The box is kept in motion at constant velocity by a force of F=99 N. Constant velocity means there is no acceleration, so the resultant of the forces acting on the box is zero. Apart from the force F pushing the box, there is only another force acting on it in the horizontal direction: the frictional force [tex]F_f[/tex] which acts in the opposite direction of the motion, so in the opposite direction of F.
Therefore, since the resultant of the two forces must be zero,
[tex]F-F_f=0[/tex]
so
[tex]F=F_f[/tex]
The frictional force can be rewritten as
[tex]F_f = \mu m g[/tex]
where [tex]m=50 kg[/tex], [tex]g=9.81 m/s^2[/tex]. Re-arranging, we can solve this equation to find [tex]\mu[/tex], the coefficient of dynamic friction:
[tex]\mu = \frac{F}{mg}= \frac{99 N}{(50 kg)(9.81 m/s^2)} =0.20[/tex]
