Bearings By Andre Lam (18) Lau Wai Soong (19) Ivan Leo (20) Lim Bing Wen (21) Triangle Trigonometry.

Slides:

Advertisements

Similar presentations

Advertisements

Trigonometry Right Angled Triangle. Hypotenuse [H]

Geometry 8.5 The Tangent Ratio. Trigonometry The word trigonometry comes from the Greek words that mean “triangle measurement.” In this course we will.

Sine, Cosine, Tangent, The Height Problem. In Trigonometry, we have some basic trigonometric functions that we will use throughout the course and explore.

Trigonometric Ratios Contents IIntroduction to Trigonometric Ratios UUnit Circle AAdjacent, opposite side and hypotenuse of a right angle.

8 – 6 The Sine and Cosine Ratios. Sine and Cosine Suppose you want to fine the legs, x and y, in a triangle. You can’t find these values using the tangent.

Trigonometry: Sine and Cosine. History What is Trigonometry – The study of the relationships between the sides and the angles of triangles. Origins in.

Bearings By Andre Lam (18) Lau Wai Soong (19) Ivan Leo (20) Lim Bing Wen (21) Triangle Trigonometry.

Basic Trigonometry.

Right Triangle Trigonometry:. Word Splash Use your prior knowledge or make up a meaning for the following words to create a story. Use your imagination!

TRIGONOMETRY Find trigonometric ratios using right triangles Solve problems using trigonometric ratios Sextant.

EXAMPLE 1 Finding Trigonometric Ratios For PQR, write the sine, cosine, and tangent ratios for P. SOLUTION For P, the length of the opposite side is 5.

Sine, Cosine and Tangent Ratios Objective Students will be able to use sine, cosine, and tangent ratios to determine side lengths in triangles.

6/24/2010 ©Evergreen Public Schools Lesson Title Teacher Notes Supplies: scientific calculators for all kids Notes: The goal for this lesson is.

Geometry Notes Lesson 5.3B Trigonometry

Honors Geometry Sections 10.1 & 10.2 Trigonometric ratios

Bearings 1. Measured from North. 2. In a clockwise direction.

A = Cos o x H Cosine Rule To find an adjacent side we need 1 side (hypotenuse) and the included angle. 9 cm 12 cm 60° 75° a a A = Cos ° x H A = Cos 75°

1 Trigonometry Basic Calculations of Angles and Sides of Right Triangles.

1 Trigonometry Basic Calculations of Angles and Sides of Right Triangles.

Get a calculator!. Trigonometry Trigonometry is concerned with the connection between the sides and angles in any right angled triangle. Angle.

Lesson 14.5 Right Triangle Trigonometry

Unit J.1-J.2 Trigonometric Ratios

Warm-Up 3/24-25 What are three basic trigonometric functions and the their ratios? Sine: sin  Cosine: cos  Tangent: tan 

4.8 Applications and Models using Trigonometry. Given one side and an acute angle of a right triangle Find the remaining parts of the triangle.

TRIGONOMETRIC RATIOS Chapter 9.5. New Vocabulary  Trigonometric Ratio: The ratio of the lengths of two sides or a right triangle.  The three basic trigonometric.

 To add vectors you place the base of the second vector on the tip of the first vector  You make a path out of the arrows like you’re drawing a treasure.

Set calculators to Degree mode.

7.2 Finding a Missing Side of a Triangle using Trigonometry

TRIGONOMETRY BASIC TRIANGLE STUDY: RATIOS: -SINE -COSINE -TANGENT -ANGLES / SIDES SINE LAW: AREA OF A TRIANGLE: - GENERAL -TRIGONOMETRY -HERO’S.

Trigonometric Ratios and Their Inverses

S2B Chapter 11 Introduction to Trigonometric Ratios.

Finding a Missing Angle of a Right Triangle. EXAMPLE #1  First: figure out what trig ratio to use in regards to the angle.  Opposite and Adjacent O,A.

Introduction to Trigonometry Part 1

Chapter : Trigonometry Lesson 3: Finding the Angles.

You will use the sine and cosine ratio to find the sides and angles of a right triangles Pardekooper.

Trigonometry Chapters Theorem.

(1) Sin, Cos or Tan? x 7 35 o S H O C H A T A O Answer: Tan You know the adjacent and want the opposite.

9-1 Tangent Ratio 9-2 Sine and Cosine Ratio Learning Target: I will be able to solve problems using the tangent, sine, and cosine ratios. Goal 1.01.

9-2 Sine and Cosine Ratios. There are two more ratios in trigonometry that are very useful when determining the length of a side or the measure of an.

9-1 Tangent Ratio 9-2 Sine and Cosine Ratio Learning Target: I will be able to solve problems using the tangent, sine, and cosine ratios. Goal 1.01.

Adjacent = Cos o x H Cosine Ratio To find an adjacent side we need 1 side (hypotenuse) and the included angle. a = Cos ° x H a = Cos 60° x 9 a = 0.5 x.

