Let $P$ be a degree $3$ polynomial with complex coefficients such that the constant term is $2010$. Then $P$ has a root a with $|a| > 10$.
how can i show that above statement is true/false.can help anyone?
Let $P$ be a degree $3$ polynomial with complex coefficients such that the constant term is $2010$. Then $P$ has a root a with $|a| > 10$.
how can i show that above statement is true/false.can help anyone?