Choked flow: Difference between revisions

Latest revision as of 13:39, 1 April 2026

For steady-state nozzle flow, the massflow is obtained as

\dot{m} = ρ u A = c o n s t

(Eq. 5.49)

Eqn. \ref{eq:massflow:a} can be evaluated at any location inside the nozzle and if evaluated at sonic conditions we get

\dot{m} = ρ^{*} u^{*} A^{*}

(Eq. 5.50)

By definition $u^{*} = a^{*}$ and thus

\dot{m} = ρ^{*} a^{*} A^{*}

(Eq. 5.51)

$ρ^{*}$ and $a^{*}$ can be obtained using the ratios $ρ^{*} / ρ_{o}$ and $a^{*} / a_{o}$

ρ^{*} = (\frac{ρ^{*}}{ρ_{o}}) ρ_{o} = \frac{p_{o}}{R T_{o}} {(\frac{2}{γ + 1})}^{1 / (γ - 1)}

(Eq. 5.52)

a^{*} = (\frac{a^{*}}{a_{o}}) a_{o} = a_{o} {(\frac{2}{γ + 1})}^{1 / 2} = \sqrt{γ R T_{o}} {(\frac{2}{γ + 1})}^{1 / 2}

(Eq. 5.53)

Eqns. \ref{eq:as} and \ref{eq:rhos} in Eqn. \ref{eq:massflow:b} gives

\dot{m} = \frac{p_{o}}{R T_{o}} {(\frac{2}{γ + 1})}^{1 / (γ - 1)} \sqrt{γ R T_{o}} {(\frac{2}{γ + 1})}^{1 / 2} A^{*}

(Eq. 5.54)

which can be rewritten as

\dot{m} = \frac{p_{o} A^{*}}{\sqrt{T_{o}}} \sqrt{\frac{γ}{R} {(\frac{2}{γ + 1})}^{(γ + 1) / (γ - 1)}}

(Eq. 5.55)

Eqn. \ref{eq:massflow:c} valid for:

It should be noted that the choked massflow can be calculated using Eqn. \ref{eq:massflow:c} even for cases with shocks downstream of the throat.

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