Find the ratio of `(DeltaQ)/(DeltaU)` and `(DeltaQ)/(DeltaW)` in an isobaric process. The ratio of molar heat capacities `(C_p)/(C_V)=gamma`.

The ratio of specific to molar heat capacity of a body

The ratio fo two specific heat (C_(P))/(C_(V)) of CO is

For a Van der Walls gas find : (a) the equation of the adiabatic curve in the variables T, V , the difference of the molar heat capacities C_p - C_v as a function of T and V .

The ratio of P to V at any instant is constant and is equal to 1. for a monoatomic ideal gas undergoing 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

A monotomic ideal gas undergoes a process in which the ratio of p to V at any instant is constant and equals to 1. what is the molar heat capacity of the gas?

For the case of an ideal gas find the equation of the process (in the variables T, V ) in which the molar heat capacity varies as : (a) C = C_V + alpha T , (b) C = C_V + beta V , ( c) C = C_v + ap , where alpha, beta and a are constants.

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

A cyclic process for an ideal monatomic gas (C_(v)=12.5Jmol^(-1)K^(-1) ) is represented in the figure. The temperature at 1, 2 and 3 are 300K, 600K and 455K , respectively. Compute the values of DeltaQ, DeltaU and DeltaW for each of the process. The process from 2 to 3 is adiabatic.