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Solving Right Triangles Trigonometry MATH 103 S. Rook Overview • Section 2.3 in the textbook: – Solving simple right triangles – Solving more complex problems with right triangles 2 Solving Simple Right Triangles Solving Simple Right Triangles • We are now ready to solve for unknown components in right triangles in general: – ALWAYS draw a diagram and mark it up with the given information as well as what is gained while working the problem – When given two sides, we can obtain the third side using the Pythagorean Theorem – When given two angles, we can obtain the third angle by subtracting the sum from 180° 4 Solving Simple Right Triangles (Continued) – When given one angle and one side, we can obtain another side via a trigonometric function • SOHCAHTOA – When given two sides, we can obtain an angle via an inverse trigonometric function 5 Solving Simple Right Triangles (Example) Ex 1: Refer to right triangle ABC with C = 90°. In each, solve for the remaining components: a) A = 41°, a = 36 m b) a = 62.3 cm, c = 73.6 cm 6 Solving More Complex Problems with Right Triangles Solving More Complex Problems with Right Triangles • More complex problems will contain multiple triangles and/or figures, but the process still remains the same: – ALWAYS draw and mark up a diagram! – Calculations may require multiple steps – Sometimes there is more than one way to arrive at the desired answer • Only way to become proficient is to practice!!! 8 Solving More Complex Problems with Right Triangles (Example) Ex 2: The circle has a radius of r and center at C. The distance from A to B is x. If C = 65° and x = 22, find: a) r b) y 9 Solving More Complex Problems with Right Triangles (Example) Ex 3: The distance from D to C is x. If A = 32°, angle BDC = 48°, and AB = 56, find: a) h b) x c) angle ABD 10 Solving More Complex Problems with Right Triangles (Example) Ex 4: Each edge of the cube is 5 inches long. Find the measure of the angle formed by diagonals CF and CH: 11 Summary • After studying these slides, you should be able to: – Solve problems containing right triangles • Additional Practice – See the list of suggested problems for 2.3 • Next lesson – Applications (Section 2.4) 12
