Theodosius <Bithynius>; Clavius, Christoph - Theodosii Tripolitae Sphaericorum libri tres

Theodosius <Bithynius>; Clavius, Christoph, Theodosii Tripolitae Sphaericorum libri tres

Table of contents

[131.] LEMMA.

[132.] SCHOLIVM.

[133.] COROLLARIVM.

[134.] THEOREMA 12. PROPOS 12.

[135.] SCHOLIVM.

[136.] THEOR. 13. PROPOS. 13.

[137.] SCHOLIVM.

[138.] THEOREMA 14. PROPOS. 14.

[139.] FINIS LIBRI III. THEODOSII. AD LECTOREM.

[140.] CHRISTOPHORI CLAVII BAMBERGENSIS E SOCIETATE IESV SINVS, VEL SEMISSES RECTARVM IN CIRCVLO SVBTENSARVM: LINEAE TANGENTES: ATQVE SECANTES.

[141.] CHRISTOPHORI CLAV II BAMBERGENSIS E SOCIETATE IESV SINVS, VEL SEMISSES RECTARVM in circulo ſubtenſarum: LINEÆ TANGENTES, ATQVE SECANTES. PRÆFATIO.

[142.] DEFINITIONES. I.

Page: 112 (100)

[143.] II.

Page: 113 (101)

[144.] III.

Page: 113 (101)

[145.] Vel aliter.

Page: 113 (101)

[146.] IIII.

Page: 113 (101)

[147.] V.

Page: 113 (101)

[148.] VI.

Page: 113 (101)

[149.] VII.

Page: 113 (101)

[150.] LEMMA.

Page: 118 (106)

[151.] THEOR. 1. PROPOS. 1.

Page: 121 (109)

[152.] COROLLARIVM.

Page: 122 (110)

[153.] PROBL. 1. PROPOS. 2.

Page: 122 (110)

[154.] PROBL. 2. PROPOS. 3.

Page: 123 (111)

[155.] COROLLARIVM.

Page: 123 (111)

[156.] THEOR. 2. PROPOS. 4.

Page: 124 (112)

[157.] COROLLARIVM.

Page: 124 (112)

[158.] SCHOLIVM.

Page: 125 (113)

[159.] THEOR 3. PROPOS. 5.

Page: 125 (113)

[160.] COROLLARIVM.

Page: 127 (115)

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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