Small Mersenne Prime Factors (page 4394/5025)

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
16856466749	134851733993	12	~2012
16858335911	33716671823	11	~2011
16859631157	101157786943	12	~2012
16859811263	33719622527	11	~2011
16860008833	101160052999	12	~2012
16860755603	33721511207	11	~2011
16860855353	101165132119	12	~2012
16861060763	33722121527	11	~2011
16861199339	33722398679	11	~2011
16862367239	33724734479	11	~2011
16862514961	101175089767	12	~2012
16862862977	101177177863	12	~2012
16863133823	33726267647	11	~2011
16864089091	168640890911	12	~2013
16865516939	33731033879	11	~2011
16866117533	101196705199	12	~2012
16866574139	33733148279	11	~2011
16866928511	33733857023	11	~2011
16867363979	33734727959	11	~2011
16868382683	33736765367	11	~2011
16868740859	33737481719	11	~2011
16869486131	33738972263	11	~2011
16869669983	33739339967	11	~2011
16871804597	236205264359	12	~2013
16871988911	33743977823	11	~2011

Exponent	Prime Factor	Dig.	Year
16873082483	33746164967	11	~2011
16873296383	33746592767	11	~2011
16873349777	236226896879	12	~2013
16873467311	33746934623	11	~2011
16873738163	33747476327	11	~2011
16874065783	168740657831	12	~2013
16874858081	101249148487	12	~2012
16875177983	33750355967	11	~2011
16875277283	33750554567	11	~2011
16875683339	33751366679	11	~2011
16875860231	33751720463	11	~2011
16876075897	270017214353	12	~2013
16876207619	33752415239	11	~2011
16877182739	33754365479	11	~2011
16878127733	101268766399	12	~2012
16878357487	168783574871	12	~2013
16878736103	33757472207	11	~2011
16878857003	33757714007	11	~2011
16879830263	33759660527	11	~2011
16881946331	33763892663	11	~2011
16881972251	33763944503	11	~2011
16882713781	101296282687	12	~2012
16882914011	33765828023	11	~2011
16883180159	33766360319	11	~2011
16883331917	101299991503	12	~2012

Exponent	Prime Factor	Dig.	Year
16883430017	101300580103	12	~2012
16883847503	33767695007	11	~2011
16885404383	33770808767	11	~2011
16886325931	168863259311	12	~2013
16886589563	33773179127	11	~2011
16887058691	33774117383	11	~2011
16887101327	135096810617	12	~2012
16888446013	101330676079	12	~2012
16888483919	33776967839	11	~2011
16889424659	33778849319	11	~2011
16890011483	33780022967	11	~2011
16890781151	33781562303	11	~2011
16891557803	33783115607	11	~2011
16892539343	33785078687	11	~2011
16893129839	135145038713	12	~2012
16894282403	33788564807	11	~2011
16894803659	405475287817	12	~2014
16896033503	33792067007	11	~2011
16896331631	135170653049	12	~2012
16896501491	33793002983	11	~2011
16896743711	33793487423	11	~2011
16897643111	33795286223	11	~2011
16898255579	33796511159	11	~2011
16898939921	101393639527	12	~2012
16900448633	101402691799	12	~2012

Exponent	Prime Factor	Dig.	Year
16900638701	101403832207	12	~2012
16901051543	33802103087	11	~2011
16901233717	101407402303	12	~2012
16901830259	33803660519	11	~2011
16903410323	33806820647	11	~2011
16903461983	33806923967	11	~2011
16903616183	33807232367	11	~2011
16903897799	33807795599	11	~2011
16904271127	270468338033	12	~2013
16904370551	33808741103	11	~2011
16904588381	135236707049	12	~2012
16908800081	101452800487	12	~2012
16909207559	33818415119	11	~2011
16911165119	33822330239	11	~2011
16912531019	33825062039	11	~2011
16913619971	135308959769	12	~2012
16914692681	101488156087	12	~2012
16914905723	33829811447	11	~2011
16917000791	33834001583	11	~2011
16918081259	33836162519	11	~2011
16919292443	33838584887	11	~2011
16919543999	33839087999	11	~2011
16920221039	33840442079	11	~2011
16920577811	135364622489	12	~2012
16920873419	33841746839	11	~2011

4.724.182 digits

25-04-13