A particle moves so that the distance moved is according to the law `s(t)=(t^(3))/(3)-t^(2)+3`. At what time the velocity and acceleration are zero respectively ?

A particle moves so that the distance moved in according to the law s(t)=(t^(3))/(3)-t^(2)+3 . At what time the velocity and acceleration are zero respectively ?

The equation of motion is given by s(t)=2t^3-6t^2+6 At what time, the velocity and accelerations are zero?

The equation of motion is given by s(t) = 2t^(3) - 6t^(2) + 6 . At what time the velocity and accelerations are zero?

A particle moves along a line according to the law s(t)=2t^(3)-9t^(2)+12t-4 , where tge0 . At what times the particle changes direction?

A particle moves along a line according to the law s(t)=2t^(3)-9t^(2)+12t-4 , where tge0 . Find the particle's acceleration each time the velocity is zero.

If a particle moves is a straight line according to s=t^(3)-6t^(2)-15t , the time interval during which the velocity is negative and acceleration is positive is

A particle moves along a line according to the law s(t)=2t^(3)-9t^(2)+12t-4 , where tge0 . Find the total distance travelled by the particle in the first 4 seconds.

A particle moves along a line according to the law s(t)=2t^(3)-9t^(2)+12t-4 , where t ge 0 . (i) At what times the particle changes direction ? (ii) Find the total distance travelled by the particle in the first 4 seconds (iii) Find the particle's acceleration each time the velocity is zero.

The velocity of a particle is zero at t=0