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Solving Right Triangles

Solving Right Triangles

To "solve" a right triangle means to find the exact measures of all its three sides and three angles. As long as you know the 90โˆ˜90^\circ angle and at least two other pieces of information (like one side and one acute angle, or two sides), you can figure out the rest.

The Tools You Need

To solve a right triangle, you will rely on four main mathematical tools:

  1. Trigonometric Ratios (SOH CAH TOA):
    • sinโก(ฮธ)=OppositeHypotenuse\sin(\theta) = \frac{\text{Opposite}}{\text{Hypotenuse}}
    • cosโก(ฮธ)=AdjacentHypotenuse\cos(\theta) = \frac{\text{Adjacent}}{\text{Hypotenuse}}
    • tanโก(ฮธ)=OppositeAdjacent\tan(\theta) = \frac{\text{Opposite}}{\text{Adjacent}}
  2. Inverse Trigonometric Functions: Use sinโกโˆ’1\sin^{-1}, cosโกโˆ’1\cos^{-1}, or tanโกโˆ’1\tan^{-1} to find a missing angle when you know two sides.
  3. Pythagorean Theorem: a2+b2=c2a^2 + b^2 = c^2, useful when you know two sides and need the third.
  4. Triangle Angle Sum: All angles in a triangle add up to 180โˆ˜180^\circ. In a right triangle, the two acute angles always add up to 90โˆ˜90^\circ.

Example 1: Given One Side and One Angle

Problem: In right โ–ณABC\triangle ABC, โˆ C=90โˆ˜\angle C = 90^\circ, side a=8a = 8, and โˆ A=35โˆ˜\angle A = 35^\circ. Solve the triangle.

Step 1: Find the missing angle (โˆ B\angle B). Since the acute angles must add up to 90โˆ˜90^\circ: โˆ B=90โˆ˜โˆ’35โˆ˜=55โˆ˜\angle B = 90^\circ - 35^\circ = 55^\circ

Step 2: Find side bb. We know โˆ A=35โˆ˜\angle A = 35^\circ, the opposite side a=8a = 8, and we want the adjacent side bb. We use tangent: tanโก(35โˆ˜)=8b\tan(35^\circ) = \frac{8}{b} b=8tanโก(35โˆ˜)โ‰ˆ80.7002โ‰ˆ11.43b = \frac{8}{\tan(35^\circ)} \approx \frac{8}{0.7002} \approx 11.43

Step 3: Find the hypotenuse cc. We can use sine (Opposite / Hypotenuse): sinโก(35โˆ˜)=8c\sin(35^\circ) = \frac{8}{c} c=8sinโก(35โˆ˜)โ‰ˆ80.5736โ‰ˆ13.95c = \frac{8}{\sin(35^\circ)} \approx \frac{8}{0.5736} \approx 13.95

The triangle is now solved: โˆ A=35โˆ˜\angle A = 35^\circ, โˆ B=55โˆ˜\angle B = 55^\circ, โˆ C=90โˆ˜\angle C = 90^\circ, a=8a = 8, bโ‰ˆ11.43b \approx 11.43, cโ‰ˆ13.95c \approx 13.95.

Example 2: Real-World Application

Trigonometry is incredibly useful for solving word problems involving heights and distances, often utilizing an angle of elevation (looking up) or an angle of depression (looking down).

Problem: A ladder 1515 ft long leans against a wall making a 70โˆ˜70^\circ angle with the ground. How high up the wall does it reach?

Solution: Imagine the right triangle formed by the wall, the ground, and the ladder.

  • The ladder is the hypotenuse: c=15c = 15.
  • The angle with the ground is 70โˆ˜70^\circ.
  • The height on the wall is the side opposite the 70โˆ˜70^\circ angle. Let's call it hh.

Since we want the Opposite side and have the Hypotenuse, we use sine: sinโก(70โˆ˜)=h15\sin(70^\circ) = \frac{h}{15} h=15โ‹…sinโก(70โˆ˜)h = 15 \cdot \sin(70^\circ) hโ‰ˆ15โ‹…0.9397โ‰ˆ14.1ย fth \approx 15 \cdot 0.9397 \approx 14.1 \text{ ft}

The ladder reaches approximately 14.114.1 feet up the wall.