DelMonte, Guidubaldo
,
Mechanicorvm Liber
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 - 270
271 - 288
>
Scan
Original
81
82
83
84
85
86
87
88
89
90
91
92
93
94
95
96
97
98
99
100
101
102
103
104
105
106
107
108
109
110
<
1 - 30
31 - 60
61 - 90
91 - 120
121 - 150
151 - 180
181 - 210
211 - 240
241 - 270
271 - 288
>
page
|<
<
of 288
>
>|
<
archimedes
>
<
text
>
<
body
>
<
chap
id
="
N1043F
">
<
pb
n
="
35
"
xlink:href
="
036/01/083.jpg
"/>
<
p
id
="
id.2.1.59.2.0.0.0
"
type
="
head
">
<
s
id
="
id.2.1.59.3.1.1.0
">ALITER. </
s
>
</
p
>
<
p
id
="
id.2.1.59.4.0.0.0
"
type
="
main
">
<
s
id
="
id.2.1.59.4.1.1.0
">Sit libra BAC, cu
<
lb
/>
ius centrum A; in pun
<
lb
/>
ctis verò BC pondera
<
lb
/>
appendantur æqualia G
<
lb
/>
F: ſitq; primùm cen
<
lb
/>
trum A vtcunque inter
<
lb
/>
BC. </
s
>
<
s
id
="
id.2.1.59.4.1.1.0.a
">Dico pondus F ad
<
lb
/>
pondus G eam in graui
<
lb
/>
<
figure
id
="
id.036.01.083.1.jpg
"
place
="
text
"
xlink:href
="
036/01/083/1.jpg
"
number
="
75
"/>
<
lb
/>
tate proportionem habere, quam habet diſtantia CA ad diſtan
<
lb
/>
tiam AB. </
s
>
<
s
id
="
id.2.1.59.4.1.1.0.b
">fiat vt BA ad AC, ita pondus F ad aliud H, quod ap
<
lb
/>
pendatur in B: pondera HF ex A æqueponderabunt. </
s
>
<
s
id
="
id.2.1.59.4.1.2.0
">ſed cùm
<
arrow.to.target
n
="
note113
"/>
<
lb
/>
pondera FG ſint æqualia, habebit pondus H ad pondus G ean
<
lb
/>
dem proportionem, quam habet ad F. </
s
>
<
s
id
="
N126D2
">vt igitur CA ad AB, ita
<
arrow.to.target
n
="
note114
"/>
<
lb
/>
eſt H ad G. </
s
>
<
s
id
="
N126D9
">vt autem H ad G, ita eſt grauitas ipſius H ad graui
<
lb
/>
tatem ipſius G; cùm in eodem puncto B ſint appenſa. </
s
>
<
s
id
="
id.2.1.59.4.1.3.0
">quare vt CA
<
lb
/>
ad AB, ita grauitas ponderis H ad grauitatem ponderis G. </
s
>
<
s
id
="
N126E2
">cùm au
<
lb
/>
tem grauitas ponderis F in C appenſi ſit æqualis grauitati ponderis
<
lb
/>
H in B; erit grauitas ponderis F ad grauitatem ponderis G, vt CA
<
lb
/>
ad AB, videlicet vt diſtantia ad diſtantiam. </
s
>
<
s
id
="
id.2.1.59.4.1.4.0
">quod demonſtrare
<
lb
/>
oportebat. </
s
>
</
p
>
<
p
id
="
id.2.1.60.1.0.0.0
"
type
="
margin
">
<
s
id
="
id.2.1.60.1.1.1.0
">
<
margin.target
id
="
note113
"/>
6
<
emph
type
="
italics
"/>
Primi Archim. de æquep.
<
emph.end
type
="
italics
"/>
</
s
>
<
s
id
="
id.2.1.60.1.1.3.0
">
<
margin.target
id
="
note114
"/>
7
<
emph
type
="
italics
"/>
Quinti.
<
emph.end
type
="
italics
"/>
</
s
>
</
p
>
<
p
id
="
id.2.1.61.1.0.0.0
"
type
="
main
">
<
s
id
="
id.2.1.61.1.1.1.0
">Si verò libra B
<
lb
/>
AC ſecetur vtcunq;
<
lb
/>
in D, & in DC ap
<
lb
/>
pendantur pondera
<
lb
/>
æqualia EF. </
s
>
<
s
id
="
id.2.1.61.1.1.1.0.a
">Dico
<
lb
/>
ſimiliter ita eſſe gra
<
lb
/>
<
figure
id
="
id.036.01.083.2.jpg
"
place
="
text
"
xlink:href
="
036/01/083/2.jpg
"
number
="
76
"/>
<
lb
/>
uitatem ponderis F ad grauitatem ponderis E, vt diſtantia CA ad
<
lb
/>
diſtantiam AD. </
s
>
<
s
id
="
id.2.1.61.1.1.1.0.b
">fiat AB æqualis ipſi AD, & in B appendatur
<
lb
/>
pondus G æquale ponderi E, & ponderi F. </
s
>
<
s
id
="
id.2.1.61.1.1.1.0.c
">Quoniam enim AB eſt
<
lb
/>
æqualis AD; pondera GE æqueponderabunt. </
s
>
<
s
id
="
id.2.1.61.1.1.2.0
">ſed cùm grauitas
<
lb
/>
ponderis F ad grauitatem ponderis G ſit, vt CA ad AB, & graui
<
lb
/>
tas ponderis E ſit æqualis grauitati ponderis G; erit grauitas pon
<
lb
/>
deris F ad grauitatem ponderis E, vt CA ad AB, hoc eſt vt CA
<
lb
/>
ad AD. </
s
>
<
s
id
="
N12738
">quod demonſtrare oportebat. </
s
>
</
p
>
</
chap
>
</
body
>
</
text
>
</
archimedes
>