\documentclass[10pt,a4paper,twoside]{article}
\usepackage{amssymb}
\usepackage{amsmath}
\usepackage{geometry}
\usepackage{fancyhdr}
\usepackage{amsthm}
\usepackage{rotate}
\usepackage{graphicx}
%\usepackage{psfrag}
\usepackage[T1]{fontenc}
\usepackage{afterpage}  %
%\usepackage[mathlines]{lineno}
\usepackage{tcolorbox}
\usepackage{xcolor}
%\usepackage{draftwatermark}
%\SetWatermarkText{proof}
\usepackage{tikz}
\usepackage{linegoal}
\renewcommand{\thefootnote}{}
\usepackage{afterpage}  %
\usepackage{multirow}
\usepackage{ragged2e}


\theoremstyle{plain}
\newtheorem{theorem}{Theorem}[section]
\newtheorem{lemma}[theorem]{Lemma}
\newtheorem{proposition}[theorem]{Proposition}
\newtheorem{conjecture}[theorem]{Conjecture}
\newtheorem{corollary}[theorem]{Corollary}
\theoremstyle{definition}
\newtheorem{definition}[theorem]{Definition}
\newtheorem{example}[theorem]{Example}
\theoremstyle{remark}
\renewcommand{\qedsymbol}{$\blacksquare$}
\newtheorem{remark}{Remark}


%\textheight185mm
%\textwidth=24cm
%\def\t{\hspace{-6mm}{\bf .}\hspace{3mm}}
%\def\bt{\hspace{-2mm}{\bf .}\hspace{2mm}}
%\def\hs{\hspace*{0.56cm}}
\setlength{\oddsidemargin}{0pt} \setlength{\evensidemargin}{0pt}
\setlength{\hoffset}{-1in} \addtolength{\hoffset}{3.5cm}
\setlength{\textwidth}{14.5cm} %\setlength{\voffset}{-1in}
%\addtolength{\voffset}{3cm}


\thispagestyle{empty}
\setcounter{page}{1} 
%\fancyhead{} \fancyfoot{} \fancyhead[CO]{
%Mathematics~Interdisciplinary~Research ~{\bf 1}~(201x) $xx - yy$\\} 
\renewcommand{\headrulewidth}{4pt}
\pagestyle{fancy}


\begin{document}

	
\begin{tabular}{c|c}
\hline %\rule{2pt}{5.7ex}
\begin{minipage}{.67\textwidth}\raggedright
\vspace{0.25cm}
\centerline{{\bf{Abstract}}}
\vspace{0.25cm}
%{\bf{Abstract}}: 
\justifying{The concept of zero divisor graph of a ring was introduced by Beck  in his study on the
coloring problem of a commutative ring \cite{2}. He considered a ring $R$ as the vertex set of a graph $G(R)$. Two distinct vertices $x$ and $y$ of $G(R)$ are defined to be adjacent
if and only if $xy = 0$.  Anderson and Livingston \cite{1}, considered the set of
all non-zero zero divisors as the vertex set to simplify the Beck's zero divisor graph. The edges can be defined in a similar way as Beck's seminal paper. This graph is denoted by $\Gamma(R)$. In this paper we use the Anderson$-$Livingston's definition of zero devisor graph and}
%\end{center}
\begin{flushright}
© 2022 University 
\end{flushright}
%\vspace{0.25cm}
\end{minipage}\hfill 
&
 \begin{minipage}{.30\textwidth}\raggedright
\begin{minipage}{.99\textwidth}\raggedright 
\vspace{0.25cm}
{\bf{Keywords:}}\vspace{0.2cm}\\{\footnotesize{ Text,\\ Other,\\ Some, \\ Example }}\\
\vspace{0.5cm}
{\bf{AMS Subject Classification (2020):}}\vspace{0.2cm}\\{\footnotesize{ 05C50; 94B05; 05B05 }}\\
\vspace{0.5cm}
{\bf{Article History:}}\vspace{0.2cm}\\{\footnotesize{ Received: 07 August 2022,\\ Accepted: 11 November 2022, }} \\
\end{minipage}\hfill
\end{minipage}\hfill
\end{tabular} 
%\end{tcolorbox}
%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
\begin{tabular}{c|c}
\hline 
%\multirow{3}{*}{} & \multicolumn{1}{c}{ETC} & \multicolumn{1}{c}{ABC}  \\ %\cline{2-3} \cline{5-6} 
1 & 2\\
~ & 3\\
~&4 \\ 
\end{tabular} 
%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%%
\end{document}