A particle moves in a plane with a constant speed along a path `y=2x^(2)+3x-4` When the particle is at (0,-4) the direction along which it is moving is inclined to the X axis at an angle. Given `tan^(-2) 3=72^(@)`

A particle moves in a plane with a constant speed along a path y=2x^(2)+3x-4 When the particle is at (0,-4) the direction along which it is moving is inclined to the X axis at an angle. Given tan^(-1) 3=72^(@)

A particle moves along the parabolic path y=ax^(2) in such a The accleration of the particle is:

Angular momentum of a single particle moving with constant speed along circular path :

A particle moves in the x-y plane with constant acceleration of 4ms^-2 in the direction making an angle of 60^@ with the x-axis, the particle is at the origin and its velocity is 5 ms^-1 , along the x-axis. Find the velocity and the position of the particle at t=5s.

For a particle moving along a circular path with a constant speed, the accelerationis constant in

If a particle is moving along a circular path with constant speed, then Its motion is

A particle is moving with constant speed v along the line y = a in positive x -direction. Find magnitude of its angular velocity about orgine when its position makes an angle theta with x-axis.

A particle is moving with constant speed v along the line y = a in positive x -direction. Find magnitude of its angular velocity about orgine when its position makes an angle theta with x-axis.