Small Mersenne Prime Factors (page 4770/4980)

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
98178722699	196357445399	12	~2017
98179452697	589076716183	12	~2018
98182094579	196364189159	12	~2017
98191188239	196382376479	12	~2017
98192306819	196384613639	12	~2017
98197617923	196395235847	12	~2017
98197629203	196395258407	12	~2017
98203491517	589220949103	12	~2018
98206631639	196413263279	12	~2017
98208677279	196417354559	12	~2017
98210385461	589262312767	12	~2018
98215425023	196430850047	12	~2017
98219833801	589319002807	12	~2018
98239178039	196478356079	12	~2017
98240311751	196480623503	12	~2017
98242960841	589457765047	12	~2018
98249093003	196498186007	12	~2017
98250344063	196500688127	12	~2017
98253273221	589519639327	12	~2018
98255818033	589534908199	12	~2018
98268099179	196536198359	12	~2017
98270593763	196541187527	12	~2017
98272982063	196545964127	12	~2017
98276262179	196552524359	12	~2017
98281079003	196562158007	12	~2017

Exponent	Prime Factor	Dig.	Year
98281428131	196562856263	12	~2017
98298128039	196596256079	12	~2017
98309552219	196619104439	12	~2017
98313504197	589881025183	12	~2018
98313588013	589881528079	12	~2018
98316650891	196633301783	12	~2017
98322599399	3716...572823	14	2023
98323940699	196647881399	12	~2017
98329432559	196658865119	12	~2017
98331664559	196663329119	12	~2017
98334294251	196668588503	12	~2017
98335696619	196671393239	12	~2017
98352890617	590117343703	12	~2018
98370487499	196740974999	12	~2017
98372355863	196744711727	12	~2017
98372495339	196744990679	12	~2017
98374745519	196749491039	12	~2017
98375413319	196750826639	12	~2017
98379218579	196758437159	12	~2017
98385641999	196771283999	12	~2017
98389250759	196778501519	12	~2017
98405828291	196811656583	12	~2017
98407919723	196815839447	12	~2017
98412343559	196824687119	12	~2017
98417899771	4724...890081	14	2024

Exponent	Prime Factor	Dig.	Year
98419758191	196839516383	12	~2017
98434742531	196869485063	12	~2017
98449861379	196899722759	12	~2017
98467746011	196935492023	12	~2017
98467821671	196935643343	12	~2017
98483563993	590901383959	12	~2018
98488045619	196976091239	12	~2017
98493173951	196986347903	12	~2017
98495222603	196990445207	12	~2017
98496586439	196993172879	12	~2017
98496668663	196993337327	12	~2017
98503753499	197007506999	12	~2017
98507832119	197015664239	12	~2017
98508047219	197016094439	12	~2017
98519803391	197039606783	12	~2017
98527819583	197055639167	12	~2017
98534091863	197068183727	12	~2017
98535802223	197071604447	12	~2017
98541933551	197083867103	12	~2017
98542704083	197085408167	12	~2017
98546959403	197093918807	12	~2017
98549566679	197099133359	12	~2017
98555678471	197111356943	12	~2017
98563046591	197126093183	12	~2017
98566380131	197132760263	12	~2017

Exponent	Prime Factor	Dig.	Year
98570372819	197140745639	12	~2017
98577428843	197154857687	12	~2017
98577491279	197154982559	12	~2017
98582862461	591497174767	12	~2018
98584035881	591504215287	12	~2018
98599264957	591595589743	12	~2018
98599567193	3634...673399	15	2023
98612136251	197224272503	12	~2017
98616005951	197232011903	12	~2017
98624619061	591747714367	12	~2018
98630204063	197260408127	12	~2017
98632139051	197264278103	12	~2017
98634857099	197269714199	12	~2017
98638418531	197276837063	12	~2017
98652808823	197305617647	12	~2017
98654550719	197309101439	12	~2017
98656090679	197312181359	12	~2017
98665415351	197330830703	12	~2017
98672759377	592036556263	12	~2018
98680792943	197361585887	12	~2017
98681486639	197362973279	12	~2017
98699578343	197399156687	12	~2017
98707975451	197415950903	12	~2017
98708821727	4580...281329	14	2023
98713088531	197426177063	12	~2017

4.679.597 digits

25-03-23