For an ideal gas `(C_(p,m))/(C_(v,m))=gamma`. The molecular mass of the gas is M, its specific heat capacity at constant volume is :

The ratio (C_p)/(C_v)=gamma for a gas. Its molecular weight is M. Its specific heat capacity at constant pressure is

For an ideal monoatomic gas, molar heat capacity at constant volume (C_(v)) is

An ideal gas is made to undergo a process T = T_(0)e^(alpha V) where T_(0) and alpha are constants. Find the molar specific heat capacity of the gas in the process if its molar specific heat capacity at constant volume is C_(v) . Express your answer as a function of volume (V).

Specific heat at constant pressure C_P of a gas

Molar specific heat at constant volume C_v for a monatomic gas is

One mole of an ideal monoatomic gas (gamma = (5)/(3)) is mixed with one mole of a diatomic gas (gamma=(7)/(5)) . ( gamma denotes the ratio of specific heat at constant pressure, to that at constant volume) find gamma for the mixture?

For an ideal gas , the specific heat at constant pressure C_p is greater than the specific heat at constant volume C_v This is because

Given the , C_p-C_v=R and gamma=(C_p)/(V_v) where C_p =molar specific heat at constant pressure C_v =molar specific heat at constant volume. Then C_v =