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 .

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?

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

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.