Small Mersenne Prime Factors (page 5586/5745)

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
183242389619	366484779239	12	~2019
183251222723	366502445447	12	~2019
183259524803	366519049607	12	~2019
183262322843	366524645687	12	~2019
183272675759	366545351519	12	~2019
183280119371	366560238743	12	~2019
183286669211	366573338423	12	~2019
183287543339	366575086679	12	~2019
183292477619	366584955239	12	~2019
183301216223	366602432447	12	~2019
183315068663	366630137327	12	~2019
183323009231	366646018463	12	~2019
183337844051	366675688103	12	~2019
183349158203	366698316407	12	~2019
183349165199	366698330399	12	~2019
183354297299	366708594599	12	~2019
183356791283	366713582567	12	~2019
183410603039	366821206079	12	~2019
183417080471	366834160943	12	~2019
183422865971	366845731943	12	~2019
183429542591	366859085183	12	~2019
183456087071	366912174143	12	~2019
183456096349	2605...681559	14	2024
183456150791	366912301583	12	~2019
183462154451	366924308903	12	~2019

Exponent	Prime Factor	Dig.	Year
183462796571	366925593143	12	~2019
183470054639	366940109279	12	~2019
183475965479	366951930959	12	~2019
183479099411	366958198823	12	~2019
183495740591	366991481183	12	~2019
183504796859	367009593719	12	~2019
183515560859	367031121719	12	~2019
183526325243	367052650487	12	~2019
183527402771	367054805543	12	~2019
183541176671	367082353343	12	~2019
183566160731	367132321463	12	~2019
183581390123	367162780247	12	~2019
183588413663	367176827327	12	~2019
183591541571	367183083143	12	~2019
183606004123	1762...395809	14	2025
183611349671	367222699343	12	~2019
183618338219	367236676439	12	~2019
183620625983	367241251967	12	~2019
183623967311	367247934623	12	~2019
183624049223	367248098447	12	~2019
183635004431	367270008863	12	~2019
183641959439	367283918879	12	~2019
183652834679	367305669359	12	~2019
183658441247	1366...287769	15	2023
183667584371	367335168743	12	~2019

Exponent	Prime Factor	Dig.	Year
183677106829	3195...588247	14	2024
183680363039	367360726079	12	~2019
183681188279	367362376559	12	~2019
183686230747	9257...296489	14	2025
183699595799	4445...183359	14	2023
183704026619	367408053239	12	~2019
183722727563	367445455127	12	~2019
183724598411	367449196823	12	~2019
183729570263	367459140527	12	~2019
183733085699	367466171399	12	~2019
183734258663	367468517327	12	~2019
183737394839	367474789679	12	~2019
183739857923	367479715847	12	~2019
183773878523	367547757047	12	~2019
183777940583	367555881167	12	~2019
183792991331	367585982663	12	~2019
183798789131	367597578263	12	~2019
183801462899	367602925799	12	~2019
183801893531	367603787063	12	~2019
183805794383	367611588767	12	~2019
183808060643	367616121287	12	~2019
183831426913	2757...036951	14	2024
183846131531	367692263063	12	~2019
183847261259	367694522519	12	~2019
183860721983	367721443967	12	~2019

Exponent	Prime Factor	Dig.	Year
183896238671	367792477343	12	~2019
183898455971	367796911943	12	~2019
183901915199	367803830399	12	~2019
183901962911	367803925823	12	~2019
183906700609	1070...754439	15	2025
183918353351	367836706703	12	~2019
183926270039	367852540079	12	~2019
183929608283	367859216567	12	~2019
183931792571	2979...396503	14	2024
183933647459	367867294919	12	~2019
183942908771	367885817543	12	~2019
183954160391	367908320783	12	~2019
183961313603	367922627207	12	~2019
183961638071	367923276143	12	~2019
183965327831	367930655663	12	~2019
184003928579	368007857159	12	~2019
184015950179	368031900359	12	~2019
184040161859	368080323719	12	~2019
184061266331	368122532663	12	~2019
184076149091	368152298183	12	~2019
184091037899	368182075799	12	~2019
184110761363	368221522727	12	~2019
184116875051	368233750103	12	~2019
184125530339	368251060679	12	~2019
184152529679	368305059359	12	~2019

5.441.361 digits

26-03-15