Difference between revisions of "229-A1.2"
Jump to navigation
Jump to search
Line 12: | Line 12: | ||
{{NumBlk|::|<math>m = \frac{R_S}{R_L} = \frac{50\mathrm{\Omega}}{25\mathrm{\Omega}} = 2</math>|{{EquationRef|1}}}} | {{NumBlk|::|<math>m = \frac{R_S}{R_L} = \frac{50\mathrm{\Omega}}{25\mathrm{\Omega}} = 2</math>|{{EquationRef|1}}}} | ||
− | {{NumBlk|::|<math>Q = \sqrt{m - 1} = 1</math>|{{EquationRef| | + | {{NumBlk|::|<math>Q = \sqrt{m - 1} = 1 = \frac{R_S}{X_1} = \frac{X_1^\prime}{R_L}</math>|{{EquationRef|2}}}} |
+ | |||
+ | # Calculate the value of the reactance parallel to the larger resistance. In this case, the larger resistance is <math>R_S</math>. | ||
+ | |||
+ | {{NumBlk|::|<math>X_1 = \frac{R_S}{Q} = \frac{50}{1} = 50\mathrm{\Omega}</math>|{{EquationRef|3}}}} | ||
+ | |||
+ | # Calculate the second reactance, <math>X_1^\prime</math>, used to cancel <math>X_1</math>. | ||
+ | |||
+ | {{NumBlk|::|<math>X_1^\prime = R_L Q = 25\mathrm{\Omega}</math>|{{EquationRef|3}}}} | ||
== Case 2: <math>R_S < R_L</math> == | == Case 2: <math>R_S < R_L</math> == |
Revision as of 12:25, 6 September 2020
- Activity: Passive Matching Networks
- Instructions: Each activity is structured as a tutorial, and you are expected to download the netlists, run the simulation, and make sure you understand the concepts and ideas presented. Should you have any questions, clarifications, or issues, please contact your instructor as soon as possible.
- If you are new to ngspice, please visit the ngspice Tutorial page.
- At the end of this activity, the student should be able to:
- Design and verify the performance of passive impedance matching circuits using ngspice.
Contents
Case 1:
Let's design a single L-section circuit between a voltage source with output resistance, and an amplifier with input resistance, .
- Calculate the matching factor, ,and the quality factor, .
-
(1)
-
-
(2)
-
- Calculate the value of the reactance parallel to the larger resistance. In this case, the larger resistance is .
-
(3)
-
- Calculate the second reactance, , used to cancel .
-
(3)
-