Table of contents

0. Review of College Algebra4h 43m

Rationalizing Denominators
15m

Pythagorean Theorem & Basics of Triangles
17m

Basics of Graphing
30m

Functions
41m

Transformations
45m

Asymptotes
4m

Solving Linear Equations
31m

Solving Quadratic Equations
55m

Complex Numbers
41m

1. Measuring Angles40m

Angles in Standard Position
12m

Coterminal Angles
8m

Complementary and Supplementary Angles
10m

Radians
8m

2. Trigonometric Functions on Right Triangles2h 5m

Trigonometric Functions on Right Triangles
45m

Special Right Triangles
30m

Cofunctions of Complementary Angles
26m

Solving Right Triangles
23m

3. Unit Circle1h 19m

Defining the Unit Circle
14m

Trigonometric Functions on the Unit Circle
9m

Common Values of Sine, Cosine, & Tangent
11m

Reference Angles
38m

Reciprocal Trigonometric Functions on the Unit Circle
6m

4. Graphing Trigonometric Functions1h 19m

Graphs of the Sine and Cosine Functions
32m

Phase Shifts
14m

Graphs of Secant and Cosecant Functions
10m

Graphs of Tangent and Cotangent Functions
21m

5. Inverse Trigonometric Functions and Basic Trigonometric Equations1h 41m

Inverse Sine, Cosine, & Tangent
28m

Evaluate Composite Trig Functions
44m

Linear Trigonometric Equations
28m

6. Trigonometric Identities and More Equations2h 34m

Introduction to Trigonometric Identities
1h 4m

Sum and Difference Identities
1h 3m

Double Angle Identities
16m

Solving Trigonometric Equations Using Identities
9m

7. Non-Right Triangles1h 38m

Law of Sines
49m

Law of Cosines
30m

Area of SAS & ASA Triangles
19m

8. Vectors2h 25m

Geometric Vectors
28m

Vectors in Component Form
32m

Direction of a Vector
23m

Unit Vectors and i & j Notation
27m

Dot Product
22m

Cross Product
11m

9. Polar Equations2h 5m

Polar Coordinate System
29m

Convert Points Between Polar and Rectangular Coordinates
26m

Convert Equations Between Polar and Rectangular Forms
29m

Graphing Other Common Polar Equations
39m

10. Parametric Equations1h 6m

Graphing Parametric Equations
12m

Eliminate the Parameter
32m

Writing Parametric Equations
21m

11. Graphing Complex Numbers1h 7m

Graphing Complex Numbers
6m

Polar Form of Complex Numbers
22m

Products and Quotients of Complex Numbers
14m

Powers of Complex Numbers (DeMoivre's Theorem)
23m

3. Unit Circle

Reference Angles

Trigonometry

3. Unit Circle

Reference Angles

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2:27 minutes

Problem 49

Textbook Question

Find the reference angle for each angle.
4.7

Verified step by step guidance

Convert the given angle from radians to degrees using the formula: \( \text{degrees} = \text{radians} \times \frac{180}{\pi} \).

Calculate the equivalent angle in degrees.

Determine the quadrant in which the angle lies by considering the range of angles in degrees for each quadrant.

Find the reference angle by using the appropriate formula based on the quadrant: \( \text{Reference Angle} = 180^\circ - \text{angle} \) for angles in the second quadrant, \( \text{Reference Angle} = \text{angle} - 180^\circ \) for angles in the third quadrant, and \( \text{Reference Angle} = 360^\circ - \text{angle} \) for angles in the fourth quadrant.

Express the reference angle in degrees or convert it back to radians if needed.

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Key Concepts

Here are the essential concepts you must grasp in order to answer the question correctly.

Reference Angle

The reference angle is the acute angle formed by the terminal side of a given angle and the x-axis. It is always measured as a positive angle and is crucial for simplifying trigonometric calculations. For angles greater than 180 degrees, the reference angle is found by subtracting 180 degrees from the angle, while for angles in the fourth quadrant, it is calculated by subtracting the angle from 360 degrees.

Quadrants of the Coordinate Plane

The coordinate plane is divided into four quadrants, each representing a different range of angles. Quadrant I contains angles from 0 to 90 degrees, Quadrant II from 90 to 180 degrees, Quadrant III from 180 to 270 degrees, and Quadrant IV from 270 to 360 degrees. Understanding which quadrant an angle lies in is essential for determining its reference angle and the signs of its trigonometric functions.

Angle Measurement

Angles can be measured in degrees or radians, with 360 degrees equivalent to 2π radians. In trigonometry, it is important to be able to convert between these two units to accurately find reference angles. For example, an angle of 4.7 radians can be converted to degrees to better understand its position in the coordinate plane and subsequently find its reference angle.

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Master Reference Angles on the Unit Circle with a bite sized video explanation from Patrick