The gravitational field ina region is given by `E=(2veci+3vecj)Nkg^-1` show that no work is done by the gravitational field when particle is move on the line `3y+2x=5`.

The gravitational field in a region is given by vecE = (3hati- 4hatj) N kg^(-1) . Find out the work done (in joule) in displacing a particle by 1 m along the line 4y = 3x + 9 .

The gravitational field due to a mass distribution is given by E=K/x^3 in X-direction. Taking the gravitational potential to be zero at infinity, find its value at a distance x.

The position of a particle moving along a straight line is given by x =2 - 5t + t ^(3). Find the acceleration of the particle at t =2 s. (x is metere).

Force acting on a particale is (2hat(i)+3hat(j))N . Work done by this force is zero, when the particle is moved on the line 3y+kx=5 . Here value of k is ( Work done W=vec(F).vec(d))

Area of the region bounded by the curve y^(2) = 4x, y-axis and the line y = 3 is

Statement-1. For a charged particle moving from point P to point Q , the net work done by an electrostatic field on the particle is independent of the path connecting point P to point Q Statement-2. The net work done by a conservative force on an object moving along a closed loop is zero.

The position of a particle moving along a. straight line is given by x = 2 - 5t + t ^(3) The acceleration of the particle at t = 2 sec. is ...... Here x is in meter.

Find the area of the region bounded by the parabola y=x^2 +1 and the lines y=x ,x=0 and x=2.

Infinite particles each of mass 'M' are placed at positions x=1 m, x=2m, x=4 m .... prop . Find the gravitational field intensity at the origin.

Find the area of the region bounded by the curves y= 5- x^2 , X - axis and the lines x=2 and x=3.