Solve Toppling Problem: Understand Torque Equation

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In summary: Our question is that what is the minimum force so that the billiard ball move forward with backspin. Let's assume that the billiard ball is a solid sphere of mass M and radius R.You should take moments about the point of impact.
  • #1
Saitama
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Homework Statement


This is a solved problem I am trying to understand, I have attached the problem.


Homework Equations





The Attempt at a Solution


In the solution of i), I don't understand why is it ok to apply the torque equation about O. The question does not state that block does not slide before toppling and ##\tau=I\alpha## can be applied only about CM or a fixed point, right?

Its been quite some time I have done these kind of problems, I am very sorry for any silly questions.

Any help is appreciated. Thanks!
 

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  • #2
Pranav-Arora said:

The Attempt at a Solution


In the solution of i), I don't understand why is it ok to apply the torque equation about O. The question does not state that block does not slide before toppling and ##\tau=I\alpha## can be applied only about CM or a fixed point, right?

The equation T = Iα applies only when you are interested in trying to figure out the angular acceleration produced by a net torque applied to a body. Your problem merely asks you to determine the amount of force required to topple the body, not how fast the body topples once it starts to rotate.

This is a quasi-static analysis which is solved using the equations of statics alone.
 
  • #3
SteamKing said:
The equation T = Iα applies only when you are interested in trying to figure out the angular acceleration produced by a net torque applied to a body. Your problem merely asks you to determine the amount of force required to topple the body, not how fast the body topples once it starts to rotate.

This is a quasi-static analysis which is solved using the equations of statics alone.

Okay, got the first part.

What about the second one? How did they conclude that ##\mu_{min}=0##, the reasoning doesn't make sense. Can I have a few hints for this part?

Thanks!
 
  • #4
Pranav-Arora said:
Okay, got the first part.

What about the second one? How did they conclude that ##\mu_{min}=0##, the reasoning doesn't make sense. Can I have a few hints for this part?

Thanks!
Hey, Pranav!
The question doesn't mention how it topples. It topples on the front or the back edge depending on the conditions. Think about it this way, if it has to topple forward (fall towards front), then friction must be present but what about the back edge (fall backwards) and remember force F can be varied to give desired results. Another question you can ask yourself is, can the block topple even if friction is absent. If the friction isn't present then as you know you'll have to calculate torque about its COM to avoid other technicalities. I hope this gives you clues!
 
  • #5
NihalSh said:
Think about it this way, if it has to topple forward (fall towards front), then friction must be present...

Why? The solution to the part ii) says that friction is not necessary for toppling. :confused:

as you know you'll have to calculate torque about its COM to avoid other technicalities. I hope this gives you clues!

What technicalities? Why can't I take moments about the point O? :confused:
 
  • #6
Pranav-Arora said:
Why? The solution to the part ii) says that friction is not necessary for toppling. :confused:

read the complete thing!

Think about it this way, if it has to topple forward (fall towards front), then friction must be present but what about the back edge (fall backwards) and remember force F can be varied to give desired results.
it can topple backwards, without any frictional force whatsoever, it would just need a specific force for that to happen.

Pranav-Arora said:
What technicalities? Why can't I take moments about the point O? :confused:
If friction isn't present then the body must be accelerating, right?...if you take moment about point O, then you'll have to take acceleration of body into account otherwise you'll get incorrect equation!
 
  • #7
Hi Pranav-Arora! :smile:
Pranav-Arora said:
What about the second one? How did they conclude that ##\mu_{min}=0##, the reasoning doesn't make sense. Can I have a few hints for this part?

If the block can topple with µ = 0, clearly that is the minimum!

So all you have to show is that it can.

Hint: if this was a billiard ball, if you hit it slowly enough (below the centre of mass), it will move forward, rolling

but if you hit it hard enough, it will move forward with backspin. :wink:
 
  • #8
Hi tiny-tim! :)

tiny-tim said:
Hint: if this was a billiard ball, if you hit it slowly enough (below the centre of mass), it will move forward, rolling

but if you hit it hard enough, it will move forward with backspin. :wink:

Can you please help me in forming the equations for the case of billiard ball? I understand better by doing the maths.

Our question is that what is the minimum force so that the billiard ball move forward with backspin. Let's assume that the billiard ball is a solid sphere of mass M and radius R.

How should I begin here? Should I take the moments about CM?

NihalSh said:
If friction isn't present then the body must be accelerating, right?...if you take moment about point O, then you'll have to take acceleration of body into account otherwise you'll get incorrect equation!

