How do you write a polynomial function of least degree that has real coefficients, the following given zeros -5,2,-2 and a leading coefficient of 1?

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How do you write a polynomial function of least degree that has real coefficients, the following given zeros -5,2,-2 and a leading coefficient of 1?

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Answer 1 · 2016-06-28T20:43:20

The required polynomial is $P(x)=x^3+5x^2-4x-20$ .

Explanation:

We know that: if $a$ is a zero of a real polynomial in $x$ (say), then $x-a$ is the factor of the polynomial.

Let $P(x)$ be the required polynomial.

Here $-5,2,-2$ are the zeros of required polynomial.
$implies {x-(-5)},(x-2)$ and ${x-(-2)}$ are the factors of the required polynomial.
$implies P(x)=(x+5)(x-2)(x+2)=(x+5)(x^2-4)$
$implies P(x)=x^3+5x^2-4x-20$

Hence, the required polynomial is $P(x)=x^3+5x^2-4x-20$

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How do you write a polynomial function of least degree that has real coefficients, the following given zeros -5,2,-2 and a leading coefficient of 1?

1 Answer

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