The relation, `x=t^(2)-t ` describes the position of a particle in one direction with respect to time where "x" is in meters and "t" is in second.The position, "x" when velocity is zero,is

The relation 3t=sqrt(3x)+6 describe the displacement of a particle in one direction where x is in metres and t in sec. The displacement, when velocity is zero is

The displacement x of a particle moving in one direction is given by t=sqrtx +3 , where x in meter and t in sec. What is its displacement when its velocity is zero

The position of a particle is given by x=2(t-t^(2)) where t is expressed in seconds and x is in metre. The particle

The position 'x' of a particle moving along x-axis at any instant t represent by given equation t= sqrtx+3, where x is in M , where x is in meters and t is in seconds. The position of particle at the instant when its velocity is zero.

A motion is described by Y = 4e^(x) (e ^- (5t)) , Where y,x are in meters and t is in second .

The motion of a particle along a straight line is described by the function x=(2t -3)^2, where x is in metres and t is in seconds. Find (a) the position, velocity and acceleration at t=2 s. (b) the velocity of the particle at origin.

The motion of a particle along a straight line is described by the function x=(2t -3)^2, where x is in metres and t is in seconds. Find (a) the position, velocity and acceleration at t=2 s. (b) the velocity of the particle at origin.

The position of a particle is given by x=2(t-t^(2)) where t is expressed in seconds and x is in metre. The acceleration of the particle is

The displacement x of a particle moving in one dimension under the action of a constant force is related to time t by the equation t=sqrt(x)+3 , where x is in meter and t is in second. Find the displacement of the particle when its velocity is zero.

The position of a particle is expressed as vecr = ( 4t^(2) hati + 2thatj) m, where t is time in second. Find the velocity o the particle at t = 3 s