Skip to content Skip to navigation

OpenStax-CNX

You are here: Home » Content » Rolling along an incline

Navigation

Recently Viewed

This feature requires Javascript to be enabled.
 

Rolling along an incline

Module by: Sunil Kumar Singh. E-mail the author

Summary: Rolling along an incline is an accelerated rolling due to the force of gravity acting through center of mass.

Note: You are viewing an old version of this document. The latest version is available here.

Gravitational force acts through center of mass of a body. Thus, gravity provides a natural mechanism for rolling along an incline, in which the external force acts through center of mass. An incline is an ideal arrangement to realize the accelerated motion under gravity.

The component of force parallel to the plane acts through center of mass. As discussed in earlier module, friction between rolling body and surface appears in the backward direction. If the disk rolls down, then static friction acts up the incline as shown in the figure.

Figure 1: The static friction acts up the incline.
Rolling down an incline
 Rolling down an incline  (ri1.gif)

Friction here plays dual role :

  • It decelerates translational motion.
  • It accelerates rotational motion.

As the body rolls down, linear velocity increases with time such that its angular velocity also increases simultaneously in accordance with equation of rolling,

v C = ω R v C = ω R
(1)

The linear acceleration of the COM of the rolling body is equal to the component of acceleration due to gravity in x direction,

a C = α R = g sin θ a C = α R = g sin θ
(2)

The fact that accelerations are constant has important implications. The motions (translational and rotational) can be described by the constant acceleration kinematics.

Analysis of rolling along an incline

The analysis of rolling involves applying Newton’s second law for both translational and rotational motion and using equation of accelerated rolling. First of all, we select an appropriate pair of rectangular coordinates such that motion is along the positive direction of the x-coordinate. The various forces acting on the rolling disk are :

Figure 2: Forces acting on the rolling disk.
Rolling down an incline
 Rolling down an incline  (ri1.gif)

  1. Force of gravity, mg, acting downward.
  2. Normal force, N, perpendicular to the ramp in y-direction.
  3. Static friction, f s f s , acting upward.

The force/ force components are acting in mutually perpendicular directions. As such, we can analyze motion in x-direction independently.

Thus, confining force analysis in x-direction, we apply Newton's law of motion for linear motion as :

F x = mg sin θ - f s = m a C F x = mg sin θ - f s = m a C
(3)

Similarly, we apply Newton's law for rotation :

t = I α t = I α

We note here that force due to gravity and normal force pass through the center of mass. As such, they do not constitute torque on the rolling disk. It is only the friction that applies torque on the disk, which is given as :

t = f s R = I α t = f s R = I α
(4)

At this stage, we can make use of third equation that connects linear and angular accelerations for rolling without sliding :

a C = α R a C = α R
(5)

Combining equations 4 and 5,

f s R = I α = I a C R f s = I a C R 2 f s R = I α = I a C R f s = I a C R 2

Substituting the expression of friction as above in the equation – 3,

mg sin θ - I a C R 2 = m a C a C ( m + I R 2 ) = mg sin θ a C = g sin θ ( 1 + I m R 2 ) mg sin θ - I a C R 2 = m a C a C ( m + I R 2 ) = mg sin θ a C = g sin θ ( 1 + I m R 2 )

a C = g sin θ ( 1 + I m R 2 ) a C = g sin θ ( 1 + I m R 2 )
(6)

We can use this expression to find linear acceleration (hence angular acceleration also) for circular rolling bodies like ring, disk, cylinder and sphere etc. We only need to use appropriate expression of moment of inertia as the case may be.

Example 1

Problem : A block and a circular body are released from the same height of two identical inclines. The block slides down the incline, whereas circular body rolls down the incline. If acceleration of circular body is 2 3 rd 2 3 rd that of the block, then identify the circular body.

Solution : The block slides down the incline without rotating. Its acceleration is :

a B = g sin θ a B = g sin θ

The circular body rolls down the incline without sliding. Its acceleration is :

a C = g sin θ ( 1 + I m R 2 ) a C = g sin θ ( 1 + I m R 2 )

According to question,

a C = 2 a B 3 a C = 2 a B 3

g sin θ ( 1 + I m R 2 ) = 2 g sin θ 3 g sin θ ( 1 + I m R 2 ) = 2 g sin θ 3

( 1 + I m R 2 ) = 3 2 ( 1 + I m R 2 ) = 3 2

I = m R 2 2 I = m R 2 2

This is MI of either a disk or a solid cylinder. Thus, the circular body in question is either of the two.

There is a caveat in the sign of the acceleration of rolling body down the incline. If we choose the orientation of x - coordinate is opposite to the one selected here, then acceleration of the rolling body is given by the same expression, but with a negative sign preceding it :

Figure 3: Changing reference direction.
Rolling down an incline
 Rolling down an incline  (ri2.gif)

a C = - g sin θ ( 1 + I m R 2 ) a C = - g sin θ ( 1 + I m R 2 )

The sign of the quantities should not be a source of concern. We should merely stick with the sign convention and choice of coordinate system. Negative sign essentially, though a source of confusion, does not ever change the physical meaning of the quantities.

Example 2

Problem : A ring, a disk, a solid cylinder and a solid sphere of same mass and radius roll down an incline simultaneously. Which of these will the reach the bottom first? Rank them in the order they reach the bottom.

Solution : The block slides down the incline without rotating. Its acceleration is :

The object with maximum acceleration will reach the bottom first. Now, acceleration of the rolling object is given by the following equation,

a C = g sin θ ( 1 + I m R 2 ) a C = g sin θ ( 1 + I m R 2 )

From the equation, it is clear that the object with smaller moment of inertia (I) will have greater acceleration of its center of mass. Now, MI of different objects of same and radius are as given here :

I ring = m R 2 I disk/cyliner = m R 2 2 = 0.5 m R 2 I solid = 2 m R 2 5 = 0.4 m R 2 I ring = m R 2 I disk/cyliner = m R 2 2 = 0.5 m R 2 I solid = 2 m R 2 5 = 0.4 m R 2

Thus, solid sphere with minimum moment of inertia will reach the bottom first, followed by disk and cylinder. The ring will be the last to reach the bottom.

Content actions

Download module as:

Add module to:

My Favorites (?)

'My Favorites' is a special kind of lens which you can use to bookmark modules and collections. 'My Favorites' can only be seen by you, and collections saved in 'My Favorites' can remember the last module you were on. You need an account to use 'My Favorites'.

| A lens I own (?)

Definition of a lens

Lenses

A lens is a custom view of the content in the repository. You can think of it as a fancy kind of list that will let you see content through the eyes of organizations and people you trust.

What is in a lens?

Lens makers point to materials (modules and collections), creating a guide that includes their own comments and descriptive tags about the content.

Who can create a lens?

Any individual member, a community, or a respected organization.

What are tags? tag icon

Tags are descriptors added by lens makers to help label content, attaching a vocabulary that is meaningful in the context of the lens.

| External bookmarks