Geometry

Author(s)

Bibliographic Information

Geometry

Felix Klein ; translated by Gert Schubring

(Elementary mathematics from a higher standpoint, v. 2)

Springer, c2016

  • : [pbk.]

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Note

"Translation of the 4th German editon "Elementarmathematik vom höheren Standpunkte aus", vol.2 by Felix Klein, Grundlehren der Mathematischen Wissenschaften in Einzeldarstellungen, Band 15, Verlag von Julius Springer, Berlin 1926. A previous English language edition, Felix Klein "Elementary Mathematics from an Advanced Standpoint-Geometry", translated by E.R. Hedrick and C.A. Noble, New York 1939, was based on the 3rd German edition and published by Dover Publications"--T.p. verso

Includes indexes

Description and Table of Contents

Description

These three volumes constitute the first complete English translation of Felix Klein's seminal series "Elementarmathematik vom hoeheren Standpunkte aus". "Complete" has a twofold meaning here: First, there now exists a translation of volume III into English, while until today the only translation had been into Chinese. Second, the English versions of volume I and II had omitted several, even extended parts of the original, while we now present a complete revised translation into modern English. The volumes, first published between 1902 and 1908, are lecture notes of courses that Klein offered to future mathematics teachers, realizing a new form of teacher training that remained valid and effective until today: Klein leads the students to gain a more comprehensive and methodological point of view on school mathematics. The volumes enable us to understand Klein's far-reaching conception of elementarisation, of the "elementary from a higher standpoint", in its implementation for school mathematics. This volume II presents a paradigmatic realisation of Klein's approach of elementarisation for teacher education. It is shown how the various geometries, elaborated particularly since the beginning of the 19th century, are revealed as becoming unified in a new restructured geometry. As Klein liked to stress: "Projective geometry is all geometry". Non-Euclidean geometry proves to constitute a part of this unifying process. The teaching of geometry is discussed in a separate chapter, which provides moreover important information on the history of geometry teaching and an international comparison.

Table of Contents

First Part: The Simplest Geometric Formations. I. Line-Segment, Area, Volume as Relative Quantities.- II. The Grassmannian Determinant Principle for the Plane.- III. The Grassmannian Principle for Space.- IV. Classification of the Elementary Configurations of Space According to their Behaviour under Transformation of Rectangular Coordinates.- V. Higher Configurations.- Part Two: Geometric Transformations. I. Affine Transformations.- II. Projective Transformations.- III. Higher Point Transformations.- IV. Transformations with Change of Space Element.- V. Theory of the Imaginary.- Part Three: Systematic Discussion of Geometry and its Foundations. I. The Systematic Discussion.- II. Foundations of Geometry.- Final Chapter: Observations about the Teaching of Geometry. I. The Teaching in England.- II. The Teaching in France.- III.The Teaching in Italy.- IV. Teaching in Germany.- Appendix I.- Appendix II.- Index of Names.- Index of Contents.

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Details

  • NCID
    BB22181500
  • ISBN
    • 9783662494431
  • LCCN
    2016943431
  • Country Code
    gw
  • Title Language Code
    eng
  • Text Language Code
    eng
  • Original Language Code
    ger
  • Place of Publication
    Berlin
  • Pages/Volumes
    xvi, 315 p.
  • Size
    24 cm
  • Parent Bibliography ID
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