Add exam

exam/.vscode/latex.code-snippets

@@ -0,0 +1,277 @@
+{
+  "Exc": {
+    "scope": "latex",
+    "prefix": ["\\exc"],
+    "body":
+      [
+        "\\exc{}",
+        "\\begin{subexcs}",
+        "  \\subexc{}",
+        "  $0",
+        "\\end{subexcs}"
+      ],
+    "description": "Adds new exc with subexcs",
+  },
+
+  "Subexc": {
+    "scope": "latex",
+    "prefix": ["\\subexc"],
+    "body":
+      [
+        "\\subexc{}",
+        "\\begin{ssubexcs}",
+        "  \\ssubexc{}",
+        "  $0",
+        "\\end{ssubexcs}"
+      ],
+    "description": "Adds new subexc with ssubexcs",
+  },
+
+  "Diagram": {
+    "scope": "latex",
+    "prefix": ["dia"],
+    "body": "\\includeDiagram[caption={}, width=1\\linewidth]{graphics/$0.tex}",
+    "description": "Include a diagram",
+  },
+
+  "Graph Table": {
+    "scope": "latex",
+    "prefix": ["graph-table"],
+    "body":
+      [
+      "\\begin{figure}[H]",
+      "  \\center",
+      "  \\begin{tabular}{c|cc}",
+      "    $A$ & \\multicolumn{2}{c}{$v$} \\\\",
+      "    \\hline",
+      "      & $a$ & $b$ \\\\",
+      "    \\hline",
+      "    $s_0$ & $s_$ & $s_$ \\\\",
+      "    $s_1$ & $s_$ & $s_$ \\\\",
+      "    $s_2$ & $s_$ & $s_$ \\\\",
+      "  \\end{tabular}",
+      "\\end{figure}"
+      ],
+    "description": "Adds graph-table",
+  },
+
+  "Graph Table Double": {
+    "scope": "latex",
+    "prefix": ["graph-dtable"],
+    "body":
+      [
+      "\\begin{figure}[H]",
+      "  \\center",
+      "  \\begin{tabular}{c|cc}",
+      "    $A$ & \\multicolumn{2}{c}{$v$} \\\\",
+      "    \\hline",
+      "      & $a$ & $b$ \\\\",
+      "    \\hline",
+      "    $s_0$ & $s_$ & $s_$ \\\\",
+      "    $s_1$ & $s_$ & $s_$ \\\\",
+      "    $s_2$ & $s_$ & $s_$ \\\\",
+      "  \\end{tabular}",
+      "\\end{figure}"
+      ],
+    "description": "Adds graph-table",
+  },
+  
+  "Graph Table Line": {
+    "scope": "latex",
+    "prefix": ["gtl"],
+    "body": "    $s_$ & $s_$ & $s_$ \\\\",
+    "description": "Adds line inside graph-table",
+  },
+
+  "Graph Table Double Line": {
+    "scope": "latex",
+    "prefix": ["gtdl"],
+    "body": "    $s_$ & $s_$ & $s_$ & $s_$ & $s_$ \\\\",
+    "description": "Adds line inside a double graph-table",
+  },
+
+  "Induction Proof": {
+    "scope": "latex",
+    "prefix": ["prove-induction"],
+    "body": [
+      "Base case:",
+      "",
+      "\\begin{align*}",
+      "",
+      "\\end{align*}",
+      "",
+      "Assume that",
+      "",
+      "\\[ $1 \\]",
+      "",
+      "Then",
+      "",
+      "\begin{align*}",
+      "    &= $1 + \\\\",
+      "    &=",
+      "\\end{align*}",
+      "",
+      "\\qed"
+    ],
+    "description": "Template for induction proof",
+  },
+
+  "Injective Proof": {
+    "scope": "latex",
+    "prefix": ["prove-injective"],
+    "body": [
+      "In order for $f(x)$ to be injective, it has to hold that",
+      "",
+      "\\[ f(a) = f(b) \\Rightarrow a = b \\]",
+      "",
+      "\\begin{align*}",
+      "  f(a) &= f(b) \\\\",
+      "  $0",
+      "\\end{align*}",
+      "",
+      "Hence $f(x)$ is injective."
+    ],
+    "description": "Template for injective proof",
+  },
+
+  "Surjective Proof": {
+    "scope": "latex",
+    "prefix": ["prove-surjective"],
+    "body": [
+      "In order for $f(x)$ to be surjective, it has to hold that",
+      "",
+      "\\[ \\forall x \\in SET \\exists y \\in SET [f(x) = y] \\]",
+      "",
+      "\\begin{align*}",
+      "  y &= $1 \\\\",
+      "",
+      "  x &=  \\\\" ,
+      "\\end{align*}",
+      "",
+      "$ $ makes up all the elements in SET",
+      "",
+      "\\begin{align*}",
+      "  f(y) &=  \\\\",
+      "",
+      "\\end{align*}",
+      "",
+      "Hence $f(x)$ is surjective"
+    ],
+    "description": "Template for surjective proof",
+  },
+
+  "Bijective Function Proof": {
+    "scope": "latex",
+    "prefix": ["prove-bijective"],
+    "body": [
+      "\\textbf{Injective:}",
+      "",
+      "In order for $f(x)$ to be injective, it has to hold that",
+      "",
+      "\\[ f(a) = f(b) \\Rightarrow a = b \\]",
+      "",
+      "\\begin{align*}",
+      "  f(a) &= f(b) \\\\",
+      "  $0",
+      "\\end{align*}",
+      "",
+      "Hence $f(x)$ is injective.",
+      "",
+      "",
+      "\\textbf{Surjective:}",
+      "",
+      "In order for $f(x)$ to be surjective, it has to hold that",
+      "",
+      "\\[ \\forall x \\in SET \\exists y \\in SET [f(x) = y] \\]",
+      "",
+      "\\begin{align*}",
+      "  y &= $1 \\\\",
+      "",
+      "  x &=  \\\\" ,
+      "\\end{align*}",
+      "",
+      "$ $ makes up all the elements in SET",
+      "",
+      "\\begin{align*}",
+      "  f(y) &=  \\\\",
+      "",
+      "\\end{align*}",
+      "",
+      "Hence $f(x)$ is surjective",
+      "",
+      "",
+      "\\textbf{Inverse:}",
+      "",
+      "The inverse is the same as the expression which makes up $x$ which we used to prove that $f(x)$ is surjective. Hence",
+      "",
+      "\\[ f^{-1}(x) =  \\]",
+    ],
+    "description": "Template for bijective proof",
+  },
+
+  "Equivalence Relation Proof": {
+    "scope": "latex",
+    "prefix": ["prove-eq-rel"],
+    "body": [
+      "In order for this relation to be an equivalence equation, it has to be reflexive, symmetric and transitive.",
+      "",
+      "\\textbf{Reflexive:}",
+      "",
+      "\\[  \\]",
+      "",
+      "\\textbf{Symmetric:}",
+      "",
+      "\\[  \\]",
+      "",
+      "\\textbf{Transitive:}",
+      "",
+      "\\[  \\]",
+      "",
+      "Hence the relation is an equivalence relation",
+    ],
+    "description": "Template for equivalence relation proof",
+  },
+
+  "Partial Order Proof": {
+    "scope": "latex",
+    "prefix": ["prove-poset"],
+    "body": [
+      "In order for this relation to be a partial order, it has to be reflexive, antisymmetric and transitive.",
+      "",
+      "\\textbf{Reflexive:}",
+      "",
+      "\\[  \\]",
+      "",
+      "\\textbf{Antisymmetric:}",
+      "",
+      "\\[  \\]",
+      "",
+      "\\textbf{Transitive:}",
+      "",
+      "\\[  \\]",
+      "",
+      "Hence the relation is a partial order",
+    ],
+    "description": "Template for poset proof",
+  },
+
+  "Poset MinMax": {
+    "scope": "latex",
+    "prefix": ["minmax-poset"],
+    "body": [
+      "Minimal elements:",
+      "  \\[ \\{ $0 \\} \\]",
+      "Maximal elements:",
+      "  \\[ \\{  \\} \\]"
+    ],
+    "description": "Minimal maximal elements for poset",
+  },
+
+  "Binomial Coefficient": {
+    "scope": "latex",
+    "prefix": ["binom-co"],
+    "body": "\\[ \nCr{$0}{$1}x^{$2}y^{$1} = $3 x^{$2}y^{$1}\\]",
+    "description": "Formula for a binomial coefficient",
+  },
+
+}

