If the value of universal gravitational constant is `6.67xx10^(-11) Nm^2 kg^(-2),` then find its value in CGS system.

The value of universal gravitational constant G depends upon :

The value of universal gravitational constant G=6.67xx10^(-11)Nm^(2)kg^(-2) . The value of G in units of g^(-1)cm^(3)s^(-2) is

The value of gravitation is G = 6.67 xx 10^(-11)N-m^(2)/kg^(2) in SL units . Convert it into CGS system of units .

The value of gravitation is G = 6.67 xx 10^(-11)N-m^(2)/(kg^(2)) in SI units . Convert it into CGS system of units .

Calculate the ratio of electric and gravita-tional forces between two electrons. (charge of the electron (e) = 1.6 xx 10^(-19) c , mass of the electron (m) = 9.1 xx 10^(-31) kg, (1)/(4pi epsilon_(0)) = 9 xx 10^(9) Nm^(2)C^(-2) , universal gravitational constant G = 6.67 xx 10^(-11) Nm^(2) kg^(-2) )

If the unit of length be doubled then the numerical value of the universal gravitation constant G will become (with respect to present value)

If the value of equilibrium constant for a particular reaction is 1.6xx10^(12) , then art equilibrium the system will contain

The young's modulus of a material of wire is 12.6 xx 10^(11) "dyne"//cm^(2) . Its value is SI system is

Two stars of masses 3 xx 10^(31) kg each, and at distance 2 xx 10^(11) m rotate in a plane about their common centre of mass O. A meteorite passes through O moving perpendicular to the star's rotation plane. In order to escape from the gravitational field of this double star, the minimum speed that meteorite should have at O is (Take Graviational constant G = 6.67 xx 10^(-11) Nm^(2) kg^(-2) )

The time period of revolution of moon around the earth is 28 days and radius of its orbit is 4xx10^(5) km. If G=6.67xx10^(-11) Nm^(2)//kg^(2) then find the mass of the earth.