A series ∑an is said to 'converge' or to 'be convergent' when the
sequence SN of partial sums has a finite limit. If
the limit of SN is infinite or does not exist, the
series is said to diverge.
Let be 
the
general term of a convergent series. In this case is 
so
that 
... that's why the series of the 
never
converges.