Difference between revisions of "Aufgaben:Exercise 2.3Z: Asymmetrical Characteristic Operation"

Latest revision as of 15:50, 29 September 2021

System and signal examples

The cosine signal

$x(t) = A \cdot \cos(\omega_0 t)$

is applied to the input of a system $S$ where $A = 0.5$ shall always hold for the amplitude. The system $S$ consists of

the addition of a direct (DC) component $C$ ,
a nonlinearity with the characteristic curve

$g(x) = \sin(x) \hspace{0.05cm} \approx x -{x^3}\hspace{-0.1cm}/{6} = g_3(x),$

as well as an ideal high-pass filter that allows all frequencies to pass unaltered except for a direct (DC) signal $(f = 0)$ .

The output signal of the overall system can generally be depicted as follows:

$y(t) = A_0 + A_1 \cdot \cos(\omega_0 t) + A_2 \cdot \cos(2\omega_0 t) + A_3 \cdot \cos(3\omega_0 t) + \hspace{0.05cm}\text{...}$

The sinusoidal characteristic curve $g(x)$ is to be approximated by the cubic approximation $g_3(x)$ throughout the whole problem according to the above equation.

This would result in exactly the same constellation as in Exercise 2.3 for $C = 0$ in whose subtask (2) the distortion factor was calculated:

$K = K_{g3} \approx 1.08 \%$ für $A = 0.5$ ,
$K = K_{g3} \approx 4.76 \%$ für $A = 1.0$ .

Considering the constants $A = C = 0.5$ the following holds for the input signal of the nonlinearity:

$x_{\rm C}(t) = C + A \cdot \cos(\omega_0 t) = {1}/{2} + {1}/{2}\cdot \cos(\omega_0 t).$

So, the characteristic curve is operated asymmetrically with values between $0$ and $1$ .
In the above graph, the signals $x_{\rm C}(t)$ and $y_{\rm C}(t)$ are plotted additionally directly before and after the characteristic curve $g(x)$ .

Please note:

The exercise belongs to the chapter Nonlinear Distortions.

The following trigonometric relations are assumed to be known:

$\cos^2(\alpha) = {1}/{2} + {1}/{2} \cdot \cos(2\alpha)\hspace{0.05cm}, \hspace{0.3cm} \cos^3(\alpha) = {3}/{4} \cdot \cos(\alpha) + {1}/{4} \cdot \cos(3\alpha) \hspace{0.05cm}.$

Questions

Solution

(1) Considering the cubic approximation

$g_3(x)$ the following is obtained before the high-pass filter:

$y_{\rm C}(t) = g_3\big[x_{\rm C}(t)\big] = \big[ C + A \cdot \cos(\omega_0 t)\big] - {1}/{6} \cdot \big[ C + A \cdot \cos(\omega_0 t)\big]^3$

$\Rightarrow \; y_{\rm C}(t) = C + A \cdot \cos(\omega_0 t) - {1}/{6} \cdot \big[ C^3 + 3 \cdot C^2 \cdot A \cdot \cos(\omega_0 t) + \hspace{0.09cm}3 \cdot C \cdot A^2 \cdot \cos^2(\omega_0 t) + A^3 \cdot \cos^3(\omega_0 t)\big].$

The signal $y_{\rm C}(t)$ contains a direct (DC) component $C - C^3/6$ which is no longer included in the signal $y(t)$ due to the high-pass filter:

$\underline{ A_0 = 0}.$

(2) Applying the given trigonometric relations the following coefficients with $A= C = 0.5$ are obtained:

$A_1 = A - {1}/{6}\cdot 3 \cdot C^2 \cdot A - {1}/{6} \cdot {3}/{4}\cdot A^3 = {1}/{2} - {1}/{16} - {1}/{64} = {27}/{64} \hspace{0.15cm}\underline{ \approx 0.422},$

$A_2 = - {1}/{6}\cdot 3 \cdot {1}/{2}\cdot C \cdot A^2 = - \frac{1}{32} \hspace{0.15cm}\underline{\approx -0.031},$

$A_3 = - {1}/{6}\cdot \frac{1}{4}\cdot A^3 = - {1}/{192} \hspace{0.15cm}\underline{\approx -0.005}.$

Higher order terms do not occur. Thus, $\underline{A_4 = 0}$ holds.

(3) In this task, the higher order distortion factors are $K_2 = 2/27 \approx 7.41\%$ and $K_3 = 1/81 \approx 1.23\%$ .

