Sec 9.5. Applications of Trigonometry to Navigation and Surveying

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1 Sec 9.5 Applications of Trigonometry to Navigation and Surveying

2

3 Which direction? In basic Trig standard position:

4 Which direction? Navigation used by ships, planes etc.

5 9.5 Applications of Trigonometry to Navigation and Surveying Objective To use trigonometry to solve navigation and surveying problems. The course of a ship or plane is the, measured clockwise, from the north direction to the direction of the ship or plane.

6 9.5 Applications of Trigonometry to Navigation and Surveying Objective To use trigonometry to solve navigation and surveying problems. The course of a ship or plane is the, measured clockwise, from the north direction to the direction of the ship or plane.

7 Objective To use trigonometry to solve navigation and surveying problems. Bearing of B from A 060 Bearing of Afrom B 240 The course of a ship or plane is the, measured clockwise, from the north direction to the direction of the ship or plane.

8 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?

9 Always measure clockwise

10 A ship proceeds on a course of 300 for 2 hours at a speed of 15 knots (1 knot = 1 nautical mile per hour). Then it changes course to 230, continuing at 15 knots for 3 more hours. At that time, how far is the ship from the starting point? Law of Cosines 45 x N N OPP ADJ ADJ 2 ADJ ADJ cos

11 Law of Cosines N x N OPP ADJ ADJ 2 ADJ ADJ cos x cos110 x 62.0 nautical miles

12 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.

13

14 In surveying, a compass reading is usually given as an acute from the north-south line toward the east or west.

15 Navigation

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

17 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.

18 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.

19

20

21 Camping: Give direction from the camp site to each of 4 points of interest: a) The river b) The lake c) To the tower d) The hill

22

23 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!

24 S Takser Hill Road G 195 ft Q º 260 ft 385 ft R 68º

25 Takser Hill Road G 195 ft Q º 260 ft 385 ft area of GQS=35, area of GRS=49, TOTAL: 84, R 68º S

26 A plot of land is taxed according to its area. Sketch the plot of land described, then find its area. 2 From a granite post, proceed 195 ft east along Tasker Hill Road, o then along a bearing of S32 E for 260 ft, then along a bearing of S68 W for 385 ft, and finally along a line back to the granite post. N 195 ft 1 2 K sin122 21,500 ft x ft cos122 x 399 ft 399 x 24.5 ft N 68 sin sin k absin C 385 ft 1 K sin , Total Area 84, 800 ft 2 ft

27 500 m NE; 300 m E; 200 m S15 E; Back Presentation N K K d d N 500 m N 300 m d sin ,000 m m cos m 90 K K sin sin m sin ,000 m 2 Area 125,000 m

28 260 m SW; 240 m S; 280 m N40 E; Back 16. Presentation N m K sin sin sin 40 2 K 18,900 m d m 280 m 40 d d cos m K K sin ,600 m 2 Area 40,500 m

29 Presentation o Proceed S78 W for 250 m. Then S15 E for 180 m. Then N78 E. Then N30 E to the starting point. sin sin d d N cos m 87 K1 180 m 250 m d 3 N d1 K N d 2 N d sin11.2 sin132 d m K1 K2 29,500 m 2

30 click here for a sample test

31 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.

32 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.

33 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

34 G

35 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?

36 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?

37 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

38 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

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