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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 30โˆ˜30^\circ, 45โˆ˜45^\circ, and 60โˆ˜60^\circ.

The 45โˆ˜45^\circ-45โˆ˜45^\circ-90โˆ˜90^\circ Triangle

A 45โˆ˜45^\circ-45โˆ˜45^\circ-90โˆ˜90^\circ 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 1:1:21 : 1 : \sqrt{2}.

  • Legs: xx
  • Hypotenuse: x2x\sqrt{2}

Example: Find the legs of a 45โˆ˜45^\circ-45โˆ˜45^\circ-90โˆ˜90^\circ triangle with a hypotenuse of 1010.

Solution: We know the relationship is Hypotenuse=Legโ‹…2\text{Hypotenuse} = \text{Leg} \cdot \sqrt{2}. 10=x210 = x\sqrt{2} Solving for xx, we divide by 2\sqrt{2}: x=102x = \frac{10}{\sqrt{2}} Rationalizing the denominator: x=1022=52x = \frac{10\sqrt{2}}{2} = 5\sqrt{2} Both legs have a length of 525\sqrt{2}.

The 30โˆ˜30^\circ-60โˆ˜60^\circ-90โˆ˜90^\circ Triangle

This triangle is formed by cutting an equilateral triangle perfectly in half.

The ratio of the side lengths is 1:3:21 : \sqrt{3} : 2.

  • Short Leg (opposite 30โˆ˜30^\circ): xx
  • Long Leg (opposite 60โˆ˜60^\circ): x3x\sqrt{3}
  • Hypotenuse (opposite 90โˆ˜90^\circ): 2x2x

Tip: Always find the short leg (xx) first, as it is the key to finding the other two sides easily.

Example: In a 30โˆ˜30^\circ-60โˆ˜60^\circ-90โˆ˜90^\circ triangle, the side opposite the 30โˆ˜30^\circ angle is 77. Find the other sides.

Solution: The side opposite the 30โˆ˜30^\circ angle is the short leg, so x=7x = 7.

  • The hypotenuse is twice the short leg: 2x=2(7)=142x = 2(7) = 14.
  • The long leg (opposite 60โˆ˜60^\circ) is the short leg times 3\sqrt{3}: x3=73x\sqrt{3} = 7\sqrt{3}.

Exact Trigonometric Values

Because all 45โˆ˜45^\circ-45โˆ˜45^\circ-90โˆ˜90^\circ and 30โˆ˜30^\circ-60โˆ˜60^\circ-90โˆ˜90^\circ triangles are similar, their side ratios give us constant, exact values for sine, cosine, and tangent functions.

For 45โˆ˜45^\circ:

  • sinโก(45โˆ˜)=12=22\sin(45^\circ) = \frac{1}{\sqrt{2}} = \frac{\sqrt{2}}{2}
  • cosโก(45โˆ˜)=12=22\cos(45^\circ) = \frac{1}{\sqrt{2}} = \frac{\sqrt{2}}{2}
  • tanโก(45โˆ˜)=11=1\tan(45^\circ) = \frac{1}{1} = 1

For 30โˆ˜30^\circ and 60โˆ˜60^\circ:

  • sinโก(30โˆ˜)=12\sin(30^\circ) = \frac{1}{2}
  • cosโก(30โˆ˜)=32\cos(30^\circ) = \frac{\sqrt{3}}{2}
  • tanโก(60โˆ˜)=31=3\tan(60^\circ) = \frac{\sqrt{3}}{1} = \sqrt{3}