Small Mersenne Prime Factors (page 4380/5025)

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
16004181133	96025086799	11	~2012
16005444487	256087111793	12	~2013
16005693503	32011387007	11	~2011
16006306859	32012613719	11	~2011
16008658163	32017316327	11	~2011
16009083119	32018166239	11	~2011
16009666163	32019332327	11	~2011
16009868111	32019736223	11	~2011
16009988957	128079911657	12	~2012
16010587643	32021175287	11	~2011
16010849363	32021698727	11	~2011
16011434423	32022868847	11	~2011
16012188119	32024376239	11	~2011
16012897931	32025795863	11	~2011
16013064737	96078388423	11	~2012
16013694491	32027388983	11	~2011
16014652561	96087915367	11	~2012
16016952179	32033904359	11	~2011
16017033959	128136271673	12	~2012
16017345959	32034691919	11	~2011
16017441197	128139529577	12	~2012
16018003051	288324054919	12	~2013
16019268107	128154144857	12	~2012
16020225161	96121350967	11	~2012
16021404383	384513705193	12	~2013

Exponent	Prime Factor	Dig.	Year
16021671719	32043343439	11	~2011
16023487523	32046975047	11	~2011
16023625811	32047251623	11	~2011
16024756283	32049512567	11	~2011
16025044583	32050089167	11	~2011
16025368043	32050736087	11	~2011
16026433751	32052867503	11	~2011
16026595499	32053190999	11	~2011
16026814691	32053629383	11	~2011
16027176131	32054352263	11	~2011
16028523473	96171140839	11	~2012
16028609099	32057218199	11	~2011
16029834127	160298341271	12	~2012
16030408871	32060817743	11	~2011
16030794491	32061588983	11	~2011
16031292659	32062585319	11	~2011
16032235139	32064470279	11	~2011
16033582343	32067164687	11	~2011
16034125571	32068251143	11	~2011
16034316359	32068632719	11	~2011
16034384117	96206304703	11	~2012
16036069793	96216418759	11	~2012
16037851241	96227107447	11	~2012
16038028703	32076057407	11	~2011
16038101269	481143038071	12	~2014

Exponent	Prime Factor	Dig.	Year
16038744641	96232467847	11	~2012
16040994659	32081989319	11	~2011
16041607823	673747528567	12	~2014
16041689291	32083378583	11	~2011
16041860167	1175...024111	15	2023
16041934877	128335479017	12	~2012
16042655831	32085311663	11	~2011
16042980599	32085961199	11	~2011
16043206897	96259241383	11	~2012
16043265241	96259591447	11	~2012
16043670163	160436701631	12	~2012
16044127289	224617782047	12	~2013
16044165323	32088330647	11	~2011
16045216841	96271301047	11	~2012
16045642451	32091284903	11	~2011
16045960979	1569...837463	14	2023
16046087231	32092174463	11	~2011
16046497451	32092994903	11	~2011
16047291791	32094583583	11	~2011
16048868441	96293210647	11	~2012
16049052991	160490529911	12	~2012
16049112791	32098225583	11	~2011
16049911571	128399292569	12	~2012
16050172091	32100344183	11	~2011
16050265691	32100531383	11	~2011

Exponent	Prime Factor	Dig.	Year
16050288203	32100576407	11	~2011
16050692767	160506927671	12	~2012
16051783717	96310702303	11	~2012
16051920959	32103841919	11	~2011
16052490061	256839840977	12	~2013
16053186923	32106373847	11	~2011
16053824201	128430593609	12	~2012
16056089303	32112178607	11	~2011
16056455537	96338733223	11	~2012
16056874313	96341245879	11	~2012
16057190297	224800664159	12	~2013
16057283531	32114567063	11	~2011
16057302491	32114604983	11	~2011
16057663943	32115327887	11	~2011
16058103371	32116206743	11	~2011
16059309611	32118619223	11	~2011
16059675623	32119351247	11	~2011
16060410851	32120821703	11	~2011
16060536491	32121072983	11	~2011
16060772639	32121545279	11	~2011
16060862651	32121725303	11	~2011
16061129891	32122259783	11	~2011
16061174471	32122348943	11	~2011
16063127471	32126254943	11	~2011
16063393883	32126787767	11	~2011

4.724.182 digits

25-04-13