exam/.vscode/makefile.code-snippets

@@ -0,0 +1,16 @@
+
+{
+  "hasse": {
+    "scope": "makefile",
+    "prefix": ["hasse"],
+    "body": "python ../../python/Hasse.py graphics/src/$1.txt graphics/$1.tex",	
+    "description": "Add hasse diagram",
+  },
+
+  "FSA": {
+    "scope": "makefile",
+    "prefix": ["fsa"],
+    "body": "python ../../python/FSA.py graphics/src/$1.txt graphics/$1.tex",	
+    "description": "Add FSA diagram",
+  }
+}

exam/Makefile

@@ -0,0 +1,15 @@
+.DEFAULT_GOAL := default
+.PHONY: default python
+
+default: python
+	pdflatex main.tex
+
+SRC_DIR := $(shell find graphics/src -type f -printf "%f\n" -name *.txt | cut -d '.' -f1)
+
+python:
+	@for f in $(SRC_DIR); \
+	do \
+		echo -e "\033[33mCOMPILING $$f.tex\033[0m"; \
+		python ../exam_template/python/run.py graphics/src/$$f.txt graphics/$$f.tex; \
+		echo ""; \
+	done

exam/graphics/14.tex

@@ -0,0 +1,24 @@
+\begin{tikzpicture}
+  \tikzset{
+    ->, % makes the edges directed
+    >=Stealth, % makes the arrow heads bold
+    node distance=5cm, % specifies the minimum distance between two nodes. Change if necessary.
+    every state/.style={thick, fill=white}, % sets the properties for each ’state’ node
+    initial text=$ $, % sets the text that appears on the start arrow
+  }
+
+\node[state, ] (s0) {$s_0$};
+\node[state, right of=s0] (s1) {$s_1$};
+\node[state, right of=s1] (s2) {$s_2$};
+
+\draw (s0) edge[bend right, below] node{$a,0$} (s1);
+\draw (s0) edge[above] node{$c,1$} (s1);
+\draw (s0) edge[loop,above] node{b,1} (s0);
+\draw (s1) edge[above] node{$a,1$} (s2);
+\draw (s1) edge[bend right, above] node{$b,0$} (s0);
+\draw (s1) edge[bend right, above] node{$c,0$} (s0);
+\draw (s2) edge[bend right, above] node{$a,0$} (s1);
+\draw (s2) edge[bend left, below] node{$b,1$} (s0);
+\draw (s2) edge[loop,above] node{c,0} (s2);
+
+\end{tikzpicture}

exam/graphics/14mod.tex

@@ -0,0 +1,24 @@
+\begin{tikzpicture}
+  \tikzset{
+    ->, % makes the edges directed
+    >=Stealth, % makes the arrow heads bold
+    node distance=5cm, % specifies the minimum distance between two nodes. Change if necessary.
+    every state/.style={thick, fill=white}, % sets the properties for each ’state’ node
+    initial text=$ $, % sets the text that appears on the start arrow
+  }
+
+\node[state, ] (s0) {$s_0$};
+\node[state, right of=s0] (s1) {$s_1$};
+\node[state, right of=s1] (s2) {$s_2$};
+
+\draw (s0) edge[bend right, above] node{$a,0$} (s1);
+\draw (s0) edge[above] node{$c,1$} (s1);
+\draw (s0) edge[loop,above] node{b,1} (s0);
+\draw (s1) edge[above] node{$a,1$} (s2);
+\draw (s1) edge[bend right=60, above] node{$b,0$} (s0);
+\draw (s1) edge[bend right, above] node{$c,0$} (s0);
+\draw (s2) edge[bend right, above] node{$a,0$} (s1);
+\draw (s2) edge[bend left, below] node{$b,1$} (s0);
+\draw (s2) edge[loop,above] node{c,0} (s2);
+
+\end{tikzpicture}

exam/graphics/16.tex

@@ -0,0 +1,22 @@
+\newcommand{\arrow}[2]{\path [-{Latex[scale=1]}] (#1) edge (#2);}
+
+\begin{tikzpicture}
+
+  \begin{scope}[every node/.style={shape=circle, fill=white, draw, inner sep=2pt}]
+    \node (A) at (0,2.5) {$A$};
+\node (B) at (-2.37764,0.77254) {$B$};
+\node (C) at (-1.46946,-2.02254) {$C$};
+\node (D) at (1.46946,-2.02254) {$D$};
+\node (E) at (2.37764,0.77254) {$E$};
+  \end{scope}
+
+  \begin{scope}[every draw/.style={}]
+    \draw (A) -- (B);
+\draw (A) -- (C);
+\draw (A) -- (E);
+\draw (B) -- (D);
+\draw (B) -- (E);
+\draw (D) -- (E);
+  \end{scope}
+
+\end{tikzpicture}

exam/graphics/17.tex

@@ -0,0 +1,37 @@
+\newcommand{\point}[4]{
+  \node [label=#3:#4] (#1) at #2 {};
+}
+
+\newcommand{\wpath}[3]{
+  \draw (#1) -- (#2) node [midway, above, sloped] (Tx#1#2) {{\tiny $#3$}};
+}
+
+\begin{tikzpicture}[]
+  \begin{scope}[every node/.style={fill=black, shape=circle, inner sep=1pt}]
+    \point{1}{(0,1)}{left}{$v_1$}
+    \point{2}{(1,2)}{above}{$v_2$}
+    \point{3}{(1,0)}{below}{$v_3$}
+
+    \point{4}{(3,2)}{above left}{$v_4$}
+    \point{5}{(3,0)}{below right}{$v_5$}
+
+    \point{6}{(5,2)}{above left}{$v_6$}
+    \point{7}{(5,0)}{above left}{$v_7$}
+    \point{8}{(6,1)}{above right}{$v_8$}
+  \end{scope}
+  
+  \wpath{1}{3}{1}
+  \wpath{2}{3}{2}
+  \wpath{7}{8}{2}
+  \wpath{3}{5}{3}
+  \wpath{4}{5}{4}
+  \wpath{6}{8}{5}
+  \wpath{5}{6}{6}
+  \wpath{6}{7}{7}
+  \wpath{5}{7}{8}
+  \wpath{4}{6}{9}
+  \wpath{2}{5}{10}
+  \wpath{2}{4}{11}
+  \wpath{1}{2}{12}
+
+\end{tikzpicture}

exam/graphics/17_2.tex

@@ -0,0 +1,31 @@
+\newcommand{\point}[4]{
+  \node [label=#3:#4] (#1) at #2 {};
+}
+
+\newcommand{\wpath}[3]{
+  \draw (#1) -- (#2) node [midway, above, sloped] (Tx#1#2) {{\tiny $#3$}};
+}
+
+\begin{tikzpicture}[]
+  \begin{scope}[every node/.style={fill=black, shape=circle, inner sep=1pt}]
+    \point{1}{(0,1)}{left}{$v_1$}
+    \point{2}{(1,2)}{above}{$v_2$}
+    \point{3}{(1,0)}{below}{$v_3$}
+
+    \point{4}{(3,2)}{above left}{$v_4$}
+    \point{5}{(3,0)}{below right}{$v_5$}
+
+    \point{6}{(5,2)}{above left}{$v_6$}
+    \point{7}{(5,0)}{above left}{$v_7$}
+    \point{8}{(6,1)}{above right}{$v_8$}
+  \end{scope}
+  
+  \wpath{1}{3}{1}
+  \wpath{2}{3}{2}
+  \wpath{7}{8}{2}
+  \wpath{3}{5}{3}
+  \wpath{4}{5}{4}
+  \wpath{6}{8}{5}
+  \wpath{5}{6}{6}
+
+\end{tikzpicture}

exam/graphics/3.tex

@@ -0,0 +1,10 @@
+
+  \begin{truthtable}
+    {c|c|e|c|e}
+    {$p$ & $q$ & $ \neg p$ & $p \wedge q$ & $ \neg (p \wedge q)$}
+    \T & \T & \F & \T & \F \\
+    \T & \F & \F & \F & \T \\
+    \F & \T & \T & \F & \T \\
+    \F & \F & \T & \F & \T \\
+  \end{truthtable}
+  

exam/graphics/5.tex

@@ -0,0 +1,27 @@
+
+In order for this relation to be an equivalence equation, it has to be reflexive, symmetric and transitive.
+
+\textbf{Reflexive:}
+
+All elements are related to themself
+
+\[ DD, AA, CC, BB \]
+
+\textbf{Symmetric:}
+
+All relations has its symmetric counterpart
+
+\begin{gather*}
+CD\text{ and }DC
+\end{gather*}
+
+\textbf{Transitive:}
+
+All pair of relations where $xRy$ and $yRz$ has its transitive counterpart
+
+\begin{gather*}
+DC\text{ and }CD\text{ with }DD \\
+CD\text{ and }DC\text{ with }CC
+\end{gather*}
+
+Hence the relation is an equivalence relation

