Newton, Isaac
,
Philosophia naturalis principia mathematica
,
1713
Text
Text Image
Image
XML
Thumbnail overview
Document information
None
Concordance
Figures
Thumbnails
page
|<
<
of 524
>
>|
<
archimedes
>
<
text
>
<
body
>
<
chap
>
<
subchap1
>
<
subchap2
>
<
pb
xlink:href
="
039/01/245.jpg
"
pagenum
="
217
"/>
<
p
type
="
main
">
<
s
>
<
emph
type
="
italics
"/>
Corol.
<
emph.end
type
="
italics
"/>
1. Eſt igitur
<
emph
type
="
italics
"/>
Rr
<
emph.end
type
="
italics
"/>
æqualis (
<
emph
type
="
italics
"/>
DRXAB
<
emph.end
type
="
italics
"/>
/N)-(
<
emph
type
="
italics
"/>
RDGT
<
emph.end
type
="
italics
"/>
/N), ideoque
<
lb
/>
<
arrow.to.target
n
="
note193
"/>
ſi producatur
<
emph
type
="
italics
"/>
RT
<
emph.end
type
="
italics
"/>
ad
<
emph
type
="
italics
"/>
X
<
emph.end
type
="
italics
"/>
ut ſit
<
emph
type
="
italics
"/>
RX
<
emph.end
type
="
italics
"/>
æqualis (
<
emph
type
="
italics
"/>
DRXAB
<
emph.end
type
="
italics
"/>
/N), (id eſt, ſi
<
lb
/>
compleatur parallelogrammum
<
emph
type
="
italics
"/>
ACPY,
<
emph.end
type
="
italics
"/>
jungatur
<
emph
type
="
italics
"/>
DY
<
emph.end
type
="
italics
"/>
ſecans
<
emph
type
="
italics
"/>
CP
<
emph.end
type
="
italics
"/>
<
lb
/>
in
<
emph
type
="
italics
"/>
Z,
<
emph.end
type
="
italics
"/>
& producatur
<
emph
type
="
italics
"/>
RT
<
emph.end
type
="
italics
"/>
donec occurrat
<
emph
type
="
italics
"/>
DY
<
emph.end
type
="
italics
"/>
in
<
emph
type
="
italics
"/>
X
<
emph.end
type
="
italics
"/>
;) erit
<
emph
type
="
italics
"/>
Xr
<
emph.end
type
="
italics
"/>
æqua
<
lb
/>
lis (
<
emph
type
="
italics
"/>
RDGT
<
emph.end
type
="
italics
"/>
/N), & propterea tempori proportionalis. </
s
>
</
p
>
<
p
type
="
margin
">
<
s
>
<
margin.target
id
="
note193
"/>
LIBER
<
lb
/>
SECUNDUS.</
s
>
</
p
>
<
p
type
="
main
">
<
s
>
<
emph
type
="
italics
"/>
Corol.
<
emph.end
type
="
italics
"/>
2. Unde ſi capiantur innumeræ
<
emph
type
="
italics
"/>
CR
<
emph.end
type
="
italics
"/>
vel, quod perinde eſt,
<
lb
/>
innumeræ Z
<
emph
type
="
italics
"/>
X,
<
emph.end
type
="
italics
"/>
in progreſſione Geometrica; erunt totidem
<
emph
type
="
italics
"/>
Xr
<
emph.end
type
="
italics
"/>
in
<
lb
/>
progreſſione Arithmetica. </
s
>
<
s
>Et hinc Curva
<
emph
type
="
italics
"/>
DraF
<
emph.end
type
="
italics
"/>
per tabulam Lo
<
lb
/>
garithmorum facile delineatur. </
s
>
</
p
>
<
p
type
="
main
">
<
s
>
<
emph
type
="
italics
"/>
Corol.
