1. Introduction to Trigonometry Right Triangle Trigonometry

2. Introduction What special theorem do you already know that applies to a right triangle? Pythagorean Theorem: a 2 + b 2 = c 2 c b a

3. Introduction Trigonometry is a branch of mathematics that uses right triangles to help you solve problems. Trig is useful to surveyors, engineers, navigators, and machinists (and others too.)

5. A trigonometric ratio is a ratio of the lengths of two sides of a right triangle. The three basic trigonometric ratios are sine, cosine, and tangent, which are abbreviated as sin, cos, and tan, respectively.

6. When a right triangle has an acute angle with a certain measure, it is similar to all other right triangles with that same size acute angle. That means that the ratios of the sides for any right triangle with the same sized acute angle are equal, regardless of the size of the triangle. sin θ, cos θ, and tan θ will have the same value for these two triangles because the angle θ is the same in both. θ θ

7. Before we can understand the trigonometric ratios we need to know how to label Right Triangles.

8. Labeling Right Triangles The most important skill you need right now is the ability to correctly label the sides of a right triangle. The most important skill you need right now is the ability to correctly label the sides of a right triangle. The names of the sides are: The names of the sides are:  the hypotenuse  the opposite side  the adjacent side

9. Labeling Right Triangles The hypotenuse is easy to locate because it is always found across from the right angle. Here is the right angle... Since this side is across from the right angle, this must be the hypotenuse.

10. Labeling Right Triangles Before you label the other two sides you must have a reference angle selected. It can be either of the two acute angles. In the triangle below, let’s pick angle B as the reference angle. A B C This will be our reference angle...

11. Labeling Right Triangles Remember, angle B is our reference angle. The hypotenuse is side BC because it is across from the right angle. A B (ref. angle) C hypotenuse

12. Labeling Right Triangles Side AC is across from our reference angle B. So it is labeled: opposite. A B (ref. angle) C opposite hypotenuse

13. Labeling Right Triangles The only side unnamed is side AB. This must be the adjacent side. A B (ref. angle) C adjacent hypotenuse opposite Adjacent means beside or next to

14. Labeling Right Triangles Let’s put it all together. Given that angle B is the reference angle, here is how you must label the triangle: A B (ref. angle) C hypotenuse opposite adjacent

15. Labeling Right Triangles Given the same triangle, how would the sides be labeled if angle C were the reference angle? Will there be any difference?

16. Labeling Right Triangles Angle C is now the reference angle. Side BC is still the hypotenuse since it is across from the right angle. A B C (ref. angle) hypotenuse

17. Labeling Right Triangles However, side AB is now the side opposite since it is across from angle C. A B C (ref. angle) opposite hypotenuse

18. Labeling Right Triangles That leaves side AC to be labeled as the adjacent side. A B C (ref. angle) adjacent hypotenuse opposite

19. Labeling Right Triangles Let’s put it all together. Given that angle C is the reference angle, here is how you must label the triangle: A B C (ref. angle) hypotenuse opposite adjacent

20. TRIGONOMETRIC RATIOS B CA h a o hypotenuse side opposite  A side adjacent to  A sin A = = ohoh side opposite  A hypotenuse cos A = = ahah side adjacent  A hypotenuse tan A = = oaoa side opposite  A side adjacent to  A The value of the trigonometric ratio depends only on the measure of the acute angle, not on the particular right triangle that is used to compute the value. A trigonometric ratio is a ratio of the lengths of two sides of a right triangle. Finding Trigonometric Ratios Let be a right triangle. The sine, the cosine, and the tangent of the acute angle  A are defined as follows. ABC

21. How do I remember these? opposite adjacent hypotenuse

22. Finding Trigonometric Ratios Find the sine, the cosine, and the tangent of the indicated angle. SS R TS 5 13 12 SOLUTION The length of the hypotenuse is 13. For  S, the length of the opposite side is 5, and the length of the adjacent side is 12. sin S  0. 3846 = 5 13 cos S  0. 9231 = 12 13 tan S  0. 4167 = 5 12 opp. adj. hyp. R T S 5 12 13 opp. hyp. = adj. hyp. = opp. adj. =

23. Finding Trigonometric Ratios Find the sine, the cosine, and the tangent of the indicated angle. RR R TS 5 13 12 SOLUTION The length of the hypotenuse is 13. For  R, the length of the opposite side is 12, and the length of the adjacent side is 5. sin R  0. 9231 = 12 13 cos R  0. 3846 = 5 13 tan R= 2. 4 = 12 5 adj. opp. hyp. opp. hyp. = adj. hyp. = opp. adj. = R T S 5 12 13

