From the Maxwell distribution function frind `lt lt v_x^2 gt gt`, the mean value of the squared `v_x` projection of the molecular velocity in a gas at a temperature `T`. The mass of each molecule is equal to `m`.

Making use of the Maxwell distribution function, find lt lt 1//v gt gt , the mean value of the reciprocal of the velocity of molecules in an ideal at a temperature T , it the mass of eacd molecule is equal to m . Compare the value obtained with the reciprocal of the mean velocity.

Using the Maxwell distribution function, calculate the mean velocity projection (v_x) and the mean value of the modules of this projection lt lt |v_x| gt gt if the mass of each molecule is equal to m and the gas temperature is T .

The root mean square velocity of a gas molecule at any temperature T K of a gas molecule of molecular weight M is

For the following distribution function F (X) of a r.v. X P(3 lt X le 5)=

Let overline v,v_(rms) and v_p respectively denote the mean velocity,root mean square speed and most probable velocity of the molecules in an ideal monatomic gas at absolute temperature T. The mass of a molecule is m . Then

Let barv,v_(rms) and v_p respectively denote the mean speed. Root mean square speed, and most probable speed of the molecules in an ideal monatomic gas at absolute temperature T. The mass of a molecule is m. Then

Let barv,v_(rms) and v_p respectively denote the mean speed. Root mean square speed, and most probable speed of the molecules in an ideal monoatomic gas at absolute temperature T. The mass of a molecule is m. Then

Let barv,v_(rms) and v_p respectively denote the mean speed. Root mean square speed, and most probable speed of the molecules in an ideal monoatomic gas at absolute temperature T. The mass of a molecule is m. Then

Let barv,v_(rms) and v_p respectively denote the mean speed. Root mean square speed, and most probable speed of the molecules in an ideal monoatomic gas at absolute temperature T. The mass of a molecule is m. Then