Small Mersenne Prime Factors (page 4542/5025)

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
29534794559	59069589119	11	~2013
29535437903	59070875807	11	~2013
29537886239	59075772479	11	~2013
29538234437	236305875497	12	~2014
29538950179	708934804297	12	~2015
29538999943	295389999431	12	~2014
29539314179	59078628359	11	~2013
29543984579	236351876633	12	~2014
29544318691	1825...951039	14	2023
29544452879	236355623033	12	~2014
29545705751	59091411503	11	~2013
29548462211	59096924423	11	~2013
29549129633	177294777799	12	~2014
29551370747	236410965977	12	~2014
29552718131	59105436263	11	~2013
29559631151	768550409927	12	~2016
29565143711	59130287423	11	~2013
29565710711	59131421423	11	~2013
29566810319	59133620639	11	~2013
29568140999	59136281999	11	~2013
29569338371	59138676743	11	~2013
29569370471	59138740943	11	~2013
29569503611	59139007223	11	~2013
29569545287	236556362297	12	~2014
29569948787	236559590297	12	~2014

Exponent	Prime Factor	Dig.	Year
29572021499	59144042999	11	~2013
29572181363	59144362727	11	~2013
29574128891	59148257783	11	~2013
29574641639	59149283279	11	~2013
29575436963	59150873927	11	~2013
29575660199	59151320399	11	~2013
29577176221	177463057327	12	~2014
29578015079	59156030159	11	~2013
29581835351	59163670703	11	~2013
29582620657	177495723943	12	~2014
29583731003	59167462007	11	~2013
29584664471	59169328943	11	~2013
29586576119	59173152239	11	~2013
29586822283	295868222831	12	~2014
29588323991	59176647983	11	~2013
29590243799	59180487599	11	~2013
29591586599	59183173199	11	~2013
29595506411	59191012823	11	~2013
29596388819	59192777639	11	~2013
29597095103	59194190207	11	~2013
29597483183	59194966367	11	~2013
29597619127	295976191271	12	~2015
29599403551	295994035511	12	~2015
29599532581	177597195487	12	~2014
29600254357	177601526143	12	~2014

Exponent	Prime Factor	Dig.	Year
29600857127	236806857017	12	~2014
29601558893	177609353359	12	~2014
29602416329	236819330633	12	~2014
29603809223	59207618447	11	~2013
29604071177	236832569417	12	~2014
29604632891	236837063129	12	~2014
29606079991	296060799911	12	~2015
29606178551	59212357103	11	~2013
29607865019	59215730039	11	~2013
29610214619	59220429239	11	~2013
29611906153	177671436919	12	~2014
29612401811	59224803623	11	~2013
29614663277	177687979663	12	~2014
29616345683	59232691367	11	~2013
29619916559	59239833119	11	~2013
29620737791	59241475583	11	~2013
29620949723	59241899447	11	~2013
29623208399	59246416799	11	~2013
29623786571	236990292569	12	~2014
29624464091	59248928183	11	~2013
29625875779	296258757791	12	~2015
29628741539	59257483079	11	~2013
29629992347	533339862247	12	~2015
29630727299	59261454599	11	~2013
29632146311	59264292623	11	~2013

Exponent	Prime Factor	Dig.	Year
29633281823	59266563647	11	~2013
29635024319	59270048639	11	~2013
29637148529	237097188233	12	~2014
29637631703	59275263407	11	~2013
29637704339	59275408679	11	~2013
29641358897	237130871177	12	~2014
29644375879	533598765823	12	~2015
29644561811	237156494489	12	~2014
29646216863	59292433727	11	~2013
29648223791	59296447583	11	~2013
29649528841	474392461457	12	~2015
29649916151	59299832303	11	~2013
29654449261	177926695567	12	~2014
29655380819	59310761639	11	~2013
29655406331	59310812663	11	~2013
29656541399	59313082799	11	~2013
29659418249	415231855487	12	~2015
29660068499	59320136999	11	~2013
29660905919	59321811839	11	~2013
29663613503	59327227007	11	~2013
29663927873	177983567239	12	~2014
29665982653	177995895919	12	~2014
29666257763	59332515527	11	~2013
29668472153	178010832919	12	~2014
29668981877	237351855017	12	~2014

4.724.182 digits

25-04-13