Baliani, Giovanni Battista
,
De motv natvrali gravivm solidorvm et liqvidorvm
Text
Text Image
Image
XML
Thumbnail overview
Document information
None
Concordance
Figures
Thumbnails
List of thumbnails
<
1 - 10
11 - 20
21 - 30
31 - 40
41 - 50
51 - 60
61 - 70
71 - 80
81 - 90
91 - 100
101 - 110
111 - 120
121 - 130
131 - 140
141 - 150
151 - 160
161 - 170
171 - 177
>
11
12
13
14
15
16
17
18
19
20
<
1 - 10
11 - 20
21 - 30
31 - 40
41 - 50
51 - 60
61 - 70
71 - 80
81 - 90
91 - 100
101 - 110
111 - 120
121 - 130
131 - 140
141 - 150
151 - 160
161 - 170
171 - 177
>
page
|<
<
of 177
>
>|
<
archimedes
>
<
text
>
<
body
>
<
chap
>
<
pb
xlink:href
="
064/01/015.jpg
"/>
<
subchap1
type
="
supposition
">
<
p
type
="
head
">
<
s
id
="
s.000044
">SUPPOSITIONES</
s
>
</
p
>
<
subchap2
type
="
supposition
">
<
p
type
="
main
">
<
s
id
="
s.000045
">PRIMA. </
s
>
<
s
id
="
s.000046
">Solidorum aequipendu
<
lb
/>
lorum cujuscumque gravitatis vibra
<
lb
/>
tiones aequales sunt aequediu
<
lb
/>
turnae.</
s
>
</
p
>
</
subchap2
>
<
subchap2
type
="
supposition
">
<
p
type
="
main
">
<
s
id
="
s.000047
">2 Equipendulorum eorundem vibrationes
<
lb
/>
sunt aequediuturnae, etiamsi inaequales.</
s
>
</
p
>
</
subchap2
>
<
subchap2
type
="
supposition
">
<
p
type
="
main
">
<
s
id
="
s.000048
">3 Pendulorum inaequalium longitudines sunt
<
lb
/>
in duplicata ratione diuturnitatum vi
<
lb
/>
brationum, seu ut quadrata vibratio
<
lb
/>
num.</
s
>
</
p
>
</
subchap2
>
<
subchap2
type
="
supposition
">
<
p
type
="
main
">
<
s
id
="
s.000049
">4 Momentum gravis super plano inclinato
<
lb
/>
est ad ipsius gravitatem, ut perpendi</
s
>
</
p
>
</
subchap2
>
</
subchap1
>
</
chap
>
</
body
>
</
text
>
</
archimedes
>