Splash Screen. Then/Now You used the Pythagorean Theorem to find missing lengths in right triangles. Find trigonometric ratios using right triangles.

Lesson 9.9 Introduction To Trigonometry Objective: After studying this section, you will be able to understand three basic trigonometric relationships.

[8-3] Trigonometry Mr. Joshua Doudt Geometry pg

A Quick Review ► We already know two methods for calculating unknown sides in triangles. ► We are now going to learn a 3 rd, that will also allow us to.

Starter Questions Starter Questions xoxo The Three Ratios Cosine Sine Tangent Sine Tangent Cosine Sine opposite adjacent hypotenuse.

Lesson 8-6 The Sine and Cosine Ratios (page 312) The sine ratio and cosine ratio relate the legs to the hypotenuse. How can trigonometric ratios be used.

Date: Topic: Trigonometric Ratios (9.5). Sides and Angles x The hypotenuse is always the longest side of the right triangle and is across from the right.

TRIGONOMETRY AND THE UNIT CIRCLE SEC LEQ: How can you use a unit circle to find trigonometric values?

LEQ: How can you use trigonometry of right triangles to solve real life problems?

TRIG – THE EASY WAY.

Basic Trigonometry An Introduction.

Trigonometry Learning Objective:

Subject Mathematics (F.2).

Warm Up Use the following triangles: Find a if b = 10√2

Trigonometric Functions

7-6 Sine and Cosine of Trigonometry

Trigonometry Learning Objective:

Lesson 9.9 Introduction To Trigonometry

Trigonometry Obj: I can to use trigonometry to find unknown sides and unknown angles in a triangle. Trigonometry is concerned with the connection between.

You will need a calculator and high lighter!

Triangle Starters Pythagoras A | Answers Pythagoras B | B Answers

Y10 Triangle Starters Pythagoras A | Pythagoras A Answers

Aim: How do we review concepts of trigonometry?

Lesson: Introduction to Trigonometry - Sine, Cosine, & Tangent

Trigonometry for Angle

Trigonometric Ratios Geometry.

Welcome GCSE Maths.

Presentation transcript:

Bearings By Andre Lam (18) Lau Wai Soong (19) Ivan Leo (20) Lim Bing Wen (21) Triangle Trigonometry

Content 0 Introduction 0 What are bearings? 0 Application in Triangle Trigonometry 0 Application in Real Life 0 Sample Questions 0 Activity (Try it yourself!) 0 Question and Answer

Introduction 0 What are bearings? 0 From Wikipedia, 0 A bearing is the angle between a line connecting two points and a north-south line.

Key concepts 0 Just a quick revision of the three functions 0 Sine function (sin), defined as the ratio of the side opposite the angle to the hypotenuse. 0 Cosine function (cos), defined as the ratio of the adjacent leg to the hypotenuse. 0 Tangent function (tan), defined as the ratio of the opposite leg to the adjacent leg.

Application in Triangle Trigonometry 0 To cut a long story short, a bearing is the direction from one object to another. In air navigation, bearings are given as angles rotated clockwise from the north.

Application in Triangle Trigonometry 0 A ship travels on a N50° E course. The ship travels until it is due north of a port which is 10 nautical miles due east of the port from which the ship originated. How far did the ship travel?

Answer 0 The angle opposite d is the complement of 50°, which is 40°. Therefore we can find d using the Cosine Function 0 Cos40=a/h=10/d 0 D(cos)40=10 0 D=10/cos40=13.05 approx.

Application in Real Life 0 In Real Life, bearings are commonly used in three forms of navigation: 0 Marine Navigation 0 Aircraft Navigation 0 Land Navigation 0 With the help of bearings, soldiers, divers and hikers alike will not get lost while exploring unknown or new territory!

Application in Real Life 0 According to the US Army, bearings can also be used in war-time conditions. 0 Bearings are able to: 0 Determine the location of a foreign object or target 0 Aid piloting of an aircraft 0 Bring a drone from one position to another by remote 0 Search and Rescue a lost soldier

Other Sample Questions 0 aring1.htm 0 The above link will address more queries about the use of bearings and how bearings work. 0 Bearings 1 through Bearings 3 are sample questions.

Sample Questions 0 /07_bear/bearing.htm /07_bear/bearing.htm 0 This link uses some illustrations to explain the concept of bearings as well as many examples 0 It covers bearings and directions

Additional Sample Questions 0 /units/KCA005.html#Directionanddistance /units/KCA005.html#Directionanddistance 0 The above link also gives more info about bearings and has an interactive applet for users to apply what they know of bearings to navigate a ship.

Activity (Try it yourself!) 0 (Bing Wen) Please provide sample questions from some workbooks that range from easy to challenging and then paste them here. Get the class to write their answers on the board and present how they get these answers

Any Questions?

THANK YOU