Question

A skier moving at 4.75 m/s encounters a long, rough, horizontal patch of snow having a coefficient of kinetic friction of 0.220 with her skis. how far does she travel on this patch before stopping?

Answer 1

First we need to find the acceleration of the skier on the rough patch of snow.
We are only concerned with the horizontal direction, since the skier is moving in this direction, so we can neglect forces that do not act in this direction. So we have only one horizontal force acting on the skier: the frictional force,
`\mu m g`. For Newton's second law, the resultant of the forces acting on the skier must be equal to ma (mass per acceleration), so we can write:

`ma=-\mu m g`
Where the negative sign is due to the fact the friction is directed against the motion of the skier.
Simplifying and solving, we find the value of the acceleration:

`a=-(0.220)(9.81 m/s^2)=-2.16 m/s^2`

Now we can use the following relationship to find the distance covered by the skier before stopping, S:

`2aS=v_f^2-v_i^2`
where
`v_f=0` is the final speed of the skier and
`v_i=4.75 m/s` is the initial speed. Substituting numbers, we find:

`S=- (v_i^2)/(2a)=- ((4.75 m/s)^2)/(2(-2.16 m/s^2))=5.23 m`