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A 387.02 N trunk is pulled at a constant speed up an incline with an angle of 5.88degrees. The coefficient of static friction is 0.28. What is the force required to keep it constant? Hint* using Absolute value solve for the two forces and add

User Shrawan
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The given problem can be exemplified in the following diagram:

To determine the value of the force "F" we need to add the forces in the direction of the inclined plane. Since we want the velocity to stay constant then the acceleration must be zero and therefore, the sum of the forces must add up to zero, therefore, we have:


F-F_f-mg_x=0

Where:


\begin{gathered} F=\text{ force} \\ F_f=\text{ force of friction} \\ mg_x=\text{ component of the weight in the direction of the incline} \end{gathered}

Now we solve for the Force "F" by adding the force of friction and the component of the weight in both sides of the equation:


F=F_f+mg_x

To determine the force of friction we will use the following equation:


F_f=\mu N

Where:


\begin{gathered} \mu=\text{ coefficient of friction} \\ N=\text{ normal force} \end{gathered}

The normal force can be determined by adding the forces in the perpendicular direction of the incline, we get:


N-mg_y=0

Where:


mg_y=\text{ perpendicular component of the weight.}

Now we need to determine the components of the weight. To do that we will use the following triangle:

Using the trigonometric function cosine we get:


\cos 5.88=(mg_y)/(mg)

Now we multiply both sides by "mg":


mg\cos 5.88=mg_y

Replacing the values we get:


387.02\cos 5.88=mg_y

Solving the operations:


356N=mg_y

Now we use the trigonometric function sine:


\sin 5.88=(mg_x)/(mg)

Now we multiply both sides by "mg":


mg\sin 5.88=mg_x

Replacing the values:


387.02\sin 5.88=mg_x

Solving the operations:


39.65N=mg_x

Now we replace the perpendicular component in the formula for the normal:


N-356N=0

Therefore, the normal force is:


N=356N

Now we replace the value of the normal force in the formula for the force of friction:


F_f=(0.28)(356N)

Solving the operation we get:


F_f=99.68N

Now we replace in the formula for the force "F":


F=F_f+mg_x

Replacing the values:


F=99.68N+39.65N

Solving the operations


F=139.33N

Therefore, the required force is 139.33 Newtons.

A 387.02 N trunk is pulled at a constant speed up an incline with an angle of 5.88degrees-example-1
A 387.02 N trunk is pulled at a constant speed up an incline with an angle of 5.88degrees-example-2
User Runes
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