The theorem of Pythagoras (Chapter 8) 179Example 11 Self Tutor
An equilateral triangle has sides of length 6 cm. Find its area.The altitude bisects the base at right angles.) a^2 +3^2 =6^2 fPythagorasg
) a^2 +9=36
) a^2 =27
) a=p
27 fas a> 0 gNow, area=^12 £base£height
=^12 £ 6 £p
27
=3p
27 cm^2
¼ 15 : 6 cm^2So, the area is about 15 : 6 cm^2 :Example 12 Self Tutor
Let SB bexkm.
From the diagram alongside, we see in triangle SAB that
SABb =90o.
x^2 = 112^2 + 134^2 fPythagorasg
) x^2 = 30 500
) x=p
30 500 fas x> 0 g
) x¼ 175So, outpost B is 175 km from base station S.EXERCISE 8C
1 A rectangle has sides of length 8 cm and 3 cm. Find the length of its diagonals.2 The longer side of a rectangle is three times the length of the shorter side. If the length of the diagonal
is 10 cm, find the dimensions of the rectangle.
3 A rectangle with diagonals of length 20 cm has sides in the ratio 2:1. Find the:
a perimeter b area of the rectangle.
4 A rhombus has sides of length 6 cm. One of its diagonals is 10 cm long. Find the length of the other
diagonal.5 A square has diagonals of length 10 cm. Find the length of its sides.acm6cm3cmxkm134 km112 kmASBA helicopter travels from base station S for km to outpost A. It then turns to the
right and travels km to outpost B. How far is outpost B from base station S?¡¡ 112 90
134
¡ o
¡¡¡¡IGCSE01
cyan magenta yellow black(^05255075950525507595)
100 100
(^05255075950525507595)
100 100
y:\HAESE\IGCSE01\IG01_08\179IGCSE01_08.CDR Wednesday, 17 September 2008 1:47:01 PM PETER