24. Trigonometric Ratios for 45º Find the sine, the cosine, and the tangent of 45º. SOLUTION Because all such triangles are similar, you can make calculations simple by choosing 1 as the length of each leg. 1 1 45º hyp. tan 45º = 1 = 1111 sin 45º  0. 7071 cos 45º opp. hyp. = adj. hyp. =  0. 7071 opp. adj. = From the 45º-45º-90º Triangle Theorem, it follows that the length of the hypotenuse is 2. = 1 2 = = 1 2 = 2

25. Trigonometric Ratios for 30º Find the sine, the cosine, and the tangent of 30º. SOLUTION 1 30º  0. 5774 = 0. 5 = 1212 2  0. 8660 tan 30º sin 30º cos 30º opp. hyp. = adj. hyp. = opp. adj. = To make the calculations simple, you can choose 1 as the length of the shorter leg. From the 30º-60º-90º Triangle Theorem, it follows that the length of the longer leg is 3 and the length of the hypotenuse is 2. 3 2 = = 1 3 3333 = 3

26. Using a Calculator You can use a calculator to approximate the sine, the cosine, and the tangent of 74º. Make sure your calculator is in degree mode. The table shows some sample keystroke sequences accepted by most calculators. Sample keystroke sequences Sample calculator display Rounded approximation 3. 4874 0. 2756 0. 9613 0. 961261695 74 or 74 sin Enter sin 74 or 74 cos Enter 74 or 74 tan Enter 0. 275637355 3. 487414444

27. The sine or cosine of an acute angle is always less than 1. Because the tangent of an acute angle involves the ratio of one leg to another leg, the tangent of an angle can be less than 1, equal to 1, or greater than 1. The reason is that these trigonometric ratios involve the ratio of a leg of a right triangle to the hypotenuse. The length of a leg of a right triangle is always less than the length of its hypotenuse, so the ratio of these lengths is always less than one. Finding Trigonometric Ratios

28. The sine or cosine of an acute angle is always less than 1. Because the tangent of an acute angle involves the ratio of one leg to another leg, the tangent of an angle can be less than 1, equal to 1, or greater than 1. TRIGONOMETRIC IDENTITIES (sin A) 2 + (cos A) 2 = 1 tan A = sin A cos A A B C c a b Finding Trigonometric Ratios A trigonometric identity is an equation involving trigonometric ratios that is true for all acute angles. The following are two examples of identities: The reason is that these trigonometric ratios involve the ratio of a leg of a right triangle to the hypotenuse. The length of a leg of a right triangle is always less than the length of its hypotenuse, so the ratio of these lengths is always less than one.

29. Using Trigonometric Ratios in Real Life Suppose you stand and look up at a point in the distance, such as the top of the tree. The angle that your line of sight makes with a line drawn horizontally is called the angle of elevation.

30. Indirect Measurement FORESTRY You are measuring the height of a Sitka spruce tree in Alaska. You stand 45 feet from the base of a tree. You measure the angle of elevation from a point on the ground to the top of the tree to be 59°. To estimate the height of the tree, you can write a trigonometric ratio that involves the height h and the known length of 45 feet. tan 59° = opposite adjacent 45 tan 59° = h 45(1. 6643)  h 74. 9  h The tree is about 75 feet tall. Write ratio. Substitute. Multiply each side by 45. Use a calculator or table to find tan 59°. Simplify. tan 59° = opposite adjacent h 45

31. Estimating a Distance ESCALATORS The escalator at the Wilshire/Vermont Metro Rail Station in Los Angeles rises 76 feet at a 30° angle. To find the distance d a person travels on the escalator stairs, you can write a trigonometric ratio that involves the hypotenuse and the known leg length of 76 feet. sin 30° = opposite hypotenuse d sin 30° = 76 d = 152 A person travels 152 feet on the escalator stairs. Write ratio for sine of 30°. Substitute. Multiply each side by d. Divide each side by sin 30°. Simplify. sin 30° = opposite hypotenuse 76 d d = 76 sin 30° d = 76 0. 5 Substitute 0.5 for sin 30°. 30° 76 ft d

32. Class work Pg. 469 #3 Pg. 477 # 3,6,7