A particle moves along the X-axis. The position x of particle w.r.t. time from origin given by `x=b_0+b_1+b_2t^2` .The acceleration of particle is

A particle moves along x -axis. The position of the particle at time t is given as x=t^(3)-9t^(2)+24t+1 . Find the distance traveled in first 5 seconds.

The displacement 'x' of a particle moving along a straight line at time t is given by x=a_(0)+a_(1)t+a_(2)t^(2) . The acceleration of the particle is :-

The displacement x of a particle along the x-axis at time t is given by x=a_1/2t+a_2/3t^2 . Find the acceleration of the particle.

The position x of a particle varies with time t as x=at^(2)-bt^(3) .The acceleration of the particle will be zero at time t equal to

The position x of a particle varies with time t as x=At^(2)-Bt^(3) .the acceleration at time t of the particle will be equal to zero

A particle is moving along x-axis. The position of the particle at any instant is given by x = a + bt^(2)," where, "a = 6m and b =3.5 ms^(-2) , t is measurved in seconds. Find. Velocity of the particle at t = 0 and t = 3s

The position of a particle moving in x-y plane changes with time t given by vecx= 3t^2hati + 9thatj . The acceleration of particle would be

The position x of a particle varies with time t as x=a t^(2)-b . For what value of t acceleration is zero?

A particle moves a distance x in time t according to equation x^(2) = 1 + t^(2) . The acceleration of the particle is