Presentation is loading. Please wait.

Presentation is loading. Please wait.

Math III Accelerated Chapter 13 Trigonometric Ratios and Functions 1.

Published byGladys Johnston Modified over 9 years ago

Similar presentations

Presentation on theme: "Math III Accelerated Chapter 13 Trigonometric Ratios and Functions 1."— Presentation transcript:

1 Math III Accelerated Chapter 13 Trigonometric Ratios and Functions 1

2 Warm Up 13.2  Write the expression in simplest form. 2

3 13.2 Define General Angles and Use Radian Measure  Objective:  Use general angles that may be measured in radians. 3

4 Angles in Standard Position  In the coordinate plane, an angle can be formed by fixing one ray, called the _______________ side, and rotating the other ray, called the ____________________ side, about the ____________________.  An angle is in standard position if its vertex is at ___________ and its initial side lies on the positive ____________________. 4

5 Positive and Negative Angles  A positive angle opens _________________.  A negative angle opens _________________. 5

6 Example 1 a. Draw a 405 ˚ angle in standard position. b. Draw a –65 ˚ angle in standard position. 6

7 Coterminal Angles  Angles that share the same terminal side are called coterminal angles.  Coterminal angles can be found by adding (or subtracting) multiples of 360˚ to (from) the given angle. 7

8 Example 2  Find one positive and one negative angle that are coterminal with 210˚. Sketch your results. 8

9 Checkpoints 1 & 2  Draw an angle with the given measure in standard position. Find one positive and one negative coterminal angle. a. 485 ° b. –75° 9

10 Radian Measure  Angles can be measured either in degrees or in radians. 10

11 Converting Between Degrees and Radians  Degrees to Radians Radians = Degrees  Radians to Degrees Degrees = Radians 11

12 Example 3  Convert : a. 315˚ to radians b. π /6 radians to degrees 12

13 Checkpoints 3 & 4  Convert the degree measure to radians or the radian measure to degrees. a. 200˚ b. π /5 13

14 Sectors of Circles  A sector is a region of a circle that is bounded by two radii and an arc of the circle.  The central angle θ of a sector is the angle formed by the two radii. 14 θ r r

15 Arc Length and Area of a Sector  The arc length s and area A of a sector with radius r and central angle θ (measured in radians) are:  Arc Length s = r θ  Area A = ½ r 2 θ 15 θ r s

16 Example 4  Find the arc length and area of a sector with a radius of 15 inches and a central angle of 60 ˚. 16

17 Checkpoint 5  Find the arc length and area of a sector with a radius of 5 feet and a central angle of 75 ˚. 17

18 Homework 13.2  Practice 13.2 18

Download ppt "Math III Accelerated Chapter 13 Trigonometric Ratios and Functions 1."

Similar presentations

Warm Up Find the measure of the supplement for each given angle. 1. 150°2. 120° 3. 135°4. 95° 30°60° 45° 85°

Warm Up Find the measure of the supplement for each given angle °2. 120° °4. 95° 30°60° 45° 85°
Objective: Convert between degrees and radians. Draw angles in standard form. Warm up Fill in the blanks. An angle is formed by two_____________ that have.

Objective: Convert between degrees and radians. Draw angles in standard form. Warm up Fill in the blanks. An angle is formed by two_____________ that have.
Objectives: Be able to draw an angle in standard position and find the positive and negative rotations. Be able to convert degrees into radians and radians.

Objectives: Be able to draw an angle in standard position and find the positive and negative rotations. Be able to convert degrees into radians and radians.
Objectives: 1.Be able to draw an angle in standard position and find the positive and negative rotations. 2.Be able to convert degrees into radians and.

Objectives: 1.Be able to draw an angle in standard position and find the positive and negative rotations. 2.Be able to convert degrees into radians and.
What Is A Radian? 1 radian = the arc length of the radius of the circle.

What Is A Radian? 1 radian = the arc length of the radius of the circle.
Angles and Arcs in the Unit Circle 1. 2 5.1 Radian and Degree Measure In this section, we will study the following topics: Terminology used to describe.

Angles and Arcs in the Unit Circle Radian and Degree Measure In this section, we will study the following topics: Terminology used to describe.
1 13.2 Radian and Degree Measure In this section, we will study the following topics: Terminology used to describe angles Degree measure of an angle Radian.

Radian and Degree Measure In this section, we will study the following topics: Terminology used to describe angles Degree measure of an angle Radian.
WARM UP 1. What do complementary angles add to? 2. What do supplementary angles add to? 3. Find a the complementary angle and supplementary angle to 60.

WARM UP 1. What do complementary angles add to? 2. What do supplementary angles add to? 3. Find a the complementary angle and supplementary angle to 60.
Drill Calculate:.

Drill Calculate:.
Angles and Radian Measure Section 4.1. Objectives Estimate the radian measure of an angle shown in a picture. Find a point on the unit circle given one.

Angles and Radian Measure Section 4.1. Objectives Estimate the radian measure of an angle shown in a picture. Find a point on the unit circle given one.
WARM UP 1. What do complementary angles add to? 2. What do supplementary angles add to? 3. Find a the complementary angle and supplementary angle to 60.

WARM UP 1. What do complementary angles add to? 2. What do supplementary angles add to? 3. Find a the complementary angle and supplementary angle to 60.
4.1 Radian and Degree Measure. Objective To use degree and radian measure.

4.1 Radian and Degree Measure. Objective To use degree and radian measure.
4.1 Radian and Degree measure Changing Degrees to Radians Linear speed Angular speed.

4.1 Radian and Degree measure Changing Degrees to Radians Linear speed Angular speed.
13.2 Angles and Angle Measure

13.2 Angles and Angle Measure
5.1 Angles and Radian Measure. ANGLES Ray – only one endpoint Angle – formed by two rays with a common endpoint Vertex – the common endpoint of an angle’s.

5.1 Angles and Radian Measure. ANGLES Ray – only one endpoint Angle – formed by two rays with a common endpoint Vertex – the common endpoint of an angle’s.
4-1.  Thinking about angles differently:  Rotating a ray to create an angle  Initial side - where we start  Terminal side - where we stop.

4-1.  Thinking about angles differently:  Rotating a ray to create an angle  Initial side - where we start  Terminal side - where we stop.
Lesson 7-1 Angles, Arcs, and Sectors. Objective:

Lesson 7-1 Angles, Arcs, and Sectors. Objective:
Chapter 4 Trigonometric Functions

Chapter 4 Trigonometric Functions
Section 7.1 Angles and Their Measure. ANGLES An angle is formed by rotating a ray about its endpoint. The original ray is the initial side of the angle.

Section 7.1 Angles and Their Measure. ANGLES An angle is formed by rotating a ray about its endpoint. The original ray is the initial side of the angle.
Advanced Algebra II Advanced Algebra II Notes 10.2 continued Angles and Their Measure.

Advanced Algebra II Advanced Algebra II Notes 10.2 continued Angles and Their Measure.

Similar presentations

Ads by Google