Small Mersenne Prime Factors (page 5154/5340)

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
133026219779	266052439559	12	~2018
133028779679	266057559359	12	~2018
133033364039	266066728079	12	~2018
133037912303	266075824607	12	~2018
133051556903	266103113807	12	~2018
133076792819	266153585639	12	~2018
133087133951	266174267903	12	~2018
133088392823	266176785647	12	~2018
133095109211	266190218423	12	~2018
133102698719	266205397439	12	~2018
133110329771	266220659543	12	~2018
133113930263	266227860527	12	~2018
133118045591	266236091183	12	~2018
133128751583	266257503167	12	~2018
133156759871	266313519743	12	~2018
133159202639	266318405279	12	~2018
133166131919	266332263839	12	~2018
133176715163	266353430327	12	~2018
133201279397	799207676383	12	~2019
133202626189	2850...004447	14	2024
133215004691	266430009383	12	~2018
133218227171	266436454343	12	~2018
133218543599	266437087199	12	~2018
133226717363	266453434727	12	~2018
133242969137	799457814823	12	~2019

Exponent	Prime Factor	Dig.	Year
133273633799	266547267599	12	~2018
133274248559	266548497119	12	~2018
133284401531	266568803063	12	~2018
133286378891	266572757783	12	~2018
133289279243	266578558487	12	~2018
133291970111	266583940223	12	~2018
133294335983	266588671967	12	~2018
133300487069	2985...103457	14	2024
133320390239	266640780479	12	~2018
133332464753	799994788519	12	~2019
133343525219	266687050439	12	~2018
133344846757	800069080543	12	~2019
133361874083	266723748167	12	~2018
133381809191	266763618383	12	~2018
133383573419	266767146839	12	~2018
133385558699	266771117399	12	~2018
133387088063	266774176127	12	~2018
133388001101	800328006607	12	~2019
133392564923	266785129847	12	~2018
133392761423	266785522847	12	~2018
133402693561	800416161367	12	~2019
133404489191	266808978383	12	~2018
133409396353	800456378119	12	~2019
133410489659	266820979319	12	~2018
133429165643	266858331287	12	~2018

Exponent	Prime Factor	Dig.	Year
133440744023	266881488047	12	~2018
133443526679	266887053359	12	~2018
133450178159	266900356319	12	~2018
133450809083	266901618167	12	~2018
133454115659	266908231319	12	~2018
133457700791	266915401583	12	~2018
133458397703	266916795407	12	~2018
133459705499	266919410999	12	~2018
133459705859	266919411719	12	~2018
133465639781	800793838687	12	~2019
133471252511	266942505023	12	~2018
133491654371	266983308743	12	~2018
133499360053	800996160319	12	~2019
133503839219	267007678439	12	~2018
133515925523	4833...039327	14	2023
133526494511	267052989023	12	~2018
133533800539	7931...520167	14	2025
133550393759	267100787519	12	~2018
133557092099	267114184199	12	~2018
133562841233	801377047399	12	~2019
133567671899	267135343799	12	~2018
133568549797	801411298783	12	~2019
133575089477	801450536863	12	~2019
133580780219	267161560439	12	~2018
133583026763	267166053527	12	~2018

Exponent	Prime Factor	Dig.	Year
133594290239	267188580479	12	~2018
133600569551	267201139103	12	~2018
133601932237	801611593423	12	~2019
133603770941	801622625647	12	~2019
133605313763	267210627527	12	~2018
133609163879	267218327759	12	~2018
133614798503	267229597007	12	~2018
133620366251	267240732503	12	~2018
133632357311	267264714623	12	~2018
133635435959	267270871919	12	~2018
133638055319	267276110639	12	~2018
133639542923	267279085847	12	~2018
133639947359	267279894719	12	~2018
133641916931	267283833863	12	~2018
133651542659	267303085319	12	~2018
133654177897	1577...991847	14	2024
133656302963	267312605927	12	~2018
133656586201	801939517207	12	~2019
133660249199	267320498399	12	~2018
133685885041	802115310247	12	~2019
133700969471	267401938943	12	~2018
133704777131	267409554263	12	~2018
133705359659	267410719319	12	~2018
133713237509	1099...232399	15	2025
133714536491	267429072983	12	~2018

5.037.460 digits

25-09-07