If the gravitational field intensity at a point is given by `g = (GM)/(r^(2.5))`. Then, the potential at a distance `r` is

Gravitational field intensity is given by E = Ax/((A^2 + x^2)^(3/2)) then find out potential at x (Assume potential at infinity = 0)

If gravitational attraction between two points masses be given by F=G(m_(1)m_(2))/(r^(n)) . Then the period of a satellite in a circular orbit will be proportional to

If the gravitational force had varied as r^(-5//2) instead of r^(-2) the potential energy of a particle at a distance 'r' from the centre of the earth would be proportional to

Figure shows a system of point masses placed on X-axis. Find the net gravitational field intensity at the origin Take sum of an infinite GP as S = (a)/(1-r) where a= first term and r = Least common ratio.

Let gravitation field in a space be given as E = - (k//r) If the reference point is a distance d where potential is V_(1) then relation for potential is .

If gravitational potential at a point (x,y,z) in space is given by V_g=-GM [1/(2x)+x/y^2+1/z] then x- component of gravitational field intensity at (1,1,1) is (all quantities are in SI unit)

The electric potential at a point (x,y) in the x-y plane is given by V=-kxy . The field intentisy at a distance r in this plane, from the origin is proportional to

Consider an infinite plane sheet of mass with surface mass density σ. The gravitational field intensity at a point P at perpendicular distance r from such a sheet is A. Zero B. -σG C. 2piσG D. - 4piσG

In a certain region of space, the gravitational field is given by -(k)/(r) where r is the distance and k is a constant. If the gravitaional potential at r=r_(0) be V_(0) , then what is the expression for the gravitaional potential (V)-

Calculate the gravitational field intensity and potential at the centre of the base of a solid hemisphere of mass m , radius R