1. Chapter 5 Trigonometric Functions

2. Section 1: Angles and Degree Measure The student will be able to: Convert decimal degree measures to degrees, minutes, and seconds and vice versa. Find the number of degrees in a given number of rotations. Identify angles that are coterminal with a given angle. An angle may be generated by rotating one of two rays that share a fixed endpoint known as the vertex. One of the rays is fixed (doesn’t move) along the x axis and is called the initial side. The other side, which rotates, is called the terminal side. If an angle is rotated in a counterclockwise direction, it is positive. If an angle is rotated in a clockwise direction, it is negative. An angle is in standard position if its initial side is along the x axis. We usually measure angles in degrees with decimnmals, but its also possible to measure them in degrees, minutes, and seconds.

3. Quadrant II Quadrant IIIQuadrant IV Quadrant 1 Terminal side of the angle

4. To change a decimal degree to degrees, minutes, and seconds: 1.Multiply the decimal portion of the degree measure by 60 to find the number of minutes 2.Multiply the decimal portion of the minute measure by 60 to find the number of seconds.

5. Ex: Give the angle measure represented by each rotation: a.9.5 rotations clockwise b.6.75 rotations counterclockwise Tow angles are coterminal if they share the same terminal side.

6. Your questions for finding coterminal angles will look like this: Identify all angles coterminal with each angle. Then find one positive angle and one negative angle that are coterminal with the angle. answer

7. Copy yellow box on page 280 for reference angle rule. Quadrant II Quadrant III Quadrant IV Quadrant 1

8. Find the measure of the reference angle for each angle.

9. Section 2: Trig Ratios in Right Triangles The student will be able to find the values of trigonometric ratios for acute angles of a right triangle. BC A b a c B is the right angle of this triangle. Side b is the hypotenuse. A and C are acute angles. Side a is opposite angle A and adjacent to angle C. Side c is adjacent to angle A and opposite angle C. Copy the Trigonometric Ratios box on page 285.

10. Examples: Find the values of the sin, cos, and tan for <B.18 A 33 BC Find the values of the sin, cos, and tan for <A. A B C 15 8 Find the values of the sin, cos, and tan for <C. Copy the purple and white box on page 287.

11. Section 3: Trig Ratios on the Unit Circle Students will be able to: find the values of trig ratios on the unit circle Find the vlues of trig functions of an angle in standard position given a point on its terminal side. A unit circle is a circle of radius 1 and it’s center is at the origin of a coordinate plane. WHAT TO KNOW ABOUT THE UNIT CIRCLE:

12. Examples: Use the unit circle to find each value:

14. Sec 4: Applying Trig Ratios The student will be able to use trigonometry to find measures of the sides of right triangles. qp r

15. G J R

16. The angle of elevation is the angle between a horizontal line and the line of sight from an observer to an object at a higher level. The angle of depression is the angle between a horizontal line and the line of sight from the observer to an object at a lower level.

17. A man on the deck of a ship is 15 ft above sea level. He observes that the angle of elevation of the top of a cliff is 70° and the angle of depression of its base at sea level is 50°. Find the height of the cliff and its distance from the ship. From the top of a spire of height 50 ft, the angles of depression of two cars on a straight road at the same level as that of the base of the spire and on the same side of it are 25° and 40°. Calculate the the distance between the two cars.

18. A regular hexagon is inscribed in a circle with diameter 26.6 cm. Find the apothem of the hexagon. An apothem is the measure of a line segment from the center of the polygon to the midpoint of one of its sides. A hexagon is a six-sided figure.

19. Sec 5: Solving Right Triangles The student will be able to: Evaluate inverse trig functions Find missing angle measurements Solve right triangles When you know a trig function, but you don’t know the angle, you can use inverse trig to find the angle. Inverse trig is found on your calculator by pressing the 2 nd key before the trig key. Trigs and their inverses “undo” each other. Example:

20. 3 7 E D F Find angle E. Many cities place restrictions on the height and placement of skyscrapers in order to protect residents from completely shaded streets. If a 100 foot building casts an 88 foot shadow, what is the angle of elevation of the sun? K J L Solve each triangle described, given the triangle below. Round to the nearest tenth. (Find all the missing parts) b. j = 65, l = 55

21. Sec 6: Law of Sines The student will be able to: a.Solve triangles by using the law of sines. If the measures of two angles and a side are given. b.Find the area of a triangle if the measures of two sides and the included angle or the measures of two angles and a side are given. Law of Sines: *** We use this when we know two angles and a nonincluded side. *** Note: these are NOT right triangles !

22. Examples: Area of triangles that aren’t right triangles: Examples: Solve ABC if m ∠ A = 70°, c = 26, a = 25

23. A regular octagon is inscribed in a circle with radius of 5 feet. Find the area of the octagon.

24. Sec 8: Law of Cosines: The student will be able to: a.Solve triangles by using the law of cosines b.Find the area of triangles if the measures of the three sides are given. Law of Cosines: Solve the triangle:

25. a = 19, b = 24.3, c = 21.8 Find the area of the triangle ABC if a = 24, b = 52, and c = 39.