Baliani, Giovanni Battista
,
De motv natvrali gravivm solidorvm et liqvidorvm
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[Figure 91]
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[Figure 92]
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[Figure 93]
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[Figure 94]
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[Figure 95]
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[Figure 97]
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[Figure 98]
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[Figure 99]
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[Figure 100]
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[Figure 101]
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<
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<
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">Data diuturnitate in plano perpendiculari
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motus gravis, quod perseveret moveri super
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plano declinante; & data super eo diutur
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nitate, reperire longitudinem.
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type
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proof
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<
s
id
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">Ducatur grave perpendiculariter per AB diu
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turnitate C, & demum super plano incli
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nato BD, & data sit diuturnus E.</
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<
s
id
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">Perquirenda sit longitudo super BD quam grave
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conficiat diuturnitate E.</
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</
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<
s
id
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">Fiat ut C ad E ita AB ad BF
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, unde si AB
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concipiatur tanquam diuturnitas motus super
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AB, erit BF diuturnitas motus super BD.
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</
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<
s
id
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s.000675
">Producatur FB donec concurrat cum A G ori
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zontaliter ducta in G. </
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<
s
id
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">Et fiat CD tertia pro
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portionalis ad GB, GF
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.</
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Per 12. sexti.</
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Per 11. sexti.</
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</
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<
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<
s
id
="
s.000679
">Dico BD esse longitudinem quaesitam.</
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<
s
id
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s.000680
">Quoniam AB est diuturnitas ipsius AB per sup
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pos; GB erit diuturnitas ipsius GB
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, at GF
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est diuturnitas ipsius GD
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, igitur residuum BF
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est diuturnitas BD. </
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<
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">Quod etc.</
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Per 15. primi huius.</
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Per 3. pr. huius.</
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corollary
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head
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<
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id
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">Corollarium.</
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<
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id
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">Grave prodibit per AB, BD aequis tempo
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ribus si diuturnitas E fiat aequalis diu
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turnitati C.</
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