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-rw-r--r--progreport/ProgressReport.tex36
-rw-r--r--progreport/document.tex36
2 files changed, 34 insertions, 38 deletions
diff --git a/progreport/ProgressReport.tex b/progreport/ProgressReport.tex
deleted file mode 100644
index ac935bc..0000000
--- a/progreport/ProgressReport.tex
+++ /dev/null
@@ -1,36 +0,0 @@
-\documentclass{article}
-\usepackage{hyperref}
-\date{}
-\begin{document}
-\title{Project Progress Report}
-\author{Holden Rohrer and Nithya Jayakumar}
-
-\maketitle
-
-\section{Project Topic}
-Our group will be working on the \href{https://simiode.org/resources/3187/download/4-23-S-MysteryCircuit-StudentVersion.pdf}{Mystery Circuit Modelling
-Scenario from SIMIODE}. This applies Kirchhoff's Voltage
-and Current Laws to the given circuit, which describe, respectively,
-that the sum of all voltages in a closed loop is zero and the sum of all
-currents at a node is zero. The circuit we're examining is an RLC
-(resistor, inductor, capacitor) circuit, with zeroed initial conditions.
-The specific circuit has two linked loops of resistors and capacitors,
-in which ``gain,'' the ratio between chosen voltage differentials in the
-circuit can be modeled mathematically.
-
-\section{Progress}
-We have the two equations that are results of Kirchhoff's Voltage and Current Laws:
-$$\sin(100t) = x(t)R_1 + \frac{1}{C_1}\int y(t)dt,$$
-$$\frac{1}{C_1}\int y(t)dt = \frac{1}{C_2} \int z(t) dt + z(t)R_{load}$$
-Differentiating these and rearranging gives:
-$$x'(t) = -\frac{y(t)}{R_1C_1} + \frac{100\cos(100t)}{R_1},$$
-$$z'(t) = \frac{y(t)}{C_1R_{load}} - \frac{z(t)}{C_2R_{load}}$$
-
-Through Kirchhoff's laws, we know that $y + z = x$ (current law), $y = z$ (voltage law), and $y + x = $ Electromotive Force (voltage law). Thus, we know that
-$$y' = x' - z' = -\frac{y(t)}{R_1C_1} + \frac{100\cos(100t)}{R_1} - \frac{y(t)}{C_1R_{load}} + \frac{z(t)}{C_2R_{load}},$$
-and we now have a system of differential equations.
-
-\section{Further Exploration}
-We will use the method of Eigenvalues and Eigenvectors to solve the system of differential equations we have developed, and accordingly model the circuit. Using this, we can find out the purpose of the circuit and do further work on similar circuits.
-
-\end{document} \ No newline at end of file
diff --git a/progreport/document.tex b/progreport/document.tex
index 6da665a..7ec2077 100644
--- a/progreport/document.tex
+++ b/progreport/document.tex
@@ -1,5 +1,6 @@
+\def\rload{R_{\rm load}}
\input ../format
-\titlesub{Part 2: Progress Report}{Mystery Circuit}
+\titlesub{Part 2: Progress Report}{Topic: Mystery Circuit}
\section{Project Topic}
@@ -12,8 +13,39 @@ currents at a node is zero. The circuit we're examining is an RLC
(resistor, inductor, capacitor) circuit, with zeroed initial conditions.
The specific circuit has two linked loops of resistors and capacitors,
in which ``gain,'' the ratio between chosen voltage differentials in the
-circuit can be modeled mathematically.
+circuit can be modeled mathematically. Because there are two connected
+loops, there are three different currents. There is the current coming
+off of the battery $x(t)$, the current split at the middle node becoming
+$y(t)$ and $z(t)$. We are examining ${E(t)\over z(t)\rload}$ as the
+``gain'' in the system. The first part uses $\omega = 100$ and the
+entire problem uses $E(t) = \sin(\omega t)$.
+
+\section{Progress}
+
+From Kirchhoff's Voltage law over the first (xy) loop,
+$$E(t) = \sin(\omega t) = x(t)R_1 + {1\over C_1}\int y(t)dt.$$
+Kirchhoff's Voltage law also applies to the second yz-loop:
+$${1\over C_1}\int y(t)dt = {1\over C_2}\int z(t)dt + z(t)\rload.$$
+Differentiating and rearranging gives:
+$$x'(t) = -{y(t) \over R_1C_1} + {\omega\cos(\omega t) \over R_1},$$
+$$z'(t) = {y(t) \over C_1\rload} - {z(t) \over C_2\rload}$$
+
+Kirchhoff's current law tells us that $y(t) + z(t) = x(t)$, so
+$$y'(t) = x'(t) - z'(t) = -{y(t)\over R_1C_1} +
+{\omega\cos(\omega t) \over R_1} - {y(t)\over C_1\rload}
++ {z(t) \over C_2\rload},$$
+giving a system of differential equations to solve.
\section{Further Exploration}
+We will reduce the system to a linear homogenous system and use the
+Eigenvalues and Eigenvectors to find a similar solution to the system
+of differential equations we have developed, and accordingly
+model the circuit. Using this, we can use either the method of
+undetermined coefficients or variation of parameters to find a solution
+to this system in general for various resistances and capacitances.
+Furthermore, we will graphically represent various parameters,
+investigate sensitivity to initial conditions, and attempt to generalize
+our findings.
+
\bye