Convert `G=6.67xx10^(-11)Nm^(2)kg^(-2)` to `cm^(3)s^(-2)g^(-1)`, where G is the universal gravitational constant.

Define G (universal gravitational constant).

The C.G.S. unit of universal gravitational constant is

According to Newton's law of gravitational, everybody in this universe attracts every other body with a force, which is directly proportional to the product of their masses and is inversely proportional to the square of the distance between their centres, i.e., F prop (m_(1)m_(2))/(r^(2)) or F = (Gm_(1)m_(2))/(r^(2)) where G is universal gravitational constant = 6.67 xx 10^(-11) Nm^(2) kg^(-2) . (i) What is the value of G on the surface of moon? (ii) How is the gravitational force between two bodies affected when distance between them is halved? (iii) What values of like do you learn from this law?

G = 6.67 xx 10^(-11) kg^(-1) m^(3) s^(-2) . Convert it into CGS system.

What is the dimensional formula of (a) volume (b) density and (c ) universal gravitational constant 'G' . The gravitational force of attraction between two objects of masses m and m separated by a distance d is given by F = (G m_(1) m_(2))/(d^(2)) Where G is the universal gravitational constant.

On Earth value of G = 6.67 xx 10^(-11) Nm^(2) kg^(-2) . What is its value on Moon, where g is nearly one-sixth than that of Earth?

The radius of the earth is 6.37xx10^(6)m , its mean density is 5.5xx10^(3)Kg m^(-3) and G= 6.66xx10^(-11)Nm^(2)Kg^(-2) . Determine the gravitational potential on the surface of the earth.