exam/graphics/6.tex

@@ -0,0 +1,15 @@
+\begin{tikzpicture}
+  \tikzset{every node/.style={shape=circle,draw,fill=white,inner sep=2pt}}
+
+\node (3) at (0, 0) {$3$};
+\node (4) at (1, 0) {$4$};
+\node (6) at (0, 1) {$6$};
+\node (12) at (0, 2) {$12$};
+\node (20) at (1, 1) {$20$};
+
+\draw (3) -- (6);
+\draw (4) -- (12);
+\draw (4) -- (20);
+\draw (6) -- (12);
+
+\end{tikzpicture}

exam/graphics/src/14.txt

@@ -0,0 +1,14 @@
+# FSA
+0 
+1 r0
+2 r1
+
+0 a,0 )d 1
+0 c,1 u 1
+o b,1 u 0
+1 a,1 u 2
+1 b,0 )u 0
+1 c,0 )u 0
+2 a,0 )u 1
+2 b,1 (d 0
+o c,0 u 2

exam/graphics/src/16.txt

@@ -0,0 +1,8 @@
+# Graph
+matrix
+
+01101
+10011
+10000
+01001
+11010

exam/graphics/src/3.txt

@@ -0,0 +1,2 @@
+# Truthtable
+p, q, E not p, p and q, E not (p and q)

exam/graphics/src/5.txt

@@ -0,0 +1,4 @@
+# Relations
+proveEquivalence
+
+AA BB CC CD DD DC

exam/graphics/src/genDivPoset.py

@@ -0,0 +1,7 @@
+def genDivPosetFrom(s):
+  return set((s1,s2) for s1 in s for s2 in s if s2 % s1 == 0 and s1 != s2)
+
+s = set([3,4,6,12,20])
+poset = genDivPosetFrom(s)
+
+print('\n'.join(str(x) for x in poset))

exam/main.tex

@@ -0,0 +1,348 @@
+\documentclass[12pt]{article}
+\usepackage{ntnu}
+\usepackage{ntnu-math}
+\usepackage{ntnu-code}
+
+\author{10112}
+\title{MA0301 Spring 2021}
+
+\usetikzlibrary{automata, positioning, arrows.meta}
+
+\newcommand{\I}{\Huge\textbf{I}}
+\newcommand{\II}{\Huge\textbf{I\!I}}
+\newcommand{\III}{\Huge\textbf{I\!I\!I}}
+
+\usepackage{listings}
+\usepackage{blkarray}
+
+\renewcommand{\theenumi}{\arabic{enumi}}
+\renewcommand{\theenumii}{(\arabic{enumii})}
+\renewcommand{\theenumiii}{\alph{enumiii})}
+
+
+  \newcommand{\checkEdge}[3]{
+    Find next edge with the minimum weight. \\
+    The edge between #1 and #2 has weight #3. \\
+    Does adding it connect two separate subgraphs? \\
+  }
+  \newcommand{\yes}{\textbf{Yes. Add edge} \\[2ex]}
+  \newcommand{\no}{\textbf{No. Discard edge} \\[2ex]}
+
+\begin{document}
+
+  %%%%%%%% 2
+
+  \begin{align*}
+    \neg (\exists x \forall y (\neg P(x,y) \wedge Q(x,y))) \\
+    \forall x \exists y \neg(\neg P(x,y) \wedge Q(x,y)) \\
+    \forall x \exists y (\neg \neg P(x,y) \vee \neg Q(x,y)) \\
+    \forall x \exists y (P(x,y) \vee \neg Q(x,y)) \\
+  \end{align*}
+
+  %%%%%%%% 3
+  \break
+
+  1.
+
+  \input{graphics/3.tex}
+
+  2.
+
+  By looking at the truthtable, we can see that $\neg p \not\equiv \neg(p \wedge q)$ \\
+
+  3.
+
+  \begin{gather*}
+    (p \downarrow q) \downarrow (p \downarrow q) \\
+    \neg ( \neg (p \wedge q) \wedge \neg (p \wedge q)) \\
+    \neg ( (\neg p \vee \neg q) \wedge  (\neg p \vee \neg q)) \\
+    \neg (\neg p \vee \neg q) \vee \neg (\neg p \vee \neg q)) \\
+    \neg \neg p \vee \neg \neg q \vee \neg \neg p \vee \neg \neg q \\
+    p \vee  q \vee p \vee q \\
+    p \vee q \\
+  \end{gather*}
+
+  \[ (p \downarrow q) \downarrow (p \downarrow q) \equiv p \vee q \]
+
+
+  %%%%%%%% 5
+  \break
+
+  \[ R := \{ (0,0), (1,1), (2,2), (2,3) \} \]
+
+  $R$ is not an equivalence relation. \\
+
+  For reflexivity, it's missing one relation
+
+  \[ (3,3) \]
+
+  For symmetry, it's missing one relation
+
+  \[ (3,2) \]
+
+  For transitivity, it will by now have all missing elements \\
+
+  \[ (2,3) \text{ and } (3,2) \rightarrow (2,2) \]
+  \[ (3,2) \text{ and } (2,3) \rightarrow (3,3) \]
+
+  \[ R := \{ (0,0),(1,1),(2,2),(2,3), (3,2), (3,3) \} \]
+
+  %%%%%%%% 6
+  \break
+
+  \[ A := \{3, 4, 6, 12, 20 \} \]
+
+  \includeDiagram[scale=2, width=5cm]{graphics/6.tex}
+
+  \center
+  By looking at the hasse diagram, we can see that
+
+  \[ \text{Minimal elements: } \{ 3, 4 \} \]
+  \[ \text{Maximal elements: } \{ 12, 20 \} \]
+  
+  %%%%%%%% 7
+  \break
+
+  Base case:
+  
+  \begin{align*}
+    \sum^3_{i=3} 3^i = \frac{3(3^3-9)}{2} \\[2ex]
+    3^3 = \frac{3(27-9)}{2} \\[2ex]
+    27 = \frac{3(18)}{2} \\[2ex]
+    27 = 9 \cdot 3 \\[2ex]
+    27 = 27 \\[2ex]
+  \end{align*}
+  
+  Assume that
+  
+  \[ \sum^n_{i=3} 3^i = \frac{3(3^n-9)}{2} \qquad \text{for } n > 2 \]
+  
+  Then
+  
+  \begin{align*}
+    \sum^{n+1}_{i=3} 3^i &= 3^3 + 3^4 + \ldots + 3^n + 3^{n+1} \\[2ex]
+      &= \frac{3(3^n-9)}{2} + 3^{n+1} \\[2ex]
+      &= \frac{3^{n+1} - 3 \cdot 9 + 2 \cdot 3^{n+1}}{2} \\[2ex]
+      &= \frac{3 \cdot 3^{n+1} - 3 \cdot 9}{2} \\[2ex]
+      &= \frac{3(3^{n+1} - 9)}{2} \\[2ex]
+  \end{align*}
+  
+  \qed
+
+  %%%%%%%% 8
+  \break
+
+  \[
+    \{ a_n \}_{n>0} = 
+    \begin{cases}
+      a_1 = 3 \\
+      a_2 = 6 \\
+      a_n = a_n + a_{n-1} \quad \text{for } n > 2 \\
+    \end{cases}
+  \]
+
+  \textbf{Base case:}
+
+  For $a_3$, we have that
+
+  \begin{align*}
+    a_3 &= a_2 + a_1 \\
+        &= 6 + 3 \\
+        &= 3(3) \\
+        &\Rightarrow a_3 \bmod 3 = 0
+  \end{align*}
+
+  For $a_4$, we have that
+
+  \begin{align*}
+    a_4 &= a_3 + a_2 \\
+        &= 9 + 6 \\
+        &= 3(5) \\
+        &\Rightarrow a_4 \bmod 3 = 0
+  \end{align*}
+
+  \textbf{Inductive step:}
+
+  Assume that for $k_1 \in \N$, $k_2 \in \N$:
+
+  \begin{align*}
+       a_n &= 3(k_1) \\
+   a_{n-1} &= 3(k_2) \\
+  \end{align*}
+
+  Then
+
+  \begin{align*}
+    a_{n+1} &= a_n + a_{n-1} \\
+    &= 3(k_1) + 3(k_2) \\
+    &= 3(k_1 + k_2) \\
+    &\Rightarrow a_{n+1} \bmod 3 = 0
+  \end{align*}
+
+  \qed
+
+
+  %%%%%%%% 10
+  \break
+
+  \[ f : \Z \rightarrow \Z \]
+  \[ f(x) = x-7 \]
+
+  \textbf{Injective:}
+  
+  In order for $f(x)$ to be injective, it has to hold that
+  
+  \[ f(a) = f(b) \Rightarrow a = b \]
+  
+  \begin{align*}
+    f(a) &= f(b) \\
+    a - 7 &= b - 7 \\
+    a &= b \\
+  \end{align*}
+  
+  Hence $f(x)$ is injective. \\
+  
+  
+  \textbf{Surjective:}
+  
+  In order for $f(x)$ to be surjective, it has to hold that
+  
+  \[ \forall x \in \Z \exists y \in \Z [f(x) = y] \]
+  
+  \begin{align*}
+    y &= x - 7 \\
+    x &= y + 7 \\
+  \end{align*}
+  
+  $ x = y + 7 $ makes up all the elements in $\Z$
+  
+  \begin{align*}
+    f(x) &= x - 7 \\
+         &= (y + 7) - 7 \\
+         &= y
+  \end{align*}
+  
+  Hence $f(x)$ is surjective \\
+
+  \textbf{Conclusion:}
+  
+  Since $f(x)$ is both injective and surjective, it is by definition bijective
+
+
+  %%%%%%%% 11
+  \break
+
+  There are no $x^6y^6$ in the expansion of $(3x^5 + 2y)^6$ \\
+
+  For $x^{10}y^4$, there is
+
+  \[ \binom{6}{4}(3x^5)^{6-4}(2y)^4 = 2160 x^{10}y^4 \]
+
+  %%%%%%%% 12
+  \break
+
+  The number of permutations of the letters "ALLTALK" is
+
+  \[ \frac{7!}{(7-7)!2!3!} = 420 \]
+
+  If all of the Ls has to be together, we can think of this block like one letter. \\
+
+  That leaves us with 5 letters, where one of them is repeated once. \\
+
+  \[ \frac{5!}{(5-5)!2!} = 60 \]
+
+  %%%%%%%% 14
+  \break
+
+  \includeDiagram{graphics/14mod.tex}
+
+  Assuming the automation is starting at $s_0$, the output for $acabacab$ would be
+
+  \begin{gather*}
+    s_0 \xrightarrow{a,0} s_1 \\
+    s_1 \xrightarrow{c,0} s_0 \\
+    s_0 \xrightarrow{a,0} s_1 \\
+    s_1 \xrightarrow{b,0} s_0 \\
+    s_0 \xrightarrow{a,0} s_1 \\
+    s_1 \xrightarrow{c,0} s_0 \\
+    s_0 \xrightarrow{a,0} s_1 \\
+    s_1 \xrightarrow{b,0} s_0 \\
+  \end{gather*}
+
+  \[ 00000000 \]
+
+  %%%%%%%% 15
+  \break
+
+  $L$ is a language that only contains words which fits the regular expresson $r$, where
+
+  \[ r = b^*ab^*ab^* \]
+
+  or described with words, \\
+  
+  \center "$L$ is a language that only has words that contain exactly two of the letter $a$"
+
+  %%%%%%%% 16
+  \break
+
+  \[
+    \begin{blockarray}{cccccc}
+    & A & B & C & D & E \\
+    \begin{block}{c[ccccc]}
+      A & 0 & 1 & 1 & 0 & 1  \\
+      B & 1 & 0 & 0 & 1 & 1  \\
+      C & 1 & 0 & 0 & 0 & 0  \\
+      D & 0 & 1 & 0 & 0 & 1  \\
+      E & 1 & 1 & 0 & 1 & 0 \\
+    \end{block}
+    \end{blockarray}
+  \]
+
+  \includeDiagram{graphics/16.tex}
+
+
+  %%%%%%%% 17
+  \break
+
+  \includeDiagram[scale=1.6]{graphics/17.tex}
+
+  Performed Kruskal's algorithm as follows: \\[2ex]
+
+  \textbf{Remove all edges} \\
+
+  \checkEdge{1}{3}{1}
+  \yes
+  \checkEdge{2}{3}{2}
+  \yes
+  \checkEdge{7}{8}{2}
+  \yes
+  \checkEdge{3}{5}{3}
+  \yes
+  \checkEdge{4}{5}{4}
+  \yes
+  \checkEdge{6}{8}{5}
+  \yes
+  \checkEdge{5}{6}{6}
+  \yes
+  By now, the graph is already spanning so there aren't any more disconnected subgraphs to connect, but I'll check the last ones anyway, like for-looping over the set of edges in a computer program would. \\
+
+  \checkEdge{6}{7}{7}
+  \no
+  \checkEdge{5}{7}{8}
+  \no
+  \checkEdge{4}{6}{9}
+  \no
+  \checkEdge{2}{5}{10}
+  \no
+  \checkEdge{2}{4}{11}
+  \no
+  \checkEdge{1}{2}{12}
+  \no
+
+  \break{}
+
+  \textbf{Result: }
+
+  \includeDiagram[scale=1.6]{graphics/17_2.tex}
+
+\end{document}

