Find the number of degree of freedom (to the nearest integer) of molecule of gas, whose molar heat capacity is C = 29 J/mol/K in the process PT = constant)

Find the number of degrees of freedom of molecules in a gas whose molar heat capacity at constant pressure is equal to C_(P)=20J /(moL K)

Find the number of degrees of freedom of molecules in a gas. Whose molar heat capacity (a) at constant pressure C_p = 29 J mol^-1 K^-1 (b) C = 29 J mol^-1 K^-1 in the precess (pT) = constant.

Find the number of degrees of freedom for the molecules of a gas for which (a) C_p = 37.55 J mol^-1K^-1 in the process, PT = constant.

A gas has molar heat capacity C=24.9 J mol^(-1)'K^(-1) in the process P^(2)T = constant. Then (R=8.3 J/mol k)

Molar heat capacity of gas whose molar heat capacity at constant volume is C_V , for process P = 2e^(2V) is :

Find the value of molar heat capacity for an ideal gas in an adiabatic process.

Find the molar heat capacity (in terms of R ) of a monoatomic ideal gas undergoing the process: PV^(1//2) = constant ?

Find the molar mass and the number of degrees of freedom of molecules in a gas if its heat capacities are C_(v) = 650 J kg^(-1) K^(-1) and C_(P) = 910 J kg^(-1) K^(-1)

Suppose a gas is heated up to a temperature at which all degrees of freedom (translational, rotational, and vibrational) of its molecules are excited. Find the molar heat capacity of such a gas in the isochoric process, as well as the adiabatic exponent gamma , if the gas consists of (a) diatomic , (b) linear N- atomic , ( c) network N- atomic molecules.

In a certain gas, the ratio of the velocity of sound and root mean square velocity is sqrt(5//9) . The molar heat capacity of the gas in a process given by PT = constant is. (Take R = 2 cal//mol K ). Treat the gas as ideal.