25672050625

domain: N

Appears in sequences

a(n) = denominator of r(n): r(n) is such that the continued fraction (of rational terms) [r(1);r(2),...,r(n)] = n^2, for every positive integer n.at n=16A128561
a(n) = denominator of rational fraction of function Gamma[5/4]^2 Gamma[n + 3/4]^2/(Gamma[3/4]^2 Gamma[n + 5/4]^2).at n=7A276240
a(n) = denominator of rational fraction of function Gamma[5/4]^2 Gamma[n + 3/4]^2/(Gamma[3/4]^2 Gamma[n + 5/4]^2).at n=8A276240