Textbook Question
Concept CheckSuppose that ―90° < θ < 90° .Find the sign of each function value. sec(―θ)
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2. Trigonometric Functions on Right Triangles
Trigonometric Functions on Right Triangles
3:09 minutesProblem 108
Textbook Question
Concept Check Find a solution for each equation. sec(2θ + 6°) cos(5θ + 3°) = 1
Verified step by step guidance1
Recognize that \( \sec(2\theta + 6^\circ) \) is the reciprocal of \( \cos(2\theta + 6^\circ) \), so the equation becomes \( \frac{1}{\cos(2\theta + 6^\circ)} \cos(5\theta + 3^\circ) = 1 \).
Multiply both sides of the equation by \( \cos(2\theta + 6^\circ) \) to eliminate the fraction, resulting in \( \cos(5\theta + 3^\circ) = \cos(2\theta + 6^\circ) \).
Use the identity that if \( \cos A = \cos B \), then \( A = 2n\pi \pm B \) for any integer \( n \). Apply this to get two sets of equations: \( 5\theta + 3^\circ = 2n\pi + 2\theta + 6^\circ \) and \( 5\theta + 3^\circ = 2n\pi - (2\theta + 6^\circ) \).
Solve the first equation \( 5\theta + 3^\circ = 2n\pi + 2\theta + 6^\circ \) for \( \theta \) by isolating \( \theta \) on one side.
Solve the second equation \( 5\theta + 3^\circ = 2n\pi - 2\theta - 6^\circ \) for \( \theta \) by isolating \( \theta \) on one side.
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Key Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Secant Function
The secant function, denoted as sec(θ), is the reciprocal of the cosine function. It is defined as sec(θ) = 1/cos(θ). Understanding the secant function is crucial for solving equations involving it, as it transforms the problem into one that can be analyzed using cosine properties.
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Cosine Function
The cosine function, cos(θ), is a fundamental trigonometric function that relates the angle θ to the ratio of the adjacent side to the hypotenuse in a right triangle. In the context of the equation, recognizing the behavior and values of the cosine function is essential for determining when the product of sec(2θ + 6°) and cos(5θ + 3°) equals 1.
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Trigonometric Identities
Trigonometric identities are equations that involve trigonometric functions and are true for all values of the variables involved. Key identities, such as the Pythagorean identity and angle addition formulas, can simplify complex equations. In this case, applying relevant identities can help manipulate the equation to find solutions for θ.
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