Galilei, Galileo, De Motu Antiquiora

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                  <s id="id.1.2.8.03.03">
                    <pb ed="Favaro" n="331"/>
                  Ascalonitam in Commentariis super librum secundum inimitabilis Archimedis De sphaera et cylindro, inciderint: sunt enim hae duae lineae (et multae etiam aliae excogitari possent), quae, in infinitum protractae, semper magis accedunt, verum ut aliquando concurrant impossibile est; minuitur ergo semper eorum distantia, nunquam tamen </s>
                  <s id="id.1.2.8.03.04">Et si linea ad rectos angulos super lineam rectam quae conchoidi subiacet, vel super asymptotum, excitetur, et hanc ponamus moveri, semper manentibus angulis rectis, in infinitum versus partes ad quas in infinitum extenduntur lineae non concurrentes; in hac linea ad rectos
                    <lb ed="Favaro" n="10"/>
                  angulos, punctus, quo ab hyperbole vel conchoide secatur, semper versus alteram extremitatem movebitur ad eam accedendo, nunquam tamen perveniet ad ultimum </s>
                  <s id="id.1.2.8.03.05">Pari etiam pacto de celeritate accidit: potest enim semper tarditas motus imminui et, consequenter, celeritas augeri, nec tamen aliquando </s>
                  <s id="id.1.2.8.03.06">Ut, exempli causa, sit tarditas ab, quam si totam mobile absumeret, motus in instanti contingeret: dico, non esse necessarium, quamvis semper in infinitum minuatur, ut tandem </s>
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                <p>
                  <figure id="id.1.2.8.04.00" xlink:href="FIG1/F031.jpg" number="31"/>
                  <s id="id.1.2.8.04.01">Incipiat enim motus, qui in infinitum intendi potest: sit autem talis ut in prima unius milliarii distan</s>
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