The linear momentum `p` of a body moving in one dimension varies with time according to the equation `p=a+bt^(2)` where a and b are positive constants. The net force acting on the body is

A particle moving along the X-axis executes simple harmonic motion, then the force acting on it is given by where, A and K are positive constants.

The dimensions of a/b in the equation P=(a-t^(2))/(bx) where P is pressure, x is distance and t is time are

A body moves along a circle of radius 1 m with a constant kinetic energy 25 J. Then force acting on it is

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

Write the dimensions of a//b in the relation F = a sqrtx + bt^2 where F is force x is distance and t is time.

The displacement x of a particle moving in one dimension under the action of a constant force is related to the time t by the equation t = sqrtx + 3 , where x is in metre and t is in second. The work done by the force in the first 6 second 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 constants and x is the position of the particle. The acceleration of the particle as a function of x, is given by

When a wave travels in a medium, the particle displacement is given by the equation y = alpha sin 2pi(bt -cx) where a, b and c are constants. The maximum particle velocity will be twice the wave velocity if

The horizontal distance x and the vertical height y of a projectile at a time t are given by x=at and y=bt^2 +ct where a, b and c are constants The magnitude of the velocity of the projectile 1 second after it is fired is

A particle moves in the xy plane under the influence of a force such that its linear momentum is vecP(t) = A [haticos(kt)-hatjsin(kt)] , where A and k are constants. The angle between the force and momentum is