Answer :
Answer: [tex]\mu_{k}=\frac{a}{g} csc \theta+ ctan \theta[/tex]
Explanation:
If we draw a free body diagram of the sled we will have:
[tex]\sum{F_{x}}=F + W_{x} - F_{friction}=0[/tex]
Where:
[tex]F=m.a[/tex] being [tex]m[/tex] the mass of the car and [tex]a[/tex] its acceleration.
[tex]W_{x}=Wcos\theta[/tex] is the horizontal component of the weight of the car
[tex]F_{friction}=\mu_{k}N[/tex] is the friction force where [tex]N[/tex] is the normal force
Then:
[tex]m.a + Wcos\theta - \mu_{k}N=0[/tex] (1)
[tex]\sum{F_{y}}=N-W_{y}=0[/tex]
Where [tex]W_{y}=Wsin \theta[/tex] is the vertical component of the weight, then:
[tex]N=Wsin \theta[/tex] (2)
Substituting (2) in (1):
[tex]m.a + Wcos\theta - \mu_{k}Wsin \theta=0[/tex] (3)
Finding [tex]\mu_{k}[/tex]:
[tex]\mu_{k}=\frac{m.a + Wcos \theta}{Wsin \theta}[/tex] (4)
Simplifying:
[tex]\mu_{k}=\frac{a}{g} csc \theta+ ctan \theta[/tex]