COMPRESSIBLE FLOW 875
dharm
\M-therm\Th16-1.pm5
Stagnation density, ρs :
ρs =
p
RT
s
s
= ×
×
131.27 10
287 358.4
3
= 1.276 kg/m^3 (Ans.)
Compressibility factor at M = 0.8 :
Compressibility factor = 1 +
M 02
4
2
24
+ −γ M 04 + ...
= 1 +
08
4
214
24
..^2
+ − × 0.8^4 = 1.1702 (Ans.)
Example 16.10. Air at a pressure of 220 kN/m^2 and temperature 27°C is moving at a
velocity of 200 m/s. Calculate the stagnation pressure if
(i)Compressibility is neglected ; (ii)Compressibility is accounted for.
For air take R = 287 J/kg K, γ = 1.4.
Sol. Pressure of air, p 0 = 200 kN/m^2
Temperature of air, T 0 = 27 + 233 = 300 K
Velocity of air, V 0 = 200 m/s
Stagnation pressure, ps :
(i) Compressibility is neglected :
ps = p 0 +
ρ 002
2
V
where ρ 0 =
p
RT
0
0
220 10^3
287 300
= ×
× = 2.555 kg/m
3
∴ ps = 220 +
2 555 200
2
. ×^2
× 10–3 (kN/m^2 ) = 271.1 kN/m^2. Ans.
(ii) Compressibility is accounted for :
The stagnation pressure, when compressibility is accounted for, is given by,
ps = p 0 +
ργ 002 02
2 1 4 04
2
24
VMF ++− M +
HG
I
KJ
... ...[Eqn. (16.19)]
Mach number, M 0 =
V
C RT
0
0 0
200 200
1 4 287 300
==
γ. ××
= 0.576
Whence, ps = 220 +
2 555 200
2
10 1 0 576
4
214
24
0 576
..^232. 4
× ×++− ×.
F
HG
I
KJ
−
or, ps = 220 + 51.1 (1 + 0.0829 + 0.00275) = 275.47 kN/m^2 (Ans.)
Example 16.11. In aircraft flying at an altitude where the pressure was 35 kPa and
temperature – 38 °C, stagnation pressure measured was 65.4 kPa. Calculate the speed of the
aircraft. Take molecular weight of air as 28. (UPSC, 1998)
Sol. Pressure of air, p 0 = 35 kPa = 35 × 10^3 N/m^2
Temperature of air, T 0 = – 38 + 273 = 235 K
Stagnation pressure, ps = 65.4 kPa = 65.4 × 10^3 N/m^2