# $f \in L^p$ for $1\le p c||f||_p\}\Big) \le \frac{1}{c^p} \ \forall c>0$

$$f \in L^p$$ for $$1\le p < \infty$$. The measure space is $$(\Omega, \mathcal{A}, \mu)$$.

How can I show that

$$\mu\Big(\{x \in \Omega:|f(x)|>c||f||_p\}\Big) \le \frac{1}{c^p} \ \forall c>0$$