Table of contents

0. Review of College Algebra4h 43m
1. Measuring Angles40m
2. Trigonometric Functions on Right Triangles2h 5m
3. Unit Circle1h 19m
4. Graphing Trigonometric Functions1h 19m
5. Inverse Trigonometric Functions and Basic Trigonometric Equations1h 41m
6. Trigonometric Identities and More Equations2h 34m
7. Non-Right Triangles1h 38m
8. Vectors2h 25m
9. Polar Equations2h 5m
10. Parametric Equations1h 6m
11. Graphing Complex Numbers1h 7m

5. Inverse Trigonometric Functions and Basic Trigonometric Equations

Inverse Sine, Cosine, & Tangent

Trigonometry

5. Inverse Trigonometric Functions and Basic Trigonometric Equations

Inverse Sine, Cosine, & Tangent

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1:27 minutes

Problem 37

Textbook Question

In Exercises 29–51, find the exact value of each expression. Do not use a calculator.sec⁻¹ (−1)

Verified step by step guidance

Understand that \( \sec^{-1}(x) \) is the inverse secant function, which gives the angle whose secant is \( x \).

Recall that \( \sec(\theta) = \frac{1}{\cos(\theta)} \). Therefore, \( \sec^{-1}(-1) \) means we are looking for an angle \( \theta \) such that \( \sec(\theta) = -1 \).

Since \( \sec(\theta) = \frac{1}{\cos(\theta)} \), we have \( \frac{1}{\cos(\theta)} = -1 \), which implies \( \cos(\theta) = -1 \).

Identify the angle \( \theta \) where \( \cos(\theta) = -1 \). This occurs at \( \theta = \pi \) (or 180 degrees) within the range of the inverse secant function, which is \([0, \pi]\) excluding \( \frac{\pi}{2} \).

Conclude that the exact value of \( \sec^{-1}(-1) \) is \( \pi \).

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Key Concepts

Here are the essential concepts you must grasp in order to answer the question correctly.

Inverse Trigonometric Functions

Inverse trigonometric functions, such as sec⁻¹ (also known as arcsec), are used to find the angle whose secant is a given value. The secant function is defined as the reciprocal of the cosine function, so understanding how to manipulate these relationships is crucial for solving problems involving inverse secant.

Domain and Range of Secant

The secant function has specific domain and range restrictions that are important when finding its inverse. The secant function is defined for all real numbers except where the cosine is zero, and its range is limited to values greater than or equal to 1 or less than or equal to -1. This affects the values that can be input into the inverse function.

Exact Values of Trigonometric Functions

Finding exact values of trigonometric functions often involves using special angles (like 0, 30, 45, 60, and 90 degrees) and their corresponding sine, cosine, and tangent values. For sec⁻¹ (−1), recognizing that the secant of an angle is -1 at specific angles (like 120° or 240°) is essential for determining the exact value without a calculator.