CHAPTER 17. TRIGONOMETRY 17.5
Therefore the area of�ABC is:
1
2
c. h=1
2
c. b. sinAˆ=1
2
c. a. sinBˆSimilarly, by drawing the perpendicular between point B and line AC we can show that:
1
2
c. b. sinAˆ =1
2
a. b. sinCˆTherefore the area of�ABC is:
1
2c. b. sinAˆ =1
2
c. a. sinBˆ =1
2
a. b. sinCˆIf we divide through by^12 a. b. c, we get:
sinAˆ
a=
sinBˆ
b=
sinCˆ
cThis is known as the sine rule and applies to any triangle, right-angled ornot.
Example 14: Lighthouses
QUESTIONA� �B
�
C127 ◦ 255 ◦
There is a coastline withtwo lighthouses, one oneither side of a beach. The two lighthouses
are 0 , 67 km apart and one is exactly due east of the other. The lighthouses tellhow close a
boat is by taking bearings to the boat (remember – a bearing is an anglemeasured clockwise
from north). These bearings are shown. Use thesine rule to calculate how far the boat is from
each lighthouse.