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Acute Angles and Right Triangles

2. Acute Angles and Right Triangles. 2. Acute Angles and Right Triangles. 2.1 Trigonometric Functions of Acute Angles 2.2 Trigonometric Functions of Non-Acute Angles 2.3 Finding Trigonometric Function Values Using a Calculator 2.4 Solving Right Triangles

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Acute Angles and Right Triangles

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  1. 2 Acute Angles and Right Triangles

  2. 2 Acute Angles and Right Triangles • 2.1 Trigonometric Functions of Acute Angles • 2.2 Trigonometric Functions of Non-Acute Angles • 2.3 Finding Trigonometric Function Values Using a Calculator • 2.4 Solving Right Triangles • 2.5 Further Applications of Right Triangles

  3. Finding Trigonometric Function Values Using a Calculator 2.3 Finding Function Values Using a Calculator ▪ Finding Angle Measures Using a Calculator

  4. Caution When evaluating trigonometric functions of angles given in degrees, remember that the calculator must be set in degree mode. Get in the habit of always starting work by entering sin 90. If the displayed answer is 1, then the calculator is set for degree measure. Remember that most calculator values of trigonometric functions are approximations.

  5. Example 1 FINDING FUNCTION VALUES WITH A CALCULATOR • Approximate the value of each expression. (a) sin 49°12′ ≈ 0.75699506 (b) sec 97.977° Calculators do not have a secant key, so first find cos 97.977° and then take the reciprocal. sec 97.977° ≈ –7.20587921

  6. Example 1 Use the reciprocal identity FINDING FUNCTION VALUES WITH A CALCULATOR (continued) • Approximate the value of each expression. (c) ≈ –0.91354546 (d) sin (–246°)

  7. USING INVERSE TRIGONOMETRIC FUNCTIONS TO FIND ANGLES Example 2 Use the identity • Use a calculator to find an angle θ in the interval [0°, 90°] that satisfies each condition. (a) Use degree mode and the inverse sine function. (b)

  8. Caution To determine the secant of an angle, we find the reciprocal of the cosine of the angle. To determine an angle with a given secant value, we find the inverse cosine of the reciprocal of the value.

  9. Example 3 FINDING GRADE RESISTANCE • When an automobile travels uphill or downhill on a highway, it experiences a force due to gravity. This force F in pounds is the grade resistance and is modeled by the equation F = W sin θ, where θ is the grade and W is the weight of the automobile. If the automobile is moving uphill, then θ > 0°; if downhill, then θ < 0°.

  10. Example 3 FINDING GRADE RESISTANCE (cont.) (a) Calculate F to the nearest 10 lb for a 2500-lb car traveling an uphill grade with θ = 2.5°. (b) Calculate F to the nearest 10 lb for a 5000-lb truck traveling a downhill grade with θ = –6.1°. F is negative because the truck is moving downhill.

  11. Example 3 FINDING GRADE RESISTANCE (cont.) (c) Calculate F for θ = 0° and θ = 90°. Do these answers agree with your intuition? If θ = 0°, then there is level ground and gravity does not cause the vehicle to roll. If θ = 90°, then the road is vertical and the full weight of the vehicle would be pulled downward by gravity, so F = W.

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