5.3.2 Linear Trigonometric Equations

Linear trigonometric equations are equations that involve trigonometric functions like sine, cosine, or tangent, and the variable (usually $\ x \ or \ \theta\$ ) appears in a linear form, meaning it's not squared, cubed, etc. Solving these equations involves finding all possible angles that satisfy the equation within a given range, often within one full cycle of the trigonometric function (e.g., $\ 0^\circ$ ) to $(360^\circ\ or \ 0\ to \ 2 \pi \ radians).$

1. Basic Steps to Solve Linear Trigonometric Equations:

Isolate the Trigonometric Function:

Get the trigonometric function like $\ (\sin \theta), \ (\cos \theta ), or \ ( \tan \theta)$ on one side of the equation.

Solve for the Angle:

Use the inverse trigonometric function to find the principal solution. Remember that trigonometric functions are periodic, so there may be multiple solutions within the given interval.

Consider the General Solution:

For sine and cosine functions, account for their periodic nature by adding the general solution using $\theta + 360^\circ n or \theta + 2\pi$ $n$ (where $\ n$ is an integer) to find all solutions within the specified interval.
For tangent, since its period is $\ 180^\circ\ or \ \pi \ radians,\ use \ \theta \ + 180^\circ \ n \ or \ \theta + \pi$ $n$ to find all solutions.

Check the Interval:

Make sure that the solutions you find are within the given interval (e.g., $\ 0^\circ\ to \ 360^\circ$ ).

2. Examples of Solving Linear Trigonometric Equations:

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Example 1: Solving $\sin \theta$ = 0.5

Step 1: Isolate the function: $\sin \theta = 0.5$

Step 2: Find the principal solution: $\theta = \sin^{-1}(0.5)$ The principal solution is $\theta = 30^\circ (since \sin 30^\circ = 0.5).$

Step 3: Consider all solutions: $\theta = 30^\circ \quad \text{or} \quad \theta = 180^\circ - 30^\circ = 150^\circ$ (Because $\sin$ is positive in the first and second quadrants.)

Step 4: List all solutions within the interval $\ 0^\circ \ to \ 360^\circ:$ $\theta = 30^\circ, 150^\circ$

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Example 2: Solving $\cos \theta = -\frac{1}{2}$

Step 1: Isolate the function: $\cos \theta = -\frac{1}{2}$

Step 2: Find the principal solution: $\theta = \cos^{-1}\left(-\frac{1}{2}\right)$ The principal solution is $\theta = 120^\circ (since \cos 120^\circ = -\frac{1}{2}).$

Step 3: Consider all solutions: $\theta = 120^\circ \quad \text{or} \quad \theta = 360^\circ - 120^\circ = 240^\circ$ (Because $\ \cos$ is negative in the second and third quadrants.)

Step 4: List all solutions within the interval $\ 0^\circ\ to \ 360^\circ:$ $\theta = 120^\circ, 240^\circ$

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Example 3: Solving $2\sin \theta + 1 = 0$

Step 1: Isolate the function: $2\sin \theta = -1 \quad \Rightarrow \quad \sin \theta = -\frac{1}{2}$

Step 2: Find the principal solution: $\theta = \sin^{-1}\left(-\frac{1}{2}\right)$ The principal solution is $\theta = -30^\circ, but \ to \ stay\ within\ the \ 0^\circ\ to \ 360^\circ$ range, we convert this to $\ 330^\circ (since \ \sin(360^\circ - 30^\circ = -\frac{1}{2}.)$

Step 3: Consider all solutions: $\theta = 180^\circ + 30^\circ = 210^\circ \quad \text{and} \quad \theta = 330^\circ$ (Because $\sin$ is negative in the third and fourth quadrants.)

Step 4: List all solutions within the interval $\ 0^\circ\ to \ 360^\circ:$ $\theta = 210^\circ, 330^\circ$

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Example 4: Solving $\tan \theta = 1$

Step 1: Isolate the function: $\tan \theta = 1$

Step 2: Find the principal solution: $\theta = \tan^{-1}(1)$ The principal solution is $\theta = 45^\circ (since \tan 45^\circ = 1).$

Step 3: Consider all solutions: $\theta = 45^\circ + 180^\circ n$ (Because the period of $\ \tan\ is \ 180^\circ.)$

Step 4: List all solutions within the interval $\ 0^\circ\ to \ 360^\circ:$ $\theta = 45^\circ, 225^\circ$

3. General Solutions for Trigonometric Equations:

For any trigonometric equation, the general solutions are often given as:

Sine Equation $\sin \theta = k:$ $\theta = \sin^{-1}(k) + 360^\circ n \quad \text{or} \quad \theta = 180^\circ - \sin^{-1}(k) + 360^\circ n$
Cosine Equation $\cos \theta = k:$ $\theta = \cos^{-1}(k) + 360^\circ n \quad \text{or} \quad \theta = -\cos^{-1}(k) + 360^\circ n$
Tangent Equation $\tan \theta = k:$ $\theta = \tan^{-1}(k) + 180^\circ n$

Summary:

Linear trigonometric equations involve solving for angles that satisfy trigonometric equations like $\sin \theta = k, \cos \theta = k, or \tan \theta = k.$ By isolating the trigonometric function, finding the principal solution, and considering the periodic nature of trigonometric functions, you can find all solutions within a specified interval.

