<GetPassage xmlns:tei="http://www.tei-c.org/ns/1.0" xmlns="http://chs.harvard.edu/xmlns/cts">
            <request>
                <requestName>GetPassage</requestName>
                <requestUrn>urn:cts:greekLit:tlg5022.tlg005.1st1K-grc1:43-44</requestUrn>
            </request>
            <reply>
                <urn>urn:cts:greekLit:tlg5022.tlg005.1st1K-grc1:43-44</urn>
                <passage>
                    <TEI xmlns="http://www.tei-c.org/ns/1.0"><text><body><div type="edition" xml:lang="grc" n="urn:cts:greekLit:tlg5022.tlg005.1st1K-grc1"><div type="textpart" subtype="section" n="43"><p>43. Οὐ γὰρ συμπεσεῖται p. 330, <del status="error">19</del> ἐπειδὴ παντὸς
                        τριγώνου αἱ β γωνίαι δύο ὀρθῶν ἐλάττους.</p><lb n="5"/></div><div type="textpart" subtype="section" n="44"><p>44. Καὶ ἐπεὶ μείζων ἐστίν ἡ ΒΓ p. 332, <del status="error">17</del> ἐπεὶ γὰρ
                        ἡ ΓΠ ἴση τῇ ΠΚ, ἡ ΓΝ μείζων τῆς ΝΚ. ὥστε καὶ τὸ ἀπὸ τοῦ. κοινὸν προσκείσθω
                        τὸ ἀπὸ ΝΒ· τὰ ἄρα ἀπὸ τῶν ἀπὸ μείζονα. ἀλλὰ τοῖς μὲν ἀπὸ ΓΝΒ ἴσον τὸ ἀπὸ ΓΒ,
                        τοῖς δὲ ἀπὸ ΒΝΚ ἴσον τὸ ἀπὸ ΒΚ <lb n="10"/> ὥστε ἡ ΓΒ μείζων τῆς ΒΚ.</p></div></div></body></text></TEI>
                </passage>
            </reply>
            </GetPassage>