Textbook Question
Find the area of a sector of a circle having radius r and central angle θ. Express answers to the nearest tenth. See Example 5.
r = 40.0 mi, θ = 135°
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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 56
Without using a calculator, decide whether each function value is positive or negative. (Hint: Consider the radian measures of the quadrantal angles, and remember that π ≈ 3.14.)
sin ( ―1)
Verified step by step guidance1
Identify the angle given: the problem asks about \( \sin(-1) \), where \(-1\) is in radians.
Recall that \( -1 \) radian is a negative angle, which means it is measured clockwise from the positive x-axis.
Determine the quadrant where the angle \( -1 \) radian lies. Since \( \pi \approx 3.14 \), and \( -1 \) is between \( 0 \) and \( -\pi/2 \) (which is approximately \(-1.57\)), the angle lies in the fourth quadrant.
Recall the sign of sine in each quadrant: sine is positive in the first and second quadrants, and negative in the third and fourth quadrants.
Since \( -1 \) radian is in the fourth quadrant, \( \sin(-1) \) is negative.
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Key Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Understanding Radian Measure
Radian measure is a way to express angles based on the radius of a circle. One full circle is 2π radians, so π radians equals 180 degrees. Knowing the approximate value of π (about 3.14) helps to locate angles on the unit circle and determine their quadrant.
Recommended video:
5:04
Converting between Degrees & Radians
Quadrantal Angles and Their Significance
Quadrantal angles are multiples of π/2 (90 degrees) that lie on the x- or y-axis of the unit circle. These angles divide the circle into four quadrants, each with specific signs for sine and cosine functions. Recognizing which quadrant an angle falls into helps determine the sign of trigonometric values.
Recommended video:
6:36Quadratic Formula
Sign of the Sine Function in Different Quadrants
The sine function corresponds to the y-coordinate on the unit circle. It is positive in the first and second quadrants (0 to π radians) and negative in the third and fourth quadrants (π to 2π radians). Identifying the quadrant of the angle allows you to decide if sin(θ) is positive or negative without a calculator.
Recommended video:
06:14Sum and Difference of Sine & Cosine
Related Practice
Textbook Question
Convert each degree measure to radians. If applicable, round to the nearest thousandth. See Example 1(c).
-47.69°
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Textbook Question
Convert each radian measure to degrees. Write answers to the nearest minute. See Example 2(c).
2
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Textbook Question
Without using a calculator, decide whether each function value is positive or negative. (Hint: Consider the radian measures of the quadrantal angles, and remember that π ≈ 3.14.)
cos 2
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Textbook Question
Without using a calculator, decide whether each function value is positive or negative. (Hint: Consider the radian measures of the quadrantal angles, and remember that π ≈ 3.14.)
sin 5
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Textbook Question
Work each problem. See Example 5. Angle Measure Find the measure (in radians) of a central angle of a sector of area 16 in² a circle of radius 3.0 in.
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