SPM Practice (Short Questions)


Question 1:


In figure above, FAD is a tangent to the circle with centre O. AEB and OECD are straight lines. The value of y is

Solution:

OAD = 90o
AOD= 180o  – 90o – 34o= 56o
y = 56o  ÷ 2 = 28o


Question 2:

In figure above, PQR is a tangent to the circle QSTU at and TUPV is a straight line. The value of y is

Solution:

QTS = ∠RQS = 40o
SQT= ∠QTS = 40o (isosceles triangle)
PQT= 180o  – 40o – 40o= 100o
TPQ= 180o  – 115o = 65o
y = 180o  – 100o – 65o= 15o


Question 3:


In figure above, ABC is a tangent to the circle BDE with centre O, at B.
Find the value of y.
 
Solution:
BOD= 2 × ∠BED
= 2 × 35o = 70o
ODB = ∠OBD
= (180– 70o÷ 2 = 55o

EDB = ∠ EBA = 75o
yo + ∠ ODB = 75o
yo + 55o = 75o
y = 20o

8.2 Angle between Tangent and Chord

8.2 Angle between Tangent and Chord

 
1. In the diagram above, ABC is a tangent to the circle at point B.
 
2. Chord PB divides the circle into two segments, that is, the minor segment PRB and the major segment PQB.

3. With respect to ∠PBA, ∠PQB is known as the angle subtended by chord BP in the alternate segment.

4. 
With respect to ∠QBC, ∠BPQ is known as the angle subtended by chord BQ in the alternate segment.
 
5. The angle formed by the tangent and the chord which passes through the point of contact of the tangent is the same as the angle in the alternate segment which is subtended by the chord.
 
6. The relationships between the angles are:
Angle ∠ABP = Angle ∠BQP
Angle ∠CBQ = Angle ∠BPQ

8.3 Common Tangents (Sample Questions)


Example 1:

 
In the diagram, ABG and CDG are two common tangents to the circle with centres O and F respectively. Find the values of
(a) x,  (b) y,  (c) z.
 
Solution:
(a)
In ∆ BFG,
angle BFG = ½ × 56o = 28o
angle FBG = 90o ← (tangent is 90o to radius)
x+ 28o + 90o = 180o
x= 180o – 118o
x= 62o
x = 62
 
(b) 
angle AOF = xo = 62← (AO// BF)
y= 2 × 62o
y= 124o
y = 124

(c)
Exterior angle of AOC = 360o – 124o = 236o
Angle EOC = ½ × 236o = 118o
z= (180o – 118o) × ½  ← (∆ EOC is isosceles triangle, angle OEC = angle OCE)
z= 31o
z = 31

SPM Practice (Short Questions)


Question 4:


In figure above, ABCD is a tangent to the circle CEF at point C. EGC is a straight line. The value of y is
 
Solution:
C E F = D C F = 70 A E G + 70 + 210 = 360 A E G = 80 In cyclic quadrilateral A B G E , A B G + A E G = 180 y + 80 = 180 y = 100


Question 5:

In figure above, PAQ is a tangent to the circle at point A. AEC and BED are straight lines. The value of y is
 
Solution:
ABD = ∠ACD = 40o
ACB = ∠PAB = 60o
y= 180– ∠ACB – ∠CBD – ∠ABD
y= 180– 60o – 25o– 40o = 55o



Question 6:


In figure above, KPL is a tangent to the circle PQRS at point P. The value of x is

Solution:
PQS = ∠SPL= 55o
SPQ = 180– 30o – 55o= 95o
In cyclic quadrilateral,
SPQ + ∠SRQ = 180o
95o+ xo = 180o
x = 85o

8.3 Common Tangents (Part 1)

8.3 Common Tangents
A common tangent to two circles is a straight line that touches each of the circles at only one point.
 
1. Intersect at two points
(a) Circles of the same size


Number of common tangents
Properties of common tangents
Two common tangents:
AB and CD
AC = BD
AB = CD
AB parallel to // OR parallel to // CD
 
 
(b) Circles of different sizes
 


Number of common tangents
Properties of common tangents
Two common tangents:
ABE and CDE
AB = CD
BE = DE
OA // RB
OC // RD

SPM Practice (Short Questions)


Question 7:


In figure above, APB is a tangent to the circle PQR at point P. QRB is a straight line. The value of x is

Solution:
PQR = ∠RPB = 45o
QPR = (180– 45o) ÷ 2 = 67.5o
PQR + ∠BPQ + xo = 180o
45+ (67.5o + 45o) + xo = 180o
x = 22.5o



Question 8:


The figure above shows two circles with respective centres O and V. AB is a common tangent to the circles. OPRV is a straight line. The length, in cm, of PR is 

Solution:

cos 86 o = O M O V 0.070 = 1 O V O V = 1 0.070 O V = 14.29 c m P R = 14.29 5 4 = 5.29 c m

SPM Practice (Short Questions)


Question 4:
John has a collection of stamps from Thailand, Indonesia and Singapore. He picks one stamp at random. The probability of picking a Thailand stamp is 1 5  and the probability of picking an Indonesia stamp is 8 15 .  John has 20 Singapore stamps. Calculate the total number of stamps in his collection. 