:confused:
Okay, let's make the equations.

Torque about O: ##\tau=mg(a/2)-F(a/4)## where anticlockwise is considered to be positive.

Newton's second law: ##F=mb## where b is the acceleration of block.

How do I relate the angular acceleration ##\alpha## and b? Is it ##b=(a/\sqrt{2})\alpha##?

I am very sorry if these are dumb questions but I honestly can't proceed, I don't know what I am missing here. :(
 
  • #9
Pranav-Arora said:
Okay, let's make the equations.

Torque about O: ##\tau=mg(a/2)-F(a/4)## where anticlockwise is considered to be positive.

Newton's second law: ##F=mb## where b is the acceleration of block.

How do I relate the angular acceleration ##\alpha## and b? Is it ##b=(a/\sqrt{2})\alpha##?

I am very sorry if these are dumb questions but I honestly can't proceed, I don't know what I am missing here. :(
You have not included fictitious torque!

First of all if friction isn't acting the block will topple backwards, so normal force would act along back edge. Try to see that, block can topple either way forward or backward.

Consider it a advice: Its always good to take torque about COM (for at least accelerating body) unless situation forces you to do otherwise.
if you introduce fictitious torque, you'll only increase calculations and hence complications.

For toppling condition: taking torque about COM, we see that normal force acts on the back edge, so we see that normal force gives clockwise torque about com and external force F gives anticlockwise torque. If you apply any higher force, it would simply topple backward. This situation satisfies toppling condition. And you can even see that friction was not even required to show that.
 
  • #10
NihalSh said:
You have not included fictitious torque!

:confused:
Can you please write the missing term?

First of all if friction isn't acting the block will topple backwards, so normal force would act along back edge. Try to see that, block can topple either way forward or backward.
So if there had been friction, how would I determine the direction of toppling?

In the present case, how did you conclude that it will topple backwards? I am sorry if this is obvious. It feels like it should topple about back edge given the force is acting below the CM but is it somehow possible to prove it?

Thank you for your time.
 
  • #11
Pranav-Arora said:
:confused:
Can you please write the missing term?

So if there had been friction, how would I determine the direction of toppling?

In the present case, how did you conclude that it will topple backwards? I am sorry if this is obvious. It feels like it should topple about back edge given the force is acting below the CM but is it somehow possible to prove it?

Thank you for your time.
I personally avoid non-inertial frame specially for rotation, sorry can't help you with that equation.

I mentally calculated torque about COM, and check the tendency of rotation if I increase the force beyond the balance condition.

it purely depends on the situation. This intuition develops with problem solving, it isn't obvious at first to anyone.

You can determine the direction by balancing the torque, and seeing the tendency of block's rotation if Force F is increased. If the block is accelerating, calculate torque about COM to avoid fictitious torque.

Edit: Read the detailed post of tiny-tim below! It has been very well explained.
 
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  • #12
Hi Pranav-Arora! :smile:

For the block:

Assume no friction: then there are only three forces, the applied force F, the normal force N, and the weight mg.

Let's assume that forwards is clockwise.

If the block is not rotating, then the moment of N must balance the moment of F about the centre of mass (we're using the centre of mass so that we can ignore the weight, mg :wink:).

Since F is anticlockwise about the centre of mass, that means N must be clockwise, ie the normal force is shifted to the rear of the block.

So if the block topples at all, it must do so when N reaches the rear edge!

(if F was above the centre of mass, it would be the other way round: N would be shifted forward, and the block would topple if N reached the front edge)

For a ball:

(i really only mentioned this to give you an intuitive idea of why there would be "backspin" on the block)

Take moments about the instantaneous centre of rotation (which didn't exist in the block case), and combine F = ma (or F minus friction = ma) with τ = Ic.o.rα. :wink:
 
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  • #13
tiny-tim said:
For the block:

Assume no friction: then there are only three forces, the applied force F, the normal force N, and the weight mg.

Let's assume that forwards is clockwise.

If the block is not rotating, then the moment of N must balance the moment of F about the centre of mass (we're using the centre of mass so that we can ignore the weight, mg :wink:).

Since F is anticlockwise about the centre of mass, that means N must be clockwise, ie the normal force is shifted to the rear of the block.

So if the block topples at all, it must do so when N reaches the rear edge!

