You've just proven that the coefficient in of $x^r$ in $f(x)$ is $(r^2+1)$ where $f(x)$ is that ugly fraction.

That is, you've shown $f(x) =\frac{1-x+2x^2}{(1-x)^3}= (0^2+1) + (1^2 +1)x + (2^2 + 1)x^2 + \cdots + (r^2+1)x^r+ \cdots$

Can you see what happens if we put $x=1/2$ in...? What's $f(1/2)$?