How to solve matrix in characteristic equation?

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Given the system matrix A=[0 1 0 0;3 0 0 2; 0 0 0 1; 0 -2 0 0] and B=[0 0;1 0;0 0;0 1], From the characteristic equation det(A-BF) the eigenvalues{-1,-3,-5,-8} are found. How do I reverse the process to find the gain F?
  5 Comments
Tianyi Chai
Tianyi Chai on 9 May 2022
Sorry for the confusion guys here is the complete question, which I misst the system is single-input single-output
Torsten
Torsten on 9 May 2022
Edited: Torsten on 9 May 2022
If it is satisfactory for you, you should then accept Sam's answer.

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Accepted Answer

Sam Chak
Sam Chak on 9 May 2022
This is actually very easy if you know algebra and solving simultaneous equations on the desired characteristic equation (from the eigenvalues) and the actual characteristic equation found from . The fancy name for this method is called Pole Placement:
A = [0 1 0 0; 3 0 0 2; 0 0 0 1; 0 -2 0 0] % state matrix
B = [0 0; 1 0; 0 0; 0 1] % input matrix
p = [-1 -3 -5 -8] % desired poles
F = place(A, B, p) % Pole placement design to calculate the control gain matrix F
% check the result
eig(A-B*F)
For more info, please check:

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