Step 1:

The series is $\"\"$ .

Limit comparison test: Suppose that $\"\"$ and $\"\"$ are series with positive terms if, $\"\"$ ,

where $\"\"$ is a finite number and $\"\"$ , then either both series are convergent or both divergent.

Consider $\"\"$ .

Find $\"\"$ .

$\"\"$

If $\"\"$ , then $\"\"$ .

$\"\"$

From the limit comparison test, both series are convergent or divergent.

Since the harmonic series $\"\"$ is convergent, then $\"\"$ is also converges by the limit comparison test.

Solution:

The series is $\"\"$ is convergent.