Guevara, Giovanni di, In Aristotelis mechanicas commentarii, 1627

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          <chap id="N10019">
            <p id="N1671E" type="main">
              <s id="N16720">
                <pb pagenum="219" xlink:href="005/01/227.jpg"/>
              & ſucceſsiuè commenſurari, vt omnes penè Philoſophi fa­
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              tentur. </s>
              <s id="N16738">Maior enim vel minor velocitas atque ſucceſsio in
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              tranſitu, & in partium applicatione, ex vi alterius lationis
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              æquipollet maiori, vel minori extenſioni ipſius quantitatis
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              ad replendum æquale ſpatium ei, quod occupatur ab alia
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              quantitate in eodem tempore, qua ratione dicuntur coexi­
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              ſtere, ac inter ſe coaptari. </s>
            </p>
            <p id="N16745" type="main">
              <s id="N16747">Res itaque ſic eſt concipienda, vt in reuolutione circuli
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              minoris ad motum maioris ſemper pars minor ipſius attin
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              gat partem plani maiorem, quia velocius tranſit per illam
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              motu recto, quàm rotando æqualem
                <expan abbr="dimenſionẽ">dimenſionem</expan>
              proptiam
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              poſsit exponere, atque ſecundum ipſam ſe applicare. </s>
              <s id="N16756">Vnde
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              quod illi deeſt extenſionis compenſatur velociori ſucceſsio­
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              ne, & applicatione ſecundum lationem rectam ad coaptan­
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              dum ſe parti majori. </s>
              <s id="N1675F">Quod certè non eſt intelligendum
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              fieri per raptationem, quaſi per vnicum delati circuli pun­
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              ctum plura plani puncta, vel per
                <expan abbr="eandẽ">eandem</expan>
              . </s>
              <s id="N1676A">omnino circuli par­
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              tem, plures plani partes attingerentur; ſed per propriam,
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              rotationem. </s>
              <s id="N16771">Quia ita rapitur, ac fertur ſuper illud motu re­
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              cto, vt ſimul quamuis tardius feratur latione circulari per
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              quam partes, ac puncta ipſius peripheriæ iugiter mutantur.
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              </s>
              <s id="N16779">Cumque numerus infinities infinitus punctorum, ac indeter­
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              minatarum partium vtriuſque circuli ſufficiat ad mutatio­
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              nem ipſam continuam, & correſpondentiam, quam præſta­
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              re debet infinitis punctis, ac partibus plani, nullum relinqui­
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              tur inconueniens, minorem circumferentiam maiori ſpatio,
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              plani ob diſparem lationem, & applicationem inadæquatè
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              in tranſitu coaptari. </s>
              <s id="N16788">Idemque è conuerſo dici poteſt in re­
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              uolutione circuli maioris ad
                <expan abbr="motũ">motum</expan>
              minoris, vt ſcilicet ſem­
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              per pars maior ipſius eo reſpondeat parti minori in plano
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              ſuper quod fertur, quia tardius tranſit per illam motu recto,
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              quàm rotando æqualem ſibi dimenſionem poſſit attingere.
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              </s>
              <s id="N16798">Siquidem velocius rotando, quàm progrediendo, nequit at­
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              tingere tantam dimenſionem in plano, quantam ipſe exhi­
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              bet per circumuolutionem. </s>
              <s id="N1679F">Vnde quod ei ſupereſt exten­
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              ſionis circularis compenſatur tardiori ſucceſſione, & appli-</s>
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          </chap>
        </body>
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