Trig functions with general Angles
1. 1.Explore reference angles
1. Defining Reference Angles in the coordinate plane
2. The sign of Trigonometric ratios and reference angles
3. EXIT TICKET -1- Reference angles
2. 2.Explore the trig functions in coordinate plane
1. Exit Ticket 2: Sign of Trigonometric Ratios
2. Mnemonic for Learning Trig Function Values in Quadrant I
3. Review the Equation of a circle
4. Trigonometric ratios in a circle of radius r
5. Finding Co-terminal and Reference Angles
6. Practice:Self study
3. 3.Trigonometric ratios in unit circle-5.1
1. Angles in the four quadrants (Unit circle)
2. Unit Circle Practice Tool

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Trig functions with general Angles

DANA DANNAWI, Apr 19, 2024

Trigonometric ratios for general angles

1.Explore reference angles
1. Defining Reference Angles in the coordinate plane
2. The sign of Trigonometric ratios and reference angles
3. EXIT TICKET -1- Reference angles
2.Explore the trig functions in coordinate plane
1. Exit Ticket 2: Sign of Trigonometric Ratios
2. Mnemonic for Learning Trig Function Values in Quadrant I
3. Review the Equation of a circle
4. Trigonometric ratios in a circle of radius r
5. Finding Co-terminal and Reference Angles
6. Practice:Self study
3.Trigonometric ratios in unit circle-5.1
1. Angles in the four quadrants (Unit circle)
2. Unit Circle Practice Tool

1.Explore reference angles

1. Defining Reference Angles in the coordinate plane
2. The sign of Trigonometric ratios and reference angles
3. EXIT TICKET -1- Reference angles

Defining Reference Angles in the coordinate plane

VOCABULARY

[u]REFERENCE ANGLE[/u]: 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[/img][br][img]data:image/png;base64,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[/img][br][br][br]

1) Move the point P and see how the reference angle changes in each quadrant. Then choose the correct answer

Find the relation between the the reference angle [math]\alpha[/math], and the standard angle [math]\theta[/math], in each quadrant: [br]a) QI (Quadrant 1)[br]b) QII (Quadrant 2)[br]c) QIII (Quadrant 3)[br]d) QIV (Quadrant 4)[br]

QII: REF=[math]\Theta[/math][br]QI: REF=180-[math]\Theta[/math], [br]QIV: REF=[math]\Theta[/math]-180,[br]QIV: REF=360+[math]\Theta[/math][br] Q1: REF=[math]\Theta[/math],[br] QII: REF=180-[math]\Theta[/math], [br]QIII: REF=[math]\Theta[/math]-180,[br]QIV: REF=360-[math]\Theta[/math] QI: REF=[math]\Theta[/math][br]QII: REF=180+[math]\Theta[/math],[br]QIII: REF=[math]\Theta[/math]+180,[br]QIV: REF=360+[math]\Theta[/math][br]

1.2.

1.3.

2.

2.Explore the trig functions in coordinate plane

1. Exit Ticket 2: Sign of Trigonometric Ratios
2. Mnemonic for Learning Trig Function Values in Quadrant I
3. Review the Equation of a circle
4. Trigonometric ratios in a circle of radius r
5. Finding Co-terminal and Reference Angles
6. Practice:Self study

2.2.

2.3.

2.4.

2.5.

2.6.

3.

3.Trigonometric ratios in unit circle-5.1

1. Angles in the four quadrants (Unit circle)
2. Unit Circle Practice Tool

3.1.

Angles in the four quadrants (Unit circle)

