Find out the dimension of `(GIM^(2))/(E^(2))` where E = energy G = gravitational constant `I` =impulse of force and M = mass.

Kepler's third law states that square of period of revolution (T) of a planet around the sun , is proportional to third power of average distance between sun and planet ? i.e., T^2=Kr^3 here K is constant. If the masses of sun and planet are M and m respectively, then as per Newton's law of gravitation, force of attraction between them is F=(GMm)/(r^2) here G is gravitational constant The relation between G and K is described as

E= 1/2 mv^2 give dimensions of E.

W = 1/2 kx^2 in this equation find out the dimension of k, where w = stored potential energy and x = eloxgation of the spring.

Find out the dimension of K in the equation, W= (1)/(2) Kx^(2) . Here x and W are the elongation and the potential energy respectively of a spring.

According to Newton's law of gravitation , everybody in this universe attracts every other body with a force, which is directly proportional to the product of their masses and the inversely proportional to the square of the distance between their centres, i.e., F prop (m_1m_2)/(r^2) or F=G(m_1m_2)/(r^2) where G is universal gravitational constant =6.67xx10^(-11)N*m^2*kg^(-2) . Read the above passage and answer the following questions : (ii) How is the gravitational force between two bodies affected when distance between them is halved ?

According to Newton's law of gravitation , everybody in this universe attracts every other body with a force, which is directly proportional to the product of their masses and the inversely proportional to the square of the distance between their centres, i.e., F prop (m_1m_2)/(r^2) or F=G(m_1m_2)/(r^2) where G is universal gravitational constant =6.67xx10^(-11)N*m^2*kg^(-2) . Read the above passage and answer the following questions : (i) What is the value of G on the surface of moon ?