Difference between revisions of "Aufgaben:Exercise 3.4Z: Trapezoid, Rectangle and Triangle"

Revision as of 20:32, 23 January 2021

Trapezimpuls und dessen Grenzfälle „Rechteck” und „Dreieck”

Three different pulse shapes are considered. The pulse ${x(t)}$ is trapezoidal. For $| t | < t_1 = 4 \,\text{ms}$ the time course is constant equal to ${A} = 1\, \text{V}$. Afterwards, ${x(t)}$ drops linearly to the value zero until the time $t_2 = 6\, \text{ms}$ . With the two derived system quantities, namely

the equivalent bandwidth

$$\Delta t = t_1 + t_2$$

and the so-called roll-off factor (in the time domain)

$$r_t = \frac{t_2 - t_1 }{t_2 + t_1 }$$

is the spectral function of the trapezoidal pulse:

$$X( f ) = A \cdot \Delta t \cdot {\mathop{\rm si}\nolimits}( {{\rm \pi} \cdot \Delta t \cdot f} ) \cdot \hspace{0.1cm}{\mathop{\rm si}\nolimits}( {{\rm \pi}\cdot \Delta t \cdot r_t \cdot f} ).$$

Furthermore, the rectangular momentum ${r(t)}$ and the triangular momentum ${d(t)}$ are also shown in the graph, both of which can be interpreted as limiting cases of the trapezoidal momentum ${x(t)}$ .

Hints:

This exercise belongs to the chapter Fourier Transform Laws.

You can check your results using the two interactive applets Impulses and Spectra sowie Frequenzgang und Impulsantwort .

Questions

$\Delta t \ = \ $

$\text{ms}$

$r_t\hspace{0.3cm} = \ $

	The spectral value at frequency $f = 0$ is equal to $20 \,\text{mV/Hz}$.
	For the phase function the values $0$ or $\pi$ $(180^{\circ})$ are possible.
	${X(f)}$ only has zeros at all multiples of $100 \,\text{Hz}$ auf.

	The spectral value at frequency $f = 0$ is equal to ${X(f = 0)}$.
	The values $0$ or $\pi$ $(180^{\circ})$ are possible for the phase function.
	${R(f)}$ only has zeros at all multiples of $100 \,\text{Hz}$ auf..

	The spectral value at frequency $f = 0$ is equal to ${X(f = 0)}$.
	The values $0$ or $\pi$ $(180^{\circ})$ are possible for the phase function.
	${D(f)}$ only has zeros at all multiples of $100 \,\text{Hz}$ auf.

Solution

(1) The equivalent pulse duration is $\Delta t = t_1 + t_2 \;\underline{= 10 \,\text{ms}}$ and the rolloff factor $r_t = 2/10 \;\underline{= 0.2}$.

(2) Proposed solutions 2 and 3 are correct:

The spectral value at $f = 0$ is $A \cdot \Delta t = 10 \,\text{mV/Hz}$.
Since ${X(f)}$ is real and can assume both positive and negative values, only the two phase values $0$ und $\pi$ are possible.
Zeros exist due to the first si-function at all multiples of $1/\Delta t = 100\, \text{Hz}$.
The second si function leads to zero crossings at intervals of $1/(r_t \cdot \Delta t) = 500 \,\text{Hz}$. These coincide exactly with the zeros of the first si-function.

(3) All proposed solutions are correct:

With the equivalent pulse duration $\Delta t = 10 \,\text{ms}$ and the rolloff factor $r_t = 0$ one obtains: $R( f ) = A \cdot \Delta t \cdot {\mathop{\rm si}\nolimits} ( {{\rm{\pi }} \cdot \Delta t \cdot f} ).$
It follows that $R( f = 0) = A \cdot \Delta t = X( f = 0).$

(4) Proposed solutions 2 and 3 are correct:

For the triangular pulse, the rolloff factor is $r_t = 1$.
The equivalent pulse duration is $\Delta t = 10 \,\text{ms}$. It follows that $D( f ) = A \cdot \Delta t \cdot {\mathop{\rm si}\nolimits} ^2 ( {{\rm{\pi }} \cdot \Delta t \cdot f} )$ and $D( f = 0) = A \cdot \Delta t = X( f = 0)$.
Since ${D(f)}$ cannot become negative, the phase $[{\rm arc} \; {D(f)}]$ is always zero. The phase value $\pi$ $(180°)$ is therefore not possible with the triangular form.

@@ Line 53: / Line 53: @@
-{Welche Aussagen sind hinsichtlich der Spektralfunktion&nbsp; ${D(f)}$&nbsp; zutreffend?
+{Which statements are true regarding the spectral function&nbsp; ${D(f)}$&nbsp; ?
 |type="[]"}
 + The spectral value at frequency&nbsp; $f = 0$&nbsp; is equal to&nbsp; ${X(f = 0)}$.