Properties of Scalene Triangle
Key properties of a scalene triangle are,
- All three sides of a scalene triangle are not equal.
- No angle of the Scalene triangle is equal to one another.
- Interior angles of a scalene triangle can be either acute, obtuse, or right angle, but some of all its angle is 180 degrees.
- No line of Symmetry exists in the Scalene triangle
Scalene Triangle: Definition, Properties, Formula, Examples
A triangle is one of the simplest shapes in geometry, consisting of three sides and three angles. Among the various types of triangles, the scalene triangle stands out because it has unique properties that distinguish it from others. In a scalene triangle, all three sides have different lengths, and all three angles are different.
Scalene Triangle is defined as a type of triangle whose all sides and angles are unequal. It follows the angle sum property of the triangle. This lack of symmetry makes scalene triangles interesting and a bit more challenging to study compared to other types of triangles, like equilateral or isosceles triangles. Let’s discuss the properties, formula, and example problems on the Scalene triangle.
Table of Content
- Scalene Triangle Definition
- Classification of Triangles
- Scalene Triangle Types
- Properties of Scalene Triangle
- Difference between Scalene, Equilateral and Isosceles Triangles
- Scalene Triangle Formula
- Scalene Triangle Perimeter
- Scalene Triangle Area
- Solved Examples
- Practice Questions
- FAQs