Guevara, Giovanni di, In Aristotelis mechanicas commentarii, 1627

Table of figures

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            <p id="N180A3" type="main">
              <s id="N180DD">
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              circulos cogitur circumuolui. </s>
              <s id="N180E7">Id quod nec Ariſtoteles ne
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              gauit, aut tantus vir potuit ignorare; nec alienum eſt à tra­
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              dita eius doctrina, vt Baldus contendit, quaſi Philoſophus
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              dixiſſet, aquam in vorticibus circumferri per circulos perfe­
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              ctos, acta
                <expan abbr="q.">que</expan>
              diſtinctos, & corpus in ea latum ab vno in alium
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              circulum pertranſire; hoc eſt ab exterioribus in interiores
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              appropinquando ſe magis ad centrum. </s>
              <s id="N180FB">Quod proculdubio
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              falſum eſſet, cum ſenſu, vt diximus conſtet, aquam non mo­
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              ueri per circulos, ſed per ſpiras: ac minimè conſentaneum
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              ſit rationi, corpus delatum, diuerſum à deferente iter tenere.
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              </s>
              <s id="N18107">Præsertim cum latio corporis ſupernatantis in aqua, ſit ve­
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              ctio, & non impulſio. </s>
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            <p id="N1810C" type="main">
              <s id="N1810E">Ad faciliorem tamen captum eorum, quæ de mente
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              Ariſtotelis à nobis relata ſunt, ſit aqua primò rectà decur­
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              rens AB, quæ incidat in curuam ripam BC, vnde repul­
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              ſa vergere cogatur in gyrum deſcribendo quaſi portionem
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                <figure id="id.005.01.283.1.jpg" xlink:href="005/01/283/1.jpg" number="83"/>
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              quandam circuli iuxta figuram eiuſdem ripæ, cui aquæ mo­
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              les neceſsariò adaptatur, vt BCD. </s>
              <s id="N18122">Sitque corpus latum in
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              aqua vbi E. </s>
              <s id="N18128">Dicimus ergo quod aqua ceptum iter, ſeu mo­
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              tum circularem ſecundans nequit circulum abſolutum per­
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              ficere, quem punctis BCDF hic expreſſimus, eodemque
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              circulo iniectam, ac ſupernatantem magnitudinem E ſecum </s>
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