A. Since a constant change in the x-value correponds to a constant change in the y-value, y=3x-4 is not a linear equation.
B. Since a constant change in the x-value correponds to a constant change in the y-value, y=3x-4 is a linear equation.
C. Since a constant change in the y-value, y=3x-4 is a linear equation.
D. Since there is not constant change in the x-value correponding to a constant change in the y-value, y=3x-4 is a not linear equation.
Identify the equation y=2x-5 as linear or not linear.
Identify the equation y=2x3 as linear or not linear.
Why is y=3x2 not linear?
A. there is not a constant change in the x-value
B. a constant change in the x-value does not correspond to a constant change in the y-value
C. there is only one y-value for each x-value
D. there is a constant change in the x-value
B. Since a constant change in the x-value correponds to a constant change in the y-value, y=3x-4 is a linear equation.
C. Since a constant change in the y-value, y=3x-4 is a linear equation.
D. Since there is not constant change in the x-value correponding to a constant change in the y-value, y=3x-4 is a not linear equation.
Identify the equation y=2x-5 as linear or not linear.
Identify the equation y=2x3 as linear or not linear.
Why is y=3x2 not linear?
A. there is not a constant change in the x-value
B. a constant change in the x-value does not correspond to a constant change in the y-value
C. there is only one y-value for each x-value
D. there is a constant change in the x-value
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When there are two variables that are added or subtracted, there is a linear equation: y = 3x – 4 is linear in slope intercept form. There is a constant change
2) Assuming you mean y = 3x², this is a quadratic which graphs as a parabola and not linear.
(Linear in these cases means "straight line".)
2) Assuming you mean y = 3x², this is a quadratic which graphs as a parabola and not linear.
(Linear in these cases means "straight line".)