<?xml version="1.0" encoding="UTF-8"?><!DOCTYPE article  PUBLIC "-//NLM//DTD Journal Publishing DTD v3.0 20080202//EN" "http://dtd.nlm.nih.gov/publishing/3.0/journalpublishing3.dtd"><article xmlns:mml="http://www.w3.org/1998/Math/MathML" xmlns:xlink="http://www.w3.org/1999/xlink" dtd-version="3.0" xml:lang="en" article-type="research article"><front><journal-meta><journal-id journal-id-type="publisher-id">APM</journal-id><journal-title-group><journal-title>Advances in Pure Mathematics</journal-title></journal-title-group><issn pub-type="epub">2160-0368</issn><publisher><publisher-name>Scientific Research Publishing</publisher-name></publisher></journal-meta><article-meta><article-id pub-id-type="doi">10.4236/apm.2016.64018</article-id><article-id pub-id-type="publisher-id">APM-65095</article-id><article-categories><subj-group subj-group-type="heading"><subject>Articles</subject></subj-group><subj-group subj-group-type="Discipline-v2"><subject>Physics&amp;Mathematics</subject></subj-group></article-categories><title-group><article-title>
 
 
  Representations by Certain Sextenary Quadratic Forms Whose Coefficients Are 1, 2, 3 and 6
 
</article-title></title-group><contrib-group><contrib contrib-type="author" xlink:type="simple"><name name-style="western"><surname>arış</surname><given-names>Kendirli</given-names></name><xref ref-type="aff" rid="aff1"><sub>1</sub></xref><xref ref-type="corresp" rid="cor1"><sup>*</sup></xref></contrib></contrib-group><aff id="aff1"><label>1</label><addr-line>Istanbul Aydian University, Istanbul, Turkey</addr-line></aff><author-notes><corresp id="cor1">* E-mail:<email>bariskendirli@aydin.edu.tr</email></corresp></author-notes><pub-date pub-type="epub"><day>15</day><month>03</month><year>2016</year></pub-date><volume>06</volume><issue>04</issue><fpage>212</fpage><lpage>296</lpage><history><date date-type="received"><day>9</day>	<month>December</month>	<year>2015</year></date><date date-type="rev-recd"><day>accepted</day>	<month>26</month>	<year>March</year>	</date><date date-type="accepted"><day>29</day>	<month>March</month>	<year>2016</year></date></history><permissions><copyright-statement>&#169; Copyright  2014 by authors and Scientific Research Publishing Inc. </copyright-statement><copyright-year>2014</copyright-year><license><license-p>This work is licensed under the Creative Commons Attribution International License (CC BY). http://creativecommons.org/licenses/by/4.0/</license-p></license></permissions><abstract><p>
 
 
  Here, we determine formulae, for the numbers of representations of a positive integer by certain sextenary quadratic forms whose coefficients are 1, 2, 3 and 6.
 
</p></abstract><kwd-group><kwd>Sextenary Quadratic Forms</kwd><kwd> Representations</kwd><kwd> Theta Functions</kwd><kwd> Dedekind Eta Function</kwd><kwd> Eisenstein Series</kwd><kwd> Eisenstein Forms</kwd><kwd> Modular Forms</kwd><kwd> Cusp Forms</kwd></kwd-group></article-meta></front><body><sec id="s1"><title>1. Introduction</title><p>The divisor function <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x6.png" xlink:type="simple"/></inline-formula> is defined for a positive integer i by</p><disp-formula id="scirp.65095-formula913"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x7.png"  xlink:type="simple"/></disp-formula><p>The Dedekind eta function and the theta function are defined by</p><disp-formula id="scirp.65095-formula914"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x8.png"  xlink:type="simple"/></disp-formula><p>where</p><disp-formula id="scirp.65095-formula915"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x9.png"  xlink:type="simple"/></disp-formula><p>and an eta quotient of level N is defined by</p><disp-formula id="scirp.65095-formula916"><label>(1)</label><graphic position="anchor" xlink:href="http://html.scirp.org/file/3-5301032x10.png"  xlink:type="simple"/></disp-formula><p>It is important and interesting to determine explicit formulas of the representation number of positive definite quadratic forms.</p><p>Here we give the following Lemma, see ( [<xref ref-type="bibr" rid="scirp.65095-ref1">1</xref>] , Theorem 1.64), about the modularity of an eta quotient.</p><p>Lemma 1. An eta quotient of level N is a meromorphic modular form of weight <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x11.png" xlink:type="simple"/></inline-formula> on <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x12.png" xlink:type="simple"/></inline-formula> having rational coefficients with respect to q if</p><p>a) <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x13.png" xlink:type="simple"/></inline-formula></p><p>b) <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x14.png" xlink:type="simple"/></inline-formula></p><p>c) <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x15.png" xlink:type="simple"/></inline-formula></p><p>For <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x16.png" xlink:type="simple"/></inline-formula> and a nonnegative integer n, we define</p><disp-formula id="scirp.65095-formula917"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x17.png"  xlink:type="simple"/></disp-formula><p>Clearly <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x18.png" xlink:type="simple"/></inline-formula> and without loss of generality we can assume that <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x19.png" xlink:type="simple"/></inline-formula></p><p>Now, let’s consider sextenary quadratic forms of the form</p><disp-formula id="scirp.65095-formula918"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x20.png"  xlink:type="simple"/></disp-formula><p>where<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x21.png" xlink:type="simple"/></inline-formula>,<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x21.