SPM Practice (Short Questions)

Posted on May 27, 2020 by Myhometuition

8.4 Circles, SPM Practice (Short Questions)

Question 9:

In figure above, ABC is a tangent to the circle centre O at B. AED is a straight line.

Find the value of y.

Solution:

∠ABO = 90^o

∠BOE = 2 × 40^o= 80^o

In quadrilateral AEOB,

∠AEO = 360^o– ∠ABO– ∠BOE – 35^o

= 360^o– 90^o – 80^o – 35^o= 155^o

y^o+ ∠AEO = 180^o

y^o+ 155^o = 180^o

y^o= 180^o– 155^o

y^o = 25

Question 10:

In figure above, ABC is a tangent to the circle centre O, at point B.

The value of x is

Solution:

∠OBC = 90^o

∠BOD = 2 × 50^o= 100^o

In quadrilateral BODC,

x^o= 360^o– ∠BOD – ∠OBC – 120^o

= 360^o– 100^o – 90^o – 120^o

= 50

8.3 Common Tangents (Part 3)

Posted on May 27, 2020 by Myhometuition

3. Do not intersect

(a) Circles of the same size

Number of common tangents	Properties of common tangents
Four common tangents: AB, CD, PS and RQ	AB = CD = OV PS = RQ AB // OV // CD

(b) Circles of different sizes

Number of common tangents	Properties of common tangents
Four common tangents: AB, CD, PS and RQ	AB = CD BT = DT PS = RQ OA // VB OC // VD

8.3 Common Tangents (Part 2)

Posted on May 27, 2020 by Myhometuition

2. Intersect at one point

(a) Circles of the same size

Number of common tangents	Properties of common tangents
Three common tangents: AB, CD and PQ	AC = PQ = BD AB = OR = CD AB // OR // CD AC // PQ // BD PQ perpendicular to OR

(b) Circles of different sizes

(i) External contact

Number of common tangents	Properties of common tangents
Three common tangents: ABE, CDE and PQ	AB = CD BE = DE OA // RB OC // RD PQ perpendicular to ORE

(ii) Internal contact

Number of common tangents	Properties of common tangents
One common tangent: PQR	ONQ perpendicular to PR

8.2 Angle between Tangent and Chord (Example 3 & 4)

Posted on May 27, 2020 by Myhometuition

Example 3:

In the diagram, PQR is a tangent to the circle QSTU at Q.

Find the values of

(a) x (b) y

Solution:

(a)

∠UTS + ∠UQS = 180^o ←(opposite angle in cyclic quadrilateral QSTU)

105^o + ∠ UQS = 180^o

∠ UQS = 75^o

x+ 75^o + 20^o = 180^o←(the sum of angles on a straight line PQR = 180^o)

x+ 95^o = 180^o

x = 85^o

(b)

∠ PQU = ∠ QSU ← (angle in alternate segment)

85^o = 35^o + y

y = 50^o

Example 4:

In the diagram, ABC is a tangent to the circle BDE with centre O, at B.

Find the value of x.

Solution:

\begin{array}{l} ∠ B E D = ∠ C B D = 54^{\circ} \\ ∠ B D E = \frac{180^{\circ} - 54^{\circ}}{2} = 63^{\circ} \leftarrow \begin{array}{l} Isosceles triangle \\ ∠ E B D = ∠ E D B \end{array} \\ ∠ A B E = ∠ B D E = 63^{\circ} \\ In △ A B E, \\ x^{\circ} + 45^{\circ} + 63^{\circ} = 180^{\circ} \\ x^{\circ} + 108^{\circ} = 180^{\circ} \\ x = 72 \end{array}

8.2 Angle between Tangent and Chord (Example 1 & 2)

Posted on May 27, 2020 by Myhometuition

Example 1:

In the diagram, ABC is a tangent to the circle BDE at B.

The length of arc BD is equal to the length of arc DE.

Find the value of p.

Solution:

Angle BED = 82^o ← (angle in alternate segment)

Angle DBE = 82^o ← (Arc BD = Arc DE, BDE is an isosceles triangle)

Therefore p= 180^o – 82^o – 82^o= 16^o

Example 2:

In the diagram, PQR is a tangent to the circle QSTU at Q.

Find the value of y.

Solution:

Angle QUT

= 180^o– 98^o ← (opposite angle in cyclic quadrilateral QSTU )

= 82^o

Angle QTU = 75^o ← (angle in alternate segment)

Therefore y= 180^o – (82^o + 75^o) ← (Sum of interior angles in ∆ QTU)

= 23^o

8.1 Tangents to a Circle (Examples)

Posted on May 27, 2020 by Myhometuition

Example 1:

In the diagram, O is the centre of a circle. ABC and CDE are two tangents to the circle at points B and D respectively. Find the length of OC.

Solution:

OC²= OB² + BC² ← (Pythagoras’ Theorem)

= 6² + 8²

= 100

OC = √100 = 10 cm

Example 2:

In the diagram, AB and BC are two tangents to a circle with centre O. Calculate the values of

(a) x (b) y

Solution:

(a)

AB = BC

7 + x = 12

x = 5

(b)

∠

OBA =

∠

OBC = 21^o

∠

OAB = 90^o ← (OA is perpendicular to AB)

y^o= 180^o – 21^o– 90^o

y = 69

Example 3:

In the diagram, ABC is a tangent to the circle with centre Oat point B. CDE is a straight line. Find the value of x.

Solution:

∠

CBO = 90^o ← (OB is perpendicular to BC)

In ∆ BCE,

x = 180^o – 30^o– 50^o– 90^o

x = 10^o

8.1 Tangents to a Circle

1. A tangent to a circle is a straight line that touches the circle at only one point and the point is called the point of contact.

2. If a straight line cuts a circle at two distinct points, it is called a secant. The chord is part of the secant in a circle.

3. Tangent to a circle is perpendicular to the radius of the circle that passes through the point of contact.

If ABC is the tangent to the circle at B, then

∠

ABO =

∠

CBO = 90^o.

Properties of Two Tangents to a Circle from an External Point

In the diagram, BA and BC are two tangents from an external point B. The properties of the tangents are as follows.

(a) BA = BC

(b)

∠

ABO =

∠

CBO = x^o

(c)

∠

AOB =

∠

COB = y^o

(d) ∠ OAB =

∠

OCB = 90^o

(e)

∠

AOC +

∠

ABC = 180^o

(f) ∆ AOB and ∆ COB are congruent