Bošković, Ruđer Josip
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Theoria philosophiae naturalis redacta ad unicam legem virium in natura existentium
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quod horas dirimit, binæ debebunt eſſe denſitates ſimul, nimi-
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rum & </
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ſerierum termini.</
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transferenda ſo-
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lutio ipſa.</
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ſtentium ſatis, ni fallor, luculenter expoſui, ac geometricis fi-
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guris illuſtravi, adjectis nonnullis, quæ eodem recidunt, & </
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quæ in applicatione ad rem, de qua agimus, & </
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tiam hæc omnia ad legem continuitatis pertinentia allata ſunt,
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proderunt infra; </
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<
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ros huc transferre integros, incipiendo ab octavo, ſed numeros
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ipſos, ut & </
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rioribus conſentiant.</
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ta ex geometri-
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co exemplo.</
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datam rectam A B per ordinatas H M ipſi rectæ perpendi-
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culares; </
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EGF, E'G'F'. </
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nita ipſi rectæ A B perpendicularis, motu quodam continuo
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delata ab A ad B. </
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que CD, quæ præcedat tangentem EF, vel C'D', quæ con-
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ſequatur tangentem E' F'; </
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ſive erit impoſſibilis, & </
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E'G'F', in HI, H'I', occurret circulo in binis punctis M,
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m, vel M'm', & </
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H'M', H'm'. </
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lo E E': </
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<
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eſt limes inter tempus præcedens continuum A E, quo or-
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dinata non eſt, & </
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ordinata eſt; </
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E E', quo ordinata eſt, & </
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Vita igitur quædam ordinatæ eſt tempus E E': </
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in E, interitus in E'. </
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Habetur-ne quoddam eſſe ordinatæ, an non eſſe? </
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que eſſe, nimirum E G, vel E'G', non autem non eſſe. </
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ritur tota finitæ magnitudinis ordinata E G, interit tota fi-
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nitæ magnitudinis E'G', nec tamen ibi conjungit eſſe, & </
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eſſe, nec ullum abſurdum ſecum trahit. </
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primus terminus ſeriei ſequentis ſine ultimo ſeriei præceden-
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tis, & </
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tis ſine primo termino ſeriei ſequentis.</
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taphyſica con-
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ſideratione.</
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deratione rem perpendimus, ſtatim patebit. </
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nihili nullæ ſunt veræ proprietates: </
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reales proprietates ſunt. </
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le habere debet, & </
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num. </
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nec proinde ſui generis ultimum terminum, aut primum exi-
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git. </
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