Ind the solution of the system of equations. - 9x – 5y = -18 4x + 5y = 33 Submit Answer

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asked Aug 9, 2023 69.2k views

1 Answer

Drdwilcox · Answer 1 · 2023-08-15T15:11:06+0000

We are given the following system of equations:

$\begin{gathered} -9x-5y=-18,\text{ (1)} \\ 4x+5y=33,\text{ (2)} \end{gathered}$

We are asked to solve the system, to do that we can solve for "y" in equation (1), and replace that value in equation (2), like this.

adding 9x on both sides

$\begin{gathered} -9x+9x-5y=-18+9x \\ -5y=-18+9x \end{gathered}$

dividing by -5 on both sides:

replacing this value of "y" in equation (2) we get:

$\begin{gathered} 4x+5y=33 \\ 4x+5((-18+9x)/(-5))=33 \end{gathered}$

Simplifying we get:

adding like terms:

subtracting 18 on both sides

$\begin{gathered} -5x+18-18=33-18 \\ -5x=15 \end{gathered}$

dividing by -5 on both sides:

Now we can find the value of "y" replacing the value of "x" that we have found, like this:

Solving the operations:

Therefore, the solution of the system is x = -3 and y = 9