Applications of Trigonometry to Navigation and Surveying

Slides:

Advertisements

Similar presentations

Advertisements

Chapter 9 Review Solving Triangles.

APPLICATIONS OF TRIG TO NAVIGATION AND SURVEYING 9.5

Trigonometric Functions of Angles

BASICS OF SURVEYING Ivy Tech Community College. Surveying Definition DEFINITION The art and science of making such measurements as are necessary to determine.

SOLVING RIGHT TRIANGLES Using your definitions to solve “real world” problems.

Fasten your seatbelts A small plane takes off from an airport and rises at an angle of 6° with the horizontal ground. After it has traveled over a horizontal.

Copyright © 2007 Pearson Education, Inc. Publishing as Pearson Addison-Wesley Slide 4- 1.

Applications of Trig to Navigation and Surveying

Copyright © 2007 Pearson Education, Inc. Publishing as Pearson Addison-Wesley Slide 4- 1 Homework, Page 356 Convert from DMS to decimal form. 1.

Chapter 4.8 Solving Problems with Trig. Learning Target: I can use trigonometry to solve real-world problems.

TRIGONOMETRY Lesson 3: Solving Problems Involving Right Triangles.

We Are Learning To To use angles to measure bearings To calculate back bearings Calculate bearings and back bearings Grade D.

 What do you know about degrees?  What do you know about Radians?

Piloting Course Chapter 1 Introduction to Navigation

Chapter 2 Acute Angles and

Slide 1-1 Chapter 2 Acute Angles and Right Triangle Y. Ath.

Chapter 3, Vectors. Outline Two Dimensional Vectors –Magnitude –Direction Vector Operations –Equality of vectors –Vector addition –Scalar product of two.

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.

Trig Applied Problems Putting trig ratios to work (5.7)

9.5 APPLICATION OF TRIG NAVIGATION.

Trigonometric Functions

Applications & Models MATH Precalculus S. Rook.

Finding the Magnitude of a Vector A vector is a quantity that has both magnitude and direction. In this lesson, you will learn how to find the magnitude.

40S Applied Math Mr. Knight – Killarney School Slide 1 Unit: Vectors Lesson: VEC-L1 Intro to VECTORS Learning Outcome B-1 VEC-L1 Objectives: Distinguish.

Section 9.5 Navigation & Surveying

2.1 Six Trig Functions for Right Triangles

Vectors Chapter 6 KONICHEK. JUST DOING SOME ANGLING.

Vectors 9.7 Chapter 9 Right Triangles and Trigonometry Section 9.7 Vectors Find the magnitude and the direction of a vector. Add vectors.

25 o 15 m A D The angle of elevation of the top of a building measured from point A is 25 o. At point D which is 15m closer to the building, the angle.

Warm Up 1.) A triangle has the following sides/angle. How many triangles can be formed?

Unit 3 Finding distance and direction. How to measure distance on a map? Use a ruler and the scale of the map What is the distance between Hong Kong and.

When solving a right triangle, we will use the sine, cosine, and tangent functions, rather than their reciprocals.

Kinematics & Dynamics in 2 & 3 Dimensions; Vectors First, a review of some Math Topics in Ch. 1. Then, some Physics Topics in Ch. 4!

Geometry 9.7 Vectors. Goals  I can name a vector using component notation.  I can add vectors.  I can determine the magnitude of a vector.  I can.

Section 4.8 Notes. 1 st Day Example 1 Find all unknown values in the figure, where A = 20° and b = 15. (Round to two decimal places.) c b a C A B.

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

Applications of the Laws of Sines and Cosines Dr. Shildneck.

Law of Cosines 2014 Digital Lesson. Copyright © by Houghton Mifflin Company, Inc. All rights reserved. 2 An oblique triangle is a triangle that has no.

Lesson 3: Solving Problems Involving Right Triangles

Unit B 1.2 Velocity. Velocity Describes both the rate of motion and the direction of an object You can determine the speed of a car by looking at the.

Copyright © 2005 Pearson Education, Inc. Slide 2-1 Solving a Right Triangle To “solve” a right triangle is to find the measures of all the sides and angles.

6.7 Applications and Models. 2 What You Should Learn Solve real-life problems involving right triangles. Solve real-life problems involving directional.

Copyright © 2013, 2009, 2005 Pearson Education, Inc. 1 2 Acute Angles and Right Triangles.

CONTENTS  Scalars and Vectors.  Bearings & Compass headings.  Drawing Vectors.  Vector addition & subtraction.  Relative velocity.  Change in.

Do Now: A safety regulation states that the maximum angle of elevation for a rescue ladder is 72 degrees. If a fire department’s longest ladder is 110.

Copyright © Cengage Learning. All rights reserved. 1 Trigonometry.

2 Acute Angles and Right Triangles.

Chapter 9 Review Solving Triangles.

