Question:

A body moves along a circular path of radius $10\, m$ and the coefficient of friction is $0.5$. What should be its angular speed in rad/s if it is not to slip from the surface? ( $ g=9.8\text{ }m{{s}^{-2}} $ )

Updated On: Jun 20, 2022
  • 5
  • 10
  • 0.1
  • 0.7
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The Correct Option is D

Solution and Explanation

The necessary centripetal force to the coin is provided by the frictional force.
For moving on circular path without slipping, centripetal force must equal frictional force. That is,
$ \frac{m{{v}^{2}}}{r}=\mu mg $
Or $ mr{{\omega }^{2}}=\mu mg $
$ (\therefore v=r\omega ) $
Or $ r{{\omega }^{2}}=\mu g $
Given, $r = 10m, \mu = 0.5 \,g = 9.8 \,ms^{-2}$
$\therefore 10\omega^2 = 0.5 \times 9.8$
or $\omega = \sqrt{\frac{0.5\times 9.8}{10}}$
$ = 0.7\,rad/s$
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Concepts Used:

Motion in a Plane

It is a vector quantity. A vector quantity is a quantity having both magnitude and direction. Speed is a scalar quantity and it is a quantity having a magnitude only. Motion in a plane is also known as motion in two dimensions. 

Equations of Plane Motion

The equations of motion in a straight line are:

v=u+at

s=ut+½ at2

v2-u2=2as

Where,

  • v = final velocity of the particle
  • u = initial velocity of the particle
  • s = displacement of the particle
  • a = acceleration of the particle
  • t = the time interval in which the particle is in consideration