1 Answer

Kantura · Answer 1 · 2023-07-02T18:13:52+0000

From the problem, we have :

Set f(x) = 0 :

Add 32 to both sides of the equation :

$\begin{gathered} 32=x^2+8x-32+32 \\ 32=x^2+8x \end{gathered}$

Next is to add a number to both sides of the equation using the formula (b/2a)^2

That will be :

The equation will be :

$\begin{gathered} 32+16=x^2+8x+16 \\ 48=x^2+8x+16 \end{gathered}$

Take note that the right side of the equation is now a perfect square trinomial and we can factor it by :

$\begin{gathered} 48=x^2+8x+16 \\ 48=(x+4)^2 \\ (x+4)^2=48 \end{gathered}$

Take the square root of both sides :

$\begin{gathered} \sqrt[]{(x+4)^2}=\sqrt[]{48} \\ x+4=\pm4\sqrt[]{3} \end{gathered}$

Subtract 4 to both sides of the equation :

$\begin{gathered} x+4-4=-4\pm4\sqrt[]{3} \\ x=-4\pm4\sqrt[]{3} \end{gathered}$

Take note that zeros and x-intercepts are the same.

Therefore, the answer is :

A. The zeros and the x-intercepts are the same. They are -4 + 4√3 and -4 - 4√3

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