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How do you find a polynomial function of lowest degree with rational coefficients that has the given number of some of it's zeros. -5i, 3?

1 Answer

Jul 27, 2015

$f (x) = (x - 5 i) (x + 5 i) (x - 3) = x^{3} - 3 x^{2} + 25 x - 75$ $f(x) = (x-5i)(x+5i)(x-3) = x^3-3x^2+25x-75$

Explanation:

If the coefficients are real (let alone rational), then any complex zeros will occur in conjugate pairs.

So the roots of $f (x) = 0$ $f(x) = 0$ are at least $\pm 5 i$ $+-5i$ and $3$ $3$ .

Hence

$f (x) = (x - 5 i) (x + 5 i) (x - 3)$ $f(x) = (x-5i)(x+5i)(x-3)$

$= (x^{2} + 25) (x - 3) = x^{3} - 3 x^{2} + 25 x - 75$ $= (x^2+25)(x-3)= x^3-3x^2+25x-75$

Any polynomial in $x$ $x$ with these zeros will be a multiple of $f (x)$ $f(x)$

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