exam/python/FSA.py

@@ -0,0 +1,80 @@
+from sys import argv
+from pathlib import Path
+import re
+
+from common import replaceContent
+
+placementChart = {
+  'a': 'above',
+  'b': 'below',
+  'l': 'left',
+  'r': 'right'
+}
+
+def generateEdge(inputLine):
+  s_src, msg, opts, s_dest = inputLine.split(' ')
+
+  out_options = []
+
+  if '(' in opts or ')' in opts:
+    out_options.append('bend left' if '(' in opts else 'bend right')
+
+  if any(x in opts for x in 'udlr'):
+    out_options.append(
+      'above' if 'u' in opts else \
+      'below' if 'd' in opts else \
+      'left'  if 'l' in opts else \
+      'right' if 'r' in opts else ''
+    )
+  
+  
+  if s_src == 'o':
+    return f'\draw (s{s_dest}) edge[loop,{",".join(out_options)}] node{{{msg}}} (s{s_dest});'
+  else: 
+    return f'\draw (s{s_src}) edge[{", ".join(out_options)}] node{{${msg}$}} (s{s_dest});'
+
+def generateNode(inputLine):
+  s_src, opts = inputLine.split(' ')
+
+  out_opts = []
+  if 's' in opts:
+    out_opts.append('initial')
+  if 'f' in opts:
+    out_opts.append('accepting')
+  
+  if place := re.search('[udlr]\d+', opts):
+    out_opts.append(placementChart[place.group()[0]] + ' of=s' + place.group()[1])
+
+  return f'\\node[state, {", ".join(out_opts)}] (s{s_src}) {{$s_{s_src}$}};'
+
+
+def generate_latex(inputLines):
+
+  nodes, edges = inputLines.split('\n\n')
+
+  output=[]
+
+  for node in nodes.split('\n'):
+    output.append(generateNode(node))
+  
+  output.append('')
+  
+  for edge in edges.split('\n'):
+    output.append(generateEdge(edge))
+  
+  return '\n'.join(output)
+
+def processFileContent(raw):
+  content = generate_latex(raw)
+  return replaceContent(content, 'FSA')
+
+if __name__ == '__main__':
+  pass
+  # filename = argv[1]
+
+  # with open(filename) as file:
+  #   content = generate_latex(file.read())
+
+  # with open(str(Path(__file__).parent.absolute()) + '/tex_templates/FSA.tex') as template:
+  #   with open(argv[2], 'w') as destination_file:
+  #     destination_file.write(template.read().replace('%CONTENT', content))

