Monantheuil, Henri de, Aristotelis Mechanica, 1599

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                  <pb xlink:href="035/01/214.jpg" pagenum="174"/>
                  <emph type="italics"/>
                æqualis rectæ
                  <emph.end type="italics"/>
                  <foreign lang="el">h q</foreign>
                :
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                alioqui ſi
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                  <lb/>
                  <figure id="id.035.01.214.1.jpg" xlink:href="035/01/214/1.jpg" number="79"/>
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                  <emph type="italics"/>
                ambæ peripheriæ ambabus re­
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                ctis eſſent æquales, cum ipſæ
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                ſint æquales rectæ, vt demon­
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                ſtratum eſt, eſſent & periphe­
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                riæ æquales, maior minori, quod
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                abſurdum. </s>
                <s id="id.002618">Ex quo exploditur
                  <lb/>
                ratio Bouilli, qui ex
                  <expan abbr="circũuolu­tione">circumuolu­
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                  tione</expan>
                circuli exactè rotundi ſu­
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                per plano ad libellam facto pu­
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                tabat inueniſſe rectam periphe­
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                riæ æqualem. </s>
                <s id="id.002619">Quæritur ergo quod eſt ſuperiori problemate diffici­
                  <lb/>
                lius, vt fieri poßit rectarum æqualium peragratio à circulis inæqua­
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                libus. </s>
                <s id="id.002620">Sit igitur vt rotæ axis
                  <emph.end type="italics"/>
                  <foreign lang="el">a</foreign>
                  <emph type="italics"/>
                tranſeat in F. </s>
                <s id="id.002622">Et quia
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                  <foreign lang="el">a h</foreign>
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                & F G
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                  <lb/>
                  <figure id="id.035.01.214.2.jpg" xlink:href="035/01/214/2.jpg" number="80"/>
                  <lb/>
                  <emph type="italics"/>
                æquales ſunt. </s>
                <s id="id.002623">Radij enim ſunt eiuſdem circuli minoris &
                  <emph.end type="italics"/>
                  <foreign lang="el">h</foreign>
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                G eſt
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                æquidiſtans
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                  <foreign lang="el">a</foreign>
                  <emph type="italics"/>
                F. </s>
                <s id="id.002624">Erit per demonſtrata punctum G in linea F H.
                  <lb/>
                </s>
                <s id="id.002625">Et ponatur quod punctum fuerit M in maiori circulo, quod tranſla­
                  <lb/>
                tum & retrò reuolutum peruenerit ad H, atque
                  <emph.end type="italics"/>
                  <foreign lang="el">a</foreign>
                  <emph type="italics"/>
                M ſecet circulum
                  <lb/>
                minorem
                  <emph.end type="italics"/>
                  <foreign lang="el">h</foreign>
                  <emph type="italics"/>
                F
                  <emph.end type="italics"/>
                  <foreign lang="el">e,</foreign>
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                vt in puncto I. </s>
                <s id="id.002626">Dico quod I eſt punctum G. </s>
                <s id="id.002627">Nam
                  <lb/>
                quia M eſt H, & in linea F H: præterea I eſt in linea
                  <emph.end type="italics"/>
                  <foreign lang="el">a</foreign>
                  <emph type="italics"/>
                M,
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                erit etiam in linea F H. </s>
                <s id="id.002628">Eſt etiam in circulo
                  <emph.end type="italics"/>
                  <foreign lang="el">h</foreign>
                  <emph type="italics"/>
                F
                  <emph.end type="italics"/>
                  <foreign lang="el">e. </foreign>
                  <emph type="italics"/>
                Ergo in puncto
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                communi vtrique. </s>
                <s id="id.002629">Nullum autem eſt præter G. </s>
                <s id="id.002630">Igitur I peruenit
                  <emph.end type="italics"/>
                </s>
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