Small Mersenne Prime Factors (page 5020/5130)

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
192408166031	384816332063	12	~2019
192431090723	384862181447	12	~2019
192433848389	9698...588057	14	2025
192436359431	384872718863	12	~2019
192454911563	384909823127	12	~2019
192480512617	2425...589743	14	2024
192482275943	384964551887	12	~2019
192493375523	384986751047	12	~2019
192494176643	384988353287	12	~2019
192505327919	385010655839	12	~2019
192506267771	385012535543	12	~2019
192508611551	385017223103	12	~2019
192516328379	385032656759	12	~2019
192522916559	385045833119	12	~2019
192523930271	385047860543	12	~2019
192531221843	385062443687	12	~2019
192558950399	385117900799	12	~2019
192578492891	385156985783	12	~2019
192602848331	385205696663	12	~2019
192616797683	385233595367	12	~2019
192627452603	385254905207	12	~2019
192636283919	385272567839	12	~2019
192641926811	385283853623	12	~2019
192652408211	385304816423	12	~2019
192676909163	385353818327	12	~2019

Exponent	Prime Factor	Dig.	Year
192691331831	385382663663	12	~2019
192714643403	385429286807	12	~2019
192732942851	385465885703	12	~2019
192737331863	385474663727	12	~2019
192762750731	385525501463	12	~2019
192780273083	385560546167	12	~2019
192793824551	385587649103	12	~2019
192805538291	385611076583	12	~2019
192808442111	385616884223	12	~2019
192869168339	385738336679	12	~2019
192886587181	6905...210799	14	2024
192887814923	385775629847	12	~2019
192899312159	385798624319	12	~2019
192918594299	385837188599	12	~2019
192923185079	385846370159	12	~2019
192927121091	385854242183	12	~2019
192941591543	385883183087	12	~2019
192950925239	385901850479	12	~2019
192968035499	385936070999	12	~2019
192981213083	385962426167	12	~2019
192981231203	385962462407	12	~2019
193004087879	386008175759	12	~2019
193009811339	386019622679	12	~2019
193015654259	386031308519	12	~2019
193029863879	386059727759	12	~2019

Exponent	Prime Factor	Dig.	Year
193049027939	386098055879	12	~2019
193052873099	386105746199	12	~2019
193058737379	386117474759	12	~2019
193069700903	386139401807	12	~2019
193089557099	386179114199	12	~2019
193121074403	386242148807	12	~2019
193121702051	386243404103	12	~2019
193135497671	386270995343	12	~2019
193146837491	386293674983	12	~2019
193148567603	386297135207	12	~2019
193153110323	386306220647	12	~2019
193187513591	386375027183	12	~2019
193210369223	386420738447	12	~2019
193211860151	386423720303	12	~2019
193212131243	386424262487	12	~2019
193216111619	386432223239	12	~2019
193253638271	386507276543	12	~2019
193267807763	386535615527	12	~2019
193281827099	386563654199	12	~2019
193282099859	386564199719	12	~2019
193282910939	386565821879	12	~2019
193291132571	386582265143	12	~2019
193293899339	386587798679	12	~2019
193298149823	386596299647	12	~2019
193298934551	386597869103	12	~2019

Exponent	Prime Factor	Dig.	Year
193314476279	386628952559	12	~2019
193320649751	386641299503	12	~2019
193324084559	386648169119	12	~2019
193343722661	7076...493927	14	2023
193364879231	386729758463	12	~2019
193367299403	386734598807	12	~2019
193371406619	386742813239	12	~2019
193373316683	386746633367	12	~2019
193402926779	386805853559	12	~2019
193405890179	386811780359	12	~2019
193407408191	386814816383	12	~2019
193434078143	386868156287	12	~2019
193443133913	2785...283473	14	2024
193458887123	386917774247	12	~2019
193464779999	386929559999	12	~2019
193472536571	386945073143	12	~2019
193492291799	386984583599	12	~2019
193519124783	387038249567	12	~2019
193550272319	387100544639	12	~2019
193556314223	387112628447	12	~2019
193574899223	387149798447	12	~2019
193597716863	387195433727	12	~2019
193601707283	387203414567	12	~2019
193614335699	387228671399	12	~2019
193617880199	387235760399	12	~2019

4.828.532 digits

25-06-01