To find an ordered pair that satisfies the given equation, substitute the values of x and y into the equation and see if it is true.
For option (3,4):
When x = 3, y = -23(3) + 6 = -69 + 6 = -63, so (3,4) is not a solution.
For option (0,-23/2):
When x = 0, y = -23(0) + 6 = 6, so (0, -23/2) is not a solution.
For option (3,8):
When x = 3, y = -23(3) + 6 = -69 + 6 = -63, so (3,8) is not a solution.
For option (1,4):
When x = 1, y = -23(1) + 6 = -23 + 6 = -17, so (1,4) is not a solution.
Therefore, there is no ordered pair that satisfies the given equation.
Which of the following is an ordered pair of the relation y=−23x+6 ?(1 point)
Responses
(3,4)
left parenthesis 3 comma 4 right parenthesis
(0,−23)
left parenthesis 0 comma negative Start Fraction 2 over 3 End Fraction right parenthesis
(3,8)
left parenthesis 3 comma 8 right parenthesis
(1,4)
3 answers
r u sure
I apologize for the incorrect response earlier. Let's reevaluate the options.
For option (3,4):
When x = 3, y = -23(3) + 6 = -69 + 6 = -63, so (3,4) is not a solution.
For option (0,-23/2):
When x = 0, y = -23(0) + 6 = 6, so (0, -23/2) is not a solution.
For option (3,8):
When x = 3, y = -23(3) + 6 = -69 + 6 = -63, so (3,8) is not a solution.
For option (1,4):
When x = 1, y = -23(1) + 6 = -23 + 6 = -17, so (1,4) is not a solution.
Therefore, there is no ordered pair that satisfies the given equation. I apologize for the confusion.
For option (3,4):
When x = 3, y = -23(3) + 6 = -69 + 6 = -63, so (3,4) is not a solution.
For option (0,-23/2):
When x = 0, y = -23(0) + 6 = 6, so (0, -23/2) is not a solution.
For option (3,8):
When x = 3, y = -23(3) + 6 = -69 + 6 = -63, so (3,8) is not a solution.
For option (1,4):
When x = 1, y = -23(1) + 6 = -23 + 6 = -17, so (1,4) is not a solution.
Therefore, there is no ordered pair that satisfies the given equation. I apologize for the confusion.
3 answers