Molar specific heat at constant volume `C_v` for a monatomic gas is

Given the , C_p-C_v=R and gamma=(C_p)/(V_v) where C_p =molar specific heat at constant pressure C_v =molar specific heat at constant volume. Then C_v =

For a gas R/C_V = 0.4, where R is the universal gas constant and C, is molar specific heat at constant volume. The gas is made up of molecules which are

The molar specific heat at constant pressure of an ideal gas is (7//2 R) . The ratio of specific heat at constant pressure to that at constant volume is

The molar specific heat of a gas at constant volume is 24 J/mol ^@K . Then change in its internal energy if one of such gas is heated at constant volume from 10^@C to 30^@C is

The specific heat of gas under constant pressure as compared to specific heat under constant volume at the same temperature is

The ratio of specific heats of a gas is 1.4. If the specific heat at constant volume is 4.82 kcal/kmol K. Find universal gas constant.

C_(p) nad C_(v) are specific heats at constant pressure and constant volume respectively. It is observed that C_(p)-C_(v)=a for hydrogen gas C_(p)-C_(v)=b for niotrogen gas The correct relation between a and b is

For a gas if ratio of specific heats at constant pressure and volume is 'gamma' then value of degrees of freedom is

For a rigid diatomic molecule, univerisal gas constant R = mc_(p) , where 'C_(p)' is the molar specific heat at constant pressure and 'm' is a number. Hence m is equal to

Determine the specific heat capacity ratio for a diatomic gas for:- rigid molecule