Borelli, Giovanni Alfonso, De motionibus naturalibus a gravitate pendentibus, 1670
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              <s id="s.000110">
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              punctum I eſſe centrum grauitatis communis ponde­
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              rum A, & B (cum funes nullius ponderis
                <expan abbr="ſupponãtur">ſupponantur</expan>
              )
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              deinde reuoluta trochlea
                <expan abbr="aſcẽdat">aſcendat</expan>
              pondus B ad L, &
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              oppoſitum pondus A deſcendat vſque ad K
                <expan abbr="coniũga-turque">coniunga­
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                turque</expan>
              recta KL ſecans rectam AB
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                <figure id="id.010.01.029.1.jpg" xlink:href="010/01/029/1.jpg" number="11"/>
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              in G. dico duo pondera A, & B iņ
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              communi eorum centro grauitatis
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              I circa libræ centrum ſtabile G mo­
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              tu directo, & perpendiculari ad
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              horizontem
                <expan abbr="deſcẽdere">deſcendere</expan>
              . </s>
              <s id="s.000111">quia in tro­
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              chleæ reuolutione
                <expan abbr="tãtumdẽ">tantumdem</expan>
                <expan abbr="deſcẽ-dit">deſcen­
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                dit</expan>
              terminus funis A quanta eſt ex­
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              plicatio funis è rota CDE, & pon­
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              dus B aſcendit quantum funis BQS
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              circumuoluitur circa rotam QSR
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              cùmque duæ rotæ concentricè con­
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              nexæ ſimul tempore
                <expan abbr="reuoluãtur">reuoluantur</expan>
              cir­
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              ca fixum axim F, ergo deſcenſus AK
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              ad
                <expan abbr="aſcẽſum">aſcenſum</expan>
              BL eamdem proportio­
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              nem habet, quam peripheria CDE ad peripheriam R
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              SQ, ſeu
                <expan abbr="eamdẽ">eamdem</expan>
              proportionem, quam habet radius
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              FE ad radium
                <expan abbr="Fq;">Fque</expan>
              quare in triangulis AGK, & BGL
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              ſimilibus, ob æquidiſtantiam laterum AK, & BL, erit
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              AG ad GB vt KG ad GL, ſeu vt AK ad BL;
                <expan abbr="proindeq;">proindeque</expan>
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              in eodem puncto fixo G duæ libræ AB, & KL ſe mutuò
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              ſecabunt in eadem proportione, quam habent motus
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              eorumdem terminorum, vnde, ex mechanicis, erit
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              punctum G centrum, & fulcimentum firmum̨
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              vtriuſque libræ AB, & KL poſtremò ducatur per I </s>
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