Thereby, the following is obtained for the overall distortion factor:

$K = \sqrt{K_2^2 + K_3^2} \hspace{0.15cm}\underline{\approx7.51 \%}.$

(4) The maximum value occurs at time $t = 0$ and at multiples of $T$ :

$y_{\rm max}= y(t=0) = A_1 + A_2 + A_3 = 0.422 -0.031 -0.005 \hspace{0.15cm}\underline{= 0.386}.$

The minimum values are located exactly in the middle between two maxima and it holds that:

$y_{\rm min}= - A_1 + A_2 - A_3 = -0.422 -0.031 +0.005\hspace{0.15cm}\underline{ = -0.448}.$

The signal $y(t)$ is shifted downward by $0.448$ compared to the signal drawn in the sketch on the information page.
This signal value is obtained from the following equation considering $A = C = 1/2$ :

$C - \frac{C \cdot A^2}{4}- \frac{C^3}{6} = {1}/{2} - {1}/{32}- {1}/{48} = 0.448.$

@@ Line 1: / Line 1: @@
-{{quiz-Header|Buchseite=Lineare zeitinvariante Systeme/Nichtlineare Verzerrungen
+{{quiz-Header|Buchseite=Linear_and_Time_Invariant_Systems/Nonlinear_Distortion}}
-}}
-[[File:P_ID895__LZI_Z_2_3.png|right|frame|Einfluss nichtlinearer Verzerrungen]]
+[[File:P_ID895__LZI_Z_2_3.png|right|frame|System and signal examples]]
-Am Eingang eines Systems&nbsp;  $S$ &nbsp; liegt das Cosinussignal
+The cosine signal
 : $x(t) =  A \cdot \cos(\omega_0 t)$
-an, wobei für die Amplitude stets&nbsp;  $A = 0.5$ &nbsp; gelten soll. Das System&nbsp;  $S$ &nbsp; besteht
+is applied to the input of a system&nbsp;  $S$ &nbsp; where&nbsp;  $A = 0.5$ &nbsp; shall always hold for the amplitude.&nbsp; The system&nbsp;  $S$ &nbsp; consists of
-*aus der Addition eines Gleichanteils&nbsp;  $C$ ,
+*the addition of a direct (DC) component&nbsp;  $C$ ,
-*einer Nichtlinearität mit der Kennlinie
+*a nonlinearity with the characteristic curve
 : $g(x) =  \sin(x) \hspace{0.05cm} \approx x -{x^3}\hspace{-0.1cm}/{6} = g_3(x),$
-*sowie einem idealen Hochpass, der alle Frequenzen bis auf ein Gleichsignal&nbsp;  $(f = 0)$ &nbsp; unverfälscht passieren lässt.
+*as well as an ideal high-pass filter that allows all frequencies to pass unaltered except for a direct (DC) signal&nbsp;  $(f = 0)$ .
-Das Ausgangssignal des Gesamtsystems kann allgemein wie folgt dargestellt werden:
+The output signal of the overall system can generally be depicted as follows:
 :$$y(t) =  A_0 + A_1 \cdot \cos(\omega_0 t) + A_2 \cdot \cos(2\omega_0 t) +
   A_3 \cdot \cos(3\omega_0 t) + \hspace{0.05cm}\text{...}$$
-Die sinusförmige Kennlinie&nbsp;  $g(x)$ &nbsp; soll in der gesamten Aufgabe entsprechend der obigen Gleichung durch die kubische Näherung &nbsp; $g_3(x)$ &nbsp; approximiert werden.
+The sinusoidal characteristic curve&nbsp;  $g(x)$ &nbsp; is to be approximated by the cubic approximation&nbsp; $g_3(x)$ &nbsp; throughout the whole problem according to the above equation.
-Für&nbsp;  $C = 0$ &nbsp; ergäbe sich somit die exakt gleiche Konstellation wie in&nbsp; [[Aufgaben:2.3_Sinusförmige_Kennlinie|Aufgabe 2.3]], in deren Unterpunkt&nbsp; '''(2)'''&nbsp; der Klirrfaktor berechnet wurde:
+This would result in exactly the same constellation as in&nbsp; [[Aufgaben:Exercise_2.3:_Sinusoidal_Characteristic|Exercise 2.3]]&nbsp; for&nbsp;  $C = 0$ &nbsp; in whose subtask&nbsp; '''(2)'''&nbsp; the distortion factor was calculated:
