% Created 2023-04-23 Sun 13:45 % Intended LaTeX compiler: pdflatex \documentclass[11pt]{article} \usepackage[utf8]{inputenc} \usepackage[T1]{fontenc} \usepackage{graphicx} \usepackage{longtable} \usepackage{wrapfig} \usepackage{rotating} \usepackage[normalem]{ulem} \usepackage{amsmath} \usepackage{amssymb} \usepackage{capt-of} \usepackage{hyperref} \notindent \notag \usepackage{ dsfont } \usepackage{amsmath} \usepackage[a4paper,margin=1in,portrait]{geometry} \usepackage{polynom} \usepackage{wasysym} \author{Lizzy Hunt} \date{\today} \title{Assignment Twelve} \hypersetup{ pdfauthor={Lizzy Hunt}, pdftitle={Assignment Twelve}, pdfkeywords={}, pdfsubject={}, pdfcreator={Emacs 28.2 (Org mode 9.6.1)}, pdflang={English}} \begin{document} \maketitle \setlength\parindent{0pt} \section{Section 6.3} \label{sec:org86da123} \subsection{Question One} \label{sec:org600275c} \(n = cd\) with some \(1 < |c| < |n|\) and \(1 < |d| < |n|\) since \(n\) is composite, so \(c\) and \(d\) are not multiples of \(n\). Therefore as \(cd \in (n)\) but \(c \notin (n)\) and \(d \notin (n)\) then \((n)\) is not a prime ideal by definition. \subsection{Question Five} \label{sec:org37fce42} Both \(\mathds{Z}_6\) and \(\mathds{Z}_{12}\)'s maximal ideals are \((2)\) and \$(3) \subsection{Question Six} \label{sec:org18d9056} \subsubsection{a} \label{sec:org0890b14} The only maximal ideal of \(\mathds{Z}_8\) is \((2)\) since it is its prime divisor. Similarly, the only maximal ideal of \(\mathds{Z}_9\) is \((3)\). \subsubsection{b} \label{sec:org77d60ec} In \(\mathds{Z}_{10}\) the maximal ideals are \((2)\) and \((5)\), similarly for \(\mathds{Z}_{15}\): \((3)\) and \((5)\). \subsection{Question Eight} \label{sec:org38c7c8c} Consider \((2) \cap (3)\) which generates \((6)\), and is not prime in \(\mathds{Z}\); \(3 \cdot 2 \in (6)\) but \(3 \notin (6)\) and \(2 \notin (6)\). \end{document}