Difference between revisions of "Aufgaben:Exercise 2.3Z: DSB-AM due to Nonlinearity"
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− | * | + | *Furthermore, the third spectral component of subtask '''(4)''' provides an unwanted contribution to $S_+(f)$. In this case: |
:$$q^2(t) = \left[A_{\rm 1} \cdot \cos(\omega_{\rm 1} t)+A_{\rm 9} \cdot \cos(\omega_{\rm 9} t)\right]^2 = A_{\rm 1}^2 \cdot \cos^2(\omega_{\rm 1} t)+ A_{\rm 9}^2 \cdot \cos^2(\omega_{\rm 9}t) + | :$$q^2(t) = \left[A_{\rm 1} \cdot \cos(\omega_{\rm 1} t)+A_{\rm 9} \cdot \cos(\omega_{\rm 9} t)\right]^2 = A_{\rm 1}^2 \cdot \cos^2(\omega_{\rm 1} t)+ A_{\rm 9}^2 \cdot \cos^2(\omega_{\rm 9}t) + | ||
2 \cdot A_{\rm 1} \cdot A_{\rm 9} \cdot \cos(\omega_{\rm 1} t)\cdot \cos(\omega_{\rm 9} t)$$ | 2 \cdot A_{\rm 1} \cdot A_{\rm 9} \cdot \cos(\omega_{\rm 1} t)\cdot \cos(\omega_{\rm 9} t)$$ | ||
:$$ \Rightarrow \hspace{0.2cm} q^2(t) = \frac{A_{\rm 1}^2}{2} +\frac{A_{\rm 1}^2}{2} \cdot \cos(\omega_{\rm 2} t)+ \frac{A_{\rm 9}^2}{2} + \frac{A_{\rm 9}^2}{2} \cdot \cos(\omega_{\rm 18} t) + A_{\rm 1} \cdot A_{\rm 9} \cdot \cos(\omega_{\rm 8} t)+ A_{\rm 1} \cdot A_{\rm 9} \cdot \cos(\omega_{\rm 10} t).$$ | :$$ \Rightarrow \hspace{0.2cm} q^2(t) = \frac{A_{\rm 1}^2}{2} +\frac{A_{\rm 1}^2}{2} \cdot \cos(\omega_{\rm 2} t)+ \frac{A_{\rm 9}^2}{2} + \frac{A_{\rm 9}^2}{2} \cdot \cos(\omega_{\rm 18} t) + A_{\rm 1} \cdot A_{\rm 9} \cdot \cos(\omega_{\rm 8} t)+ A_{\rm 1} \cdot A_{\rm 9} \cdot \cos(\omega_{\rm 10} t).$$ | ||
− | * | + | *After multiplying by $z(t)$ , all but the fourth of these contributions fall within the $\text{90 kHz}$ to $\text{110 kHz}$ range. The weight at $f_{\rm T} = 100\ \rm kHz$ is further increased by $3 · c_3 · A_{\rm T} · 0.5 (A_1^2 + A_9^2) = 0.6\ \rm V$ and is thus $9.08 \ \rm V$. |
− | + | Further components are obtained at: | |
− | *$98 \ \rm kHz$ | + | *$98 \ \rm kHz$ and $102 \ \rm kHz$ with weights $c_3 · A_{\rm T}/2 · A_1^2/2 = 0.03\ \rm V$, |
− | * $92 \ \rm kHz$ | + | * $92 \ \rm kHz$ and $108 \ \rm kHz$ with weights $3c_3 · A_{\rm T}/2 · A_1 · A_9 = 0.12\ \rm V$, |
− | * $90 \ \rm kHz$ | + | * $90 \ \rm kHz$ and $110 \ \rm kHz$ with weights $3c_3 · A_{\rm T}/2 · A_1 · A_9 = 0.12\ \rm V$. |
− | + | The lower plot in the above graph shows the spectrum $S_+(f)$ considering the cubic components. It can be seen that new frequencies have appeared, indicating nonlinear distortions. The correct solutions are therefore <u>Answers 1 and 3</u>. | |
{{ML-Fuß}} | {{ML-Fuß}} |
Revision as of 19:06, 24 November 2021
In this task, we consider the realization of a double-sideband amplitude modulation using the nonlinear characteristic curve: $$y = g(x) = c_1 \cdot x + c_2 \cdot x^2+ c_3 \cdot x^3\hspace{0.05cm}$$
- $$ \Rightarrow c_1 = 2,\hspace{0.2cm}c_2 = 0.25/{\rm V},\hspace{0.2cm}c_3 = 0 \hspace{0.1cm}{\rm bzw.}\hspace{0.1cm}c_3 = 0.01/{\rm V^2}\hspace{0.05cm}.$$
The sum of the carrier signal and source signal is present at the input of this characteristic curve: $$ x(t) = z(t) + q(t) = A_{\rm T} \cdot \cos(\omega_{\rm T} t)+ q(t),\hspace{0.2cm} A_{\rm T} = 4\,{\rm V}\hspace{0.05cm}.$$
- It is known that the source signal $q(t)$ contains spectral components between $1 \ \rm kHz$ and $9 \ \rm kHz$ (up to and including these limits).
