A box with an initial speed of 5 m/s is moving up a ramp. The ramp has a kinetic friction coefficient of 5/7 and an incline of (3 pi )/8 . How far along the ramp will the box go?

1 Answer
Narad T.
Jun 12, 2017

The distance is =1.07ms^-1

Explanation:

Taking the direction up and parallel to the plane as positive ↗^+

The coefficient of kinetic friction is mu_k=F_r/N

Then the net force on the object is

F=-F_r-Wsintheta

=-F_r-mgsintheta

=-mu_kN-mgsintheta

=mmu_kgcostheta-mgsintheta

According to Newton's Second Law

F=m*a

Where a is the acceleration

So

ma=-mu_kgcostheta-mgsintheta

a=-g(mu_kcostheta+sintheta)

The coefficient of kinetic friction is mu_k=5/7

The incline of the ramp is theta=3/8pi

a=-9.8*(5/7cos(3/8pi)+sin(3/8pi))

=-11.73ms^-2

The negative sign indicates a deceleration

We apply the equation of motion

v^2=u^2+2as

u=5ms^-1

v=0

a=-11.73ms^-2

s=(v^2-u^2)/(2a)

=(0-25)/(-2*11.73)

=1.07m

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