 * $K = K_{g3} \approx 1.08 \%$  &nbsp;für&nbsp;  $A = 0.5$ ,
 * $K = K_{g3} \approx 4.76 \%$  &nbsp;für&nbsp;  $A = 1.0$ .
-Unter Berücksichtigung der Konstanten&nbsp;  $A = C = 0.5$ &nbsp; gilt für das Eingangssignal der Nichtlinearität:
+Considering the constants&nbsp;  $A = C = 0.5$ &nbsp; the following holds for the input signal of the nonlinearity:
 : $x_{\rm C}(t) =  C + A \cdot \cos(\omega_0 t) = {1}/{2} + {1}/{2}\cdot \cos(\omega_0 t).$
-*Die Kennlinie wird also unsymmetrisch betrieben mit Werten zwischen&nbsp;  $0$ &nbsp; und&nbsp;  $1$ .
+*So,&nbsp; the characteristic curve is operated asymmetrically with values between&nbsp;  $0$ &nbsp; and&nbsp;  $1$ .
-*In obiger Grafik sind zusätzlich die Signale&nbsp;  $x_{\rm C}(t)$ &nbsp; und&nbsp;  $y_{\rm C}(t)$ &nbsp; direkt vor und nach der Kennlinie&nbsp;  $g(x)$ &nbsp; eingezeichnet.
+*In the above graph,&nbsp; the signals&nbsp;  $x_{\rm C}(t)$ &nbsp; and&nbsp;  $y_{\rm C}(t)$ &nbsp; are plotted additionally directly before and after the characteristic curve&nbsp;  $g(x)$ &nbsp;.
@@ Line 39: / Line 38: @@
-''Hinweise:''
+''Please note:''
-*Die Aufgabe bezieht sich auf das Kapitel&nbsp; [[Lineare_zeitinvariante_Systeme/Nichtlineare_Verzerrungen|Nichtlineare Verzerrungen]].
+*The exercise belongs to the chapter&nbsp; [[Linear_and_Time_Invariant_Systems/Nonlinear_Distortion|Nonlinear Distortions]].
-*Als bekannt vorausgesetzt werden die folgenden trigonometrischen Beziehungen:
+*The following trigonometric relations are assumed to be known:
 :$$\cos^2(\alpha) =  {1}/{2}  + {1}/{2}
 \cdot \cos(2\alpha)\hspace{0.05cm}, \hspace{0.3cm}
@@ Line 49: / Line 48: @@
-===Fragebogen===
+===Questions===
 <quiz display=simple>
-{Berechnen Sie das Ausgangssignal&nbsp;  $y(t)$ &nbsp; unter Berücksichtigung des Hochpasses. Wie lautet der Gleichsignalanteil&nbsp;  $A_0$ ?
+{Compute the output signal&nbsp;  $y(t)$ &nbsp; considering the high-pass filter.&nbsp; What is the direct (DC) signal component&nbsp;  $A_0$ ?
 |type="{}"}
  $A_0 \ = \$  { 0. }
-{Geben Sie die weiteren Fourierkoeffizienten des Signals&nbsp;  $y(t)$ &nbsp; an.
+{State the other Fourier coefficients of the signal&nbsp;  $y(t)$ &nbsp;.
 |type="{}"}
  $A_1  \ = \$   { 0.422 3% }
@@ Line 65: / Line 64: @@
-{Berechnen Sie den Klirrfaktor des Gesamtsystems.
+{Compute the distortion factor of the overall system.
 |type="{}"}
  $K  \ = \$   { 7.51 3% }  $\ \%$
-{Berechnen Sie den Maximal&ndash; und den Minimalwert des Signals&nbsp;  $y(t)$ .
+{Compute the maximum and the minimum value of the signal&nbsp;  $y(t)$ .
 |type="{}"}
  $y_\text{max}  \ = \$   { 0.386 3% }
@@ Line 79: / Line 78: @@
 </quiz>
-===Musterlösung===
+===Solution===
 {{ML-Kopf}}
-'''(1)'''&nbsp; Unter Berücksichtigung der kubischen Näherung &nbsp; $g_3(x)$ &nbsp; erhält man vor dem Hochpass:
+'''(1)'''&nbsp; Considering the cubic approximation&nbsp; $g_3(x)$ &nbsp; the following is obtained before the high-pass filter:
 :$$y_{\rm C}(t) = g_3\big[x_{\rm C}(t)\big] = \big[ C + A \cdot \cos(\omega_0
