IF the equation for the displancement of a particle moving on a circular path is given by `theta=2t^3+0.5`, where `theta` is in radius and t is in seconds, then the angular velocity of the particle at t=2 s is

The angular displacement of a particle performing circular motion is theta = (t^3)/60 - t/4 where theta is in radian and 't' is in seconds. Then the angular velocity and angular accleration of the particle at the end of 5 s will be

The angular displacement of a particle performing circular motion is theta = (t^3)/60 - t/4 where theta is in radian and 't' is in seconds. Then the acceleration of the particle at the end 10 s will be

The displacement of a particle in time t is given by s=2t^2-3t+1 . The acceleration is

Chose the correct option The displacement s of a particle is expressed by the relation s=(6t^2 - 3t + 6) metres and t is in seconds. The velocity of the particle at t = 2 seconds is ... m//s .

The displacement s of a particle at time t is given by s = t^3 -4 t^2 -5t. Find the velocity and acceleration at t=2 sec

The displacement of a particle moving in S.H.M. at any instant is given by y = a sin omega . The acceleration after time t=T/4 so

The equation of motion of a particle moving along a straight line is s=2t^(3)-9t^(2)+12t , where the units of s and t are cm and second. The acceleration of the particle will be zero after: a) 3/2 seconds b) 2/3 seconds c) 1/2 seconds d) 2 seconds

The displacement s of a particle at time t is is given by s=2 t^3 - 4 t^2 -5t. Then find the velocity at t=2 sec

The displacement of a particle at time t is given by s= 2 t^3 - 5 t^2 + 4t -3. Find the time when the acceleration is 14 ft/ sec^2 , find the velocity and the displacement at that time.