• reduction identity

Evaluate a Trigonometric Expression

A. Find the exact value of cos 75°.

30° + 45° = 75°

Cosine Sum Identity

Evaluate a Trigonometric Expression

Multiply.

Combine the fractions.

Answer:

Evaluate a Trigonometric Expression

B. Find the exact value of tan .

Write as the sum or difference of angle measures

with tangents that you know.

Evaluate a Trigonometric Expression

Tangent Sum Identity

Simplify.

Rationalize the denominator.

Evaluate a Trigonometric Expression

Answer:

Multiply.

Simplify.

Simplify.

Use a Sum or Difference Identity

A. ELECTRICITY An alternating current i in amperes in a certain circuit can be found after t seconds using i = 4 sin 255t, where 255 is a degree measure. Rewrite the formula in terms of the sum of two angle measures.

Rewrite the formula in terms of the sum of two angle measures.

i = 4 sin 255t Original equation

= 4 sin (210t + 45t) 255t = 210t + 45t

The formula is i = 4 sin (210t + 45t).

Answer: i = 4 sin (210t + 45t)

Use a Sum or Difference Identity

B. ELECTRICITY An alternating current i in amperes in a certain circuit can be found after t seconds using i = 4 sin 255t. Use a sum identity to find the exact current after 1 second.

Use a sum identity to find the exact current after 1 second.

i= 4 sin (210t + 45t)Rewritten equation

= 4 sin (210 + 45)t = 1

= 4[sin(210)cos(45) + cos(210)sin(45)]Sine Sum Identity

Use a Sum or Difference Identity

Simplify.

Substitute.

The exact current after 1 second is amperes.

Answer: amperes

Multiply.

Rewrite as a Single Trigonometric Expression

A. Find the exact value of

Simplify.

Tangent Difference Identity

Answer:

Substitute.

Rewrite as a Single Trigonometric Expression

Answer:

B. Simplify

Simplify.

Rewrite as fractions with a common denominator.

Sine Sum Identity

Write as an Algebraic Expression

Write as an algebraic

expression of x that does not involve

trigonometric functions.

Applying the Cosine Sum Identity, we find that

Write as an Algebraic Expression

If we let α = and β = arccos x, then sin α =

and cos β = x. Sketch one right triangle with an acute

angle α and another with an acute angle β. Label the

sides such that sin α = and cos β = x. Then use

the Pythagorean Theorem to express the length of

each third side.

Write as an Algebraic Expression

Using these triangles, we find that

= cos α or ,

cos (arccos x) = cos β or x,

= sin α or , and

sin (arccos x) = sin β or .

Write as an Algebraic Expression

Now apply substitution and simplify.

Write as an Algebraic Expression

Answer:

Verify Cofunction Identities

Verify cos (–θ) = cos θ.

cos (–θ) = cos (0 – θ) Rewrite as a difference.

= cos 0 cos θ + sin 0 sin θCosine Difference Identity

= 1 cos θ + 0 sin θcos 0 = 1 and sin 0 = 0

= cos θ Multiply.

Answer: cos (–θ) = cos (0 – θ) = cos 0 cos θ + sin 0 sin θ = 1 cos θ + 0 sin θ = cos θ

Verify Reduction Identities

Simplify.

A. Verify .

Cosine Difference Identity

Verify Reduction Identities

Answer:

B. Verify tan (x – 360°) = tan x.

Verify Reduction Identities

Tangent Difference Identity

tan 360° = 0

Simplify.

Answer:

Solve a Trigonometric Equation

Find the solutions of

on the interval [ 0, 2).

Original equation

Sine Sum Identity and Sine Difference Identity

Solve a Trigonometric Equation

Substitute.

Solve for cos x.

Simplify.

Divide each side by 2.

Solve a Trigonometric Equation

CHECK The graph of

has zeros at on the interval [ 0, 2π).

Answer:

On the interval [0, 2π), cos x = 0 when x =