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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146
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IO. BAPT. BENED.
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158
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0158
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xlink:href
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http://echo.mpiwg-berlin.mpg.de/zogilib?fn=/permanent/library/163127KK/pageimg/0158
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huius effectus conuerſo, ideſt, vt quemadmodum nunc ſupponuntur
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et
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eſſe duo
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centra quibus
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pondus
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ipſius
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imaginemur
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eſſe quoddam centrum à
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quo pendeant duo pondera
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et
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ſic inuicem proportionata, ut ſunt
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et
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>
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certe horum ponderum cauſa ſtatera
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quam vectem appellabamus à nulla parte
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inclinabitur. </
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<
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xml:space
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norm
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quod
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type
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annitente pondere ipſius
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var
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n.</
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minus ad
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quam ad
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ideſt ad
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minori vi opus erit in
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quàm in
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ad attollen-
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dum pondus ipſius
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& ſic per conſequens quantò longius erit punctum
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var
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var
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ab
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var
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tan
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lb
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tò minori quoque vi egebit, & conſequenter quando vis, aut reſiſtentia in
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var
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ita pro
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portionata erit illi, quæ eſt ipſius
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var
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vt eſt
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ad
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vectis non mouebitur. </
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<
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xml:space
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do erit proportio maior, reſiſtentiæ ipſius
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>.u.</
var
>
ad eam, quæ eſt ipſius
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var
>.o.</
var
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ea, quæ eſt
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>.o.
<
lb
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i.</
var
>
ad
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var
>.i.u.</
var
>
</
s
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<
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xml:id
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xml:space
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">tunc vectis à par-
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teipſius
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eleuabitur, ſi
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215
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0158-01
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xlink:href
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</
figure
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vero proportio minor eſſet
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quàm.o.i. ad
<
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>
</
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<
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xml:id
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xml:space
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ctis ab eadem parte depri-
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metur.</
s
>
</
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</
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<
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<
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style
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xml:space
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">De ratione cuiuſdam uis adauctæ.</
head
>
<
head
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xml:space
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">CAP. VI.</
head
>
<
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xml:space
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">QVibuſdam in locis vtuntur
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type
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reg
>
<
reg
norm
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quodam
"
type
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context
">quodã</
reg
>
<
reg
norm
="
inſtrumento
"
type
="
context
">inſtrumẽto</
reg
>
piſtorio ad
<
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ſubigendam
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type
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pa-
<
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ſtam, vnius tantum hominis ui adhibita, quæ quidem machina cum mihi di-
<
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gna contemplatione eſſe videatur, eius aliquam rationem proponere volui, pro cu-
<
lb
/>
ius deſcriptione imaginemur planum, in quo ſedet ille, qui voluit paſtam, & in quo
<
lb
/>
ipſa paſta eſt repoſita
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var
>.T.S.D.</
var
>
& triangulum
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var
>.T.A.S.</
var
>
immobile perpendiculare-
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lb
/>
q́ue ſuperficiei dicti plani, angulo autem
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var
>.A.</
var
>
coniunctum lignum
<
var
>.A.E.</
var
>
vt ſemidiame
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lb
/>
trum mobilem, & æqualem perpendiculari ipſius trianguli, </
s
>
<
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xml:id
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xml:space
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<
var
>.A.</
var
>
loco centri erit
<
lb
/>
et
<
var
>.D.O.</
var
>
ſit ſemidiameter, qui paſtam contundit, & ab eius extremo
<
var
>.O.</
var
>
(quod
<
var
>.O.</
var
>
<
lb
/>
quando
<
var
>.D.O.</
var
>
orizontalis eſt, in baſi dicti trianguli reperitur) veniat lignum
<
var
>.O.V.</
var
>
<
lb
/>
quod cum
<
var
>.A.V.</
var
>
ſit æquale perpendiculari imaginatæ ab angulo
<
var
>.A.</
var
>
baſi
<
var
>.T.S.</
var
>
<
reg
norm
="
deno- datum
"
type
="
context
">deno-
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datũ</
reg
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<
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tantum
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type
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wordlist/context
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utvulgo
<
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dicitur
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type
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ſeu flexile in
<
var
>.O.</
var
>
& in
<
var
>.V.</
var
>
vt elleuare
<
reg
norm
="
atque
"
type
="
simple
">atq;</
reg
>
deprimere ſemidiame
<
lb
/>
trum
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var
>.D.O.</
var
>
poſſit, et
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var
>.V.O.</
var
>
ſit æqualis
<
var
>.A.V.</
var
>
et
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var
>.V.</
var
>
medium ſit inter
<
var
>.A.</
var
>
et
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var
>.E.</
var
>
vnde
<
var
>.A.V.</
var
>
<
lb
/>
cum
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>.O.V.</
var
>
æquales erunt
<
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>.A.E.</
var
>
ſunt deinde duo ligna
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type
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ab
<
var
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ad baſim
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fixa, & immobilia inter ſe adeò diſtantia, vt inter ipſa
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<
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et
<
var
>.D.O.</
var
>
ſupra
<
lb
/>
& infra, ne deuiet ſemidiametrum
<
var
>.D.O</
var
>
. </
s
>
<
s
xml:id
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xml:space
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">In extremitate deinde ipſius
<
var
>.E.</
var
>
ſit lignum
<
lb
/>
quoddam tenue, vt digitus polex, ad angulos rectos cum
<
var
>.A.E.</
var
>
quod ab aliquo, qui
<
lb
/>
antedictam machinam ſtet, manibus teneatur, qui quidem homo idipſum lignum,
<
lb
/>
ideſt ſemidiametrum
<
var
>.A.E.</
var
>
à ſuperficie trianguli dicti, ad ſe trahendo, & deinde ver
<
lb
/>
ſus eundem triangulum impellendo, vim quandam maximam mediante ſemidia
<
lb
/>
metro
<
var
>.D.O.</
var
>
ſuper paſtam excitat.</
s
>
</
p
>
<
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>
<
s
xml:id
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xml:space
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">Pro cuius rei contemplatione volo vt ſecundam hanc ſubſcriptam figuram
<
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u.x.</
var
>
imaginemur, in qua
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var
>.u.</
var
>
exprimat
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var
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var
>
primæ figuræ, &
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var
>.a.</
var
>
denotet
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var
>.O.</
var
>
&
<
var
>.o.V.</
var
>
&
<
var
>.x.
<
lb
/>
E.</
var
>
imaginemur etiam
<
var
>.u.a.</
var
>
baſem trianguli
<
var
>.a.u.o.</
var
>
cui
<
var
>.o.t.</
var
>
perpendicularis dictæ baſi
<
var
>.
<
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/>
u.a.</
var
>
addatur. </
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<
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igitur
<
var
>.u.o.</
var
>
æqualis erit
<
var
>.o.x.</
var
>
& ipſi
<
var
>.o.a.</
var
>
imaginemur etiam
<
var
>.a.o.</
var
>
<
lb
/>
vſque ad
<
var
>.b.</
var
>
ita productam vt
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var
>.o.b.</
var
>
æqualis ſit
<
var
>.o.a.</
var
>
ponamus etiam pondus in
<
var
>.a.</
var
>
impel- </
s
>
</
p
>
</
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