Angular displacement (`theta`) of a flywheel varies with time as `theta=2t+3t^2` radian. The angular acceleration at t=2s is given by

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

A flywheel revolves at 100 rev/min, a torque is applied to the flywheel for 10 s if thetorque increases the speed to 200 rev/min, then the angular acceleration of the flywheel will be

The angle turned by a body undergoing circular motion depends on time as theta = theta_(0)+theta_(1)t+theta_(2)t^(2) . Then the angular acceleration of the body is

Initial angular velocity of a wheel is 2 rad/s. It rotates with a constant angular acceleration of 3.5 rad//s^2 . Its angular displacement in 2 s is

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

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 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 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.