Small Mersenne Prime Factors (page 4870/5025)

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
136510472363	273020944727	12	~2018
136527542999	273055085999	12	~2018
136534143899	273068287799	12	~2018
136535007071	273070014143	12	~2018
136547257883	273094515767	12	~2018
136553627999	273107255999	12	~2018
136568613491	273137226983	12	~2018
136584390671	273168781343	12	~2018
136592044859	273184089719	12	~2018
136613591423	273227182847	12	~2018
136648019471	273296038943	12	~2018
136651726163	273303452327	12	~2018
136654208891	273308417783	12	~2018
136662852731	273325705463	12	~2018
136676022023	273352044047	12	~2018
136677896759	273355793519	12	~2018
136680356723	273360713447	12	~2018
136685568191	273371136383	12	~2018
136702584971	273405169943	12	~2018
136705484999	273410969999	12	~2018
136707954059	273415908119	12	~2018
136708452719	273416905439	12	~2018
136727329163	273454658327	12	~2018
136739684759	273479369519	12	~2018
136750567489	4895...161063	14	2024

Exponent	Prime Factor	Dig.	Year
136750767239	273501534479	12	~2018
136755814439	273511628879	12	~2018
136772076263	273544152527	12	~2018
136786120631	273572241263	12	~2018
136787377619	273574755239	12	~2018
136790212151	273580424303	12	~2018
136790359031	273580718063	12	~2018
136818020219	273636040439	12	~2018
136829662751	273659325503	12	~2018
136850677451	273701354903	12	~2018
136865584403	273731168807	12	~2018
136901717219	273803434439	12	~2018
136913722943	273827445887	12	~2018
136945389863	273890779727	12	~2018
136950676679	273901353359	12	~2018
136966665239	273933330479	12	~2018
136969775843	273939551687	12	~2018
136972493543	273944987087	12	~2018
136975719659	273951439319	12	~2018
136977720251	273955440503	12	~2018
136978198163	273956396327	12	~2018
137008409339	274016818679	12	~2018
137013311111	274026622223	12	~2018
137017348883	274034697767	12	~2018
137022195631	2767...517463	14	2024

Exponent	Prime Factor	Dig.	Year
137023916759	274047833519	12	~2018
137051664719	274103329439	12	~2018
137054995691	274109991383	12	~2018
137062978379	274125956759	12	~2018
137075429411	274150858823	12	~2018
137077709603	274155419207	12	~2018
137077750619	274155501239	12	~2018
137085129913	3509...257729	14	2023
137089277879	274178555759	12	~2018
137115563003	274231126007	12	~2018
137126353943	274252707887	12	~2018
137143964843	274287929687	12	~2018
137156103191	274312206383	12	~2018
137184994703	274369989407	12	~2018
137186324003	274372648007	12	~2018
137192113343	274384226687	12	~2018
137205910823	274411821647	12	~2018
137214054611	274428109223	12	~2018
137220310079	274440620159	12	~2018
137234979803	274469959607	12	~2018
137246635231	2854...128049	14	2024
137248625219	274497250439	12	~2018
137262536003	274525072007	12	~2018
137266960301	2717...139599	14	2024
137270570977	8236...586201	14	2023

Exponent	Prime Factor	Dig.	Year
137319421199	274638842399	12	~2018
137342823071	274685646143	12	~2018
137349275039	274698550079	12	~2018
137350855151	274701710303	12	~2018
137351097731	274702195463	12	~2018
137365552139	274731104279	12	~2018
137378192459	274756384919	12	~2018
137381000759	274762001519	12	~2018
137389967111	274779934223	12	~2018
137391269891	274782539783	12	~2018
137397924551	2335...173671	14	2024
137420066939	274840133879	12	~2018
137471158211	274942316423	12	~2018
137476592471	274953184943	12	~2018
137480667959	274961335919	12	~2018
137484702611	274969405223	12	~2018
137487674783	274975349567	12	~2018
137494902263	274989804527	12	~2018
137498858641	1539...167793	14	2025
137525914511	275051829023	12	~2018
137539118291	275078236583	12	~2018
137539290023	275078580047	12	~2018
137542243211	275084486423	12	~2018
137542524083	275085048167	12	~2018
137545160099	275090320199	12	~2018

4.724.182 digits

25-04-13