| Design Case Studies | |
Yaw Damper for a 747 Jet Transport
This case study demonstrates the tools for classical control design by stepping through the design of a yaw damper for a 747 jet transport aircraft.
The jet model during cruise flight at MACH = 0.8 and H = 40,000 ft. is
A = [-0.0558 -0.9968 0.0802 0.0415 0.5980 -0.1150 -0.0318 0 -3.0500 0.3880 -0.4650 0 0 0.0805 1.0000 0]; B = [ 0.0729 0.0000 -4.7500 0.00775 .15300 0.1430 0 0]; C = [0 1 0 0 0 0 0 1]; D = [0 0 0 0];
The following commands specify this state-space model as an LTI object and attach names to the states, inputs, and outputs.
states = {'beta' 'yaw' 'roll' 'phi'}; inputs = {'rudder' 'aileron'}; outputs = {'yaw' 'bank angle'}; sys = ss(A,B,C,D,'statename',states,... 'inputname',inputs,... 'outputname',outputs);
You can display the LTI model sys by typing sys. MATLAB responds with
a = beta yaw roll phi beta -0.0558 -0.9968 0.0802 0.0415 yaw 0.598 -0.115 -0.0318 0 roll -3.05 0.388 -0.465 0 phi 0 0.0805 1 0 b = rudder aileron beta 0.0729 0 yaw -4.75 0.00775 roll 0.153 0.143 phi 0 0 c = beta yaw roll phi yaw 0 1 0 0 bank angle 0 0 0 1 d = rudder aileron yaw 0 0 bank angle 0 0 Continuous-time model.
The model has two inputs and two outputs. The units are radians for beta (sideslip angle) and phi (bank angle) and radians/sec for yaw (yaw rate) and roll (roll rate). The rudder and aileron deflections are in radians as well.
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