Hi MrAl,
thank you for your comments in post #22.
I like to repeat that I fully understand your intention - however, I don`t think that my approach in principle differs from yours.
The only difference is that for my approach the calculation is split into several parts that are combined at the end. There is no "shortcut" or a "trick" or something else.
Let me give a very simple example:
To find the voltage delivered by a simple resistive voltage divider everybody uses one single formula
V2=V1*R2/(R1+R2).
Is this a "trick" or a "shortcut"? As you know, it is a formula that results from a combination of two other basic formulas.
The same applies to Black´s feedback formula. It is also the result of basic current-voltage relations, which you are using.
Quote: Some circuits are much more difficult though like the twin T notch or bandpass and these circuits require basic analysis anyway at least to start. So we really need that basic analysis more than we need the shortcuts.
I think, also in case of Twin-T or other active filter circuits you can avoid the time-consuming analysis (starting with basic current-voltage relation). It is much more easy to split the calculation into several steps (like calculation of Hf, Hr and gain) and to combine the various results.
By the way: The general formula applicable to all kinds of feedback is
Vout/Vin=Hf*Ao/(1-Hr*Ao)
with:
Ao: Gain without feedback (always positive) ,
Hf: Factor, which defines the part of the input voltage Vin appearing at the amplifier input port for Vout=0 (Hf positive/negative for non-inverting/inverting operation),
Hr: Factor, which defines the part of the output voltage Vout appearing at the amplifier input port for Vin=0 (Hr positive/negative for positive/negative feedback operation).
For my opinion, using the above feedback formula in addition has the advantage that the user can gain a better understanding of terms "feedback factor" and "loop gain", which are essential for designing circuits with feedback.