Trigonometry Objectives: The Student Will … Find trigonometric ratios using right Triangles Solve problems using trigonometric ratios HOMEWORK: Sin, cos,

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Presentation transcript:

Trigonometry Objectives: The Student Will … Find trigonometric ratios using right Triangles Solve problems using trigonometric ratios HOMEWORK: Sin, cos, tan Practice WS `

Trigonometric Ratios SOH CAH TOA Opposite Sine = Adjacent Cosine = Tangent = Hypotenuse Adjacent Opposite Standard decimal  side lengths  ten thousandths (4)  angle measures  hundredths (2)

Example 1: Find sin L, cos L, tan L, sin N, cos N, and tan N. Express each ratio as a fraction and as a decimal. (ten-thousandths) Opp Sin L = == Hyp 8 17 Adj Cos L === Hyp Opp Tan L === Adj 8 15 Hypotenuse N M L

Example 1: continued Now lets do sin N, cos N, and tan N. Express each ratio as a fraction and as a decimal. (ten-thousandths) Opp Sin N = == Hyp Adj Cos N === Hyp 8 17 Opp Tan N === Adj 15 8 Hypotenuse N M L

Find the indicated trigonometric ratio as a fraction and as a decimal. If necessary, round to the nearest ten-thousandths. 1.) sin A2.) tan B 3.) cos A4.) cos B 5.) sin D6.) tan E 7.) cos E8.) cos D

Example 2: Find each value to the nearest ten thousandths. a.) tan 56  = b.) cos 89  = Make sure your calculator is in degree mode

Example 3: Find x. 24° 19 x 1.) 31° 2.) x 34 tan 24° = x 19 (tan 24°)19 =x = x ≈ x cos 31° = x 34 (cos 31°)34 =x = x ≈ x

Example 4: A fitness trainer sets the incline on a treadmill to 7 . The walking surface is 5 feet long. Approximately how many inches did the trainer raise the end of the treadmill from the floor? opp sin 7  = 5(sin 7  ) = (5) y5y5 5(sin 7  ) = y Convert to inches y = 12( ) Hypotenuse Opposite ft = y y ≈ in y5y5 = hyp

Using Trigonometry to Find the Angle Measure We can also find an angle measure. (hundredths place) If sin θ = , then sin -1 (0.7823) = θ This is done in the calculator: Press the 2 nd key, press the sin (sin -1 ) key Type in and press enter θ = 

Examples 5: Find the measure of each acute angle to the nearest tenth degree. a.) tan = , b.) cos R = , ≈ 13.3° tan -1 (0.2356) = cos -1 (0.6401) = R R ≈ 50.2°

Example 6: Find x x°x° tan x° = x°x° ° = x 39.81° ≈ x tan -1 ( ) = 15 18

Example 7: Find x x°x° sin x° = (sin x°)17 = ° = x (sin x°)17 =12 17 (sin x°) = ( sin -1 ) = x ° ≈

Study Guide pg 370 Find x. Round to the nearest tenth.

Study Guide pg 370 Find x. Round to the nearest tenth.