DelMonte, Guidubaldo
,
In duos Archimedis aequeponderantium libros Paraphrasis : scholijs illustrata
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N10019
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077/01/194.jpg
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190
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B</
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<
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type
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<
s
id
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N17683
">Præterea cùm inquit,
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ex æqualiigitur eſt vt OB ad FG,
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Græ
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cus non habet,
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ad FG,
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"/>
idcirco poſt ea verba
<
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="
grc
">καὶ δὶ
<
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σου ἄ<10>α ἐσιν ξὁς
<
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α
<
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οβ</
foreign
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addenda ſunt
<
foreign
lang
="
grc
">ω̄<10>ὸς ζκ. </
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>
</
s
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</
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C</
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</
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<
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type
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<
s
id
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N176AC
">Similiter quando in quit
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emph
type
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"/>
ad compoſitam ex dupla vtriuſ〈que〉 ſimul
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emph.end
type
="
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<
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/>
<
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<
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AB BD, & quadrupla ipſius CB,
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emph.end
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græca verba ſunt
<
foreign
lang
="
grc
">ω̄<10>ο̂ς μὲν τὰν συγ
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lb
/>
κειμ
<
gap
/>
ναν ἔκτε τᾶς β συναμφοτὲ<10>ου τᾶς αβ βδ τᾶς Γβ</
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>
, in quib^{9} ſimiliter deli
<
lb
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deratur,
<
emph
type
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italics
"/>
& quadrupla.
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emph.end
type
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quare ita corrigendus videtur.
<
foreign
lang
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grc
">ω̄<10>ὸς μὲν τάν
<
lb
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συγκειμὲναν ἔ κ τε τας β συναμφοτέ<10>ου τᾶς αβ βδ, καὶ δ τἄς Γβ</
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, </
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D</
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</
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<
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type
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<
s
id
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">Poſtremum theorema, & ſi non habeat
<
expan
abbr
="
tãtam
">tantam</
expan
>
<
expan
abbr
="
obſcuritatẽ
">obſcuritatem</
expan
>
,
<
lb
/>
veluti pręcedens, non eſt tamen ſine aliqua obſcuritate, ob cu
<
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/>
ius intelligentiam hanc priùs propo ſitionem oſtendemus. </
s
>
</
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<
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type
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head
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<
s
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">PROPOSITIO.</
s
>
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<
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type
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<
s
id
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N176F1
">Si duæ fuerint rectæ lineę in para bolc ad diametrum ordi
<
lb
/>
natim applicatæ, erit maior parabole ad
<
expan
abbr
="
minorẽ
">minorem</
expan
>
, vt cubus ex
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lb
/>
dimidia lineę maioris ad cubum ex dimidia minoris. </
s
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id.077.01.194.1.jpg
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xlink:href
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077/01/194/1.jpg
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<
p
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type
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<
s
id
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">In parabole ABC, cuius diameter BF, duæ ſint rectæ lineæ
<
lb
/>
ad diametrum applicatæ AC DE. Dico parabolen ABC ad
<
lb
/>
parabolen DBE eandem habere proportionem, quam cub^{9}
<
lb
/>
ex AF ad cubum ex DG. lungantur AB BC DB BE; </
s
>
</
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</
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</
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</
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</
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