If an object is moving at 120 m/s120ms over a surface with a kinetic friction coefficient of u_k=12 /guk=12g, how much time will it take for the object to stop moving?

1 Answer
Dwight
Oct 9, 2017

The object will stop in 10 seconds. Complete solution follows...

Explanation:

We must start by determining the acceleration of the body, which we do by considering the force picture. Since the only horizontal force is friction, Newton's second law becomes

F_"net" = F_f=maFnet=Ff=ma

where F_f = muF_N = mu mgFf=μFN=μmg

(if the motion is on a horizontal surface, it will be true that F_N = mgFN=mg)

Combining these two equations, we get

ma=mumgma=μmg or simply a=muga=μg

and, since we are told that mu=12/gμ=12g, we can express the acceleration as

a=12m/s^2a=12ms2 (actually -12 m/s^212ms2 as teh object will be slowing down)

Now use the equation of motion v_f = v_i +aDeltat

Since v_f=0, v_i=120 and a = -12, we get

0=120-12Deltat

so that Deltat must be 10 seconds.

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