A particle moves in the xy-plane under the action of a force F such that the components of its linear momentum p at any time t and `p_(x)=2cos` t, `p_(y)=2sin` t. the angle between F and p at time l is

A particle moves in the x-y plane under the action of a force vec(F) such that the components of its linear momentum vec(P) at any time t are p_(x) = cos t and p_(y) = 3 sin t. What is the magnitude of the vector vec(F) ?

A particle moves in the x-y plane under the action of a force vecF such that the value of its linear momentum vecP at any time t is P_(x)=2 cost and p_(y)=2sint . What is the angle theta between vecF and P at a given time t?

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

A paticle of mass m is executing uniform circular motion on a path of radius r . If p is the magnitude of its linear momentum, then the radial force acting on the particle is

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 mass m is executing uniform circular motion on a path of radius r. If P is the magnitude of its linear momentum, the radial force acting on the particle will be

A particle moves along x-axis obeying the equation x=t(t-1)(t-2), where x (in metres) is the position of the particle at any time t (in seconds). The displacement when the velocity of the particle is zero, is

The displacement of a particle moving in S.H.M. at any instant is given by y = a sin omega . The acceleration after time t=T/4 so

A particle is moving in a striaght line according as S=15t+6t^2-t^3 , then the time it will come to rest is

Find dy/dx if, x= 2cos t - cos2 t, y= 2sin t - sin 2t, at t= pi / 4