exam/python/Graph.py

@@ -0,0 +1,261 @@
+from sys import argv
+from pathlib import Path
+from math import sin, cos, pi
+
+from common import printc, printerr, replaceContent
+
+class Matrix:
+  """ Adjacency matrix which supports 0 and 1 """
+
+  def __init__(self, matrix):
+    self.matrix = matrix
+
+  def __iter__(self):
+    return iter(self.matrix)
+  
+  def __len__(self):
+    return len(self.matrix)
+
+  def __eq__(self, other):
+    return self.matrix == other
+
+  def __str__(self):
+    return "\n".join(' '.join('\033[32m1\033[0m' if b else '\033[31m0\033[0m' for b in line) for line in self)
+
+  def __getitem__(self, key):
+    return self.matrix[key]
+
+  def __setitem__(self, key, item):
+    self.matrix[key] = item
+  
+  @classmethod
+  def fromGraph(cls, graph):
+    return graph.toMatrix()
+  
+  @classmethod
+  def fromString(cls, string):
+    matrix = []
+    for line in string.split('\n'):
+      matrix.append([True if char == '1' else False for char in line])
+
+    if len(matrix) != len(matrix[0]):
+      raise ValueError('Matrix not covering all points')
+  
+    return cls(matrix)
+
+  def toGraph(self):
+    nodes = [chr(i + 65) for i in range(len(self))]
+
+    edges = []
+    for i, line in enumerate(self):
+      edges += [(nodes[i],nodes[j]) for j, b in enumerate(line) if b]
+
+    return Graph(nodes, edges)
+
+  def toLaTeX(self):
+    return '\\begin{pmatrix}\n' \
+      + '\n'.join('  ' + ' & '.join('1' if b else '0' for b in line) + ' \\\\' for line in self.matrix) \
+      + '\n\\end{pmatrix}'
+
+
+class Graph:
+  def __init__(self, nodes, edges): # Nodes = str, Edges = (str,str)
+    self.nodes = nodes
+    self.edges = edges
+  
+  def __str__(self):
+    printc('Is undirected: ' + str(self.isUndirected()))
+    return \
+      f'Nodes: {" ".join(self.nodes)}\n' \
+    + f'Edges: {" ".join(x+y for x,y in (self.undirectedEdgeSet() if self.isUndirected() else self.edges))}'
+  
+  @classmethod
+  def fromMatrix(cls, matrix):
+    return matrix.toGraph()
+
+  @classmethod
+  def fromString(cls, string):
+    splitData = string.split('\n\n')
+
+    if splitData[0] == 'complete':
+      data1 = 'undirected'
+      nodes = [chr(i + 65) for i in range(int(splitData[1]))]
+      data2 = ' '.join(nodes)
+      data3 = '\n'.join([a+b for a in nodes for b in nodes if a != b])
+    elif splitData[0] == 'matrix':
+      return Graph.fromMatrix(Matrix.fromString(splitData[1]))
+    else:
+      data1, data2, data3 = splitData
+
+    graphType = data1
+    nodes = data2.split(' ')
+    edges = [(x,y) for x,y in data3.split('\n')]
+
+    if graphType == 'undirected':
+      edges = [(a,b) for a in nodes for b in nodes if (a,b) in edges or (b,a) in edges]
+
+    return cls(nodes, edges)
+
+  def toMatrix(self):
+    rows = []
+    for node in self.nodes:
+      rows.append([(node,node2) in self.edges for node2 in self.nodes])
+    return Matrix(rows)
+
+  def isUndirected(self):
+    matrix = self.toMatrix()
+
+    flipv = lambda matrix: list(reversed(matrix))
+    rot90cc = lambda matrix: list(list(x) for x in zip(*reversed(matrix)))
+
+    return matrix == rot90cc(flipv(matrix)) \
+      and all(matrix[i][i] == 0 for i in range(len(matrix)))
+  
+  def undirectedEdgeSet(self):
+    edges = self.edges
+    if self.isUndirected():
+      edges = sorted(list(set((x,y) if x < y else (y,x) for x,y in edges)))
+    return edges
+  
+  # def latexifyEulerPath(self):
+  #   degrees = [sum(line) for line in self.toMatrix()]
+
+  # def latexifyEulerCircuit():
+  #   pass
+
+  def getKruskalsSpanningTree(self, weigths): # weights = dict[str, int]
+    edges = []
+    connected_subgraphs = [set(v) for v in self.nodes]
+
+    if not all(n in ''.join(x+y for x,y in self.edges) for n in self.nodes):
+      printerr('Not all nodes are connected. There is no spanning tree to be made')
+      return
+
+    def find_subgraph_containing(v):
+      return [x for x in connected_subgraphs if v in x][0]
+
+    def merge_subgraphs_that_contains(u, v):
+      subgraph_v = find_subgraph_containing(v)
+      new_connected_subgraphs = [x for x in connected_subgraphs if v not in x]
+      new_connected_subgraphs = [subgraph_v.union(x) if u in x else x for x in new_connected_subgraphs]
+      return new_connected_subgraphs
+
+    sorted_edges = [ e for e in sorted(self.edges, key=lambda e: weigths[e[0] + e[1]]) ]
+
+    for u,v in sorted_edges:
+      if find_subgraph_containing(u) != find_subgraph_containing(v):
+        edges += [(u, v)]
+        connected_subgraphs = merge_subgraphs_that_contains(u, v)
+    
+    edges += [(y,x) for x,y in edges]
+
+    return Graph(self.nodes, edges)
+  
+  def toLaTeX(self):
+    zippedNodes = zip(self.nodes, generateNodeCoords(len(self.nodes)))
+    nodeString = '\n'.join(f'\\node ({name}) at ({x},{y}) {{${name}$}};' for name,(x,y) in zippedNodes)
+
+    if self.isUndirected():
+      edgeString = '\n'.join(f'\\draw ({x}) -- ({y});' for x,y in self.undirectedEdgeSet())
+    else:
+      edgeString = '\n'.join(
+             f'\\draw [-{{Latex[scale=1]}}, bend left=8] ({x}) to ({y});' if y != x and (y,x) in self.edges 
+        else f'\\draw [-{{Latex[scale=1]}}] ({x}) to [{generateLoopInOutAngle(x, self.nodes)},looseness=8] ({y});' if x == y
+        else f'\\draw [-{{Latex[scale=1]}}] ({x}) to ({y});'
+        for x,y in self.edges
+      )
+
+    return (nodeString, edgeString)
+
+  def toLaTeXWithWeights(self, weights):
+    zippedNodes = zip(self.nodes, generateNodeCoords(len(self.nodes)))
+    nodeString = '\n'.join(f'\\node ({name}) at ({x},{y}) {{${name}$}};' for name,(x,y) in zippedNodes)
+
+    if self.isUndirected():
+      edgeString = '\n'.join(f'\\draw ({x}) -- ({y}) node [midway, above, sloped] (Tx{x+y}) {{{weights[x+y]}}};' for x,y in self.undirectedEdgeSet())
+
+    return (nodeString, edgeString)
+
+
+def generateLoopInOutAngle(node, nodes):
+  baseAngle = 360 / len(nodes)
+  nodeNum = [i for i,n in enumerate(nodes) if n == node][0]
+  angle = nodeNum * baseAngle + 90
+  return f'out={angle + 15},in={angle - 15}'
+
+
+def generateNodeCoords(n):
+  vectorLength = n / 2
+  degreeToTurn = (2 * pi) / n
+
+  
+  nodeCoords = [(0, vectorLength)]
+  for node in range(n):
+    prev_x = nodeCoords[-1][0]
+    prev_y = nodeCoords[-1][1]
+
+    nodeCoords.append((
+      round(cos(degreeToTurn) * prev_x - sin(degreeToTurn) * prev_y, 5),
+      round(sin(degreeToTurn) * prev_x + cos(degreeToTurn) * prev_y, 5)
+    ))
+
+  return nodeCoords
+
+def extractWeights(string):
+  weights = dict()
+  lines = string.split('\n')
+  for i in range(4, len(lines)):
+    edge, weight = lines[i].split(' ')
+    weights[edge] = int(weight)
+    weights[edge[1] + edge[0]] = int(weight)
+    lines[i] = edge
+  return ('\n'.join(lines), weights)
+
+def processFileContent(raw):
+  lines = raw.split('\n')
+  lines.pop(1)
+  outputType = lines.pop(0)
+
+  if lines[0] == 'kruskals':
+    lines[0] = 'undirected'
+    string, weights = extractWeights('\n'.join(lines))
+    graph1 = Graph.fromString(string)
+    graph2 = graph1.getKruskalsSpanningTree(weights)
+    return replaceContent(
+      (graph1.toLaTeXWithWeights(weights), graph2.toLaTeXWithWeights(weights)),
+      'Kruskals',
+      replaceF = lambda temp, cont: 
+        temp.replace('%NODES1', cont[0][0])
+            .replace('%EDGES1', cont[0][1])
+            .replace('%NODES2', cont[1][0])
+            .replace('%EDGES2', cont[1][1])
+    )
+
+
+  graph = Graph.fromString('\n'.join(lines))
+
+  print(graph)
+  print(graph.toMatrix())
+
+  if outputType == 'toGraph':
+    content = graph.toLaTeX()
+    return replaceContent(
+      content,
+      'Graph',
+      replaceF = lambda temp, cont: temp.replace('%NODES', cont[0]).replace('%EDGES', cont[1])
+    )
+  else:
+    content = graph.toMatrix().toLaTeX()
+    return replaceContent(content, 'Matrix')
+
+if __name__ == '__main__':
+  g = Graph.fromString('complete\n\n6')
+  print(g)
+
+  import random
+
+  d = dict()
+  for e in g.edges:
+    d[str(e)] = random.randint(0, 10)
+
+  print(g.getKruskalsSpanningTree(d))

