Calculating the area of a triangle is easy once you know the triangle area formula. Whether you have a right triangle, an equilateral triangle, or a scalene triangle, simple steps will help you calculate triangle area accurately every time.
Table of Contents
What Is a Triangle?
A triangle is a three-sided shape in geometry. It has:
- Three sides (a, b, c)
- Three angles (A, B, C)
- A base (b) and a height (h) you can use to find its area
There are three main types of triangles:
- Equilateral triangle: All sides equal
- Isosceles triangle: Two sides equal
- Scalene triangle: All sides different
Key Components of a Triangle
- Base (b): Any side you choose as the bottom.
- Height (h): Perpendicular distance from the base to the opposite vertex.
- Side lengths (a, b, c): Used in special formulas like Heron’s.
- Angles (A, B, C): Used when you know two sides and the included angle.
The Basic Triangle Area Formula
The most common formula for triangle area is:
Area=12×b×hArea=21×b×h
- b = base
- h = height
This area formula works for any triangle when you know its base and height.
How to Find the Height of a Triangle
- Direct measurement: Drop a straight line (altitude) from the top vertex to the base.
- Right triangles: Use the two legs as base and height.
- Scalene triangles: Draw the altitude and use the Pythagorean theorem if needed.
Alternate Area Formulas
When you don’t know the height, use these formulas:
- Heron’s formula (for any triangle):
Let s=a+b+c2s=2a+b+c. Then
Area=s(s−a)(s−b)(s−c)Area=s(s−a)(s−b)(s−c) - Two sides and included angle:
If you know sides a and b and angle C between them:
Area=12×a×b×sin(C)Area=21×a×b×sin(C)
Worked Examples
Right Triangle Example
- a = 6, b = 8 (legs)
- Area = ½ × 6 × 8 = 24
Equilateral Triangle Example
- a = 5
- Height = 52−(2.5)2=4.3352−(2.5)2=4.33
- Area = ½ × 5 × 4.33 = 10.83
Scalene Triangle with Heron’s Formula
- a = 7, b = 8, c = 9
- s = (7 + 8 + 9) / 2 = 12
- Area = √[12 × 5 × 4 × 3] = √720 = 26.83
Common Mistakes to Avoid
- Mixing up base and height. The height must be perpendicular.
- Forgetting to halve (b×h)(b×h).
- Plugging wrong side lengths into Heron’s formula.
Practice Problems
- b = 10, h = 6 → Area = 30
- a = 9, b = 12, c = 15 (use Heron’s)
- a = 4, b = 7, angle C = 60° → Area = ½ × 4 × 7 × sin(60°) = 12.12
FAQs
Can you find area without knowing the height?
Yes—use Heron’s formula or the two-sides-and-angle formula.
What units are used for triangle area?
Square units, like cm², m², or in².
How do I convert triangle area into different units?
Convert all measurements (base and height or sides) into the same unit before calculating.
Read More: How to Find Area of a Trapezoid: Formula, Examples & Step-by-Step Guide