Step 1:

The series is $\"\"$ .

The Comparison Test :

Suppose that $\"\"$ and $\"\"$ are series with positive terms. (i) If $\"\"$ is convergent and $\"\"$ for all n , then $\"\"$ is also convergent. (ii) If $\"\"$ is divergent and $\"\"$ for all n, then $\"\"$ is also divergent.

The dominant part of the numerator is $\"\"$ and the dominant part of the denominator is $\"\"$ .

Now compare the given series with the series $\"\"$ .

Observe that $\"\"$ .

Because the denominators are equal and numerator is 1 greater in $\"\"$ .

Step 2:

The obtained series is $\"\"$ .

$\"\"$

Definition of p - series :

The p - series $\"\"$ is convergent if $\"\"$ and divergent if $\"\"$ .

$\"\"$

It is divergent because $\"\"$ .

Therefore $\"\"$ is divergent by part (ii) of the Comparison Test.