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Question

A particle of mass m is released on a smooth track in a vertical plane which transforms into a circular arc of radius R. Find the reaction force exerted at the bottom-most position.


  1. 6mg

  2. 7mg

  3. 5mg

  4. 9mg

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Solution

The correct option is A

6mg


Step 1. Given Data,

Height,h= 3R

Ris the radius of the circular arc

mis the mass of the particle

Step 2. Formula used,

Potential energy, PE=mgh

Kinetic energy, KE=12mv2

Centripetal force, N=mv2R

his the height

Ris the radius of the circular arc

v is the velocity of the particle

mis the mass of the particle

Principle of conservation of energy,

KEinitial+Uinitial=KEfinal+Ufinal, which we can write as KEh+PEh=KEb+PEb

The Kinetic energy of a particle at the highest point is KEh.

The potential energy of a particle at the highest point is PEh.

The Kinetic energy of a particle at the bottom-most position is KEb.

The potential energy of a particle at the bottom-most position is PEh.

Step 3. Calculations of the force,

Apply the principle of conservation of energy from the highest point to the bottom-most position,

Height, h= 3R

KEh+PEh=KEb+PEb0+mg(3R)=12mv2+0v=6gR

The reaction force at the bottom-most position,

N = centripetal force

=mv2R=m(6gR)2R=6mg

Therefore the reaction force at the bottom-most position is 6mg.

The reaction force is the effect of inertia, not due to actual forces. As as for the centripetal force, its reaction force is just from the object acting on whatever is supplying the centripetal force.

Hence option A is the correct answer.


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