Prove that the pressure of an ideal gas is numerically equal to two third of the mean translational kinetic energy per unit volume of the gas.

Kinetic energy per mole of an ideal gas is :

What is the mean translation kinetic energy of a perfect gas molecule at temperature T?

A gas has volume V and pressure p . The total translational kinetic energy of all the molecules of the gas is

A gas has volume V and pressure p . The total translational kinetic energy of all the molecules of the gas is

The translational kinetic energy of an ideal gas depends only its

Relation between pressure (P) and average kinetic energy per unit volume of gas (E ) is

A tank used for filling helium balloons has a volume of 0 .3 m^3 and contains (2.0) mol of helium gas at 20 .0^@ C . Assuming that the helium behaves like an ideal gas. (a) What is the total translational kinetic energy of the molecules of the gas ? (b) What is the average kinetic energy per molecule ?

Ideal gas equation in terms of KE per unit volume, E , is

The root mean square speed of an ideal gas is given by : u_("rms") = sqrt((3RT)/M) Thus we conclude that u_("rms") speed of the ideal gas molecules is proportional to square root of the temperature and inversely proportional to the square root of the molar mass. The translational kinetic energy per mole can also be given as 1/2Mu_(rms)^(2) . The mean free path ( lambda ) is the average of distances travelled by molecules in between two successive collisions whereas collision frequency (C.F.) is expressed as number of collisions taking place in unit time. The two terms lambda and C.F. are related by : C.F = (u_("rms")/lambda) Which of the following relation is correct for an ideal gas regarding its pressure (P) and translational kinetic energy per unit volume (E) ?

(a) What is the average translational kinetic energy of a molecule of an ideal gas at temperature of 276@ C ? (a) What is the total random translational kinetic energy of the molecules in one mole of this gas ? ( c) What is the rms speed of oxygen molecules at this temperature ?