If a 3 kg3kg object moving at 20 m/s20ms slows to a halt after moving 500 m500m, what is the coefficient of kinetic friction of the surface that the object was moving over?

1 Answer
Gió
Feb 6, 2017

I got 0.040.04

Explanation:

The only horizontal force acting on the object is kinetic friction:

f_k=mu_kNfk=μkN

where:
mu_kμk is the coefficient of kinetic friction;
NN is the modulus of the Normal Reaction (of the surface); in this purely horizontal situation (no inclination or sloped surface) the normal will be equal to the weight of the object or:
N=W=mgN=W=mg

We know that the object is travelling at 20m/s20ms when friction kicks in and slows it down to zero in d=500 md=500m so we can write (from Kinematics):

v_f^2=v_i^2+2adv2f=v2i+2ad
or:
0=20^2+2a*5000=202+2a500

giving an acceleration of:

a=-400/(2*500)=-0.4m/s^2a=4002500=0.4ms2 negative to indicate a deceleration that will slow down our object (opposite to the direction of motion).

Finally we can use Newton's second law to equate the resultant of the forces acting on the object to mass and acceleration:

SigmavecF=mveca

BUT: horizontally, the only force acting on the object is friction (IN OPPOSITE DIRECTION TO THE MOTION ) so that we can write:

-f_k=ma
-mu_k*mg=ma

in numbers:

-mu_kcancel(3)*9.8=cancel(3)(-0.4)

mu_k=0.4/9.8=0.04

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