Small Mersenne Prime Factors (page 4658/5025)

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
48066208061	384529664489	12	~2016
48068065361	384544522889	12	~2016
48069925811	96139851623	11	~2014
48069983471	96139966943	11	~2014
48070533911	96141067823	11	~2014
48072232123	769155713969	12	~2017
48072294131	96144588263	11	~2014
48076868891	96153737783	11	~2014
48078947123	96157894247	11	~2014
48079308443	96158616887	11	~2014
48082130027	384657040217	12	~2016
48085106123	96170212247	11	~2014
48086378519	96172757039	11	~2014
48088334137	288530004823	12	~2016
48090584303	96181168607	11	~2014
48091512017	384732096137	12	~2016
48094156091	96188312183	11	~2014
48096502073	288579012439	12	~2016
48097715903	96195431807	11	~2014
48100335389	384802683113	12	~2016
48105262133	288631572799	12	~2016
48108189127	481081891271	12	~2016
48108664379	96217328759	11	~2014
48108862199	96217724399	11	~2014
48110274071	96220548143	11	~2014

Exponent	Prime Factor	Dig.	Year
48110805037	1529...001767	14	2023
48112636679	96225273359	11	~2014
48115882091	384927056729	12	~2016
48118057199	96236114399	11	~2014
48118463819	96236927639	11	~2014
48119525999	96239051999	11	~2014
48120094093	769921505489	12	~2017
48124115183	96248230367	11	~2014
48128520491	96257040983	11	~2014
48129656699	96259313399	11	~2014
48130278023	96260556047	11	~2014
48133629913	770138078609	12	~2017
48135914483	96271828967	11	~2014
48139253819	96278507639	11	~2014
48141230999	96282461999	11	~2014
48144951343	481449513431	12	~2016
48147961919	96295923839	11	~2014
48149229959	96298459919	11	~2014
48154896481	288929378887	12	~2016
48155299943	96310599887	11	~2014
48156895253	288941371519	12	~2016
48157860659	96315721319	11	~2014
48158155631	96316311263	11	~2014
48158857739	96317715479	11	~2014
48159169343	96318338687	11	~2014

Exponent	Prime Factor	Dig.	Year
48163607161	288981642967	12	~2016
48164736131	96329472263	11	~2014
48166759103	96333518207	11	~2014
48175485103	481754851031	12	~2016
48175654379	96351308759	11	~2014
48177135059	96354270119	11	~2014
48177221843	96354443687	11	~2014
48181850243	96363700487	11	~2014
48182407499	96364814999	11	~2014
48183449459	96366898919	11	~2014
48183644423	96367288847	11	~2014
48184751819	96369503639	11	~2014
48186126619	481861266191	12	~2016
48187160519	96374321039	11	~2014
48187703743	771003259889	12	~2017
48188542823	96377085647	11	~2014
48192271931	96384543863	11	~2014
48205226519	96410453039	11	~2014
48206739683	96413479367	11	~2014
48207411611	96414823223	11	~2014
48208322663	96416645327	11	~2014
48210927311	96421854623	11	~2014
48211156319	96422312639	11	~2014
48211421081	385691368649	12	~2016
48212768819	96425537639	11	~2014

Exponent	Prime Factor	Dig.	Year
48213046559	96426093119	11	~2014
48213258077	385706064617	12	~2016
48215892007	482158920071	12	~2016
48219027161	385752217289	12	~2016
48219406979	96438813959	11	~2014
48222957119	96445914239	11	~2014
48227258399	96454516799	11	~2014
48229387403	96458774807	11	~2014
48232956599	96465913199	11	~2014
48235508003	96471016007	11	~2014
48236002319	96472004639	11	~2014
48237114521	385896916169	12	~2016
48237580043	96475160087	11	~2014
48241055171	385928441369	12	~2016
48243710171	96487420343	11	~2014
48245657171	96491314343	11	~2014
48248070971	96496141943	11	~2014
48249678299	96499356599	11	~2014
48251236751	96502473503	11	~2014
48252744689	386021957513	12	~2016
48257155343	96514310687	11	~2014
48257864339	96515728679	11	~2014
48259827431	386078619449	12	~2016
48263137271	96526274543	11	~2014
48263396663	96526793327	11	~2014

4.724.182 digits

25-04-13