| Titre : |
Theory and problems of projective geometry |
| Type de document : |
texte imprimé |
| Auteurs : |
Frank Ayres, Auteur |
| Editeur : |
New York : McGraw-Hill |
| Année de publication : |
1967 |
| Collection : |
Schaum's outline series |
| Importance : |
243 p. |
| Présentation : |
ill. |
| Format : |
28 cm |
| Note générale : |
La couv. porte en plus : Including 200 solved problems, completely solved in detail. - Index |
| Langues : |
Anglais (eng) |
| Mots-clés : |
Géométrie projective -- Problèmes et exercices
Geometry, Projective -- Problems, exercises, etc
Geometry, Projective |
| Index. décimale : |
514.14 Géométrie affine. Géométrie projective. |
| Résumé : |
The purpose of this book is to provide a first course in projective geometry for undergraduate majors in mathematics and for prospective teachers of high school geometry. For the former it will furnish an introduce a more general geometry from which, by proper specialization, the familiar metric geometry is obtained. Since only the real geometry of one and two domensions is considered here, every theorem may be illustrated by a diagram in the construction of which nothing more than a straight edge is required. |
| Note de contenu : |
Summary :
1. Introduction.
2. Cross rato.
3. Desargues' two-triangle theorem.
4. Harmonic sets.
5. Projectivities.
6. Involutions.
7. Axioms for plane projective geometry.
8. Point conics and line conics.
9. Poles and polar lines.
10. Theorems of pascal and brianchon.
... |
Theory and problems of projective geometry [texte imprimé] / Frank Ayres, Auteur . - New York : McGraw-Hill, 1967 . - 243 p. : ill. ; 28 cm. - ( Schaum's outline series) . La couv. porte en plus : Including 200 solved problems, completely solved in detail. - Index Langues : Anglais ( eng)
| Mots-clés : |
Géométrie projective -- Problèmes et exercices
Geometry, Projective -- Problems, exercises, etc
Geometry, Projective |
| Index. décimale : |
514.14 Géométrie affine. Géométrie projective. |
| Résumé : |
The purpose of this book is to provide a first course in projective geometry for undergraduate majors in mathematics and for prospective teachers of high school geometry. For the former it will furnish an introduce a more general geometry from which, by proper specialization, the familiar metric geometry is obtained. Since only the real geometry of one and two domensions is considered here, every theorem may be illustrated by a diagram in the construction of which nothing more than a straight edge is required. |
| Note de contenu : |
Summary :
1. Introduction.
2. Cross rato.
3. Desargues' two-triangle theorem.
4. Harmonic sets.
5. Projectivities.
6. Involutions.
7. Axioms for plane projective geometry.
8. Point conics and line conics.
9. Poles and polar lines.
10. Theorems of pascal and brianchon.
... |
|
514 Géométrie
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