Keywords

[table][br][br][tr][td]Unit circle[/td][td]단위 원[/td][td]単位円 (たんいえん)[/td][td]单位圆 (dānwèi yuán)[/td][/tr][br][tr][td]Trigonometric functions[/td][td]삼각 함수[/td][td]三角関数 (さんかくかんすう)[/td][td]三角函数 (sānjiǎo hánshù)[/td][/tr][br][tr][td]Sine of 45 degrees[/td][td]45도의 사인[/td][td]45度のサイン (45どのさいん)[/td][td]45度的正弦 (45 dù de zhèngxián)[/td][/tr][br][tr][td]Cosine of 45 degrees[/td][td]45도의 코사인[/td][td]45度のコサイン (45どのこさいん)[/td][td]45度的余弦 (45 dù de yúxián)[/td][/tr][br][tr][td]Trigonometric identities[/td][td]삼각함수 정체성[/td][td]三角恒等式 (さんかくこうとうしき)[/td][td]三角恒等式 (sānjiǎo héngděngshì)[/td][/tr][br][tr][td]Pythagorean theorem[/td][td]피타고라스의 정리[/td][td]ピタゴラスの定理 (ぴたごらすのていり)[/td][td]勾股定理 (gōugǔ dìnglǐ)[/td][/tr][br][tr][td]Radians and degrees[/td][td]라디안과 도[/td][td]ラジアンと度 (らじあんとど)[/td][td]弧度和度 (húdù hé dù)[/td][/tr][br][tr][td]Trigonometric equations[/td][td]삼각 방정식[/td][td]三角方程式 (さんかくほうていしき)[/td][td]三角方程 (sānjiǎo fāngchéng)[/td][/tr][br][tr][td]Equilateral triangle[/td][td]정삼각형[/td][td]正三角形 (せいさんかくけい)[/td][td]等边三角形 (děngbiān sānjiǎoxíng)[/td][/tr][br][tr][td]Right isosceles triangle[/td][td]직각 이등변 삼각형[/td][td]直角二等辺三角形 (ちょっかくにとうへんさんかくけい)[/td][td]直角等腰三角形 (zhíjiǎo děngyāo sānjiǎoxíng)[/td][/tr][br][tr][td]Trigonometric ratios[/td][td]삼각비[/td][td]三角比 (さんかくひ)[/td][td]三角比 (sānjiǎo bǐ)[/td][/tr][br][tr][td]Angle symmetry[/td][td]각도 대칭[/td][td]角度の対称 (かくどのたいしょう)[/td][td]角度对称 (jiǎodù duìchèn)[/td][/tr][br][tr][td]Trigonometric exact values[/td][td]삼각함수의 정확한 값[/td][td]三角関数の正確な値 (さんかくかんすうのせいかくなち)[/td][td]三角函数的精确值 (sānjiǎo hánshù de jīngquè zhí)[/td][/tr][br][tr][td]Quadrant[/td][td]사분면[/td][td]象限 (しょうげん)[/td][td]象限 (xiàngxiàn)[/td][/tr][br][tr][td]Positive sine values[/td][td]양의 사인 값[/td][td]正のサインの値 (せいのさいんのあたい)[/td][td]正弦值 (zhèngxián zhí)[/td][/tr][br][tr][td]Cosine values[/td][td]코사인 값[/td][td]コサインの値 (こさいんのあたい)[/td][td]余弦值 (yúxián zhí)[/td][/tr][br][tr][td]Angle opposite pairs[/td][td]각도의 반대 쌍[/td][td]角度の対のペア (かくどのついのぺあ)[/td][td]角度的对偶对 (jiǎodù de duì'ǒu duì)[/td][/tr][br][/table][br]

Inquiry questions

[table][br][tr][br][td][b]Factual Questions[/b][br]1. What is the unit circle?[br][br]2. Calculate the sine and cosine of 45 degrees using the unit circle.[br][br]3. How is the unit circle used to define the trigonometric functions for all angles?[br][br]4. Identify the coordinates of the point on the unit circle corresponding to a 120-degree angle.[br][br]5. What are the values of sin and cos for the key angles on the unit circle (0, 30, 45, 60, 90 degrees)?[br][/td][br][br][td][b]Conceptual Questions[/b][br]1. Explain the significance of the unit circle in trigonometry.[br][br]2. Discuss how the unit circle relates to the Pythagorean theorem.[br][br]3. How do the concepts of radians and degrees apply to the unit circle?[br][br]4. Explain the relationship between the unit circle and the graphs of sine and cosine functions.[br][br]5. Compare the use of the unit circle in solving trigonometric equations to other methods.[br][/td][br][br][td][b]Debatable Questions[/b][br]1. Is the unit circle the most effective way to understand trigonometric functions? Why or why not?[br][br]2. Debate the importance of memorizing key points on the unit circle versus deriving from isoceles right triangle and the equilateral triangle.[br][br]3. Can the understanding of the unit circle be considered foundational for advanced mathematics?[br][br]4. Discuss the statement: "The unit circle simplifies the complexity of trigonometric functions."[br][/td][br][/tr][br][/table][br]

Mini-Investigation: Navigating the Unit Circle[br][br]Welcome to the adventure of the Unit Circle, a realm where angles and trigonometry intertwine! Today we'll be navigating through this circular world to discover the secrets of angles in the four quadrants. Grab your protractor and let's set sail![br][br][br]First if we imagine a circle of radius centred at the origin. We can see how we can relate the circle to trigonometry. This is a huge and interesting topic with many inter-connecting ideas. Take your time, ask questions and remember to document your discoveries in your captain's log. Share your newfound knowledge with your crew, and remember: in the world of the unit circle, every degree is a step towards enlightenment. Happy navigating![br]

Moving into the other quadrants, we need to use the symmetry of the circle

1. Cosine Coordinates: On our map, the cosine value of 20° is about 0.94. If we journey to 340°, would we find the same treasure? Predict and then check your bearings using the unit circle.

2. Sine Waves: As we sail from 0° to 90°, the sine value climbs the rigging. How high does it reach at 90°? Now, plunge down to 270°—what happens to the sine value?

3. Reflective Waters: The applet shows that cos(160°) is about -0.94. If we reflect across the y-axis to 200°, does the cosine value change? What does this tell us about symmetry in the unit circle?

4. Quadrant Quest: Each quadrant holds its secrets. In which quadrants will you find positive sine values? And where will cosine lead us to positive shores?

5. Angle Amplification: Suppose we amplify our angle from 20° to 200°, passing through the stormy sea of the third quadrant. How does the sign of cosine and sine change?

