Textbook Question
CONCEPT PREVIEW Find the radius of each circle.
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Ch. 3 - Radian Measure and The Unit Circle
Lial12th EditionTrigonometryISBN: 9780136552161
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Table of contents
- Ch. R - Algebra Review381
- Ch. 1 - Trigonometric Functions188
- Ch. 2 - Acute Angles and Right Triangles168
- Ch. 3 - Radian Measure and The Unit Circle155
- Ch. 4 - Graphs of the Circular Functions100
- Ch. 5 - Trigonometric Identities238
- Ch. 6 - Inverse Circular Functions and Trigonometric Equations158
- Ch. 7 - Applications of Trigonometry and Vectors148
- Ch. 8 - Complex Numbers, Polar Equations, and Parametric Equations15
Chapter 4, Problem 3.51
Find the approximate value of s, to four decimal places, in the interval [0, π/2] that makes each statement true.
cos s = 0.9250
Verified step by step guidance1
Identify the problem: We need to find the angle \( s \) in the interval \([0, \frac{\pi}{2}]\) such that \( \cos s = 0.9250 \).
Recall that the cosine function is the ratio of the adjacent side to the hypotenuse in a right triangle, and it is also an even function, meaning it is symmetric about the y-axis.
Use the inverse cosine function, \( \cos^{-1} \), to find the angle \( s \). This function will help us determine the angle whose cosine is 0.9250.
Calculate \( s = \cos^{-1}(0.9250) \) using a calculator or a trigonometric table to find the angle in radians.
Ensure that the calculated angle \( s \) is within the specified interval \([0, \frac{\pi}{2}]\).
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Key Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Cosine Function
The cosine function is a fundamental trigonometric function that relates the angle of a right triangle to the ratio of the length of the adjacent side to the hypotenuse. It is defined for all real numbers and is periodic with a period of 2π. In the context of the unit circle, the cosine of an angle corresponds to the x-coordinate of the point on the circle at that angle.
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Graph of Sine and Cosine Function
Inverse Trigonometric Functions
Inverse trigonometric functions, such as arccosine, are used to find the angle that corresponds to a given trigonometric ratio. For example, if cos(s) = 0.9250, then s can be found using s = arccos(0.9250). These functions are essential for solving equations involving trigonometric ratios and are typically restricted to specific intervals to ensure they return a unique angle.
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Quadrants and Angle Ranges
Understanding the quadrants of the unit circle is crucial for determining the values of trigonometric functions. The interval [0, π/2] corresponds to the first quadrant, where both sine and cosine values are positive. This knowledge helps in identifying the appropriate angle that satisfies the given cosine value, ensuring that the solution lies within the specified range.
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Related Practice
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