1 Answer

Charlie Morton · Answer 1 · 2023-09-22T15:33:41+0000

The given equation is

We will simplify each side at first by multiply the brackets on the right side and multiply the common factor by the bracket on the left side

$\begin{gathered} x(5x)-x(5)=(5x)(x)+5x(-4)+(9)(x)+(9)(-4) \\ 5x^2-5x=5x^2-20x+9x-36 \end{gathered}$

Now, we will add the like terms on each side

$\begin{gathered} 5x^2-5x=5x^2+(-20x+9x)-36 \\ 5x^2-5x=5x^2-11x-36 \end{gathered}$

Subtract both sides by 5x^2

$\begin{gathered} 5x^2-5x^2-5x=5x^2-5x^2-11x-36 \\ -5x=-11x-36 \end{gathered}$

Add 11x to both sides

$\begin{gathered} -5x+11x=-11x+11x-36 \\ 6x=-36 \end{gathered}$

Divide both sides by 6

$\begin{gathered} (6x)/(6)=-(36)/(6) \\ x=-6 \end{gathered}$

The solution set is {-6}

The answer is A

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