Stevin, Simon
,
Mathematicorum hypomnematum... : T. 4: De Statica : cum appendice et additamentis
,
1605
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7
7
*DE* S*TATICÆ ELEMENTIS.*
neceſſarium
duximus
quamvis
rectam
infinitam
per
centrum
diametrum
gravita-
tis
appellare
,
distinguere
{
q́ue
}
inter
pendulam
, &
non
pendulam
diametrum
:
unde
etiam
diſcrimen
inter
5
&
13
definitionem
bujus
&
ſuperior
is
edition
is
nature
eſt
.
6
DEFINITIO
.
Gravitatis
planum
diametrum
eſt
quodcunque
corpus
per
gravitatis
ſuæ
centrum
ſecat
.
DECLARATIO
.
Vt
quodvis
planum
quod
4
tæ
definitionis
globum
per
centrum
D
ſecat
,
ejus
ipſius
gravitatis
diametrum
planum
appellatur
.
Idem
de
aliis
corporibus
ju-
dicium
eſto
.
Affectio
hujus
propria
eſt
,
quomodolibet
ſecet
corpus
,
in
duas
æqueponderantes
partes
ſecare
.
7
DEFINITIO
.
Recta
duabus
pendulis
diametris
terminata
,
jugum
ſive
T*RABS*
dicatur
.
DECLARATIO
.
4
[Figure 4]
A
&
B
duo
corpora
ſunto
, &
pendulæ
gravitatis
dia-
metri
C
D
&
E
F
,
inter
quas
contingentibus
punctis
du-
ctæ
rectæ
G
H
,
A
B
,
I
K
aliæq́ue
infinitæ
pendulis
dia-
metris
terminatæ
,
quas
jugum
vocamus
unde
A
,
B
gra-
vitates
dependent
,
ad
Bilancis
jugum
alludentes
.
8
DEFINITIO
.
Iuga@
à
pendulâ
gravitatis
diametro
diviſi
partes
,
ex
qui-
bus
pondera
ſitu
æquilibria
dependĕt
,
Radii
appellantur
.
DECLARATIO
.
5
[Figure 5]
A
,
B
duo
corporaſunto
, &
jugum
illorum
C
D
partitum
in
E
,
à
pendula
diametro
F
,
duo
jugi
membra
ut
E
C
, &
E
D
,
ex
quibus
iſorropa
pondera
ſunt
ſuſpenſa
,
radiiappel-
lantur
.
9
DEFINITIO
.
Amborum
autem
ponderum
pendula
gravitatis
dia-
metrosanſa
nobis
dicitur
.
DECLARATIO
.
Vt
FE
,
in
8
definit
.
Anſa
eſt
.
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