(if F was above the centre of mass, it would be the other way round: N would be shifted forward, and the block would topple if N reached the front edge)

Nicely explained tiny-tim! Thanks a lot! I can finally make some sense of what's going on. :smile:

And thank you NihalSh! :)

For a ball:

(i really only mentioned this to give you an intuitive idea of why there would be "backspin" on the block)

Take moments about the instantaneous centre of rotation (which didn't exist in the block case), and combine F = ma (or F minus friction = ma) with τ = Ic.o.rα. :wink:

Let the force act at distance R/4 below the centre of mass of the ball.

Torque about the instantaneous centre of rotation is ##\tau=F(3R/4)=I_{c.o.r}\alpha##
where ##I_{c.o.r}=7MR^2/5##.

From Newton's second law: ##F-f=Ma##.

Angular acceleration is related to acceleration of CM of ball by ##\alpha=a/R##. I guess friction is known here, right?
 
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  • #14
Pranav-Arora said:
Let the force act at distance R/4 below the centre of mass of the ball.

Torque about the instantaneous centre of rotation is ##\tau=F(R/4)=I_{c.o.r}\alpha##
where ##I_{c.o.r}=7MR^2/5##.

From Newton's second law: ##F-f=Ma##.

Angular acceleration is related to acceleration of CM of ball by ##\alpha=a/R##. I guess friction is known here, right?

you might want to clear that out, instantaneous center of rotation is different from center of rotation (usually taken to be COM for rolling ball).

Wheelrotation.png


P is the instantaneous center of rotation whereas M is COM.
 
  • #15
NihalSh said:
you might want to clear that out, instantaneous center of rotation is different from center of rotation (usually taken to be COM for rolling ball).

<image>

P is the instantaneous center of rotation whereas M is COM.

I do know what is an instantaneous centre of rotation. Is there some error in my equations?
 
  • #16
Pranav-Arora said:
I do know what is an instantaneous centre of rotation. Is there some error in my equations?

I believe you have taken the distance (moment arm) ##\frac{R}{4}## incorrectly.

Edit: I believe moment arm should be ##\frac{3R}{4}## if the distance (force is applied below COM) from COM is ##\frac{R}{4}##
 
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  • #17
NihalSh said:
I believe you have taken the distance (moment arm) ##\frac{R}{4}## incorrectly.

Edit: I believe moment arm should be ##\frac{3R}{4}## if the distance (force is applied below COM) from COM is ##\frac{R}{4}##

Ah yes, you are right. Don't know what I was thinking while making the equations. :redface:

I have edited the post, thank you.

Can you answer my other query?
 
  • #18
Pranav-Arora said:
Angular acceleration is related to acceleration of CM of ball by ##\alpha=a/R##. I guess friction is known here, right?

That relation is only valid for pure rolling (no sliding). You shouldn't calculate torque about ICR, if the body is accelerating (remember what I said previously about fictitious torque).

friction in this case(back spin case) would be kinetic. and after a while if friction is present then, rotation rate would decrease (and change direction, if situation permits) and because friction acts in the rear direction, velocity of COM would decrease. So given sufficient time the ball would eventually start to pure roll.

Again depends on situation, if force is steadily increased then you must know friction to tell when the object will start to backspin. On the other hand if impulse of high magnitude acts, then you can ignore friction (assuming impulse acts for such a short time that friction doesn't get a chance to set in). And you can use linear and angular momentum conservation to determine the rate of rotation, just after impact.
 
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  • #19
NihalSh said:
...because friction acts in the forward direction,

I don't agree with this. In the backspin case, the particle in contact with the ground has forward velocity so the friction acts backwards.

But then, it means I can't use the instantaneous centre of rotation. :confused:
 
  • #20
Pranav-Arora said:
I don't agree with this. In the backspin case, the particle in contact with the ground has forward velocity so the friction acts backwards.

But then, it means I can't use the instantaneous centre of rotation. :confused:

yeah, my mistake for overlooking that!...edited the original post...thanks for pointing that out!...btw I meant backward but wrote forward the rest of it was correct...silly me!:redface:

But you get the point, the ball will eventually start to roll. If translation kinetic energy is high enough it would continue in the forward direction. otherwise it will change direction and start moving in the backward direction, and at some point it will start rolling. But if translation and rotation kinetic energy both become zero simultaneously then the ball will stop moving.
 
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  • #21
Pranav-Arora said:
But then, it means I can't use the instantaneous centre of rotation. :confused:

Use COM as it can always be used.
 
  • #22
Hi Pranav-Arora! :smile:
Pranav-Arora said:
Let the force act at distance R/4 below the centre of mass of the ball.

