Baliani, Giovanni Battista
,
De motv natvrali gravivm solidorvm et liqvidorvm
Text
Text Image
Image
XML
Thumbnail overview
Document information
None
Concordance
Figures
Thumbnails
Table of figures
<
1 - 30
31 - 60
61 - 90
91 - 101
>
[Figure 51]
Page: 90
[Figure 52]
Page: 91
[Figure 53]
Page: 92
[Figure 54]
Page: 93
[Figure 55]
Page: 94
[Figure 56]
Page: 95
[Figure 57]
Page: 96
[Figure 58]
Page: 108
[Figure 59]
Page: 111
[Figure 60]
Page: 112
[Figure 61]
Page: 116
[Figure 62]
Page: 117
[Figure 63]
Page: 118
[Figure 64]
Page: 119
[Figure 65]
Page: 121
[Figure 66]
Page: 121
[Figure 67]
Page: 122
[Figure 68]
Page: 123
[Figure 69]
Page: 124
[Figure 70]
Page: 125
[Figure 71]
Page: 126
[Figure 72]
Page: 127
[Figure 73]
Page: 138
[Figure 74]
Page: 139
[Figure 75]
Page: 141
[Figure 76]
Page: 143
[Figure 77]
Page: 144
[Figure 78]
Page: 145
[Figure 79]
Page: 147
[Figure 80]
Page: 148
<
1 - 30
31 - 60
61 - 90
91 - 101
>
page
|<
<
of 177
>
>|
1
PROPOSITIO
III
.
Sectiones
canalis
sunt
reciproce
in
subduplicata
ratione
longitudinum
.
75
[Figure 75]
Sit
canale
AB
sectum
in
C
.
Dico
sectiones
CB
esse
in
subduplicata
ratione
AB
,
AC
.
Quoniam
sectiones
CB
sunt
ut
velocitates
in
B
, &
in
C
,
at
velocitas
in
B
ad
velocitatem
in
C
est
in
subduplicata
ratione
AB
ad
AC
,
Ergo
sectio
C
ad
sectionem
B
est
in
subduplicata
ratione
AB
ad
AC
.
Quod
etc
.
Per
5
.
secundi
huius
.
Per
11
.
quinti
.
Per
33
.
primi
.
Corollarium
I
.
Igitur
si
canalis
latera
sint
parallela
,
altitudines
sectionem
sunt
in
subduplicata
ratione
longitudinum
.
Nam
si
latera
perpendicularia
canalis
intelligantur
bases
, &
ea
ratione
latitudines
canalis
ut
altitudines
,
quae
proinde
sunt
aequales
,
sectiones
sunt
ut
dicta
latera
perpendicularia
,
Text layer
Dictionary
Places
Text normalization
Original
Regularized
Normalized
Search
Exact
All forms
Fulltext index
Morphological index