   t)\big] - {1}/{6} \cdot \big[ C + A \cdot \cos(\omega_0
@@ Line 91: / Line 90: @@
   t) + A^3 \cdot \cos^3(\omega_0  t)\big].$$
-*Das Signal&nbsp;  $y_{\rm C}(t)$ &nbsp; beinhaltet eine Gleichkomponente&nbsp;  $C - C^3/6$ , die aufgrund des Hochpasses im Signal&nbsp;  $y(t)$ &nbsp; nicht mehr enthalten ist:
+*The signal&nbsp;  $y_{\rm C}(t)$ &nbsp; contains a direct (DC) component&nbsp;  $C - C^3/6$ &nbsp; which is no longer included in the signal&nbsp;  $y(t)$ &nbsp; due to the high-pass filter:
 : $\underline{ A_0 = 0}.$
-'''(2)'''&nbsp; Bei Anwendung der angegebenen trigonometrischen Beziehungen erhält man folgende Koeffizienten mit&nbsp;  $A= C = 0.5$ :
+'''(2)'''&nbsp; Applying the given trigonometric relations the following coefficients with&nbsp;  $A= C = 0.5$ &nbsp; are obtained:
 :$$A_1 = A - {1}/{6}\cdot 3 \cdot C^2 \cdot A  - {1}/{6} \cdot {3}/{4}\cdot
   A^3 = {1}/{2} - {1}/{16} - {1}/{64} = {27}/{64}
@@ Line 104: / Line 103: @@
    A^3 = - {1}/{192}  \hspace{0.15cm}\underline{\approx -0.005}.$$
-*Terme höherer Ordnung kommen nicht vor. Somit ist auch&nbsp;  $\underline{A_4  = 0}$ .
+*Higher order terms do not occur.&nbsp; Thus, &nbsp;  $\underline{A_4  = 0}$ &nbsp; holds.
-'''(3)'''&nbsp; Die Klirrfaktoren höherer Ordnung ergeben sich bei dieser Aufgabe zu&nbsp;  $K_2  = 2/27 \approx 7.41\%$ &nbsp; und&nbsp;  $K_3  = 1/81 \approx 1.23\%$ .
+'''(3)'''&nbsp; In this task,&nbsp; the higher order distortion factors are&nbsp;  $K_2  = 2/27 \approx 7.41\%$ &nbsp; and&nbsp;  $K_3  = 1/81 \approx 1.23\%$ .
-*Damit erhält man für den Gesamtklirrfaktor
+*Thereby, the following is obtained for the overall distortion factor:
 : $K = \sqrt{K_2^2 + K_3^2} \hspace{0.15cm}\underline{\approx7.51 \%}.$
-'''(4)'''&nbsp; Der Maximalwert tritt zum Zeitpunkt&nbsp;  $t = 0$ &nbsp; und bei Vielfachen von&nbsp;  $T$ &nbsp; auf:
+'''(4)'''&nbsp; The maximum value occurs at time&nbsp;  $t = 0$ &nbsp; and at multiples of&nbsp;  $T$ &nbsp;:
 :$$y_{\rm max}= y(t=0) = A_1 + A_2 + A_3 = 0.422 -0.031 -0.005 \hspace{0.15cm}\underline{=
 .386}.$$
-*Die Minimalwerte liegen genau in der Mitte zwischen zwei Maxima und es gilt:
+*The minimum values are located exactly in the middle between two maxima and it holds that:
 :$$y_{\rm min}= - A_1 + A_2 - A_3 = -0.422 -0.031 +0.005\hspace{0.15cm}\underline{ =
   -0.448}.$$
-*Das Signal&nbsp;  $y(t)$ &nbsp; ist gegenüber dem in der Skizze auf der Angabenseite eingezeichnetem Signal&nbsp; um  $0.448$ &nbsp;  nach unten verschoben.
+*The signal&nbsp;  $y(t)$ &nbsp; is shifted downward by&nbsp;  $0.448$ &nbsp; compared to the signal&nbsp; drawn in the sketch on the information page.
-*Dieser Signalwert ergibt sich aus folgender Gleichung mit&nbsp;  $A = C = 1/2$ :
+*This signal value is obtained from the following equation considering&nbsp;  $A = C = 1/2$ :
 : $C - \frac{C \cdot A^2}{4}- \frac{C^3}{6} =  {1}/{2} - {1}/{32}-  {1}/{48}  = 0.448.$
 {{ML-Fuß}}
@@ Line 129: / Line 128: @@
-[[Category:Aufgaben zu Lineare zeitinvariante Systeme|^2.2 Nichtlineare Verzerrungen^]]
+[[Category:Linear and Time-Invariant Systems: Exercises|^2.2 Nonlinear Distortions^]]