11.1 Graphs, trigonometric identities, and solving trigonometric (Page 4/12)

Page 4 / 12

If the two equal sides are of length $a$ , then the hypotenuse, $h$ , can be calculated as:

\begin{matrix} h^{2} & = & a^{2} + a^{2} \\ = & 2 a^{2} \\ ∴ h & = & \sqrt{2} a \end{matrix}

So, we have:

\begin{matrix} sin (45^{\circ}) & = & \frac{opposite (45^{\circ})}{hypotenuse} \\ = & \frac{a}{\sqrt{2} a} \\ = & \frac{1}{\sqrt{2}} \end{matrix}

\begin{matrix} cos (45^{\circ}) & = & \frac{adjacent (45^{\circ})}{hypotenuse} \\ = & \frac{a}{\sqrt{2} a} \\ = & \frac{1}{\sqrt{2}} \end{matrix}

\begin{matrix} tan (45^{\circ}) & = & \frac{opposite (45^{\circ})}{adjacent (45^{\circ})} \\ = & \frac{a}{a} \\ = & 1 \end{matrix}

We can try something similar for $30^{\circ}$ and $60^{\circ}$ . We start with an equilateral triangle and we bisect one angle as shown in [link] . This gives us the right-angled triangle that we need, with one angle of $30^{\circ}$ and one angle of $60^{\circ}$ .

An equilateral triangle with one angle bisected.

If the equal sides are of length $a$ , then the base is $\frac{1}{2} a$ and the length of the vertical side, $v$ , can be calculated as:

\begin{matrix} v^{2} & = & a^{2} - {(\frac{1}{2} a)}^{2} \\ = & a^{2} - \frac{1}{4} a^{2} \\ = & \frac{3}{4} a^{2} \\ ∴ v & = & \frac{\sqrt{3}}{2} a \end{matrix}

So, we have:

\begin{matrix} sin (30^{\circ}) & = & \frac{opposite (30^{\circ})}{hypotenuse} \\ = & \frac{\frac{a}{2}}{a} \\ = & \frac{1}{2} \end{matrix}

\begin{matrix} cos (30^{\circ}) & = & \frac{adjacent (30^{\circ})}{hypotenuse} \\ = & \frac{\frac{\sqrt{3}}{2} a}{a} \\ = & \frac{\sqrt{3}}{2} \end{matrix}

\begin{matrix} tan (30^{\circ}) & = & \frac{opposite (30^{\circ})}{adjacent (30^{\circ})} \\ = & \frac{\frac{a}{2}}{\frac{\sqrt{3}}{2} a} \\ = & \frac{1}{\sqrt{3}} \end{matrix}

\begin{matrix} sin (60^{\circ}) & = & \frac{opposite (60^{\circ})}{hypotenuse} \\ = & \frac{\frac{\sqrt{3}}{2} a}{a} \\ = & \frac{\sqrt{3}}{2} \end{matrix}

\begin{matrix} cos (60^{\circ}) & = & \frac{adjacent (60^{\circ})}{hypotenuse} \\ = & \frac{\frac{a}{2}}{a} \\ = & \frac{1}{2} \end{matrix}

\begin{matrix} tan (60^{\circ}) & = & \frac{opposite (60^{\circ})}{adjacent (60^{\circ})} \\ = & \frac{\frac{\sqrt{3}}{2} a}{\frac{a}{2}} \\ = & \sqrt{3} \end{matrix}

You do not have to memorise these identities if you know how to work them out.

Two useful triangles to remember

Alternate definition for $tan θ$

We know that $tan θ$ is defined as: $tan θ = \frac{opposite}{adjacent}$ This can be written as:

\begin{matrix} tan θ & = & \frac{opposite}{adjacent} \times \frac{hypotenuse}{hypotenuse} \\ = & \frac{opposite}{hypotenuse} \times \frac{hypotenuse}{adjacent} \end{matrix}

But, we also know that $sin θ$ is defined as: $sin θ = \frac{opposite}{hypotenuse}$ and that $cos θ$ is defined as: $cos θ = \frac{adjacent}{hypotenuse}$

Therefore, we can write

\begin{matrix} tan θ & = & \frac{opposite}{hypotenuse} \times \frac{hypotenuse}{adjacent} \\ = & sin θ \times \frac{1}{cos θ} \\ = & \frac{sin θ}{cos θ} \end{matrix}

tan θ

can also be defined as:

tan θ = \frac{sin θ}{cos θ}

A trigonometric identity

One of the most useful results of the trigonometric functions is that they are related to each other. We have seen that $tan θ$ can be written in terms of $sin θ$ and $cos θ$ . Similarly, we shall show that: ${sin}^{2} θ + {cos}^{2} θ = 1$

We shall start by considering $▵ A B C$ ,

We see that: $sin θ = \frac{A C}{B C}$ and $cos θ = \frac{A B}{B C} .$

We also know from the Theorem of Pythagoras that: $A B^{2} + A C^{2} = B C^{2} .$