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x22.png" xlink:type="simple"/></inline-formula></p><p>We write <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x23.png" xlink:type="simple"/></inline-formula> to denote the number of representations of n by a sextenary quadratic form<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x23.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x24.png" xlink:type="simple"/></inline-formula>. Its theta function is obviously</p><disp-formula id="scirp.65095-formula919"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x25.png"  xlink:type="simple"/></disp-formula><p>Formulae for <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x26.png" xlink:type="simple"/></inline-formula> for the nine octonary quadratic forms (2i, 2j, 2k, 2l) = (8, 0, 0, 0), (2, 6, 0, 0), (4, 4, 0, 0), (6, 2, 0, 0), (2, 0, 6, 0), (4, 0, 4, 0), (6, 0, 2, 0), (4, 0, 0, 4), and (0, 4, 4, 0) appear in the literature, (cf. [<xref ref-type="bibr" rid="scirp.65095-ref2">2</xref>] - [<xref ref-type="bibr" rid="scirp.65095-ref12">12</xref>] ). Alaca and Williams have obtained some results on sextenary quadratic forms in terms of the functions <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x26.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x27.png" xlink:type="simple"/></inline-formula> and<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x26.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x27.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x28.png" xlink:type="simple"/></inline-formula>, see [<xref ref-type="bibr" rid="scirp.65095-ref13">13</xref>] [<xref ref-type="bibr" rid="scirp.65095-ref14">14</xref>] . There are more works on representation number of sextenary quadratic forms in [<xref ref-type="bibr" rid="scirp.65095-ref15">15</xref>] - [<xref ref-type="bibr" rid="scirp.65095-ref17">17</xref>] . Other methods for representation number have been used in (cf. [<xref ref-type="bibr" rid="scirp.65095-ref7">7</xref>] [<xref ref-type="bibr" rid="scirp.65095-ref10">10</xref>] [<xref ref-type="bibr" rid="scirp.65095-ref12">12</xref>] [<xref ref-type="bibr" rid="scirp.65095-ref18">18</xref>] [<xref ref-type="bibr" rid="scirp.65095-ref19">19</xref>] ). Here, we will classify all fourtuples <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x26.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x27.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x28.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x29.png" xlink:type="simple"/></inline-formula> for which <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x26.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x27.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x28.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x29.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x30.png" xlink:type="simple"/></inline-formula> is a modular form of weight 8 with level 24. Then we will obtain their representation numbers in terms of the coefficients of Eisenstein series and some eta quotients.</p><p>First, by the following Theorem, we characterize the facts that</p><disp-formula id="scirp.65095-formula920"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x31.png"  xlink:type="simple"/></disp-formula><p>are in <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x32.png" xlink:type="simple"/></inline-formula></p><p>Theorem 1. Let</p><disp-formula id="scirp.65095-formula921"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x33.png"  xlink:type="simple"/></disp-formula><p>where, <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x34.png" xlink:type="simple"/></inline-formula>,<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x34.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x35.png" xlink:type="simple"/></inline-formula> be a sextenary quadratic form. Then its theta series is of the form</p><disp-formula id="scirp.65095-formula922"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x36.png"  xlink:type="simple"/></disp-formula><p>Moreover, it is in <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x37.png" xlink:type="simple"/></inline-formula> if and only if <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x37.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x38.png" xlink:type="simple"/></inline-formula> is given in the <xref ref-type="table" rid="table1">Table 1</xref>. Here we also see that <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x37.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x38.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x39.png" xlink:type="simple"/></inline-formula> are either both even or both odd.