Newton's Law and Frictional Forces

[victorc]

These are two word problems, so I don't think the template applies to this thread.

1. Two strong magnets are on opposite sides of a tabletop's surface so that the attraction between the magnets is all that is holding up the one underneath. Identify all forces which involve either magnet (either as the agent or the object being acted upon), and all associated action/ reaction pairs completely. Number each pair.

My attempt at this question:
The forces on the magnet above the table include the magnetic pull by the other magnet (pointing down) [as well as the force of gravity (pointing down) and the normal force exerted by the table (upwards)]. The forces on the magnet below the table include the force caused by the magnetic field (upwards) [as well as the force of gravity (downwards)]. The magnetic field created by the two magnets generates a long-range magnetic force on each of the magnets causing the attraction between them.
There are no action/reaction pairs because there is no acceleration involved with either of the objects.

2. Two blocks, A and B, are hanging from opposite ends of a massless string which runs over a massless frictionless pulley. The mass of block A is greater than that of block B. Rank, from largest to smallest, all of the forces acting on either block. (Don't bother to include in this ranking the forces acting on the string.) Put your answer in the usual form: X > Y = Z. Explain why you ranked each force in order.

My attempt at this question:
Forces acting on block B (from largest to smallest):
1. Upwards force caused by tension of the string.
2. Downwards force of gravity (weight).

Forces acting on block A (from largest to smallest):
1. Downwards force of gravity (weight).
2. Upwards force caused by tension of the string.

ps:. I don't understand what the question means with "Put your answer in the usual form: X > Y = Z."

Thanks in advance

 

[kg4pae]

These are two word problems, so I don't think the template applies to this thread.

1. Two strong magnets are on opposite sides of a tabletop's surface so that the attraction between the magnets is all that is holding up the one underneath. Identify all forces which involve either magnet (either as the agent or the object being acted upon), and all associated action/ reaction pairs completely. Number each pair.

My attempt at this question:
The forces on the magnet above the table include the magnetic pull by the other magnet (pointing down) [as well as the force of gravity (pointing down) and the normal force exerted by the table (upwards)].

Very Good.

The forces on the magnet below the table include the force caused by the magnetic field (upwards) [as well as the force of gravity (downwards)].

Good.

The magnetic field created by the two magnets generates a long-range magnetic force on each of the magnets causing the attraction between them.

True, but I'm not sure how this relates to the problem. (Maybe I'm missing something.)

There are no action/reaction pairs because there is no acceleration involved with either of the objects.

Not true. Don't forget Newton's third law (For every force [action] there is an equal and opposite force [reaction]). You've listed three (action) forces in the first part and two in the second.

2. Two blocks, A and B, are hanging from opposite ends of a massless string which runs over a massless frictionless pulley. The mass of block A is greater than that of block B. Rank, from largest to smallest, all of the forces acting on either block. (Don't bother to include in this ranking the forces acting on the string.) Put your answer in the usual form: X > Y = Z. Explain why you ranked each force in order.

My attempt at this question:
Forces acting on block B (from largest to smallest):
1. Upwards force caused by tension of the string.
2. Downwards force of gravity (weight).

True. However, you didn't say why. Hint: m_{A} > m_{B} \wedge a_{A} = a_{B}

Forces acting on block A (from largest to smallest):
1. Downwards force of gravity (weight).
2. Upwards force caused by tension of the string.

True. Some note as before.

ps:. I don't understand what the question means with "Put your answer in the usual form: X > Y = Z."

I think they are asking for something like

F_{A} > F_{B} \wedge \frac{1}{2 T}=\frac{1}{F_{A}} + \frac{1}{F_{B}}

You might want to look at the end of
http://farside.ph.utexas.edu/teaching/301/lectures/node48.html"
where there is a comment about "Atwood's machine".
Also look at
http://www.pha.jhu.edu/~broholm/l8/node3.html"

Thanks in advance

No problem.

73s and clear skies.

 

[victorc]

First of all, thank you so much for the reply!

Not true. Don't forget Newton's third law (For every force [action] there is an equal and opposite force [reaction]). You've listed three (action) forces in the first part and two in the second.

I identified the magnet above the table as Magnet A, and the one below the table as Magnet B. This is what I added to my response:

"The action/reaction pairs are listed below:
1. Magnetic pull by Magnet A on Magnet B AND magnetic pull by Magnet B on Magnet A.
2/3. Force of gravity on Magnet A/B AND Magnet A/B attracting the Earth.
4. Normal force (normal from table's surface) acting on Magnet A AND gravitational pull on Magnet A." (I'm not sure about this, as action/reaction forces are not on the same body. However, I felt a need to include the normal to Magnet A and gravity was the only force that I reasoned to oppose the normal)

Is there a normal acting on Magnet B?

True. However, you didn't say why. Hint: m_{A} > m_{B} \wedge a_{A} = a_{B}

I don't think I understand you hint... perhaps because I don't know what the wedge sign means exactly. Well, this is my revised answer:

"Forces acting on block B (from largest to smallest):
1. Upwards force caused by tension of the string.
2. Downwards force of gravity (weight).
The downwards force of gravity must be smaller than the upwards force of the string because block B moves upwards (it has less mass and F_gravity = mass x a_gravity)

Forces acting on block A (from largest to smallest):
1. Downwards force of gravity (weight).
2. Upwards force caused by tension of the string.
The downwards force of gravity must be greater than the upwards force of the string because block A falls (since it has more mass and F = ma)"

I think they are asking for something like

F_{A} > F_{B} \wedge \frac{1}{2 T}=\frac{1}{F_{A}} + \frac{1}{F_{B}}

Oh... I still don't get what the wedge (^) sign means. Is it related to wedge products in exterior algebra?
I first thought the so called "usual form" to be an inequality, X and Y being either gravity or the tension of the string, depending on the block. However, following this reasoning, I don't know what Z would be.

You might want to look at the end of
http://farside.ph.utexas.edu/teaching/301/lectures/node48.html"
where there is a comment about "Atwood's machine".
Also look at
http://www.pha.jhu.edu/~broholm/l8/node3.html"

The website was useful to get a broader understanding of the situation, as well as an interesting bit of historical information.

I truly appreciate your time and effort