Given $\ell\ge 1$, we say a graph $G$ is $\ell$-good if for each $u,v\in G$ (not necessarily distinct), the number of walks of length $\ell$ from $u$ to $v$ is odd. We say a graph $G$ is good if it is $\ell$-good for some $\ell\ge 1$. Do good graphs exist? For clarity, I am only talking about sim...