Unit Circle HL

The Unit Circle is probably the most important topic to understand from the whole of trigonometry. Lots of the properties of the trigonometric functions can be found from the unit circle. All the work on this page will help us understand all of these properties. This is essential knowledge, for example, for us to be able to solve trigonometric equations.


Key Concepts

On this page, you should learn about

  • the definition of \(\sin \theta\) and \(\cos \theta\) in terms of the unit circle
    • If we consider a unit circle (a circle of radius 1), then

\(sin\theta=\frac{opposite}{hypotenuse}=\frac{opposite}{1}\)

\(cos\theta=\frac{adjacent}{hypotenuse}=\frac{adjacent}{1}\)

  • the definition of \(​\tan \theta\) as \(\frac{opposite}{adjacent}=\frac{\sin\theta}{\cos\theta}\)
  • exact values of trigonometric ratios of 0°, 30°, 45°, 60°, 90°
  • the symmetry properties of graphs of trigonometric functions
  • the reciprocal trigonometric ratios \(cosec \theta\)\(sec \theta\)\(cot\theta\)

Essentials

The following applets will help you understand the definition of sine and cosine in terms of the unit circle

Sine

sine of an angle is given by the opposite side, or the y coordinate on the unit circle

Cosine

cosine of an angle is given by the adjacent side, or the x coordinate on the unit circle

Summary

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Test Yourself

Here is a quiz that practises the skills from this page


START QUIZ!

Exam-style Questions

Question 1

Given that \(cosx=-\frac{\sqrt{7}}{3}\) and \(\frac{\pi}{2}\le x\le \pi\) , find the possible values of sinx and cotx

Hint

Full Solution

Question 2

If \(tanx=\frac{12}{5}\) and \(\pi\le x\le \frac{3\pi}{2}\) , find the value of cosecx

Hint

Full Solution

MY PROGRESS

How much of Unit Circle HL have you understood?