Torque about the instantaneous centre of rotation is ##\tau=F(3R/4)=I_{c.o.r}\alpha##
where ##I_{c.o.r}=7MR^2/5##.

From Newton's second law: ##F-f=Ma##.

Angular acceleration is related to acceleration of CM of ball by ##\alpha=a/R##. I guess friction is known here, right?

your basic equation is ##\tau=Fh =I_{c.o.r}\alpha##

to solve this, you need one more equation

if it's rolling, that equation is the rolling constraint ##a = r\alpha##

if it's sliding, that equation is F - µkmg = ma :wink:
Pranav-Arora said:
But then, it means I can't use the instantaneous centre of rotation. :confused:

technically, you have to use a fixed point (for the torque)

however, you can usually get away with using the (moving) centre of mass …

the fundamental angular momentum equation is τP = dLP/dt about any fixed point P

since LP = Ic.o.mω + rc.o.m x mvc.o.m,

we can ignore the last term only if d/dt(rc.o.m x mvc.o.m) = 0

fortunately, for eg a cylinder (or a ball rolling in a straight line, but not a cone) rolling on a flat surface, if P is an "initial" position of the c.o.m, then rc.o.m is always parallel to mvc.o.m, so that's d/dt(0)

and (same case), if P is an "initial" position of the c.o.r, then rc.o.r is always parallel to mvc.o.m, so that's d/dt((rc.o.m - rc.o.r) x mvc.o.m) = mr2α, which we can add to Ic.o.mω to get Ic.o.rω

and for a cylinder rolling up a step, when it is rotating about the edge P of the step, rc.o.m x mvc.o.m is of magnitude mr|v| = mr2ω in a constant direction (parallel to the edge), and so d/dt of it is mr2α, which again we can add to Ic.o.mω to get Ic.o.rω !

conclusion: it's not as simple as you might think …

technically, you should use a fixed point P, and the complete equation LP = Ic.o.mω + rc.o.m x mvc.o.m

but there are many situations where you can get away with just Ic.o.mω or Ic.o.rω :smile:
 
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  • #23
Hi tiny-tim! :smile:

tiny-tim said:
your basic equation is ##\tau=Fh =I_{c.o.r}\alpha##

to solve this, you need one more equation

if it's rolling, that equation is the rolling constraint ##a = r\alpha##

if it's sliding, that equation is F - µkmg = ma :wink:

In the backspin case, the ball slides so we can't use the rolling constraint. So I have these equations:

##\tau=Fh =I_{c.o.r}\alpha##
##F-\mu_k mg=ma##

But I still need one more equation. I want to find the minimum force required for backspin. Do I need some more information to solve the problem?

technically, you have to use a fixed point (for the torque)

however, you can usually get away with using the (moving) centre of mass …

the fundamental angular momentum equation is τP = dLP/dt about any fixed point P

since LP = Ic.o.mω + rc.o.m x mvc.o.m,

we can ignore the last term only if d/dt(rc.o.m x mvc.o.m) = 0

fortunately, for eg a cylinder (or a ball rolling in a straight line, but not a cone) rolling on a flat surface, if P is an "initial" position of the c.o.m, then rc.o.m is always parallel to mvc.o.m, so that's d/dt(0)

Superb explanation, thanks a lot tiny-tim! :smile:

But I am still stuck at the following point:
and (same case), if P is an "initial" position of the c.o.r, then rc.o.r is always parallel to mvc.o.m, so that's d/dt((rc.o.m - rc.o.r) x mvc.o.m) = mr2α, which we can add to Ic.o.mω to get Ic.o.rω

How do you get "d/dt((rc.o.m - rc.o.r) x mvc.o.m) = mr2α"? I have attached an image describing the situation. I hope it will help you to explain things easily.
 

