Small Mersenne Prime Factors (page 4525/5070)

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
23987337323	47974674647	11	~2012
23988743959	239887439591	12	~2014
23989820399	47979640799	11	~2012
23990114767	239901147671	12	~2014
23990761979	47981523959	11	~2012
23990838299	47981676599	11	~2012
23991858959	47983717919	11	~2012
23992581323	767762602337	12	~2015
23995680083	47991360167	11	~2012
23996218357	143977310143	12	~2013
23997592739	47995185479	11	~2012
23998420111	431971561999	12	~2014
23998835851	383981373617	12	~2014
23999082479	47998164959	11	~2012
23999800457	143998802743	12	~2013
24000073451	48000146903	11	~2012
24000251111	48000502223	11	~2012
24001234921	144007409527	12	~2013
24001943711	48003887423	11	~2012
24002692403	48005384807	11	~2012
24005121131	48010242263	11	~2012
24005443043	48010886087	11	~2012
24006043079	48012086159	11	~2012
24007064759	48014129519	11	~2012
24007172879	192057383033	12	~2014

Exponent	Prime Factor	Dig.	Year
24007202003	48014404007	11	~2012
24007683971	48015367943	11	~2012
24008832143	48017664287	11	~2012
24008944577	720268337311	12	~2015
24010981499	48021962999	11	~2012
24011820803	48023641607	11	~2012
24012928021	144077568127	12	~2013
24012997807	432233960527	12	~2014
24013748071	240137480711	12	~2014
24015738023	48031476047	11	~2012
24015889559	48031779119	11	~2012
24016122323	48032244647	11	~2012
24018600323	48037200647	11	~2012
24018778739	48037557479	11	~2012
24019612873	144117677239	12	~2013
24020190119	48040380239	11	~2012
24020539943	48041079887	11	~2012
24021361883	48042723767	11	~2012
24021779219	48043558439	11	~2012
24021960877	144131765263	12	~2013
24022110971	48044221943	11	~2012
24022876991	48045753983	11	~2012
24023046059	48046092119	11	~2012
24025580003	48051160007	11	~2012
24025656097	144153936583	12	~2013

Exponent	Prime Factor	Dig.	Year
24026105783	48052211567	11	~2012
24028332479	48056664959	11	~2012
24028492913	576683829913	12	~2015
24029084879	48058169759	11	~2012
24029611043	48059222087	11	~2012
24030612779	48061225559	11	~2012
24030719039	48061438079	11	~2012
24030760619	48061521239	11	~2012
24031210823	48062421647	11	~2012
24033496937	144200981623	12	~2013
24033656459	48067312919	11	~2012
24034566851	48069133703	11	~2012
24035796359	48071592719	11	~2012
24035946041	144215676247	12	~2013
24036529739	48073059479	11	~2012
24037065979	240370659791	12	~2014
24037850891	48075701783	11	~2012
24038299499	192306395993	12	~2014
24038814853	384621037649	12	~2014
24039670559	48079341119	11	~2012
24039753323	48079506647	11	~2012
24040019411	48080038823	11	~2012
24044819651	48089639303	11	~2012
24045273839	48090547679	11	~2012
24048724751	48097449503	11	~2012

Exponent	Prime Factor	Dig.	Year
24050100479	48100200959	11	~2012
24050478923	48100957847	11	~2012
24050961853	384815389649	12	~2014
24054652679	48109305359	11	~2012
24054766031	48109532063	11	~2012
24054927647	192439421177	12	~2014
24056475011	48112950023	11	~2012
24056688251	48113376503	11	~2012
24059319421	144355916527	12	~2013
24059320583	48118641167	11	~2012
24059789681	2624...419711	15	2023
24061671923	48123343847	11	~2012
24061747331	48123494663	11	~2012
24062639483	48125278967	11	~2012
24063454313	336888360383	12	~2014
24065123473	144390740839	12	~2013
24066239473	529457268407	12	~2015
24066614953	144399689719	12	~2013
24067516223	48135032447	11	~2012
24067623659	48135247319	11	~2012
24067927223	48135854447	11	~2012
24068253479	48136506959	11	~2012
24071632709	337002857927	12	~2014
24071637371	48143274743	11	~2012
24071655659	48143311319	11	~2012

4.768.925 digits

25-05-04