Monantheuil, Henri de
,
Aristotelis Mechanica
,
1599
Text
Text Image
Image
XML
Thumbnail overview
Document information
None
Concordance
Figures
Thumbnails
Page concordance
<
1 - 30
31 - 60
61 - 90
91 - 120
121 - 150
151 - 180
181 - 210
211 - 240
241 - 252
>
Scan
Original
111
112
113
114
115
116
117
118
119
120
121
122
123
124
125
126
127
128
129
130
131
132
133
134
135
136
137
138
139
140
<
1 - 30
31 - 60
61 - 90
91 - 120
121 - 150
151 - 180
181 - 210
211 - 240
241 - 252
>
page
|<
<
of 252
>
>|
<
archimedes
>
<
text
>
<
body
>
<
chap
>
<
subchap1
>
<
p
type
="
main
">
<
s
id
="
id.001337
">
<
pb
xlink:href
="
035/01/125.jpg
"
pagenum
="
85
"/>
<
emph
type
="
italics
"/>
dicularis. </
s
>
<
s
id
="
id.001338
">Nauis vero idem interuallum conficiet quod ſcalmus B.
<
lb
/>
</
s
>
<
s
id
="
id.001339
">Dico igitur rectam A E maiorem eſſe recta B D. </
s
>
<
s
id
="
id.001340
">Secet enim re
<
lb
/>
cta A C rectam E F in G. </
s
>
<
s
id
="
id.001341
">Quia igitur A G E, & B G D
<
lb
/>
triangula ſunt æquiangula, erit ſicut A G ad B G: ſic A E
<
lb
/>
ad B D prop. 4. lib. 6. </
s
>
<
s
>Maior eſt autem A G ipſa B G, ax. 9.
<
lb
/>
</
s
>
<
s
id
="
id.001342
">Erit igitur A E maior quam B D. </
s
>
<
s
id
="
id.001343
">Itaque caput remi A maius
<
lb
/>
percurrit ſpatium: quam nauis. </
s
>
<
s
id
="
id.001344
">quod erat demonſtrandum.
<
emph.end
type
="
italics
"/>
</
s
>
</
p
>
<
figure
id
="
id.035.01.125.1.jpg
"
xlink:href
="
035/01/125/1.jpg
"
number
="
39
"/>
<
p
type
="
main
">
<
s
id
="
id.001345
">
<
emph
type
="
italics
"/>
Quod ſi per punctum B rectam duca
<
lb
/>
mus H K æqualem remo, & ad rectos
<
lb
/>
cum recta B D, & inſuper ſecantem A
<
emph.end
type
="
italics
"/>
<
lb
/>
3
<
emph
type
="
italics
"/>
in puncto I, manifeſtè intelligemus
<
lb
/>
ipſam rectam A E ( quæ eſt totus motus
<
lb
/>
capitis remi in vna remigatione ) conſtare
<
lb
/>
ex A I, & I E, quarum prior reſpon
<
lb
/>
det curuæ A H deſcriptæ per capitis remi
<
lb
/>
motum proprium: poſterior vero æqualis
<
lb
/>
eſt rectæ B D ( ſunt enim latera parallelo
<
lb
/>
grammi oppoſita prop. 34. lib. 1.) quæ motu
<
lb
/>
nauis decurſa eſt.
<
emph.end
type
="
italics
"/>
</
s
>
</
p
>
<
p
type
="
main
">
<
s
id
="
id.001346
">
<
emph
type
="
italics
"/>
Et quia Nonius ſine demonſtratione aſ
<
lb
/>
ſumit nauim tantùm decurrere, quantùm
<
lb
/>
ſcalmus, id quoque demonstremus. </
s
>
<
s
id
="
id.001347
">quia ad
<
lb
/>
ſequentia etiam vtile eſt.
<
emph.end
type
="
italics
"/>
</
s
>
</
p
>
<
p
type
="
main
">
<
s
id
="
id.001348
">
<
emph
type
="
italics
"/>
Ante remigationem remi existentis in ſcalmo B ſit nauis prora C
<
lb
/>
poſt remigationem ſit B
<
emph.end
type
="
italics
"/>
<
lb
/>
<
figure
id
="
id.035.01.125.2.jpg
"
xlink:href
="
035/01/125/2.jpg
"
number
="
40
"/>
<
lb
/>
<
emph
type
="
italics
"/>
in E & prora in D ſic
<
lb
/>
que C D erit nauis pro
<
lb
/>
motio, & B E ſcalmi.
<
lb
/>
</
s
>
<
s
id
="
id.001349
">Dico igitur C D & B E æquales, quia reliquæ ſunt ex æqualibus
<
lb
/>
B C, E D dempto communi E C axio. 3. </
s
>
<
s
id
="
id.001350
">Ergo nauis tantùm de
<
lb
/>
currit quantùm ſcalmus.
<
emph.end
type
="
italics
"/>
</
s
>
</
p
>
<
p
type
="
head
">
<
s
id
="
id.001351
">Propoſitio ſecunda. </
s
>
</
p
>
<
p
type
="
main
">
<
s
id
="
id.001352
">
<
emph
type
="
italics
"/>
Capite remi motu proprio, & naui æqualiter motis, palmula im
<
lb
/>
mota veluti centrum manet: & palmula immota, caput remi &
<
lb
/>
nauis æqualiter mota ſunt.
<
emph.end
type
="
italics
"/>
</
s
>
</
p
>
</
subchap1
>
</
chap
>
</
body
>
</
text
>
</
archimedes
>