\section{Monotone Sequences}

\begin{definition}
	Let $X=(x_n)$ be a sequence of real numbers. We say that $X$ is \textbf{increasing} if it satisfies the inequalities
	\[x_1 \leq x_2 \leq \dots \leq x_n \leq x_{n+1} \leq \dots\]

	We say that $X$ is \textbf{decreasing} if it satisfies the inequalities
	\[x_1 \geq x_2 \geq \dots \geq x_n \geq x_{n+1} \geq \dots\]

	We say that $X$ is \textbf{monotone} if it is either increasing or decreasing.
\end{definition}

\begin{theorem}[\textbf{Monotone Convergence Theorem}]
	A monotone sequence of real numbers is convergent if and only if it is bounded. Further:
	\begin{enumerate}
		\item If $X=(x_n)$ is a bounded increasing sequence, then
		      \[\lim (x_n) = \sup \{x_n : n \in \N\}\]

		\item If $Y=(y_n)$ is a bounded decreasing sequence, then
		      \[\lim (y_n) = \inf \{y_n : n \in \N\}\]
	\end{enumerate}
\end{theorem}