Question

How do you test for convergence of `Sigma (-1)^n n^(-1/n)` from `n=[1,oo)`?

Answer 1

The series:

`sum_(n=1)^oo(-1)^n n^(-1/n)`

is not convergent.

Explanation:

A necessary condition for the series to converge is that:

`lim_(n->oo) a_n = 0`

For this series:

`a_n = (-1)^n n^(-1/n) = (-1)^n e^ln(n^(-1/n)) = (-1)^n e^(-lnn/n)`

so:

`lim_(n->oo) abs (a_n) = lim_(n->oo) e^(-lnn/n)`

and as `e^x` is continuous:

`lim_(n->oo) abs (a_n) = e^(lim_(n->oo) (-lnn/n)) = e^0 = 1`

Consequently:

`lim_(n->oo) a_n !=0`

which means the series is not convergent.