Let a be $a$ be a real number such that $0<a<1$ find $\begin{align} \sum_{k=0}^{\infty}ka^k \end{align}$
I know that
$a^0+a^1+...+a^\infty = \frac{1}{1-a}$
By stretching it as follows
$\begin{align} \sum_{k=0}^{\infty}ka^k= \\a^1+a^2+a^3...+a^\infty \\+a^2+a^3+a^4...+a^\infty \\+a^3+a^4+a^5...+a^\infty \\ .\\.\\.\\+a^\infty \\= \sum_{k=1}^{\infty}\frac{a^k}{1-a} \\ = \frac{a}{(1-a)^2}\end{align}$
Writing it a little better,
$\begin{align} \sum_{k=0}^{\infty}ka^k= \end{align}$ $\begin{gather} a^1\rightarrow a^\infty+\\a^2\rightarrow a^\infty+\\ \downarrow \\a^\infty \end{gather}\\$$\begin{align}=\sum_{k=1}^\infty\frac{a^k}{1-a}= \frac{a}{(1-a)^2}\end{align}$
How to formalize this stuff?