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Specific Objectives
By the end of the topic the learner should be able to:
- Identify an arc, chord and segment
- Relate and compute angle subtended by an arc at the circumference;
- Relate and compute angle subtended by an arc at the centre and at the circumference
- State the angle in the semi-circle
- State the angle properties of a cyclic quadrilateral
- Find and compute angles of a cyclic quadrilateral.
Content
- Arc, chord and segment.
- Angle subtended by the same arc at the circumference
- Relationship between angle subtended at the centre and angle subtended on the circumference by the same arc
- Angle in a semi-circle
- Angle properties of a cyclic quadrilateral
- Finding angles of a cyclic quadrilateral.
Introduction
Arc, Chord and Segment of a circle
Arc
Any part on the circumference of a circle is called an arc. We have the major arc and the minor Arc as shown below.
Chord
A line joining any two points on the circumference. Chord divides a circle into two regions called segments, the larger one is called the major segment the smaller part is called the minor segment.
Angle at the centre and Angle on the circumference
The angle which the chord subtends to the centre is twice that it subtends at any point on the circumference of the circle.
Angle in the same segments
Angles subtended on the circumference by the same arc in the same segment are equal. Also note that equal arcs subtend equal angles on the circumference
Cyclic quadrilaterals
Quadrilateral with all the vertices lying on the circumference are called cyclic quadrilateral
Angle properties of cyclic quadrilateral
- The opposite angles of cyclic quadrilateral are supplementary hence they add up to.
- If a side of quadrilateral is produced the interior angle is equal to the opposite exterior angle.
Example
In the figure below find
Solution
Using this rule, If a side of quadrilateral is produced the interior angle is equal to the opposite exterior angle. Find
Angles formed by the diameter to the circumference is always
Summary
- Angle in semicircle = right angle
- Angle at centre is twice than at circumference
- Angles in same segment are equal
- Angles in opposite segments are supplementary
Example
1.) In the diagram, O is the centre of the circle and AD is parallel to BC. If angle ACB =50o
and angle ACD = 20o.
Calculate; (i) ÐOAB
(ii) ÐADC
Solution i) ∠ AOB = 2 ∠ ACB
= 100o
∠ OAB = 180 – 100 Base angles of Isosceles ∆
2
= 400
(ii) ∠B AD = 1800 – 700
= 110
End of topic
Did you understand everything? If not ask a teacher, friends or anybody and make sure you understand before going to sleep! |
Past KCSE Questions on the topic.
- The figure below shows a circle centre O and a cyclic quadrilateral ABCD. AC = CD, angle
ACD is 80o and BOD is a straight line. Giving reasons for your answer, find the size of :-
C
(i) Angle ACB
(ii) Angle AOD
(iii) Angle CAB
(iv) Angle ABC
(v) Angle AXB
-
In the figure below CP= CQ and 0. If ABCD is a cyclic quadrilateral, find < BAD.
-
In the figure below AOC is a diameter of the circle centre O; AB = BC and < ACD = 250, EBF is a tangent to the circle at B.G is a point on the minor arc CD.
(a) Calculate the size of
(i) < BAD
(ii) The Obtuse < BOD
(iii) < BGD
(b) Show the < ABE = < CBF. Give reasons
-
In the figure below PQR is the tangent to circle at Q. TS is a diameter and TSR and QUV are straight lines. QS is parallel to TV. Angles SQR = 400 and angle TQV = 550
Find the following angles, giving reasons for each answer
- QST
- QRS
- QVT
- UTV
-
In the figure below, QOT is a diameter. QTR = 480, TQR = 760 and SRT = 370
Calculate
(a) (b) (c) Obtuse BCD respectively. Line ABE is a tangent to circle BCD at B. Angle BCD = 420 (a) Stating reasons, determine the size of (i) (ii) Reflex (b) Show that ∆ ABD is isosceles Calculate: (a) < AEG (b) < ABC Find the size of Ð RST
the circle at T. POR is a straight line and Ð QPR = 200
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