Small Mersenne Prime Factors (page 4598/5340)

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
14487720209	115901761673	12	~2012
14488186259	28976372519	11	~2010
14488321343	28976642687	11	~2010
14488617623	28977235247	11	~2010
14489717461	231835479377	12	~2013
14490220103	28980440207	11	~2010
14490565031	28981130063	11	~2010
14490572843	376754893919	12	~2013
14490856759	260835421663	12	~2013
14490901391	28981802783	11	~2010
14492035541	86952213247	11	~2012
14492196863	28984393727	11	~2010
14492550899	28985101799	11	~2010
14492694857	86956169143	11	~2012
14492771291	28985542583	11	~2010
14493058319	28986116639	11	~2010
14493453983	28986907967	11	~2010
14494218899	28988437799	11	~2010
14494715681	115957725449	12	~2012
14494825313	86968951879	11	~2012
14494943063	347878633513	12	~2013
14495387519	28990775039	11	~2010
14496252137	86977512823	11	~2012
14496298139	28992596279	11	~2010
14497117919	28994235839	11	~2010

Exponent	Prime Factor	Dig.	Year
14498053799	28996107599	11	~2010
14498401139	28996802279	11	~2010
14498864123	28997728247	11	~2010
14498936471	115991491769	12	~2012
14498952431	28997904863	11	~2010
14499308939	463977886049	12	~2013
14499320999	28998641999	11	~2010
14499415043	28998830087	11	~2010
14499878621	86999271727	11	~2012
14500138571	29000277143	11	~2010
14500479923	29000959847	11	~2010
14501142017	348027408409	12	~2013
14501286083	29002572167	11	~2010
14503265891	29006531783	11	~2010
14503353383	29006706767	11	~2010
14504788031	261086184559	12	~2013
14505043523	29010087047	11	~2010
14505548891	29011097783	11	~2010
14506129499	29012258999	11	~2010
14506515677	87039094063	11	~2012
14507560163	29015120327	11	~2010
14510509463	29021018927	11	~2010
14510875499	29021750999	11	~2010
14511006551	29022013103	11	~2010
14511010823	29022021647	11	~2010

Exponent	Prime Factor	Dig.	Year
14511890483	29023780967	11	~2010
14511896339	348285512137	12	~2013
14512747673	87076486039	11	~2012
14513180531	116105444249	12	~2012
14513185559	29026371119	11	~2010
14514771899	29029543799	11	~2010
14514817199	29029634399	11	~2010
14516129291	29032258583	11	~2010
14516533259	29033066519	11	~2010
14516556913	87099341479	11	~2012
14517003131	29034006263	11	~2010
14517440831	29034881663	11	~2010
14517501419	29035002839	11	~2010
14517527879	29035055759	11	~2010
14517698759	29035397519	11	~2010
14518261777	87109570663	11	~2012
14518448753	87110692519	11	~2012
14518553459	29037106919	11	~2010
14519909461	319438008143	12	~2013
14520040751	29040081503	11	~2010
14520131603	29040263207	11	~2010
14520725837	2434...383143	15	2025
14520925019	29041850039	11	~2010
14521179839	116169438713	12	~2012
14521270019	29042540039	11	~2010

Exponent	Prime Factor	Dig.	Year
14521319231	29042638463	11	~2010
14522023709	116176189673	12	~2012
14522137997	87132827983	11	~2012
14522598911	29045197823	11	~2010
14523315071	29046630143	11	~2010
14523357083	29046714167	11	~2010
14523401041	87140406247	11	~2012
14523859079	29047718159	11	~2010
14524290311	29048580623	11	~2010
14525366903	29050733807	11	~2010
14525956631	29051913263	11	~2010
14525957741	116207661929	12	~2012
14526930503	29053861007	11	~2010
14527369757	203383176599	12	~2012
14529029843	29058059687	11	~2010
14529418369	348706040857	12	~2013
14529968279	29059936559	11	~2010
14531497691	29062995383	11	~2010
14531941163	29063882327	11	~2010
14532205139	29064410279	11	~2010
14532373631	29064747263	11	~2010
14532397559	29064795119	11	~2010
14533231837	87199391023	11	~2012
14534034611	29068069223	11	~2010
14534518763	29069037527	11	~2010

5.037.460 digits

25-09-07