Show that R.M.S. velocity of gas molecules is directly proportional to square root of its absolute temperature.

Show that R.M.S. velocity of gas molecule is directly proportional to the square root of its absolute temperature.

Show that R.M.S. velocity of a gas molecule is directly proportional to the square roof of its absolute temperature. Show that average kinetic energy per unit volume of the gas is 3/2 P

Prove that velocity of gas molecule is directly proportional of the square root of temperature.

Assertion (A): H_2 and O_2 have same R.M.S. velocity at the same temperature. Reason ® : R.M.S. velocity of a gas molecules is directly proportional to square root its 'T'.

(A): Sound would travel faster on a hot summer day than on a cold winter day. (R): Velocity of sound is directly proportional to the square of its absolute temperature.

Show that the rms velocity is proportional to the square root of the absolute temperature.

According to the kinetic theory of gases, the pressure of a gas is expressed as P = ( 1)/( 3) rho bar(c )^(2) where rho is the density of the gas, bar(c )^(2) is the mean square speed of gas molecules. Using this relation show that the mean kinetic energy of a gas molecule is directly proportional to its absolute temperature.