Answer:
The coefficient of kinetic friction [tex]\mu= 0.16989[/tex]
Explanation:
From Newton's second law
[tex]\sum\overset{\rightarrow}{F}=m\cdot\overset{\rightarrow}{a}[/tex]
If the velocity is constant, that means the summation of all forces must be equal to zero. Draw the free-body diagram to obtain the sums of forces in x and y. It must include the Friction Force, in the opposite direction of the displacement, the weight ([tex]W=mg=390*9.81=3825.9N[/tex]), the Normal Force, which is the is the consequence of Newton's third law and the forces from the two workers.
The sum in y is:
[tex]\sum F_{y}=F_{N}-3825.9=0[/tex]
Solving for the [tex]F_{N}[/tex]:
[tex]F_{N}=$ $3825.\,\allowbreak9N[/tex]
The sum in x is:
[tex]\sum F_{x}=450+200-F_{f}=0[/tex]
Solving for the [tex]F_{f}[/tex]:
[tex]$F_{f}=650.0N[/tex]
The formula of the magnitude of the Friction force is
[tex]F_{f}=\mu F_{N}[/tex]
That means the coefficient of friction is:
[tex]\mu=\frac{F_{f}}{F_{N}}=\frac{650.0}{3825.\,\allowbreak9}=\allowbreak0.16989[/tex]
