Equal Parts of a Triangle

Introduction :

Let us discuss the equal parts of the triangle. The triangle is the one type of the polygon. The equal part of the triangle is commonly declared as the equal to three sides and equal to the three angles. The degree of triangle is declaring 180 degree. Each side is specifying only the 60 degree. Next we see the equal parts of the triangle.
Equal Parts of the Triangle

The equal part of the triangle is the normally called the equilateral triangle. The equilateral triangle is three sides are equal. The angles are equal, equal height of triangle and equal base of triangle. The following diagram is declaring the equilateral triangle.

 

 

diagram represent the equilateral triangle

 

diagram represent the equilateral triangle

The above diagram is trisecting the single side. That side is M and N below. The opposite vertex is joined. The O is specify the vertex. in the point is trisect the P and Q. There are the side which is divided into same segments. Those triangles contain the equal length of the base and equal length of the height. The area of the trisecting triangle is equal. The following diagram is declaring the equal parts of triangle.

diagram represent the structure of equal parts of triangle

 

 

 

 

diagram represent the structure of equal parts of triangle
Example of the Equal Parts of Triangle

The base of the equal triangle is 6 cm. what is the area of the equal triangle?

Solution:

The area formula for equal parts of the triangle is a = ½ bh. The b is declaring the base of the equal parts triangle. The h is declaring the height of the triangle.

Given base of the equal triangle is 6 cm. already we know that in equal triangle base and height is same so height of the equal triangle is 6cm.

A = ½ (6 cm * 6 cm)

A = ½ 36 cm2

A = 18 cm2.

The answer of the area of the triangle is A = 18 cm2.