- From subtask (5) onwards, the following source signal should be assumed:
- $$q(t) = A_{\rm 1} \cdot \cos(\omega_{\rm 1} t)+A_{\rm 9} \cdot \cos(\omega_{\rm 9} t) \hspace{0.05cm}.$$
- Let the angular frequencies be $ω_1 = 2 π · 1 \ \rm kHz$ and $ω_9 = 2 π · 9\ \rm kHz$. The corresponding amplitudes are given as: $A_1 = 1\ \rm V$ and $A_9 = 2\ \rm V$.
The following abbreviations are used in the questions for this task:
- $$ y(t) = y_1(t) + y_2(t)+y_3(t),$$
- $$y_1(t) = c_1 \cdot [z(t) + q(t)],$$
- $$ y_2(t) = c_2 \cdot[z(t) + q(t)]^2,$$
- $$y_3(t) = c_3 \cdot [z(t) + q(t)]^3 \hspace{0.05cm}.$$
Thus, the transmitted signals $s(t)$ i.e., $s_1(t)$, $s_2(t)$ and $s_3(t)$ , result from band-limiting to the range from $90 \ \rm kHz$ to $110 \ \rm kHz$.
Hints:
- This exercise belongs to the chapter Double-Sideband Amplitude Modulation.
- Particular reference is made to the page Amplitude modulation with a quadratic characteristic curve.
- The following trigonometric transformations are given:
- $$ \cos^2(\alpha) = {1}/{2} \cdot \left[ 1 + \cos(2\alpha)\right] \hspace{0.05cm}, \hspace{0.5cm} \cos^3(\alpha) = {1}/{4} \cdot \left[ 3 \cdot \cos(\alpha) + \cos(3\alpha)\right] \hspace{0.05cm}.$$
Questions
Solution
- If $f_{\rm T}$ does not deviate from this by more than $±1 \ \rm kHz$ this also results in a "DSB-AM".
(2) $s_1(t)$ includes only the carrier $z(t)$ ⇒ Answer 1. The source signal $q(t)$ is removed by the bandpass.
(3) The quadratic term $z^2(t)$ consists of a DC component $($at $f = 0)$ and a component at $2f_{\rm T}$.
- Additionally, all spectral components of $q^2(t)$ are outside the bandpass.
- Therefore the last answer is correct.
(4) Answers 1 and 3 are correct:
- The term $\cos^3(ω_Tt)$ has its largest signal component at $f = f_{\rm T}$.
- The third answer $(3 · c_3 · z(t) · q^2(t))$ lies between $100\ \rm kHz ± 18 \ \rm kHz $.
- Some parts – namely the frequency components between $90\ \rm kHz $ and $110 \ \rm kHz$ – are not removed by the bandpass and are thus also included in $s(t)$ .
(5) The transmitted signal consists of a total of five frequencies:
- $$s(t) = c_1 \cdot A_{\rm T} \cdot \cos(\omega_{\rm T} t)+ c_2 \cdot A_{\rm T} \cdot A_{\rm 1} \cdot \cos((\omega_{\rm T} \pm \omega_{\rm 1})t) + c_2 \cdot A_{\rm T} \cdot A_{\rm 2} \cdot \cos((\omega_{\rm T} \pm \omega_{\rm 2})t) \hspace{0.05cm}.$$
- Note that the second and third terms each contain two signal frequencies::
- $\text{99 kHz}$ and $\text{101 kHz}$ and
- $\text{91 kHz}$ and $\text{109 kHz}$, respectively.
