Determine which ordered pair is a solution of y = 2x - 3

(–2, 7)
(0, 3)
(–4, –11)
(5, –7)

Substitute the values into the equation to see which one works.

To determine which ordered pair is a solution of the given equation y = 2x - 3, you need to substitute the x and y values from each ordered pair into the equation and see if the equation holds true.

Let's go through each ordered pair:

1. (–2, 7):
Substituting x = -2 and y = 7 into the equation, we get:
7 = 2*(-2) - 3
7 = -4 - 3
7 = -7 (This is false)
So, (–2, 7) is not a solution of y = 2x - 3.

2. (0, 3):
Substituting x = 0 and y = 3 into the equation, we get:
3 = 2*0 - 3
3 = -3 (This is false)
So, (0, 3) is not a solution of y = 2x - 3.

3. (–4, –11):
Substituting x = -4 and y = -11 into the equation, we get:
-11 = 2*(-4) - 3
-11 = -8 - 3
-11 = -11 (This is true)
So, (–4, –11) is a solution of y = 2x - 3.

4. (5, –7):
Substituting x = 5 and y = -7 into the equation, we get:
-7 = 2*5 - 3
-7 = 10 - 3
-7 = 7 (This is false)
So, (5, –7) is not a solution of y = 2x - 3.

Therefore, the ordered pair (–4, –11) is the solution of the equation y = 2x - 3.