Small Mersenne Prime Factors (page 4869/5235)

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
54864271577	768099802079	12	~2017
54866082179	109732164359	12	~2015
54869218253	329215309519	12	~2016
54872673503	109745347007	12	~2015
54873384551	109746769103	12	~2015
54876900731	109753801463	12	~2015
54877691591	109755383183	12	~2015
54879641879	109759283759	12	~2015
54882590699	109765181399	12	~2015
54883069859	109766139719	12	~2015
54884713463	109769426927	12	~2015
54885531023	109771062047	12	~2015
54886699943	109773399887	12	~2015
54887840939	109775681879	12	~2015
54894066659	109788133319	12	~2015
54897761057	329386566343	12	~2016
54898662191	109797324383	12	~2015
54900572159	109801144319	12	~2015
54901282811	109802565623	12	~2015
54903545771	439228366169	12	~2016
54904133653	329424801919	12	~2016
54906973027	2470...862151	14	2023
54912692231	109825384463	12	~2015
54918586187	439348689497	12	~2016
54918827651	109837655303	12	~2015

Exponent	Prime Factor	Dig.	Year
54921364657	329528187943	12	~2016
54921947579	109843895159	12	~2015
54922890299	109845780599	12	~2015
54923385871	549233858711	12	~2017
54925403363	109850806727	12	~2015
54926752379	109853504759	12	~2015
54932032091	109864064183	12	~2015
54934619783	109869239567	12	~2015
54936833663	109873667327	12	~2015
54938445563	109876891127	12	~2015
54938842043	109877684087	12	~2015
54940336093	329642016559	12	~2016
54943466789	439547734313	12	~2016
54946714391	109893428783	12	~2015
54952746053	2945...884409	14	2023
54959113823	109918227647	12	~2015
54959591651	109919183303	12	~2015
54959612663	109919225327	12	~2015
54961042439	109922084879	12	~2015
54961434461	329768606767	12	~2016
54966758939	109933517879	12	~2015
54967562939	109935125879	12	~2015
54971649617	769603094639	12	~2017
54977537819	109955075639	12	~2015
54979263761	329875582567	12	~2016

Exponent	Prime Factor	Dig.	Year
54981978797	439855830377	12	~2016
54987127319	109974254639	12	~2015
54993027191	109986054383	12	~2015
54999166559	109998333119	12	~2015
55003893767	440031150137	12	~2016
55004488967	440035911737	12	~2016
55006458971	110012917943	12	~2015
55010474591	110020949183	12	~2015
55015043519	110030087039	12	~2015
55020259799	110040519599	12	~2015
55022681183	110045362367	12	~2015
55023039803	110046079607	12	~2015
55026830113	330160980679	12	~2016
55029471131	110058942263	12	~2015
55030956791	110061913583	12	~2015
55031806769	440254454153	12	~2016
55032688517	770457639239	12	~2017
55034880443	110069760887	12	~2015
55035101399	440280811193	12	~2016
55036258019	110072516039	12	~2015
55036936441	330221618647	12	~2016
55038144251	110076288503	12	~2015
55038327299	110076654599	12	~2015
55039049963	110078099927	12	~2015
55039837283	110079674567	12	~2015

Exponent	Prime Factor	Dig.	Year
55042275251	110084550503	12	~2015
55045550723	110091101447	12	~2015
55048208531	110096417063	12	~2015
55049595791	110099191583	12	~2015
55053394427	440427155417	12	~2016
55056830441	440454643529	12	~2016
55057210619	110114421239	12	~2015
55058881793	330353290759	12	~2016
55061558603	110123117207	12	~2015
55064169737	440513357897	12	~2016
55067864699	110135729399	12	~2015
55068536591	110137073183	12	~2015
55070704121	330424224727	12	~2016
55072099349	440576794793	12	~2016
55078374359	110156748719	12	~2015
55080511991	110161023983	12	~2015
55080644603	110161289207	12	~2015
55080709763	110161419527	12	~2015
55080779357	330484676143	12	~2016
55085144399	110170288799	12	~2015
55086688451	110173376903	12	~2015
55086862139	110173724279	12	~2015
55087571603	110175143207	12	~2015
55092729371	110185458743	12	~2015
55093461431	110186922863	12	~2015

4.933.056 digits

25-07-20