7.1.1 Trig Identities and Uses

1. 7.1.1 Trig Identities and Uses

2. We have already discussed a few example of trig identities • All identities are meant to serve as examples of equality • Convert one expression into another • Can be used to verify relationships or simplify expressions in terms of a single trig function or similar

3. Past Identities • Past identities we have already talked about include: • 1) Reciprocal Identities • 2) Quotient identities (tan, cot) • 3) Cofunction identities

4. Period Identities • Recall, the period of a trig function is how often/over how many radians the values for the trig function repeat • sin(x + 2π) = sin(x) • cos(x + 2π) = cos(x) • tan(x + π) = tan(x) • csc(x + 2π) = csc(x) • sec(x + 2π) = sec(x) • cot(x + π) = cot(x)

5. Odd/Even • Looking at the values of particular functions on the unit circle reveals some other information • Odd: f(-x) = -f(x) • Opposite x yields opposite y-value • Even: f(-x) = f(x) • Opposite x yields the same y-value

6. Odd/Even • sin(-x) = -sin(x) csc(-x) = -csc(x) • cos(-x) = cos(x) sec(-x) = sec(x) • tan(-x) = -tan(x) cot(-x) = -cot(x)

7. Pythagorean Identities • We can let x = cos(x) and y = sin(x) in terms of x/y coordinates on the coordinate grid • The same may apply to triangles

8. Our end goal is to with a simpler form of a long, entirely winded, expression • Most times, we will need to use more than one trig identity to help us

9. Example. Simplify the expression: • cos(x) + sin(x) tan(x)

10. Example. Simplify the expression: • sec(x) cot(x) – cot(x) cos(x)

11. Example. Simplify the expression: • sin2(x) – cos2(x)sin2(x)

12. Assignment • Pg.553 • # 1-7