---
title: Pythagorean Theorem
slug: pythagorean-theorem
url: /detay/pythagorean-theorem
type: article
language: English
entity:
  primary: Pythagorean Theorem
  type: article
  disambiguation: Discover the Pythagorean Theorem: Understand right triangles & calculate distances using this fundamental geometric principle.
  categories:
    - name: Math
      slug: matematik
      url: /kategori/matematik
    - name: Engineering
      slug: muhendislik
      url: /kategori/muhendislik
  tags:
    - Pythagorean theorem
author: Ömer Said Aydın
created_at: 2025-01-30T15:28:25.475353+03:00
updated_at: 2025-04-17T12:29:49.681188+03:00
---

# Pythagorean Theorem 

<!-- CONTEXT: Article Content for "Pythagorean Theorem " -->

## Article Content

[The Pythagorean Theorem](/en/detay/pythagorean-theorem-beccc/llms.txt) is a fundamental [geometric](/en/detay/geometry-aab1c/llms.txt) theorem explaining the relationship between a right triangle's three sides. According to this theorem, in a right triangle, the square of the length of the hypotenuse is equal to the sum of the squares of the lengths of the other two sides.

![Image](https://cdn.kureansiklopedi.com/media/uploads/2026/02/11/pythagorean-theorem-p0dn6xn6.png)
*Mathematical Expression of the Pythagorean Theorem*

##### **Historical Development**

Although the Pythagorean Theorem is named after the ancient Greek mathematician [Pythagoras](/en/detay/pythagoras-d9e9f/llms.txt) (c. 570-495 BC), this theorem was believed to be known to several ancient civilizations before Pythagoras. In particular, similar relationships were used by the ancient Egyptians, Babylonians, and Chinese. The Egyptians, for example, used special cases like the 3-4-5 triangle to construct right angles for land measurements and construction purposes.

##### **Pythagorean Triples and Special Triangles**

Some right triangles have integer side lengths, and these are known as [Pythagorean Triples](/en/detay/pythagorean-brotherhood-3e81b/llms.txt). The most famous examples include:

- (3, 4, 5)
- (5, 12, 13)
- (8, 15, 17)
- (7, 24, 25)

These triples are widely used in fields such as construction, [engineering](/en/detay/mathematical-engineering-61f66/llms.txt), and [navigation](/en/detay/global-positioning-system-gps-34920/llms.txt).

##### **Applications of the Pythagorean Theorem**

The Pythagorean Theorem is extensively used in many fields of science and engineering. Some primary applications include:

**1. Engineering and Architecture:** It is used to determine whether the corners of buildings are precisely 90 degrees.

**2. Cartography and Navigation:** It is used to calculate the shortest distance between two points.

**3. Computer Graphics:** It is used in 3D modeling and image processing to calculate the position of objects.

**4. Security Systems:** It is used to determine the distance between a camera and [an](/en/detay/an-2/llms.txt) object in facial recognition algorithms.

**5. Astronomy:** It is used in calculating interplanetary distances and aligning telescopes.

The Pythagorean Theorem is one of the most fundamental theorems in [mathematics](/en/detay/mathematical-reasoning-9ea04/llms.txt). It [has](/en/detay/has-3/llms.txt) a wide range of applications in both theoretical and practical fields. Its proofs are supported by geometric and algebraic methods and are applied in areas ranging from everyday life to engineering.

<!-- CONTEXT: Academic Sources and References for "Pythagorean Theorem " -->

## Academic Sources and References

1. Dzierzon, B. "History of Mathematical Concepts." Department of Mathematics, Utah State University. Last modified Fall 2021. Accessed January 30, 2025. http://5010.mathed.usu.edu/Fall2021/BDzierzon/history.htmlCuemath. "Pythagoras Theorem." Accessed January 30, 2025. https://www.cuemath.com/geometry/pythagoras-theorem/NASA Glenn Research Center. "The Pythagorean Theorem." NASA. Accessed January 30, 2025. https://www.grc.nasa.gov/www/k-12/airplane/pythag.html