Equation of motion of a particle is ` x =( 2t^(2)-t^(3))m`. Calculate the acceleration in t=2 s.

The position x of a particle varies with t as x = at^(2)-bt^(3) . Calculate the acceleration after 2 seconds.

Relation between distance covered s and time t of a moving particles is , s = 2t^(3)-4t^(2)+3t , What will be the velocity and acceleration after 3 s?

If the acceleration of a particle at time t seconds be 1.2t^(2)ft//s^(2) and velocity of the particle at time 2 seconds be 2.2 ft/s, then find its velocity at time 5 seconds.

The position-time relation of a moving particle is x = 2t -3t^(2) . What is the maximum positive velocity of the particle?

For a particle travelling along a straight line the equation of motion is s = 16 t+5 t^(2) . Show that it will always travel with uniform acceleration.

The relation between displacement & time of a body is S = (2t^3- 4t^2 + 3t) unit What will be the acceleration after 3s?

The displacement (in meter)of a particle, moving along x-axis is given by x=18t+ 5t^2 . Calculate instantaneous acceleration.

If the distance from the initial point at a time t is given by x = t - 6t^2 + t^3 : then at what time the acceleration will be zero?

The position-time relation of a moving particle is x = 2t -3t^(2) . When does the velocity of the particle become zero? (x is in metre and t is in second)