Shock-tube relations: Difference between revisions
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Latest revision as of 13:37, 1 April 2026
From the analysis of the incident shock, we have a relation for the induced flow behind the shock
| (Eq. 6.146) |
The velocity in region 3 can be obtained from the expansion relations
| (Eq. 6.147) |
Solving for gives
| (Eq. 6.148) |
There is no change in pressure or velocity over the contact surface, which means and .
| (Eq. 6.149) |
Now, we have two ways of calculating . Setting Eqn. \ref{eq:shocktube:up:a} equal to Eqn. \ref{eq:shocktube:up:d} leads to the shock tube relation
| (Eq. 6.150) |