The equation of a particle is `x=t^(3)-9t^(2)+3t+1` and `v=-24`, then a = . . . . . . .

Equation of the motion of the particle is S = t^(3)-6t^(2)+9t , where S is in mets and t is in seconds. (i) Find the instantaneous velocity when t = 2. (ii) When particle is at rest ? (iii) Find distance travelled by particle in first 5 second.

The position of a particle is given by x=7+ 3t^(3) m and y=13+5t-9t^(2)m , where x and y are the position coordinates, and t is the time in s. Find the speed (magnitude of the velocity) when the x component of the acceleration is 36 m//s^(2) .

The equation of motion of a particle is x= a cos (alpha t)^(2) . The motion is………..

The equation of a particle in motion is S=(1)/(4)t^(4)-2t^(3)+4t^(2)-7 . When its acceleration become minimum ?

The displacement equation of a particle is x=3 sin 2t+4cos2t . The amplitude and maximum velocity will be respectively

The position x of a particle varies with time t as x=at^(2)-bt^(3) . The acceleration at time t of the particle will be equal to zero, where (t) is equal to .

If the velocity of a particle moving along x-axis is given as v=(3t^(2)-2t) and t=0, x=0 then calculate position of the particle at t=2sec.

Angular position theta of a particle moving on a curvilinear path varies according to the equation theta=t^(3)-3t^(2)+4t-2 , where theta is in radians and time t is in seconds. What is its average angular acceleration in the time interval t=2s to t=4s ?

Angular position theta of a particle moving on a curvilinear path varies according to the equation theta=t^(3)-3t^(2)+4t-2 , where theta is in radians and time t is in seconds. What is its average angular acceleration in the time interval t=0s to t=2s?

The distance s moved by a particle in time t is given by s=t^(3)-6t^(2)+6t+8 . When the acceleration is zero, the velocity is ………..