Work and coefficient of friction

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Homework Help Overview

The discussion revolves around a problem involving a box being pushed up an inclined plane, with a focus on determining the coefficient of friction. Participants are examining the forces acting on the box, including an applied force and the force of gravity, while also considering the dimensions of the incline.

Discussion Character

  • Exploratory, Assumption checking, Problem interpretation

Approaches and Questions Raised

  • Participants are questioning the adequacy of the provided information, particularly regarding the acceleration of the box and the validity of the coefficient of friction given in the problem. Some are attempting to clarify the problem statement and the known variables, while others are exploring the implications of the coefficient of friction on the box's motion.

Discussion Status

The discussion is ongoing, with participants expressing confusion about the problem's setup and the accuracy of the coefficient of friction. Some have provided insights into their calculations and reasoning, suggesting that there may be an error in the textbook's coefficient value. There is no explicit consensus, but various interpretations and calculations are being explored.

Contextual Notes

Participants note that the problem lacks sufficient information, such as the acceleration of the box, which is critical for finding the coefficient of friction. There are also references to imposed homework rules regarding the completeness of the problem statement.

dranseth
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Homework Statement



This is in my work unit. Can someone lead me in the direction of finding the value of the coefficient of friction? What we have is a box being pushed up an incline plane. There is an applied force parallel to the horizontal as well as the force of gravity given. The dimensions of the plane are given but nothing else. How can I calculate the value of the coefficient of friction?
 
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What you've given is not enough to solve the problem. Is the box accelerating up the plane? Is it moving up with constant speed? Give the problem statement verbatim, and post any attempts to solve the problem you've done.
 
A worker pushes a crate weighing 93N up an inclined plane, pushing horizontally parallel to the ground. It then has a digram giving the dimensions of the inclined plane so that an angle can be calculated and work can too.

c) THe coefficient of friction is .2. How much work is done by friction? (be careful of signs)

My teacher says that there is something wrong with this question (ie. there is an error). The only thing I can see possibly wrong is that the coefficient is wrong.
 
Perhaps my teacher is wrong and there is nothing wrong with this question.
 
You really haven't provided enough of the question for people to help. I'm learning this stuff right now, too, and could provide things from my text, except it's not super clear what the question is, what information you've been given, etc. You are supposed to follow the basic setup provided when you ask your question--the full question, the equations involved and your attempt. People will have a hard time helping you if you only do part of it.
 
I have already stated previously what are givens in the question. There is a box being pushed up an inclined plane by an applied force that is parallel to the horizontal. We are also given the box's mass and the dimensions of the triangle.
 
What is the acceleration of the box? You need to know that before you can find the coefficient of friction.
 
It doesn't tell you the acceleration. My teacher challenges that you can still find the coefficient of friction.

Knowns: applied force; dimensions of triangle; force of gravity component
 
dranseth said:
A worker pushes a crate weighing 93N up an inclined plane, pushing horizontally parallel to the ground. It then has a digram giving the dimensions of the inclined plane so that an angle can be calculated and work can too.

c) THe coefficient of friction is .2. How much work is done by friction? (be careful of signs)

My teacher says that there is something wrong with this question (ie. there is an error). The only thing I can see possibly wrong is that the coefficient is wrong.

dranseth said:
This is in my work unit. Can someone lead me in the direction of finding the value of the coefficient of friction? What we have is a box being pushed up an incline plane. There is an applied force parallel to the horizontal as well as the force of gravity given. The dimensions of the plane are given but nothing else. How can I calculate the value of the coefficient of friction?

Wait, now I'm confused. What exactly are you trying to find?
 
  • #10
Read the entire thread. This question is out of the textbook, but my teacher says that there is an error with the coefficient of friction (which the book claims to be .2). It is obvious that there is an error with the coefficient of friction, but I just don't know how to calculate it. The reason I know that there is an error with it is because when I calculated the coefficient if the system were to be in equilibrium it was .16. As a increases, the coefficient decreases, so it would be impossible for it to be .2.
 
  • #11
dranseth said:
Read the entire thread. This question is out of the textbook, but my teacher says that there is an error with the coefficient of friction (which the book claims to be .2). It is obvious that there is an error with the coefficient of friction, but I just don't know how to calculate it. The reason I know that there is an error with it is because when I calculated the coefficient if the system were to be in equilibrium it was .16. As a increases, the coefficient decreases, so it would be impossible for it to be .2.

If it were in equilibrium, then all forces would be equal, so there would be no acceleration. So you have to make the assumption that v_{i} = v_{f}
Then,
KE_{i} + PE_{i} + F_{fric} \cdot d = KE_{f} + PE_{f}
Reduces to
PE_{i} + F_{fric} \cdot d = PE_{f}
Taking the bottom of the ramp to be at 0 potential, you finally get
F_{fric} \cdot d = PE_{f}
 
  • #12
I can't see what's wrong with the question where they ask for the amount of work done.
If the coefficient of friction is bigger than .16 the box won't slide down on it's own, but you can still push it upwards. To calculate the amount of work done by friction you don't need to know how fast the box is pushed upwards, just the length and angle of the slope. (which dranseth claims were given, altough he didn't give them to us)
 
  • #13
If you calculate the coefficient of friction that is when it will be its biggest. When you do this, the answer is .16. Therefore, .2 is wrong... It is impossible for it to be .2
 

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