<
emph.end
type
="
italics
"/>
3. Si vertice
<
emph
type
="
italics
"/>
D,
<
emph.end
type
="
italics
"/>
diametro
<
emph
type
="
italics
"/>
DE
<
emph.end
type
="
italics
"/>
deorſum producta, & La
<
lb
/>
tere recto quod ſit ad 2
<
emph
type
="
italics
"/>
DP
<
emph.end
type
="
italics
"/>
ut reſiſtentia tota, ipſo motus initio,
<
lb
/>
ad vim gravitatis, Parabola conſtruatur: velocitas quacum corpus
<
lb
/>
exire debet de loco
<
emph
type
="
italics
"/>
D
<
emph.end
type
="
italics
"/>
ſecundum rectam
<
emph
type
="
italics
"/>
DP,
<
emph.end
type
="
italics
"/>
ut in Medio uNI
<
lb
/>
formi reſiſtente deſcribat Curvam
<
emph
type
="
italics
"/>
DraF,
<
emph.end
type
="
italics
"/>
ea ipſa erit quacum ex
<
lb
/>
ire debet de eodem loco
<
emph
type
="
italics
"/>
D,
<
emph.end
type
="
italics
"/>
ſecundum eandem rectam
<
emph
type
="
italics
"/>
DP,
<
emph.end
type
="
italics
"/>
ut
<
lb
/>
in ſpatio non reſiſtente deſcribat Parabolam. </
s
>
<
s
>Nam Latus re
<
lb
/>
ctum Parabolæ hujus, ipſo motus initio, eſt (
<
emph
type
="
italics
"/>
DVquad./Vr
<
emph.end
type
="
italics
"/>
) &
<
emph
type
="
italics
"/>
Vr
<
emph.end
type
="
italics
"/>
<
lb
/>
eſt (
<
emph
type
="
italics
"/>
tGT
<
emph.end
type
="
italics
"/>
/N) ſeu (
<
emph
type
="
italics
"/>
DRXTt
<
emph.end
type
="
italics
"/>
/2N). Recta autem quæ, ſi duceretur, Hy
<
lb
/>
perbolam
<
emph
type
="
italics
"/>
GTB
<
emph.end
type
="
italics
"/>
tangeret in
<
emph
type
="
italics
"/>
G,
<
emph.end
type
="
italics
"/>
parallela eſt ipſi
<
emph
type
="
italics
"/>
DK,
<
emph.end
type
="
italics
"/>
ideoque
<
lb
/>
<
emph
type
="
italics
"/>
Tt
<
emph.end
type
="
italics
"/>
eſt (
<
emph
type
="
italics
"/>
CKXDR/DC
<
emph.end
type
="
italics
"/>
) & N erat (
<
emph
type
="
italics
"/>
QBXDC/CP
<
emph.end
type
="
italics
"/>
). Et propterea
<
emph
type
="
italics
"/>
Vr
<
emph.end
type
="
italics
"/>
eſt
<
lb
/>
(
<
emph
type
="
italics
"/>
DRqXCKXCP/2DCqXQB
<
emph.end
type
="
italics
"/>
), id eſt, (ob proportionales
<
emph
type
="
italics
"/>
DR
<
emph.end
type
="
italics
"/>
&
<
emph
type
="
italics
"/>
DC, DV
<
emph.end
type
="
italics
"/>
<
lb
/>
&
<
emph
type
="
italics
"/>
DP
<
emph.end
type
="
italics
"/>
) (
<
emph
type
="
italics
"/>
DVqXCKXCP/2DPqXQB
<
emph.end
type
="
italics
"/>
), & Latus rectum (
<
emph
type
="
italics
"/>
DVquad./Vr
<
emph.end
type
="
italics
"/>
) prodit
<
lb
/>
(2
<
emph
type
="
italics
"/>
DPqXQB/CKXCP
<
emph.end
type
="
italics
"/>
), id eſt (ob proportionales
<
emph
type
="
italics
"/>
QB
<
emph.end
type
="
italics
"/>
&
<
emph
type
="
italics
"/>
CK, DA
<
emph.end
type
="
italics
"/>
&
<
emph
type
="
italics
"/>
AC
<
emph.end
type
="
italics
"/>
)
<
lb
/>
(2
<
emph
type
="
italics
"/>
DPqXDA/ACXCP
<
emph.end
type
="
italics
"/>
), adeoque ad 2
<
emph
type
="
italics
"/>
DP,
<
emph.end
type
="
italics
"/>
ut
<
emph
type
="
italics
"/>
DPXDA
<
emph.end
type
="
italics
"/>
ad
<
emph
type
="
italics
"/>
CPXAC
<
emph.end
type
="
italics
"/>
; hoc
<
lb
/>
eſt, ut reſiſtentia ad gravitatem.
<
emph
type
="
italics
"/>
Q.E.D.
<
emph.end
type
="
italics
"/>
</
s
>
</
p
>
<
p
type
="
main
">
<
s
>
<
emph
type
="
italics
"/>
Corol.
<
emph.end
type
="
italics
"/>
4. Unde ſi corpus de loco quovis
<
emph
type
="
italics
"/>
D,
<
emph.end
type
="
italics
"/>
data cum velocitate,
<
lb
/>
ſecundum rectam quamvis poſitione datam
<
emph
type
="
italics
"/>
DP
<
emph.end
type
="
italics
"/>
projiciatur; & re
<
lb
/>
ſiſtentia Medii ipſo motus initio detur: inveniri poteſt Curva
<
lb
/>
<
emph
type
="
italics
"/>
DraF,
<
emph.end
type
="
italics
"/>
quam corpus idem deſcribet. </
s
>
<
s
>Nam ex data velocitate </
s
>
</
p
>
</
subchap2
>
</
subchap1
>
</
chap
>
</
body
>
</
text
>
</
archimedes
>