exam/python/InclusionExclusion.py

@@ -0,0 +1,46 @@
+from itertools import combinations
+
+def latexifyCondition(condition):
+  return condition[0] if condition[1] else f'\\overline{{{condition[0]}}}'
+
+def latexify(listOfConditions): # [(str,bool)]
+  lines = []
+  for n in range(1, len(listOfConditions) + 1):
+    line = []
+    for x in combinations(listOfConditions, n):
+      line.append(''.join(latexifyCondition(c) for c in x))
+    lines.append(line)
+  
+  linestrs = []
+  for line in lines:
+    linestr = ' + '.join(f'N({x})' for x in line)
+    if len(line) > 1:
+      linestr = f'\\left[ {linestr} \\right]'
+    linestrs.append(linestr)
+
+  b = False
+  result = '\\begin{align*}\nN'
+  for l in linestrs:
+    result += ' &+ ' if b else ' &- '
+    result += l + ' \\\\\n'
+    b = not b
+  result += '\\end{align*}' 
+  return result
+
+def parseInput(string):
+  result = []
+  for x in string.split(' '):
+    if x.startswith('!'):
+      result.append((x[1:], False))
+    else:
+      result.append((x, True))
+  return result
+
+def processFileContent(raw):
+  listOfConditions = parseInput(raw)
+  content = latexify(listOfConditions)
+  return content
+
+if __name__ == '__main__':
+  pass
+  

exam/python/Powerset.py

@@ -0,0 +1,64 @@
+from itertools import combinations
+
+from common import replaceContent
+
+class Set:
+  def __init__(self, elements):
+    self.elements = set(elements)
+
+  def __str__(self):
+    if len(self) == 0: return "\\emptyset"
+    return f"\\{{ {', '.join(sorted(self.elements))} \\}}"
+  
+  def __iter__(self):
+    return list(sorted(self.elements))
+
+  def __len__(self):
+    return len(self.elements)
+  
+  def __gt__(self, value):
+    if len(self) != len(value):
+      return len(self) > len(value)
+    return self.elements > value.elements
+
+  def __ge__(self, value):
+    return self > value
+
+  def __lt__(self, value):
+    return not self > value
+
+  def __le__(self, value):
+    return self < value
+  
+  @classmethod
+  def fromString(cls, string):
+    return cls(string.split(' '))
+
+  def cardinality(self):
+    return len(self)
+  
+  def powerset(self):
+    powerset = []
+    for i in range(len(self) + 1):
+      for subset in combinations(self.elements, i):
+        powerset.append(Set(list(subset)))
+    return Set(powerset)
+
+  def to_vertical_latex(self):
+    column = []
+    for e in sorted(self.elements):
+      column.append(str(e) + ' \\\\')
+    return '\\{\n' + '\n'.join(column) + '\n\\}'
+
+
+def processFileContent(raw):
+  s = Set.fromString(raw)
+  content = s.powerset().to_vertical_latex()
+
+  return replaceContent(content, 'Powerset')
+
+#TODO: make process input func
+
+if __name__ == "__main__":
+  print(Set(['a', 'b', 'c']).powerset().to_vertical_latex())
+  # print(a for a in Set(['A', 'B', 'C']).powerset())

exam/python/Python.py

@@ -0,0 +1,26 @@
+import tempfile
+import subprocess
+import os
+import sys
+
+from common import replaceContent
+
+def makeTmpFile(content):
+  fd, path = tempfile.mkstemp()
+  while ('_' in path):
+    fd, path = tempfile.mkstemp()
+  with os.fdopen(fd, 'w') as tmp:
+    tmp.write(content)
+  return path
+
+def grabOutput(path):
+  return subprocess.check_output(['python', path]).decode(sys.stdout.encoding)
+
+def processFileContent(content):
+  path = makeTmpFile(content)
+  output = grabOutput(path)
+  return replaceContent(
+    (path, output),
+    'Python',
+    lambda temp, cont: temp.replace('%CODEFILE', cont[0]).replace('%OUTPUT', cont[1])
+  )

