A particle moves in a straight line such that its displacement is `s^(2)=t^(2)+1` Find.
(i) velocity

A particle moves in a straight line such that its displacement is s^(2)=t^(2)+1 Find. (ii) acceleration as a function of 's'

A particle moves along a straight line such that its displacement s at any time t is given by s=t^3-6t^2+3t+4m , t being is seconds. Find the velocity of the particle when the acceleration is zero.

A particle is moving in a straight line such that its displacement s at an instant of time t is given by the relation s = 3t^2 + 4 t + 5 Find the initial velocity of the particle.

The acceleration (a) of a particle moving in a straight line varies with its displacement (s) as a=2s+1 . The velocity of the particle is zero at zero displacement. Find the corresponding velocity-displacement equation.

A particle moves along a straight line such that its displacement at any time t is given by s = 3t^(3)+7t^(2)+14t + 5 . The acceleration of the particle at t = 1s is

A particle moves along a straight line such that its displacement at any time t is given by s = 3t^(3)+7t^(2)+14t + 5 . The acceleration of the particle at t = 1s is

A particle moves along a straight line such that its displacement at any time t is given by S= (t^3-3t^2+2) m What is the displacement when the acceleration is zero ?

The acceleration (a) of a particle moving in a straight line varies with its displacement (s) as a=2s . The velocity of the particle is zero at zero displacement. Find the corresponding velocity-displacement equation.

A partical moves along a straight line such that its displacement s=alphat^(3)+betat^(2)+gamma , where t is time and alpha , beta and gamma are constant. Find the initial velocity and the velocity at t=2 .