A box of oranges which weighs 83 N is being pushed across a horizontal floor. As it moves, it is slowing at a constant rate of 0.90 m/s each second. The push force has a horizontal component of 20 N and a vertical component of 25 N downward.

A box of oranges which weighs 83 N is being pushed across a horizontal floor. As it moves, it is slowing at a constant rate of 0.90 m/s each second. The push force has a horizontal component of 20 N and a vertical component of 25 N downward. Calculate the coefficient of kinetic friction between the box and the floor.

Explanation:

The given data is as follows.

[tex]F_{1}[/tex] = 20 N, [tex]F_{2}[/tex] = 25 N, a = -0.9 [tex]m/s^{2}[/tex]

W = 83 N

m = [tex]\frac{83}{9.81}[/tex]

= 8.46

Now, we will balance the forces along the y-component as follows.

N = W + [tex]F_{2}[/tex]

= 83 + 25 = 108 N

Now, balancing the forces along the x component as follows.

[tex]F_{1} - F_{r}[/tex] = ma

[tex]20 - F_{r} = 8.46 \times (-0.9)[/tex]

[tex]F_{r}[/tex] = 7.614 N

Also, we know that relation between force and coefficient of friction is as follows.

[tex]F_{r} = \mu \times N[/tex]

[tex]\mu = \frac{F_{r}}{N}[/tex]

= [tex]\frac{7.614}{108}[/tex]

= 0.0705

Thus, we can conclude that the coefficient of kinetic friction between the box and the floor is 0.0705.

Vespertilio Vespertilio · Answer 2 · 2020-03-13T05:25:47+01:00

Answer:

Explanation:

Weight of box, mg = 83 N

acceleration, a = - 0.9 m/s²

Horizontal component of force, Fx = 20 N

vertical component of force, Fy = - 25 N

Let f be the force of friction and μ is the coefficient of friction.

Let N be the normal reaction, by the equilibrium of forces along Y axis

N - fy = mg

N = mg + Fy

N = 83 + 25 = 108 N

Use Newton's second law

Fx - f = ma

20 - f = - 83 x 0.9 / 9.8

f = 27.6 N

f = μ N

27.6 = μ x 108

μ = 0.255