A solid disc and a ring, both of radius 10 cm are placed on a horizontal table simultaneously, with initial angular speed equal to 10 p rad s-1. Which of the two will start to roll earlier ? The co-efficient of kinetic friction is μ _k = 0.2.
Given, the radius of both the solid disc and the ring is 10 cm and their initial angular velocity is 10 π rad-s − 1 . The coefficient of kinetic friction is 0.2.
The expression for the linear velocity at the point of contact is,
v 0 = R ω 0
Here, R is the radius of the circular object and ω 0 is the initial angular speed.
Substituting the given values in the above equation, we get:
v 0 = ( 10 × 10 − 2 ) ( 10 π ) = π m / s
The expression for the normal force acting at the point of contact is,
N = m g
Here, m is the mass of the circular object and g is the gravitational acceleration.
The expression for the frictional force acting at the point of contact is,
f k = μ k N
Here, μ k is the coefficient of kinetic friction and N is the normal force acting at the point of contact.
Substituting m g for N in the above equation, we get:
f k = μ k m g
The net force acting at the point of contact is,
F n e t = m a
Here, a is the net acceleration.
The only force acting at the point of contact is the frictional force. Therefore,
F n e t = f k
Substituting m a for F n e t and μ k m g for f k in the above equation, we get:
m a = μ k m g a = μ k g
The expression for linear acceleration at the point of contact is,
a = R α
The kinematic equation for the motion at the point of contact is,
v = v 0 + a t
Here, v is the final velocity and v 0 is the initial velocity at the point of contact and t is the time taken to start the rolling motion.
Substituting the values in the above equation, we get:
0 = π + ( R α ) t t = − π R α …… (1)
The expression for net torque acting on the circular object is,
f k ⋅ R = I α
Solving for α , the equation is rearranged as,
α = f k R I
Substituting f k R I for α in the equation (1), we get:
t = − π R ( f k R I ) = − π I f k R 2
Here, kinetic frictional force f k and radius R of both solid disc and ring are the same. Therefore,
t ∝ I
Moment of inertia of the solid disc is,
I D = 1 2 M R 2
Moment of inertia of the ring is,
I R = M R 2
The moment of inertia of the solid disc is less than that of the ring,
I D < I R
The time takento start the rolling motion is directly proportional to the moment of inertia of the object. Therefore,
t D < t R
Thus, the solid disc starts the rolling motion earlier than the ring.
Given, the radius of both the solid disc and the ring is 10 cm and their initial angular velocity is
The expression for the linear velocity at the point of contact is,
Here,
Substituting the given values in the above equation, we get:
The expression for the normal force acting at the point of contact is,
Here,
The expression for the frictional force acting at the point of contact is,
Here,
Substituting
The net force acting at the point of contact is,
Here,
The only force acting at the point of contact is the frictional force. Therefore,
Substituting
The expression for linear acceleration at the point of contact is,
The kinematic equation for the motion at the point of contact is,
Here,
Substituting the values in the above equation, we get:
The expression for net torque acting on the circular object is,
Solving for
Substituting
Here, kinetic frictional force
Moment of inertia of the solid disc is,
Moment of inertia of the ring is,
The moment of inertia of the solid disc is less than that of the ring,
The time takento start the rolling motion is directly proportional to the moment of inertia of the object. Therefore,
Thus, the solid disc starts the rolling motion earlier than the ring.
