bookshelf/Bookshelf/Real/Sequence/Geometric.tex

\documentclass{article}

\input{../../../preamble}

\newcommand{\link}[1]{\lean{../../..}
  {Bookshelf/Real/Sequence/Geometric}
  {Real.Geometric.#1}
  {Real.Geometric.#1}
}

\begin{document}

\section*{Sum of Geometric Series}%
\label{sec:sum-geometric-series}

Let $(a_i)_{i \geq 0}$ be a geometric sequence with common ratio $r \neq 1$.
Then for some $n \in \mathbb{N}$,
$$\sum_{i=0}^n a_i = \frac{a_0(1 - r^{n+1})}{1 - r}.$$

\begin{proof}

  \link{sum\_recursive\_closed}

\end{proof}

\end{document}
Further normalize links to Lean from TeX. 2023-05-06 18:34:05 +00:00			`\documentclass{article}`

Update doc generator to produce PDFs. 2023-05-07 21:57:40 +00:00			`\input{../../../preamble}`
Further normalize links to Lean from TeX. 2023-05-06 18:34:05 +00:00
Start working on Apostol exercises 1.7. 2023-05-03 19:09:58 +00:00			`\newcommand{\link}[1]{\lean{../../..}`
			`{Bookshelf/Real/Sequence/Geometric}`
			`{Real.Geometric.#1}`
			`{Real.Geometric.#1}`
			`}`
Further normalize links to Lean from TeX. 2023-05-06 18:34:05 +00:00
			`\begin{document}`

			`\section*{Sum of Geometric Series}%`
			`\label{sec:sum-geometric-series}`

			`Let $(a_i)_{i \geq 0}$ be a geometric sequence with common ratio $r \neq 1$.`
			`Then for some $n \in \mathbb{N}$,`
			`$$\sum_{i=0}^n a_i = \frac{a_0(1 - r^{n+1})}{1 - r}.$$`

			`\begin{proof}`

Start working on Apostol exercises 1.7. 2023-05-03 19:09:58 +00:00			`\link{sum\_recursive\_closed}`
Further normalize links to Lean from TeX. 2023-05-06 18:34:05 +00:00
			`\end{proof}`

			`\end{document}`