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31 July, 06:16

Consider a Pitot static tube mounted on the nose of an experimental airplane. A Pitot tube measures the total pressure at the tip of the probe (hence sometimes called the Pitot pressure), and a Pitot static tube combines this with a simultaneous measurement of the free-stream static pressure. The Pitot and free-stream static measurements are given below for three different flight conditions. Calculate the free-stream Mach number at which the airplane is flying for each of the three different conditions

1. Pitot pressure=1.22*105N/m2, static pressure=1.01 * 105N/m2.

2. Pitot pressure=7222lb/f t2, static pressure=2116lb/f t2.

3. Pitot pressure=13197lb/f t2, static pressure=1020lb/f t2.

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  1. 31 July, 06:18
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    M∞ = 0.53

    M∞ = 1.5

    M∞ = 3.1

    Explanation:

    Find: For each case the free stream Mach number.

    -Pitot pressure=1.22*10^5N/m2, static pressure=1.01 * 10^5N/m2.

    Solution:

    - The free stream Mach number is a function of static to hydrodynamic pressures. So for this case we have:

    P = 1.01 * 10^5 ... static pressure

    Po = 1.22*10^5 ... pitot pressure (hydrodynamic)

    - Take the ratio:

    P / Po = (1.01 * 10^5) / (1.22*10^5) = 0.8264.

    - Use Table A. 13 and look up the ratio P/Po = 0.8264 for Mach number M∞.

    M∞ = 0.53

    Find:

    -Pitot pressure=7222 lb/ft^2, static pressure=2116 lb/ft^2

    Solution:

    - The free stream Mach number is a function of static to hydrodynamic pressures. So for this case we have:

    P = 2116 ... static pressure

    Po = 7222 ... pitot pressure (hydrodynamic)

    - Take the ratio:

    P / Po = (2116) / (7222) = 0.2930.

    - However, since this is supersonic, a normal shock sits in front of the Pitot tube. Hence, Po is now the total pressure behind a normal shock wave. Thus, we have to use Table A. 14.

    P1 = 2116 ... static pressure

    Po2 = 7222 ... pitot pressure (hydrodynamic)

    - Take the ratio:

    Po2 / P1 = (7222) / (2116) = 3.412.

    - Use Table A. 14 and look up the ratio Po2/P1 = 3.412 for Mach number M∞.

    M∞ = 1.5

    Find:

    -Pitot pressure=13197 lb/f^t2, static pressure=1020 lb/ft^2

    Solution:

    - The free stream Mach number is a function of static to hydrodynamic pressures. So for this case we have:

    P = 1020 ... static pressure

    Po = 13197 ... pitot pressure (hydrodynamic)

    - Take the ratio:

    P / Po = (1020) / (13197) = 0.0772.

    - Again, since this is supersonic, a normal shock sits in front of the Pitot tube. Hence, Po is now the total pressure behind a normal shock wave. Thus, we have to use Table A. 14.

    P1 = 1020 ... static pressure

    Po2 = 13197 ... pitot pressure (hydrodynamic)

    - Take the ratio:

    Po2 / P1 = (13197) / (1020) = 12.85.

    - Use Table A. 14 and look up the ratio Po2/P1 = 12.85 for Mach number M∞.

    M∞ = 3.1
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