A particle moves on x-axis as per equation `x = (t^(3)- 9t^(2) +15t +2)m`. Distance travelled by the particle between `t = 0` and `t = 5s` is

Position of a particle moving along x-axis is given by x=2+8t-4t^(2) . The distance travelled by the particle from t=0 to t=2 is:-

A particle moves along the X-axis as x=u(t-2s)+a(t-2s)^2 .

The speed-time graph of a particle moving along a fixed direction is shown in figure. Obtain the distance traversed by the particle between (a) t =0 s to 10s. (b) t = 2 s to 6s. What is the average speed of the particle over the intervals in (a) and (b) ?

A particle moves on x-axis such that its KE varies as a relation KE= 3t^(2) then the average kinetic energy of a particle in 0 to 2 sec is given by :

a particle moves on a circular path of radius 8 m. distance traveled by the particle in time t is given by the equation s=2/3 t^(3) . Find its speed when tangential and normal accelerations have equal magnitude.

(a) The position of a particle moving along the x-axis depends on the time according to equation. x=(3t^(2)-t^(3)) m. At what time does the particle reaches its maximum x-position? (b) What is the displacement during the first 4s.

A particle moves along x-axis according to the law x=(t^(3)-3t^(2)-9t+5)m . Then The average acceleration from 1 le t le 2 second is

A particle moves along a straight line OX . At a time t (in seconds) the distance x (in metre) of the particle is given by x = 40 +12 t - t^3 . How long would the particle travel before coming to rest ?

If velocity (in ms^(-1) ) varies with time as V = 5t, find the distance travelled by the particle in time interval of t = 2s to t = 4 s.

The positon of an object moving along x-axis is given by x(t) = (4.2 t ^(2) + 2.6) m, then find the velocity of particle at t =0s and t =3s, then find the average velocity of particle at t =0 s to t =3s.