How do you write a polynomial in standard form given the zeros x=2, -6, and 2+ 4i?

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How do you write a polynomial in standard form given the zeros x=2, -6, and 2+ 4i?

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Answer 1 · 2017-09-19T10:56:17

$x^4-8x^2+128x-240$

Explanation:

$"given the zeros "x=a,x=b,x=c,x=d$

$"then the factors are "(x-a),(x-b),(x-c),(x-d)$

$"the polynomial is then the product of the factors"$

$p(x)=(x-a)(x-b)(x-c)(x-d)$

$"here one of the given zeros is complex " 2+4i$

$"complex zeros always occur in "color(blue)"conjugate pairs"$

$rArr2-4i" is also a zero of the polynomial"$

$"the four zeros are "x=2,x=-6,x=2+-4i$

$"4 zeros indicate a polynomial of degree 4"$

$rArrp(x)=(x-2)(x+6)(x-2-4i)(x-2+4i)$

$color(white)(rArrp(x))=(x^2+4x-12)(x^2-4x+20)$

$color(white)(rArrp(x))=x^4-8x^2+128x-240" possible polynomial"$

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How do you write a polynomial in standard form given the zeros x=2, -6, and 2+ 4i?

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