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Foundations of Geometry

Audiobook

Foundations of Geometry

David Hilbert

The German mathematician David Hilbert was one of the most influential mathematicians of the 19th/early 20th century. Hilbert's 20 axioms were first proposed by him in 1899 in his book Grundlagen der Geometrie as the foundation for a modern treatment of Euclidean geometry.

Hilbert's axiom system is constructed with six primitive notions: the three primitive terms point, line, and plane, and the three primitive relations Betweenness (a ternary relation linking points), Lies on (or Containment, three binary relations between the primitive terms), and Congruence (two binary relations, one linking line segments and one linking angles).

The original monograph in German was based on Hilbert's own lectures and was organized by himself for a memorial address given in 1899. This was quickly followed by a French translation with changes made by Hilbert; an authorized English translation was made by E.J. Townsend in 1902. This translation - from which this audiobook has been read - already incorporated the changes made in the French translation and so is considered to be a translation of the 2nd edition.

Year of Publication: 1902Genres: Mathematics
Running Time: 05 hours 26 minutes 40 seconds
#Chapter Name
1
The Nights
Preface, Contents, and Introduction
Jim Wrenholt
11:44
2
The Nights
The elements of geometry and the five groups of axioms
Jim Wrenholt
2:30
3
The Nights
Group I: Axioms of connection
Jim Wrenholt
3:55
4
The Nights
Group II: Axioms of Order
Jim Wrenholt
3:23
5
The Nights
Consequences of the axioms of connection and order
Jim Wrenholt
7:00
6
The Nights
Group III: Axioms of Parallels (Euclid's axiom)
Jim Wrenholt
2:33
7
The Nights
Group IV: Axioms of congruence
Jim Wrenholt
8:38
8
The Nights
Consequences of the axioms of congruence
Jim Wrenholt
20:38
9
The Nights
Group V: Axiom of Continuity (Archimedes's axiom)
Jim Wrenholt
4:20
10
The Nights
Compatibility of the axioms
Jim Wrenholt
6:36
11
The Nights
Independence of the axioms of parallels. Non-euclidean geometry
Jim Wrenholt
4:59
12
The Nights
Independence of the axioms of congruence
Jim Wrenholt
6:25
13
The Nights
Independence of the axiom of continuity. Non-archimedean geometry
Jim Wrenholt
6:24
14
The Nights
Complex number-systems
Jim Wrenholt
6:33
15
The Nights
Demonstrations of Pascal's theorem
Jim Wrenholt
14:50
16
The Nights
An algebra of segments, based upon Pascal's theorem
Jim Wrenholt
7:02
17
The Nights
Proportion and the theorems of similitude
Jim Wrenholt
5:59
18
The Nights
Equations of straight lines and of planes
Jim Wrenholt
7:49
19
The Nights
Equal area and equal content of polygons
Jim Wrenholt
5:34
20
The Nights
Parallelograms and triangles having equal bases and equal altitudes
Jim Wrenholt
5:52
21
The Nights
The measure of area of triangles and polygons
Jim Wrenholt
10:05
22
The Nights
Equality of content and the measure of area
Jim Wrenholt
8:01
23
The Nights
Desargues's theorem and its demonstration for plane geometry by aid of the axiom of congruence
Jim Wrenholt
6:25
24
The Nights
The impossibility of demonstrating Desargues's theorem for the plane with the help of the axioms of congruence
Jim Wrenholt
10:15
25
The Nights
Introduction to the algebra of segments based upon the Desargues's theorme
Jim Wrenholt
4:58
26
The Nights
The commutative and associative law of addition for our new algebra of segments
Jim Wrenholt
4:16
27
The Nights
The associative law of multiplication and the two distributive laws for the new algebra of segments
Jim Wrenholt
12:16
28
The Nights
Equation of straight line, based upon the new algebra of segments
Jim Wrenholt
8:17
29
The Nights
The totality of segments, regarded as a complex number system
Jim Wrenholt
3:45
30
The Nights
Construction of a geometry of space by aid of a desarguesian number system
Jim Wrenholt
9:05
31
The Nights
Significance of Desargues's theorem
Jim Wrenholt
3:18
32
The Nights
Two theorems concerning the possibility of proving Pascal's theorem
Jim Wrenholt
3:13
33
The Nights
The commutative law of multiplication for an archimedean number system
Jim Wrenholt
5:23
34
The Nights
The commutative law of multiplication for a non-archimedean number system
Jim Wrenholt
9:46
35
The Nights
Proof of the two propositions concerning Pascal's theorem. Non-pascalian geometry
Jim Wrenholt
3:33
36
The Nights
The demonstation, by means of the theorems of Pascal and Desargues
Jim Wrenholt
5:29
37
The Nights
Analytic representation of the co-ordinates of points which can be so constructed
Jim Wrenholt
7:34
38
The Nights
Geometrical constructions by means of a straight-edge and a transferer of segments
Jim Wrenholt
6:51
39
The Nights
The representation of algebraic numbers and of integral rational functions as sums of squares
Jim Wrenholt
12:44
40
The Nights
Criterion for the possibility of a geometrical construction by means of a straight-edge and a transferer of segments
Jim Wrenholt
12:02
41
The Nights
Conclusion
Jim Wrenholt
14:09
42
The Nights
Appendix
Jim Wrenholt
22:31

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