</p><p>Proof. It follows from the Lemma 1, holomorphicity criterion in ( [<xref ref-type="bibr" rid="scirp.65095-ref20">20</xref>] Corollary 2.3, p. 37) and the fact</p><table-wrap-group id="1"><label><xref ref-type="table" rid="table1">Table 1</xref></label><caption><title> Sextenary quadratic form</title></caption><table-wrap id="1_1"><table><tbody><thead><tr><th align="center" valign="middle" >(0 2 2 12),</th><th align="center" valign="middle" >(0 2 4 10),</th><th align="center" valign="middle" >(0 2 6 8),</th><th align="center" valign="middle" >(0 2 8 6)</th></tr></thead><tr><td align="center" valign="middle" >(0 2 10 4),</td><td align="center" valign="middle" >(0 2 12 2),</td><td align="center" valign="middle" >(0 2 14 0),</td><td align="center" valign="middle" >(0 4 2 10)</td></tr><tr><td align="center" valign="middle" >(0 4 4 8),</td><td align="center" valign="middle" >(0 4 6 6),</td><td align="center" valign="middle" >(0 4 8 4),</td><td align="center" valign="middle" >(0 4 10 2)</td></tr><tr><td align="center" valign="middle" >(0 4 12 0),</td><td align="center" valign="middle" >(0 6 2 8),</td><td align="center" valign="middle" >(0 6 4 6),</td><td align="center" valign="middle" >(0 6 6 4)</td></tr><tr><td align="center" valign="middle" >(0 6 8 2),</td><td align="center" valign="middle" >(0 6 10 0),</td><td align="center" valign="middle" >(0 8 2 6),</td><td align="center" valign="middle" >(0 8 4 4)</td></tr><tr><td align="center" valign="middle" >(0 8 6 2),</td><td align="center" valign="middle" >(0 8 8 0),</td><td align="center" valign="middle" >(0 10 2 4),</td><td align="center" valign="middle" >(0 10 4 2)</td></tr><tr><td align="center" valign="middle" >(0 10 6 0),</td><td align="center" valign="middle" >(0 12 2 2),</td><td align="center" valign="middle" >(0 12 4 0),</td><td align="center" valign="middle" >(0 14 2 0)</td></tr><tr><td align="center" valign="middle" >(1 1 1 13),</td><td align="center" valign="middle" >(1 1 3 11),</td><td align="center" valign="middle" >(1 1 5 9),</td><td align="center" valign="middle" >(1 1 7 7)</td></tr><tr><td align="center" valign="middle" >(1 1 9 5),</td><td align="center" valign="middle" >(1 1 11 3),</td><td align="center" valign="middle" >(1 1 13 1),</td><td align="center" valign="middle" >(1 3 1 11)</td></tr><tr><td align="center" valign="middle" >(1 3 3 9),</td><td align="center" valign="middle" >(1 3 5 7),</td><td align="center" valign="middle" >(1 3 7 5),</td><td align="center" valign="middle" >(1 3 9 3)</td></tr><tr><td align="center" valign="middle" >(1 3 11 1),</td><td align="center" valign="middle" >(1 5 1 9),</td><td align="center" valign="middle" >(1 5 3 7),</td><td align="center" valign="middle" >(1 5 5 5)</td></tr><tr><td align="center" valign="middle" >(1 5 7 3),</td><td align="center" valign="middle" >(1 5 9 1),</td><td align="center" valign="middle" >(1 7 1 7),</td><td align="center" valign="middle" >(1 7 3 5)</td></tr><tr><td align="center" valign="middle" >(1 7 5 3),</td><td align="center" valign="middle" >(1 7 7 1),</td><td align="center" valign="middle" >(1 9 1 5),</td><td align="center" valign="middle" >(1 9 3 3)</td></tr><tr><td align="center" valign="middle" >(1 9 5 1),</td><td align="center" valign="middle" >(1 11 1 3),</td><td align="center" valign="middle" >(1 11 3 1),</td><td align="center" valign="middle" >(1 13 1 1)</td></tr><tr><td align="center" valign="middle" >(2 0 0 14),</td><td align="center" valign="middle" >(2 0 2 12),</td><td align="center" valign="middle" >(2 0 4 10),</td><td align="center" valign="middle" >(2 0 6 8)</td></tr><tr><td align="center" valign="middle" >(2 0 8 6),</td><td align="center" valign="middle" >(2 0 10 4),</td><td align="center" valign="middle" >(2 0 12 2),</td><td align="center" valign="middle" >(2 0 14 0)</td></tr><tr><td align="center" valign="middle" >(2 2 0 12),</td><td align="center" valign="middle" >(2 2 2 10),</td><td align="center" valign="middle" >(2 2 4 8),</td><td align="center" valign="middle" >(2 2 6 6)</td></tr><tr><td align="center" valign="middle" >(2 2 8 4),</td><td align="center" valign="middle" >(2 2 10 2),</td><td align="center" valign="middle" >(2 2 12 0),</td><td align="center" valign="middle" >(2 4 0 10)</td></tr><tr><td align="center" valign="middle" >(2 4 2 8),</td><td align="center" valign="middle" >(2 4 4 6),</td><td align="center" valign="middle" >(2 4 6 4),</td><td align="center" valign="middle" >(2 4 8 2)</td></tr><tr><td align="center" valign="middle" >(2 4 10 0),</td><td align="center" valign="middle" >(2 6 0 8),</td><td align="center" valign="middle" >(2 6 2 6),</td><td align="center" valign="middle" >(2 6 4 4)</td></tr><tr><td align="center" valign="middle" >(2 6 6 2),</td><td align="center" valign="middle" >(2 6 8 0),</td><td align="center" valign="middle" >(2 8 0 6),</td><td align="center" valign="middle" >(2 8 2 4)</td></tr><tr><td align="center" valign="middle" >(2 8 4 2),</td><td align="center" valign="middle" >(2 8 6 0),</td><td align="center" valign="middle" >(2 10 0 4),</td><td align="center" valign="middle" >(2 10 2 2)</td></tr><tr><td align="center" valign="middle" >(2 10 4 0),</td><td align="center" valign="middle" >(2 12 0 2),</td><td align="center" valign="middle" >(2 12 2 0),</td><td align="center" valign="middle" >(2 14 0 0)</td></tr><tr><td align="center" valign="middle" >(3 1 1 11),</td><td align="center" valign="middle" >(3 1 3 9),</td><td align="center" valign="middle" >(3 1 5 7),</td><td align="center" valign="middle" >(3 1 7 5)</td></tr><tr><td align="center" valign="middle" >(3 1 9 3),</td><td align="center" valign="middle" >(3 1 11 1),</td><td align="center" valign="middle" >(3 3 1 9),</td><td align="center" valign="middle" >(3 3 3 7)</td></tr><tr><td align="center" valign="middle" >(3 3 5 5),</td><td align="center" valign="middle" >(3 3 7 3),</td><td align="center" valign="middle" >(3 