Guevara, Giovanni di
,
In Aristotelis mechanicas commentarii
,
1627
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mula retrocedet vt vnum: tantum ſcilicet quantum eſt
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ſpatium, quo excedit illud, quod conficitur per motum
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contrarium. </
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<
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">Quæ omnia Geometricè at que exactius conſtare poſſunt
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ex his, quæ Petrus Nonius acutiſſimè demonſtrat in ſua
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Annotatione ſuper hunc ipſum locum Ariſtotelis. </
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<
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id
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">Quam
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uis non rectè videatur ſupponere, ipſum Philoſophum, vni
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uerſaliter aſſumpſiſſe tantum ſpatium conficere nauigium,
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quantum remi manubrium. </
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<
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">Fortaſſe propter illa verba
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ipſius Philoſophi: Non procederet autem vbi ex D, niſi
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commoueretur nauigium, & eò transferretur, vbi remi eſt
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principium. </
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<
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">Quæ tamen verba in diuerſum, ac veriorem
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prolata ſunt ſenſum, vt ſupra expoſuimus. </
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">Solum enim per
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ea intendit Philoſophus, quod non præcederet ſcalmus an
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trorſum ad partes D, quo tantum peruenit manubrium A;
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niſi commoueretur nauigium verſus eandem partem, ſe
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quendo remi principium, à quo trahitur, vel à quo illuc fuit
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impulſum. </
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<
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">His tandem ita conſtitutis de motione remi, applican
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do Ariſtoteles eandem obſeruationem, non abſimile eſſe
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docet, quod contingit in motione gubernaculi, ac temonis,
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vt ſcilicet ſicut ſcalmus, qui conſtituitur medium inter ex
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trema ipſius remi, quæ mouentur in contrarium, illuc tranſ
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fertur vbi remi eſt principium, nempe antrorſum, quo remi
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manubrium pergit, ac nauem propellit: ita locus vbi ap
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plicatur gubernaculum, ac primo attingit temonem (qui
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certè locus eſt in linea cadenti, qua temo puppi adhæret in
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cuſpide, & vbi conſtituitur etiam cardo) cum ſe habeat
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tanquam medium inter duo extrema, quæ mouentur in
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contrarium, videlicet manubrium gubernaculi, & alam te
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monis, qua mare propellitur, illuc intelligetur transferri,
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quo ipſum gubernaculi manubrium erat. </
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<
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enim ſcalmus, temo, ait Ariſtoteles, nempe ſecundum præ
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dictam lineam circa quam quaſi immotam, conuertitur la
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titudo ipſius temonis ex vna parte, & guberna culi manu
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brium ex alia, vt patet in hac prima figura; in qua cadens </
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