Small Mersenne Prime Factors (page 5156/5340)

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
134372276657	806233659943	12	~2019
134375742419	268751484839	12	~2018
134376016739	268752033479	12	~2018
134380906343	268761812687	12	~2018
134382597659	268765195319	12	~2018
134390205317	806341231903	12	~2019
134390254991	268780509983	12	~2018
134391738251	268783476503	12	~2018
134392140191	268784280383	12	~2018
134393070683	268786141367	12	~2018
134402596277	806415577663	12	~2019
134405237171	268810474343	12	~2018
134413453199	268826906399	12	~2018
134416983497	806501900983	12	~2019
134430072599	268860145199	12	~2018
134434423451	268868846903	12	~2018
134436680123	268873360247	12	~2018
134439866257	806639197543	12	~2019
134444416709	1129...035561	15	2025
134467093283	268934186567	12	~2018
134475700483	1441...917777	15	2023
134486803571	268973607143	12	~2018
134508646319	269017292639	12	~2018
134509596779	269019193559	12	~2018
134512999931	269025999863	12	~2018

Exponent	Prime Factor	Dig.	Year
134519184599	269038369199	12	~2018
134529632123	269059264247	12	~2018
134535285041	807211710247	12	~2019
134550041999	269100083999	12	~2018
134552219579	269104439159	12	~2018
134552857319	269105714639	12	~2018
134569283063	269138566127	12	~2018
134570612279	269141224559	12	~2018
134576433611	269152867223	12	~2018
134594132363	269188264727	12	~2018
134604055777	807624334663	12	~2019
134606081473	807636488839	12	~2019
134613522119	269227044239	12	~2018
134625978083	269251956167	12	~2018
134627730203	269255460407	12	~2018
134632971719	269265943439	12	~2018
134637733501	807826401007	12	~2019
134653193483	269306386967	12	~2018
134658595763	269317191527	12	~2018
134661953291	269323906583	12	~2018
134662751941	807976511647	12	~2019
134666375303	269332750607	12	~2018
134670761843	269341523687	12	~2018
134671417823	269342835647	12	~2018
134675212583	269350425167	12	~2018

Exponent	Prime Factor	Dig.	Year
134675776871	269351553743	12	~2018
134686782071	269373564143	12	~2018
134697035093	1616...211161	14	2024
134699681183	269399362367	12	~2018
134700795503	269401591007	12	~2018
134706722461	808240334767	12	~2019
134742950941	808457705647	12	~2019
134758374671	269516749343	12	~2018
134783176169	4286...021743	14	2023
134804373443	269608746887	12	~2018
134804646299	269609292599	12	~2018
134809389839	269618779679	12	~2018
134809784633	808858707799	12	~2019
134814050333	808884301999	12	~2019
134814766871	269629533743	12	~2018
134825574479	269651148959	12	~2018
134828415791	269656831583	12	~2018
134832726923	269665453847	12	~2018
134840253371	269680506743	12	~2018
134850911483	269701822967	12	~2018
134854820519	269709641039	12	~2018
134871484703	269742969407	12	~2018
134881820891	269763641783	12	~2018
134885550043	3156...710063	14	2024
134893298231	269786596463	12	~2018

Exponent	Prime Factor	Dig.	Year
134894034239	269788068479	12	~2018
134905995743	269811991487	12	~2018
134910221531	269820443063	12	~2018
134912606957	809475641743	12	~2019
134932735417	809596412503	12	~2019
134936613419	269873226839	12	~2018
134945454131	269890908263	12	~2018
134948482577	809690895463	12	~2019
134962529459	269925058919	12	~2018
134969014079	9312...714511	14	2025
134973643523	269947287047	12	~2018
134982175061	809893050367	12	~2019
134995771271	269991542543	12	~2018
135004133279	4779...180767	14	2023
135005213821	810031282927	12	~2019
135020753663	270041507327	12	~2018
135023765231	270047530463	12	~2018
135036156551	270072313103	12	~2018
135038935331	270077870663	12	~2018
135039920063	270079840127	12	~2018
135050513291	270101026583	12	~2018
135061670603	270123341207	12	~2018
135061905239	270123810479	12	~2018
135063269843	270126539687	12	~2018
135068879593	810413277559	12	~2019

5.037.460 digits

25-09-07