$|f (z)|$ can reach its minimum value at an interior point when the minimum value is zero.

Question

Show that $|f (z)|$ can reach its minimum value at an interior point when the minimum value is zero.

Can someone provide any method to do this?

I have proved the fact $|f (z)|$ has a minimum value $m$ in $R$ which occurs on the boundary of $R$ and never in the interior.