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16 September, 06:26

If p (x) = x^3-3x^2-x+3 and p (3) = 0, what is a factor of p (x)

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  1. 16 September, 06:53
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    Answer: x-3

    Since p (3) = 0, this means x = 3 plugs into p (x) to get 0

    We can write p (x) as p (x) = (x-3) q (x) where q (x) is some other polynomial that multiplies with (x-3) to lead to x^3-3x^2-x+3

    Let's plug in x = 3 and see what happens

    p (x) = (x-3) q (x)

    p (3) = (3-3) q (3)

    p (3) = 0*q (3)

    p (3) = 0

    No matter what the result of q (3) was, it doesn't matter because it multiplies with 0 to get 0.

    The general rule is: if p (k) = 0, then x-k is a factor of p (x). This is a special case of the remainder theorem.
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