Graph the linear equation y = 2x - 3.
Graph A. (0, -1) (1, -3)
Graph B. (1, 5) (0, 3)
Graph C. (1, -1) (0, -3)
Graph D. (1, 4) (0, 1)
3 answers
Sorry, I cannot graph the equations for you as I am a text-based AI and do not have the capability to draw graphs. I can provide instructions on how to graph the equation if you would like.
Which graph is right?
To determine which graph is correct, we can substitute the given points into the equation y = 2x - 3 and see if they satisfy the equation.
A. (0, -1):
y = 2(0) - 3
y = -3
-3 does not equal -1, so this point does not satisfy the equation.
B. (1, 5):
y = 2(1) - 3
y = 2 - 3
y = -1
-1 does not equal 5, so this point does not satisfy the equation.
C. (1, -1):
y = 2(1) - 3
y = 2 - 3
y = -1
-1 equals -1, so this point satisfies the equation.
D. (1, 4):
y = 2(1) - 3
y = 2 - 3
y = -1
-1 does not equal 4, so this point does not satisfy the equation.
Based on the calculations above, the correct graph is C. (1, -1) (0, -3).
A. (0, -1):
y = 2(0) - 3
y = -3
-3 does not equal -1, so this point does not satisfy the equation.
B. (1, 5):
y = 2(1) - 3
y = 2 - 3
y = -1
-1 does not equal 5, so this point does not satisfy the equation.
C. (1, -1):
y = 2(1) - 3
y = 2 - 3
y = -1
-1 equals -1, so this point satisfies the equation.
D. (1, 4):
y = 2(1) - 3
y = 2 - 3
y = -1
-1 does not equal 4, so this point does not satisfy the equation.
Based on the calculations above, the correct graph is C. (1, -1) (0, -3).
1 answer