6. Trigonometric Treasure: If cos(20°) is approximately 0.94, can we predict cos(160°) without a compass? Use the unit circle to verify your guess and find the value.

7. Full Circle: As we complete our 360° journey, can you predict the sine and cosine values at the cardinal points of 0°, 90°, 180°, and 270°? Confirm your predictions using the unit circle.

8. Opposite Odyssey: We know angles have opposite pairs on the unit circle. If the cosine of 20° is 0.94, what's the cosine of its opposite angle? Use the unit circle to find out!

9. Sine and Cosine Saga: Create your own angle and predict its sine and cosine values. Then, embark on a quest to find an angle in a different quadrant with the same sine value.

10. Circle of Life: The unit circle is never-ending. If you keep adding 360° to an angle, what happens to the sine and cosine values? Do they change or remain steadfast like the North Star?

Part 2 - The unit circle exact values

From the humble right-isoceles triangle and an equilateral triangle creates a world of trigonometry.

Triangles can be a great way to explore the properties of these shapes and how they relate to trigonometry. Let's dive into this investigation with some activities and explanations.[br][br]Equilateral Triangle Investigation[br][br]An equilateral triangle has all three sides of equal length, and all three internal angles are 60 degrees. We can use this information to find the exact values of sine, cosine, and tangent for 30 degrees and 60 degrees angles.[br][br]

Activity 1: Finding sin(60°), cos(60°), and tan(60°)[br][br]1. **Draw an equilateral triangle** with side length 2 (for simplicity). Label the vertices A, B, and C.[br]2. **Draw the altitude** from vertex A to the midpoint of the base BC, creating two 30°-60°-90° right triangles. Let's call the midpoint D.[br]3. **Determine lengths** of AD, BD, and AB. Since AB = 2, and BD = 1 (half of AB), use Pythagoras' theorem to find AD.[br]4. **Calculate trigonometric ratios** for 60° using the right triangle ABD.

Activity 2: Finding sin(30°), cos(30°), and tan(30°)[br][br]1. Using the same triangle, **apply the trigonometric functions** to angle BAD (30°).[br]2. **Calculate** the sine, cosine, and tangent of 30° using the lengths found in Activity 1.[br][br]

Right Isosceles Triangle Investigation[br][br]A right isosceles triangle has one right angle and two 45° angles. The sides opposite these angles are of equal length.[br]

Activity 3: Finding sin(45°), cos(45°), and tan(45°)[br][br]1. Draw a right isosceles triangle** with the two legs of equal length. For simplicity, let each leg have a length of 1.[br]2. Label the hypotenuse** and calculate its length using Pythagoras' theorem.[br]3. Calculate trigonometric ratios** for 45° using the lengths of the legs and the hypotenuse.[br]

Reflection questions[br][br]1. How do the trigonometric ratios for 30°, 45°, and 60° compare? Discuss their relationships.[br]2. Can you derive the sine, cosine, and tangent values for 0°, 90°, and other angles based on the patterns observed?[br][br]Enjoy exploring these relationships and discovering the beauty of trigonometry!

This fun quiz can help you build up your fluency with exact values.

Part 2 - Checking your understanding

Attempt the examination-style questions in the PDF.[br]The videos are also a helpful resource for solidying your understanding for an overview of the unit circle (degrees to radians)[br][br][b]Practice questions [/b][br]Unit circle, exact values, Pythagorean identity: Questions 1,2,4,5[br]Double angles: Question 3,6,7,8,9,[br][b][br]Short answer questions[/b][br]Unit circle, exact values, Pythagorean identity: Questions 10,14[br]Double angles: Question 11,12,13,15,16,17,18,19,20,21,22,23[br][br][b]Long answer quesrions[/b][br]Double angles:: Question: 24,25,26,27

0

Trig functions with general Angles

Table of Contents

1.

1.Explore reference angles

1.1.

Defining Reference Angles in the coordinate plane

VOCABULARY

1) Move the point P and see how the reference angle changes in each quadrant. Then choose the correct answer

1.2.

1.3.

2.

2.Explore the trig functions in coordinate plane

2.1.

Exit Ticket 2: Sign of Trigonometric Ratios

Look at the right triangle in each quadrant and the signs of the coordinates of A. Based on that, determine the sign of the trigonometric ratios in each quadrant.

2.2.

2.3.

2.4.

2.5.

2.6.

3.

3.Trigonometric ratios in unit circle-5.1

3.1.

Angles in the four quadrants (Unit circle)

Keywords

Inquiry questions

Moving into the other quadrants, we need to use the symmetry of the circle

Part 2 - The unit circle exact values

This fun quiz can help you build up your fluency with exact values.

Part 2 - Checking your understanding

[MAA 3.5] SIN, COS, TAN ON THE UNIT CIRCLE - IDENTITIES Questions

[MAA 3.5] SIN, COS, TAN ON THE UNIT CIRCLE - IDENTITIES_solutions

The unit circle - Values of sine and cosine

Lesson plan - Navigating the Unit Circle in DP Mathematics

Angles in the four quadrants- Intuition pump (thought experiments and analogies)

3.2.

Information