Calculate the gravitational potential at the centre of base of a solid hemisphere of mass `M`, radius `R`.

What is the gravitational potential at infinity distance from the centre of earth ?

A particle of mass m was transferred from the centre of the base of a uniform hemisphere of mass M and radius R into infinity. What work was performed in the process by the gravitational force exerted on the particle by the hemisphere?

As shown in figure , four masses each of mass 3sqrt2 kg at the corners of a square of side 3 m . Calculate the gravitational potential energy of system of these four particles. Also calculate the gravitational potential at the centre of square. (G = 6.67 x 10^(-11) SI unit)

The magnitude of the gravitational field at distance r_(1) and r_(2) from the centre of a uniform sphere of radius R and mass M are F_(1) and F_(2) respectively. Then:

Explain the theoretical method for estimation of the centre of mass of a solid body.

The correct variation of gravitational potential V with radius r measured from the centre of earth of radius R is given by

Find the volume of a solid hemisphere with radius 30 cm. (pi=3.14)

A mass m is placed at P a distance h along the normal through the centre o of a thin circular ring of mass M and radius r (figure). If the mass is moved further away such that OP becomes 2h by what factor the force of gravitation will decrease, if h = r?

The volume of the largest right circular cone that can be carved out of a solid hemisphere of radius r is given by

Find the gravitational potential energy of a system of four particles, each of mass m placed at the verticles of a square of side l . Also obtain the gravitaitonal potential at centre of the square.