B
Geometry and trigonometry
14
The circle and its properties
14.1 Introduction
Acircleis a plain figure enclosed by a curved line,
every point on which is equidistant from a point
within, called thecentre.
14.2 Properties of circles
(i) The distance from the centre to the curve is
called theradius,r, of the circle (seeOPin
Fig. 14.1).Figure 14.1
(ii) The boundary of a circle is called thecircum-
ference,c.
(iii) Any straight line passing through the centre
and touching the circumference at each end is
called thediameter,d(seeQRin Fig. 14.1).
Thusd=2r.
(iv) The ratiocircumference
diameter=a constant for any
circle.
This constant is denoted by the Greek let-
terπ(pronounced ‘pie’), whereπ= 3 .14159,
correct to 5 decimal places.
Hencec/d=πorc=πdorc= 2 πr.
(v) Asemicircleis one half of the whole circle.
(vi) Aquadrantis one quarter of a whole circle.
(vii) Atangentto a circle is a straight line which
meets the circle in one point only and does not
cut the circle when produced.ACin Fig. 14.1
is a tangent to the circle since it touches the
curve at pointBonly. If radiusOBis drawn,
then angleABOis a right angle.(viii) Asectorof a circle is the part of a circle
between radii (for example, the portionOXY
of Fig. 14.2 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.Figure 14.2(ix) Achordof a circle is any straight line which
divides the circle into two parts and is termin-
ated at each end by the circumference.ST,in
Fig. 14.2 is a chord.
(x) Asegmentis the name given to the parts into
which a circle is divided by a chord. If the
segment is less than a semicircle it is called a
minor segment(see shaded area in Fig. 14.2).
If the segment is greater than a semicircle it
is called amajor segment(see the unshaded
area in Fig. 14.2).
(xi) Anarcis a portion of the circumference of a
circle. The distanceSRTin Fig. 14.2 is called
aminor arcand the distanceSX YTis called
amajor arc.
(xii) The angle at the centre of a circle, sub-
tended by an arc, is double the angle at the
circumference subtended by the same arc.
With reference to Fig. 14.3,AngleAOC=
2 ×angleABC.
(xiii) The angle in a semicircle is a right angle (see
angleBQPin Fig. 14.3).Figure 14.3