A particle moves along a parabolic parth `y = 9x^(2)` in such a way that the x-component of velocity remains constant and has a value `1/3 ms ^(-1)` . The acceleration of the particle is -

A particle moves along a parabolic path y=-9x^(2) in such a way that the x component of velocity remains constant and has a value 1/3m//s . Find the instantaneous acceleration of the projectile (in m//s^(2) )

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

A particle moves along the parabolic path x = y^2 + 2y + 2 in such a way that Y-component of velocity vector remains 5ms^(-1) during the motion. The magnitude of the acceleration of the particle is

A particle moves along a path y = ax^2 (where a is constant) in such a way that x-component of its velocity (u_x) remains constant. The acceleration of the particle is

A particle moves along the parabola y^(2)=2ax in such a way that its projection on y-axis has a constant velocity.Show that its projection on the x-axis moves with constant acceleration

A particle is moveint along the x-axis whose instantaneous speed is given by v^(2)=108-9x^(2) . The acceleration of the particle is.

A particle of mass m movies along a curve y=x^(2) . When particle has x-co-ordinate as 1//2 and x-component of velocity as 4 m//s . Then :-

A particle moves along the x-axis in such a way that its x-co-ordinate varies with time as x = 2 – 5t + 6t^(2) . The initial velocity and acceleration of particle will respectively be-

The displacement of a particle moving along x-axis is given by : x = a + bt + ct^2 The acceleration of the particle is.

A particle moves uniformly with speed v along a parabolic path y = kx^(2) , where k is a positive constant. Find the acceleration of the particle at the point x = 0.