Triangles are one of the simplest and most versatile shapes in geometry, forming the basis for many other geometric concepts. A triangle is a fundamental geometric shape composed of three-line segments that intersect at three distinct points.
This article aims to cover the definition, types, properties, formulas for calculating area & perimeter, and examples of triangles.
What is a Triangle?
A triangle is a closed two-dimensional shape with three straight sides and three interior angles. The sum of the interior angles of a triangle always equals 180 degrees. The points of a triangle are called vertices, while the line segments are the sides of the triangle.
Tringles are classified based on sides and angles:
Types of Triangles: Based on Side Lengths
- Equilateral Triangle.
- Isosceles Triangle.
- Scalene Triangle.
Equilateral Triangle
The lengths of the three sides are equal in an equilateral triangle. Each of its angles is 60 degrees. It is a special case of an acute triangle (all angles less than 90 degrees).
Isosceles Triangle:
An isosceles triangle has two sides of equal length and one side of a different length. The angles opposite the equal sides are also equal in measure. The angle opposite the longer side is typically larger than the other two angles.
Scalene Triangle:
A scalene triangle has all three sides of different lengths. Since its sides are unequal; its angles are also unequal. It can be an acute; obtuse; or right triangle; depending on the measures of its angles.
Types of Triangles: Based on Angle Measurements
Triangles can also be classified based on the measurements of their angles.
- Acute Triangle:
- Obtuse Triangle:
- Right Triangle:
Acute Triangle:
An acute triangle has all three angles less than 90 degrees. In other words, all its angles are “acute” (smaller than a right angle).
Obtuse Triangle:
An obtuse triangle has one angle greater than 90 degrees; known as an “obtuse” angle. The other two angles are acute (smaller than 90 degrees).
Right Triangle:
A right triangle has one angle exactly equal to 90 degrees; which is known as a “right” angle. The sum of the other two angles is also 90 degrees.
Combined Classification
These two classifications can be combined to describe triangles more precisely:
Equilateral Acute Triangle:
All sides are equal in length, and all angles are < 90 degrees.
Isosceles Obtuse Triangle:
Two sides are equal in length; one angle is > 90 degrees.
Scalene Right Triangle:
All sides are of different lengths; one angle is exactly 90 degrees.
Properties of Triangles
Triangles possess a range of properties. Some of the key properties include:
- Angle Sum Property: The sum of the three interior angles of a triangle always adds up to 180 degrees.
- Exterior Angle Property: The exterior angle of a triangle is equal to the sum of its two non-adjacent interior angles.
- Pythagorean Property: 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.
Area and Perimeter of a Triangle
The Perimeter of a Triangle:
The perimeter of a triangle is the sum of the lengths of all its sides.
P = a + b +c
Area of a Triangle:
Here are a couple of common methods to calculate the area of a Triangle:
Using Base and Height:
If you know the length of the base (b) of the triangle and its corresponding height (h) – the perpendicular distance from the base to the opposite vertex, then the area (A) can be calculated using the formula:
Area = 1/2 × Base × Height
The perimeter and area of a triangle can be solved by using our triangle calculator to get results in a fraction of a second.
Heron's Formula:
If you know the lengths of all three sides of the triangle you can use Heron's formula to calculate the area. Let “s” be the semi-perimeter of the triangle (half of the perimeter):
S = a + b + c / 2
So, the area can be calculated using Heron's formula:
A = [s×(s−a) ×(s−b) ×(s−c)]1 / 2
Examples of Triangle:
Let’s solve some examples to gain more understanding of the triangle to solidify our understanding.
Example 1: Perimeter Calculation
Find the perimeter of a triangle with the following side lengths:
- Side a = 12 units
- Side b = 15 units
- Side c = 18 units
Solution:
To find the perimeter of a triangle with the given side lengths, simply add up the lengths of all three sides:
Perimeter (P) = Side a + Side b + Side c
Perimeter (P) = 12 units + 15 units + 18 units
Perimeter (P) = 45 units
Therefore, the perimeter of the triangle is 45 units.
Example 2: Area Calculation using Base and Height
Given a triangle with
base (b) = 16 units
height (h) = 9 units,
Calculate its area.
Solution:
To calculate the area of the triangle using the given base and height, you can use the formula:
Given:
base (b) = 16 units
height (h) = 9 units
Formula:
Area (A) = 0.5 × base × height
= 0.5 × 16 × 9 = 72 square units.
Example 3: Heron's Formula for Area
A triangle has side lengths:
- Side a = 7 units
- Side b = 9 units
- Side c = 12 units
Calculate the area of the triangle using Heron's formula.
Solution:
All three sides are available so we use Heron's formula.
Step 1: Find the perimeter
S = a + b + c / 2
S = (7 + 9 + 12) / 2
S = 28 / 2 s = 14 units
Step 2: Plug the values into Heron's Formula
Area = √ (s × (s - a) × (s - b) × (s - c))
Area = √ (14 × (14 - 7) × (14 - 9) × (14 - 12))
Area = √ (14 × 7 × 5 × 2)
Area = √ (980) Area ≈ 31.30495 square units
Therefore, the area of the triangle is approximately 31.30495 square units.