Which of the following ordered pairs is NOT a solution to the linear equation: y= 4x - 3 *
To determine which of the given ordered pairs is not a solution to the linear equation y = 4x - 3, you need to plug in the x and y values from each ordered pair into the equation and check if the equation holds true.
Let's go through each ordered pair and evaluate it in the equation:
Ordered pair 1: (2, -5)
Plug in x = 2 and y = -5 into the equation:
-5 = 4(2) - 3
-5 = 8 - 3
-5 = 5
Since -5 is not equal to 5, the equation does not hold true for this ordered pair.
Ordered pair 2: (-1, -7)
Plug in x = -1 and y = -7 into the equation:
-7 = 4(-1) - 3
-7 = -4 - 3
-7 = -7
The equation holds true for this ordered pair.
Ordered pair 3: (0, -3)
Plug in x = 0 and y = -3 into the equation:
-3 = 4(0) - 3
-3 = 0 - 3
-3 = -3
The equation holds true for this ordered pair.
Ordered pair 4: (3, 11)
Plug in x = 3 and y = 11 into the equation:
11 = 4(3) - 3
11 = 12 - 3
11 = 9
Since 11 is not equal to 9, the equation does not hold true for this ordered pair.
Based on our evaluations, the ordered pair (2, -5) and (3, 11) are not solutions to the linear equation y = 4x - 3.