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The graph shows the distance, in feet, required for a car to come to a full stop if the brake is fully applied and the car was initially traveling x miles per hour.

Which equation can be used to determine the stopping distance in feet, y, for a car that is traveling x miles per hour?

y = (1/18)^x
y = (1/5)^x
y = x^2/18
y = x^2/5

The graph shows the distance in feet required for a car to come to a full stop if the brake is fully applied and the car was initially traveling x miles per hou class=

Respuesta :

The correct equation should model the data shown in the figure.
We shall test two values: (30,60) and (60, 200).

Test y = (1/18)^x
x=30  => y = (1/18)^30 = 0        Incorrect

Test y = (1/5)^x
x = 30  =>  y = (1/5)^30 = 0     Incorrect

Test  y = x^2/18
x = 30  =>  y = 30^2/18 = 50     Correct
x = 60  =>  y = 60^2/18 = 200  Correct

Test y = x^2/5
x = 30  =>  y = 30^2/5 = 180  Incorrect

Answer:
The correct equation is [tex]y= \frac{ x^{2} }{18} [/tex]

sneakerplugaj

Answer:

y=[tex]\frac{x^{2} }{18}[/tex]

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