handouts/Advanced/Size of Sets/parts/6 uncountable.tex

\section*{Uncountable Sets}

\problem{}<binarystrings>
Let $B$ be the set of infinite binary strings. Show that $B$ is not countable. \par
Here's how you should start:

\vspace{2mm}

Assume we have some enumeration $n(b)$ that assigns a natural number to every $b \in B$.\par
Now, arrange the elements of $B$ in a table, in order of increasing index: \par

\begin{center}
\begin{tikzpicture}[scale=0.5]
	\node at (0, 0) {$n(b)$};
	\node at (4.5, 0) {digits of $b$};

	% Vertical lines
	\draw (1, 0.5) -- (1, -8);
	\draw (-1, 0.5) -- (-1, -8);

	% Horizontal title
	\draw (-1, -0.5) -- (8, -0.5);

	\foreach \i/\j in {
		0/1010100110011110,
		1/0101101011010010,
		2/1101011001010101,
		3/0001100101010110,
		4/1101011101000110,
		5/1101100010100111,
		6/1011001101001010%
	} {
		\node at (0, -\i-1) {$\i$};
		\draw (-1, -1.5 - \i) -- (8, -1.5 - \i);
		\node[anchor=west] at (1, -\i-1) {\texttt{\j}...};
	}

	\node at (0, -7-1) {...};
	\node at (4.5, -7-1) {.....};
\end{tikzpicture}
\end{center}


First, convince yourself that if $B$ is countable, this table will contain every element of $B$, \par
then construct a new element of $B$ that is guaranteed to \textit{not} be in this table.\par
\hint{What should the first digit of this new string be? What should its second digit be? \\
Or, even better, what \textit{shouldn't} they be?}
\vfill


\problem{}
Using \ref{binarystrings}, show that $\mathcal{P}(\mathbb{N})$ is uncountable.
\vfill
\pagebreak

\problem{}
Show that $\mathbb{R}$ is not countable. \par
\hint{Earlier in this handout, we defined a real number as \say{a decimal, finite or infinite.}}
\vfill

\problem{}
Find a bijection from $(0, 1)$ to $\mathbb{R}$.\par
\hint{$(0, 1)$ is the set of all real numbers between 0 and 1, not including either endpoint.}
\vspace{2mm}
This problem brings us to the surprising conclusion that there are \say{just as many} numbers between 0 and 1 as there are in the entire real line.

\vfill

\problem{}
Find a bijection between $(0, 1)$ and $[0, 1]$. \par
\hint{$[0, 1]$ is the set of all real numbers between 0 and 1, including both endpoints.}
\vfill

\pagebreak
Set edits 2023-07-20 21:19:17 -07:00			`\section*{Uncountable Sets}`

			`\problem{}<binarystrings>`
			`Let $B$ be the set of infinite binary strings. Show that $B$ is not countable. \par`
			`Here's how you should start:`

			`\vspace{2mm}`

			`Assume we have some enumeration $n(b)$ that assigns a natural number to every $b \in B$.\par`
			`Now, arrange the elements of $B$ in a table, in order of increasing index: \par`

			`\begin{center}`
			`\begin{tikzpicture}[scale=0.5]`
			`\node at (0, 0) {$n(b)$};`
			`\node at (4.5, 0) {digits of $b$};`

			`% Vertical lines`
			`\draw (1, 0.5) -- (1, -8);`
			`\draw (-1, 0.5) -- (-1, -8);`

			`% Horizontal title`
			`\draw (-1, -0.5) -- (8, -0.5);`

			`\foreach \i/\j in {`
			`0/1010100110011110,`
			`1/0101101011010010,`
			`2/1101011001010101,`
			`3/0001100101010110,`
			`4/1101011101000110,`
			`5/1101100010100111,`
			`6/1011001101001010%`
			`} {`
			`\node at (0, -\i-1) {$\i$};`
			`\draw (-1, -1.5 - \i) -- (8, -1.5 - \i);`
			`\node[anchor=west] at (1, -\i-1) {\texttt{\j}...};`
			`}`

			`\node at (0, -7-1) {...};`
			`\node at (4.5, -7-1) {.....};`
			`\end{tikzpicture}`
			`\end{center}`


			`First, convince yourself that if $B$ is countable, this table will contain every element of $B$, \par`
			`then construct a new element of $B$ that is guaranteed to \textit{not} be in this table.\par`
			`\hint{What should the first digit of this new string be? What should its second digit be? \\`
			`Or, even better, what \textit{shouldn't} they be?}`
			`\vfill`


			`\problem{}`
			`Using \ref{binarystrings}, show that $\mathcal{P}(\mathbb{N})$ is uncountable.`
			`\vfill`
			`\pagebreak`

			`\problem{}`
			`Show that $\mathbb{R}$ is not countable. \par`
			`\hint{Earlier in this handout, we defined a real number as \say{a decimal, finite or infinite.}}`
			`\vfill`

			`\problem{}`
			`Find a bijection from $(0, 1)$ to $\mathbb{R}$.\par`
			`\hint{$(0, 1)$ is the set of all real numbers between 0 and 1, not including either endpoint.}`
			`\vspace{2mm}`
			`This problem brings us to the surprising conclusion that there are \say{just as many} numbers between 0 and 1 as there are in the entire real line.`

			`\vfill`

			`\problem{}`
			`Find a bijection between $(0, 1)$ and $[0, 1]$. \par`
			`\hint{$[0, 1]$ is the set of all real numbers between 0 and 1, including both endpoints.}`
			`\vfill`

			`\pagebreak`