- Given $A_{\rm T} = 4 \ \rm V$, $A_1 = 1 V$, $A_9 = 2 \ \rm V$, $c_1 = 1$ and $c_2 = 1/A_{\rm T} = \rm 0.25/V$ , it holds that:
- $$s(t) = 4\,{\rm V} \cdot \cos(\omega_{\rm T} t) + 1\,{\rm V} \cdot \cos((\omega_{\rm T} \pm \omega_{\rm 1})t) + 2\,{\rm V}\cdot \cos((\omega_{\rm T} \pm \omega_{\rm 2})t) \hspace{0.05cm}.$$
- From this it can be seen that for the modulation depth:
- $$m =\frac{A_1 + A_9}{A_{\rm T}} = \rm \frac{1\ V + 2 \ V}{4 \ V} \hspace{0.15cm}\underline{=0.75}.$$
(6) The graph above shows the spectrum $S_+(f)$ – that is, only positive frequencies – with $c_3 = 0$.
- When $c_3 ≠ 0$ the following additional spectral components arise:
- $$c_3 \cdot z^3(t)= \frac{c_3 \cdot A_{\rm T}^3}{4} \cdot \left[ 3 \cdot \cos(\omega_{\rm T} t) + \cos(3\omega_{\rm T} t)\right] \hspace{0.05cm}.$$
- The first component falls in the passband of the bandpass. As a result, the Dirac weight at $f_{\rm T} = 100\ \rm kHz$ is increased from the original $8 \ \rm V$ to $\text{8 V + 0.75 · 0.01/V}^2 · 4^3 \text{ V}^3 = 8.48 \ \rm V$ .
- Furthermore, the third spectral component of subtask (4) provides an unwanted contribution to $S_+(f)$. In this case:
- $$q^2(t) = \left[A_{\rm 1} \cdot \cos(\omega_{\rm 1} t)+A_{\rm 9} \cdot \cos(\omega_{\rm 9} t)\right]^2 = A_{\rm 1}^2 \cdot \cos^2(\omega_{\rm 1} t)+ A_{\rm 9}^2 \cdot \cos^2(\omega_{\rm 9}t) + 2 \cdot A_{\rm 1} \cdot A_{\rm 9} \cdot \cos(\omega_{\rm 1} t)\cdot \cos(\omega_{\rm 9} t)$$
- $$ \Rightarrow \hspace{0.2cm} q^2(t) = \frac{A_{\rm 1}^2}{2} +\frac{A_{\rm 1}^2}{2} \cdot \cos(\omega_{\rm 2} t)+ \frac{A_{\rm 9}^2}{2} + \frac{A_{\rm 9}^2}{2} \cdot \cos(\omega_{\rm 18} t) + A_{\rm 1} \cdot A_{\rm 9} \cdot \cos(\omega_{\rm 8} t)+ A_{\rm 1} \cdot A_{\rm 9} \cdot \cos(\omega_{\rm 10} t).$$
- After multiplying by $z(t)$ , all but the fourth of these contributions fall within the $\text{90 kHz}$ to $\text{110 kHz}$ range. The weight at $f_{\rm T} = 100\ \rm kHz$ is further increased by $3 · c_3 · A_{\rm T} · 0.5 (A_1^2 + A_9^2) = 0.6\ \rm V$ and is thus $9.08 \ \rm V$.
Further components are obtained at:
- $98 \ \rm kHz$ and $102 \ \rm kHz$ with weights $c_3 · A_{\rm T}/2 · A_1^2/2 = 0.03\ \rm V$,
- $92 \ \rm kHz$ and $108 \ \rm kHz$ with weights $3c_3 · A_{\rm T}/2 · A_1 · A_9 = 0.12\ \rm V$,
- $90 \ \rm kHz$ and $110 \ \rm kHz$ with weights $3c_3 · A_{\rm T}/2 · A_1 · A_9 = 0.12\ \rm V$.
The lower plot in the above graph shows the spectrum $S_+(f)$ considering the cubic components. It can be seen that new frequencies have appeared, indicating nonlinear distortions. The correct solutions are therefore Answers 1 and 3.