Solve Strangeways Equation: High Pass Filter w/ Inductor

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SUMMARY

The discussion centers on converting Strangeways' equation from a capacitor-based high pass filter to one utilizing an inductor. The original equation is expressed as H(jω) = 1 / ((1 / R2) + jωC) over (R1 + (1 / ((1 / R2) + jωC))). Participants seek assistance in simplifying this equation and understanding its application in transfer functions and frequency response analysis. The need for clarity on Strangeways' equation and its relevance to circuit design is emphasized.

PREREQUISITES
  • Understanding of transfer functions in electrical engineering
  • Familiarity with high pass filter design principles
  • Knowledge of complex frequency variables (jω)
  • Basic circuit analysis involving resistors and capacitors
NEXT STEPS
  • Research the derivation of Strangeways' equation in the context of filter design
  • Learn about high pass filter configurations using inductors
  • Study the implications of frequency response in circuit analysis
  • Explore simplification techniques for complex equations in electrical engineering
USEFUL FOR

Electrical engineering students, circuit designers, and anyone involved in filter design and analysis will benefit from this discussion.

imeener
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Homework Statement



I'm having difficulty turning strangeways' equation from an equation with a capacitor into a high pass equation with an inductor. I'm also having problems typing the equation out so I'm just going to write it out in words...It's H(jw) equals 1 over ((1 over Resistor2) plus jw(omega)C) all of that over Resistor1 plus 1 over ((1 over Resistor2) plus jwc)) I hope this is not too confusing.

Homework Equations





The Attempt at a Solution


It would be wonderful if someone can help me with this, and if someone can help me take that equation and simplify it. Thanks in advance!
 
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What the heck is a Strangeway's equation? Can you provide a link?
 
I wish I could but I can't find one. What I do know is it has something to do with transfer functions and frequency response. The only way I could explain it is how I did previously. PLEASE HELP!
 
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