![]() ![]() The third angle is called the vertex angle. The congruent angles are called the base angles. In order to understand the isosceles triangle theorem well, it is important that you know about triangles and conditions and properties of congruence and similarity between two triangles. Knowing which of the sides in an isosceles triangle is equal to another (a leg), or whether it is the third side (the base), gives us a way to reference these sides, and, as we will see later, to consider important properties of the angles. In this article, we have been given some useful terminology for the sides of an isosceles triangle. The isosceles triangle theorems establish a relationship between the different angles and sides of a triangle. A triangle in which two sides (legs) are equal and the base angles are equal is known as an isosceles triangle.Īs mentioned above, the isosceles triangle theorem is a set of mathematical statements related to the isosceles triangle that can be proven with mathematical proof. The name isosceles triangle is derived from the Greek words ‘iso’ which means same, and ‘skelos’ meaning legs. In this article, we will learn all about the isosceles triangle theorem, its converse with proofs and some solved examples. ![]() The isosceles triangle theorem will help you to solve any maths problem related to the isosceles triangle. Together with their properties are called isosceles triangle theorems. As a result, the isosceles triangle has some properties that set it apart from the other polygons in general. ![]()
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