Difference between revisions of "Aufgaben:Exercise 4.2: Rectangular Spectra"
From LNTwww
| Line 28: | Line 28: | ||
''Hints:'' | ''Hints:'' | ||
*This exercise belongs to the chapter [[Signal_Representation/Differences_and_Similarities_of_Low-Pass_and_Band-Pass_Signals|Differences and Similarities of Low-Pass and Band-Pass Signals]]. | *This exercise belongs to the chapter [[Signal_Representation/Differences_and_Similarities_of_Low-Pass_and_Band-Pass_Signals|Differences and Similarities of Low-Pass and Band-Pass Signals]]. | ||
| − | *In this task, the function $\rm si(x) = \rm sin(x)/x = \rm sinc(x/π)$ is used. | + | *In this task, the function $\rm si(x) = \rm sin(x)/x = \rm sinc(x/π)$ is used. |
*Consider the following trigonometric relationship in the solution: | *Consider the following trigonometric relationship in the solution: | ||
| Line 62: | Line 62: | ||
{{ML-Kopf}} | {{ML-Kopf}} | ||
| − | '''(1)''' The time $T_u$ ⇒ first zero of the | + | '''(1)''' The time $T_u$ ⇒ first zero of the low-pass signal $u(t)$ – is equal to the reciprocal of the width of the rectangular spectrum, i.e. $1/(2\, \text{kHz} ) \hspace{0.15 cm}\underline{= 0.5 \, \text{ms}}$. |
| − | *The pulse amplitude is equal to the rectangular area as shown in the sample solution for [[Aufgaben:Aufgabe_4.1:_Tiefpass-_und_Bandpass-Signale| | + | *The pulse amplitude is equal to the rectangular area as shown in the sample solution for [[Aufgaben:Aufgabe_4.1:_Tiefpass-_und_Bandpass-Signale|Exercise 4.1]] . From this follows $u_0\hspace{0.15 cm}\underline{= 2 \, \text{V}}$. |
| − | [[File:P_ID704__Sig_A_4_2_b_neu.png|250px|right|frame|Multiplication with cosine]] | + | [[File:P_ID704__Sig_A_4_2_b_neu.png|250px|right|frame|Multiplication with a cosine function]] |
'''(2)''' The band-pass spectrum can be represented with $f_{\rm T} = 4\, \text{kHz}$ as follows: | '''(2)''' The band-pass spectrum can be represented with $f_{\rm T} = 4\, \text{kHz}$ as follows: | ||
| Line 73: | Line 73: | ||
\delta(f- f_{\rm T})+ \delta(f+ f_{\rm T})\right].$$ | \delta(f- f_{\rm T})+ \delta(f+ f_{\rm T})\right].$$ | ||
| − | According to the [[Signal_Representation/ | + | According to the [[Signal_Representation/Fourier_Transform_Theorems#Shifting_Theorem|Shifting Theorem]], the following then applies to the associated time signal: |
:$$w(t) = 2 \cdot u(t) \cdot {\cos} ( 2 \pi f_{\rm T} t) = 2 u_0 | :$$w(t) = 2 \cdot u(t) \cdot {\cos} ( 2 \pi f_{\rm T} t) = 2 u_0 | ||
| Line 80: | Line 80: | ||
The graph shows | The graph shows | ||
*above the low–pass signal $u(t)$, | *above the low–pass signal $u(t)$, | ||
| − | *then the oscillation $c(t) = 2 · \cos(2 \pi | + | *then the oscillation $c(t) = 2 · \cos(2 \pi f_{\rm T}t$ ), |
*below the band-pass signal $w(t) = u(t) \cdot c(t)$. | *below the band-pass signal $w(t) = u(t) \cdot c(t)$. | ||
| Line 100: | Line 100: | ||
'''(3)''' Proposed <u>solution 1 is correct</u>: | '''(3)''' Proposed <u>solution 1 is correct</u>: | ||
| − | *If we compare the spectral function $W(f)$ of this task with the spectrum $D(f)$ in the sample solution to [[Aufgaben: | + | *If we compare the spectral function $W(f)$ of this task with the spectrum $D(f)$ in the sample solution to [[Aufgaben:Exercise_4.1:_Low-Pass_and_Band-Pass_Signals|Exercise 4.1]], we see that $w(t)$ and $d(t)$ are identical. |
| − | * | + | *This proof is somewhat more complex in the time domain. With $f_2 = 2 \,\text{kHz}$ can be written for the signal considered here: |
:$$w(t ) = 4\hspace{0.05cm}{\rm V} | :$$w(t ) = 4\hspace{0.05cm}{\rm V} | ||
| Line 108: | Line 108: | ||
({4\hspace{0.05cm}{\rm V}})/({\pi f_2 t})\cdot \sin (\pi f_2 t) \cdot \cos ( 4 \pi f_2 t) .$$ | ({4\hspace{0.05cm}{\rm V}})/({\pi f_2 t})\cdot \sin (\pi f_2 t) \cdot \cos ( 4 \pi f_2 t) .$$ | ||
| − | * | + | *Because of the trigonometric relationship |
:$$\sin (\alpha) \cdot \cos (\beta) = {1}/{2} \cdot \big[ \sin | :$$\sin (\alpha) \cdot \cos (\beta) = {1}/{2} \cdot \big[ \sin | ||
Latest revision as of 15:49, 5 May 2021
Given low–pass and band-pass spectra
We consider two signals $u(t)$ and $w(t)$ with rectangular spectra $U(f)$ and $W(f)$ respectively.
