Question

To solve the system of equations using the elimination method, we have:

1. \(-3x - 4y = -23\) (Equation 1)
2. \(3x - 5y = 5\) (Equation 2)

We can eliminate \(x\) by adding Equation 1 and Equation 2 together. First, we can rewrite Equation 1 for elimination:

Multiply Equation 2 by 1 (to keep it unchanged):

(Equation 1) \(-3x - 4y = -23\)
(Equation 2) \(3x - 5y = 5\)

Now, add both equations:

\[
(-3x - 4y) + (3x - 5y) = -23 + 5
\]

This results in:

\[
(-4y - 5y) = -18
\]
\[
-9y = -18
\]

Now, divide by \(-9\):

\[
y = 2
\]

Now that we have the value of \(y\), we can substitute it back into one of the original equations to find \(x\). Let's use Equation 2:

\[
3x - 5(2) = 5
\]

This simplifies to:

\[
3x - 10 = 5
\]

Adding 10 to both sides gives:

\[
3x = 15
\]

Dividing by 3 yields:

\[
x = 5
\]

Thus, the solution to the system of equations is \((5, 2)\).

The correct response is:

\((5, 2)\)