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Line 2: A '''closed-loop transfer function''' in [[control theory]] is a mathematical expression ([[algorithm]]) describing the net result of the effects of a closed ([[feedback]]) [[loop (telecommunication)\|loop]] on the input [[signal (information theory)\|signal]] to the circuits enclosed by the loop. == Overview == ~~I don't know what to say so i wrote this!~~ The closed-loop [[transfer function]] is measured at the [[output]]. The output signal [[waveform]] can be calculated from the closed-loop transfer function and the input signal waveform. An example of a closed-loop transfer function is shown below: [[Image:Closed_Loop_Block_Diagram.png]] The summing node and the ''G''(''s'') and ''H''(''s'') blocks can all be combined into one block, which would have the following transfer function: : <math>\dfrac{Y(s)}{X(s)} = \dfrac{G(s)}{1 + G(s) H(s)}</math> ==Derivation==

Closed-loop transfer function: Difference between revisions