3 9 1),</td><td align="center" valign="middle" >(3 5 1 7)</td></tr><tr><td align="center" valign="middle" >(3 5 3 5),</td><td align="center" valign="middle" >(3 5 5 3),</td><td align="center" valign="middle" >(3 5 7 1),</td><td align="center" valign="middle" >(3 7 1 5)</td></tr><tr><td align="center" valign="middle" >(3 7 3 3),</td><td align="center" valign="middle" >(3 7 5 1),</td><td align="center" valign="middle" >(3 9 1 3),</td><td align="center" valign="middle" >(3 9 3 1)</td></tr><tr><td align="center" valign="middle" >(3 11 1 1),</td><td align="center" valign="middle" >(4 0 0 12),</td><td align="center" valign="middle" >(4 0 2 10),</td><td align="center" valign="middle" >(4 0 4 8)</td></tr><tr><td align="center" valign="middle" >(4 0 6 6),</td><td align="center" valign="middle" >(4 0 8 4),</td><td align="center" valign="middle" >(4 0 10 2),</td><td align="center" valign="middle" >(4 0 12 0)</td></tr><tr><td align="center" valign="middle" >(4 2 0 10),</td><td align="center" valign="middle" >(4 2 2 8),</td><td align="center" valign="middle" >(4 2 4 6),</td><td align="center" valign="middle" >(4 2 6 4)</td></tr><tr><td align="center" valign="middle" >(4 2 8 2),</td><td align="center" valign="middle" >(4 2 10 0),</td><td align="center" valign="middle" >(4 4 0 8),</td><td align="center" valign="middle" >(4 4 2 6)</td></tr><tr><td align="center" valign="middle" >(4 4 4 4),</td><td align="center" valign="middle" >(4 4 6 2),</td><td align="center" valign="middle" >(4 4 8 0),</td><td align="center" valign="middle" >(4 6 0 6)</td></tr><tr><td align="center" valign="middle" >(4 6 2 4),</td><td align="center" valign="middle" >(4 6 4 2),</td><td align="center" valign="middle" >(4 6 6 0),</td><td align="center" valign="middle" >(4 8 0 4)</td></tr><tr><td align="center" valign="middle" >(4 8 2 2),</td><td align="center" valign="middle" >(4 8 4 0),</td><td align="center" valign="middle" >(4 10 0 2),</td><td align="center" valign="middle" >(4 10 2 0)</td></tr><tr><td align="center" valign="middle" >(4 12 0 0),</td><td align="center" valign="middle" >(5 1 1 9),</td><td align="center" valign="middle" >(5 1 3 7),</td><td align="center" valign="middle" >(5 1 5 5)</td></tr><tr><td align="center" valign="middle" >(5 1 7 3),</td><td align="center" valign="middle" >(5 1 9 1),</td><td align="center" valign="middle" >(5 3 1 7),</td><td align="center" valign="middle" >(5 3 3 5)</td></tr><tr><td align="center" valign="middle" >(5 3 5 3),</td><td align="center" valign="middle" >(5 3 7 1),</td><td align="center" valign="middle" >(5 5 1 5),</td><td align="center" valign="middle" >(5 5 3 3)</td></tr><tr><td align="center" valign="middle" >(5 5 5 1),</td><td align="center" valign="middle" >(5 7 1 3),</td><td align="center" valign="middle" >(5 7 3 1),</td><td align="center" valign="middle" >(5 9 1 1)</td></tr></tbody></table></table-wrap><table-wrap id="1_2"><table><tbody><thead><tr><th align="center" valign="middle" >(6 0 0 10),</th><th align="center" valign="middle" >(6 0 2 8),</th><th align="center" valign="middle" >(6 0 4 6),</th><th align="center" valign="middle" >(6 0 6 4)</th></tr></thead><tr><td align="center" valign="middle" >(6 0 8 2),</td><td align="center" valign="middle" >(6 0 10 0),</td><td align="center" valign="middle" >(6 2 0 8),</td><td align="center" valign="middle" >(6 2 2 6)</td></tr><tr><td align="center" valign="middle" >(6 2 4 4),</td><td align="center" valign="middle" >(6 2 6 2),</td><td align="center" valign="middle" >(6 2 8 0),</td><td align="center" valign="middle" >(6 4 0 6)</td></tr><tr><td align="center" valign="middle" >(6 4 2 4),</td><td align="center" valign="middle" >(6 4 4 2),</td><td align="center" valign="middle" >(6 4 6 0),</td><td align="center" valign="middle" >(6 6 0 4)</td></tr><tr><td align="center" valign="middle" >(6 6 2 2),</td><td align="center" valign="middle" >(6 6 4 0),</td><td align="center" valign="middle" >(6 8 0 2),</td><td align="center" valign="middle" >(6 8 2 0)</td></tr><tr><td align="center" valign="middle" >(6 10 0 0),</td><td align="center" valign="middle" >(7 1 1 7),</td><td align="center" valign="middle" >(7 1 3 5),</td><td align="center" valign="middle" >(7 1 5 3)</td></tr><tr><td align="center" valign="middle" >(7 1 7 1),</td><td align="center" valign="middle" >(7 3 1 5),</td><td align="center" valign="middle" >(7 3 3 3),</td><td align="center" valign="middle" >(7 3 5 1)</td></tr><tr><td align="center" valign="middle" >(7 5 1 3),</td><td align="center" valign="middle" >(7 5 3 1),</td><td align="center" valign="middle" >(7 7 1 1),</td><td align="center" valign="middle" >(8 0 0 8)</td></tr><tr><td align="center" valign="middle" >(8 0 2 6),</td><td align="center" valign="middle" >(8 0 4 4),</td><td align="center" valign="middle" >(8 0 6 2),</td><td align="center" valign="middle" >(8 0 8 0)</td></tr><tr><td align="center" valign="middle" >(8 2 0 6),</td><td align="center" valign="middle" >(8 2 2 4),</td><td align="center" valign="middle" >(8 2 4 2),</td><td align="center" valign="middle" >(8 2 6 0)</td></tr><tr><td align="center" valign="middle" >(8 4 0 4),</td><td align="center" valign="middle" >(8 4 2 2),</td><td align="center" valign="middle" >(8 4 4 0),</td><td align="center" valign="middle" >(8 6 0 2)</td></tr><tr><td align="center" valign="middle" >(8 6 2 0),</td><td align="center" valign="middle" >(8 8 0 0),</td><td align="center" valign="middle" >(9 1 1 5),</td><td align="center" valign="middle" >(9 