exam/python/Relations.py

@@ -0,0 +1,298 @@
+from sys import argv
+from pathlib import Path
+
+from common import printc, printerr, replaceContent
+import Graph
+
+# Increase if hasse diagram becomes too clobbered
+
+def pairToString(pair):
+  if str(pair[0]).isdigit() or str(pair[1]).isdigit():
+    return f'({pair[0]},{pair[1]})'
+  else:
+    return pair[0] + pair[1]
+
+def stringToPair(string):
+  if string[0] == '(':
+    return tuple([string.split(',')[0][1:], string.split(',')[0][:-1]])
+  else:
+    return tuple(list(string))
+
+def textLatex(string):
+  return '\\text{' + string + '}'
+
+def mathModeListLatex(elements):
+  if len(elements) > 7 or len(elements) and max(len(str(e)) for e in elements) > 10:
+    return '\\begin{gather*}\n' \
+         + ' \\\\\n'.join(elements) + '\n' \
+         + '\\end{gather*}'
+  else:
+    return f'\\[ {", ".join(elements)} \\]'
+
+
+
+class Relation:
+  def __init__(self, pairs): # pair = (str,str)
+    self.pairs = set(pairs)
+  
+  def __str__(self):
+    return f'\\{{ {", ".join(x + y for x,y in self.pairs)} \}}'
+
+  @classmethod
+  def fromString(cls, string):
+    relations = (stringToPair(x) for x in string.split(' '))
+    return cls(relations)
+
+  @classmethod
+  def fromDivisibilityPosetTo(cls, n):
+    pairs = set()
+    for dst in range(n):
+      pairs.add((dst, dst))
+      for src in range(1, dst):
+        if dst % src == 0:
+          pairs.add((src, dst))
+    return cls(pairs)
+
+
+  def isReflexive(self, verbose=False):
+    elements = set(list(sum(self.pairs, ())))
+    result = all((x,x) in self.pairs for x in elements)
+
+    if not result:
+      printc('Not reflexive, missing following pairs:', color='green')
+      missingPairs = [(x,x) for x in elements if (x,x) not in self.pairs]
+      print(f'\\[ {", ".join(pairToString(p) for p in missingPairs)} \\]')
+      if verbose:
+        return (False, missingPairs)
+
+    if verbose:
+      return (True, [(x,x) for x in elements if (x,x) in self.pairs])
+    
+    return result
+
+  def isSymmetric(self, verbose=False):
+    result = all((y,x) in self.pairs for x,y in self.pairs)
+
+    if not result:
+      printc('Not symmetric, missing following pairs:', color='green')
+      missingPairs = [(x,y) for x,y in self.pairs if (y,x) not in self.pairs]
+      print(f'\\[ {", ".join(pairToString(p) for p in missingPairs)} \\]')
+      if verbose:
+        return (False, missingPairs)
+      
+    if verbose:
+      return (True, [((x,y), (y,x)) for x,y in self.pairs if (y,x) in self.pairs and x < y])
+
+    return result
+
+  def isAntiSymmetric(self, verbose=False):
+    result = not any((y,x) in self.pairs and y != x for x,y in self.pairs)
+
+    if not result:
+      printc('Not antisymmetric, following pairs are symmetric:', color='green')
+      symmetricPairs = [((x,y), (y,x)) for x,y in self.pairs if (y,x) in self.pairs and y > x]
+      print(f'\\[ {", ".join(f"""{pairToString(p)}{textLatex(" and ")}{pairToString(q)}""" for p,q in symmetricPairs)} \\]')
+      if verbose:
+        return (False, symmetricPairs)
+
+    if verbose:
+      return (True, [])
+
+    return result
+
+  def isTransitive(self, verbose=False):
+    result = True
+    transitivePairs = []
+    nonTransitivePairs = []
+
+    for x,y in self.pairs:
+      for z,w in self.pairs:
+        if not (y != z or ((x,w) in self.pairs)):
+          nonTransitivePairs.append(((x,y), (z,w)))
+          result = False
+        elif (y == z and x != y != w and ((x,w) in self.pairs)):
+          transitivePairs.append(((x,y), (z,w)))
+    
+    if not result:
+      printc('Not transitive, following pairs are missing its transitive counterpart:', color='green')
+      print(f'\\[ {", ".join(f"""{pairToString(p)}{textLatex(" and ")}{pairToString(q)}{textLatex(" without ")}{pairToString((p[0], q[1]))}""" for p,q in nonTransitivePairs)} \\]')
+      if verbose:
+        return (False, nonTransitivePairs)
+    
+    if verbose:
+      return (True, transitivePairs)
+
+    return result
+
+  def isEquivalenceRelation(self, verbose=False):
+
+    if verbose:
+      isReflexive,  reflexivePairs  = self.isReflexive(verbose=True)
+      isSymmetric,  symmetricPairs  = self.isSymmetric(verbose=True)
+      isTransitive, transitivePairs = self.isTransitive(verbose=True)
+
+      if not isReflexive:
+        return 'The relation is not an equivalence relation, because it is not reflexive.'
+        + ' The following elements should be related:\n\n'
+        + f'\\[ {", ".join(pairToString(p) for p in reflexivePairs)} \\]'
+      if not isSymmetric:
+        return 'The relation is not an equivalence relation, because it is not symmetric.'
+        + ' It is missing the following symmetric pairs of relations\n\n'
+        + f'\\[ {", ".join(f"""{pairToString(p)}{textLatex(" and ")}{pairToString(q)}""" for p,q in symmetricPairs)} \\]'
+      if not isTransitive:
+        return 'The relation is not an equivalence relation, because it is not transitive.'
+        + ' The following pairs of relations are missing its transitive counterpart\n\n'
+        + f'\\[ {", ".join(f"""{pairToString(p)}{textLatex(" and ")}{pairToString(q)}{textLatex(" without ")}{pairToString((p[0], q[1]))}""" for p,q in transitivePairs)} \\]'
+      
+
+      rxStr = mathModeListLatex([pairToString(p) for p in reflexivePairs])
+      smStr = mathModeListLatex([f"""{pairToString(p)}{textLatex(" and ")}{pairToString(q)}""" for p,q in symmetricPairs])
+      trStr = mathModeListLatex([f"""{pairToString(p)}{textLatex(" and ")}{pairToString(q)}{textLatex(" with ")}{pairToString((p[0], q[1]))}""" for p,q in transitivePairs])
+      
+      return replaceContent(
+        (rxStr, smStr, trStr),
+        'Relations/EquivalenceProof',
+        lambda temp, cont: temp.replace('%REFLEXIVE', cont[0]).replace('%SYMMETRIC', cont[1]).replace('%TRANSITIVE', cont[2])
+        )
+
+    return self.isReflexive() and self.isSymmetric() and self.isTransitive()
+
+  def isPartialOrder(self, verbose=False):
+
+    result = self.isReflexive() and self.isAntiSymmetric() and self.isTransitive()
+
+    if result:
+      hasse= self.getHassePairs(checkIfPartialOrder=False)
+      min_el = set(a for a,b in hasse if a not in list(zip(*hasse))[1])
+      printc(f"Minimal elements: $\{{ {', '.join(str(e) for e in min_el)} \}}$ \\\\")
+
+      max_el = set(v for k,v in hasse if v not in (x for x,_ in hasse))
+      printc(f"Maximal elements: $\{{ {', '.join(str(e) for e in max_el)} \}}$" )
+
+    if verbose:
+      isReflexive,     reflexivePairs     = self.isReflexive(verbose=True)
+      isAntiSymmetric, antiSymmetricPairs = self.isAntiSymmetric(verbose=True)
+      isTransitive,    transitivePairs    = self.isTransitive(verbose=True)
+
+      if not isReflexive:
+        return 'The relation is not a partial order, because it is not reflexive.'
+        + ' The following elements should be related:\n\n'
+        + f'\\[ {", ".join(pairToString(p) for p in reflexivePairs)} \\]'
+      if not isAntiSymmetric:
+        return 'The relation is not a partial order, because it is not antisymmetric.'
+        + ' The following relations are symmetric\n\n'
+        + f'\\[ {", ".join(f"""{pairToString(p)}{textLatex(" and ")}{pairToString(q)}""" for p,q in antiSymmetricPairs)} \\]'
+      if not isTransitive:
+        return 'The relation is not a partial order, because it is not transitive.'
+        + ' The following pairs of relations are missing its transitive counterpart\n\n'
+        + f'\\[ {", ".join(f"""{pairToString(p)}{textLatex(" and ")}{pairToString(q)}{textLatex(" without ")}{pairToString((p[0], q[1]))}""" for p,q in transitivePairs)} \\]'
+      
+      rxStr = mathModeListLatex([pairToString(p) for p in reflexivePairs])
+      trStr = mathModeListLatex([f"""{pairToString(p)}{textLatex(" and ")}{pairToString(q)}{textLatex(" with ")}{pairToString((p[0], q[1]))}""" for p,q in transitivePairs])
+      
+      return replaceContent(
+        (rxStr, trStr),
+        'Relations/PosetProof',
+        lambda temp, cont: temp.replace('%REFLEXIVE', cont[0]).replace('%TRANSITIVE', cont[1])
+        )
+
+    return result
+
+  def getHassePairs(self, checkIfPartialOrder=True):
+    if checkIfPartialOrder and not self.isPartialOrder():
+      printerr('This is not a partial order')
+      return
+    
+    nonReflexivePairs = set((x,y) for x,y in self.pairs if x != y)
+
+    hassePairs = set()
+    for x1, y1 in nonReflexivePairs:
+      for x2, y2 in nonReflexivePairs:
+        if y1 == x2:
+          hassePairs.add((x1, y2))
+    return nonReflexivePairs - hassePairs
+  
+  def latexifyHasseDiagram(self):
+    hasse = self.getHassePairs()
+    keys = set(item for tup in hasse for item in tup)
+    y_pos = dict.fromkeys(keys, 0)
+
+    i = 0
+    while len(next_row := [val for key,val in hasse if key in [x for x,y in y_pos.items() if y == i] ]) != 0:
+      for item in next_row:
+        y_pos[item] = i + 1
+      i += 1
+
+    inv_ypos = dict()
+    for key in set(y_pos.values()):
+      inv_ypos[key] = [x for x,y in y_pos.items() if y == key]
+
+    output = []
+  
+    for y in inv_ypos.keys():
+      for i, n in enumerate(inv_ypos[y]):
+        output.append(f'\\node ({n}) at ({i - len(inv_ypos[y])/2}, {y * 0.5 * (len(hasse) ** 0.4)}) {{${n}$}};')
+  
+    output.append('')
+
+    for x,y in hasse:
+      output.append(f'\\draw ({x}) -- ({y});')
+
+    return '\n'.join(output)
+
+  def latexifyGraph(self):
+    if self.isEquivalenceRelation():
+      graphType = 'undirected'
+      pairs = [(x,y) for x,y in self.pairs if x != y]
+    else:
+      graphType = 'directed'
+      pairs = self.pairs
+    
+    nodes = set()
+    for x,y in pairs:
+      nodes.add(x)
+      nodes.add(y)
+    
+    edges = "\n".join(pairToString(p) for p in pairs)
+    
+    processingString = f'toGraph\n\n{graphType}\n\n{ " ".join(nodes) }\n\n{edges}'
+    return Graph.processFileContent(processingString)
+
+
+def processFileContent(raw):
+  outputType, inp =  raw.split('\n\n')
+
+  if inp.startswith('divisibilityPosetTo'):
+    n = int(inp.split(' ')[1])
+    relation = Relation.fromDivisibilityPosetTo(n)
+  else: 
+    relation = Relation.fromString(inp)
+
+  if outputType == 'proveEquivalence':
+    content = relation.isEquivalenceRelation(verbose=True)
+    return content
+
+  elif outputType == 'provePoset':
+    content = relation.isPartialOrder(verbose=True)
+    return content
+
+  elif outputType == 'hasseDiagram':
+    content = relation.latexifyHasseDiagram()
+    return replaceContent(content, 'Relations/Hasse')
+
+  elif outputType == 'graph':
+    content = relation.latexifyGraph()
+    return content 
+
+if __name__ == '__main__':
+  pass
+  relations = [(x,y) for x in range(-5, 5) for y in range(-5, 5)]
+  relations = [(chr(70+x), chr(70+y)) for x,y in relations if x*y >= 0]
+  for x in range(-5 ,5):
+    print(str(x) + ' - '+ chr(70 + x))
+  print(Relation(relations).isTransitive())
+  # inp = 'AA BB CC DD AB ACj
+  # relations = [stringToPair(p) for p in inp.split(' ')]
+  # # print(Relation(relations).isEquivalenceRelation())
+  # print(Relation(relations).isPartialOrder())
+  # print(Relation.fromDivisibilityPosetTo(30).isPartialOrder())

