Question

-2\left(-2x - 2y = -24\
ight)
-2\left(-3x - 2y = -33\
ight)

4x + 4y = 48
6x + 4y = 66
\overline{x + 0y = 9}

solve for x:
\boldsymbol{x = 9}
\boldsymbol{x = 9}

plug in \boldsymbol{x = 9} into either equation and solve for \boldsymbol{y}
-2x - 2y = -24 or -3x - 2y = -33
\boldsymbol{y = 3}

final solution coordinate: \left(\quad, \quad\
ight) \boxed{try}

Explanation:

Step1: Identify x and y values

From the solution, we found that \( x = 9 \) and \( y = 3 \).

Step2: Form the coordinate

A coordinate is in the form \( (x, y) \), so substituting the values of \( x \) and \( y \), we get the coordinate \( (9, 3) \).

Answer:

\((9, 3)\)