A particle starts moving with a constant...

A particle starts moving with a constant angular acceleration in a circular path. The time at which the magnitudes of tangential and radial acceleration are equal is

Text Solution

AI Generated Solution

To solve the problem of finding the time at which the magnitudes of tangential and radial acceleration are equal for a particle moving with constant angular acceleration in a circular path, we can follow these steps: ### Step-by-Step Solution: 1. **Understand the Definitions**: - **Tangential Acceleration (a_t)**: This is the acceleration that is tangent to the circular path and is given by the formula: \[ a_t = \alpha r ...

Similar Questions

Explore conceptually related problems

A particle is moving with a constant angular acceleration of 4rad//s^(2) in a circular path. At time t=0 , particle was at rest. Find the time at which the magnitudes of centripetal acceleration and tangential acceleration are equal.

A particle is moving along a circular path ofradius R in such a way that at any instant magnitude of radial acceleration & tangential acceleration are equal. 1f at t = 0 velocity of particle is V_(0) . Find the speed of the particle after time t=(R )//(2V_(0))

A point mass moves along a circle of radius R with a constant angular acceleration alpha . How much time is needed after motion begins for the radial acceleration of the point mass to be equal to its tangential acceleration ?

A particle starts from rest and moves with constant acceleration. Then velocity displacement curve is:

A ball starts moving in a circular slot with angular acceleration alpha = 2 rad //s^2 at t=0 The angle between its velocity and acceleration varies with time as

A point starts from rest and moves along a circular path with a constant tangential acceleration. After one rotation, the ratio of its radial acceleration to its tangential acceleration will be equal to

A particle moves with decreasing speed along the circle of radius R so that at any moment of time its tangential and centripetal accelerations are equal in magnitude. At the initial moment , t =0 its speed is u. The magnitude of tangential acceleration at t = R/(2u) is

A disc rotates about its axis with a constant angular acceleration of 4rad/s^2 . Find the radial and tangential acceleration of a particle at a distance of 1 cm from the axis at the end of the first second after the disc starts rotating.

A particle moves in a plane with a constant acceleration in a direction different from the initial velocity. The path of the particle is

A particle moves in a circle with constant tangential acceleration starting from rest. At t = 1/2 s radial acceleration has a value 25% of tangential acceleration. The value of tangential acceleration will be correctly represented by

A particle starts moving with a constant angular acceleration in a circular path. The time at which the magnitudes of tangential and radial acceleration are equal is

Text Solution

Similar Questions

Recommended Questions