Small Mersenne Prime Factors (page 4792/5025)

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
89531388983	179062777967	12	~2017
89537600051	179075200103	12	~2017
89539451597	716315612777	12	~2018
89539688999	716317511993	12	~2018
89541370693	3008...552849	14	2025
89547377099	179094754199	12	~2017
89556320999	179112641999	12	~2017
89558345183	179116690367	12	~2017
89561644619	179123289239	12	~2017
89564058281	716512466249	12	~2018
89564135651	179128271303	12	~2017
89564303963	179128607927	12	~2017
89569551611	179139103223	12	~2017
89578528103	179157056207	12	~2017
89583975521	716671804169	12	~2018
89589521831	179179043663	12	~2017
89598628403	179197256807	12	~2017
89600348039	179200696079	12	~2017
89601018911	179202037823	12	~2017
89601352859	179202705719	12	~2017
89603508971	179207017943	12	~2017
89604776951	179209553903	12	~2017
89606486219	179212972439	12	~2017
89607892571	179215785143	12	~2017
89611926179	179223852359	12	~2017

Exponent	Prime Factor	Dig.	Year
89619246323	179238492647	12	~2017
89625005699	179250011399	12	~2017
89625413639	179250827279	12	~2017
89642135399	179284270799	12	~2017
89651266583	179302533167	12	~2017
89653565411	179307130823	12	~2017
89655621239	179311242479	12	~2017
89656221251	179312442503	12	~2017
89660088839	179320177679	12	~2017
89668711031	179337422063	12	~2017
89670723011	179341446023	12	~2017
89673276611	179346553223	12	~2017
89675682539	179351365079	12	~2017
89676031391	179352062783	12	~2017
89680850621	717446804969	12	~2018
89688358429	7372...628639	14	2024
89691075371	179382150743	12	~2017
89699915219	179399830439	12	~2017
89701661099	179403322199	12	~2017
89702431139	179404862279	12	~2017
89703774131	179407548263	12	~2017
89707312273	538243873639	12	~2018
89709569699	179419139399	12	~2017
89712935783	179425871567	12	~2017
89713423673	538280542039	12	~2018

Exponent	Prime Factor	Dig.	Year
89715381551	179430763103	12	~2017
89720016143	179440032287	12	~2017
89720191021	2942...654889	14	2024
89726738771	179453477543	12	~2017
89733144383	179466288767	12	~2017
89738220553	3374...927929	14	2024
89740078919	179480157839	12	~2017
89746746911	717973975289	12	~2018
89747276471	179494552943	12	~2017
89750059739	179500119479	12	~2017
89753507099	179507014199	12	~2017
89753865119	179507730239	12	~2017
89755275059	179510550119	12	~2017
89756335919	179512671839	12	~2017
89762949121	538577694727	12	~2018
89783292419	179566584839	12	~2017
89788299583	2460...085743	14	2024
89807428261	538844569567	12	~2018
89809075757	538854454543	12	~2018
89823711037	538942266223	12	~2018
89823793043	179647586087	12	~2017
89827752517	538966515103	12	~2018
89832356771	718658854169	12	~2018
89850636593	539103819559	12	~2018
89853771659	179707543319	12	~2017

Exponent	Prime Factor	Dig.	Year
89855555879	179711111759	12	~2017
89857081511	179714163023	12	~2017
89858770979	179717541959	12	~2017
89861354851	2318...551559	14	2024
89864343557	718914748457	12	~2018
89871226199	179742452399	12	~2017
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
89934572771	179869145543	12	~2017

4.724.182 digits

25-04-13