1 1 3)</td></tr><tr><td align="center" valign="middle" >(9 1 5 1),</td><td align="center" valign="middle" >(9 3 1 3),</td><td align="center" valign="middle" >(9 3 3 1),</td><td align="center" valign="middle" >(9 5 1 1)</td></tr><tr><td align="center" valign="middle" >(10 0 0 6),</td><td align="center" valign="middle" >(10 0 2 4),</td><td align="center" valign="middle" >(10 0 4 2),</td><td align="center" valign="middle" >(10 0 6 0)</td></tr><tr><td align="center" valign="middle" >(10 2 0 4),</td><td align="center" valign="middle" >(10 2 2 2),</td><td align="center" valign="middle" >(10 2 4 0),</td><td align="center" valign="middle" >(10 4 0 2)</td></tr><tr><td align="center" valign="middle" >(10 4 2 0),</td><td align="center" valign="middle" >(10 6 0 0),</td><td align="center" valign="middle" >(11 1 1 3),</td><td align="center" valign="middle" >(11 1 3 1)</td></tr><tr><td align="center" valign="middle" >(11 3 1 1),</td><td align="center" valign="middle" >(12 0 0 4),</td><td align="center" valign="middle" >(12 0 2 2),</td><td align="center" valign="middle" >(12 0 4 0)</td></tr><tr><td align="center" valign="middle" >(12 2 0 2),</td><td align="center" valign="middle" >(12 2 2 0),</td><td align="center" valign="middle" >(12 4 0 0),</td><td align="center" valign="middle" >(13 1 1 1)</td></tr><tr><td align="center" valign="middle" >(14 0 0 2),</td><td align="center" valign="middle" >(14 0 2 0),</td><td align="center" valign="middle" >(14 2 0 0),</td><td align="center" valign="middle" >(16 0 0 0)</td></tr></tbody></table></table-wrap></table-wrap-group><p>that</p><disp-formula id="scirp.65095-formula923"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x40.png"  xlink:type="simple"/></disp-formula><p>The condition <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x41.png" xlink:type="simple"/></inline-formula> is a square of a rational number implies that either <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x41.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x42.png" xlink:type="simple"/></inline-formula> are both even or both odd integers.</p><p>Now let,</p><disp-formula id="scirp.65095-formula924"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x43.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.65095-formula925"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x44.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.65095-formula926"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x45.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.65095-formula927"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x46.png"  xlink:type="simple"/></disp-formula><p><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x47.png" xlink:type="simple"/></inline-formula>the unique newform in <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x47.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x48.png" xlink:type="simple"/></inline-formula></p><disp-formula id="scirp.65095-formula928"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x49.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.65095-formula929"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x50.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.65095-formula930"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x51.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.65095-formula931"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x52.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.65095-formula932"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x53.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.65095-formula933"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x54.png"  xlink:type="simple"/></disp-formula><p>Theorem 2. The set</p><disp-formula id="scirp.65095-formula934"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x55.png"  xlink:type="simple"/></disp-formula><p>is a basis of<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x56.png" xlink:type="simple"/></inline-formula>. Moreover, the unique newform in <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x56.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x57.png" xlink:type="simple"/></inline-formula> is<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x56.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x57.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x58.png" xlink:type="simple"/></inline-formula>, the unique newform in <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x56.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x57.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x58.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x59.png" xlink:type="simple"/></inline-formula> is<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x56.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x57.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x58.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x59.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x60.png" xlink:type="simple"/></inline-formula>, the two unique newforms in <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x56.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x57.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x58.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x59.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x60.