If $ \tan\alpha =\frac{p}{q}$ then the equation reads $ \frac{2\tan\beta}{1-\tan^{2}\beta}=\frac{p(p^{2}-3q^{2})}{q(3p^{2}-q^{2})}$, solving to $ \tan\beta$ gives a quadratic with discriminant $ (p^{2}+q^{2})^{3}$, so $ \tan\beta\in\mathbb{Q}$ iff $ p^{2}+q^{2}$ is a rational square. But $ p^{2}+q^{2}$ is an integer, so is the square of an integer, QED.