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9.5 Trigonometric Ratios Unit IIC Day 4 Do Now Are all 30-60-90 triangles congruent? Are all 30-60-90 triangles similar? Explain. Trigonometric Ratios A trigonometric ratio is a ratio of the lengths of two sides of a right triangle. The three basic trigonometric ratios are called sine, cosine, and tangent. Trigonometric Ratios Let ∆ABC be a right triangle. The sine, the cosine, and the tangent of the acute angle θare defined as follows: opposite sin(q ) = hypotenuse adjacent cos(q ) = hypotenuse opposite tan(q ) = adjacent Ex. 1: Finding Trig Ratios Find the sine, the cosine, and the tangent of 45° without using a calculator. Do we have enough information to draw a picture? Ex. 2: Finding Trig Ratios Find the sine, the cosine, and the tangent of 60° without using a calculator. Start by drawing a picture. Ex. 3: Finding Trig Ratios Find the sine, cosine, and tangent of 30° without using a calculator. Start by drawing a picture. Ex. 4: Using Trig. Ratios Find the value of x. Round decimals to the nearest tenth. We know the value of the _____________ side and need the value of the ____________ side. Which ratio is that? Ex. 4A: Using Trig. Ratios Find the value of y. Round decimals to the nearest tenth. We know the value of the _____________ side and need the value of the ____________ side. Which ratio is that? Notes: If you look back at the previous examples, you will notice that the sine or the cosine of an acute angle is always less than 1. Why is this? Trig. Ratios in Real Life Suppose look up at a point in the distance, such as the top of a tree. The angle that your line of sight makes with a horizontal line is called angle of elevation. Ex. 5: Indirect Measurement You lie on the ground 45 feet from the base of the tree. You measure the angle of elevation from a point on the ground to the top of the top of the tree to be 59°. Estimate the height of the tree. Ex. 6: Estimating Distance The escalator at the Wilshire/Vermont Metro Rail Station in Los Angeles rises 76 feet at a 30° angle. Find the distance d a person travels on the escalator stairs. Closure Explain how the calculator “knows” the values of trigonometric ratios (e.g., sin(74°)) if it doesn’t have a picture of a triangle.
