How do you write a polynomial in standard form given zeros 8, -14, and 3 + 9i?

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How do you write a polynomial in standard form given zeros 8, -14, and 3 + 9i?

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Answer 1 · 2016-04-23T12:19:30

$x^{4} - 22 x^{2} - 10080 = 0$ $x^4-22x^2-10080=0$

Explanation:

Complex roots occur in conjugate pairs. So, the fourth root is $3 - 9 i$ $3-9i$ .

If $s_{1}, s_{2}, s_{3} and s_{4}$ $s_1,s_2, s_3 and s_4$ are the sums of the products of the roots, taken 1, 2, 3 and 4, at a time, respectively, the biquadratic equation has the form
$x^{4} - s_{1} x^{3} + s_{2} x^{2} - s_{3} x + s_{4} = 0$ $x^4-s_1x^3+s_2x^2-s_3x+s_4=0$ .

Here, $s_{1} = 0, s_{2} = - 22, s_{3} = 0 and s_{4} = - 10080$ $s_1=0, s_2=-22, s_3=0 and s_4=-10080$ .

So, the answer is $x^{4} - 22 x^{2} - 10080 = 0$ $x^4-22x^2-10080=0$ .

Note that the sum $3 \pm 9 i$ $3+-9i$ =0,
wherever it occurs in the terms of s-sums.

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How do you write a polynomial in standard form given zeros 8, -14, and 3 + 9i?

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