Benedetti, Giovanni Battista de
,
Io. Baptistae Benedicti ... Diversarvm specvlationvm mathematicarum, et physicarum liber : quarum seriem sequens pagina indicabit ; [annotated and critiqued by Guidobaldo Del Monte]
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[Item 6.50.]
Page: 428 (416)
[Item 6.51.]
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DISPVTATIONES.
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0187
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tem mutarent, quorum quodlibet eſſet quoque tam velox, quam eſt .g: igitur
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tam velox eſſet quam
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.</
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<
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">Corpora licet inæqualia eiuſdem materiæ & figuræ, ſireſiſten-
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tias habuerint ponderibus proportionales
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æqualiter mouebuntur.</
head
>
<
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xml:space
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head
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xml:space
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">EAdem ratione, quam cap. antecedente præſcripſimus, poſſet oſtendi, ſi duo cor-
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pora
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et
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ſuas reſiſtentias, ita ad inuicem proportionatas haberent, utſunt
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eorum pondera, in pleno pari velocitate prædita eſſe, quod in fine capitis noni leui
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ter attigi, quia punctum
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var
>
tam velox eſſet, ut centrum ipſius
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var
>
cum à tanto pondere
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i. motum eſſet; </
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>
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xml:space
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">quanto centrum ipſius
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var
>
atquetan
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number
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0187-01
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xlink:href
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tam reſiſtentiam duo corpora
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et
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ipſum
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o. ſolum haberet ex hypotheſi, dicta tamen corpo
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ra
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et
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>.e.</
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tam ſeparata, quam coniuncta, eandem
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/>
velocitatem retinerent
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>.g.</
var
>
igitur tam velox eſſet,
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quam
<
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>.o</
var
>
.</
s
>
</
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<
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">Maior hic demonſir atur eſſe proportio ponder is corpor is den
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ſioris ad pondus minus denſi in
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, quam
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ſit eorundem corporum in medio minus denſo, nec
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corporum ponder a ſeruare proportionem
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denſitatis mediorum.</
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<
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xml:space
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xml:space
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">PRopoſita nobis cum fuerint duo corpora
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>
et
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>.B.</
var
>
area corporea æqualia, quo-
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rum
<
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>.A.</
var
>
denſius ſit ipſo
<
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>.B.</
var
>
probabo in medio magis denſo, maiorem proportio
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/>
nem futuram ponderis ipſius
<
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>.A.</
var
>
ad pondus
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var
>
quàm in medio minus denſo.</
s
>
</
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<
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<
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xml:space
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">Sit igitur
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var
>
pondus totale ipſius corporis
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>.A.</
var
>
et
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var
>.q.k.</
var
>
ipſius corporis
<
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>.B.</
var
>
vnde
<
var
>.p.g.</
var
>
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maius erit ipſo
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>
. </
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<
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xml:space
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">Sit quoque
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pondus, quod medium magis denſum ſubtra-
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hit à pondere
<
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>.p.g.</
var
>
et
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var
>
ſit pondus, quod idem medium ſubtrahit à pondere
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var
>
et
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/>
<
var
>f.g.</
var
>
ſit pondus, quod medium minus denſum ſubtrahit à
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>
et
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>
illud, quodid@m
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ſubtrahit ab
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vnde
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æquale erit
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et
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ipſi
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quia quod ad
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attinet, corpora ſupponuntur æqualia, vnde proportio
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var
>
ad
<
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>.q.i.</
var
>
maior erit ea, quæ
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/>
eſt
<
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>.o.f.</
var
>
ad
<
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>.n.i.</
var
>
communi
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ſcientiæ notione, quia ſi
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ſcinderet
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.p.f. in pun
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cto
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>.c.</
var
>
ita. vt
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>.c.f.</
var
>
æquale eſ-
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/>
ſet ipſi
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>.q.i.</
var
>
proportio
<
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>.c.f.</
var
>
<
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ad
<
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>.q.i.</
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>
eſſet vt ea, quæ eſt
<
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>.
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o.f.</
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ad
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(hoc eſt nulla) </
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