1. Trigonometric Identities and Equations
Unit Objectives:
Verify trigonometric identities are true.
Solve trigonometric equations
Application problems with trigonometric functions and ratios.
Today’s Objective:
I can verify trigonometric identities.

2. An equation that is true for all values of x or 𝜃.
Identity:
Example:
An equation that is true for all values of x or 𝜃.
𝑥 5 𝑥 3 = 𝑥 2
where
𝑥≠0
Domain of validity
Basic Identities:
Tangent Identities:
Reciprocal Identities:
sin 𝜃
cos 𝜃
tan 𝜃 =
cot 𝜃 =
cos 𝜃
sin 𝜃 1 1 1
sec 𝜃 =
cot 𝜃 =
csc 𝜃 =
cos 𝜃
tan 𝜃
sin 𝜃 1 1 1
cos 𝜃 =
tan 𝜃 =
sin 𝜃 =
sec 𝜃
cot 𝜃
csc 𝜃

3. Domain of validity:
Domain of validity:

4. State the domain of validity and verify the identity
Pick a side
Change to sin or cos
Simplify to other side
𝑥≠± 𝜋 2 ,± 3𝜋 2 ,…
( sin 𝑥) ( sec 𝑥) = tan 𝑥
=( sin 𝑥) 1 cos 𝑥
= sin 𝑥 cos 𝑥
( sin 𝑥) ( sec 𝑥)
= tan 𝑥
( sin 𝑥) cot 𝑥 = cos 𝑥
𝑥≠0,±𝜋,±2𝜋,…
=( sin 𝑥) cos 𝑥 sin 𝑥
( sin 𝑥) cot 𝑥
= cos 𝑥
1 sin 𝑥
csc 𝑥 sec 𝑥 = cot 𝑥
csc 𝑥 sec 𝑥
= 1 sin 𝑥
⋅ cos 𝑥 1
= cos 𝑥 sin 𝑥
= cot 𝑥 =
1 cos 𝑥
𝑥≠0,± 𝜋 2 ,±𝜋,…

5. Pythagorean Identities
1+ tan 2 𝜃= sec 2 𝜃
𝑥 2 + 𝑦 2 =1
=1+ sin 2 𝜃 cos 2 𝜃
1+ tan 2 𝜃
cos 2 𝜃
+ sin 2 𝜃 =1
= cos 2 𝜃 cos 2 𝜃 + sin 2 𝜃 cos 2 𝜃 =
= cos 2 𝜃 + sin 2 𝜃 cos 2 𝜃 1 y θ x
= 1 cos 2 𝜃
= sec 2 𝜃
1+ cot 2 𝜃= csc 2 𝜃

6. Simplifying an Expression
Verifying an identity
tan 2 𝜃 − sin 2 𝜃 = tan 2 𝜃 sin 2 𝜃
= sin 2 𝜃 cos 2 𝜃 − sin 2 𝜃
= sin 2 𝜃 cos 2 𝜃 − sin 2 𝜃 cos 2 𝜃 cos 2 𝜃
tan 2 𝜃 − sin 2 𝜃
= sin 2 𝜃 − sin 2 𝜃 cos 2 𝜃 cos 2 𝜃
= sin 2 𝜃 (1− cos 2 𝜃 ) cos 2 𝜃
= sin 2 𝜃 sin 2 𝜃 cos 2 𝜃
= tan 2 𝜃 sin 2 𝜃
Simplifying an Expression
= 1 sin 𝜃
∙ sin 𝜃 cos 𝜃
= 1 cos 𝜃
csc 𝜃 tan 𝜃
= sec 𝜃
Pg. 908 #9-60 by 3s

7. Trigonometric Identities Day 2
Today’s Objective:
I can verify identities.

8. Trigonometric Identities
csc 𝜃 = 1 sin 𝜃
𝐜𝐨𝐬 𝟐 𝜽 + 𝐬𝐢𝐧 𝟐 𝜽 =𝟏
sin 2 𝜃 =1− cos 2 𝜃
cos 2 𝜃 =1− sin 2 𝜃
sec 𝜃 = 1 cos 𝜃
𝐬𝐞𝐜 𝟐 𝜽 =𝟏 + 𝐭𝐚𝐧 𝟐 𝜽
tan 2 𝜃 = sec 2 𝜃 −1
tan 𝜃 = sin 𝜃 cos 𝜃
sec 2 𝜃 − tan 2 𝜃 =1
𝐜𝐬𝐜 𝟐 𝜽 =𝟏+ 𝐜𝐨𝐭 𝟐 𝜽
cot 𝜃 = cos 𝜃 sin 𝜃
cot 2 𝜃 = csc 2 𝜃 −1
csc 2 𝜃 − cot 2 𝜃 =1