Small Mersenne Prime Factors (page 5436/5790)

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
77179828811	154359657623	12	~2016
77184301619	154368603239	12	~2016
77185567103	154371134207	12	~2016
77190288823	771902888231	12	~2018
77192074961	5604...421687	14	2024
77195902331	154391804663	12	~2016
77200348499	154400696999	12	~2016
77201474039	154402948079	12	~2016
77202580211	154405160423	12	~2016
77202672739	772026727391	12	~2018
77203214849	617625718793	12	~2018
77211853811	154423707623	12	~2016
77213354333	463280125999	12	~2017
77213940659	154427881319	12	~2016
77215631459	154431262919	12	~2016
77219053511	154438107023	12	~2016
77222478533	463334871199	12	~2017
77223235763	154446471527	12	~2016
77224468199	154448936399	12	~2016
77225013851	154450027703	12	~2016
77233758659	154467517319	12	~2016
77237493059	154474986119	12	~2016
77241120689	617928965513	12	~2018
77244311531	154488623063	12	~2016
77244480503	154488961007	12	~2016

Exponent	Prime Factor	Dig.	Year
77246473763	154492947527	12	~2016
77249479319	154498958639	12	~2016
77254524071	154509048143	12	~2016
77255310401	463531862407	12	~2017
77258145323	154516290647	12	~2016
77265941281	463595647687	12	~2017
77267576063	154535152127	12	~2016
77270773031	154541546063	12	~2016
77273982899	154547965799	12	~2016
77277290351	154554580703	12	~2016
77286835079	154573670159	12	~2016
77290273811	154580547623	12	~2016
77290812191	154581624383	12	~2016
77294549411	154589098823	12	~2016
77299629923	154599259847	12	~2016
77301864599	154603729199	12	~2016
77307316643	154614633287	12	~2016
77307930803	154615861607	12	~2016
77310352643	154620705287	12	~2016
77315039663	154630079327	12	~2016
77325812107	7376...750079	14	2025
77331048803	154662097607	12	~2016
77332146251	618657170009	12	~2018
77333136659	154666273319	12	~2016
77333608763	154667217527	12	~2016

Exponent	Prime Factor	Dig.	Year
77334419249	618675353993	12	~2018
77336718323	154673436647	12	~2016
77338604723	154677209447	12	~2016
77341828919	154683657839	12	~2016
77343082457	464058494743	12	~2017
77343273503	154686547007	12	~2016
77347557383	154695114767	12	~2016
77349439859	5631...217353	14	2025
77351900603	154703801207	12	~2016
77352661033	464115966199	12	~2017
77353916819	154707833639	12	~2016
77361328199	618890625593	12	~2018
77367692183	154735384367	12	~2016
77373101551	6205...443903	14	2023
77373615311	154747230623	12	~2016
77375441051	154750882103	12	~2016
77378302751	154756605503	12	~2016
77380083479	154760166959	12	~2016
77382445883	154764891767	12	~2016
77382648923	154765297847	12	~2016
77384994671	154769989343	12	~2016
77385819743	154771639487	12	~2016
77386373921	464318243527	12	~2017
77399726483	154799452967	12	~2016
77404720259	154809440519	12	~2016

Exponent	Prime Factor	Dig.	Year
77406307259	154812614519	12	~2016
77407343459	154814686919	12	~2016
77410943171	154821886343	12	~2016
77411181613	464467089679	12	~2017
77411611633	464469669799	12	~2017
77415310897	4434...818017	15	2026
77417490191	154834980383	12	~2016
77420514239	154841028479	12	~2016
77427481181	619419849449	12	~2018
77429970437	619439763497	12	~2018
77430667157	619445337257	12	~2018
77445502811	619564022489	12	~2018
77448723431	154897446863	12	~2016
77449278611	154898557223	12	~2016
77453403953	464720423719	12	~2017
77456038703	154912077407	12	~2016
77460344369	619682754953	12	~2018
77463738841	464782433047	12	~2017
77475426313	464852557879	12	~2017
77477591537	464865549223	12	~2017
77478160301	619825282409	12	~2018
77480257271	154960514543	12	~2016
77494382723	154988765447	12	~2016
77495725883	154991451767	12	~2016
77501150017	465006900103	12	~2017

5.486.313 digits

26-04-05