Small Mersenne Prime Factors (page 4658/5235)

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
23868955163	47737910327	11	~2012
23869607543	47739215087	11	~2012
23871478643	47742957287	11	~2012
23871651761	143229910567	12	~2013
23871692759	47743385519	11	~2012
23872493549	334214909687	12	~2014
23872906643	47745813287	11	~2012
23874505283	47749010567	11	~2012
23874887951	47749775903	11	~2012
23878426721	143270560327	12	~2013
23878778771	47757557543	11	~2012
23878841159	47757682319	11	~2012
23879924279	47759848559	11	~2012
23881852639	238818526391	12	~2014
23882328803	47764657607	11	~2012
23883581699	47767163399	11	~2012
23883874799	47767749599	11	~2012
23884345679	47768691359	11	~2012
23884432031	47768864063	11	~2012
23884483927	238844839271	12	~2014
23884874113	143309244679	12	~2013
23885238683	47770477367	11	~2012
23885480891	47770961783	11	~2012
23886590831	47773181663	11	~2012
23887466831	47774933663	11	~2012

Exponent	Prime Factor	Dig.	Year
23887684243	238876842431	12	~2014
23887753271	47775506543	11	~2012
23888487179	47776974359	11	~2012
23889144151	238891441511	12	~2014
23889430451	47778860903	11	~2012
23890481519	47780963039	11	~2012
23891129291	47782258583	11	~2012
23893358459	47786716919	11	~2012
23893913843	47787827687	11	~2012
23894231423	47788462847	11	~2012
23894637133	143367822799	12	~2013
23895210743	47790421487	11	~2012
23895582611	191164660889	12	~2014
23897295083	47794590167	11	~2012
23897527583	47795055167	11	~2012
23900304959	47800609919	11	~2012
23901568703	47803137407	11	~2012
23902977913	143417867479	12	~2013
23903298011	47806596023	11	~2012
23905832603	47811665207	11	~2012
23906805623	47813611247	11	~2012
23908325099	47816650199	11	~2012
23911133639	47822267279	11	~2012
23912626931	47825253863	11	~2012
23913117191	47826234383	11	~2012

Exponent	Prime Factor	Dig.	Year
23913759791	47827519583	11	~2012
23915726321	143494357927	12	~2013
23915729759	47831459519	11	~2012
23915896883	47831793767	11	~2012
23917689371	47835378743	11	~2012
23919102659	47838205319	11	~2012
23922798671	47845597343	11	~2012
23923740371	47847480743	11	~2012
23924139803	47848279607	11	~2012
23924347091	47848694183	11	~2012
23924585771	47849171543	11	~2012
23924723519	47849447039	11	~2012
23924967887	622049165063	12	~2015
23925130861	143550785167	12	~2013
23926104431	47852208863	11	~2012
23926131787	1186...366353	14	2023
23927220173	143563321039	12	~2013
23927783879	47855567759	11	~2012
23927872637	191422981097	12	~2014
23928380159	47856760319	11	~2012
23929341743	47858683487	11	~2012
23932732223	47865464447	11	~2012
23933432903	47866865807	11	~2012
23935280651	47870561303	11	~2012
23938158659	47876317319	11	~2012

Exponent	Prime Factor	Dig.	Year
23938451021	143630706127	12	~2013
23939457389	191515659113	12	~2014
23939488151	47878976303	11	~2012
23939672111	47879344223	11	~2012
23940818171	47881636343	11	~2012
23941367783	47882735567	11	~2012
23942287991	47884575983	11	~2012
23942956201	143657737207	12	~2013
23944669631	47889339263	11	~2012
23945442659	47890885319	11	~2012
23945755963	814155702743	12	~2015
23948928761	143693572567	12	~2013
23949435551	47898871103	11	~2012
23950431907	239504319071	12	~2014
23950789391	47901578783	11	~2012
23951432581	143708595487	12	~2013
23951715839	47903431679	11	~2012
23952059003	47904118007	11	~2012
23952268799	47904537599	11	~2012
23952405077	143714430463	12	~2013
23953989971	47907979943	11	~2012
23955601919	47911203839	11	~2012
23956449299	47912898599	11	~2012
23958444239	47916888479	11	~2012
23960846047	239608460471	12	~2014

4.933.056 digits

25-07-20