Reynolds Transport Theorem: Difference between revisions
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Reynolds Transport Theorem is a formal way of performing this balance over a fluid control volume, of arbitrary shape. | Reynolds Transport Theorem is a formal way of performing this balance over a fluid control volume, of arbitrary shape, moving at an arbitrary velocity. | ||
[[Reynolds Transport Theorem Derivation]] | A derivation of Reynolds Transport Theorem is given here: [[Reynolds Transport Theorem Derivation]] | ||
Given an extensive property <math>F</math> and a corresponding intensive property <math>\mathcal{F} = \frac{\partial F}{\partial t}</math>, <math>F</math> can be defined in terms of <math>\mathcal{F}</math>: | |||
<math> | |||
F = \iiint_{V_{\mathcal{F}}(t)} \rho \mathcal{F} dV | |||
</math> | |||
where <math>\rho</math> is the fluid density and <math>V_{\mathcal{F}}</math> is the volume corresponding to the property <math>F</math> (which moves at a velocity <math>u_{\mathcal{F}}</math>. | |||
The partial derivative with respect to the volume for the intensive property <math>\mathcal{F}</math> is, | |||
<math> | |||
\frac{ \partial \mathcal{F} }{ \partial V } = 0 | |||
</math> | |||
and for the extensive property <math>F</math>, | |||
<math> | |||
\frac{ \partial F }{ \partial V } | |||
= \frac{ \partial F }{ \partial m } \frac{ \partial m }{ \partial V } | |||
= \frac{1}{\rho} \frac{ \partial F}{\partial m} | |||
</math> | |||
Then Reynolds Transport Theorem is given by: | |||
<math> | |||
\frac{d}{dt} \iiint_{V_{\mathcal{F}}(t)} | |||
= \iiint_{V_{\mathcal{F}}(t)} \rho \frac{ \partial \mathcal{F} }{\partial t} dV | |||
+ \iint_{S_{\mathcal{F}}(t)} \rho \mathcal{F} \boldsymbol{v}_{\mathcal{F}} \cdot \boldsymbol{n} dS | |||
</math> | |||
where <math>\boldsymbol{v}_{\mathcal{F}}</math> is the velocity vector of the property <math>\mathcal{F}</math>. | |||
Revision as of 11:41, 31 October 2010
Reynolds Transport Theorem is always a safe starting point.
In a way, it is the most fundamental starting point.
Fundamental balance equation:
$ \mbox{in} - \mbox{out} + \mbox{generation} - \mbox{consumption} = \mbox{accumulation} $
Reynolds Transport Theorem is a formal way of performing this balance over a fluid control volume, of arbitrary shape, moving at an arbitrary velocity.
A derivation of Reynolds Transport Theorem is given here: Reynolds Transport Theorem Derivation
Given an extensive property $ F $ and a corresponding intensive property $ \mathcal{F} = \frac{\partial F}{\partial t} $, $ F $ can be defined in terms of $ \mathcal{F} $:
$ F = \iiint_{V_{\mathcal{F}}(t)} \rho \mathcal{F} dV $
where $ \rho $ is the fluid density and $ V_{\mathcal{F}} $ is the volume corresponding to the property $ F $ (which moves at a velocity $ u_{\mathcal{F}} $.
The partial derivative with respect to the volume for the intensive property $ \mathcal{F} $ is,
$ \frac{ \partial \mathcal{F} }{ \partial V } = 0 $
and for the extensive property $ F $,
$ \frac{ \partial F }{ \partial V } = \frac{ \partial F }{ \partial m } \frac{ \partial m }{ \partial V } = \frac{1}{\rho} \frac{ \partial F}{\partial m} $
Then Reynolds Transport Theorem is given by:
$ \frac{d}{dt} \iiint_{V_{\mathcal{F}}(t)} = \iiint_{V_{\mathcal{F}}(t)} \rho \frac{ \partial \mathcal{F} }{\partial t} dV + \iint_{S_{\mathcal{F}}(t)} \rho \mathcal{F} \boldsymbol{v}_{\mathcal{F}} \cdot \boldsymbol{n} dS $
where $ \boldsymbol{v}_{\mathcal{F}} $ is the velocity vector of the property $ \mathcal{F} $.