Isentropic relations: Difference between revisions

First law of thermodynamics:

For a reversible process: ${\displaystyle \delta w=pd(1/\rho )}$ and ${\displaystyle \delta q=Tds}$

Enthalpy is defined as: ${\displaystyle h=e+p/\rho }$ and thus

Eliminate ${\displaystyle de}$ in (Eq. 1.11) using (Eq. 1.12)

Using ${\displaystyle dh=C_{p}T}$ and the equation of state ${\displaystyle p=\rho RT}$, we get

Integrating (Eq. 1.15) gives

For a calorically perfect gas, ${\displaystyle C_p}$ is constant (not a function of temperature) and can be moved out from the integral and thus

An alternative form of (Eq. 1.17) is obtained by using ${\displaystyle de=C_{v}dT}$ in (Eq. 1.11), which gives

Again, for a calorically perfect gas, we get

Adiabatic and reversible processes, i.e., isentropic processes implies ${\displaystyle ds=0}$ and thus (Eq. 1.17) reduces to

$${\displaystyle \frac{C_p}{R}=\frac{\gamma }{\gamma -1}}$$

$${\displaystyle \frac{\gamma }{\gamma -1}\ln \left(\frac{T_2}{T_1}\right)=\ln \left(\frac{p_2}{p_1}\right)\Rightarrow }$$

In the same way, (Eq. 1.19) gives

Eqn. (Eq. 1.21) and Eqn. (Eq. 1.22) constitutes the isentropic relations