There are a few special angles whose sine, cosine or tangent can be expressed as rational numbers, and there are some whose sine, cosine or tangent can be written exactly using surds.
Using a unit circle, the knowledge that points on the unit circle have coordinates $\left(\sin\theta,\cos\theta\right)$(sinθ,cosθ) and $\tan\theta=\frac{\sin\theta}{\cos\theta}$tanθ=sinθcosθ we can determine that $\sin0^\circ=0$sin0°=0 ,$\cos0^\circ=1$cos0°=1and $\tan0^\circ=0$tan0°=0. Also, $\sin90^\circ=1$sin90°=1 , $\cos90^\circ=0$cos90°=0 and $\tan90^\circ$tan90° is undefined.
In chapter 4 we found that we can obtain values for the trigonometric functions of the angles $30^\circ$30°, $60^\circ$60° and $45^\circ$45° by applying Pythagoras’ theorem in some special triangles.
These can be summarised by the following table, (the denominator for each has been rationalised):
Angle in Degrees | $0^\circ$0° | $30^\circ$30° | $45^\circ$45° | $60^\circ$60° | $90^\circ$90° |
---|---|---|---|---|---|
Angle in Radians | $0$0 | $\frac{\pi}{6}$π6 | $\frac{\pi}{4}$π4 | $\frac{\pi}{3}$π3 | $\frac{\pi}{2}$π2 |
sin | $0$0 | $\frac{1}{2}$12 | $\frac{\sqrt{2}}{2}$√22 | $\frac{\sqrt{3}}{2}$√32 | $1$1 |
cos | $1$1 | $\frac{\sqrt{3}}{2}$√32 | $\frac{\sqrt{2}}{2}$√22 | $\frac{1}{2}$12 | $0$0 |
tan | $0$0 | $\frac{\sqrt{3}}{3}$√33 | $1$1 | $\sqrt{3}$√3 | $undefined$undefined |
If we evaluate a trigonometric function for any multiple of $30^\circ$30° or $45^\circ$45° the answer can be written in an exact form using rational numbers or surds. We can use the symmetry of the trigonometric functions to write equivalent statements using angles in the first quadrant.
Multiples of $45^\circ$45° $\left(\frac{\pi}{4}\right)$(π4) | Multiples of $30^\circ$30° $\left(\frac{\pi}{6}\right)$(π6) |
Evaluate $\cos\left(\frac{19\pi}{6}\right)$cos(19π6), giving your answer in exact form.
Method 1:
Think: $2\pi=\frac{12\pi}{6}$2π=12π6 therefore $\frac{19\pi}{6}$19π6 is more than a full circle. Subtracting $\frac{12\pi}{6}$12π6 an equivalent rotation would be $\frac{7\pi}{6}$7π6. We could look this value up in the unit circle diagram above, looking for the $x$x-coordinate.
Do:
$\cos\left(\frac{19\pi}{6}\right)$cos(19π6) | $=$= | $\cos\left(\frac{7\pi}{6}\right)$cos(7π6) |
$=$= | $-\frac{\sqrt{3}}{2}$−√32 |
Method 2:
Think: Alternatively, we can write the angle in terms of a first quadrant angle and then evaluate.
$\frac{7\pi}{6}$7π6 is $\frac{\pi}{6}$π6 past $\pi$π. By symmetry, it will have the same magnitude $x$x-coordinate as $\frac{7\pi}{6}$7π6 but the opposite sign. We call $\frac{\pi}{6}$π6 the reference angle or related acute angle.
Do:
$\cos\left(\frac{19\pi}{6}\right)$cos(19π6) | $=$= | $\cos\left(\frac{7\pi}{6}\right)$cos(7π6) |
$=$= | $-\cos\left(\frac{\pi}{6}\right)$−cos(π6) | |
$=$= | $-\frac{\sqrt{3}}{2}$−√32 |
Evaluate the expression: $\sin\left(405^\circ\right)\left(\tan\left(150^\circ\right)+\cos\left(150^\circ\right)\right)$sin(405°)(tan(150°)+cos(150°)).
Think: The angle $405^\circ$405° is equivalent to $45^\circ$45°, one full circle of $360^\circ$360° then an extra $45^\circ$45°
So, $\sin\left(405^\circ\right)$sin(405°) is the same as $\sin\left(45^\circ\right)=\frac{\sqrt{2}}{2}$sin(45°)=√22.
Similarly, $150^\circ$150° is $30^\circ$30° before $180^\circ$180°. It therefore has related acute angle of $30^\circ$30° but the cosine and tangent will be negative because it is in the second quadrant.
Hence, $\tan\left(150^\circ\right)=-\frac{\sqrt{3}}{3}$tan(150°)=−√33 and $\cos\left(150^\circ\right)=-\frac{\sqrt{3}}{2}$cos(150°)=−√32.
Do: Putting the pieces together, we have:
$\sin\left(405^\circ\right)\left(\tan\left(150^\circ\right)+\cos\left(150^\circ\right)\right)$sin(405°)(tan(150°)+cos(150°)) | $=$= | $\frac{\sqrt{2}}{2}\left(-\frac{\sqrt{3}}{3}-\frac{\sqrt{3}}{2}\right)$√22(−√33−√32) |
$=$= | $-\frac{\sqrt{6}}{6}-\frac{\sqrt{6}}{4}$−√66−√64 | |
$=$= | $-\frac{2\sqrt{6}}{12}-\frac{3\sqrt{6}}{12}$−2√612−3√612 | |
$=$= | $-\frac{5\sqrt{6}}{12}$−5√612 |
Reflect: Try and express the angle as a multiple of $30$30 or $45$45 degrees and use a unit circle diagram to ensure you have the correct sign for the sine, cosine or tangent.
By considering the unit circle, find the exact value of $\tan9\pi$tan9π
Consider the expression $\sin150^\circ$sin150°.
In which quadrant is $150^\circ$150°?
fourth quadrant
second quadrant
third quadrant
first quadrant
What positive acute angle is $150^\circ$150° related to?
Is $\sin150^\circ$sin150° positive or negative?
negative
positive
Rewrite $\sin150^\circ$sin150° in terms of its relative acute angle. You do not need to evaluate $\sin150^\circ$sin150°.
Find the exact value of $\tan\frac{7\pi}{6}$tan7π6.
By first rewriting each ratio in terms of the reference angle, evaluate the following, leaving your answer in fully simplified exact form.
$\frac{\sin\left(\frac{11\pi}{6}\right)+\cos\left(\frac{5\pi}{3}\right)-\tan\left(\frac{5\pi}{3}\right)}{\cos\left(\frac{4\pi}{3}\right)}$sin(11π6)+cos(5π3)−tan(5π3)cos(4π3)