- It is obvious that
- $$u(t) = u_0 \cdot {\rm si} ( \pi \cdot {t}/{T_{ u}})$$
- is a low-pass signal whose two parameters $u_0$ and $T_u$ are to be determined in subtask (1) .
- In contrast, the spectrum $W(f)$ shows that $w(t)$ describes a band-pass signal.
This task also refers to the band-pass signal
- $$d(t) = 10 \hspace{0.05cm}{\rm V} \cdot {\rm si} ( 5 \pi f_2 \hspace{0.05cm}t) - 6 \hspace{0.05cm}{\rm V} \cdot {\rm si} ( 3 \pi f_2\hspace{0.05cm} t)$$
whose spectrum was determined in Exercise 4.1Z . Let $f_2 = 2 \ \rm kHz.$
Hints:
- This exercise belongs to the chapter Differences and Similarities of Low-Pass and Band-Pass Signals.
- In this task, the function $\rm si(x) = \rm sin(x)/x = \rm sinc(x/π)$ is used.
- Consider the following trigonometric relationship in the solution:
- $$\sin (\alpha) \cdot \cos (\beta) = {1}/{2} \cdot \big[ \sin (\alpha + \beta)+ \sin (\alpha - \beta)\big].$$
Questions
Solution
(1) The time $T_u$ ⇒ first zero of the low-pass signal $u(t)$ – is equal to the reciprocal of the width of the rectangular spectrum, i.e. $1/(2\, \text{kHz} ) \hspace{0.15 cm}\underline{= 0.5 \, \text{ms}}$.
- The pulse amplitude is equal to the rectangular area as shown in the sample solution for Exercise 4.1 . From this follows $u_0\hspace{0.15 cm}\underline{= 2 \, \text{V}}$.
Multiplication with a cosine function
(2) The band-pass spectrum can be represented with $f_{\rm T} = 4\, \text{kHz}$ as follows:
- $$ W(f) = U(f- f_{\rm T}) + U(f+ f_{\rm T}) = U(f)\star \left[ \delta(f- f_{\rm T})+ \delta(f+ f_{\rm T})\right].$$
According to the Shifting Theorem, the following then applies to the associated time signal:
- $$w(t) = 2 \cdot u(t) \cdot {\cos} ( 2 \pi f_{\rm T} t) = 2 u_0 \cdot {\rm si} ( \pi {t}/{T_{\rm u}})\cdot {\cos} ( 2 \pi f_{\rm T} t). $$
The graph shows
- above the low–pass signal $u(t)$,
- then the oscillation $c(t) = 2 · \cos(2 \pi f_{\rm T}t$ ),
- below the band-pass signal $w(t) = u(t) \cdot c(t)$.
In particular, at time $t = 0$ one obtains:
- $$w(t = 0) = 2 \cdot u_0 \hspace{0.15 cm}\underline{= 4 \hspace{0.05cm}{\rm V}}.$$
The time $t=62.5 \,{\rm µ} \text{s}$ corresponds exactly to a quarter of the period of the signal $c(t)$:
- $$ w(t = 62.5 \hspace{0.05cm}{\rm µ s}) = 2 u_0 \cdot {\rm si} ( \pi \cdot \frac{62.5 \hspace{0.05cm}{\rm µ s}} {500 \hspace{0.05cm}{\rm µ s}}) \cdot {\cos} ( 2 \pi \cdot 4\hspace{0.05cm}{\rm kHz}\cdot 62.5 \hspace{0.05cm}{\rm µ s}) $$
- $$ \Rightarrow \hspace{0.3cm}w(t = 4\hspace{0.05cm}{\rm V}\cdot{\rm si} ( {\pi}/{8}) \cdot \cos ( {\pi}/{4})\hspace{0.15 cm}\underline{ = 0}.$$
(3) Proposed solution 1 is correct:
- If we compare the spectral function $W(f)$ of this task with the spectrum $D(f)$ in the sample solution to Exercise 4.1, we see that $w(t)$ and $d(t)$ are identical.
- This proof is somewhat more complex in the time domain. With $f_2 = 2 \,\text{kHz}$ can be written for the signal considered here:
- $$w(t ) = 4\hspace{0.05cm}{\rm V} \cdot {\rm si} ( \pi f_2 t) \cdot {\cos} ( 4 \pi f_2 t) = ({4\hspace{0.05cm}{\rm V}})/({\pi f_2 t})\cdot \sin (\pi f_2 t) \cdot \cos ( 4 \pi f_2 t) .$$
- Because of the trigonometric relationship
- $$\sin (\alpha) \cdot \cos (\beta) = {1}/{2} \cdot \big[ \sin (\alpha + \beta)+ \sin (\alpha - \beta)\big]$$
- the above equation can be transformed:
- $$w(t ) = \frac{2\hspace{0.05cm}{\rm V}}{\pi f_2 t}\cdot \big [\sin (5\pi f_2 t) + \sin (-3\pi f_2 t)\big ] = 10\hspace{0.05cm}{\rm V} \cdot \frac{\sin (5\pi f_2 t)}{5\pi f_2 t}- 6\hspace{0.05cm}{\rm V} \cdot \frac{\sin (3\pi f_2 t)}{3\pi f_2 t}.$$
- This shows that both signals are actually identical ⇒ Proposed solution 1:
- $$w(t) = 10 \hspace{0.05cm}{\rm V} \cdot {\rm si} ( 5 \pi f_2 t) - 6 \hspace{0.05cm}{\rm V} \cdot {\rm si} ( 3 \pi f_2 t) = d(t).$$
