# Category:Pythagorean Triangles

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This category contains results about Pythagorean Triangles.

Definitions specific to this category can be found in Definitions/Pythagorean Triangles.

A **Pythagorean triangle** is a right triangle whose sides all have lengths which are integers.

## Also see

## Subcategories

This category has the following 2 subcategories, out of 2 total.

## Pages in category "Pythagorean Triangles"

The following 30 pages are in this category, out of 30 total.

### G

### L

### P

- Primitive Pythagorean Triangle/Example
- Pythagorean Triangle cannot be Isosceles
- Pythagorean Triangle from Fibonacci Numbers
- Pythagorean Triangle from Sum of Reciprocals of Consecutive Same Parity Integers
- Pythagorean Triangle whose Area is Half Perimeter
- Pythagorean Triangle whose Hypotenuse and Leg differ by 1
- Pythagorean Triangle whose Hypotenuse and Leg differ by 1/Sequence
- Pythagorean Triangle with Sides in Arithmetic Progression
- Pythagorean Triangle/Example
- Pythagorean Triangle/Example/1380-19,019-19,069
- Pythagorean Triangle/Example/3-4-5
- Pythagorean Triangle/Example/3059-8580-9109
- Pythagorean Triangle/Example/4485-5852-7373
- Pythagorean Triangle/Example/5-12-13
- Pythagorean Triangle/Example/6-8-10
- Pythagorean Triangle/Example/693-1924-2045
- Pythagorean Triangle/Example/7-24-25
- Pythagorean Triangles whose Area equal their Perimeter
- Pythagorean Triangles whose Areas are Repdigit Numbers

### S

- Smallest Pythagorean Quadrilateral with Integer Sides
- Smallest Pythagorean Triangle is 3-4-5
- Smallest Square Inscribed in Two Pythagorean Triangles
- Square of Hypotenuse of Pythagorean Triangle is Difference of two Cubes
- Square of Pythagorean Prime is Hypotenuse of Pythagorean Triangle
- Squares of form 2 n^2 - 1