A particle moves in a straight line so that its velocity at any point is given by `v^(2)=a+bx`, where `a,b ne 0` are constants. The acceleration is

A particle moves in a straight line in such a way that its velocity at any point is given by v^2=2-3x , where x is measured from a fixed point. The acceleration is

The displacement x of a particle at time t moving along a straight line path is given by x^(2) = at^(2) + 2bt + c where a, b and c are constants. The acceleration of the particle varies as

A particle in moving in a straight line such that its velocity is given by v=12t-3t^(2) , where v is in m//s and t is in seconds. If at =0, the particle is at the origin, find the velocity at t=3 s .

A particle is moving in a straight line such that its velocity varies as v=v_(0) e^(-lambdat) , where lambda is a constant. Find average velocity during the time interval in which the velocity decreases from v_(0) to v_(0)/2 .

A particle moving in a straight line has velovity v given by v^(2)=alpha-betay^(2) , where alpha and beta are constants and y is its distance from a ficed point in the line. Show that the motion of particle is SHM. Find its itme period and amplitude.

A particle moves in a straight line so that s=sqrt(t) , then its acceleration is proportional to

For a particle moving along a straight line, its velocity 'v' and displacement 's' are related as v^(2) = cs , here c is a constant. If the displacement of the particle at t = 0 is zero, its velocity after 2 sec is: