Small Mersenne Prime Factors (page 4388/5025)

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
16496987231	32993974463	11	~2011
16497177283	659887091321	12	~2014
16497241679	32994483359	11	~2011
16497450857	98984705143	11	~2012
16498003859	32996007719	11	~2011
16498010701	98988064207	11	~2012
16498838711	32997677423	11	~2011
16498843811	32997687623	11	~2011
16500067477	264001079633	12	~2013
16500879683	33001759367	11	~2011
16501304717	1316...164167	14	2023
16501498883	33002997767	11	~2011
16502160131	33004320263	11	~2011
16502799431	33005598863	11	~2011
16503051611	33006103223	11	~2011
16503114311	33006228623	11	~2011
16504025171	132032201369	12	~2012
16504931519	33009863039	11	~2011
16506079511	33012159023	11	~2011
16506131039	33012262079	11	~2011
16506241177	99037447063	11	~2012
16508351501	99050109007	11	~2012
16508498663	33016997327	11	~2011
16508793443	33017586887	11	~2011
16508836733	99053020399	11	~2012

Exponent	Prime Factor	Dig.	Year
16509241823	33018483647	11	~2011
16509613751	33019227503	11	~2011
16509693899	33019387799	11	~2011
16510017673	99060106039	11	~2012
16510311263	33020622527	11	~2011
16510556239	297190012303	12	~2013
16510615181	99063691087	11	~2012
16510768199	33021536399	11	~2011
16510940531	33021881063	11	~2011
16511620199	33023240399	11	~2011
16511991539	33023983079	11	~2011
16512776771	33025553543	11	~2011
16513703099	33027406199	11	~2011
16513868879	33027737759	11	~2011
16513955677	99083734063	11	~2012
16514105519	33028211039	11	~2011
16514384303	33028768607	11	~2011
16514716103	33029432207	11	~2011
16515012599	33030025199	11	~2011
16515232807	165152328071	12	~2013
16515509663	33031019327	11	~2011
16516370099	33032740199	11	~2011
16516799363	33033598727	11	~2011
16517490911	33034981823	11	~2011
16517605219	165176052191	12	~2013

Exponent	Prime Factor	Dig.	Year
16518044111	33036088223	11	~2011
16518340523	33036681047	11	~2011
16518500641	99111003847	11	~2012
16518694343	33037388687	11	~2011
16519247057	99115482343	11	~2012
16519383437	99116300623	11	~2012
16520462411	33040924823	11	~2011
16521793751	33043587503	11	~2011
16521851051	33043702103	11	~2011
16521936443	33043872887	11	~2011
16522490507	132179924057	12	~2012
16522580351	33045160703	11	~2011
16523060369	132184482953	12	~2012
16524379583	33048759167	11	~2011
16524918937	760146271103	12	~2014
16525412999	33050825999	11	~2011
16525943111	33051886223	11	~2011
16526774339	33053548679	11	~2011
16527119051	33054238103	11	~2011
16527291503	33054583007	11	~2011
16530210533	99181263199	11	~2012
16531242803	33062485607	11	~2011
16531700351	429824209127	12	~2014
16531944323	33063888647	11	~2011
16532382047	297582876847	12	~2013

Exponent	Prime Factor	Dig.	Year
16532797871	33065595743	11	~2011
16533449039	33066898079	11	~2011
16533758231	33067516463	11	~2011
16534434359	33068868719	11	~2011
16534799531	33069599063	11	~2011
16535672063	33071344127	11	~2011
16535855663	33071711327	11	~2011
16537416419	33074832839	11	~2011
16538834699	33077669399	11	~2011
16539680293	99238081759	11	~2012
16540663421	99243980527	11	~2012
16540744019	33081488039	11	~2011
16540975631	33081951263	11	~2011
16541532179	33083064359	11	~2011
16542012449	132336099593	12	~2012
16542107663	33084215327	11	~2011
16542225083	33084450167	11	~2011
16542567001	99255402007	11	~2012
16543343483	33086686967	11	~2011
16543600763	33087201527	11	~2011
16543878577	99263271463	11	~2012
16544491391	33088982783	11	~2011
16544650403	33089300807	11	~2011
16545659639	33091319279	11	~2011
16546350323	33092700647	11	~2011

4.724.182 digits

25-04-13