Applications and Models

Copyright © 2017, 2013, 2009 Pearson Education, Inc.

Applications and models

Pre-Calculus Section 4.8 Application Problems

Objective: Solve real-life problems involving directional bearing

Chapter 2 : Kinematics in Two Directions 2.1 Distance & Displacement

Day 77 AGENDA: DG minutes.

MM5 – Applications of Trigonometry

Piloting - Plotting a Course

Applications of Vectors

Bearings Sunday, 17 February 2019.

Copyright © 2014, 2010, 2007 Pearson Education, Inc.

Precalculus PreAP/Dual, Revised ©2017 §6.1B: Directional Bearing

Acute Angles and Right Triangles

Starter For each of these angles labelled x, name the type of angle, estimate its size and give a definition of that type of angle. 1) 2) 3) 4)

Right Triangles and Trigonometry

Presentation transcript:

Applications of Trigonometry to Navigation and Surveying Sec 9.5 Applications of Trigonometry to Navigation and Surveying

Which direction? In basic Trig… standard position: Start on the x-axis. Counter clockwise

Which direction? Navigation… used by ships, planes etc. Start on the y-axis. Clockwise Given using 3 digits

9.5 Applications of Trigonometry to Navigation and Surveying

9.5 Applications of Trigonometry to Navigation and Surveying

Example 1. A ship proceeds on a course of 300º for 2 hours at a speed of 15 knots (1 knot = 1 nautical mile per hour). Then it changes course to 230º, continuing at 15 knots for 3 more hours. At that time, how far is the ship from its starting point?

Graph File: open and click step by step.

Which direction? In surveying, a compass reading is usually given as an acute angle from the north-south line toward the east or west line. Start on the y-axis. Clockwise The angle is always acute.

Navigation Surveying

NE Sandy and NE 40th meet at approx 58 degree angle. Give directions from the Formation Area to the disband Area. Using navigation system. Using the survey method.

Basic Hints and rules Make a diagram… give yourself drawing space all around the diagram. Although drawing to scale might be hard, come as close to a scale as possible. Write all the given information on your diagram.

Basic Hints and rules Include a lightly drawn x and y axes at each point. Find as many angles and sides as you can. Apply as many geometry rules as you can.

Camping: Generate clarifying questions! Give direction from the camp site to each of 4 points of interest: The river The lake To the tower The hill Generate clarifying questions!

Example 2. Very often a plot of land is taxed according to its area Example 2. Very often a plot of land is taxed according to its area. Sketch the plot of land described. Then find its area. From a granite post, proceed 195 ft east along Tasker Hill Road, then along a bearing of S32ºE for 260 ft, then along a bearing of S68ºW for 385 ft, and finally along a line back to the granite post. With these types of problems, a careful diagram is essential. Next slide will demonstrate all the steps. Make sure to have your geometric tools and math wits about you!

Click on the white area to open Graph and then click each part one by one.

Click on the white area to open Graph and then click each part one by one.

Triangulate Law of Sines

Triangulate Angles? Law of Sines

click here for a sample test

Homework: Sec 9.5 written exercises 7-13 odds; 15, 16, 17 In class Exit Slip: Page 353 Problem #17. Only full solutions will be considered. If you were absent, see Navi for make up Exit Slip.

Applications of Trig to Navigation and Surveying The course of a ship or plane is the angle, measured clockwise, from the north direction to the direction of the ship or plane.

As shown, the compass bearing of one location from another is measured in the same way. Note that compass bearings and courses are given with three digits, such as 060º rather than 60º

Click on the white area to open Graph and then click each part one by one.

Example 1. A ship proceeds on a course of 300º for 2 hours at a speed of 15 knots (1 knot = 1 nautical mile per hour). Then it changes course to 230º, continuing at 15 knots for 3 more hours. At that time, how far is the ship from its starting point?

Example 1. A ship proceeds on a course of 300º for 2 hours at a speed of 15 knots (1 knot = 1 nautical mile per hour). Then it changes course to 230º, continuing at 15 knots for 3 more hours. At that time, how far is the ship from its starting point?

Example 2. Very often a plot of land is taxed according to its area Example 2. Very often a plot of land is taxed according to its area. Sketch the plot of land described. Then find its area. From a granite post, proceed 195 ft east along Tasker Hill Road, then along a bearing of S32ºE for 260 ft, then along a bearing of S68ºW for 385 ft, and finally along a line back to the granite post.

Example 2. Very often a plot of land is taxed according to its area Example 2. Very often a plot of land is taxed according to its area. Sketch the plot of land described. Then find its area. From a granite post, proceed 195 ft east along Tasker Hill Road, then along a bearing of S32ºE for 260 ft, then along a bearing of S68ºW for 385 ft, and finally along a line back to the granite post.