Chapter 26
The circle
26.1 Introduction
Acircleis aplain figureenclosed by acurved line,every
point on which is equidistantfrom a pointwithin, called
thecentre.
InChapter25,workedproblemsontheareasofcircles
and sectors were demonstrated. In this chapter, proper-
ties of circles are listed and arc lengths are calculated,
together with more practical examples on the areas of
sectors of circles. Finally, the equation of a circle is
explained.
26.2 Properties of circles
(a) The distance from the centre to the curve is called
theradius,r,ofthecircle(seeOPinFigure26.1).CBQO
PRAFigure 26.1
(b) The boundary of a circle is called thecircumfer-
ence,c.
(c) Any straight line passing through the centre and
touching the circumference at each end is called
thediameter,d(seeQRin Figure 26.1). Thus,
d= 2 r.(d) The ratiocircumference
diameteris a constant for any cir-
cle. This constant is denoted by theGreek letterπ(pronounced ‘pie’), whereπ= 3 .14159, correct
to 5 decimal places (check withyour calculator).
Hence,c
d=πorc=πdorc= 2 πr.(e) Asemicircleis one half of a whole circle.
(f) Aquadrantis one quarter of a whole circle.
(g) Atangenttoa circleis astraightlinewhich meets
thecircleatonepointonlyanddoesnotcutthecir-
cle when produced.ACinFigure 26.1 isa tangent
to the circle since it touches the curve at pointB
only. If radiusOBis drawn,angleABOis a right
angle.
(h) The sectorof a circle is the part of a circle
between radii (for example, the portionOXYof
Figure 26.2 is a sector). If a sector is less than a
semicircle it is called aminor sector; if greater
than a semicircle it is called amajor sector.XYS TROFigure 26.2(i) Thechordof a circle is any straight line which
divides the circle into two parts and is termi-
nated at each end by the circumference.ST,in
Figure 26.2, is a chord.
(j) Segmentis thename given to theparts intowhich
a circleis dividedby achord.If thesegment is less
than a semicircle it is called aminor segment
(see shaded area in Figure 26.2). If the segmentDOI: 10.1016/B978-1-85617-697-2.00026-0