11.2 Compound angle identities and applications

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Trigonometry - grade 12

Compound angle identities

Derivation of $sin (α + β)$

We have, for any angles $α$ and $β$ , that

sin (α + β) = sin α cos β + sin β cos α

How do we derive this identity? It is tricky, so follow closely.

Suppose we have the unit circle shown below. The two points $L (a, b)$ and $K (x, y)$ are on the circle.

We can get the coordinates of $L$ and $K$ in terms of the angles $α$ and $β$ . For the triangle $L O K$ , we have that

\begin{matrix} sin β = \frac{b}{1} & \Rightarrow & b = sin β \\ cos β = \frac{a}{1} & \Rightarrow & a = cos β \end{matrix}

Thus the coordinates of $L$ are $(cos β; sin β)$ . In the same way as above, we can see that the coordinates of $K$ are $(cos α; sin α)$ . The identity for $cos (α - β)$ is now determined by calculating $K L^{2}$ in two ways. Using the distance formula (i.e. $d = \sqrt{{(x_{2} - x_{1})}^{2} + {(y_{2} - y_{1})}^{2}}$ or $d^{2} = {(x_{2} - x_{1})}^{2} + {(y_{2} - y_{1})}^{2}$ ), we can find $K L^{2}$ :

\begin{matrix} K L^{2} & = & {(cos α - cos β)}^{2} + {(sin α - sin β)}^{2} \\ = & {cos}^{2} α - 2 cos α cos β + {cos}^{2} β + {sin}^{2} α - 2 sin α sin β + {sin}^{2} β \\ = & ({cos}^{2} α + {sin}^{2} α) + ({cos}^{2} β + {sin}^{2} β) - 2 cos α cos β - 2 sin α sin β \\ = & 1 + 1 - 2 (cos α cos β + sin α sin β) \\ = & 2 - 2 (cos α cos β + sin α sin β) \end{matrix}

The second way we can determine $K L^{2}$ is by using the cosine rule for $▵ K O L$ :

\begin{matrix} K L^{2} & = & K O^{2} + L O^{2} - 2 \cdot K O \cdot L O \cdot cos (α - β) \\ = & 1^{2} + 1^{2} - 2 (1) (1) cos (α - β) \\ = & 2 - 2 \cdot cos (α - β) \end{matrix}

Equating our two values for $K L^{2}$ , we have

\begin{matrix} 2 - 2 \cdot cos (α - β) & = & 2 - 2 (cos α cos β + sin α \cdot sin β) \\ \Rightarrow cos (α - β) & = & cos α \cdot cos β + sin α \cdot sin β \end{matrix}

Now let $α \to 90^{\circ} - α$ . Then

\begin{matrix} cos (90^{\circ} - α - β) & = & cos (90^{\circ} - α) cos β + sin (90^{\circ} - α) sin β \\ = & sin α \cdot cos β + cos α \cdot sin β \end{matrix}

But $cos (90^{\circ} - (α + β)) = sin (α + β)$ . Thus

sin (α + β) = sin α \cdot cos β + cos α \cdot sin β

Derivation of $sin (α - β)$

We can use

sin (α + β) = sin α cos β + cos α sin β

to show that

sin (α - β) = sin α cos β - cos α sin β

We know that

sin (- θ) = - sin (θ)

and

cos (- θ) = cos θ

Therefore,

\begin{matrix} sin (α - β) & = & sin (α + (- β)) \\ = & sin α cos (- β) + cos α sin (- β) \\ = & sin α cos β - cos α sin β \end{matrix}

Derivation of $cos (α + β)$

We can use

sin (α - β) = sin α cos β - sin β cos α

to show that

cos (α + β) = cos α cos β - sin α sin β

We know that

sin (θ) = cos (90 - θ) .

