The molar heat capacity for the process shown in fig. is

The molar heat capacity for the process shown in figure is

Figure shows a process on a gas in which pressure and volume both change. The molar heat capacity for this process is C.

If molar heat capacity of the given process (as shown in figure) is C , then

The molar heat capacity for an ideal gas

A polytropic process for an ideal gas is represented by equation PV^(n) = constant . If g is ratio of specific heats ((C_(p))/(C_(v))) , then value of n for which molar heat capacity of the process is negative is given as

If ideal diatomic gas follows the process, as shown in graph, where T is temperature in kelvin and V is volume (m^(3)) , then molar heat capacity for this process will be [in terms of gas constant R] :

An ideal gas with adiabatic exponent gamma = 4/3 undergoes a process in which internal energy is related to volume as U = V^2 . Then molar heat capacity of the gas for the process is :

The variation of pressure versus volume is shown in the figure. The gas is diatomic and the molar specific heat capacity for the process is found to xR. Find the value of x. .

An ideal gas is taken through a process in which pressure and volume vary as P = kV^(2) . Show that the molar heat capacity of the gas for the process is given by C = C_(v) +(R )/(3) .

An ideal gas is taken through a process in which the pressure and the volume are changed according to the equation p=kv . Show that the molar heat capacity of the gas for the process is given by (C=C_v + ( R)/(2)) .