A particle is travelling along a straight line OX. The distance x (in metres) of the particle from O at a time t is given by `x=37+27t-t^(3)` where t is time in seconds. The distance of the particle from O when it comes to rest is

A particle is moving in a straight line. At time, the distance between the particle from its starting point is given by x=t-6t^(2)+t^(3) . lts acceleration will be zero at

A particle is moving along a straight line OX. The displacement (x) from the point o and the time (t) taken are related as x = 40 +12t- t^(3) , where x is in metre and t in second. How far would the particle move before coming to rest ?

The x and y coordiates of a particle at any time t are given by x = 7t + 14 t^(2) and y = 5t, where x and y are in metre and t is in second. The acceleration of the particle at t = 5 s is

The distance S metres moved by a particle traveling in a straight line in t second is given by S = 45t +11t^2-t^3 . Find the time when the particle comes to rest.

A particle moves along X-axis and its displacement at any time is given by x(t) = 2t^(3) -3t^(2) + 4t in SI units. The velocity of the particle when its acceleration is zero, is

The distance covered by a particle in t seconds is given by x=3+8t-4t^(2) . After 1 second its velocity will be

A particle starts moving from rest from a fixed point in a fixed direction. The distances from the fixed point at a time t is given by s= t^(2)+at-b+17 , where a, b are real numbers. If the particle comes to rest after 5 sec at a distance of s = 25 units from the fixed point, then values of a and bare respectively