019
213002780339	426005560679	12	~2019
213014852483	426029704967	12	~2019
213022043099	426044086199	12	~2019
213046625843	426093251687	12	~2019
213065599619	426131199239	12	~2019

Exponent	Prime Factor	Dig.	Year
213078407471	426156814943	12	~2019
213085703471	426171406943	12	~2019
213086508487	3068...222129	14	2024
213088777943	426177555887	12	~2019
213101735939	426203471879	12	~2019
213118184351	426236368703	12	~2019
213139402043	426278804087	12	~2019
213140745479	426281490959	12	~2019
213144332099	426288664199	12	~2019
213156509231	426313018463	12	~2019
213161526719	426323053439	12	~2019
213164588831	426329177663	12	~2019
213167790443	5158...287207	14	2024
213173046389	1342...225071	15	2024
213176437679	426352875359	12	~2019
213186712439	426373424879	12	~2019
213199393139	426398786279	12	~2019
213229792091	426459584183	12	~2019
213240070391	426480140783	12	~2019
213242325431	426484650863	12	~2019
213246272003	426492544007	12	~2019
213272207891	426544415783	12	~2019
213287743859	426575487719	12	~2019
213291669131	426583338263	12	~2019
213310877159	7551...514287	14	2023

Exponent	Prime Factor	Dig.	Year
213316340197	2559...823641	14	2024
213318039491	426636078983	12	~2019
213340903883	426681807767	12	~2019
213347317499	426694634999	12	~2019
213349433603	426698867207	12	~2019
213377319923	426754639847	12	~2019
213408297023	426816594047	12	~2019
213409694639	426819389279	12	~2019
213435132803	426870265607	12	~2019
213441253463	426882506927	12	~2019
213466362419	426932724839	12	~2019
213487105763	426974211527	12	~2019
213489295391	426978590783	12	~2019
213501657563	427003315127	12	~2019
213511141919	427022283839	12	~2019
213523865339	427047730679	12	~2019
213533117051	427066234103	12	~2019
213540105743	427080211487	12	~2019
213549760043	427099520087	12	~2019
213567176099	427134352199	12	~2019
213584969219	427169938439	12	~2019
213588910037	3716...346439	14	2024
213667497419	427334994839	12	~2019
213690274163	427380548327	12	~2019
213697911191	427395822383	12	~2019

4.724.182 digits

25-04-13