Textbook Question
Find the exact values of s in the given interval that satisfy the given condition.
[0, 2π) ; sin s = -√3 / 2
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3. Unit Circle
Trigonometric Functions on the Unit Circle
Problem 3.81
Textbook Question
Suppose an arc of length s lies on the unit circle x² + y² = 1, starting at the point (1, 0) and terminating at the point (x, y). (See Figure 12, repeated below.) Use a calculator to find the approximate coordinates for (x, y) to four decimal places.
s = ―7.4
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Verified step by step guidance1
Identify that the unit circle is defined by the equation x^2 + y^2 = 1, and any point (x, y) on this circle satisfies this equation.
Recognize that the arc length s on the unit circle corresponds to the angle θ in radians, measured from the positive x-axis, where s = θ because the radius of the unit circle is 1.
Since the arc length s is given as -7.4, interpret this as a clockwise movement from the starting point (1, 0) on the unit circle.
Use the angle θ = -7.4 radians to find the coordinates (x, y) on the unit circle using the parametric equations: x = cos(θ) and y = sin(θ).
Calculate the approximate values of x = cos(-7.4) and y = sin(-7.4) using a calculator, ensuring the results are rounded to four decimal places.
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Key Concepts
Here are the essential concepts you must grasp in order to answer the question correctly.
Unit Circle
The unit circle is a circle with a radius of one centered at the origin of a coordinate plane. It is a fundamental concept in trigonometry, as it provides a geometric representation of the sine and cosine functions. Any point (x, y) on the unit circle corresponds to the cosine and sine of an angle θ, where x = cos(θ) and y = sin(θ). Understanding the unit circle is essential for solving problems involving angles and arc lengths.
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Arc Length
Arc length is the distance along the curve of a circle between two points. For a unit circle, the arc length s can be calculated using the formula s = rθ, where r is the radius and θ is the angle in radians. Since the radius of the unit circle is 1, the arc length is directly equal to the angle in radians. This relationship is crucial for determining the coordinates of points on the circle based on a given arc length.
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Radians and Degrees
Radians and degrees are two units for measuring angles. One complete revolution around a circle is 360 degrees or 2π radians. Radians are often preferred in trigonometry because they provide a direct relationship between the angle and the arc length on the unit circle. Converting between these units is essential when calculating angles or arc lengths, especially when using a calculator to find coordinates based on a specified arc length.
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