Small Mersenne Prime Factors (page 5106/5190)

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
232915243279	8804...959463	14	2025
232929025943	465858051887	12	~2020
232946718749	1863...499921	14	2024
232956938579	1565...725089	15	2025
232966203191	6569...299863	14	2025
232995548711	465991097423	12	~2020
233006552819	466013105639	12	~2020
233008391699	466016783399	12	~2020
233012712011	466025424023	12	~2020
233028373271	466056746543	12	~2020
233037503903	466075007807	12	~2020
233038574231	466077148463	12	~2020
233060802083	466121604167	12	~2020
233067695831	466135391663	12	~2020
233071989803	466143979607	12	~2020
233078441411	466156882823	12	~2020
233081892083	466163784167	12	~2020
233091271631	466182543263	12	~2020
233096719991	466193439983	12	~2020
233118555623	466237111247	12	~2020
233121922619	466243845239	12	~2020
233131358279	466262716559	12	~2020
233162240789	1007...020849	15	2025
233176133999	466352267999	12	~2020
233186872511	466373745023	12	~2020

Exponent	Prime Factor	Dig.	Year
233188491883	1539...464279	14	2025
233211422663	466422845327	12	~2020
233215524911	466431049823	12	~2020
233232077723	466464155447	12	~2020
233232111611	466464223223	12	~2020
233234032931	466468065863	12	~2020
233241559559	466483119119	12	~2020
233247485699	466494971399	12	~2020
233255168291	466510336583	12	~2020
233275881623	466551763247	12	~2020
233298968711	466597937423	12	~2020
233328365951	466656731903	12	~2020
233331339959	466662679919	12	~2020
233364743281	2800...193721	14	2024
233368072523	466736145047	12	~2020
233391282563	466782565127	12	~2020
233414258459	466828516919	12	~2020
233421475559	466842951119	12	~2020
233428679951	8450...142263	14	2025
233432415563	466864831127	12	~2020
233433483359	466866966719	12	~2020
233435553083	466871106167	12	~2020
233453125211	466906250423	12	~2020
233465645603	466931291207	12	~2020
233538893531	467077787063	12	~2020

Exponent	Prime Factor	Dig.	Year
233539588211	467079176423	12	~2020
233577097283	467154194567	12	~2020
233585980451	467171960903	12	~2020
233591301479	467182602959	12	~2020
233622056711	467244113423	12	~2020
233632065983	467264131967	12	~2020
233643449003	1542...634199	14	2024
233646387911	467292775823	12	~2020
233647968611	467295937223	12	~2020
233673409559	467346819119	12	~2020
233691863819	467383727639	12	~2020
233692457231	467384914463	12	~2020
233693847899	467387695799	12	~2020
233711601911	467423203823	12	~2020
233734079783	467468159567	12	~2020
233737607483	467475214967	12	~2020
233789827451	467579654903	12	~2020
233816955479	467633910959	12	~2020
233822330363	467644660727	12	~2020
233842130591	467684261183	12	~2020
233901063503	467802127007	12	~2020
233904025583	467808051167	12	~2020
233908848359	467817696719	12	~2020
233908945943	467817891887	12	~2020
233931762199	8982...684417	14	2023

Exponent	Prime Factor	Dig.	Year
233934730259	467869460519	12	~2020
233947988471	467895976943	12	~2020
233952735431	467905470863	12	~2020
233955832391	467911664783	12	~2020
233956080191	467912160383	12	~2020
233956489139	3977...153631	14	2024
233958112379	467916224759	12	~2020
233963108831	467926217663	12	~2020
233978434523	467956869047	12	~2020
234006786983	468013573967	12	~2020
234024872699	468049745399	12	~2020
234038725691	468077451383	12	~2020
234045358751	468090717503	12	~2020
234053019251	468106038503	12	~2020
234057931297	8379...404327	14	2025
234069126299	468138252599	12	~2020
234071681621	2097...732417	15	2025
234079809479	468159618959	12	~2020
234079892999	468159785999	12	~2020
234091048979	468182097959	12	~2020
234095342363	468190684727	12	~2020
234105859343	468211718687	12	~2020
234122182571	468244365143	12	~2020
234128966339	468257932679	12	~2020
234143344139	468286688279	12	~2020

4.888.230 digits

25-06-29