I know that $y=kx$ is definitely a solution. Other solutions may be constructed by treating the real numbers as a vector field over the rational numbers, which are pathological.
Question: Is there such an $f$ having its graph dense in $\mathbb{R}^2$?
All non-linear (or "pathological") solutions have graphs that are dense in the plane. See, eg, this SEM overview article. Or this one.