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

The molar heat capacity for an ideal gas

Find the molar heat capacity of an ideal gas with adiabatic exponent gamma for the polytorpic process PV^(n)= Constant.

What is the molar specific heat capacity of a gas undergoing an adiabatic process ?

What is specific heat of a gas is an adiabatic process?

The ideal gas equation for an adiabatic process is

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

The relation between U, p and V for an ideal gas in an adiabatic process is given by relation U=a+bpV . Find the value of adiabatic exponent (gamma) of this gas.

Molar heat capacity of an ideal gas in the process PV^(x) = constant , is given by : C = (R)/(gamma-1) + (R)/(1-x) . An ideal diatomic gas with C_(V) = (5R)/(2) occupies a volume V_(1) at a pressure P_(1) . The gas undergoes a process in which the pressure is proportional to the volume. At the end of the process the rms speed of the gas molecules has doubled from its initial value. The molar heat capacity of the gas in the given process is :-

An ideal diatomic gas with C_(V)=(5R)/(2) occupies a volume V_(1) at a pressure P_(1) . The gas undergoes a process in which the pressure is proportional to the volume. At the end of the process the rms speed of the gas molecules has doubled from its initial value. The molar heat capacity of the gas in the given process is

A : The specific heat of an ideal gas is zero in an adiabatic process. R : Specific heat of a gas is process independent.