Small Mersenne Prime Factors (page 4980/5235)

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
89873534099	179747068199	12	~2017
89882468519	179764937039	12	~2017
89884587641	539307525847	12	~2018
89891711957	539350271743	12	~2018
89896467599	179792935199	12	~2017
89900373011	179800746023	12	~2017
89903581577	539421489463	12	~2018
89909256791	179818513583	12	~2017
89909502671	179819005343	12	~2017
89910373541	719282988329	12	~2018
89914927463	179829854927	12	~2017
89919356339	719354850713	12	~2018
89923972343	179847944687	12	~2017
89925353519	179850707039	12	~2017
89925480539	179850961079	12	~2017
89932861619	179865723239	12	~2017
89932902431	179865804863	12	~2017
89933120681	539598724087	12	~2018
89933871311	179867742623	12	~2017
89934572771	179869145543	12	~2017
89935432681	539612596087	12	~2018
89935669163	179871338327	12	~2017
89943241499	179886482999	12	~2017
89944112171	179888224343	12	~2017
89944634303	179889268607	12	~2017

Exponent	Prime Factor	Dig.	Year
89946866759	179893733519	12	~2017
89952039563	179904079127	12	~2017
89952285443	179904570887	12	~2017
89954649539	179909299079	12	~2017
89955431459	179910862919	12	~2017
89973652283	179947304567	12	~2017
89977085771	179954171543	12	~2017
89981834219	179963668439	12	~2017
89987938919	179975877839	12	~2017
89992229039	179984458079	12	~2017
89994951503	179989903007	12	~2017
89995264571	179990529143	12	~2017
90004805339	180009610679	12	~2017
90010950713	540065704279	12	~2018
90011796683	180023593367	12	~2017
90015528959	180031057919	12	~2017
90015983831	180031967663	12	~2017
90016789631	180033579263	12	~2017
90017254703	180034509407	12	~2017
90017330413	540103982479	12	~2018
90021199847	720169598777	12	~2018
90022948943	180045897887	12	~2017
90027137003	180054274007	12	~2017
90028841291	180057682583	12	~2017
90029110499	180058220999	12	~2017

Exponent	Prime Factor	Dig.	Year
90031787123	180063574247	12	~2017
90036361199	180072722399	12	~2017
90040484879	180080969759	12	~2017
90041539493	540249236959	12	~2018
90051326591	4484...642319	14	2023
90062768363	180125536727	12	~2017
90062838137	540377028823	12	~2018
90065234537	540391407223	12	~2018
90067101479	180134202959	12	~2017
90071257079	180142514159	12	~2017
90077421683	180154843367	12	~2017
90086554331	180173108663	12	~2017
90088400651	180176801303	12	~2017
90097536253	540585217519	12	~2018
90101413817	540608482903	12	~2018
90104453963	180208907927	12	~2017
90104957483	180209914967	12	~2017
90110236913	540661421479	12	~2018
90111120119	180222240239	12	~2017
90118429631	180236859263	12	~2017
90120044291	180240088583	12	~2017
90120512483	180241024967	12	~2017
90129720797	540778324783	12	~2018
90132912251	180265824503	12	~2017
90138991619	180277983239	12	~2017

Exponent	Prime Factor	Dig.	Year
90147846983	180295693967	12	~2017
90167187373	541003124239	12	~2018
90173630171	180347260343	12	~2017
90185514983	180371029967	12	~2017
90187533011	180375066023	12	~2017
90198816959	180397633919	12	~2017
90201612659	180403225319	12	~2017
90208947683	180417895367	12	~2017
90213401879	180426803759	12	~2017
90213952919	180427905839	12	~2017
90218037779	180436075559	12	~2017
90218455091	180436910183	12	~2017
90226695983	180453391967	12	~2017
90226848059	180453696119	12	~2017
90229039619	180458079239	12	~2017
90236586659	180473173319	12	~2017
90237519803	180475039607	12	~2017
90244263911	721954111289	12	~2018
90250254119	180500508239	12	~2017
90261249017	722089992137	12	~2018
90263390291	180526780583	12	~2017
90266385329	722131082633	12	~2018
90272543579	180545087159	12	~2017
90274784783	180549569567	12	~2017
90277051691	180554103383	12	~2017

4.933.056 digits

25-07-20