The Unit Circle

What is the unit circle?

The unit circle is a circle with radius 1 and centre (0, 0)
The unit circle can be used to explain how trig functions work with angles that are not acute
Angles are always measured from the positive x-axis and turn:
- anticlockwise for positive angles
- clockwise for negative angles
It can be used to calculate trig values as a coordinate point (x, y) on the circle
- Trig values can be found by making a right triangle with the radius as the hypotenuse
- Where θ is the angle measured anticlockwise from the positive x-axis
- The x-axis will always be adjacent to the angle, θ
SOHCAHTOA can be used to find the values of sinθ, cosθ and tanθ easily
As the radius is 1 unit
- the x coordinate gives the value of cosθ
- the y coordinate gives the value of sinθ
As the origin is one of the end points - dividing the y coordinate by the x coordinate gives the gradient
- the gradient of the line gives the value of tanθ
It allows us to calculate sin, cos and tan for angles greater than 90° ( $\frac{π}{2}$ rad)

Connection between the unit circle and trig functions

Worked example

The coordinates of a point on a unit circle, to 3 significant figures, are (0.629, 0.777).

Find θ in radians correct to 2 significant figures..

cie-add-maths-the-unit-circle-we-solution

We know that $(x, y) = (\cos θ, \sin θ)$ so we can use either ratio to solve for $θ$ .

$\begin{array}{rcl} \cos θ & = & 0.629 \\ θ & = & \cos^{- 1} 0.629 \\ = & 0.89053 . . . \end{array}$

$\begin{array}{rcl} \sin θ & = & 0.777 \\ θ & = & \sin^{- 1} 0.777 \\ = & 0.88988 . . . \end{array}$

$θ = 0.89 rad (2 s . f .)$

Using The Unit Circle

What are the properties of the unit circle?

The unit circle can be split into four quadrants at every 90° ( $\frac{π}{2}$ rad)
- The first quadrant is for angles between 0 and 90°
  - All three of Sinθ, Cosθ and Tanθ are positive in this quadrant
- The second quadrant is for angles between 90° and 180° ( $\frac{π}{2}$ rad and $π$ rad)
  - Sinθ is positive in this quadrant
- The third quadrant is for angles between 180° and 270° ( $π$ rad and $\frac{3 π}{2}$ )
  - Tanθ is positive in this quadrant
- The fourth quadrant is for angles between 270° and 360° ( $\frac{3 π}{2}$ rad and $2 π$ )
  - Cosθ is positive in this quadrant
- Starting from the fourth quadrant (on the bottom right) and working anti-clockwise the positive trig functions spell out CAST
  - This is why it is often thought of as the CAST diagram
  - You may have your own way of remembering this
  - A popular one starting from the first quadrant is All Students Take Calculus
- To help picture this better try sketching all three trig graphs on one set of axes and look at which graphs are positive in each 90° section

How is the unit circle used to find secondary solutions?

Trigonometric functions have more than one input to each output
- For example sin 30° = sin 150° = 0.5
- This means that trigonometric equations have more than one solution
- For example both 30° and 150° satisfy the equation sin x = 0.5
The unit circle can be used to find all solutions to trigonometric equations in a given interval
- Your calculator will only give you the first solution to a problem such as x = sin^-1(0.5)
  - This solution is called the primary value
- However, due to the periodic nature of the trig functions there could be an infinite number of solutions
  - Further solutions are called the secondary values
- This is why you will be given a domain in which your solutions should be found
  - This could either be in degrees or in radians
  - If you see π or some multiple of π then you must work in radians
The following steps may help you use the unit circle to find secondary values

STEP 1: Draw the angle into the first quadrant using the x or y coordinate to help you

If you are working with sin x = k, draw the line from the origin to the circumference of the circle at the point where the y coordinate is k
If you are working with cos x = k, draw the line from the origin to the circumference of the circle at the point where the x coordinate is k
If you are working with tan x = k, draw the line from the origin to the circumference of the circle such that the gradient of the line is k
- This will give you the angle which should be measured from the positive x-axis…
  - … anticlockwise for a positive angle
  - … clockwise for a negative angle

STEP 2: Draw the radius in the other quadrant which has the same...

... x-coordinate if solving cos x = k
- This will be the quadrant which is vertical to the original quadrant
... y-coordinate if solving sin x = k
- This will be the quadrant which is horizontal to the original quadrant
... gradient if solving tan x = k
- This will be the quadrant diagonal to the original quadrant

STEP 3: Work out the size of the second angle, measuring from the positive x-axis

… anticlockwise for a positive angle
… clockwise for a negative angle
- You should look at the given range of values to decide whether you need the negative or positive angle

STEP 4: Add or subtract either 360° or 2π radians to both values until you have all solutions in the required range

Quadrants and the sign of the trig functions

Exam Tip

Being able to sketch out the unit circle and remembering CAST can help you to find all solutions to a problem in an exam question

Worked example

Given that one solution of cosθ = 0.8 is θ = 0.6435 radians correct to 4 decimal places, find all other solutions in the range -2π ≤ θ ≤ 2π. Give your answers correct to 3 significant figures.

Cosine is positive in the first and fourth quadrants so draw the angle from the horizontal axis in both quadrants.

cie-add-maths-using-the-unit-circle-we-solution-part-i

The primary value is 0.6435 and a secondary value is -0.6435.

Consider all four possible angles that can be made from the horizontal axis to each of the lines drawn.
The range is -2π ≤ θ ≤ 2π so the angles can be in both the positive and negative direction.

EcE9ilhU_cie-add-maths-using-the-unit-circle-we-solution

The angle in the positive direction to the line in the fourth quadrant is 2π - 0.6435 = 5.63968...
The angle in the negative direction to the line in the first quadrant is -2π + 0.6435 = -5.63968...

Solutions are -5.64, -0.644, 0.644, 5.64 rads (3 s.f.)

The Unit Circle (CIE IGCSE Additional Maths)

Revision Note

The Unit Circle

What is the unit circle?

Worked example

Using The Unit Circle

What are the properties of the unit circle?

How is the unit circle used to find secondary solutions?

Exam Tip

Worked example

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Author: Amber