$\"\"$

$\"\"$ and $\"\"$ are series with positive terms.

Suppose that $\"\"$ and $\"\"$ converges.

From the definition of the limit of convergence there exist $\"\"$ such that $\"\"$ When $\"\"$ .

So $\"\"$ for $\"\"$ .

Which means $\"\"$ .

If $\"\"$ converges then so does $\"\"$ .

Hence by the comparision test $\"\"$ converges too.

$\"\"$

If $\"\"$ and $\"\"$ converges then the series $\"\"$ converges too.