65 lines
2.6 KiB
TeX
65 lines
2.6 KiB
TeX
\section{Really Big Sets}
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\definition{}<infiniteset>
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%We say a set $S$ is \textit{finite} if there exists a bijection from $S$ to $\{1, 2, 3, ..., n\}$ for some integer $n$. \par
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%In other words
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We say set is \textit{finite} if its elements can be consecutively numbered from 1 to some maximum index $n$. \par
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Informally, we could say that a set is finite if it \say{ends.} \par
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For example, the set $\{\star, \diamond, \heartsuit\}$ is (obviously) finite. We can number its elements 1, 2, and 3.
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\vspace{2mm}
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If a set is not finite, we say it is \textit{infinite}.
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\vspace{2mm}
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\problem{}
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Which of the following sets are finite?
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\begin{itemize}
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\item $\{\texttt{A}, \texttt{B}, ..., \texttt{Z}\}$
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\item $\{ \text{all rats in Europe} \}$
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\item $\{ \text{all positive numbers} \}$
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\item $\{ \mathbb{ \text{all rational numbers} } \}$
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\end{itemize}
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\vfill
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\generic{Remark:}
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Note that our definition of \say{infinite-ness} is based on a property of the set. Saying \say{a set is infinite} is much like saying \say{a cat is black} or \say{a number is even}. There are many different kinds of black cats, and there are many different even numbers --- some large, some small. \par
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\vspace{2mm}
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In general, \textbf{$\infty$ is not a well-defined mathematical object\footnotemark{}}. Infinity is not a number. There isn't a single \say{infinity.} Infinity is the the general concept of endlessness, used in many different contexts.
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\vspace{2mm}
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%The Russian language (as well as many others, no doubt) captures this well: \say{infinity} in Russian is \say{бес-конеч-ность}, which can be literally translated as \say{without-end-ness}.
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\footnotetext{
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In most cases. There are exceptions, but you need not worry about them for now. If you're curious, you may ask an instructor to explain. There's also a chance we'll see a well-defined \say{infinity} in a handout later this quarter.
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}
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\vfill
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\pagebreak
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%Say we have two finite sets $A$ and $B$. Comparing the sizes of these is fairly easy: all we need to do is count the elements %in each. It is not difficult to see that $\{1, 2, 3\}$ is bigger than $\{1, 2\}$.
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%
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%\vspace{2mm}
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%
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%We could extend this notion of \say{size} to infinite sets. \par
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%For example, consider $\mathbb{R}$ and $\mathbb{Z}$. Intuitively, we'd expect $\mathbb{R}$ to be larger, \par
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%since there are many elements in $\mathbb{R}$ between every two elements in $\mathbb{Z}$.
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%
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%\vspace{1mm}
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%
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%We could also try to compare the sizes of $\mathbb{Q}$ and $\mathbb{Z}$. There are bIntuitively, we'd expect $\mathbb{R}$ to %be larger, \par
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%since there are many elements in $\mathbb{R}$ between every two elements in $\mathbb{Z}$.
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%
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%
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%\vfill
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%\pagebreak |