What is a fourth degree polynomial function with real coefficients that has 2, -2 and -3i as zeros?

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What is a fourth degree polynomial function with real coefficients that has 2, -2 and -3i as zeros?

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Answer 1 · 2016-02-06T17:30:53

$f(x)=x^4+5x^2-36$

Explanation:

If $f(x)$ has zeroes at $2 and -2$
it will have $(x-2)(x+2)$ as factors.

If $f(x)$ has a zero at $-3i$
then $(x+3i)$ will be a factor
and we will need to use a fourth factor to "clear" the imaginary component from the coefficients.
(Remember we were told the polynomial was of degree 4 and has no imaginary components).

The most obvious fourth factor would be the complex conjugate of $(x+3i)$ , namely $(x-3i)$
and since $(x+3i)(x-3i) = x^2+9$

$f(x)=(x-2)(x+2)(x^2+9)$
which can be expanded to:
$f(x)=x^4+5x^2-36$

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What is a fourth degree polynomial function with real coefficients that has 2, -2 and -3i as zeros?

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