I'd appreciate some help with the following problem form Conway's book on functions of one complex variable:
Let $f$ be analytic in $\overline B (0;R)$ with $|f(z)|\le M$ for $|z|\le R$ and $|f(0)|=a>0$. Show that the number of zeros of f in $B(0;R/3)$ is less than or equal to $\frac{1}{\log(2)}\log\left(\frac M a\right)$
I know that the number of zeros is given by n = \frac 1 {2\pi i}\int_{|z|=R/3} \frac{f'}{f} \, dz
And there is a hint to look at $g(z) = f(z) \prod_{k=1}^n (1-z/z_k)^{-1}$, where the $z_k$ are the zeros of $f$. I have given it some time now, but don't seem to get anywhere. In particular I don't see how the logarithm, $M, a$ come into play. The problem is in the chapter on the maximum modulus theorem, if that's of any help.
Might someone maybe give me a hint?
Cheers, S.L.