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

One mole of an ideal monatomic gas undergoes a process described by the equation PV^(3) = constant. The heat capacity of the gas during this process is

The molar heat capacity for an ideal gas

An ideal has undergoes a polytropic given by equation PV^(n) = constant. If molar heat capacity of gas during this process is arithmetic mean of its molar heat capacity at constant pressure and constant volume then value of n is

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

A certain amount of ideal monoatomic gas undergoes a process given by TV^(1//2) = constant. The molar specific heat of the gas for the process will be given by

The molar heat capacity for a gas at constant T and P is

One mole of a diatomic gas undergoes a thermodynamic process, whose process equation is P prop V^(2) . The molar specific heat of the gas 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

For a certain process, pressure of diatomic gas varies according to the relation P = aV^2 , where a is constant. What is the molar heat capacity of the gas for this process ?

One mole of an ideal monatomic gas undergoes the process P=alphaT^(1//2) , where alpha is constant . If molar heat capacity of the gas is betaR1 when R = gas constant then find the value of beta .