Solving Trig Equations

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Example: Solve $\sin x = -0.15$ for $0 \leq x \leq 450$

x = \sin^{-1}(-0.15) = -8.6269^\circ

Visual representation of $\sin x = -0.15$ on the graph with solutions indicated.

x = 180 + 8.6269, \quad 360 + 8.6269

\text{Solutions: } 189^\circ, 351^\circ

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Solving $\cos(2x) = 0.2$ for $0 \leq x \leq 360$

0 \leq 2x \leq 720 \quad \Rightarrow \quad \text{Double limits since angle is } 2x, \text{ not } x

$\xcancel{\cos x=0.1 (\div 2}$ The only think which can penetrate is cos bracket is $cos^{-1}$

Method:

Cosine both sides:

\cos^{-1}(\cos(2x)) = \cos^{-1}(0.2)

2x = \cos^{-1}(0.2)

2x = 78.463^\circ

Do not $\div 2$ YET!!! There are multiple solutions at the moment we use an inverse trig function. Find these.

2x = 78.463^\circ, 281.537^\circ, 438.463^\circ, 641.537^\circ

Once we have multiple solutions, use them to find x:

x = 39.2^\circ, 141^\circ, 219^\circ, 321^\circ

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Example

Solve $\tan(3x) = 0.27$ for $-180 \leq x \leq 180$

Rearrange the equation to solve for $3x$ :

3x = \tan^{-1}(0.27) = 15.1096^\circ

Extend the interval to accommodate the factor of $3$ :

-540 \leq 3x \leq 540

List out the angles:

3x = -524.890, -344.890, -164.890, 15.1096, 195.1096, 375.1096,

Divide by $3$ to find $x$ :

x = -175, -115, -55.0, 5.04, 65.0, 125

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Solve $\sin(2x + 15) = \frac{\sqrt{2}}{2}$ for $0 \leq x \leq 180$

Set up the inequality:

15 \leq 2x + 15 \leq 375

Find the related angle by taking the inverse sine:

2x + 15 = \sin^{-1}\left(\frac{\sqrt{2}}{2}\right) = 45^\circ

Use the graph to identify additional solutions: Graph shows angles at 135° and 405°.

2x + 15 = 45, 135, 405

Solve for $x$ :

x = 15, 60

Trigonometric Equations

Graphs:

$y = \sin(x)$ - Red graph
$y = \cos(x)$ - Blue graph
$y = \tan(x)$ - Green graph

Note: Each graph is labeled with angles in degrees on the x-axis and the function values on the y-axis, showing typical periodic behavior.

Description:

Trigonometric equations, due to the infinite nature of the standard trig functions, typically have an infinite number of solutions. For this reason, in any given equation, we are told the domain in which the solutions are required.

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Example:

Solve \quad \cos(x) = 0.2 \\ 0^\circ \leq x \leq 360^\circ. \quad \text {This is the domain in which solutions are required}

Find the first solution on your calculator:

\arccos(\cos(x)) = \arccos(0.2)

Note: This is not required as a line of working, but it's part of the thought process.

x = \arccos(0.2) \implies x = 78.46^\circ

Implied truncation rather than rounding.

The calculation is done using a calculator, displaying $\cos^{-1}(0.2) = 78.46304097$ .

Steps to Solve Trigonometric Equations:

Sketch the relevant graph within the domain given to identify other solutions.
Conclude with all valid solutions:

$\boxed {x = 78.46^\circ, 281.5^\circ \quad \text{(4sf)}}$

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Example:

Solve $\tan(x) = -0.3$ , for $0 \leq x \leq 540$ :

Initial solution: $x = \arctan(-0.3) = -16.699^\circ$
Note: The initial solution is invalid, but if the graph is extended, it can be used to find valid solutions.
Mark the graph and use extensions to find solutions:
$x = 163.3^\circ, 343.3^\circ, 523.3^\circ$

Solving Trig Equations Involving Compound Angles:

By "compound angle," we mean "an angle more complicated than just $\theta$ ."

Example: Solve $\sin(3\theta) = 0.42, 0 \leq \theta \leq 180.$
Notice we are solving for $\theta$ , but the angle is $3\theta$ within the $\sin$ function.
Method: 3. Modify the domain to find limits for the compound angle in the bracket. 4. Here, $0 \leq 3\theta \leq 540.$
Solve within the modified domain.

Linear Trigonometric Equations Simplified Revision Notes for A-Level OCR Maths Pure

5.3.2 Linear Trigonometric Equations

1. Basic Steps to Solve Linear Trigonometric Equations: