The gravitational constant G is equal to `6.67xx10^(-11)N m^2//kg^2` in vacuum. Its value in a dense matter of density `10^(10)g//cm^3` will be

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

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

The mean radius of a planet is 6.67xx10^(3) km. The acceleration due to gravity on its surface is 10 m//s^(2) . If G = 6.67xx10^(-11)Nm^(2)//kg^(2) , then the mass of the planet will be [R=6.67xx10^(6)m]

Calculate and compare the electrostatic and gravitational forces between two protons which are 10^-15 m apart. Value of G = 6.674 xx 10^-11 Nm^2//kg^2 and mass of the proton is 1.67 xx 10^-27kg.

The U -tube with limbs of diameters 6 mm and 3 mm contain water of surface tension 7xx10^(-2) N m^(-1) . The angle of contact is zero and density 10^3 kg m^(-3) . If g is 10 m s^(-2) , then the difference in levels in the two limbes is

At what height from the surface of earth the gravitation potential and the value of g are - 5.4 xx 10^(7) J kg^(-2) and 6.0 ms^(-2) respectively ? Take the radius of earth as 6400 km :

Suppose the orbit of a satellite is exactly 35780 km above the earth's surface. Determine the tangential velocity of the satellite (G=6.67xx10^(-11) Nm^2//kg^2, mass of the earth= 6xx10^(24) kg, Radius of the earth = 6.4xx10^6m )

A small satellite revolves around a planet in an orbit just above planet's surface. Taking the mean density of the planet 8000 kg m^(-3) and G = 6.67 xx 10^(-11) N //kg^(-2) . find the time period of the satellite.