Calculating Minimum Horsepower Required to Drag a 350 kg Box

What minimum horsepower must a motor have to be able to drag a 350 kg box along a level floor at a speed of 1.05 m/s if the coefficient of friction is 0.40?

A) 2.94 hp

B) 3.78 hp

C) 4.12 hp

D) 5.25 hp


Final Answer:

To determine the minimum horsepower needed to drag a 350 kg box along a level floor at a speed of 1.05 m/s, calculate the force of friction using the coefficient of friction and the weight of the box, and then calculate the minimum horsepower required using the formula for horsepower.

Answer:

The correct answer is not provided in the options. Therefore, none of the given options are correct for this question.

To determine the minimum horsepower needed to drag a 350 kg box along a level floor at a speed of 1.05 m/s, we first need to calculate the force of friction. The equation for friction is f = μN, where μ is the coefficient of friction and N is the normal force.

The normal force is equal to the weight of the box, which is given by N = mg, where m is the mass and g is the acceleration due to gravity. Using the coefficient of friction provided (0.40), the weight of the box (350 kg × 9.8 m/s²), and the formula for horsepower (HP = F × v ÷ 745.7), we can calculate the minimum horsepower required.

First, calculate the normal force:

N = 350 kg × 9.8 m/s² = 3430 N

Then, calculate the force of friction:

f = 0.40 × 3430 N = 1372 N

Finally, calculate the minimum horsepower required:

HP = (1372 N × 1.05 m/s) ÷ 745.7 = 1.94 hp

The correct answer is not provided in the options. Therefore, none of the given options are correct for this question.

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