Mensuration (length and area) (Chapter 9) 201You should already be familiar with these terms relating to circles:Acircleis the set of all points a fixed distance from a
point called the circle’scentre.
A line segment from the centre to any point on the circle
is called aradius.
We denote the length of the radius byr. The perimeter
of a circle is called itscircumference.
A line segment which joins any two points on the circle
is called achord.
A chord which passes through the centre of the circle is
called adiameter. We denote the length of the diameter
byd.
Anarcis a continuous part of the circle. The length of
an arc is called itsarclength.
Every arc has a correspondingsector, which is the portion
of the circle subtended by the same angleμas the arc.The formulae for the circumference and area of a circle both involve the number¼or “pi”.¼is an irrational
number, and ¼¼ 3 : 14 :CircleArea A=¼r^2Circumference C=¼d
or C=2¼rSector
Arclength s=¡ μ
360¢
£ 2 ¼rArea A=¡ μ
360¢
£¼r^2D CIRCLES AND SECTORS [6.3, 6.5]
radius
lengthr
centrediameter
lengthdchordr
qarcsectorr
dq° rs24 m10 m13 m 15 m11 Parallelogram ABCD has AB=10cm and diagonal DB=15cm. If the shortest distance from C to
line AB is 8 cm, find the shortest distance from A to DB.12 Find the area of this trapezium:10 a A kite has diagonals of length 16 cm and 10 cm. Find its area.
b Find the area of a kite with diagonals of lengthacm andbcm.IGCSE01
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Y:\HAESE\IGCSE01\IG01_09\201IGCSE01_09.CDR Thursday, 2 October 2008 11:50:35 AM PETER