In a thermodynamic process on an ideal diatomic gas, work done by the gas is `eta` times. The heat supplied `(eta lt 1)`. The molar heat capacity of the gas for the process is

The molar heat capacity of a gas in a process

The molar heat capacity for an ideal gas

The molar heat capacity for an ideal gas

an ideal diatomic gas undergoes a polytropic process described by the equation P√V= constant . The molar heat capacity of the gas during this process is

An ideal gas (gamma = 1.5) undergoes a thermodynamic process in which the temperature and pressure of the gas are related as T^(-1)P^(2) = constant. The molar heat capacity of the gas during the process is

An ideal gas (gamma = 1.5) undergoes a thermodynamic process in which the temperature and pressure of the gas are related as T^(-1)P^(2) = constant. The molar heat capacity of the gas during the process is

P - V diagram of a diatomic gas is a straight line parallel to P-axis. The molar heat capacity of the gas in the process will be

An ideal gas with adiabatic exponent ( gamma=1.5 ) undergoes a process in which work done by the gas is same as increase in internal energy of the gas. Here R is gas constant. The molar heat capacity C of gas for the process is:

An ideal gas with adiabatic exponent ( gamma=1.5 ) undergoes a process in which work done by the gas is same as increase in internal energy of the gas. Here R is gas constant. The molar heat capacity C of gas for the process is: