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Kenryu Shibata
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assets/a-2/exp1.eps
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assets/a-2/exp1.gnuplot
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set output "exp1.tex" set output "exp1.tex"
set encoding utf8 set encoding utf8
set terminal epslatex color font "Arial,12" fontscale 1.0 size 16cm,10cm set terminal epslatex color font "Arial,11" fontscale 1.0 size 12cm,8cm
set style data lines set style data lines
set style line 1 linetype 1 linewidth 1 linecolor rgb "magenta" set style line 1 linetype 1 linewidth 1 linecolor rgb "magenta"
set style line 2 linetype 1 linewidth 1 linecolor rgb "blue" set style line 2 linetype 1 linewidth 1 linecolor rgb "blue"
assets/a-2/exp1.tex
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\gplgaddtomacro\gplfronttext{% \gplgaddtomacro\gplfronttext{%
\csname LTb\endcsname%% \csname LTb\endcsname%%
\put(1959,5244){\makebox(0,0)[l]{\strut{}Theory (1.0k Ohm)}}% \put(1801,4140){\makebox(0,0)[l]{\strut{}Theory (1.0k Ohm)}}%
\csname LTb\endcsname%% \csname LTb\endcsname%%
\put(1959,5004){\makebox(0,0)[l]{\strut{}Result (1.0k Ohm)}}% \put(1801,3920){\makebox(0,0)[l]{\strut{}Result (1.0k Ohm)}}%
\csname LTb\endcsname%% \csname LTb\endcsname%%
\put(1959,4764){\makebox(0,0)[l]{\strut{}Theory (2.2k Ohm)}}% \put(1801,3700){\makebox(0,0)[l]{\strut{}Theory (2.2k Ohm)}}%
\csname LTb\endcsname%% \csname LTb\endcsname%%
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\csname LTb\endcsname%% \csname LTb\endcsname%%
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\csname LTb\endcsname%% \csname LTb\endcsname%%
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\csname LTb\endcsname%% \csname LTb\endcsname%%
\put(372,3097){\rotatebox{-270.00}{\makebox(0,0){\strut{}Current (mA)}}}% \put(341,2508){\rotatebox{-270.00}{\makebox(0,0){\strut{}Current (mA)}}}%
\put(4762,168){\makebox(0,0){\strut{}Supply Voltage (V)}}% \put(3609,154){\makebox(0,0){\strut{}Supply Voltage (V)}}%
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\gplbacktext \gplbacktext
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\gplfronttext \gplfronttext
\end{picture}% \end{picture}%
\endgroup \endgroup
bibs/a-2.bib
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@book{ac-theory:ohm, @inbook{ac-theory:ohm,
title={基礎からの交流理論}, title={基礎からの交流理論},
author={小郷 寛 and 小亀 英己 and 石亀 篤司}, author={小郷 寛 and 小亀 英己 and 石亀 篤司},
publisher={電気学会 and オーム社}, publisher={電気学会 and オーム社},
@@ -6,13 +6,21 @@
month={04}, month={04},
pages={1} pages={1}
} }
@inbook{ac-theory:kirchhoff-law, @inbook{ac-theory:kirchhoff-law-v,
title={基礎からの交流理論}, title={基礎からの交流理論},
author={小郷 寛 and 小亀 英己 and 石亀 篤司}, author={小郷 寛 and 小亀 英己 and 石亀 篤司},
publisher={電気学会 and オーム社}, publisher={電気学会 and オーム社},
year={2023}, year={2023},
month={04}, month={04},
pages={11-16} pages={11-13}
}
@inbook{ac-theory:kirchhoff-law-i,
title={基礎からの交流理論},
author={小郷 寛 and 小亀 英己 and 石亀 篤司},
publisher={電気学会 and オーム社},
year={2023},
month={04},
pages={13-16}
} }
@inbook{ac-theory:superposition, @inbook{ac-theory:superposition,
title={基礎からの交流理論}, title={基礎からの交流理論},
@@ -30,3 +38,11 @@
month={04}, month={04},
pages={145} pages={145}
} }
@online{resistor-overload-example,
title={Resistor Overload},
author={ouimetn},
url={https://youtu.be/xPaN4xG0px4},
year={2012},
month={08},
urldate={2026-05-18}
}
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report_a-2.tex
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\input{sections/a-2/reflection} \input{sections/a-2/reflection}
\resetrefcounter \resetrefcounter
\newpage
\section{まとめ} \section{まとめ}
今回の実験より以下の事が分かった: 今回の実験より以下の事が分かった:
\begin{itemize} \begin{itemize}
\item{abc} \item{電気回路の諸定理・諸法則は現実でも成り立つこと}
\item{abc} \item{線形回路は重ね合わせの理で簡単に解を求めれること}
\item{abc} \item{ブラックボックスな線形回路はテブナンの定理で等価電圧源に置き換えれること}
\end{itemize} \end{itemize}
\printbibliography[title={参考文献}]{} \printbibliography[title={参考文献}]{}
sections/a-2/exp-result.tex
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@@ -31,8 +31,8 @@ $E_1 = 15.000 \ \text{V}, \ E_2 = 3.005 \ \text{V}$の時,各抵抗での電
\hline \hline
Resistor & Voltage $[\text{V}]$ & Current $[\text{mA}]$ \\ Resistor & Voltage $[\text{V}]$ & Current $[\text{mA}]$ \\
\hline \hline
$R_1$ & 10.69 & -3.28 \\ $R_1$ & 10.69 & 3.28 \\
$R_2$ & 1.30 & 1.31 \\ $R_2$ & 1.30 & -1.31 \\
$R_3$ & 4.30 & 1.98 \\ $R_3$ & 4.30 & 1.98 \\
\hline \hline
\end{tabular} \end{tabular}
@@ -55,7 +55,7 @@ $E_1 = 15.000 \ \text{V}, \ E_2 = -3.007 \ \text{V}$の時,各抵抗での電
Resistor & Voltage $[\text{V}]$ & Current $[\text{mA}]$ \\ Resistor & Voltage $[\text{V}]$ & Current $[\text{mA}]$ \\
\hline \hline
$R_1$ & 14.10 & 4.33 \\ $R_1$ & 14.10 & 4.33 \\
$R_2$ & -3.89 & -3.93 \\ $R_2$ & 3.89 & -3.93 \\
$R_3$ & 0.89 & 0.40 \\ $R_3$ & 0.89 & 0.40 \\
\hline \hline
\end{tabular} \end{tabular}
sections/a-2/reflection.tex
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@@ -1 +1,315 @@
\section{考察} \section{考察}
\subsection{実験1}
\cref{fig:v-i-r}より測定値はすべて$\pm 5\ \%$の抵抗値の誤差に収まっている.
理想値の曲線は$I = \frac{V}{R}$なので測定値はオームの法則(\cref{equ:ohm})に従っているといえる.
\subsubsection{抵抗器の制限について}
オームの法則は実験で使用した抵抗器よりも低い抵抗値を持つものでも成り立つはずだが定格電力の制限で手順書では使用しなかった.
試しに,実験で使用した抵抗値が$\frac{1}{10}$で定格電力が1/4 Wの抵抗を用いて同じ実験を行なった場合を考える.
オームの法則により,3,6,9 Vでの電流と電力は\cref{tab:v-i-r-tenth}となる.
\begin{table}[!ht]
\centering
\caption{Current and Power of Resistors with tenth of resistance}
\label{tab:v-i-r-tenth}
\begin{tabular}{c|r|r|r|r|r|r}
\hline
\multirow{2}{5em}{Voltage $[\text{V}]$} & \multicolumn{2}{c|}{$100 \ \Omega$} & \multicolumn{2}{c|}{$220 \ \Omega$} & \multicolumn{2}{c}{$330 \ \Omega$} \\
\cline{2-7}
& Current (mA) & Power (W) & Current (mA) & Power (W) & Current (mA) & Power (W) \\
\hline
3 & 30 & 0.09 & 13.64 & 0.041 & 9.09 & 0.027 \\
6 & 60 & 0.36 & 27.27 & 0.16 & 18.18 & 0.11 \\
9 & 90 & 0.81 & 40.91 & 0.37 & 27.27 & 0.25 \\
\hline
\end{tabular}
\end{table}
一部で1/4 = 0.25 W を超過してしまう条件がある.
これらの値は理想的な抵抗を使用した場合なので現実ではかろうじて超過しなかったり,僅かながら超える条件があるだろう.
抵抗器はその性質上,電力の一部を熱に変換して発熱しながら電流を制限する.
定格電力を超えての使用は抵抗器が焼損・破裂する可能性があるので注意すること\supercite{resistor-overload-example}
\subsection{実験2}
実験結果\cref{tab:exp2-res1}\cref{tab:exp2-res2}より接点(b)での電流の総和はそれぞれ\cref{tab:current-in-b}となった.
\begin{table}[!ht]
\centering
\caption{Applying Kirchhoff's Current Law at Point (b) in each Circuit}
\label{tab:current-in-b}
\begin{tabular}{c|c}
\hline
Circuit & Current $[\text{mA}]$ \\
\hline
(a) & 0.01 \\
(b) & 0.80 \\
\hline
\end{tabular}
\end{table}
また,各回路の閉路abef,bcde,acdfでの電圧の和は\cref{tab:voltage-in-loops}となった.
\begin{table}[!ht]
\centering
\caption{Applying Kirchhoff's Voltage Law on each Loop}
\label{tab:voltage-in-loops}
\begin{tabular}{c|c|c}
\hline
Loop & Circuit (a) $[\text{V}]$ & Circuit (b) $[\text{V}]$ \\
\hline
abef & 0.01 & 0.01 \\
bcde & -0.005 & 0.007 \\
acdf & 0.005 & -0.017 \\
\hline
\end{tabular}
\end{table}
これらから,実験回路はおおかたキルヒホッフの法則に従っているといえる.
しかし,回路(b)の電流則と閉路acdfでは真の値である0からかなり離れてしまった.
これには2つの実験回路での測定方法の差異や測定機器・抵抗値の誤差などが考えられる.
\subsection{実験3}
実験結果\cref{tab:exp3-res1}\cref{tab:exp3-res2}\cref{fig:cd-exp2-a}より,電流の向きに注意しながら重ね合わせると
\begin{align}
V_{R_1} &= 12.40 \ \text{V} - 1.71 \ \text{V} = 10.69 \ \text{V} \\
V_{R_2} &= 2.61 \ \text{V} - 1.29 \ \text{V} = 1.32 \ \text{V} \\
V_{R_3} &= 2.59 \ \text{V} + 1.70 \ \text{V} = 4.29 \ \text{V} \\
I_{R_1} &= 3.81 \ \text{mA} - 0.52 \ \text{mA} = 3.29 \ \text{mA} \\
I_{R_2} &= -2.61 \ \text{mA} + 1.32 \ \text{mA} = -1.29 \ \text{mA} \\
I_{R_3} &= 1.19 \ \text{mA} + 0.78 \ \text{mA} = 1.97 \ \text{mA}
\end{align}
それぞれの誤差率は\cref{tab:exp3-exp2-diff}の通りである.
\begin{table}[!ht]
\centering
\caption{Percentage Difference of Experiment \# 3 from Experiment \# 2 on Circuit (a)}
\label{tab:exp3-exp2-diff}
\begin{tabular}{c|c}
\hline
Measurement & Difference $(\%)$ \\
\hline
$V_{R_1}$ & 0 \\
$V_{R_2}$ & +1.54 \\
$V_{R_3}$ & -0.23 \\
$I_{R_1}$ & +0.30 \\
$I_{R_2}$ & -1.53 \\
$I_{R_3}$ & -0.51 \\
\hline
\end{tabular}
\end{table}
この誤差は前節の測定方法の差異が影響していると思われる.
\subsubsection{電源の除去法について}
この重ね合わせの理を適用する際の電源の除去法は電圧源と電流源で違ってくる.
電圧源は短絡除去,電流源は開放除去である.
これは\cref{fig:v-c-s-removal}のように電圧源は直列接続,電流源は並列接続であるため,電圧・電流をなくし,抵抗値を変化させないような除去を行なっている.
\begin{figure}[tbh]
\centering
\begin{minipage}[h]{0.9\linewidth}
\centering
\begin{circuitikz}
\draw (0,0) to [battery1={$E$},invert] ++(0,2) to [R={$R_i$}] ++(0,2);
\draw (0,0) to [short, -o] ++(2,0);
\draw (0,4) to [short, -o] ++(2,0);
\draw (3.25,2) node {\Huge $\Rightarrow$};
\draw (5,0) -- (5,2) to [R={$R_i$}] ++(0,2);
\draw (5,0) to [short, -o] ++(2,0);
\draw (5,4) to [short, -o] ++(2,0);
\end{circuitikz}
\subcaption{Voltage Source}
\label{fig:vs-removal}
\end{minipage}
\begin{minipage}[h]{0.9\linewidth}
\centering
\begin{circuitikz}
\draw (0,0) to [isourceAM={$I$}] ++(0,2);
\draw (2,0) to [R={$R_i$}] ++(0,2);
\draw (0,0) to [short, -*] ++(2,0) to [short, -o] ++(2,0);
\draw (0,2) to [short, -*] ++(2,0) to [short, -o] ++(2,0);
\draw (5,1) node {\Huge $\Rightarrow$};
\draw (8,0) to [R={$R_i$}] ++(0,2);
\draw (6,0) to [short, o-*] ++(2,0) to [short, -o] ++(2,0);
\draw (6,2) to [short, o-*] ++(2,0) to [short, -o] ++(2,0);
\end{circuitikz}
\subcaption{Current Source}
\label{fig:cs-removal}
\end{minipage}
\caption{Removal of Voltage and Current Source}
\label{fig:v-c-s-removal}
\end{figure}
\subsection{実験4}
実験結果\cref{tab:exp4-res}から誤差率\cref{tab:exp4-diff}を求める.
\begin{table}[!ht]
\centering
\caption{Percentage Difference of Original and Equivalent Circuit of Experiment \# 4}
\label{tab:exp4-diff}
\begin{tabular}{c|c}
\hline
Measurement & Difference $[\%]$ \\
\hline
Voltage & -0.73 \\
Current & -0.38 \\
\hline
\end{tabular}
\end{table}
比較的小さな誤差に収まったが,可変抵抗の抵抗値が少し触れるだけで変化してしまうため設定が難しく,誤差が出てしまった.
\subsubsection{テブナンの定理の証明}
\cref{fig:thevenin-proof-open-circuit}のような回路$N$を考える.
この回路には複数の電圧源・電流源があり内部インピーダンスは$Z_0$である.
そして,この回路の開放電圧は$V_0$とする.
次に\cref{fig:thevenin-proof-load}のように負荷インピーダンス$Z_L$を接続する.
この時,回路には電流$I$が流れる.
そして\cref{fig:thevenin-proof-ec}を考える.
この回路は負荷インピーダンスだけでなく,$V_0$と同じ電圧を持つ2つの電源を互いに打ち消し合うように接続する.
重ね合わせの理を適用して\cref{fig:thevenin-proof-d1}\cref{fig:thevenin-proof-d2}のように電圧源$V_1$$V_2$をそれぞれ独立させる.
電流$I$$I_1$$I_2$の和として表わせれる.
\cref{fig:thevenin-proof-d1}では点Aでの電位が等しいため電流が流れない,よって$I_1 = 0$である.
\cref{fig:thevenin-proof-d2}では回路Nの電圧源を短絡,電流源を開放して内部インピーダンス$Z_0$を得る.
この時,$I_2$はオームの法則より\cref{equ:thevenin-proof-d2-I2}で表わせれる.
\begin{equation}\label{equ:thevenin-proof-d2-I2}
I_2 = \frac{V_2}{Z_0 + Z_L} = \frac{V_0}{Z_0 + Z_L}
\end{equation}
結果的に$I_1$$I_2$の和である電流$I$$0 + \frac{V_0}{Z_0 + Z_L}$\cref{equ:thevenin}が得られる.
\cref{fig:thevenin-proof-d2}の回路を変形し電圧源となる部分を抜き出したのが\cref{fig:thevenin-proof-evs}である\supercite{ac-theory:thevenin}
\begin{figure}[tbh]
\centering
\begin{minipage}[h]{0.45\linewidth}
\centering
\begin{circuitikz}
\draw (0,0) node[fourport] (N) {$N$};
\draw ($(N.center) + (0,-0.5)$) node[vsourceAMshape,scale=0.5,rotate=180](Vi){};
\draw ($(N.center) + (0,0)$) node[isourceAMshape,scale=0.5](Ci){};
\draw (Vi.right) -- ++(-0.25,0);
\draw (Vi.left) -- ++(0.25,0);
\draw (Ci.left) -- ++(-0.25,0);
\draw (Ci.right) -- ++(0.25,0);
\draw ($(N.center) + (0,0.25)$) node[above] {$Z_0$};
\draw (N.port3) to [short, -o] ++(1,0) node[above]{A} coordinate (A);
\draw (N.port2) to [short, -o] ++(1,0) node[right]{B} coordinate (B);
\draw[->] ($(B) + (0,0.1)$) -- ($(A) + (0,-0.1)$);
\draw ($(A)!0.5!(B)$) node[right]{$V_0$};
\end{circuitikz}
\subcaption{Open Circuit}
\label{fig:thevenin-proof-open-circuit}
\end{minipage}
\begin{minipage}[h]{0.45\linewidth}
\centering
\begin{circuitikz}
\draw (0,0) node[fourport] (N) {$N$};
\draw ($(N.center) + (0,-0.5)$) node[vsourceAMshape,scale=0.5,rotate=180](Vi){};
\draw ($(N.center) + (0,0)$) node[isourceAMshape,scale=0.5](Ci){};
\draw (Vi.right) -- ++(-0.25,0);
\draw (Vi.left) -- ++(0.25,0);
\draw (Ci.left) -- ++(-0.25,0);
\draw (Ci.right) -- ++(0.25,0);
\draw ($(N.center) + (0,0.25)$) node[above] {$\dot{Z_0}$};
\draw (N.port3) to [short, -o, i={$I$}] ++(1,0) node[above]{A} coordinate (A);
\draw (N.port2) to [short, -o] ++(1,0) node[right]{B} coordinate (B);
\draw (A) -- ++(1,0) to [R={$Z_L$}] ++(0,-2) -- ++(-1,0) -- (B);
\end{circuitikz}
\subcaption{Connected to Load}
\label{fig:thevenin-proof-load}
\end{minipage}
\begin{minipage}[h]{0.45\linewidth}
\centering
\begin{circuitikz}
\draw (0,0) node[fourport] (N) {$N$};
\draw ($(N.center) + (0,-0.5)$) node[vsourceAMshape,scale=0.5,rotate=180](Vi){};
\draw ($(N.center) + (0,0)$) node[isourceAMshape,scale=0.5](Ci){};
\draw (Vi.right) -- ++(-0.25,0);
\draw (Vi.left) -- ++(0.25,0);
\draw (Ci.left) -- ++(-0.25,0);
\draw (Ci.right) -- ++(0.25,0);
\draw ($(N.center) + (0,0.25)$) node[above] {$\dot{Z_0}$};
\draw (N.port3) to [short, -o, i={$I$}] ++(1,0) node[above]{A} coordinate (A);
\draw (N.port2) to [short, -o] ++(1,0) node[right]{B} coordinate (B);
\draw (A) to [battery1,l={$V_1=V_0$}] ++(1,0) to [R={$Z_L$}] ++(0,-2) to [battery1,l={$V_2=V_0$},invert] ++(-1,0) -- (B);
\end{circuitikz}
\subcaption{Equivalent Circuit}
\label{fig:thevenin-proof-ec}
\end{minipage}
\begin{minipage}[h]{0.45\linewidth}
\centering
\begin{circuitikz}
\draw (0,0) node[fourport] (N) {$N$};
\draw ($(N.center) + (0,-0.5)$) node[vsourceAMshape,scale=0.5,rotate=180](Vi){};
\draw ($(N.center) + (0,0)$) node[isourceAMshape,scale=0.5](Ci){};
\draw (Vi.right) -- ++(-0.25,0);
\draw (Vi.left) -- ++(0.25,0);
\draw (Ci.left) -- ++(-0.25,0);
\draw (Ci.right) -- ++(0.25,0);
\draw ($(N.center) + (0,0.25)$) node[above] {$\dot{Z_0}$};
\draw (N.port3) to [short, -o, i={$I_1$}] ++(1,0) node[above]{A} coordinate (A);
\draw (N.port2) to [short, -o] ++(1,0) node[right]{B} coordinate (B);
\draw (A) to [battery1,l={$V_1=V_0$}] ++(1,0) to [R={$Z_L$}] ++(0,-2) -- ++(-1,0) -- (B);
\end{circuitikz}
\subcaption{Decomposition 1}
\label{fig:thevenin-proof-d1}
\end{minipage}
\begin{minipage}[h]{0.45\linewidth}
\centering
\begin{circuitikz}
\draw (0,0) node[fourport] (N) {$N$};
\draw ($(N.center) + (0,-0.5)$) node[shortshape,scale=0.5,rotate=180](Vi){};
\draw ($(N.center) + (0,0)$) node[openshape,scale=0.5](Ci){};
\draw (Vi.right) -- ++(-0.25,0);
\draw (Vi.left) -- ++(0.25,0);
\draw (Ci.left) to [short, o-] ++(-0.25,0);
\draw (Ci.right) to [short, o-] ++(0.25,0);
\draw ($(N.center) + (0,0.25)$) node[above] {$\dot{Z_0}$};
\draw (N.port3) to [short, -o, i={$I_2$}] ++(1,0) node[above]{A} coordinate (A);
\draw (N.port2) to [short, -o] ++(1,0) node[right]{B} coordinate (B);
\draw (A) -- ++(1,0) to [R={$Z_L$}] ++(0,-2) to [battery1,l={$V_2=V_0$},invert] ++(-1,0) -- (B);
\end{circuitikz}
\subcaption{Decomposition 2}
\label{fig:thevenin-proof-d2}
\end{minipage}
\begin{minipage}[h]{0.45\linewidth}
\centering
\begin{circuitikz}
\draw (0,0) to [battery1={$V_0$},invert] ++(0,1.5) to [R={$Z_0$}] ++(0,1.5);
\draw (0,3) to [short, -o] ++(2,0) node[below]{A};
\draw (0,0) to [short, -o] ++(2,0) node[above]{B};
\end{circuitikz}
\vspace{2em}
\subcaption{Thevenin's Equivalent Voltage Source}
\label{fig:thevenin-proof-evs}
\end{minipage}
\caption{}
\end{figure}
sections/a-2/theory.tex
+90 -4
View File
@@ -2,14 +2,14 @@
\subsection{オームの法則} \subsection{オームの法則}
ある抵抗値を持つ抵抗器$R \ [\Omega]$に対し電圧$V \ [\text{V}]$を印加すると抵抗に電流$I \ [\text{A}]$が流れる. ある抵抗値を持つ抵抗器$R \ [\Omega]$に対し端子間電圧$V \ [\text{V}]$を印加すると抵抗に電流$I \ [\text{A}]$が流れる.
この時,$V, R, I$には次の関係式が成り立つ. この時,$V, R, I$には次の関係式が成り立つ.
\begin{equation}\label{equ:ohm} \begin{equation}\label{equ:ohm}
V = RI V = RI
\end{equation} \end{equation}
\cref{equ:ohm}で表されるこの関係をオームの法則という. \cref{equ:ohm}で表されるこの関係をオームの法則という\supercite{ac-theory:ohm}
電圧は電流に比例するのでV-I図は\cref{fig:v-i-example}のようになる. 電圧は電流に比例するのでV-I図は\cref{fig:v-i-example}のようになる.
@@ -40,11 +40,97 @@
この法則には2つの性質が定義されている. この法則には2つの性質が定義されている.
第一法則は電流則とも呼ばれ,回路中の接点の電流の入出流の関係が定義されている. 第一法則は電流則とも呼ばれ,\cref{fig:kirchhoff-i}のように回路中の接点の電流の入出流の関係が定義されている.
具体的には,\cref{equ:kirchhoff-i}に示すように流入(または流出)を正として総和した電流は常に零である,または,接点に流れ込む電流と流れ出る電流は等しい\supercite{ac-theory:kirchhoff-law-i}
第二法則は電圧則とも呼ばれ, \begin{equation}\label{equ:kirchhoff-i}
\sum_{k = 0} i_{k} = 0
\end{equation}
\newpage
第二法則は電圧則とも呼ばれ,\cref{fig:kirchhoff-v}のように回路の1つのループ(閉路)での電圧降下の関係が定義されている.
