An unkowns gas having density `"4 k gm"^(-3)` and pressure `1.2 xx10^(5)" Nm"^(-2)`. The ratio of root mean square and most probable velocity is

The rms velocity molecules of a gas of density 4 kg m^(-3) and pressure 1.2 xx 10^(5) N m^(-2) is

The rms velocity molecules of a gas of density 4 kg m^(-3) and pressure 1.2 xx 10^(5) N m^(-2) is

The ratio of root mean square speed ,average speed and most probable speed for gas ?

The density of CO_(2) gas at 0^(@)C and at a pressure of 1.0 xx 10^(5) Nm^(-2) is 1.98 kgm^(-3) . Calculate the root mean square velocity of its molecules at 0^(@)C and 30^(@)C . Assume the pressure to remain constant.

Two molecules of a gas have speeds of 9xx10^(6) ms^(-1) and 1xx10^(6) ms^(-1) , respectively. What is the root mean square speed of these molecules.

A gas bulb of 1 litre capacity contains 2.0 xx 10^(21) molecules of nitrogen exerting a pressure of 7.57 xx 10^3 Nm^(-2) . Calculate the root mean square speed and the temperature of gas molecules. If the ratio of most probable speed to the root mean square speed is 0.82, calculate the most probable speed for the molecules at this temperature.

The ratio of most probable velocity, average velocity and root mran square velocity is

A sample of a given mass of gas at a constant temperature occupies 95 cm^(3) under a pressure of 9.962 xx 10^(4) Nm^(-2) . At the same temperature its volume at a pressure of 10.13 xx 10^(4) Nm^(-2) is

The ratio among most probable velocity, mean velocity and root mean velocity is given by

Four molecules of a gas have velocity 2, 4, 6 and 8 kms^(-1) , respectively. The ratio of their root mean velocity and average speed is :