Textbook Question
Find each exact function value. See Example 3.
sin 5π/6
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1. Measuring Angles
Complementary and Supplementary Angles
Problem 85
Textbook Question
Find each exact function value. See Example 3.
tan (-14π/ 3)
Verified step by step guidance1
First, recognize that the tangent function has a period of \(\pi\), meaning \(\tan(\theta) = \tan(\theta + k\pi)\) for any integer \(k\). This allows us to simplify the angle by adding or subtracting multiples of \(\pi\).
Start by simplifying the angle \(-\frac{14\pi}{3}\). Since the period is \(\pi = \frac{3\pi}{3}\), find an integer \(k\) such that \(-\frac{14\pi}{3} + k\pi\) lies within a standard interval, for example between \(-\pi\) and \(\pi\) or between \$0$ and \(2\pi\).
Calculate \(k\) by dividing \(-\frac{14}{3}\) by \$1$ (since the period in terms of \(\pi\) is 1), and find the closest integer to add multiples of \(\pi\) to bring the angle into a simpler equivalent angle. For instance, add \(5\pi = \frac{15\pi}{3}\) to \(-\frac{14\pi}{3}\) to get a positive angle.
After simplification, express the resulting angle in terms of a known angle on the unit circle, such as \(\frac{\pi}{3}\), \(\frac{2\pi}{3}\), etc., to find the exact value of the tangent function using known tangent values.
Finally, use the identity \(\tan(\theta) = \frac{\sin(\theta)}{\cos(\theta)}\) and the known sine and cosine values for the simplified angle to write the exact value of \(\tan(-\frac{14\pi}{3})\).
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Key Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Angle Reduction Using Coterminal Angles
Angles differing by full rotations (multiples of 2π) share the same trigonometric values. To simplify tan(-14π/3), add or subtract 2π until the angle lies within a standard interval, such as [0, 2π), making it easier to evaluate.
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Coterminal Angles
Tangent Function Properties and Periodicity
The tangent function has a period of π, meaning tan(θ) = tan(θ + π). This property allows further simplification of angles by reducing them modulo π, which helps in finding exact values without a calculator.
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Exact Values of Tangent for Special Angles
Certain angles, like π/6, π/4, and π/3, have known exact tangent values (e.g., tan(π/3) = √3). Recognizing the simplified angle as one of these special angles enables direct determination of the exact tangent value.
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