What is the power needed to maintain uniform circular motion
Answers
Answered by
0
Imagine a body moving in a circle, its motion would be called circular motion. Now imagine a constant speed body moving in a circle, the motion of this body will be called uniform circular motion. In case of uniform circular motion, the speed is constant but velocity is changing every instant.

If a particle is moving in a circle, it must have some acceleration acting towards the centre which is making it move around the centre . Since this acceleration is perpendicular to the velocity of particle at every instant, it is only changing the direction of velocityand not magnitude and that’s why the motion is uniform circular motion. We call this acceleration centripetal acceleration (or radial acceleration), and the force acting towards the centre is called centripetal force. In
In case of uniform circular motion, the acceleration is:
= =
If the mass of the particle is m, we can say from second law of motion that:
=
=
This is not a special force, actually force like tension or friction may be the cause of origination of centripetal force. When the vehicles turn on the roads, it is the frictional force between tires and ground which provides the required centripetal force for turning.
So if a particle is moving in uniform circular motion:
1) Its speed is constant
2) Velocity is changing at every instant
3) There is no tangential acceleration
4) Radial (centripetal) acceleration =
5) =
In case of non-uniform circular motion, there is some tangential acceleration due to which the speed of particle increases or decreases. The resultant acceleration is the vector sum of radial acceleration and tangential acceleration.

If a particle is moving in a circle, it must have some acceleration acting towards the centre which is making it move around the centre . Since this acceleration is perpendicular to the velocity of particle at every instant, it is only changing the direction of velocityand not magnitude and that’s why the motion is uniform circular motion. We call this acceleration centripetal acceleration (or radial acceleration), and the force acting towards the centre is called centripetal force. In
In case of uniform circular motion, the acceleration is:
= =
If the mass of the particle is m, we can say from second law of motion that:
=
=
This is not a special force, actually force like tension or friction may be the cause of origination of centripetal force. When the vehicles turn on the roads, it is the frictional force between tires and ground which provides the required centripetal force for turning.
So if a particle is moving in uniform circular motion:
1) Its speed is constant
2) Velocity is changing at every instant
3) There is no tangential acceleration
4) Radial (centripetal) acceleration =
5) =
In case of non-uniform circular motion, there is some tangential acceleration due to which the speed of particle increases or decreases. The resultant acceleration is the vector sum of radial acceleration and tangential acceleration.
Similar questions