1. What is the recovery factor if the total temperature is equal to the indicated total temperature?
a) 1
b) 2
c) -1
d) -2
Explanation: The answer is 1. The expression for recovery factor is given by r=\(\frac{T_i-T}{T_t-T}\)where r is known as recovery factor, Ti is known as indicated total temperature, Tt is known as total temperature and T is known as static temperature. In the formula if Tt=Ti then
r=\(\frac{T_i-T}{T_i-T}\)
r=1.
2. What is the relation between speed of object and temperature?
a) T0=T\(\Big[1+\frac{\gamma-1}{2}(\frac{V}{a})^2\Big]\)
b) T0=T\(\Big[1-\frac{\gamma-1}{2}(\frac{V}{a})^2\Big]\)
c) T0=T\(\Big[1+\frac{\gamma+1}{2}(\frac{V}{a})^2\Big]\)
d) T0=T\(\Big[1-\frac{\gamma+1}{2}(\frac{V}{a})^2\Big]\)
Explanation: The relation between speed of object and temperature is T0=T\(\Big[1+\frac{\gamma-1}{2}(\frac{V}{a})^2\Big]\) where T is the temperature at that altitude, T0 is the stagnation temperature, γ is the ratio of specific heat at constant pressure to that of specific heat at constant volume, V is speed of object and ‘a’ is speed of sound.
3. What is the relation between recovery factor and temperature?
a) Ti=T[1+r\(\frac{\gamma-1}{2}\)M2]
b) Ti=T[1+r\(\frac{\gamma+1}{2}\)M2]
c) Ti=T[1-r\(\frac{\gamma-1}{2}\)M2]
d) Ti=T[1-r\(\frac{\gamma+1}{2}\)M2]
Explanation: The relation between recovery factor and temperature is Ti=T[1+r\(\frac{\gamma-1}{2}\)M2] where T is the temperature at that altitude, Ti is indicated total temperature, r is recovery factor, M is Mach number and γ is the ratio of specific heat at constant pressure to that of specific heat at constant volume.
4. What is the indicated temperature of an aircraft having mach number 2 and when temperature and recovery factor are 300K and 2?
a) 780K
b) 128K
c) 345K
d) 435K
Explanation: The answer is 780K. Given r=2, T=300K, M=2 and we know that γ for air is 1.4. From the formula Ti=T[1+r\(\frac{\gamma-1}{2}\)M2].
On substituting the values we get Ti=300[1+2\(\frac{1.4-1}{2}\)22]
On solving above equation we get Ti=780K.
5. What is the mach number of the aircraft which is moving in air at an indicated total temperature is 780K and the temperature, recovery factor at that point are 300K and 2?
a) 1
b) 2
c) 0.1
d) 0.2
Explanation: The answer is 2. Given r=2, T=300K, Ti=780K and we know γ of air is 1.4. From the formula Ti=T[1+r\(\frac{\gamma-1}{2}\)M2].
On substituting the values in the formula, we get 780=300[1+2\(\frac{1.4-1}{2}\)M2].
On solving we get M=2.
6. The difference in indicated values and local values of altitude, airspeed and mach number is known as system pressure error.
a) True
b) False
Explanation: The difference in indicated values and local values of altitude, airspeed and mach number is known as system pressure error. The indicated values of the altitude, airspeed and mach number resulting from the measured values of the local or system, pressures will differ from the values that would occur when using the undisturbed freest stream pressures. This error is known as system pressure error.
7. Calculate the indicated temperature rise when indicated total temperature is 400K and temperature at that point is 389K.
a) 11
b) 5.5
c) 6
d) 12
Explanation: The answer is 11. Given Ti=400K and T=389K. The indicated temperature rise is measured by the formula, Ti-T.
On substituting the values we get the indicated temperature rise=400-389
The indicated temperature rise=11.
8. Calculate the ideal temperature rise when total temperature is 440K and temperature at that point is 369K.
a) 71
b) 70
c) 75
d) 78
Explanation: The answer is 71. Given Tt=440K and T=369K. The ideal temperature rise is measured by the formula, Tt-T.
On substituting the values we get the indicated temperature rise=440-369
The indicated temperature rise=71.
9. Which of the following is a correct equation?
a) Fa+Fp+Fg=Fl
b) Fa+Fp+Fg=Fl
c) Fa+Fp+Fg=Fl
d) Fa+Fp+Fg=Fl
Explanation: The correct equation is Fa+Fp+Fg=Ft where Fa=aerodynamic forces, Fp=propulsive forces, Fg=gravitational forces and Fl=inertial forces. The statement says that the system of forces containing gravitational forces, aerodynamic forces and propulsive forces results in the inertial forces acting on the aircraft.
10. The system of forces acting on the aircraft are propulsive forces, aerodynamic forces, gravitational forces and these result in inertial forces.
a) True
b) False
Explanation: The system of forces acting on the aircraft are propulsive forces, aerodynamic forces, gravitational forces and these result in inertial forces. From Newton’s law the equation becomes Fa+Fp+Fg=Ft where Fa=aerodynamic forces, Fp=propulsive forces, Fg=gravitational forces and Fl=inertial forces.