Consider a one-dimensional inviscid supersonic flow in a diverging duct with heat addition ($Q_{in}$). Which of the following statement(s) is/are always TRUE?
Show Hint
For Rayleigh flow (heat addition in ducts), remember: in supersonic flow, Mach decreases, static pressure and stagnation temperature increase, while stagnation pressure decreases.
Step 1: Concept of Rayleigh flow.
When heat is added to a supersonic flow (Rayleigh flow conditions), the Mach number decreases toward 1 (thermal choking). Hence:
\[
M_2 < M_1
\]
Therefore, (A) is false.
Step 2: Stagnation pressure.
In real heat addition (non-isentropic process), stagnation pressure always decreases because of irreversibility:
\[
P_2^0 < P_1^0
\]
Hence (B) is true.
Step 3: Static pressure.
For supersonic flow with heat addition, static pressure increases as Mach number decreases:
\[
P_2 > P_1
\]
So (C) is true.
Step 4: Stagnation temperature.
Since heat is added to the system, stagnation temperature must increase:
\[
T_2^0 > T_1^0
\]
Thus (D) is true.
Step 5: Final check.
- (A) false (Mach number decreases).
- (B) true (stagnation pressure decreases).
- (C) true (static pressure increases).
- (D) true (stagnation temperature increases).
\[
\boxed{\text{Correct statements: (B), (C), and (D)}}
\]
