https://gate.unigre.it/mediawiki-test/index.php?action=history&feed=atom&title=Page%3AOrganum_mathematicum_libris_IX._explicatum_%281668%29.djvu%2F693Page:Organum mathematicum libris IX. explicatum (1668).djvu/693 - Revision history2026-05-03T13:06:35ZRevision history for this page on the wikiMediaWiki 1.35.7https://gate.unigre.it/mediawiki-test/index.php?title=Page:Organum_mathematicum_libris_IX._explicatum_(1668).djvu/693&diff=101550&oldid=prevGinevra Crosignani: /* Not proofread */ Created page with "eamque ex C transfer sursum in punctum E; Tangentem vero elevationis poli , acceptam in iisdem partibus styli , transfer ex C deorsum in F.<br> III. Duc rectas ED , et FD; e..."2020-08-17T14:12:33Z<p><span dir="auto"><span class="autocomment">Not proofread: </span> Created page with "eamque ex C transfer sursum in punctum E; Tangentem vero elevationis poli , acceptam in iisdem partibus styli , transfer ex C deorsum in F.<br> III. Duc rectas ED , et FD; e..."</span></p>
<p><b>New page</b></p><div><noinclude><pagequality level="1" user="Ginevra Crosignani" /></noinclude>eamque ex C transfer sursum in punctum E; Tangentem vero elevationis poli , acceptam in iisdem partibus styli , transfer ex C deorsum in F.<br><br />
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III. Duc rectas ED , et FD; et habebis Triangulum DEF, cujus angulus ad E est aequalis angulo elevationis poli; angulus ad F aequalis angulo complementi elevationis poli; angulus denique ad D rectus, ut mox ostendam.<br><br />
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IV. Pro Horologio Verticali transfer ex C sursum in E Tangentem elevationis poli, deorsum vero Tangentem complementi elevationis poli, seu Tangentem altitudinis Aequatoris, et duc rectas ED, FD : eritque angulus ad E aequalis angulo altitudinis Aequatoris, angulus ad F aequalis angulo altitudinis poli, angulus denique ad D rectus.<br><br />
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Exemplo rem declaremus. Sit construendum Triangulum Gnomonicum pro loco,ubi elevatio poli est graduum 42, Aequatoris vero graduum 48: Tangens graduum 42 est 900, vel 9; Tangens graduum 48 est 1111, vel 11 <unclear></unclear>. Transfer ergo ex C sursum in E partes 1111, vel 11 ½, qualium stylus CD habet 1000, aut 10; deorsum vero in F transfer partes 900, vel 9; et duc rectas ED, FD.<br><br />
Quod autem in triangulo DEF, constructo pro Horologio Horizontali, juxta praxin numero 2 traditam, angulus ad E sit aequalis angulo elevationis poli, angulus vero ad F aequalis angulo complementi , angulus denique ad D rectus, ita ostenditur. Triangulum DCE est rectangulum ad C, ex constructione; latus DC est sinus totus; latus CE Tangens complementi elevationis poli, ex hypothesi et constructione; ergo angulus CDE est angulus complementi elevationis poli, ac proinde per 32.pri.angulus ad E est angulus elevationis poli.<br><br />
Eodem modo ostenditur in triangulo rectangulo FCD,angulum ad F esse aequalem angulo altitudinis Aequatoris, quia angulus CDF est aequalis angulo elevationis poli, eo quod CF sit Tangens elevetionis poli.<br><br />
Si ergo angulus FED set aequalis anguluo elevationis poli , et angulus EFD aequalis angulo complementi elevationis poli, qui<noinclude><references/> {{TurnPage}}</noinclude></div>Ginevra Crosignani