Question

How do you test the series `Sigma n/((n+1)(n^2+1))` from n is `[0,oo)` for convergence?

Answer 1

The series:

`sum_(n=0)^oo n/((n+1)(n^2+1))`

is convergent.

Explanation:

You can test it by direct comparison, considering that for `n>1`:

`0 < n/((n+1)(n^2+1)) < n/n^3 = 1/n^2`

As the series:

`sum_(n=0)^oo 1/n^2`

is convergent based on the p-series test, then also the series:

`sum_(n=0)^oo n/((n+1)(n^2+1))`

is convergent.