A particle of unit mass is moving along x-axis. The velocity of particle varies with position x as v(x). `=alphax^-beta` (where `alpha` and `beta` are positive constants and `x>0` ). The acceleration of the particle as a function of x is given as

The displacement x of a particle varies with time t as x = ae^(-alpha t) + be^(beta t) . Where a,b, alpha and beta positive constant. The velocity of the particle will.

A particle is acted upon by a force given by F = - alphax^(3) -betax^(4) where alpha and beta are positive constants. At the point x = 0, the particle is –

A particle of unit mass undergoes one-dimensional motion such that its velocity varies according to v(x) = beta x^(-2 n) where beta and n are constant and x is the position of the particle. The acceleration of the particle as a function of x is given by.

The displacement x of a particle varies with time as x=a e^(alphat)+be^(betat) where a,b,a, beta are constants and are positives. The velocity of the particle will:

The position x of particle moving along x-axis varies with time t as x=Asin(omegat) where A and omega are positive constants. The acceleration a of particle varies with its position (x) as

A particle is moving along x -axis. Its velocity v with x co-ordinate is varying as v=sqrt(x) . Then

The velocity upsilon of a particle as a function of its position (x) is expressed as upsilon = sqrt(c_(1)-c_(2)x) , where c_(1) and c_(2) are positive constants. The acceleration of the particle is

The velocity of a particle moving in the positive direction of X-axis varies as v=5sqrt(x) . Assuming that at t = 0, particle was at x = 0. What is the acceleration of the particle ?

The position of a particle is given by x=2(t-t^(2)) where t is expressed in seconds and x is in metre. The acceleration of the particle is