So we can write:

\begin{matrix} {sin}^{2} θ + {cos}^{2} θ & = & {(\frac{A C}{B C})}^{2} + {(\frac{A B}{B C})}^{2} \\ = & \frac{A C^{2}}{B C^{2}} + \frac{A B^{2}}{B C^{2}} \\ = & \frac{A C^{2} + A B^{2}}{B C^{2}} \\ = & \frac{B C^{2}}{B C^{2}} (from Pythagoras) \\ = & 1 \end{matrix}

Simplify using identities:

${tan}^{2} θ \cdot {cos}^{2} θ$
$\frac{1}{{cos}^{2} θ} - {tan}^{2} θ$

Use known identities to replace $tan θ$
$\begin{matrix} = & {tan}^{2} θ \cdot {cos}^{2} θ \\ = & \frac{{sin}^{2} θ}{{cos}^{2} θ} \cdot {cos}^{2} θ \\ = & {sin}^{2} θ \end{matrix}$
Use known identities to replace $tan θ$
$\begin{matrix} = & \frac{1}{{cos}^{2} θ} - {tan}^{2} θ \\ = & \frac{1}{{cos}^{2} θ} - \frac{{sin}^{2} θ}{{cos}^{2} θ} \\ = & \frac{1 - {sin}^{2} θ}{{cos}^{2} θ} \\ = & \frac{{cos}^{2} θ}{{cos}^{2} θ} = 1 \end{matrix}$

Prove: $\frac{1 - sin x}{cos x} = \frac{cos x}{1 + sin x}$

Use trig identities
$\begin{matrix} LHS & = & \frac{1 - sin x}{cos x} \\ = & \frac{1 - sin x}{cos x} \times \frac{1 + sin x}{1 + sin x} \\ = & \frac{1 - {sin}^{2} x}{cos x (1 + sin x)} \\ = & \frac{{cos}^{2} x}{cos x (1 + sin x)} \\ = & \frac{cos x}{1 + sin x} = RHS \end{matrix}$

Trigonometric identities

Simplify the following using the fundamental trigonometric identities:
1. $\frac{cos θ}{tan θ}$
2. ${cos}^{2} θ . {tan}^{2} θ + {tan}^{2} θ . {sin}^{2} θ$
3. $1 - {tan}^{2} θ . {sin}^{2} θ$
4. $1 - sin θ . cos θ . tan θ$
5. $1 - {sin}^{2} θ$
6. $(\frac{1 - {cos}^{2} θ}{{cos}^{2} θ}) - {cos}^{2} θ$
Prove the following:
1. $\frac{1 + sin θ}{cos θ} = \frac{cos θ}{1 - sin θ}$
2. ${sin}^{2} θ + (cos θ - tan θ) (cos θ + tan θ) = 1 - {tan}^{2} θ$
3. $\frac{(2 {cos}^{2} θ - 1)}{1} + \frac{1}{(1 + {tan}^{2} θ)} = \frac{1 - {tan}^{2} θ}{1 + {tan}^{2} θ}$
4. $\frac{1}{cos θ} - \frac{cos θ {tan}^{2} θ}{1} = 1$
5. $\frac{2 sin θ cos θ}{sin θ + cos θ} = sin θ + cos θ - \frac{1}{sin θ + cos θ}$
6. $(\frac{cos θ}{sin θ} + tan θ) \cdot cos θ = \frac{1}{sin θ}$

Reduction formula

Any trigonometric function whose argument is $90^{\circ} \pm θ$ , $180^{\circ} \pm θ$ , $270^{\circ} \pm θ$ and $360^{\circ} \pm θ$ (hence $- θ$ ) can be written simply in terms of $θ$ . For example, you may have noticed that the cosine graph is identical to the sine graph except for a phase shift of $90^{\circ}$ . From this we may expect that $sin (90^{\circ} + θ) = cos θ$ .

Function values of $180^{\circ} \pm θ$

Investigation : reduction formulae for function values of $180^{\circ} \pm θ$

Function Values of $(180^{\circ} - θ)$
1. In the figure P and P' lie on the circle with radius 2. OP makes an angle $θ = 30^{\circ}$ with the $x$ -axis. P thus has coordinates $(\sqrt{3}; 1)$ . If P' is the reflection of P about the $y$ -axis (or the line $x = 0$ ), use symmetry to write down the coordinates of P'.
2. Write down values for $sin θ$ , $cos θ$ and $tan θ$ .
3. Using the coordinates for P' determine $sin (180^{\circ} - θ)$ , $cos (180^{\circ} - θ)$ and $tan (180^{\circ} - θ)$ .
1. (d) From your results try and determine a relationship between the function values of $(180^{\circ} - θ)$ and $θ$ .
Function values of $(180^{\circ} + θ)$
1. In the figure P and P' lie on the circle with radius 2. OP makes an angle $θ = 30^{\circ}$ with the $x$ -axis. P thus has coordinates $(\sqrt{3}; 1)$ . P' is the inversion of P through the origin (reflection about both the $x$ - and $y$ -axes) and lies at an angle of $180^{\circ} + θ$ with the $x$ -axis. Write down the coordinates of P'.
2. Using the coordinates for P' determine $sin (180^{\circ} + θ)$ , $cos (180^{\circ} + θ)$ and $tan (180^{\circ} + θ)$ .
3. From your results try and determine a relationship between the function values of $(180^{\circ} + θ)$ and $θ$ .

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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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