Small Mersenne Prime Factors (page 4447/5025)

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
20501163671	41002327343	11	~2012
20501199401	164009595209	12	~2013
20502588971	41005177943	11	~2012
20503146101	164025168809	12	~2013
20504652719	41009305439	11	~2012
20505603143	41011206287	11	~2012
20505940913	123035645479	12	~2013
20507457653	123044745919	12	~2013
20508627239	41017254479	11	~2012
20509810019	41019620039	11	~2012
20510180843	41020361687	11	~2012
20510688371	41021376743	11	~2012
20511761843	41023523687	11	~2012
20512174583	41024349167	11	~2012
20512316771	41024633543	11	~2012
20512539731	41025079463	11	~2012
20512757231	41025514463	11	~2012
20513370851	41026741703	11	~2012
20516100179	41032200359	11	~2012
20516367719	41032735439	11	~2012
20516556023	41033112047	11	~2012
20518326131	41036652263	11	~2012
20518326827	164146614617	12	~2013
20518860337	492452648089	12	~2014
20518868761	123113212567	12	~2013

Exponent	Prime Factor	Dig.	Year
20520017647	205200176471	12	~2013
20520122039	41040244079	11	~2012
20520215777	123121294663	12	~2013
20520468481	328327495697	12	~2014
20521409387	164171275097	12	~2013
20522489639	41044979279	11	~2012
20522829053	123136974319	12	~2013
20522948597	123137691583	12	~2013
20523113423	41046226847	11	~2012
20523393563	41046787127	11	~2012
20524117931	41048235863	11	~2012
20524965743	41049931487	11	~2012
20525673173	123154039039	12	~2013
20526519911	41053039823	11	~2012
20527877939	41055755879	11	~2012
20528759243	41057518487	11	~2012
20530143479	41060286959	11	~2012
20530307117	123181842703	12	~2013
20530579799	41061159599	11	~2012
20531391539	41062783079	11	~2012
20532386999	164259095993	12	~2013
20532455759	41064911519	11	~2012
20532561041	123195366247	12	~2013
20532892141	123197352847	12	~2013
20533534271	41067068543	11	~2012

Exponent	Prime Factor	Dig.	Year
20533819151	41067638303	11	~2012
20535377123	41070754247	11	~2012
20535639851	41071279703	11	~2012
20536347401	164290779209	12	~2013
20536730999	41073461999	11	~2012
20539416563	41078833127	11	~2012
20540730383	41081460767	11	~2012
20541116501	123246699007	12	~2013
20541313679	41082627359	11	~2012
20542038851	41084077703	11	~2012
20542204979	41084409959	11	~2012
20542456391	41084912783	11	~2012
20542961711	41085923423	11	~2012
20543284319	164346274553	12	~2013
20543659931	41087319863	11	~2012
20544725563	205447255631	12	~2013
20546013329	164368106633	12	~2013
20547093023	41094186047	11	~2012
20547844201	123287065207	12	~2013
20548391663	41096783327	11	~2012
20550240239	41100480479	11	~2012
20551538159	41103076319	11	~2012
20551542359	41103084719	11	~2012
20551720463	41103440927	11	~2012
20551771159	205517711591	12	~2013

Exponent	Prime Factor	Dig.	Year
20552973671	41105947343	11	~2012
20554189441	123325136647	12	~2013
20559821699	41119643399	11	~2012
20559939437	123359636623	12	~2013
20560842749	493460225977	12	~2014
20561850839	41123701679	11	~2012
20562156539	41124313079	11	~2012
20562768203	41125536407	11	~2012
20563402991	41126805983	11	~2012
20563663537	123381981223	12	~2013
20563755761	164510046089	12	~2013
20564507219	41129014439	11	~2012
20564607263	41129214527	11	~2012
20565762803	41131525607	11	~2012
20565785879	41131571759	11	~2012
20565861601	123395169607	12	~2013
20566614157	123399684943	12	~2013
20566837493	123401024959	12	~2013
20566974671	164535797369	12	~2013
20567584571	41135169143	11	~2012
20567702471	41135404943	11	~2012
20567755823	41135511647	11	~2012
20568168443	41136336887	11	~2012
20568430331	41136860663	11	~2012
20569552739	41139105479	11	~2012

4.724.182 digits

25-04-13