Small Mersenne Prime Factors (page 5691/5850)

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
189381490751	378762981503	12	~2019
189392626523	378785253047	12	~2019
189398308091	378796616183	12	~2019
189398384963	378796769927	12	~2019
189412521899	5152...956529	14	2023
189432475283	378864950567	12	~2019
189433002299	378866004599	12	~2019
189452816123	378905632247	12	~2019
189462434279	378924868559	12	~2019
189475841543	378951683087	12	~2019
189477687671	378955375343	12	~2019
189482016203	378964032407	12	~2019
189485537519	378971075039	12	~2019
189485783339	378971566679	12	~2019
189518391791	379036783583	12	~2019
189531850619	379063701239	12	~2019
189574967531	379149935063	12	~2019
189580382879	379160765759	12	~2019
189588670619	379177341239	12	~2019
189594103681	8190...790193	14	2026
189602332763	379204665527	12	~2019
189604938749	7280...479617	14	2025
189606657431	2768...984927	14	2024
189612354797	8911...754591	14	2025
189625349531	379250699063	12	~2019

Exponent	Prime Factor	Dig.	Year
189626082203	379252164407	12	~2019
189637766891	379275533783	12	~2019
189674212979	379348425959	12	~2019
189700065491	379400130983	12	~2019
189702629531	379405259063	12	~2019
189705336143	379410672287	12	~2019
189713125163	379426250327	12	~2019
189713585111	379427170223	12	~2019
189720660539	379441321079	12	~2019
189724687679	379449375359	12	~2019
189743805469	8158...351671	14	2025
189744943463	379489886927	12	~2019
189755040851	379510081703	12	~2019
189758981831	379517963663	12	~2019
189768108443	379536216887	12	~2019
189780997379	379561994759	12	~2019
189806642171	379613284343	12	~2019
189848525579	379697051159	12	~2019
189863933939	379727867879	12	~2019
189868378319	379736756639	12	~2019
189871646663	379743293327	12	~2019
189872326339	1807...674729	15	2026
189906476183	379812952367	12	~2019
189917242331	379834484663	12	~2019
189922187711	379844375423	12	~2019

Exponent	Prime Factor	Dig.	Year
189935686823	379871373647	12	~2019
189943438039	4406...625049	14	2023
189952691459	379905382919	12	~2019
189959375363	379918750727	12	~2019
189966511139	379933022279	12	~2019
189972908123	379945816247	12	~2019
189997149263	379994298527	12	~2019
190005564491	380011128983	12	~2019
190006226219	2724...398047	15	2026
190006358603	380012717207	12	~2019
190013878751	380027757503	12	~2019
190019678339	380039356679	12	~2019
190019998463	380039996927	12	~2019
190048873439	380097746879	12	~2019
190069480943	380138961887	12	~2019
190070934299	380141868599	12	~2019
190077396503	3273...778167	15	2025
190079719019	380159438039	12	~2019
190101249839	380202499679	12	~2019
190164106763	380328213527	12	~2019
190197428111	380394856223	12	~2019
190237902623	380475805247	12	~2019
190284091043	380568182087	12	~2019
190302249419	380604498839	12	~2019
190343107319	380686214639	12	~2019

Exponent	Prime Factor	Dig.	Year
190349088851	380698177703	12	~2019
190349239163	380698478327	12	~2019
190368991259	380737982519	12	~2019
190372743623	380745487247	12	~2019
190383785951	380767571903	12	~2019
190394484191	380788968383	12	~2019
190401518579	380803037159	12	~2019
190403396399	380806792799	12	~2019
190412792519	380825585039	12	~2019
190415448539	380830897079	12	~2019
190434574199	380869148399	12	~2019
190479128219	380958256439	12	~2019
190481368691	380962737383	12	~2019
190486752119	380973504239	12	~2019
190489529291	380979058583	12	~2019
190499274923	380998549847	12	~2019
190509921611	381019843223	12	~2019
190514397467	6439...343847	14	2024
190522631339	381045262679	12	~2019
190527764243	381055528487	12	~2019
190528101539	381056203079	12	~2019
190536888623	381073777247	12	~2019
190539993779	381079987559	12	~2019
190552456823	381104913647	12	~2019
190564561163	2782...929799	14	2024

5.546.121 digits

26-05-03