Calculating the Speed of a Block After Moving Downward: Work and Energy Equation

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Homework Help Overview

The problem involves calculating the speed of a block after it has moved downward, utilizing concepts from work and energy. It includes considerations of friction and the forces acting on multiple blocks connected by a pulley system.

Discussion Character

  • Mixed

Approaches and Questions Raised

  • Participants discuss the application of the work-energy principle, questioning the signs associated with the work done on the blocks. There is an exploration of the calculations involved in determining the final speed of the moving block.

Discussion Status

The discussion has seen participants identifying errors in calculations and re-evaluating their results. There is an acknowledgment of differing answers, prompting a request for rechecking of numbers. Guidance has been offered regarding the treatment of signs in the work-energy equation.

Contextual Notes

Participants are working under the assumption that the mass of the pulleys and cords can be neglected, and they are also considering the effects of kinetic friction in their calculations.

jjiimmyy101
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Question: The 20 lb block B rests on the surface of a table for which the coefficient of kinetic friction is 0.1. Determine the speed of the 10 lb block A after it has moved downward 2 ft from the rest. Neglect the mass of the pulleys and cords.

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Equation: T1 + Summation of work = T2

This is what I got.

s = displacement

0 + [(Force of Friction)*(s) - (Weight of A)*(s) - (Weight of C)*(s) = 0.5*mA*v^2 + 0.5*mB*v^2 + 0.5*mC*v^2

2*2 + 10*2 + 6*2 = 0.15528*v^2 + 0.31056*v^2 + 0.09317*v^2

38 = 0.55901*v^2
v = 8.24 ft/s

Is it right?
 

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Originally posted by jjiimmyy101
v = 8.24 ft/s

Is it right?
You made an error with the signs of the work done to lift/lower the blocks. Since one raises and one lowers, the signs must differ.

To keep better track of signs, try thinking this way:
ΔKE + ΔPE = -(Work done against friction)
 
Thanks! What a silly mistake. The answer is 6.27 ft/s!
 
Originally posted by jjiimmyy101
The answer is 6.27 ft/s!
I get a different answer. Recheck your numbers.
 

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