For a T-network if the Open circuit impedance parameters are given as z11, z21, z12, z22, then z22 in terms of Inverse Hybrid parameters can be expressed as ________(a) z22 = \(\frac{1}{g_{11}} \)(b) z22 = – \(\frac{g_{12}}{g_{11}} \)(c) z22 = – \(\frac{g_{21}}{g_{11}} \)(d) z22 = \(\left(g_{22} – \frac{g_{21} g_{12}}{g_{11}}\right)\)The question was asked in class test.The above asked question is from Relation between Hybrid Parameters with Short Circuit Admittance and Open Circuit Impedance Parameters in chapter Two-Port Networks of Network Theory

For a T-network if the Open circuit impedance parameters are given as

1.	For a T-network if the Open circuit impedance parameters are given as z11, z21, z12, z22, then z22 in terms of Inverse Hybrid parameters can be expressed as ________(a) z22 = \(\frac{1}{g_{11}} \)(b) z22 = – \(\frac{g_{12}}{g_{11}} \)(c) z22 = – \(\frac{g_{21}}{g_{11}} \)(d) z22 = \(\left(g_{22} – \frac{g_{21} g_{12}}{g_{11}}\right)\)The question was asked in class test.The above asked question is from Relation between Hybrid Parameters with Short Circuit Admittance and Open Circuit Impedance Parameters in chapter Two-Port Networks of Network Theory
Answer» The correct answer is (d) z22 = \(\left(g_{22} – \FRAC{g_{21} g_{12}}{g_{11}}\right)\) EASY explanation: We know that, V1 = z11 I1 + z12 I2 ……… (1) V2 = Z21 I1 + z22 I2 ………. (2) And, I1 = G11 V1 + g12 I2 ………. (3) V2 = g21 V1 + g22 I2 ……….. (4) Now, (3) and (4) can be rewritten as, V1 = \(\frac{I_1}{g_{11}}– \frac{g_{12}}{g_{11}} I_2\) ………… (5) And V2 = \(\left(g_{22} – \frac{g_{21} g_{12}}{g_{11}}\right) I_2 – \frac{g_{21} I_1}{g_{11}}\)……….. (6) ∴ Comparing (1), (2) and (5), (6), we GET, z11 = \(\frac{1}{g_{11}} \) z12 = – \(\frac{g_{12}}{g_{11}} \) z21 = – \(\frac{g_{21}}{g_{11}} \) z22 = \(\left(g_{22} – \frac{g_{21} g_{12}}{g_{11}}\right)\).

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