exam/python/Truthtable.py

@@ -0,0 +1,111 @@
+from sys import argv
+from pathlib import Path
+
+from common import printerr, replaceContent
+
+try:
+  from tabulate import tabulate
+except:
+  printerr('Couldn\'t find tabulate. Do you have it installed?')
+
+
+def parseExpressionList(inputData):
+  return [e.strip() for e in inputData.split(',')]
+
+
+class OverloadedBool:
+  """Overloads the bool in order to make Implies and Iff functions"""
+
+  def __init__(self, val):
+    self.val = val
+  
+  def __bool__(self):
+    val = self.val
+    while(type(val) is OverloadedBool):
+      val = val.val
+    return val
+
+  def __str__(self):
+    return str(self.val)
+
+  def __add__(self, bool2):
+    """ Implies """
+    return OverloadedBool(not self.val or bool2)
+
+  def __sub__(self, bool2):
+    """ Iff """
+    return OverloadedBool((not self.val or bool2) and (not bool2 or self.val))
+
+def flattenImpliesIff(exps):
+  return [exp.replace('implies', '+').replace('iff', '-').replace('E', '') for exp in exps]
+
+def generateTruthTable(exps):
+
+  exps = flattenImpliesIff(exps)
+
+  boolvars = [e for e in exps if len(e) == 1]
+
+  truthtable = []
+
+  for x in reversed(range(2 ** len(boolvars))):
+    for i,digit in enumerate('{0:b}'.format(x).zfill(len(boolvars))):
+      exec(f'{boolvars[i]} = OverloadedBool({digit == "1"})', globals())
+    
+    def calculateGridLine():
+      line = []
+      for exp in exps:
+        exec(f'line.append(({exp}))')
+      return line
+    
+    truthtable.append(calculateGridLine())
+  
+  return truthtable
+    
+  
+def latexify(exps, truthtable):
+
+  latex_expressions = \
+    [ (
+        'E' in exp,
+        exp
+          .replace('not', '\\neg')
+          .replace('and', '\\wedge')
+          .replace('or', '\\vee')
+          .replace('implies', '\\Rightarrow')
+          .replace('iff', '\\Leftrightarrow')
+          .replace('E', ''
+          .strip())
+      )
+        for exp in exps]
+
+  return \
+  """
+  \\begin{{truthtable}}
+    {{{}}}
+    {{{}}}
+{}
+  \\end{{truthtable}}
+  """.format(
+    '|'.join('e' if e else 'c' for e,_ in latex_expressions),
+    ' & '.join(f'${exp}$' for _,exp in latex_expressions),
+    '\n'.join('    ' + ' & '.join('\\T' if b else '\\F' for b in line) + ' \\\\' for line in truthtable)
+  )
+
+def printTruthtable(exps, truthtable):
+  stringTable = [ ['\033[32mT\033[0m ' if b else '\033[31mF\033[0m' for b in line] for line in truthtable]
+  try:
+    print(tabulate(stringTable, headers=exps))
+  except:
+    pass
+
+def processFileContent(raw):
+  exps = parseExpressionList(raw)
+  truthtable = generateTruthTable(exps)
+
+  printTruthtable(exps, generateTruthTable(exps))
+
+  content = latexify(exps, truthtable)
+  return replaceContent(content, 'Truthtable')
+
+if __name__ == '__main__':
+  pass

exam/python/common.py

@@ -0,0 +1,21 @@
+from pathlib import Path
+
+clear = '\033[0m'
+colors = {
+  'red':    '\033[31m',
+  'green':  '\033[32m',
+  'yellow': '\033[33m',
+  'blue':   '\033[34m',
+  'purple': '\033[35m',
+  'cyan':   '\033[36m',
+}
+
+def printc(text, color='blue'):  
+  print(f'{colors[color]}{text}{clear}')
+
+def printerr(text):  
+  print(f'\033[31;5m[ERROR] {text}{clear}')
+
+def replaceContent(content, template, replaceF = lambda temp, cont: temp.replace("%CONTENT", cont)):
+  with open(str(Path(__file__).parent.absolute()) + f'/tex_templates/{template}.tex') as template:
+    return replaceF(template.read(), content)

exam/python/run.py

@@ -0,0 +1,48 @@
+from sys import argv
+from pathlib import Path
+
+import FSA
+import Graph
+import Truthtable
+import Relations
+import InclusionExclusion
+import Python
+
+from common import printerr
+
+def fetchContentType(content):
+  new_content = content.split('\n')
+  contentType = new_content.pop(0)[2:]
+  return (contentType, '\n'.join(new_content))
+
+def processContent(content):
+  contentType, content =  fetchContentType(content)
+
+  if contentType == 'FSA':
+    result = FSA.processFileContent(content)
+  elif contentType == 'Graph':
+    result = Graph.processFileContent('toGraph\n\n' + content)
+  elif contentType == 'Matrix':
+    result = Graph.processFileContent('toMatrix\n\n' + content)
+  elif contentType == 'Relations':
+    result = Relations.processFileContent(content)
+  elif contentType == 'Truthtable':
+    result = Truthtable.processFileContent(content)
+  elif contentType == 'InclusionExclusion':
+    result = InclusionExclusion.processFileContent(content)
+  elif contentType == 'Python':
+    result = Python.processFileContent(content)
+  else:
+    printerr('DIDN\'T RECOGNIZE FILE TYPE')
+    exit(1)
+
+  return result
+    
+if __name__ == '__main__':
+  filename = argv[1]
+
+  with open(filename) as file:
+    content = processContent(file.read())
+
+  with open(argv[2], 'w') as destination_file:
+    destination_file.write(content)

exam/python/tex_templates/FSA.tex

@@ -0,0 +1,12 @@
+\begin{tikzpicture}
+  \tikzset{
+    ->, % makes the edges directed
+    >=Stealth, % makes the arrow heads bold
+    node distance=5cm, % specifies the minimum distance between two nodes. Change if necessary.
+    every state/.style={thick, fill=white}, % sets the properties for each ’state’ node
+    initial text=$ $, % sets the text that appears on the start arrow
+  }
+
+%CONTENT
+
+\end{tikzpicture}

exam/python/tex_templates/Graph.tex

@@ -0,0 +1,13 @@
+\newcommand{\arrow}[2]{\path [-{Latex[scale=1]}] (#1) edge (#2);}
+
+\begin{tikzpicture}
+
+  \begin{scope}[every node/.style={shape=circle, fill=white, draw, inner sep=2pt}]
+    %NODES
+  \end{scope}
+
+  \begin{scope}[every draw/.style={}]
+    %EDGES
+  \end{scope}
+
+\end{tikzpicture}

exam/python/tex_templates/Kruskals.tex

@@ -0,0 +1,37 @@
+\begin{mgraphbox}[width=\linewidth] 
+  \begin{figure}[H]
+    \begin{center}
+      \begin{tikzpicture}
+      
+        \begin{scope}[every node/.style={shape=circle, fill=white, draw, inner sep=2pt}]
+          %NODES1
+        \end{scope}
+      
+        \begin{scope}[every draw/.style={}]
+          %EDGES1
+        \end{scope}
+      
+      \end{tikzpicture}
+    \end{center}
+  \end{figure}
+\end{mgraphbox}
+
+Minimal spanning tree:
+
+\begin{mgraphbox}[width=\linewidth] 
+  \begin{figure}[H]
+    \begin{center}
+      \begin{tikzpicture}
+      
+        \begin{scope}[every node/.style={shape=circle, fill=white, draw, inner sep=2pt}]
+          %NODES2
+        \end{scope}
+      
+        \begin{scope}[every draw/.style={}]
+          %EDGES2
+        \end{scope}
+      
+      \end{tikzpicture}
+    \end{center}
+  \end{figure}
+\end{mgraphbox}

exam/python/tex_templates/Matrix.tex

@@ -0,0 +1,5 @@
+\begin{figure}[H]
+  \[
+    %CONTENT
+  \]
+\end{figure}

exam/python/tex_templates/Python.tex

@@ -0,0 +1,8 @@
+
+\codeFile{%CODEFILE}{python}
+
+Output:
+
+\begin{lstlisting}[breaklines=true, basicstyle=\small]
+%OUTPUT
+\end{lstlisting}

exam/python/tex_templates/Relations/EquivalenceProof.tex

@@ -0,0 +1,22 @@
+
+In order for this relation to be an equivalence equation, it has to be reflexive, symmetric and transitive.
+
+\textbf{Reflexive:}
+
+All elements are related to themself
+
+%REFLEXIVE
+
+\textbf{Symmetric:}
+
+All relations has its symmetric counterpart
+
+%SYMMETRIC
+
+\textbf{Transitive:}
+
+All pair of relations where $xRy$ and $yRz$ has its transitive counterpart
+
+%TRANSITIVE
+
+Hence the relation is an equivalence relation

exam/python/tex_templates/Relations/Hasse.tex

@@ -0,0 +1,6 @@
+\begin{tikzpicture}
+  \tikzset{every node/.style={shape=circle,draw,fill=white,inner sep=2pt}}
+
+%CONTENT
+
+\end{tikzpicture}

exam/python/tex_templates/Relations/PosetProof.tex

@@ -0,0 +1,22 @@
+
+In order for this relation to be a partial order, it has to be reflexive, antisymmetric and transitive.
+
+\textbf{Reflexive:}
+
+All elements are related to themself
+
+%REFLEXIVE
+
+\textbf{Antisymmetric:}
+
+No relation have a symmetric counterpart \\
+
+(Listing the ones that don't have a symmetric counterpart would just be listing the whole set) \\
+
+\textbf{Transitive:}
+
+All pair of relations where $xRy$ and $yRz$ has its transitive counterpart
+
+%TRANSITIVE
+
+Hence the relation is a partial order

exam/python/tex_templates/Truthtable.tex

@@ -0,0 +1 @@
+%CONTENT