Real series/Ratio test/Fact/Proof

The convergence does not change (though the sum) when we change finitely many members of the series. Therefore, we can assume ${\displaystyle {}k_{0}=0}$. Moreover, we can assume that all ${\displaystyle {}a_{k}}$ are positive real numbers. Then

${\displaystyle {}a_{k}={\frac {a_{k}}{a_{k-1}}}\cdot {\frac {a_{k-1}}{a_{k-2}}}\cdots {\frac {a_{1}}{a_{0}}}\cdot a_{0}\leq a_{0}\cdot q^{k}\,.}$

Hence, the convergence follows from the comparison test and the convergence of the geometric series.