In a non - uniform circular motaion the ratio of tangential to radial acceleration is (where, r= radius of circle, v= speed of the particle, `alpha=` angular acceleration)

In a non uniform circular motion, the acceleration on the particle is

Non-uniform circular motion: radial & tangential acceleration| Radius of curvature

Non-uniform circular motion: radial & tangential acceleration| Radius of curvature

In non-uniform circular motion , particle will have . . . . . And tangential acceleration

For a particle in uniform circular motion the acceleration a at a point P(R,θ) on the circle of radius R is (here 'v' is the speed of the particle and θ is measured from the x-axis)

The tangential and radial acceleration of a particle are a(t) and a(r) respectively. The motion of a particle is circular if

A body revolving with uniform speed v in a circular path of radius r. The tangential acceleration is

Assertion:- A particle is moving in a circle with constant tangential acceleration such that its speed v is increasing. Angle made by resultant acceleration of the particle with tangential acceleration increases with time. Reason:- Tangential acceleration =|(dvecv)/(dt)| and centripetal acceleration =(v^(2))/(R)

Assertion:- A particle is moving in a circle with constant tangential acceleration such that its speed v is increasing. Angle made by resultant acceleration of the particle with tangential acceleration increases with time. Reason:- Tangential acceleration =|(dvecv)/(dt)| and centripetal acceleration =(v^(2))/(R)

Assertion:- A particle is moving in a circle with constant tangential acceleration such that its speed v is increasing. Angle made by resultant acceleration of the particle with tangential acceleration increases with time. Reason:- Tangential acceleration =|(dvecv)/(dt)| and centripetal acceleration =(v^(2))/(R)