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Chapter 4: Problem 37

In Exercises \(35-60\), find the reference angle for each angle. $$205^{\circ}$$

Short Answer

Expert verified
The reference angle for \(205^{\circ}\) is \(25^{\circ}\).

Step by step solution

01

Determine the Quadrant

Firstly, the quadrant of the given angle must be determined. Here, \(205^{\circ}\) lies in the third quadrant as it is greater than \(180^{\circ}\) and less than \(270^{\circ}\).
02

Calculate the Reference Angle

Since \(205^{\circ}\) is in the third quadrant, subtract the angle from \(180^{\circ}\) to get the reference angle. This gives: \(205^{\circ} - 180^{\circ} = 25^{\circ}\). So the reference angle is \(25^{\circ}\).

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Key Concepts

These are the key concepts you need to understand to accurately answer the question.

Understanding Angle Measurement
Angle measurement is an essential part of trigonometry. It helps us describe the size of an angle in a way that is universally understood. Angles can be measured in degrees or radians, but degrees are more common in basic trigonometry. One full circle is equal to 360 degrees. This means that each degree measures a small part of a circle.
  • Degrees divide a circle into 360 equal parts.
  • Each degree represents \(\frac{1}{360}\) of a circle.
  • A right angle is 90 degrees.
Understanding how to measure angles is crucial. It forms the basis of figuring out reference angles and other trigonometric concepts. Always remember where your angles are situated with respect to the circle.
Introduction to Quadrants in Trigonometry
The concept of quadrants in trigonometry helps us locate angles on a coordinate plane. A circle is divided into four regions called quadrants.
  • The first quadrant: Angles are positive and range from 0 to 90 degrees.
  • The second quadrant: Angles are also positive and range from 90 to 180 degrees.
  • The third quadrant: Angles range from 180 to 270 degrees and are negative when their corresponding reference angles are considered.
  • The fourth quadrant: Angles range from 270 to 360 degrees and again become positive when relating to reference angles.
Knowing which quadrant an angle is in helps us determine the angle's characteristics. It also aids in calculating the reference angle, which is always a positive acute angle used in trigonometric functions.
Basics of Trigonometric Functions
Trigonometric functions are all about understanding relationships within a right triangle. The primary trigonometric functions are sine, cosine, and tangent.
  • **Sine (sin):** This function is defined as the ratio of the length of the opposite side to the hypotenuse for a given angle.
  • **Cosine (cos):** Cosine is the ratio of the length of the adjacent side to the hypotenuse.
  • **Tangent (tan):** Tangent is the ratio of the opposite side to the adjacent side.
These functions rely heavily on understanding the reference angle. The reference angle allows us to find the values of trigonometric functions for angles that exceed 90 degrees by relating them to their equivalent acute angles. Mastery of these functions provides a foundational tool for more advanced mathematics.

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Most popular questions from this chapter

Graph one period of each function. $$y=\left|2 \cos \frac{x}{2}\right|$$

Describe the relationship between the graphs of \(y=A \cos (B x-C)\) and \(y=A \cos (B x-C)+D\)

Determine whether each statement makes sense or does not make sense, and explain your reasoning. Using radian measure, I can always find a positive angle less than \(2 \pi\) coterminal with a given angle by adding or subtracting \(2 \pi\)

Use a graphing utility to graph \(y=\sin x\) and \(y=x-\frac{x^{3}}{6}+\frac{x^{5}}{120}\) in a \(\left[-\pi, \pi, \frac{\pi}{2}\right]\) by [-2,2,1] viewing rectangle. How do the graphs compare?

Will help you prepare for the material covered in the next section. a. Graph \(y=\tan x\) for \(-\frac{\pi}{2}
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