%I #15 Oct 27 2019 11:12:38
%S 1,2,3,12,5,30,21,56,18,30,55,132,39,182,15,80,68,34,171,380,105,462,
%T 11,184,6,650,351,84,203,290,465,992,264,374,595,140,333,1406,741,520,
%U 205,574,903,1892,495,230,1081,2256,588,2450,1275,884,13,318,1485
%N Denominator of variance of first n primes.
%C Variance here is the sample variance unbiased estimator. - _Chai Wah Wu_, Mar 22 2018
%H Chai Wah Wu, <a href="/A301276/b301276.txt">Table of n, a(n) for n = 1..10000</a>
%H Joel E. Cohen, <a href="http://lab.rockefeller.edu/cohenje/assets/file/415PrimesTwinPrimesTaylorsLawAmStatistician2016.pdf">Statistics of Primes (and Probably Twin Primes) Satisfy Taylor’s Law from Ecology</a>, The American Statistician, 70 (2016), 399-404.
%e The variances are 0, 1/2, 7/3, 59/12, 64/5, 581/30, 649/21, 2287/56, 1001/18, 2443/30, 5669/55, 17915/132, 6665/39, 36637/182, 3529/15, 22413/80, 22813/68, 13065/34, 75865/171, 191819/380, 58778/105, 289013/462, 7627/11, 141973/184, 5213/6, 628001/650, ...
%p v := n -> 1/(n-1) * add((ithprime(i) add(ithprime(j),j=1..n)/n)^2, i=1..n );
%p v1:= [0, seq(v(n),n=2..70)];
%t a[n_] := If[n == 1, 1, Variance[Prime[Range[n]]] // Denominator];
%t a /@ Range[100] (* _Jean-François Alcover_, Oct 27 2019 *)
%o (Python)
%o from fractions import Fraction
%o from sympy import prime
%o mu, variance = Fraction(prime(1)), Fraction(0)
%o A301276_list = [variance.denominator]
%o for i in range(2,10001):
%o datapoint = prime(i)
%o newmu = mu+(datapoint-mu)/i
%o variance = (variance*(i-2) + (datapoint-mu)*(datapoint-newmu))/(i-1)
%o mu = newmu
%o A301275_list.append(variance.denominator) # _Chai Wah Wu_, Mar 22 2018
%Y Mean and variance of primes: A301273/A301274, A301275/A301276, A301277, A273462.
%K nonn,frac
%O 1,2
%A _N. J. A. Sloane_, Mar 18 2018