Coefficients of power series generated by the continued fraction-like form: A(x) = 1/(1 - x/sqrt(1 - 4x/cube-root(1 - 9x/4th-root(1 - 16x/5th-root(1 - 25x/... /n-th-root(1 - (n^2)x/...)))))), where n-th-root(z)=z^(1/n).
A075820
Coefficients of power series generated by the continued fraction-like form: A(x) = 1/(1 - x/sqrt(1 - 4x/cube-root(1 - 9x/4th-root(1 - 16x/5th-root(1 - 25x/... /n-th-root(1 - (n^2)x/...)))))), where n-th-root(z)=z^(1/n).
Terms
- a(0) =1a(1) =1a(2) =3a(3) =17a(4) =151a(5) =1901a(6) =31841a(7) =679243a(8) =17873349a(9) =566127595a(10) =21172659297a(11) =920475938637
External references
- oeis: A075820