The root mean square speed of the perfect gas molecules will be doubled if

The density of gas is 6 times 10^22 kg.m^-3 and the root mean square speed of the gas molecules is 500 m.s^-1 The pressure exerted by the gas on the walls of the vessel in n times 10^3 N.m^-2 Find the value of n.

Statement I: The root mean square speeds of the molecules of different ideal gases at the same temperature are the same. Statement II: The average translational kinetic energy of molecules of different ideal gas are same at the same temperature.

The root mean square speed of the molecules of diatomic gas is u. When the temperature is doubled, the molecules dissociates into two atoms. The new rms speed of the atom is :

The temperature of an ideal gas is increased from 120 K to 480 K. If at 120 K, the root mean square speed of gas molecules is v, then at 480 K it will be

The mass of one molecule of hydrogen gas is 3.2 times 10^-24 g The root mean square speed of the molecules of another gas is 4 times that of hydrogen molecule at the same temperature.Determine the mass of each molecule of that gas.

At 400 K, the root mean square (rms) speed of gas X -(molecular mass = 40) is equal the most probable speed of gas Y at 60K. The molecular mass of the gas Y is

The temperature of an ideal gas is increased from 140 K to 560 K. If.at 140 K the root mean square velocity of the gas molecules is u, at 560 K it becomes :

The mean square speed of the molecules of a fixed mass of a gas is 6.8 times 10^4 m^2.s^-2 calculate the mean square speed of the molecules when the gas has been compressed adiabatically to half of its original , volume The ratio of the specific heat capacity of the gas at constant pressure to that at constant volume is 1.30.