Dies ist eine alte Version des Dokuments!
Exercise 1.1 : Impedances at Frequencies
(written test, approx. 18% of a 60-minute written test, WS2022)
Calculate the resistor values which have to be used the following circuits.
1. A resistor $R_1$ shall have the same absolute value of the impedance like a capacitor $C_1=40 ~\rm{nF}$ at $f_1=4 ~\rm{MHz}$.
2. A $RL$ series circuit with $L_2=4.7 ~\mu H$, where an AC voltage source of $U_2=1.0 ~V$ with $f_2=450 kHz$ generates a current $I_2=60 ~mA$.
The equivalent impedance for $R$ and $L$ combined is given by \begin{align*} {{\underline{U}}\over{\underline{I}}} &= R_2 + \underline{X}_{L2} \\ &= R_2 + j \cdot \omega L \end{align*} Since $j \cdot \omega L $ is perpendicular to $R_2$ this can be simplified to: \begin{align*} \left| {{\underline{U}}\over{\underline{I}}} \right|^2 &= |R_2|^2 + |\underline{X}_{L2}|^2 \\ \left( {{U}\over{I}} \right)^2 &= {R_2}^2 + {X_{L2}}^2 \\ \end{align*}
This can be rearranged to get $R_2$: \begin{align*} R_2 &= \sqrt{ \left( {{U }\over{I }} \right)^2 - X_{L2}^2 } \\ &= \sqrt{ \left( {{1~\rm{V}}\over{60~\rm{mA}}} \right)^2 - (2\pi \cdot 450~\rm{kHz} \cdot 4.7 ~ \rm{µH})^2 } \\ \end{align*}
3. A $RC$ parallel circuit with $C_3=4.7 ~nF$ on an AC current source ($I_{3S}=1.3 ~A$,$f_3=200 ~kHz$), which generates a current of $I_{3R}=1.0 ~A$ through $R_3$.
\begin{align*} \underline{U}_3 = R_3 \cdot \underline{I}_{3R} = -j\cdot {X}_{3C} \cdot \underline{I}_{3C} \end{align*} So it gets clear, that $\underline{I}_{3R}$ is perpendicular to $\underline{I}_{3C}$ (It has to, since $R_3$ is perpendicular to $-j\cdot {X}_{3C}$, too).
Therefore, the resulting current of the parallel circuit is given as: \begin{align*} \underline{I}_{3} &= \underline{I}_{3R} + \underline{I}_{3C} \\ |\underline{I}_{3}|^2 &= |\underline{I}_{3R}|^2 + |\underline{I}_{3C}|^2 \\ {I}_{3C} &= \sqrt{|{I}_{3}|^2 - |{I}_{3R}|^2} \end{align*}
Back on the first formula: \begin{align*} R_3 \cdot {I}_{3R} &= {X}_{3C} \cdot {I}_{3C} \\ R_3 &= {X}_{3C} \cdot {{{I}_{3C}}\over{{I}_{3R}}} \\ &= {{1}\over{2\pi \cdot f \cdot C_3}} \cdot {{\sqrt{|{I}_{3}|^2 - |{I}_{3R}|^2}}\over{{I}_{3R}}} \\ \end{align*}