Theodosius <Bithynius>; Clavius, Christoph
,
Theodosii Tripolitae Sphaericorum libri tres
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[11.] DEFINIT IONES. I
Page: 16
[12.] II.
Page: 16
[13.] III.
Page: 16
[14.] IIII.
Page: 16
[15.] V.
Page: 16
[16.] SCHOLIVM.
Page: 17 (5)
[17.] VI.
Page: 17 (5)
[18.] THEOREMA 1. PROPOS. 1.
Page: 17 (5)
[19.] COROLLARIVM.
Page: 18 (6)
[20.] HOCEST.
Page: 18 (6)
[21.] PROBL. 1. PROPOS. 2.
Page: 18 (6)
[22.] DATAE Sphæræ centrum inuenire.
Page: 18 (6)
[23.] COROLLARIVM.
Page: 19 (7)
[24.] THEOREMA 2. PROPOS. 3.
Page: 19 (7)
[25.] COROLLARIVM.
Page: 19 (7)
[26.] THEOREMA 3. PROPOS. 4.
Page: 20 (8)
[27.] THEOREMA 4. PROPOS. 5.
Page: 20 (8)
[28.] THEOREMA 5. PROPOS. 6.
Page: 21 (9)
[29.] THEOREMA 6. PROPOS. 7.
Page: 23 (11)
[30.] THEOREMA 7. PROPOS. 8.
Page: 23 (11)
[31.] SCHOLIVM.
Page: 24 (12)
[32.] I.
Page: 24 (12)
[33.] II.
Page: 25 (13)
[34.] THEOR. 8. PROPOS. 9.
Page: 25 (13)
[35.] THEOR. 9. PROPOS. 10.
Page: 26 (14)
[36.] SCHOLIVM.
Page: 26 (14)
[37.] I.
Page: 27 (15)
[38.] COROLLARIVM.
Page: 27 (15)
[39.] II.
Page: 27 (15)
[40.] COROLLARIVM.
Page: 28 (16)
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241 - 270
271 - 300
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16
THEODOSII
SPHAERICORVM
LIBER
PRIMVS
.
6
[Figure 6]
DEFINIT
IONES
.
I
SPHAERA
eſt
figura
ſolida
compre-
henſa
vna
ſuperficie
,
ad
quam
ab
vno
eorum
punctorum
,
quæ
intra
figuram
ſunt
,
omnes
rectæ
lineæ
ductæ
ſunt
in-
ter
ſe
æquales
.
II
.
Centrum
autem
Sphæræ
,
eſt
eiuſmodi
punctũ
.
III
.
Axis
verò
Sphæræ
,
eſt
recta
quædã
linea
per
cen
trũ
ducta
, &
vtrin
que
terminata
in
ſphæræ
ſuper-
ficie
,
circa
quã
quieſcentẽ
circumuoluitur
ſphęra
.
IIII
.
Poli
ſphæræ
ſunt
extrema
puncta
ipſius
axis
.
V
.
Polus
Circuli
in
Sphæra
,
eſt
punctum
in
ſuper-
ficie
ſphæræ
,
à
quo
omnes
rectæ
lineæ
ad
Circuli
circumferentiam
tendentes
ſuntinter
ſe
æquales
.
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