Monantheuil, Henri de, Aristotelis Mechanica, 1599

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              <p type="main">
                <s id="id.001285">
                  <pb xlink:href="035/01/121.jpg" pagenum="81"/>
                  <emph type="italics"/>
                media, mouentur. </s>
                <s id="id.001286">Et ſic ex ratione Ariſtotelis, ſi vera eſt, caput remi
                  <lb/>
                plus antrorſum mouebitur quam palmula retrorſum. </s>
                <s id="id.001287">Alterum quod
                  <lb/>
                aſſumendum. </s>
                <s id="id.001288">eſt nauim tantum antrorſum moueri: quantum & re­
                  <lb/>
                mi caput. </s>
                <s id="id.001289">Quod ſi verum eſſet ſtatim concluſio hæc manifeſta
                  <lb/>
                eſſet.
                  <emph.end type="italics"/>
                </s>
              </p>
              <p type="main">
                <s id="id.001290">
                  <emph type="italics"/>
                Ergo nauis plus antrorſum mouetur: quam remi palmula re­
                  <lb/>
                trorſum.
                  <emph.end type="italics"/>
                </s>
              </p>
              <p type="main">
                <s id="id.001291">
                  <emph type="italics"/>
                Syllogiſmus igitur ſic eſto,
                  <emph.end type="italics"/>
                </s>
              </p>
              <p type="main">
                <s id="id.001292">
                  <emph type="italics"/>
                Quantum caput remi antrorſum mouetur: tantum & nauis.
                  <lb/>
                </s>
                <s id="id.001293">Sed caput remi plus antrorſum mouetur: quam palmula re­
                  <lb/>
                trorſum.
                  <emph.end type="italics"/>
                </s>
              </p>
              <p type="main">
                <s id="id.001294">
                  <emph type="italics"/>
                Ergo nauis plus antrorſum mouetur: quam palmula retrorſum.
                  <emph.end type="italics"/>
                </s>
                <s id="id.001295">
                  <emph type="italics"/>
                Huius ſyllogiſmi propoſitio ſine confirmatione deſerta eſt ab Ari­
                  <lb/>
                ſtotele. </s>
                <s id="id.001296">Etiamſi
                  <expan abbr="principiũ">principium</expan>
                non ſit. </s>
                <s id="id.001297">Ob id quid veritatis habeat poſtea
                  <lb/>
                diſcutiemus. </s>
                <s id="id.001298">Aſſumptionis confirmatio pendet ab eo quod cum caput
                  <lb/>
                & palmula remi ſint eadem moles eadem vi mota, illud tamen per
                  <lb/>
                aërem: hæc per aquam medium aëre denſius, moueatur. </s>
                <s id="id.001299">Quæ ratio
                  <lb/>
                verißima eſt in ijs, quæ ſeorſum mouentur, vt ſi remus totus per
                  <lb/>
                aërem, & totus per aquam ferretur eadem vi, dubium non eſt quin
                  <lb/>
                citius, & plus per aërem, quam per aquam, ob maiorem in aqua
                  <expan abbr="reſi­ſtẽtiam">reſi­
                    <lb/>
                  ſtentiam</expan>
                feratur. </s>
                <s id="id.001300">At remus vnus eſt, ſed ſuperficie aquæ ſectus, quaſi
                  <lb/>
                duo ſint ita capi poteſt. </s>
                <s id="id.001301">Et certum eſt quod ſi imaginemur vim ean­
                  <lb/>
                dem in capite atque in palmula mouenda cum hæc intra aquam, illud
                  <lb/>
                extra ſit, quod plus prouehetur illud: quam hæc.
                  <emph.end type="italics"/>
                </s>
              </p>
              <p type="main">
                <s id="id.001302">Sit enim remus.]
                  <emph type="italics"/>
                Confirmatio eſt geometrica aſſumptionis
                  <lb/>
                præcedentis ſyllogiſmi vbi præſupponit Ariſtoteles moueri nauim
                  <lb/>
                antrorſum. </s>
                <s id="id.001303">vnde infert caput remi ab eo loco, in quo erat ante remi­
                  <lb/>
                gationem, ad alium transferri. </s>
                <s id="id.001304">Ergo
                  <emph.end type="italics"/>
                  <foreign lang="el">a</foreign>
                  <emph type="italics"/>
                caput remi tranſlatum ſit ad
                  <emph.end type="italics"/>
                  <lb/>
                  <foreign lang="el">d.</foreign>
                </s>
                <s>
                  <emph type="italics"/>
                Quo autem tempore
                  <emph.end type="italics"/>
                  <foreign lang="el">a</foreign>
                  <emph type="italics"/>
                tranſlatum eſt ad
                  <emph.end type="italics"/>
                  <foreign lang="el">d,</foreign>
                  <emph type="italics"/>
                palmula
                  <emph.end type="italics"/>
                  <foreign lang="el">b</foreign>
                  <emph type="italics"/>
                non
                  <lb/>
                transfertur ad
                  <emph.end type="italics"/>
                  <foreign lang="el">e</foreign>
                  <emph type="italics"/>
                : alioqui æqualiter moueretur palmula atque caput,
                  <lb/>
                contra ea quæ ante poſita ſunt. </s>
                <s id="id.001305">Intelligatur enim remus
                  <emph.end type="italics"/>
                  <foreign lang="el">a b</foreign>
                  <emph type="italics"/>
                vbi eſt
                  <emph.end type="italics"/>
                  <lb/>
                  <foreign lang="el">d e,</foreign>
                  <emph type="italics"/>
                ſcalmo
                  <emph.end type="italics"/>
                  <foreign lang="el">g</foreign>
                  <emph type="italics"/>
                manente. </s>
                <s id="id.001306">fiunt duo triangula
                  <emph.end type="italics"/>
                  <foreign lang="el">a g d & b g e,</foreign>
                  <lb/>
                  <emph type="italics"/>
                quorum anguli qui ad
                  <emph.end type="italics"/>
                  <foreign lang="el">g,</foreign>
                  <emph type="italics"/>
                quia ad
                  <expan abbr="verticẽ">verticem</expan>
                oppoſiti, ſunt æquales prop.
                  <lb/>
                15. lib. 1. </s>
                <s>Tum latera, quæ ipſos continent
                  <emph.end type="italics"/>
                  <foreign lang="el">a g, d g,</foreign>
                  <emph type="italics"/>
                duobus
                  <emph.end type="italics"/>
                  <foreign lang="el">b g,
                    <lb/>
                  e g</foreign>
                  <emph type="italics"/>
                ſunt æqualia, quia partes ſunt dimidiæ eiuſdem remi
                  <emph.end type="italics"/>
                  <foreign lang="el">a b</foreign>
                  <emph type="italics"/>
                ax. 6.
                  <lb/>
                </s>
                <s id="id.001308">erunt igitur baſes
                  <emph.end type="italics"/>
                  <foreign lang="el">a d, b e</foreign>
                  <emph type="italics"/>
                æquales, vt reliqui anguli prop. 4. lib. 1.
                  <emph.end type="italics"/>
                </s>
              </p>
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