Small Mersenne Prime Factors (page 5626/5775)

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
195644625959	1447...320967	14	2024
195645032239	5947...800657	14	2023
195645367031	391290734063	12	~2019
195647344583	391294689167	12	~2019
195659301503	391318603007	12	~2019
195672417371	391344834743	12	~2019
195704665259	391409330519	12	~2019
195722197019	391444394039	12	~2019
195727668953	4501...859191	14	2023
195729298871	391458597743	12	~2019
195730875803	391461751607	12	~2019
195745183223	391490366447	12	~2019
195746715013	5128...333407	14	2026
195750072443	391500144887	12	~2019
195785809883	391571619767	12	~2019
195797223203	391594446407	12	~2019
195798557771	391597115543	12	~2019
195812611523	391625223047	12	~2019
195837566063	391675132127	12	~2019
195845778671	391691557343	12	~2019
195850794803	391701589607	12	~2019
195851277299	391702554599	12	~2019
195860855581	3133...892961	14	2024
195867388583	391734777167	12	~2019
195867876839	391735753679	12	~2019

Exponent	Prime Factor	Dig.	Year
195873285011	391746570023	12	~2019
195906690131	391813380263	12	~2019
195923460983	391846921967	12	~2019
195927248903	391854497807	12	~2019
195930713519	391861427039	12	~2019
195936393431	391872786863	12	~2019
195942759431	391885518863	12	~2019
195946747019	391893494039	12	~2019
195956408831	391912817663	12	~2019
195959160263	391918320527	12	~2019
195960339611	391920679223	12	~2019
195979383023	391958766047	12	~2019
196011352343	392022704687	12	~2019
196018819631	392037639263	12	~2019
196022135279	392044270559	12	~2019
196031700911	392063401823	12	~2019
196038128483	392076256967	12	~2019
196042642619	392085285239	12	~2019
196069667111	8627...528841	14	2026
196095940751	392191881503	12	~2019
196110307583	392220615167	12	~2019
196131971411	392263942823	12	~2019
196143788761	1035...465809	15	2025
196150992899	392301985799	12	~2019
196156865351	392313730703	12	~2019

Exponent	Prime Factor	Dig.	Year
196157679803	392315359607	12	~2019
196167652091	392335304183	12	~2019
196171347899	392342695799	12	~2019
196180087979	392360175959	12	~2019
196191186959	392382373919	12	~2019
196192020539	392384041079	12	~2019
196197216203	392394432407	12	~2019
196203000239	392406000479	12	~2019
196217705063	392435410127	12	~2019
196241799983	392483599967	12	~2019
196269856703	392539713407	12	~2019
196275625151	392551250303	12	~2019
196286272823	392572545647	12	~2019
196302217439	392604434879	12	~2019
196337872691	392675745383	12	~2019
196373148761	1688...793447	14	2024
196379764079	392759528159	12	~2019
196413622991	392827245983	12	~2019
196421440751	392842881503	12	~2019
196422080689	1374...648231	14	2024
196449989891	392899979783	12	~2019
196452896219	392905792439	12	~2019
196491996719	392983993439	12	~2019
196520356271	393040712543	12	~2019
196527732239	393055464479	12	~2019

Exponent	Prime Factor	Dig.	Year
196530742679	393061485359	12	~2019
196530837983	393061675967	12	~2019
196536868883	393073737767	12	~2019
196541840711	393083681423	12	~2019
196551446197	8451...864711	14	2025
196558320923	393116641847	12	~2019
196563273611	393126547223	12	~2019
196569930059	393139860119	12	~2019
196579393403	393158786807	12	~2019
196591718579	393183437159	12	~2019
196625146031	393250292063	12	~2019
196635049913	7078...968681	14	2025
196650345959	393300691919	12	~2019
196663278683	393326557367	12	~2019
196664910479	393329820959	12	~2019
196668939191	393337878383	12	~2019
196672915223	393345830447	12	~2019
196675061783	393350123567	12	~2019
196698736163	393397472327	12	~2019
196721572391	2400...831703	14	2024
196725494279	393450988559	12	~2019
196732377851	393464755703	12	~2019
196737265391	393474530783	12	~2019
196741350653	4367...844967	14	2023
196770740119	3305...339993	14	2024

5.471.290 digits

26-03-29