Factor Theorem
The Factor Theorem says that if is a polynomial, then is a factor of if .
Proof
If is a factor of , then , where is a polynomial with . Then .
Now suppose that .
Apply Remainder Theorem to get , where is a polynomial with and is the remainder polynomial such that . This means that can be at most a constant polynomial.
Substitute and get . Since is a constant polynomial, for all .
Therefore, , which shows that is a factor of .
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