Small Mersenne Prime Factors (page 5556/5790)

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
126996186617	761977119703	12	~2019
126998655911	1463...609473	15	2024
127001238719	254002477439	12	~2018
127006950611	254013901223	12	~2018
127007475851	254014951703	12	~2018
127010400239	254020800479	12	~2018
127013949971	254027899943	12	~2018
127019271083	254038542167	12	~2018
127020461363	254040922727	12	~2018
127023677531	254047355063	12	~2018
127027448963	254054897927	12	~2018
127027789439	254055578879	12	~2018
127035463463	254070926927	12	~2018
127042231741	762253390447	12	~2019
127044165023	254088330047	12	~2018
127048507753	3636...189087	15	2023
127050717403	3862...090513	14	2023
127053247031	254106494063	12	~2018
127054818419	254109636839	12	~2018
127061855113	762371130679	12	~2019
127065365051	254130730103	12	~2018
127067550383	254135100767	12	~2018
127078633151	254157266303	12	~2018
127087491263	254174982527	12	~2018
127095652253	3838...980407	14	2023

Exponent	Prime Factor	Dig.	Year
127101831397	762610988383	12	~2019
127104183263	254208366527	12	~2018
127112482823	254224965647	12	~2018
127112709539	254225419079	12	~2018
127113210641	762679263847	12	~2019
127127176499	254254352999	12	~2018
127140912719	254281825439	12	~2018
127144278851	254288557703	12	~2018
127145118623	254290237247	12	~2018
127166613443	254333226887	12	~2018
127170261563	254340523127	12	~2018
127173887411	254347774823	12	~2018
127179464231	254358928463	12	~2018
127182298559	254364597119	12	~2018
127189920779	254379841559	12	~2018
127194122999	254388245999	12	~2018
127195513079	254391026159	12	~2018
127197685799	254395371599	12	~2018
127200922031	254401844063	12	~2018
127202392403	254404784807	12	~2018
127207893497	763247360983	12	~2019
127211558261	763269349567	12	~2019
127214561951	254429123903	12	~2018
127223234669	3435...360631	14	2024
127225917839	254451835679	12	~2018

Exponent	Prime Factor	Dig.	Year
127231503719	254463007439	12	~2018
127236282163	1089...531529	15	2023
127237280063	254474560127	12	~2018
127246264031	254492528063	12	~2018
127252610603	254505221207	12	~2018
127258173803	254516347607	12	~2018
127265821499	254531642999	12	~2018
127269697873	763618187239	12	~2019
127272700319	254545400639	12	~2018
127279016159	254558032319	12	~2018
127285062413	3133...660807	15	2024
127294695191	254589390383	12	~2018
127297786559	254595573119	12	~2018
127298802503	254597605007	12	~2018
127301210951	254602421903	12	~2018
127302863459	254605726919	12	~2018
127303071419	254606142839	12	~2018
127326778643	254653557287	12	~2018
127336913243	254673826487	12	~2018
127338837959	254677675919	12	~2018
127345414403	254690828807	12	~2018
127354641731	254709283463	12	~2018
127365098831	254730197663	12	~2018
127372172881	764233037287	12	~2019
127372410433	764234462599	12	~2019

Exponent	Prime Factor	Dig.	Year
127374895619	254749791239	12	~2018
127377612617	764265675703	12	~2019
127378237271	254756474543	12	~2018
127381958003	254763916007	12	~2018
127388736851	254777473703	12	~2018
127391808143	254783616287	12	~2018
127410167411	254820334823	12	~2018
127444125661	764664753967	12	~2019
127450145881	764700875287	12	~2019
127450203323	254900406647	12	~2018
127451638019	254903276039	12	~2018
127462571591	254925143183	12	~2018
127468553819	254937107639	12	~2018
127468973603	254937947207	12	~2018
127470733163	254941466327	12	~2018
127477686491	254955372983	12	~2018
127487024963	254974049927	12	~2018
127496211383	254992422767	12	~2018
127502911379	255005822759	12	~2018
127509557183	255019114367	12	~2018
127511528101	765069168607	12	~2019
127513342031	255026684063	12	~2018
127516342357	765098054143	12	~2019
127520745851	255041491703	12	~2018
127520960459	255041920919	12	~2018

5.486.313 digits

26-04-05