A monatomic ideal gas undergoes a process in which the ratio of `P` to `V` at any instant is constant and equals 1. What is the molar heat capacity of the gas?

A monoatomic ideal gas undergoes a process in which the ratio of P to V at any istant is constant and equal to unity. The molar heat capacity of the gas is

A monoatomic ideal gas undergoes a process in which the ratio of P to V at any istant is constant and equal to unity. The molar heat capacity of the gas is

The molar heat capacity for an ideal gas

A monoatomic gas undergoes a process in which the pressure (P) and the volume (V) of the gas are related as PV^(-3)= constant. What will be the molar heat capacity of gas for this process?

An amount of heat is added to a monatomic ideal gas in a process in which the gas performs work Q/2 on its surrounding. Find the molar heat capacity for the process.

The ratio of P to V at any instant is constant and is equal to 1 , for a monoatomic ideal gas under going a process. What is the molar heat capacity of the gas

The ratio of P to V at any instant is constant and is equal to 1. for a monoatomic ideal gas under going a process. What is the molar heat capacity of the gas

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 ?

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)) .

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)) .