Small Mersenne Prime Factors (page 5252/5340)

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
239863494791	479726989583	12	~2020
239876325263	479752650527	12	~2020
239886746483	479773492967	12	~2020
239894694799	3454...051057	14	2024
239895888803	479791777607	12	~2020
239897953271	479795906543	12	~2020
239911113791	479822227583	12	~2020
239956002119	479912004239	12	~2020
239960782811	479921565623	12	~2020
239970018479	479940036959	12	~2020
239970544679	479941089359	12	~2020
239972209583	479944419167	12	~2020
240013083923	480026167847	12	~2020
240048042491	480096084983	12	~2020
240049433339	480098866679	12	~2020
240052852751	480105705503	12	~2020
240059585219	480119170439	12	~2020
240063879179	480127758359	12	~2020
240070360619	480140721239	12	~2020
240075971699	480151943399	12	~2020
240083148661	8787...409927	14	2023
240110613383	480221226767	12	~2020
240114342983	480228685967	12	~2020
240139640291	480279280583	12	~2020
240141191219	480282382439	12	~2020

Exponent	Prime Factor	Dig.	Year
240152877491	480305754983	12	~2020
240153742583	480307485167	12	~2020
240154408883	480308817767	12	~2020
240155887259	480311774519	12	~2020
240176748299	480353496599	12	~2020
240198929963	480397859927	12	~2020
240248161213	2575...820337	15	2024
240250149731	480500299463	12	~2020
240266553749	1460...679393	15	2025
240270423779	480540847559	12	~2020
240271167611	480542335223	12	~2020
240272935223	480545870447	12	~2020
240297796223	480595592447	12	~2020
240315146891	480630293783	12	~2020
240351726683	480703453367	12	~2020
240366277451	480732554903	12	~2020
240389659379	480779318759	12	~2020
240397807451	480795614903	12	~2020
240406755419	480813510839	12	~2020
240436471211	480872942423	12	~2020
240449411243	480898822487	12	~2020
240452278019	480904556039	12	~2020
240457867739	480915735479	12	~2020
240474763643	480949527287	12	~2020
240475460947	4472...736143	14	2023

Exponent	Prime Factor	Dig.	Year
240519545411	481039090823	12	~2020
240526667471	7360...246127	14	2025
240534163151	481068326303	12	~2020
240549562223	481099124447	12	~2020
240583748939	481167497879	12	~2020
240602153887	3127...005311	14	2024
240607144091	481214288183	12	~2020
240608750831	481217501663	12	~2020
240630601559	481261203119	12	~2020
240664016303	481328032607	12	~2020
240673586819	481347173639	12	~2020
240713649083	481427298167	12	~2020
240719412071	481438824143	12	~2020
240723875459	481447750919	12	~2020
240738860399	481477720799	12	~2020
240780428771	481560857543	12	~2020
240809630423	481619260847	12	~2020
240810999899	481621999799	12	~2020
240817298411	481634596823	12	~2020
240833747939	481667495879	12	~2020
240835292339	481670584679	12	~2020
240838780943	481677561887	12	~2020
240840648731	481681297463	12	~2020
240872146063	1040...099217	15	2023
240873271319	481746542639	12	~2020

Exponent	Prime Factor	Dig.	Year
240878133011	481756266023	12	~2020
240878704019	481757408039	12	~2020
240885998219	481771996439	12	~2020
240886157639	481772315279	12	~2020
240902480543	481804961087	12	~2020
240917679181	2457...276463	14	2024
240919183223	481838366447	12	~2020
240929149061	9829...816889	14	2025
240969752711	481939505423	12	~2020
240975367739	481950735479	12	~2020
240983806103	481967612207	12	~2020
240999641843	481999283687	12	~2020
241011684983	482023369967	12	~2020
241022345699	482044691399	12	~2020
241028698139	482057396279	12	~2020
241065615071	482131230143	12	~2020
241075146659	482150293319	12	~2020
241076438363	482152876727	12	~2020
241092368519	482184737039	12	~2020
241119474383	482238948767	12	~2020
241183650731	482367301463	12	~2020
241187184779	482374369559	12	~2020
241212077003	482424154007	12	~2020
241218891839	482437783679	12	~2020
241226882159	482453764319	12	~2020

5.037.460 digits

25-09-07