<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-grc1:45-46</requestUrn>
            </request>
            <reply>
                <urn>urn:cts:greekLit:tlg5022.tlg005.1st1K-grc1:45-46</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="45"><p>45. Ὥστε καὶ ἡ ὑπὸ ΓΒΘ μείζων p. 332, <del status="error">18</del> ἐπεὶ γὰρ
                        τριγώνου τοῦ ΓΒΝ αἱ γ γωνίαι ταῖς τρισὶν γωνίαις τριγώνου τοῦ ΒΝΚ ἴσαι, ἐξ
                        ὧν αἱ δύο ἡ πρὸς τῷ Ρ καὶ ἡ ὑπὸ ΒΝΚ μείζους τῶν δύο τῆς τε πρὸς <lb n="15"/>
                        τῷ Γ καὶ τῆς ὑπὸ ΓΝΒ, λοιπὴ ἄρα ἡ ὑπὸ ΚΒΝ λοιπῆς τῆς ὑπὸ ΓΒΝ ἐλάσσων· ὅπου
                        γὰρ τὸ μεῖζον, ἐκεῖ τὸ ἔλαττον.</p></div><div type="textpart" subtype="section" n="46"><p>46. Τουτέστι τῆς ὑπὸ ΒΘΚ p. 332, <del status="error">19</del> ἴση γὰρ ἡ ΒΚ τῇ
                        ΚΘ, ἐπειδὴ δύο αἱ ΒΓΚ δυσὶν ταῖς ΘΓΚ <lb n="20"/> ἴσαι καὶ γωνία γωνίᾳ.</p></div></div></body></text></TEI>
                </passage>
            </reply>
            </GetPassage>