Solution:

Probability of picking a Singapore stamp = 1 1 5 8 15 = 4 15 Given that John has 20 Singapore stamps, Total number of stamp in John's collection = 15 4 × 20 = 75



Question 5:
A box contains 36 green erasers and a number of red erasers.
If an eraser is picked randomly from the box, the probability of picking a red eraser is 5 8 . Find the number of red erasers.

Solution:

Probability of picking a green eraser = 1 – 5 8 = 3 8

Total number of erasers in the box = 36 × 8 3 = 96

Hence, number of red erasers in the box = 96 – 36 = 60


SPM Practice (Short Questions)


Question 1:
A box contains 5 pink marbles and 21 yellow marbles. Sharon puts another 4 pink marbles and 1 yellow marble inside the box. A marble is chosen at random from the box.
What is the probability that a pink marble is chosen?

Solution:

Total number of pink marbles = 5 + 4 = 9
Total number of yellow marbles = 21 + 1 = 22
Total number of marbles = 9 + 22 = 31

P ( pink marble ) = 9 31


Question 2:
In a group of 80 prefects, 25 are girls. Then 10 boys leave the group.
If a prefect is chosen at random from the group, state the probability that the prefect chosen is a boy.

Solution:

Number of boys = 80 – 25 = 55

After 10 boys left,
Number of boys = 55 – 10 = 45

Total number of prefects = 25 + 45 = 70
P ( b o y ) = 45 70 = 9 14


Question 3:
60 people have taken part in a singing contest. If a person is chosen at random from all the contestants, the probability of getting a male contestant is 8 15 . If there are 12 males and 3 females who did not qualify to the second round, find the probability that a male is chosen from the second round contestants.

Solution:
Number of male contestants = 60 × 8 15 = 32

After 12 males and 3 females left,
Total number of contestants left = 60 – 15 = 45

Number of male contestant = 32 – 12 = 20
P ( male contestant ) = 20 45 = 4 9

7.3 Probability of an Event


(A) Probability of an Event
1. The probability of an event A, P(A) is given by


2. If P(A) = 0, then the event A will certainly not occur.
3. If P(A) = 1, then the event A will certainly to occur.

Example 1:
Table below shows the distribution of a group of 80 pupils playing a game.

Form Four
Form Five
Girls
28
16
Boys
12
24
A pupil is chosen at random from the group to start the game.
What is the probability that a boy from Form Five will be chosen?

Solution:
Let
= Event that a boy from Form Five
= Sample space
n(S) = 28 + 12 + 16+ 24 = 80
n(A) = 24
P ( A ) = n ( A ) n ( S ) = 24 80 = 3 10



(B) Expected Number of Times an Event will Occur
If the probability of an event A and the number of trials are given, then the number of times event occurs
= P(A) × Number of trials
 
Example 2:
In a football training session, the probability that Ahmad scores a goal in a trial is ⅝. In 40 trials are chosen randomly, how many times is Ahmad expected to score a goal?
 
Solution:
Number of times Ahmad is expected to score a goal
= ⅝ × 40
= 25  



(C) Solving Problems
Example 3:
Kelvin has 30 white, blue and red handkerchiefs. If a handkerchief is picked at random, the probability of picking a white handkerchief is 2 5 .  Calculate
(a) the number of white handkerchiefs.
(b) the probability of picking a blue handkerchief if 8 of the handkerchiefs are red in colour.
 
Solution:
Let
= Event that a white handkerchief is picked.
= Event that a blue handkerchief is picked.
= Event that a red handkerchief is picked.
= Sample space

(a)

n(S) = 30
n ( W ) = P ( W ) × n ( S ) = 2 5 × 30 = 12

(b)

Given n(R) = 8
n(B) = 30 – 12 – 8 = 10
P ( B ) = n ( B ) n ( S ) = 10 30 = 1 3

7.1 Sample Space


7.1 Sample Space
 
(A) Experiment
1. An experiment is a process or an action in making an observation to obtain the required results.
2. The result of the experiment is called the outcome.


(B)    Listing all the possible outcomes of an experiment
We can list all the possible outcomes of an experiment by carrying out the experiment or by reasoning.

Example 1:
Six cards as shown in the diagram above are placed in a box. A card is drawn at random from the box. List all the possible outcomes.

Solution:
All the possible outcomes are O, R, A, N, G, E.


(C)   Sample space of an experiment
1. A sample space is the set of all the possible outcomes of an experiment.
2. The letter is used to represent the sample space and all the possible outcomes are written in brackets, { }.
 
Example 2:
A letter is chosen from the word ‘GARDEN’.
(a) List all the possible outcomes.
(b) Write the sample space, S, using set notation.
 
Solution:
(a) The possible outcomes are G, A, R, D, E and N
(b) Sample space, = {G, A, R, D, E, N }