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Induction In Geometry ( Little Mathematics Library) | L. I. Golovina, I. M. Yaglom

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Induction In Geometry ( Little Mathematics Library)

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Author: L. I. Golovina, I. M. Yaglom

Added by: mirtitles

Added Date: 2020-07-26

Publication Date: 1979

Language: English

Subjects: mirtitles, mathematics, induction, geometry, high school, little mathematics library

Collections: mir-titles, additional collections

Pages Count: 600

PPI Count: 600

PDF Count: 1

Total Size: 197.94 MB

PDF Size: 7.17 MB

Extensions: epub, pdf, gz, html, zip, torrent

Archive Url

Downloads: 3.15K

Views: 53.15

Total Files: 17

Media Type: texts

Description

The preface says:

This little book is intended primarily for high school pupils, teachers of mathematics and students in teachers training colleges majoring in physics or mathematics. It deals with various applications of the method of mathematical induction to solving geometric problems and was intended by the authors as a natural continuation of I. S. Sominsky’s booklet  The Method of Mathematical Induction published (in English) by Mir Publishers in1975. Our book contains 38 worked examples and 45 problems accompanied by brief hints. Various aspects of the method of mathematical induction are treated in them in a most instructive way. Some of the examples and problems may be of independent interest as well.

The book was translated from the Russian by Leonid Levant and was first published by Mir in 1979. This was also published in the Topics in Mathematics series in 1963, and was translated by A.W. Goodman and Olga A. Titelbaum.


Introduction: The Method of Mathematical Induction 7

Sec. 1. Calculation by Induction 12

Sec. 2. Proof by Induction 20

Map Colouring 33

Sec. 3. Construction by Induction 63

Sec. 4. Finding Loci by Induction 73

Sec. 5. Definition by Induction 80

Sec. 6. Induction on the Number of Dimensions 98

1. Calculation bv Induction on the Number of Dimensions 106
2. Proof by Induction on the Number of Dimensions 109
3. Finding Loci by Induction on the Number of Dimensions 126
4. Definition by Induction on the Number of Dimensions 130

References 132

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