Let \(p(z), q(z) \)and \(r(z)\) be polynomials with complex coefficients in the complex plane. Suppose that \(|p(z)| + |q(z)| \leq |r(z)|\) for every \(z\). Show that there exist two complex numbers \( a,b \) such that \(|a|^2 +|b|^2 =1\) and \( a p(z) + bq(z) =0 \) for every \(z\).