Small Mersenne Prime Factors (page 4847/5190)

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
59074068743	118148137487	12	~2015
59074339631	118148679263	12	~2015
59075475839	8979...275281	14	2025
59078103881	354468623287	12	~2016
59078323691	118156647383	12	~2015
59081279219	472650233753	12	~2017
59086204871	118172409743	12	~2015
59086988123	118173976247	12	~2015
59090549471	118181098943	12	~2015
59096714279	118193428559	12	~2015
59098965203	118197930407	12	~2015
59099689991	118199379983	12	~2015
59100228673	354601372039	12	~2016
59102317697	472818541577	12	~2017
59102804279	118205608559	12	~2015
59103997583	118207995167	12	~2015
59104335071	118208670143	12	~2015
59105978891	118211957783	12	~2015
59111122571	118222245143	12	~2015
59113677851	118227355703	12	~2015
59120175599	118240351199	12	~2015
59122605791	118245211583	12	~2015
59125119863	118250239727	12	~2015
59125120079	473000960633	12	~2017
59126287043	118252574087	12	~2015

Exponent	Prime Factor	Dig.	Year
59127411059	473019288473	12	~2017
59127556967	473020455737	12	~2017
59127597383	118255194767	12	~2015
59127673351	591276733511	12	~2017
59129396723	118258793447	12	~2015
59143787039	118287574079	12	~2015
59144285423	118288570847	12	~2015
59145382843	591453828431	12	~2017
59145684551	118291369103	12	~2015
59148277943	118296555887	12	~2015
59149257731	118298515463	12	~2015
59156819471	118313638943	12	~2015
59159503979	118319007959	12	~2015
59162720891	118325441783	12	~2015
59163854443	2378...486087	14	2024
59163911519	118327823039	12	~2015
59167638311	473341106489	12	~2017
59168708939	118337417879	12	~2015
59174410079	118348820159	12	~2015
59175681493	355054088959	12	~2016
59177655161	473421241289	12	~2017
59177698981	355066193887	12	~2016
59179070519	118358141039	12	~2015
59180349401	355082096407	12	~2016
59184791957	355108751743	12	~2016

Exponent	Prime Factor	Dig.	Year
59189046359	118378092719	12	~2015
59189261591	118378523183	12	~2015
59194394351	118388788703	12	~2015
59199678179	118399356359	12	~2015
59200915439	118401830879	12	~2015
59201949479	118403898959	12	~2015
59208249361	355249496167	12	~2016
59209823723	118419647447	12	~2015
59211178811	118422357623	12	~2015
59211499871	118422999743	12	~2015
59212201439	118424402879	12	~2015
59213713913	355282283479	12	~2016
59217602123	118435204247	12	~2015
59221940891	118443881783	12	~2015
59222871803	118445743607	12	~2015
59223017939	118446035879	12	~2015
59224704521	355348227127	12	~2016
59225216339	118450432679	12	~2015
59225367731	473802941849	12	~2017
59225844071	118451688143	12	~2015
59226485399	118452970799	12	~2015
59227828397	473822627177	12	~2017
59229178979	118458357959	12	~2015
59230020299	118460040599	12	~2015
59233277111	118466554223	12	~2015

Exponent	Prime Factor	Dig.	Year
59235777067	4371...475447	14	2023
59238834023	2384...776599	15	2023
59241066323	118482132647	12	~2015
59241361703	118482723407	12	~2015
59244535583	118489071167	12	~2015
59245336981	355472021887	12	~2016
59250501617	355503009703	12	~2016
59250707459	118501414919	12	~2015
59255786819	118511573639	12	~2015
59264383259	118528766519	12	~2015
59264925383	118529850767	12	~2015
59266527731	118533055463	12	~2015
59272640171	474181121369	12	~2017
59274843833	355649062999	12	~2016
59275033019	118550066039	12	~2015
59275367231	2525...440407	14	2024
59278833623	118557667247	12	~2015
59281978499	118563956999	12	~2015
59285550563	118571101127	12	~2015
59285956343	118571912687	12	~2015
59287071911	118574143823	12	~2015
59288652541	355731915247	12	~2016
59289339443	118578678887	12	~2015
59291428571	118582857143	12	~2015
59296604183	118593208367	12	~2015

4.888.230 digits

25-06-29