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x61.png" xlink:type="simple"/></inline-formula> are</p><disp-formula id="scirp.65095-formula935"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x62.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.65095-formula936"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x63.png"  xlink:type="simple"/></disp-formula><p>the two unique newforms in <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x64.png" xlink:type="simple"/></inline-formula> are</p><disp-formula id="scirp.65095-formula937"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x65.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.65095-formula938"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x66.png"  xlink:type="simple"/></disp-formula><p>and the three unique newforms in <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x67.png" xlink:type="simple"/></inline-formula> are</p><disp-formula id="scirp.65095-formula939"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x68.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.65095-formula940"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x69.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.65095-formula941"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x70.png"  xlink:type="simple"/></disp-formula><p>Proof. <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x71.png" xlink:type="simple"/></inline-formula>is 32 dimensional, <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x71.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x72.png" xlink:type="simple"/></inline-formula>is 24 dimensional, see ( [<xref ref-type="bibr" rid="scirp.65095-ref21">21</xref>] Chapter 3, p. 87 and Chapter 5, p. 197), and generated by</p><disp-formula id="scirp.65095-formula942"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x73.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.65095-formula943"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x74.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.65095-formula944"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x75.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.65095-formula945"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x76.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.65095-formula946"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x77.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.65095-formula947"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x78.png"  xlink:type="simple"/></disp-formula><p>where <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x79.png" xlink:type="simple"/></inline-formula> is the unique newform in<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x79.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x80.png" xlink:type="simple"/></inline-formula>; <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x79.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x80.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x81.png" xlink:type="simple"/></inline-formula>is the unique newform in<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x79.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x80.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x81.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x82.png" xlink:type="simple"/></inline-formula>; <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x79.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x80.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x81.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x82.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x83.png" xlink:type="simple"/></inline-formula>is the unique newform in<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x79.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x80.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x81.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x82.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x83.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x84.png" xlink:type="simple"/></inline-formula>, <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x79.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x80.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x81.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x82.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x83.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x84.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x85.png" xlink:type="simple"/></inline-formula>are the unique newforms in<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x79.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x80.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x81.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x82.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x83.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x84.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x85.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x86.png" xlink:type="simple"/></inline-formula>; <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x79.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x80.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x81.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x82.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x83.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x84.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x85.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x86.