The equation of motion of a particle is `(d^2y)/(dt^2)+ky=0`, where k is a positive constant. The time period of the motion is given by

The equation of SHM of a particle is (d^2y)/(dt^2)+ky=0 , where k is a positive constant. The time period of motion is

The equation of motion of a particle is x = a cos (a t)^2. The motion is

The equation of motion of a projectile is y =ax - bx^2 where a and b are constants of motion. The horizontal range of the projectile is

A particle of mass (m) is executing oscillations about the origin on the (x) axis. Its potential energy is V(x) = k|x|^3 where (k) is a positive constant. If the amplitude of oscillation is a, then its time period (T) is.

The equation of motion of rockets are x=2t, y=-4t, z=4t where the time 't' is given in second and the coordinate of a moving point in kilometres. What is the path of the rockets? At what distance will the rocket be from the starting point O(0, 0, 0) in 10s.

The equation (d^2x / dt^2) + alpha x = 0 for a particle performing S.H.M. Then the time period of the motion will be

If the particle in linear S.H.M. starts from the extreme left position, then its equation of motion is given by

The equation of motion of a particle moving along a straight line is s=2t^(3)-9t^(2)+12t , where the units of s and t are cm and second. The acceleration of the particle will be zero after: a) 3/2 seconds b) 2/3 seconds c) 1/2 seconds d) 2 seconds

A particle of mass m is moving in a circular path of constant radius r such that its centripetal acceleration a_(c) is varying with time t as a_(c) = k^(2)rt^(2) , where k is a constant. The power delivered to the particle by the forces acting on it is :

A particle of mass 0.2 kg moves with simple harmonic motion of amplitude 2 cm. If the total energy of the particle is 4 xx10^(-5) J, then the time period of the motion is