Isentropic relations: Difference between revisions
No edit summary |
No edit summary |
||
| Line 10: | Line 10: | ||
First law of thermodynamics: | First law of thermodynamics: | ||
<table style="width: 100%; border: 1px solid red"> | |||
<tr> | |||
<td style="border: 1px solid blue"></td> | |||
<td style="float: center; border: 1px solid blue"><math>de=\delta q - \delta w</math></td> | |||
<td style="float: right; border: 1px solid blue">(Eq. 1)</td> | |||
</tr> | |||
</table> | |||
<div display="block" style="text-align: center;"> | <div display="block" style="text-align: center;"> | ||
Revision as of 06:08, 27 March 2026
First law of thermodynamics
First law of thermodynamics:
| (Eq. 1) |
For a reversible process: and
Enthalpy is defined as: and thus
Eliminate $de$ in Eqn. \ref{eq:firstlaw:b} using Eqn. \ref{eq:dh}
Using and the equation of state , we get
Integrating Eqn. \ref{eq:ds} gives
For a calorically perfect gas, is constant (not a function of temperature) and can be moved out from the integral and thus
An alternative form of Eqn. \ref{eq:ds:c} is obtained by using Eqn. \ref{eq:firstlaw:b}, which gives
Again, for a calorically perfect gas, we get
Isentropic Relations
Adiabatic and reversible processes, i.e., isentropic processes implies and thus Eqn. \ref{eq:ds:c} reduces to
In the same way, Eqn. \ref{eq:ds:e} gives
Eqn. \ref{eq:isentropic:a} and Eqn. \ref{eq:isentropic:b} constitutes the isentropic relations