Let P(z) = z" +am-12"-1 + ... + a1z + ao be a polynomial of degree n 2 1 with a; # 0 for at %3D least one i. Prove that there exists a point z* such that 2*| = 1 and |P(z*)| > 1.

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8. Let f be an entire function such that |f(z)| < A + B\z|" for all z € C, where A and B are positive real constants and n is a fixed non-negative integer. Show that f is a polynomial of degree at most n. 9. Let P(z) = z" + an-12n-1 + ..+ a1z + ao be a polynomial of degree n > 1 with a; # 0 for at least one i. Prove that there exists a point z* such that 2*| = 1 and |P(z*)| > 1.