Small Mersenne Prime Factors (page 4498/5025)

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
24890477453	149342864719	12	~2013
24891485039	199131880313	12	~2014
24891962939	49783925879	11	~2012
24892214129	597413139097	12	~2015
24892282991	49784565983	11	~2012
24892756331	49785512663	11	~2012
24893831639	49787663279	11	~2012
24894318983	49788637967	11	~2012
24894484787	199155878297	12	~2014
24895192417	149371154503	12	~2013
24895261957	149371571743	12	~2013
24895443539	49790887079	11	~2012
24895958963	49791917927	11	~2012
24896589491	49793178983	11	~2012
24897016483	248970164831	12	~2014
24897066893	149382401359	12	~2013
24897644641	398362314257	12	~2014
24898337231	49796674463	11	~2012
24899582651	49799165303	11	~2012
24899884001	149399304007	12	~2013
24902338319	49804676639	11	~2012
24905202659	49810405319	11	~2012
24905630303	49811260607	11	~2012
24905976713	149435860279	12	~2013
24906644167	398506306673	12	~2014

Exponent	Prime Factor	Dig.	Year
24907182743	49814365487	11	~2012
24907559051	49815118103	11	~2012
24910873103	49821746207	11	~2012
24911049253	149466295519	12	~2013
24913671899	49827343799	11	~2012
24914159411	49828318823	11	~2012
24914274023	49828548047	11	~2012
24916042373	597985016953	12	~2015
24916309559	49832619119	11	~2012
24917080679	49834161359	11	~2012
24918498797	149510992783	12	~2013
24919584779	49839169559	11	~2012
24920893163	49841786327	11	~2012
24923051897	199384415177	12	~2014
24923098283	49846196567	11	~2012
24924024371	49848048743	11	~2012
24924272039	49848544079	11	~2012
24924676583	49849353167	11	~2012
24925754279	49851508559	11	~2012
24926026571	49852053143	11	~2012
24929319983	49858639967	11	~2012
24929416931	49858833863	11	~2012
24930376199	49860752399	11	~2012
24931364999	49862729999	11	~2012
24932698943	49865397887	11	~2012

Exponent	Prime Factor	Dig.	Year
24933550331	49867100663	11	~2012
24934730917	149608385503	12	~2013
24934756211	49869512423	11	~2012
24935012363	49870024727	11	~2012
24935251391	199482011129	12	~2014
24935828849	199486630793	12	~2014
24936313511	49872627023	11	~2012
24937454897	199499639177	12	~2014
24937597463	49875194927	11	~2012
24939915719	49879831439	11	~2012
24940610081	149643660487	12	~2013
24941986561	149651919367	12	~2013
24942447841	149654687047	12	~2013
24943070783	49886141567	11	~2012
24944691179	199557529433	12	~2014
24945704879	49891409759	11	~2012
24950200211	49900400423	11	~2012
24951603979	249516039791	12	~2014
24952427723	49904855447	11	~2012
24952703459	49905406919	11	~2012
24954495263	648816876839	12	~2015
24954885233	349368393263	12	~2014
24955709743	249557097431	12	~2014
24956643083	49913286167	11	~2012
24957050159	49914100319	11	~2012

Exponent	Prime Factor	Dig.	Year
24958399223	49916798447	11	~2012
24959139503	49918279007	11	~2012
24959727263	49919454527	11	~2012
24962833751	49925667503	11	~2012
24963483899	49926967799	11	~2012
24965104211	49930208423	11	~2012
24968622599	49937245199	11	~2012
24969948953	149819693719	12	~2013
24970021633	149820129799	12	~2013
24971115493	399537847889	12	~2014
24971240531	49942481063	11	~2012
24972798899	49945597799	11	~2012
24972981973	149837891839	12	~2013
24973350119	49946700239	11	~2012
24973606319	49947212639	11	~2012
24973874351	49947748703	11	~2012
24976114763	49952229527	11	~2012
24978105671	49956211343	11	~2012
24978374951	49956749903	11	~2012
24979284899	49958569799	11	~2012
24980233919	49960467839	11	~2012
24980238611	49960477223	11	~2012
24980371043	49960742087	11	~2012
24982127593	149892765559	12	~2013
24982287251	49964574503	11	~2012

4.724.182 digits

25-04-13