How do you write a polynomial in standard form given zeros 1,5,3-i?

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How do you write a polynomial in standard form given zeros 1,5,3-i?

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Answer 1 · 2016-04-14T14:57:02

$x^{4} - 12 x^{3} + 51 x^{2} - 70 x + 50 = 0$ $x^4-12x^3+51x^2-70x+50=0$ .

Explanation:

Complex roots occur in conjugate pairs. So, as $3 - i$ $3-i$ is a root, $3 + i$ $3+i$ is also a root.

The roots are 1, 5, $3 - i and 3 + i$ $3-i and 3+i$ .

The biquadratic having these as roots is in the form
$x^{4} - S_{1} x^{3} + S_{2} x^{2} - S_{3} x + S_{4} = 0$ $x^4-S_1 x^3 + S_2 x^2-S_3x+S_4=0$ , where
$S_{1} = \sum$ $S_1=sum$ (roots) = 12,
$S_{2} = \sum$ $S_2=sum$ (products of the roots, taken two at a time) = 51,
$S_{3} = \sum$ $S_3=sum$ (product of the roots, taken three at a time) = 70
and $S_{4} =$ $S_4=$ product of all the roots =50.

Alternative method:

The factors of the polynomial are $x - 1, x - 5, ((x - (3 - i)) and (x - (3 + i))$ $x-1, x - 5, ((x-(3-i)) and (x-(3+i))$ .
The biquadratic equation is

$(x - 1) (x - 3) ({(x - 3)}^{2} + 1) = 0$ $(x-1)(x-3)((x-3)^2+1)=0$ .

Expand and write the terms, in the order of descending powers of x.
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How do you write a polynomial in standard form given zeros 1,5,3-i?

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