Therefore,

\begin{matrix} cos (α + β) & = & sin (90 - (α + β)) \\ = & sin ((90 - α) - β)) \\ = & sin (90 - α) cos β - sin β cos (90 - α) \\ = & cos α cos β - sin β sin α \end{matrix}

Derivation of $cos (α - β)$

We found this identity in our derivation of the $sin (α + β)$ identity. We can also use the fact that

sin (α + β) = sin α cos β + cos α sin β

to derive that

cos (α - β) = cos α cos β + sin α sin β

cos (θ) = sin (90 - θ),

we have that

\begin{matrix} cos (α - β) & = & sin (90 - (α - β)) \\ = & sin ((90 - α) + β)) \\ = & sin (90 - α) cos β + cos (90 - α) sin β \\ = & cos α cos β + sin α sin β \end{matrix}

Derivation of $sin 2 α$

We know that

sin (α + β) = sin α cos β + cos α sin β

When $α = β$ , we have that

\begin{matrix} sin (2 α) = sin (α + α) & = & sin α cos α + cos α sin α \\ = & 2 sin α cos α \\ = & sin (2 α) \end{matrix}

Derivation of $cos 2 α$

We know that

cos (α + β) = cos α cos β - sin α sin β

When $α = β$ , we have that

\begin{matrix} cos (2 α) = cos (α + α) & = & cos α cos α - sin α sin α \\ = & {cos}^{2} α - {sin}^{2} α \\ = & cos (2 α) \end{matrix}

However, we can also write

cos 2 α = 2 {cos}^{2} α - 1

and

cos 2 α = 1 - 2 {sin}^{2} α

by using

{sin}^{2} α + {cos}^{2} α = 1 .

The $cos 2 α$ Identity

Use

{sin}^{2} α + {cos}^{2} α = 1

to show that:

\begin{matrix} cos 2 α & = & \{\begin{matrix} 2 {cos}^{2} α - 1 \\ 1 - 2 {sin}^{2} α \end{matrix}) \end{matrix}

Problem-solving strategy for identities

The most important thing to remember when asked to prove identities is:

Trigonometric Identities

When proving trigonometric identities, never assume that the left hand side is equal to the right hand side. You need to show that both sides are equal.

A suggestion for proving identities: It is usually much easier simplifying the more complex side of an identity to get the simpler side than the other way round.

Prove that $sin 75^{\circ} = \frac{\sqrt{2} (\sqrt{3} + 1)}{4}$ without using a calculator.

Identify a strategy
We only know the exact values of the trig functions for a few special angles ( $30^{\circ}$ , $45^{\circ}$ , $60^{\circ}$ , etc.). We can see that $75^{\circ} = 30^{\circ} + 45^{\circ}$ . Thus we can use our double-angle identity for $sin (α + β)$ to express $sin 75^{\circ}$ in terms of known trig function values.
Execute strategy
$\begin{matrix} sin 75^{\circ} & = & sin (45^{\circ} + 30^{\circ}) \\ = & sin (45^{\circ}) cos (30^{\circ}) + cos (45^{\circ}) sin (30^{\circ}) \\ = & \frac{1}{\sqrt{2}} \cdot \frac{\sqrt{3}}{2} + \frac{1}{2} \cdot \frac{1}{\sqrt{2}} \\ = & \frac{\sqrt{3} + 1}{2 \sqrt{2}} \\ = & \frac{\sqrt{3} + 1}{2 \sqrt{2}} \times \frac{\sqrt{2}}{\sqrt{2}} \\ = & \frac{\sqrt{2} (\sqrt{3} + 1)}{4} \end{matrix}$

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Source: OpenStax, Math 1508 (lecture) readings in precalculus. OpenStax CNX. Aug 24, 2011 Download for free at http://cnx.org/content/col11354/1.1

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11.2 Compound angle identities and applications

Trigonometry - grade 12

Compound angle identities

Derivation of sin ( α + β )

Derivation of sin ( α - β )

Derivation of cos ( α + β )

Derivation of cos ( α - β )

Derivation of sin 2 α

Derivation of cos 2 α

The cos 2 α Identity

Problem-solving strategy for identities

Read also:

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Derivation of $sin (α + β)$

Derivation of $sin (α - β)$

Derivation of $cos (α + β)$

Derivation of $cos (α - β)$

Derivation of $sin 2 α$

Derivation of $cos 2 α$

The $cos 2 α$ Identity