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Question:
If a body moving in a circular path has constant speed, then there is no force acting on it.
The direction of the velocity vector of a body moving in a circular path is changing.
If a body moving in a circular path has constant speed, then there is no force acting on it.
The direction of the velocity vector of a body moving in a circular path is changing.
Updated On: May 21, 2024
- both A and R are true and R is the correct explanation of A
- both A and R ane true but R is not the correct explanation of A
- A is true but R is false
- A is false but R is true
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The Correct Option is D
Solution and Explanation
We know that if a body moves with constant speed on a circular path, it is a uniform circular motion, an acceleration along radius towards centre and has magnitude. $ a={{a}_{r}}=\frac{{{v}^{2}}}{r}=r{{\omega }^{2}} $ This is called central acceleration. So, speed and magnitude of acceleration are constant but their direction are always changing to provide centripetal acceleration by Newtons second law of force, $ F=ma=\frac{m{{v}^{2}}}{r}=mr{{\omega }^{2}} $ This force is called centripetal force and is of constant magnitude but changing direction. Hence assertion is wrong and reason which is, that the direction of velocity vector of a body moving in a circular path is changing is true.
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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
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