Basic trigonometry ideas
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Basic trigonometry Ideas
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Basic trigonometry ideas
- 2. Parts of a Right Triangle A Adjacent SideC Opposite Side B Hypotenuse Imagine that you are at Angle A looking into the triangle. The adjacent side is the side next to Angle A. The opposite side is the side that is on the opposite side of the triangle from Angle A. The hypotenuse will always be the longest side, and opposite from the right angle.
- 3. Parts of a Right Triangle A Adjacent SideC Opposite Side B Hypotenuse Now imagine that you move from Angle A to Angle B. From Angle B the adjacent side is the side next to Angle B. From Angle B the opposite side is the side that is on the opposite side of the triangle.
- 4. Review Hypotenuse Hypotenuse Opposite Side Adjacent Side A B For Angle A This is the Opposite Side This is the Adjacent Side For Angle B A This is the Adjacent Side This is the Opposite Side Opposite Side Adjacent Side B
- 5. Trig Ratios We can use the lengths of the sides of a right triangle to form ratios. There are 3 different ratios that we can make. Adjacent Opposite Hypotenuse AC B Opposite Hypotenuse Adjacent Hypotenuse Opposite Adjacent Using Angle A to name the sides Use Angle B to name the sides The ratios are still the same as before!!
- 6. Trig Ratios • Each of the 3 ratios has a name • The names also refer to an angle Opposite Sine of Angle A = Hypotenuse Adjacent Cosine of Angle A = Hypotenuse Opposite Tangent of Angle A = Adjacent Hypotenuse Adjacent Opposite A
- 7. Trig Ratios B Opposite = Hypotenuse Adjacent = Hypotenuse Opposite = Adjacent Hypotenuse Adjacent Opposite A If the angle changes from A to B The way the ratios are made is the same B B B Cosine of Angle Sine of Angle Tangent of Angle
- 8. SOHCAHTOA Adjacent A B Opposite Hypotenuse Here is a way to remember how to make the 3 basic Trig Ratios 1) Identify the Opposite and Adjacent sides for the appropriate angle 2) SOHCAHTOA is pronounced “Sew Caw Toe A” and it means Sin is Opposite over Hypotenuse, Cos is Adjacent over Hypotenuse, and Tan is Opposite over Adjacent Put the underlined letters to make SOH-CAH-TOA
- 9. Examples of Trig Ratios Sin P Cos P 12 20 16 Q P Tan P Tan Q Cos Q Sin Q 16 20 = 12 20 = 16 12 = 12 20 = 16 20 = 12 16 = First we will find the Sine, Cosine and Tangent ratios for Angle P. Next we will find the Sine, Cosine, and Tangent ratios for Angle Q Opposite Adjacent Remember SohCahToa
- 10. Similar Triangles and Trig Ratios ABC QPR≈V V 3 5 4 A B 12 20 16 Q P R C They are similar triangles, since ratios of corresponding sides are the same Let’s look at the 3 basic Trig ratios for these 2 triangles Tan Q Cos Q Sin Q 12 20 = 16 20 = 12 16 = Tan A Cos A Sin A 3 5 = 4 5 = 3 4 = Notice that these ratios are equivalent!!
- 11. Similar Triangles and Trig Ratios • Triangles are similar if the ratios of the lengths of the corresponding side are the same. • Triangles are similar if they have the same angles • All similar triangles have the same trig ratios for corresponding angles