Understanding Total Gain and Phase Angle in Closed Loop Control Systems

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StripesUK
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Homework Statement


A closed loop control system has three components, Controller, Process, and Measuring System. Each has it's own gain and phase angle. I understand how to find the total of the gain but I'm unsure as to how to find the total phase angle?

Homework Equations


Total Gain=
[itex]\frac{A*B}{1+(A*B)*C}[/itex]

The Attempt at a Solution


Using this formula on the phase angle doesn't give a sensible answer. My instincts tell me that it is just straight addition? I know I've not got very far on this myself, just a nudge in the right direction would be hugely useful.

Many thanks.
 
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Every frequency corresponds to a complex number. That leads to a complex number for $$ \frac{A*B}{1+(A*B)*C} $$.
The modulus of the complex number is the gain and the argument is the phase shift.
 
You have
A = |A|exp(jθA)
B = |B|exp(jθB)
C = |C|exp(jθC)
then combine these in your formula to get the net θ.
You do have to know how to manipulate complex numbers both in polar and rectangular form.[/SUB]
 
For real values of A,B and C the phase shift is (of course) zero - trivial, but unrealistic solution.
Hence, all of these expressions must be considered to be frequency-dependent (complex expressions).
For finding the total phase shift you have nothing to do than (a) to rewrite the transfer function and split it into a real and an imag. part, and (b) apply the definition for phase shift.