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x87.png" xlink:type="simple"/></inline-formula>are the unique newforms in <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x79.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x80.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x81.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x82.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x83.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x84.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x85.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x86.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x87.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x88.png" xlink:type="simple"/></inline-formula> and <inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x79.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x80.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x81.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x82.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x83.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x84.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x85.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x86.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x87.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x88.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x89.png" xlink:type="simple"/></inline-formula> are the unique newforms in<inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x79.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x80.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x81.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x82.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x83.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x84.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x85.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x86.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x87.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x88.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x89.png" xlink:type="simple"/></inline-formula><inline-formula><inline-graphic xlink:href="http://html.scirp.org/file/3-5301032x90.png" xlink:type="simple"/></inline-formula>.</p><p>As a consequence of this Theorem, we have obtained the following Corollary.We have used Magma for the calculations.</p></sec><sec id="s2"><title>2. Corollary</title><p>The following representation numbers formulae are valid.</p><disp-formula id="scirp.65095-formula948"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x91.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.65095-formula949"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x92.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.65095-formula950"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x93.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.65095-formula951"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x94.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.65095-formula952"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x95.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.65095-formula953"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x96.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.65095-formula954"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x97.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.65095-formula955"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x98.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.65095-formula956"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x99.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.65095-formula957"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x100.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.65095-formula958"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x101.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.65095-formula959"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x102.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.65095-formula960"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x103.png"  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id="scirp.65095-formula1174"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x317.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.65095-formula1175"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x318.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.65095-formula1176"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x319.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.65095-formula1177"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x320.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.65095-formula1178"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x321.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.65095-formula1179"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x322.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.65095-formula1180"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x323.png"  xlink:type="simple"/></disp-formula><disp-formula id="scirp.65095-formula1181"><graphic  xlink:href="http://html.scirp.org/file/3-5301032x324.png"  xlink:type="simple"/></disp-formula></sec><sec id="s3"><title>Cite this paper</title><p>Barış Kendirli, (2016) Representations by Certain Sextenary Quadratic Forms Whose Coefficients Are 1, 2, 3 and 6. 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