The Pythagorean Theorem

Dawson, John W.

doi:10.1007/978-3-319-17368-9_5

The Pythagorean Theorem

John W. Dawson Jr.²

Chapter

1962 Accesses

Abstract

The Pythagorean Theorem is one of the oldest, best known, and most useful theorems in all of mathematics, and it has also surely been proved in more different ways than any other. Euclid gave two proofs of it in the Elements, as Proposition I,47, and also as Proposition VI,31, a more general but less well-known formulation concerning arbitrary ‘figures’ described on the sides of a right triangle. The first of those demonstrations is based on a comparison of areas and the second on similarity theory, a basic distinction that can be used as a first step in classifying many other proofs of the theorem as well.

This is a preview of subscription content, log in via an institution.

Chapter: USD 29.95; Price excludes VAT (USA)

eBook: USD 54.99; Price excludes VAT (USA)

Softcover Book: USD 69.99; Price excludes VAT (USA)

Hardcover Book: USD 99.99; Price excludes VAT (USA)

Tax calculation will be finalised at checkout

Purchases are for personal use only

Learn about institutional subscriptions

Notes

1.
It is reprehensible that such a blatantly invalid proof was reproduced without comment in the NCTM reprint of Loomis’s book.
2.
Eli Maor, for one, has disagreed. In his book (Maor 2007) he proposes another candidate and provides much other illuminating discussion of the Pythagorean Theorem and various proofs thereof.
3.
Alternatively, in Zimba (2009) it is shown that the Pythagorean Theorem follows easily from the identities for sin(α −β) and cos(α −β), each of which, as is well known, can be derived directly from the ratio definitions (see, e.g., Nelsen 2000, pp. 40 and 46).
4.
Both due to Euclid himself, according to Proclus.
5.
In Maor (2007) the argument based on Figure 5.4 is called the ‘folding bag’ proof.
6.
For a proof, see Boltyanskii (1963).

References

Bogomolny, A.: The Pythagorean Theorem and its many proofs. http://www.cut-the-knot.org/pythagoras/index.shtml (2012)
Boltyanskii, V.G.: Equivalent and Equidecomposable Figures. D.C. Heath, Boston (1963)
Google Scholar
Heath, T.: The Thirteen Books of Euclid’s Elements (3 vols.). Dover, New York (1956)
Google Scholar
Knorr, W.: The Evolution of the Euclidean Elements. A Study of the Theory of Incommensurable Magnitudes and its Significance for Early Greek Geometry. Reidel, Dordrecht (1975)
Book MATH Google Scholar
Loomis, E.S.: The Pythagorean Proposition—its Demonstrations Analyzed and Classified, and Bibliography of Sources for Data of the Four Kinds of Proofs, 2nd ed. NCTM, Washington, D.C. (1940)
Google Scholar
Maor, E.: The Pythagorean Theorem, a 4000-year History. Princeton U.P., Princeton (2007)
MATH Google Scholar
Nelsen, R.B.: Proofs without Words II. More Exercises in Visual Thinking. Math. Assn. Amer., Washington, D.C. (2000)
MATH Google Scholar
Yanney, B.F., Calderhead, J.A.: New and old proofs of the Pythagorean Theorem. Amer. Math. Monthly 3, 65–67, 110–113, 169–171, 299–300; 4, 11–12, 79–81, 168–170, 250–251, 267–269; 5, 73–74; 6, 33–34, 69–71 (1896–9)
Google Scholar
Zimba, J.: On the possibility of trigonometric proofs of the Pythagorean Theorem. Forum Geometricorum 9, 275–278 (2009)
MathSciNet MATH Google Scholar

Download references

Author information

Authors and Affiliations

Penn State York, York, PA, USA
John W. Dawson Jr.

Authors

John W. Dawson Jr.
View author publications
You can also search for this author in PubMed Google Scholar

Rights and permissions

Reprints and permissions

Copyright information

About this chapter

Cite this chapter

Dawson, J.W. (2015). The Pythagorean Theorem. In: Why Prove it Again?. Birkhäuser, Cham. https://doi.org/10.1007/978-3-319-17368-9_5

Download citation

DOI: https://doi.org/10.1007/978-3-319-17368-9_5
Publisher Name: Birkhäuser, Cham
Print ISBN: 978-3-319-17367-2
Online ISBN: 978-3-319-17368-9
eBook Packages: Mathematics and StatisticsMathematics and Statistics (R0)

Publish with us

Policies and ethics