Small Mersenne Prime Factors (page 5581/5745)

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
178070807141	2706...685433	14	2024
178073409863	356146819727	12	~2019
178094274791	356188549583	12	~2019
178109603783	356219207567	12	~2019
178122219083	356244438167	12	~2019
178122626039	356245252079	12	~2019
178132494803	356264989607	12	~2019
178154073719	356308147439	12	~2019
178160413883	356320827767	12	~2019
178160805611	356321611223	12	~2019
178161480719	356322961439	12	~2019
178183409843	356366819687	12	~2019
178190247659	356380495319	12	~2019
178191008591	356382017183	12	~2019
178198586231	356397172463	12	~2019
178203157523	356406315047	12	~2019
178226946539	356453893079	12	~2019
178246665743	356493331487	12	~2019
178251346043	356502692087	12	~2019
178257061679	356514123359	12	~2019
178312752311	356625504623	12	~2019
178314363371	356628726743	12	~2019
178325722871	356651445743	12	~2019
178330967231	356661934463	12	~2019
178343068451	356686136903	12	~2019

Exponent	Prime Factor	Dig.	Year
178345276331	356690552663	12	~2019
178349048939	356698097879	12	~2019
178365007979	356730015959	12	~2019
178375737383	356751474767	12	~2019
178379359451	356758718903	12	~2019
178388811791	356777623583	12	~2019
178390615499	356781230999	12	~2019
178406824679	356813649359	12	~2019
178426420871	356852841743	12	~2019
178429573379	356859146759	12	~2019
178446807131	356893614263	12	~2019
178447813499	356895626999	12	~2019
178459539383	356919078767	12	~2019
178462839059	356925678119	12	~2019
178472313119	356944626239	12	~2019
178490606051	356981212103	12	~2019
178500870371	357001740743	12	~2019
178501209563	357002419127	12	~2019
178510321211	357020642423	12	~2019
178530019823	357060039647	12	~2019
178530136859	357060273719	12	~2019
178547241839	357094483679	12	~2019
178548635003	357097270007	12	~2019
178551038219	357102076439	12	~2019
178556439179	357112878359	12	~2019

Exponent	Prime Factor	Dig.	Year
178569512519	357139025039	12	~2019
178605407231	357210814463	12	~2019
178608692623	8144...836089	14	2023
178639641839	357279283679	12	~2019
178640094239	357280188479	12	~2019
178652328203	357304656407	12	~2019
178662178703	357324357407	12	~2019
178694774519	357389549039	12	~2019
178705227923	357410455847	12	~2019
178712321603	357424643207	12	~2019
178722841943	357445683887	12	~2019
178725982031	357451964063	12	~2019
178727732531	357455465063	12	~2019
178733739659	357467479319	12	~2019
178740555011	357481110023	12	~2019
178748572511	357497145023	12	~2019
178783091219	357566182439	12	~2019
178786046723	357572093447	12	~2019
178787310479	357574620959	12	~2019
178825149491	357650298983	12	~2019
178827714311	357655428623	12	~2019
178829665321	1112...829663	15	2025
178832474399	357664948799	12	~2019
178851626819	357703253639	12	~2019
178865117303	357730234607	12	~2019

Exponent	Prime Factor	Dig.	Year
178868741231	357737482463	12	~2019
178870165511	357740331023	12	~2019
178872824099	357745648199	12	~2019
178873090943	357746181887	12	~2019
178875352619	357750705239	12	~2019
178880894411	357761788823	12	~2019
178892364383	357784728767	12	~2019
178903055183	357806110367	12	~2019
178907879099	357815758199	12	~2019
178913496191	6058...102727	15	2023
178922886599	357845773199	12	~2019
178934950217	9018...909369	14	2026
178945313231	357890626463	12	~2019
178947738743	357895477487	12	~2019
178973153251	1364...692127	16	2025
178983098771	357966197543	12	~2019
178995861311	357991722623	12	~2019
178996138439	357992276879	12	~2019
179006828303	358013656607	12	~2019
179023512743	358047025487	12	~2019
179028863759	358057727519	12	~2019
179035826999	358071653999	12	~2019
179043503279	358087006559	12	~2019
179061717431	358123434863	12	~2019
179101109303	358202218607	12	~2019

5.441.361 digits

26-03-15