diff --git a/src/cheatsheets/Schaltungstheorie.typ b/src/cheatsheets/Schaltungstheorie.typ index 1fa0ca0..150d7d7 100644 --- a/src/cheatsheets/Schaltungstheorie.typ +++ b/src/cheatsheets/Schaltungstheorie.typ @@ -1590,7 +1590,7 @@ columns: (auto, auto, auto, 1fr, 1fr, 1fr), [*Name*], [*Schaltbild*], [*Ersatz-Schaltbild*], [*Eigenschaften*], [*Beschreibung*], [*Knotenspannungs Analyse*], - [Nullor], [], [], [], [$A = mat(0, 0; 0, 0)$], [], + [Nullor], [], [], [], [$ A = mat(0, 0; 0, 0) $], [], [OpAmp \ lin], [], [], [], [], [], @@ -1598,15 +1598,21 @@ [OpAmp \ $U_"sat-"$], [], [], [], [], [], - [VCVS], [], [], [], [$H' = mat(0, 0; mu, 0) quad A = mat(1/mu 0; 0, 0)$], [], + [VCVS], [], [], [], [$ H' = mat(0, 0; mu, 0) quad A = mat(1/mu, 0; 0, 0) $], [], - [VCCS], [], [], [], [$G = mat(0, 0; g, 0) quad A = mat(0, -1/g; 0, 0)$], [], + [VCCS], [], [], [], [$ G = mat(0, 0; g, 0) quad A = mat(0, -1/g; 0, 0) $], [], - [CCVS], [], [], [], [$R = mat(0, 0, r, 0) quad A = mat(0, 0; 1/r, 0)$], [], + [CCVS], [], [], [], [$ R = mat(0, 0; r, 0) quad A = mat(0, 0; 1/r, 0) $], [], - [CCCS], [], [], [], [$H = mat(0, 0; beta, 0) quad A = mat(0, 0; 0, -1/beta)$], [], + [CCCS], [], [], [], [$ H = mat(0, 0; beta, 0) quad A = mat(0, 0; 0, -1/beta) $], [], - [Übertrager], [], [], [], [], [], + [Übertrager], [], [], + [], + [$ H = mat(0, ü; -ü, 0) quad + H' = mat(0, -1/ü; 1/ü, 0) \ + A = mat(ü, 0; 0, 1/ü) quad A' = mat(1/ü, 0; 0, ü) + $], + [], [Gyrator], [], @@ -1615,19 +1621,21 @@ - Antireziprok, Antisymetrisch - Auch Positiv-Immitanz-Inverter ], - [$R = mat(0, -R_d; R_d, 0) quad G = mat(0, G_d; -G_d, 0) \ A = mat(0, R_d; 1/R_d, 0) quad A' = mat(0, -R_d; -1/R_d, 0)$], + [$ R = mat(0, -R_d; R_d, 0) quad G = mat(0, G_d; -G_d, 0) \ A = mat(0, R_d; 1/R_d, 0) quad A' = mat(0, -R_d; -1/R_d, 0) + quad + $], [], [NIK], [], [], - [], [ - - Akitv + - Aktiv - Antireziprok - Symetrisch für $abs(k) = 1$ ], - [$H = mat(0, -k; -k, 0) quad H' = mat(0, -1/k; -1/k, 0); A = mat(-k, 0; 0, 1/k) quad A'= mat(-1/k, 0; 0, k)$], + [$ H = mat(0, -k; -k, 0) quad H' = mat(0, -1/k; -1/k, 0) \ A = mat(-k, 0; 0, 1/k) quad A'= mat(-1/k, 0; 0, k) $], + [], [T-Glied], [],