If the displacement of a particle is givne by `s=((1)/(2)t^(2)+4sqrtt)m`. Find the velocity and acceleration at t = 4 seconds.

If the displacement s at a time t is given by s = sqrt(1-t) , than the velocity is

A particle moves along a straight line such that its displacement at any time t is given by x =t^3-6t^2 +3t +4 in m. The velocity when acceleration is zero is

If the displacement of a particle is given by y(t)=A sin (omega t +phi) , then find the maximum velocity of the particle.

Displacement s of a particle at time t is expressed as s=1/2t^3-6t . Find the acceleration at the time when the velocity vanishes (i.e., velocity tends to zero).

The displacement of a particle is given by x=(t-2)^(2) where x is in meters and in seconds. The distance covered by the particle in first 4 seconds is :

If the distance 's' metres traversed by a particle in 1 seconds is given by s=t^(3)-3t^(2) , then the velocity of the particle when the acceleration is zero, in metres/sec. is

The distance moved by the particle in time t is given by x=t^(3)-12t^(2)+6t+8 At the instant when its acceleration is zero, the velocity is

The displacement of a particle is represented by following equation: s=3t^(3) +7t^(2) +5t +8 where is in metre and in second the acceleration of particle at s is

If s = 5 sin 2t, then the velocity at the end of pi/4 second is