Small Mersenne Prime Factors (page 4932/5025)

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
206747816903	3514...873511	14	2024
206768144519	413536289039	12	~2019
206770066403	413540132807	12	~2019
206770442471	413540884943	12	~2019
206772755291	413545510583	12	~2019
206805797111	413611594223	12	~2019
206811587123	413623174247	12	~2019
206826114179	413652228359	12	~2019
206851079471	413702158943	12	~2019
206857724371	1489...154713	14	2024
206859013331	413718026663	12	~2019
206878339799	413756679599	12	~2019
206896838723	413793677447	12	~2019
206900242883	413800485767	12	~2019
206904383891	413808767783	12	~2019
206917730423	413835460847	12	~2019
206930954099	413861908199	12	~2019
206933077511	413866155023	12	~2019
206941857911	413883715823	12	~2019
206952212123	413904424247	12	~2019
206958067271	413916134543	12	~2019
206964549383	413929098767	12	~2019
206995648571	413991297143	12	~2019
207031549379	414063098759	12	~2019
207036283703	414072567407	12	~2019

Exponent	Prime Factor	Dig.	Year
207036554363	414073108727	12	~2019
207038313743	414076627487	12	~2019
207041641679	414083283359	12	~2019
207049539083	414099078167	12	~2019
207052884611	414105769223	12	~2019
207059652743	414119305487	12	~2019
207061451819	2650...832833	14	2024
207075410963	414150821927	12	~2019
207076358603	414152717207	12	~2019
207082915631	414165831263	12	~2019
207084591743	414169183487	12	~2019
207087464879	414174929759	12	~2019
207097866491	414195732983	12	~2019
207113440031	414226880063	12	~2019
207118768679	414237537359	12	~2019
207124948883	414249897767	12	~2019
207136521803	414273043607	12	~2019
207143377823	414286755647	12	~2019
207155059691	1864...372191	14	2024
207183701303	414367402607	12	~2019
207208030391	414416060783	12	~2019
207209731271	414419462543	12	~2019
207212953991	414425907983	12	~2019
207219448343	414438896687	12	~2019
207221125823	414442251647	12	~2019

Exponent	Prime Factor	Dig.	Year
207223633271	414447266543	12	~2019
207227688139	3191...973407	14	2024
207228843131	414457686263	12	~2019
207239034323	414478068647	12	~2019
207241356611	414482713223	12	~2019
207241996163	414483992327	12	~2019
207243831023	414487662047	12	~2019
207246352451	414492704903	12	~2019
207258485639	414516971279	12	~2019
207262526591	414525053183	12	~2019
207304654031	414609308063	12	~2019
207314178251	414628356503	12	~2019
207361877609	5266...912687	14	2024
207367002131	414734004263	12	~2019
207374995739	2592...673751	15	2023
207380479991	414760959983	12	~2019
207386592971	414773185943	12	~2019
207412142939	414824285879	12	~2019
207453826631	414907653263	12	~2019
207463606799	414927213599	12	~2019
207464767379	414929534759	12	~2019
207471603071	414943206143	12	~2019
207481909249	1825...013913	14	2024
207482668931	414965337863	12	~2019
207504744983	415009489967	12	~2019

Exponent	Prime Factor	Dig.	Year
207530961779	415061923559	12	~2019
207547112219	415094224439	12	~2019
207551572619	415103145239	12	~2019
207561891983	415123783967	12	~2019
207577354571	415154709143	12	~2019
207603824723	415207649447	12	~2019
207610933219	1494...191769	14	2024
207632916143	415265832287	12	~2019
207634779083	415269558167	12	~2019
207649264583	415298529167	12	~2019
207668406119	415336812239	12	~2019
207723642779	415447285559	12	~2019
207741856979	415483713959	12	~2019
207742700999	415485401999	12	~2019
207755012291	415510024583	12	~2019
207767883419	415535766839	12	~2019
207795268403	415590536807	12	~2019
207837072119	415674144239	12	~2019
207862859531	415725719063	12	~2019
207878070259	4199...192319	14	2023
207884116031	415768232063	12	~2019
207892169591	415784339183	12	~2019
207901179071	415802358143	12	~2019
207907096979	415814193959	12	~2019
207924445763	415848891527	12	~2019

4.724.182 digits

25-04-13