Section 14.6

1. Section 14.6 Angle Identities

2. Part 1 Angle Identities

3. Values of Angles

4. Negative Angles • We can find patterns in the trig functions • One such pattern set is called Negative Angles • Negative Angle identities are as follows • sin (–θ) = –sin (θ) • cos (–θ) = cos (θ) • tan (–θ) = –tan (θ)

5. Comparing Graphs

6. Cofunction Identities • The values for each of these cofunctions are related to one another by a phase shift • The cofunction identities are: sin (π/2 – θ) = cos (θ) cos (π/2 – θ) = sin (θ) tan (π/2 – θ) = cot (θ)

7. Using Angle Identities • We can use the angle identities to prove relations • Use the rules here to verify other trig identities Verify each identity: • csc (θ – π/2) = –sec θ • cot (π/2 – θ) = tan θ • tan (θ – π/2) = –cot θ

8. Equal Functions • We can use the identities to find when different trig functions are equal • Follow the same rules as verifying identities to simplify and then use the unit circle Solve each trig equation for 0 ≤ θ≤ 2π • cos (π/2 – θ) = csc (θ) • tan2θ – sec2θ = cos (–θ)

9. Homework (part 1) For the next class complete #2 – 14 even on page 804.

10. Part 2 Sum and Difference Identities

11. Sum and Difference Angle Sums Angle Differences sin (A + B) = sin A cos B + cos A sin B cos (A + B) = cos A cos B – sin A sin B tan (A + B) = sin (A – B) = sin A cos B – cos A sin B cos (A – B) = cos A cos B + sin A sin B tan (A – B) = tan A + tan B 1 – tan A tan B tan A – tan B 1 + tan A tan B

12. Using the Identities Use the Sum and Difference Identities to quickly simplify • cos 50˚ cos 40˚ – sin 50˚ sin 40˚ cos 90˚ = 0 • sin 100˚ cos 170˚ + cos 100˚ sin 170˚ sin 270˚ = -1 Find the exact value • cos 105˚ (√2 - √6)/4 • sin 15˚ (√6 - √2)/4 • tan 195˚ (√3/3 + 1)/(1 - √3/3)

13. Homework (part 2) Complete 18 – 36 even on page 804