Find all entire functions that satisfy following inequality $|f(z)|\leq|\cos(z)|$

Question

Find all entire functions $f(z)$ that satisfy $$|f(z)|\leq|\cos(z)|$$ for all $z\in \mathbb{C}.$

So the first thing that has crossed my mind is to apply Liouville´s Theorem, which would imply that our function has to be constant but I am struggling with calculating anything from this point on. I would appreciate any help!