Gravesande, Willem Jacob 's
,
Physices elementa mathematica, experimentis confirmata sive introductio ad philosophiam Newtonianam; Tom. 1
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MATHEMATICA, LIB. I. CAP. IV.
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ut nullus ſit in eo porus cujus diameter minimam datam ſu-
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peret lineam. </
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xml:space
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diviſum concipimus in cellulas cubicas, quarum latera æqua-
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lia aut minora ſint minimâ lineâ datâ: </
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<
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finitus erit, & </
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cellulæ dantur; </
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xml:space
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poſitam concipere poſſimus: </
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<
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gulis hiſce particulis minimis globum cavum formari. </
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<
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xml:space
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pter materiæ diviſibilitatem poteſt globus cavus ſemper au-
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geri minuendo materiæ craſſitiem, cum autem in ſingulis
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cellulis globus talis detur, poterunt ſinguli augeri, donec
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vicini ſeſe mutuo tangant, ut omnes ſimul ſpatium impleant.</
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</
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<
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">Objectiones præcipuæ, contra diviſibilitatem materiæ in
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infinitum, ſunt, infinitum finito contineri non poſſe; </
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<
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viſibilitate in infinitum ſequi, omnia corpora eſſe æqualia,
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aut infinitum alio infinito majus dari.</
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<
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proprietates quantitatis finitæ & </
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parvas, numero infinito, in quantitate finita darinon poſle, quis
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unquam probavit; </
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trarium in Scholio ſequenti demonſtratur.</
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<
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">25.</
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tilitatem in corporibus ad examen revocemus, hanc captum
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noſtrum in immenſumſuperare conſtabit; </
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rum natura dantur exempla talium particularum a ſe invicem
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ſeparatarum.</
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<
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</
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<
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<
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xml:space
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">Loquitur de filo ſerico trecentis ulnis Anglicanis longo & </
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<
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xlink:label
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">26.</
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ponderis duorum granorum cum ſemiſſe.</
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<
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<
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xml:space
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ginta pollices quadratos unicum tantum ponderare granum;
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<
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oculo diſtingui poterunt, dantur ergo in pollice quadrato
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partes viſibiles quadraginta millia, & </
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tium numerus eſt duarum millionum, quas partes viſibiles
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adhuc poſſe dividi nemo negabit.</
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