<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-grc1:37-38</requestUrn>
            </request>
            <reply>
                <urn>urn:cts:greekLit:tlg5022.tlg005.1st1K-grc1:37-38</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="37"><p>37. Οὐκοῦν μείζων ἐστίν p. 326, <del status="error">22</del> ὡς μείζονος
                        τμήματος οὖσα κατὰ τὸ λγʹ τοῦ γʹ βιβλίου τῆς ἐπιπέδου.</p><lb n="5"/></div><div type="textpart" subtype="section" n="38"><p>38. Ἀνακλώμεναι αἱ ὄψεις p. 328, <del>21</del> ἐὰν ἀπὸ τοῦ Κ ἐπιζεύξωμεν ἐπὶ
                        τὸ κέντρον, τουτέστι τὸ Ζ, ἔσονται αἱ τῶν ἡμικυκλίων ἴσαι κατὰ τὴν ἐφαρμογὴν
                        ἡ ὑπὸ ∠ΚΖ τῇ ὑπὸ ΖΚΑ. ὥστε ἡ ὑπὸ ∠ΚΘ ἐλάττων τῆς ὑπὸ <lb n="10"/> ΖΚΑ, πολλῷ πλέον τῆς ὑπὸ ΘΚ Α. ὁμοίως καὶ ἐὰν ἀπὸ τοῦ Ν ἐπιζεύξωμεν ἐπὶ
                        τὸ Ζ. ὥστε ἀνακλώμεναι αἱ ψεῖς αἱ ΘΚ, ΜΝ ἥξουσιν ὡς αἱ ΚΛ, ΝΞ διὰ τὸ ε΄.</p></div></div></body></text></TEI>
                </passage>
            </reply>
            </GetPassage>