The linear momentum of a body depends on timeas `p = at +bt^2`. wherea and b are constants. What is the force acting on the particle at t = 0.

The displacement x of a particle in rectilinear motion at time t is represented as x^(2) = at^(2) +2bt+c , where a ,b, and c are constants. Show that the acceleration of this particle varies (1)/(x^(3)) .

If the displacement of a body is given by S = at^2 + bt + c and a, b, c are constants then show that if v be the velocity of ‘the particle then-------- 4a(s -c) = v^2 - b^2 .

Displacement (x) and time (t) of a particle in motion are related as x = at + bt^(2) -ct^(3) where a,b, and c, are constants. Velocity of the particle when its acceleration becomes zero is

The position vector of a point with time varies as athati+bt^2hatj .a and b are positive constant .What is the nature of the trajectory?

The displacement (s ) of a particle depends on time (t) as s = 2at^(2)-bt^(3) . Then

Three particles, each of mass m, are placed at the vertices of an equilateral triangle. What is the force acting on a particle of mass 2m placed at the centroid D of the triangle ?

The position vector vecr of a particle with respect to the origin changes with time t as vecr =Athati-Bt^2hatj, where A and B are positive constants. Determine (i) the locus of the particle,

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