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\markboth{\small{\emph{Mathematical Sciences Vol. x, No. x
(200x)}}}{\small{\emph{Author1 et al.}}}
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\begin{document}
\begin{figure}[h]
{\Large{\bf{\emph{Mathematical Sciences}}}}
\hspace{1.1cm}\hspace{0.9cm}%\includegraphics[scale=0.15]{Logo.png}
\hspace{1.1cm}{\small{\bf{\emph{Vol. x, No. x (200x) xx-xx}}}}
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\begin{center}
{\Large \bf Title of the article}
{\small \bf Author1$^{a,}$\footnote{\footnotesize Corresponding
Author. E-mail Address: }, Author2$^b$}
\end{center}
{\footnotesize $^a$Address of Author1}\\
{\footnotesize $^b$Address of Author2}
\newtheorem{Theorem}{\quad Theorem}[section]
\newtheorem{Definition}[Theorem]{\quad Definition}
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\begin{abstract}
(The paper must have abstract not exceeding 200 words). The
Mathematical Sciences is a peer-reviewed mathematical journal to
be published quarterly in English from 2007, with enlarged scope
and aims. As a multi-disciplinary quarterly publication, the main
aims and scope of the journal is publishing of refereed, high
quality original research papers in all areas of pure and applied
mathematics and statistics.
\\
{\bf Keywords:} xxxxx, xxxxx.
\\
\copyright {\small \hspace{0.15cm}200x Published by Islamic Azad
University-Karaj Branch.}
\end{abstract}
\section{Introduction}
(This is the text of the introduction). Mathematical Sciences
provides a medium of exchange for the diverse disciplines
utilizing mathematical or statistical concepts as either a
theoretical or working tool. The Journal is published four times a
year and according to the name of the journal, it seeks diversity
by being concerned with a variety of disciplines, including pure
and applied mathematics. Furthermore, both theoretical and applied
works which employ mathematical or statistical concepts will be
considered for publication.
The authors are invited to submit papers online. Manuscripts
submitted to this journal will be considered for publication with
the understanding that the same work has not been published and is
not under consideration for publication elsewhere. The papers
submitted to the journal are refereed within 2-3 months.
Upon acceptance of the article, the authors will be requested to
supply a final copy prepared in some form of TeX. Papers must
prepared in accordance with the instructions. Authors are advised
to look at the full paper template.
Publication will be based on the following terms of publishing
agreement:
1. Islamic Azad University will provide the author with one free
printed copy of the work when it is first published.
2. Copyright will be attributed to the author(s).
3. The author(s) assure Islamic Azad University (as a publisher)
that the material contained in the paper is not defamatory,
unlawful, obscene, invasive of another person's privacy, hateful,
racially or ethnically objectionable, abusive, threatening,
harmful or in contempt of court, and undertake to indemnify
Islamic Azad University against any claims which may be made in
situations where material is considered to be any of these things,
or has any of these effects.
4. The author(s) assure Islamic Azad University that the paper
presented is based entirely on original material, that it does not
infringe anybody else's copyright. In the case of copyright
material, such as the use of quotes or images beyond what is
legally considered 'fair use', the author(s) and/or editor(s) will
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any claims as a result of breech of the copyright of others.
\section{Main Results}
(These are the main results of the paper).
\begin{Corollary} (This is a text of a Corollary). The general form of
a quadratic equation is $ax^2 + bx + c = 0$.
\end{Corollary}
\begin{Definition} (This is a text of a definition). The general form of
a quadratic equation is $ax^2 + bx + c = 0$
\end{Definition}
\begin{Example} (This is a text of an Example). The general form of
a quadratic equation is $ax^2 + bx + c = 0$
\end{Example}
\begin{Lemma} (This is a text of a lemma). The general form of
a quadratic equation is $ax^2 + bx + c = 0$
\end{Lemma}
\begin{Theorem} (This is a text of a theorem). The general form of
a quadratic equation is
\begin{equation}
ax^2 + bx + c = 0
\end{equation}
\end{Theorem}
{\bf Proof } Proof is available from the authors on request.
{\bf Acknowledgment\\}I want to thank ...
\begin{thebibliography}{99}
\bibitem{} Charnes A., Cooper W.W., Rhodes E. (1978) "Measuring the efficiency of
decision making units," European Journal of Operational Research,
2, 429-444.
\bibitem{} Norman M., Stoker B., Data Envelopment Analysis: The
Assessment of Performance, John Wiley, Chichester, 1991.
\end{thebibliography}
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