1 Answer

Cdietschrun · Answer 1 · 2020-06-09T01:20:12+0000

(a) 95.9 m

The initial velocity of the car is

u=53.0 km/h = 14.7 m/s

The car moves by uniformly accelerated motion, so we can use the SUVAT equation:

v^2 - u^2 = 2ad

where

v = 0 is the final velocity

d is the stopping distance of the car

a is the acceleration of the car

The force of friction against the car is

$F_f = - \mu mg$

where

$\mu=0.115$ is the coefficient of friction

m is the mass of the car

g = 9.8 m/s^2 is the acceleration due to gravity

According to Newton's second law, the acceleration is

$a=(F)/(m)=(-\mu mg)/(m)=-\mu g$

Substituting into the previous equation:

$v^2 - u^2 = -2\mu g d$

and solving for d:

$d=(v^2 -u^2)/(-2\mu g)=(0-(14.7 m/s)^2)/(-2(0.115)(9.8 m/s^2))=95.9 m$

(b) 19.1 m

This time, the coefficient of friction is

$\mu = 0.575$

So the acceleration due to friction is:

$a=-\mu g = -(0.575)(9.8 m/s^2)=-5.64 m/s^2$

And substituting into the SUVAT equation:

v^2 - u^2 = 2ad

we can find the new stopping distance:

d=(v^2 -u^2)/(-2a)=(0-(14.7 m/s)^2)/(2(-5.64 m/s^2))=19.1 m

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