Displacement (y) of the particle is given by:
`y = 2 t + t ^ { 2 } - 2 t ^ { 3 }`. Then, the velocity of the particle when acceleration is zero is

The velocity of a particle is zero at t=0

If s = t^(3) - 4t^(2) + 7 the velocity when the acceleration is zero is

Displacement of a particle is given by the expression x = 3 t ^ { 2 } + 7 t - 9 , where x is in meter and t is in seconds. What is acceleration ?

If the position vector of the particle is given by vecr = 3 t^2 hati + 5t hatj + 4hatk . Find the velocity of the particle at t = 3s.

The velocity of a particle is given by the equation, v = 2t^(2) + 5 cms^(-1) . Find the change in velocity of the particle during the time interval between t_(1) = 2s and t_(2) = 4s .

The equation of motion is given by s(t) = 2t^(3) - 6t^(2) + 6 . At what time the velocity and accelerations are zero?

If position of a particle at instant t is given by x=3t^(2) , find the velocity and acceleration of the particle.

If the displacement of a particle executing SHM, is given by y=0.30 sin (220t+0.64) in metre, then the frequency and the maximum velocity of the particle are (t is in seconds)…………….

A particle moves in a straight line according to the relation: x = t ^ { 3 } - 4 t ^ { 2 } + 3 t Find the acceleration of the particle at displacement equal to zero.