Baliani, Giovanni Battista
,
De motv natvrali gravivm solidorvm et liqvidorvm
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<
s
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s.000624
">At AB est aequalis ipsi BE per constructionem.</
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<
s
id
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s.000625
">Ergo motus per BD fit diuturnitate AB. </
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<
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s.000626
">Quod
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etc.</
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<
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">Corollarium I.</
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<
s
id
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">Hinc sequitur, quod in quolibet puncto infra
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B est par impetus, fuerit ne motus per C
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D aut per ABD, cum fuerit par impetus in B
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.</
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Per 12. secundi huius.</
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">Corollarium II.</
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</
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type
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<
s
id
="
s.000631
">Quotiescunque CE est media inter CB, CD,
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lb
/>
etiamsi motus praecedens fuerit per AB;
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BE est diuturnitas motus per BD.</
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</
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type
="
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">
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p
type
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id
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">Corollarium III.</
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">
<
s
id
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">Idem sequitur etiamsi AB noni esset perpendicuĀ
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laris, nam probatur eodem pacto.</
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type
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<
s
id
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s.000635
">Sequitur etiam, quod si datis AB, & CB,
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fiat AB lineae aequalis BE, & ad CB, CE
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fiat tertia CD; mobile cadens aC, seu ab A,
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movebitur super BD aequali tempore quo per AB.</
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<
s
id
="
s.000636
">Et notandum pr. quod BD semper excedit duĀ
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plum ipsius AB, quia excedit duplum rectae BE.</
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