具体的には,\cref{equ:kirchhoff-v}に示すように回路内の任意の閉路について,その閉路に向定め,各枝の電圧を閉路向きに総和したとき,その和は常に零である\supercite{ac-theory:kirchhoff-law-v}
\begin{equation}\label{equ:kirchhoff-v}
\sum_{k = 0} v_{k} = 0
\end{equation}
\begin{figure}[tbh]
\centering
\begin{minipage}[h]{0.45\linewidth}
\centering
\begin{circuitikz}
\draw (135:3) to [short, -*, i={$i_1$}] (0,0);
\draw (-135:3) to [short, i={$i_2$}] (0,0);
\draw (0,0) to [short, i={$i_3$}] (45:3);
\draw (0,0) to [short, i={$i_5$}] (0:3);
\draw (0,0) to [short, i={$i_4$}] (-45:3);
\draw (0,0) node[below] {A};
\end{circuitikz}
\vspace{5.4em}
\subcaption{Current Law}
\label{fig:kirchhoff-i}
\end{minipage}
\begin{minipage}[h]{0.45\linewidth}
\centering
\begin{circuitikz}
\draw (90:3) node[above] {A} coordinate(p1) to [R, i={$i_1$}] (162:3) node[left] {B} coordinate(p2);
\draw (p2) to [battery1, i={$i_2$}] (234:3) node[left] {C} coordinate(p3);
\draw (p3) to [R, i={$i_3$}] (306:3) node[right] {D} coordinate(p4);
\draw (18:3) node[right] {E} coordinate(p5) to [battery1, i={$i_4$}] (p4);
\draw (p5) to [R, i={$i_5$}] (p1);
\draw (0,0) node {\Huge$\circlearrowleft$};
\end{circuitikz}
\subcaption{Voltage Law}
\label{fig:kirchhoff-v}
\end{minipage}
\caption{Kirchhoff's Laws}
\end{figure}
\subsection{重ね合わせの理} \subsection{重ね合わせの理}
電気回路に電圧源,電流源,抵抗器,キャパシタ,インダクタが複数個存在する場合,その回路は線形であり,電流・電圧源が単独で存在する場合の回路網の電流・電圧分布を求め,それらを重ね(加え)合わせた値は同時に存在する場合の値と等しい.ただし,取り去られる電流源は開放除去,電圧源は短絡除去する\supercite{ac-theory:superposition}
\subsection{テブナンの定理} \subsection{テブナンの定理}
電源を含む線形回路の端子開放電圧が$\dot{V_0}$で内部インピーダンスが$\dot{Z_0}$であった場合にインピーダンス$\dot{Z}$を端子に接続したとき,流れる電流$\dot{I}$\cref{equ:thevenin}となる.
\begin{equation}\label{equ:thevenin}
\dot{I} = \frac{\dot{V_0}}{\dot{Z_0} + \dot{Z}}
\end{equation}
\newpage
\begin{figure}[tbh]
\centering
\begin{minipage}[h]{0.45\linewidth}
\centering
\begin{circuitikz}
\draw (0,0) node[fourport] (X) {$X$};
\draw (X.center) node {$\dot{Z_0}$};
\draw (X.port3) to [short, -o] ++(1,0) node[above]{A} coordinate(A);
\draw (X.port2) to [short, -o] ++(1,0) node[below]{B} coordinate(B);
\ctikzset{resistors/scale=0.4}
\draw (B) to [R={$\dot{Z}$}] (A);
\draw[->] ($(B) + (0.25,0.1)$) -- ($(A) + (0.25,-0.1)$);
\node at ($($(A)!0.5!(B)$) + (0.5,0)$) {$\dot{V}$};
\end{circuitikz}
\subcaption{}
\label{}
\end{minipage}
\begin{minipage}[h]{0.45\linewidth}
\centering
\begin{circuitikz}
\draw (0,0) to [battery1={$\dot{V_t}$},invert] ++(0,2) to [R={$Z_t$}] ++(0,2);
\draw (0,4) to [short, -o] ++(2,0) node[below]{A};
\draw (0,0) to [short, -o] ++(2,0) node[above]{B};
\end{circuitikz}
\subcaption{}
\label{}
\end{minipage}
\caption{Thevenin's Theorem}
\label{fig:thevenin}
\end{figure}