Special Right Triangles
Special Right Triangles
In geometry and trigonometry, there are two "special" right triangles that appear frequently. Memorizing their side ratios allows you to find missing side lengths instantly without relying on the Pythagorean theorem. More importantly, these triangles provide the exact trigonometric values for 30โ, 45โ, and 60โ.
The 45โ-45โ-90โ Triangle
A 45โ-45โ-90โ triangle is an isosceles right triangle. Because the two acute angles are equal, the two legs opposite those angles are also equal in length.
The ratio of the side lengths is 1:1:2โ.
- Legs: x
- Hypotenuse: x2โ
Example: Find the legs of a 45โ-45โ-90โ triangle with a hypotenuse of 10.
Solution: We know the relationship is Hypotenuse=Legโ 2โ. 10=x2โ Solving for x, we divide by 2โ: x=2โ10โ Rationalizing the denominator: x=2102โโ=52โ Both legs have a length of 52โ.
The 30โ-60โ-90โ Triangle
This triangle is formed by cutting an equilateral triangle perfectly in half.
The ratio of the side lengths is 1:3โ:2.
- Short Leg (opposite 30โ): x
- Long Leg (opposite 60โ): x3โ
- Hypotenuse (opposite 90โ): 2x
Tip: Always find the short leg (x) first, as it is the key to finding the other two sides easily.
Example: In a 30โ-60โ-90โ triangle, the side opposite the 30โ angle is 7. Find the other sides.
Solution: The side opposite the 30โ angle is the short leg, so x=7.
- The hypotenuse is twice the short leg: 2x=2(7)=14.
- The long leg (opposite 60โ) is the short leg times 3โ: x3โ=73โ.
Exact Trigonometric Values
Because all 45โ-45โ-90โ and 30โ-60โ-90โ triangles are similar, their side ratios give us constant, exact values for sine, cosine, and tangent functions.
For 45โ:
- sin(45โ)=2โ1โ=22โโ
- cos(45โ)=2โ1โ=22โโ
- tan(45โ)=11โ=1
For 30โ and 60โ:
- sin(30โ)=21โ
- cos(30โ)=23โโ
- tan(60โ)=13โโ=3โ