If E = energy , G = gravitational constant , I = impulse and M = mass the dimension `(GI^(2)M)/(E^(2))` is same as that of

Gravitational constant in the M.K.S. system is of the order of

If E,M,J and G respectively denote energy , mass angular momentum and gravitational constant then (EJ^(2))/(M^(5)G^(2)) has the dimensions of .

To induce an e.m.f. in the coil

State S.I. unit and obtain dimension of universal gravitational constant? OR What is gravitional constant? OR What are dimension of Universal constant?

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

Plank 's constant (h) speed of light in vacuum (C) and newton 's gravitational constant (G) are three fundamental constant .Which of the following combinations of these has the dimension of length?

[L^(-1)M^(1)T^(-2)] are the dimensions of

If y=e^(m cos^(-1)x) , then (1-x^(2))y_(2)-xy_(1)-m^(2)y is equal to

Radius of earth is equal to 6 xx 10^6 . Acceleration due to gravity is equal to 9.8 m/s^2 . Gravitational constant G is equal to 6.67 xx 10^-11 Nm^2 kg^-2 . Then mass of the earth is

A body of mass m is raised to a height 10 R from the surface of the earth, where R is the radius of the earth. Find the increase in potential energy. (G = universal constant of gravitational, M = mass of the earth and g= acceleration due to gravity)