Shock-tube relations

From the analysis of the incident shock, we have a relation for the induced flow behind the shock

u_{2} = u_{p} = \frac{a_{1}}{γ_{1}} (\frac{p_{2}}{p_{1}} - 1) {(\frac{(\frac{2 γ_{1}}{γ_{1} + 1})}{(\frac{γ_{1} - 1}{γ_{1} + 1}) + (\frac{p_{2}}{p_{1}})})}^{1 / 2}

(Eq. 6.146)

The velocity in region 3 can be obtained from the expansion relations

\frac{p_{3}}{p_{4}} = {[1 - \frac{γ_{4} - 1}{2} (\frac{u_{3}}{a_{4}})]}^{2 γ_{4} / (γ_{4} - 1)}

(Eq. 6.147)

Solving for $u_{3}$ gives

u_{3} = \frac{2 a_{4}}{γ_{4} - 1} [1 - {(\frac{p_{3}}{p_{4}})}^{(γ_{4} - 1) / (2 γ_{4})}]

(Eq. 6.148)

There is no change in pressure or velocity over the contact surface, which means $u_{2} = u_{3}$ and $p_{2} = p_{3}$ .

u_{2} = \frac{2 a_{4}}{γ_{4} - 1} [1 - {(\frac{p_{2}}{p_{4}})}^{(γ_{4} - 1) / (2 γ_{4})}]

(Eq. 6.149)

Now, we have two ways of calculating $u_{2}$ . Setting Eqn. \ref{eq:shocktube:up:a} equal to Eqn. \ref{eq:shocktube:up:d} leads to the shock tube relation

\frac{p_{4}}{p_{1}} = \frac{p_{2}}{p_{1}} {1 - \frac{(γ_{4} - 1) (a_{1} / a_{4}) (p_{2} / p_{1} - 1)}{\sqrt{2 γ_{1} [2 γ_{1} + (γ_{1} + 1) (p_{2} / p_{1} - 1)]}}}^{- 2 γ_{4} / (γ_{4} - 1)}

(Eq. 6.150)

Shock-tube relations

Navigation menu

Search