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  • #24
Hi Pranav-Arora! :smile:
Pranav-Arora said:
In the backspin case, the ball slides so we can't use the rolling constraint. So I have these equations:

##\tau=Fh =I_{c.o.r}\alpha##
##F-\mu_k mg=ma##

But I still need one more equation. I want to find the minimum force required for backspin. Do I need some more information to solve the problem?

if you know what F is, the first equation gives you α and the second equation gives you a

the minimum force will be when a = rα :wink:
How do you get "d/dt((rc.o.m - rc.o.r) x mvc.o.m) = mr2α"? I have attached an image describing the situation. I hope it will help you to explain things easily.

rc.o.m - rc.o.r is a constant, the vertical vector of length r

so you have d/dt(mrv) = mrdv/dt = mra = mr2α :smile:

(btw, I've decided to use the forum's Fixedsys font for α … it comes out much better o:)

but can everybody see it? maybe the more popular Georgia font would be better: α ? :confused:)​
 
  • #25
tiny-tim said:
if you know what F is, the first equation gives you α and the second equation gives you a

the minimum force will be when a = rα :wink:

I honestly don't get this, why the force is minimum when you use the rolling constraint? :confused:

rc.o.m - rc.o.r is a constant, the vertical vector of length r

so you have d/dt(mrv) = mrdv/dt = mra = mr2α :smile:

Thank you once again tiny-tim! :smile:

(btw, I've decided to use the forum's Fixedsys font for α … it comes out much better o:)

but can everybody see it? maybe the more popular Georgia font would be better: α ? :confused:)​
The fixedsys one looks quite small but is still readable. Georgia one is ok, looks more like an "a" but I usually use LaTeX to write out the symbols. :)
 
  • #26
Pranav-Arora said:
I honestly don't get this, why the force is minimum when you use the rolling constraint? :confused:

rolling is defined as a = rα

anything else isn't rolling

if you gradually decrease F (for a particular µk) until you get rolling, the minimum F will be when rolling occurs, ie a = rα :smile:

(hmm … or maybe we should increase F, and use the rolling equations, and find the value of F for which the friction equals µsmg ? :confused:)
 
  • #27
tiny-tim said:
rolling is defined as a = rα

anything else isn't rolling

if you gradually decrease F (for a particular µk) until you get rolling, the minimum F will be when rolling occurs, ie a = rα :smile:

(hmm … or maybe we should increase F, and use the rolling equations, and find the value of F for which the friction equals µsmg ? :confused:)

Let me state the problem once again.

A solid sphere (or a billiard ball) is at rest on a rough horizontal surface with coefficient of friction ##\mu_k##. A force acts below the CM at a distance R/4. Find the minimum force required so that the sphere backspins. (I hope I wrote the problem correctly.)

In case of backspin, the friction acts backward. The equations I have posted before are still valid.

I was thinking that I will have to deal with impulse. I guess the problem is poorly worded.

Please modify the problem statement as you wish. :)
 

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  • #28
if you start with small F, the ball will roll

if you gradually increase F (until rolling stops), you will get the equations i mentioned, with the condition involving µs

however, if you start with large F, the ball will slide

if you gradually decrease F (until rolling starts), you will get the equations i mentioned, with the condition involving µk
Pranav-Arora said:
I was thinking that I will have to deal with impulse.

i think what really matters is the force

if during the impulse the maximum force is enough to produce sliding, then the ball will slide
 
  • #29
tiny-tim said:
if you start with small F, the ball will roll

if you gradually increase F (until rolling stops), you will get the equations i mentioned, with the condition involving µs

however, if you start with large F, the ball will slide

if you gradually decrease F (until rolling starts), you will get the equations i mentioned, with the condition involving µk


i think what really matters is the force

if during the impulse the maximum force is enough to produce sliding, then the ball will slide

Thank you very much for the help tiny-tim! :smile:
 

1. What is the "toppling problem" and why is it important to solve?

The toppling problem refers to the issue of objects falling over due to an unbalanced distribution of weight or force. It is important to solve because it can lead to accidents, damage, and other safety hazards.

2. What is the torque equation and how does it relate to solving the toppling problem?

The torque equation is a mathematical formula that calculates the amount of rotational force applied to an object. It is important in solving the toppling problem because it helps determine the stability of an object and how likely it is to topple over.

3. How can understanding the concept of center of mass help solve the toppling problem?

The center of mass is the point where an object's mass is evenly distributed. By understanding this concept, we can determine the stability of an object and how to distribute weight or force to prevent toppling. It also helps us calculate the torque equation more accurately.

4. How can we use the torque equation to prevent toppling in real-life scenarios?

We can use the torque equation to calculate the amount of force needed to balance an object and prevent it from toppling over. This can be applied in various real-life scenarios, such as designing stable structures or securing objects on a moving vehicle.

5. Are there any limitations to using the torque equation to solve the toppling problem?

While the torque equation is a useful tool in solving the toppling problem, it does have limitations. It assumes that all forces acting on an object are known and that the object is rigid and does not deform under force. In real-life scenarios, there may be other factors at play that can affect the stability of an object.

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