Small Mersenne Prime Factors (page 5586/5790)

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
146315539451	292631078903	12	~2018
146318854151	292637708303	12	~2018
146330710079	292661420159	12	~2018
146346801479	292693602959	12	~2018
146354004997	878124029983	12	~2019
146360072279	292720144559	12	~2018
146360374403	292720748807	12	~2018
146360977463	292721954927	12	~2018
146363765651	292727531303	12	~2018
146383783163	292767566327	12	~2018
146386847533	878321085199	12	~2019
146389476179	292778952359	12	~2018
146390091893	878340551359	12	~2019
146404783201	878428699207	12	~2019
146441805311	292883610623	12	~2018
146444492483	292888984967	12	~2018
146445094223	292890188447	12	~2018
146446447379	292892894759	12	~2018
146455814651	292911629303	12	~2018
146456800823	292913601647	12	~2018
146461722923	292923445847	12	~2018
146462133491	292924266983	12	~2018
146462289793	4891...790863	14	2026
146463691763	292927383527	12	~2018
146474012771	292948025543	12	~2018

Exponent	Prime Factor	Dig.	Year
146478900839	292957801679	12	~2018
146482833443	292965666887	12	~2018
146508515341	879051092047	12	~2019
146509306523	293018613047	12	~2018
146511989471	293023978943	12	~2018
146521693511	293043387023	12	~2018
146531845643	293063691287	12	~2018
146542367963	293084735927	12	~2018
146545733903	293091467807	12	~2018
146591031371	293182062743	12	~2018
146593639919	293187279839	12	~2018
146599359743	293198719487	12	~2018
146602392539	293204785079	12	~2018
146613824053	879682944319	12	~2019
146618931911	293237863823	12	~2018
146638270193	879829621159	12	~2019
146649750251	293299500503	12	~2018
146650619099	293301238199	12	~2018
146651724419	293303448839	12	~2018
146662472441	879974834647	12	~2019
146663532479	293327064959	12	~2018
146664133381	879984800287	12	~2019
146668394303	293336788607	12	~2018
146676610439	293353220879	12	~2018
146680886171	293361772343	12	~2018

Exponent	Prime Factor	Dig.	Year
146692003957	880152023743	12	~2019
146696476499	293392952999	12	~2018
146703775499	293407550999	12	~2018
146707894043	293415788087	12	~2018
146713484831	293426969663	12	~2018
146718845111	293437690223	12	~2018
146721713921	880330283527	12	~2019
146725110577	880350663463	12	~2019
146737243001	880423458007	12	~2019
146743876199	293487752399	12	~2018
146748000551	293496001103	12	~2018
146752560761	880515364567	12	~2019
146755330957	880531985743	12	~2019
146765440559	3434...090807	14	2023
146766500747	1772...902377	15	2025
146767754411	293535508823	12	~2018
146775263903	293550527807	12	~2018
146780285801	880681714807	12	~2019
146795822279	293591644559	12	~2018
146808740339	293617480679	12	~2018
146808969011	293617938023	12	~2018
146809918573	880859511439	12	~2019
146815285763	293630571527	12	~2018
146816844193	880901065159	12	~2019
146831525831	293663051663	12	~2018

Exponent	Prime Factor	Dig.	Year
146834857931	293669715863	12	~2018
146851211291	293702422583	12	~2018
146856111971	293712223943	12	~2018
146860950373	881165702239	12	~2019
146867751743	293735503487	12	~2018
146876876593	881261259559	12	~2019
146878513703	293757027407	12	~2018
146884394243	293768788487	12	~2018
146897016023	293794032047	12	~2018
146903415479	293806830959	12	~2018
146907322979	293814645959	12	~2018
146912681099	293825362199	12	~2018
146913035603	293826071207	12	~2018
146919014219	293838028439	12	~2018
146931899171	293863798343	12	~2018
146932768369	2556...696207	14	2024
146935898339	293871796679	12	~2018
146941724117	881650344703	12	~2019
146953645621	881721873727	12	~2019
146986543943	293973087887	12	~2018
147001480943	294002961887	12	~2018
147003365843	294006731687	12	~2018
147009886799	294019773599	12	~2018
147013389563	294026779127	12	~2018
147019955399	294039910799	12	~2018

5.486.313 digits

26-04-05