Question 17.4: Critical Temperature and Pressure in Gas Flow Calculate the ...

For the flow discussed in Example 17–3, the critical pressure and temperature are to be calculated.
Assumptions 1 The flow is steady, adiabatic, and one-dimensional. 2 Carbon dioxide is an ideal gas with constant specific heats.
Properties The specific heat ratio of carbon dioxide at room temperature is k = 1.289 (Table A–2a).
Analysis The ratios of critical to stagnation temperature and pressure are determined to be

\frac{T^{*}}{T_{0}}=\frac{2}{k+1}=\frac{2}{1.289+1}=0.8737

\frac{P^{*}}{P_{0}}=\left(\frac{2}{k+1}\right)^{k /(k-1)}=\left(\frac{2}{1.289+1}\right)^{1.289 /(1.289-1)}=0.5477

Noting that the stagnation temperature and pressure are, from Example 17–3, T_{0}=473 K \text { and } P_{0}=1400 kPa , we see that the critical temperature and pressure in this case are

\begin{aligned}&T^{*}=0.8737 T_{0}=(0.8737)(473 K )=413 K \\&P^{*}=0.5477 P_{0}=(0.5477)(1400 kPa )=767 kPa\end{aligned}

Discussion Note that these values agree with those listed in Table 17–1, as expected. Also, property values other than these at the throat would indicate that the flow is not critical, and the Mach number is not unity.

TABLE 17–1