latih

1. 1
[100 marks]
Answer all questions from this section.
Jawab semua soalan daripada bahagian ini.
1 Calculate the value of s and of t that satisfy the following simultaneous linear equations:
Hitungkan nilai sdan nilai t yang memuaskan persamaan linear serentak berikut:
s  t = 6
s + t = 4
[4 marks]
Answer:
2 Solve the equation 4(x2
+ 3)  16x = 0
Selesaikan persamaan 4(x2 + 3)  16x = 0
.
[4 marks]
Answer:
3
Solve the equation 2t =
4t2
+ 2
3
.
Selesaikan persamaan 2t =
4t2 + 2
3
.
[4 marks]
Answer:

2. 2
4 Calculate the value of x and of y that satisfy the following simultaneous linear equations:
Hitungkan nilai x dan nilai y yang memuaskan persamaan linear serentak berikut:
3x  2y  12 = 0
7x + 6y + 4 = 0
[5 marks]
Answer:
5 Diagram 1 shows two sectors OFG and OHI with the same centre O. OFGJ is a quadrant of a
circle with centre O. OGH and OJI are straight lines.
Rajah 1 menunjukkan dua sektorbulatan OFG dan OHI yang sama-sama berpusat O. OFGJ ialah sukuan
bulatan berpusat O. OGH dan OJI ialah garis lurus.
Diagram 1
OJ = JI = 14 cm and ∠HOI = 45°.
OJ = JI = 14 cm dan ∠HOI = 45°.
Using π =
22
7
, calculate
Dengan menggunakan π =
22
7
, hitungkan
(a) the perimeter, in cm, of the whole diagram,
perimeter, dalamcm, seluruh rajah itu,
(b) the area,in cm2
, of the shaded region.
luas, dalam cm2
, kawasan yang berlorek.
[6 marks]
Answer:

3. 3
6 Diagram 2 shows two sectors OAB and OCDE with the same centre O. OFE is a semicircle with
diameter OE and OE = 2AO. AOE and OBC are straight lines.
Rajah 2 menunjukkan dua sektorbulatan OAB dan OCDE yang sama-sama berpusat O. OFE ialah
semibulatan dengan OE sebagai diameter dan OE = 2AO. AOE dan OBC ialah garis lurus.
Diagram 2
AO = 14 cm and ∠AOB = 45°.
AO = 14 cm dan ∠AOB = 45°.
Using π =
22
7
, calculate
Dengan menggunakan π =
22
7
, hitungkan
(a) the perimeter, in cm, of the whole diagram,
perimeter, dalamcm, seluruh rajah itu,
(b) the area,in cm2
, of the shaded region.
luas, dalam cm2
, kawasan yang berlorek.
[6 marks]
Answer:
7 (a) Complete the following statement with the quantifier "all" or "some" to form a true
statement.
Lengkapkan pernyataan berikut dengan pengkuantiti "semua" atau "sebilangan" untuk membentuk
suatu pernyataan benar.
__________ right prisms have cross-
sections in the form of trapezium.
__________ prisma tegak mempunyai
keratan rentas dalambentuk trapezium.
(b)
The area of a triangle =
1
2
× base × height.
Luas sebuah segi tiga =
1
2
× tapak × ketinggian.
STU is a triangle with base 45 cm and height 84 cm.
STU ialah sebuah segi tiga dengan tapak 45 cm dan ketinggian 84cm.

4. 4
Special conclusion:
Kesimpulan khas:
(c) Complete the Premise 1 in the argument below:
Lengkapkan Premis1 dalamhujah berikut:
Premise 1:
Premis 1:
Premise 2: 4xx
+ 2x + 10 is a quadratic equation in x.
Premis 2: 4xx
+ 2x + 10 ialah suatu persamaan kuadratik dalamx.
Conclusion: The value of x is 2.
Kesimpulan: Nilai x adalah 2.
[5 marks]
Answer:
8 Each of the following Venn diagrams shows sets A, B and C. On a separate diagram, shade the
region which represents
Setiap gambar rajah Venn berikut menunjukkan set-set A, B, dan C. Pada rajah yang berasingan,lorekkan
rantau yang mewakili
(a) A' ∪ B ' (b) A’ U B’ U C
(b) A ∩ B ∩ C'
[6 marks]
9 Given that the universal set
Diberi set semesta
ξ = {x : 25 ≤ x ≤ 45, x is an integer},
ξ = {x : 25 ≤ x ≤ 45, x ialah suatu integer},
set X = {x : x is a multiple of 6},
set X = {x : x ialah suatu nombor gandaan 6},

5. 5
set Y = {x : x is a factor of 100}, and
set Y = {x : x ialah suatu faktorbagi 100}, dan
set Z = {x : x is a number such that the sum of its digits is greater than 6}.
set Z = {x : x ialah suatu nombor di mana hasil tambah digit-digitnya adalah lebih besar daripada 6}.
(a) List the elements of
Senaraikan unsur-unsurbagi
(i) X,
(ii) Y,
(b) Find
Cari
(i) n(Y ∩ Z),
(ii) n[(X ∪ Z)'],
[6 marks]
Answer:
10 Given that the universal set ξ = X ∪ Y ∪ Z such that X = {g, h,j, q,t, v, x,y}, Y = {b, d,e, g, h, q,
r, s, x} and Z = {i, k, l, q, y}.
Diberi set semesta ξ = X ∪ Y ∪ Z di mana X = {g, h, j, q, t, v, x, y}, Y = {b, d, e, g, h, q, r, s, x}, dan Z = {i,
k, l, q, y}.
(a) List the elements of set Y ∩ Z.
Senaraikan unsur-unsurbagi set Y ∩ Z.
(b) Find
Cari
(i) n(X ∪ Y ∪ Z),
(ii) n(Z').
[6 marks]
Answer:
11 (a) Complete the following statement using the quantifier "all" or "some" to make it a true
statement.
Lengkapkan pernyataan berikut dengan menggunakan pengkuantiti "semua" atau "sebilangan"
untuk membentuk suatu pernyataan benar.
__________ quadratic equations have
negative roots.
__________ persamaan kuadratik
mempunyai punca yang negatif.
(b) Write down Premise 2 to complete the following argument:

6. 6
Tulis Premis 2 untuk melengkapkan hujah berikut:
Premise 1: If Y is divisible by 8, then Y is divisible by 4.
Premis 1: Jika Y boleh dibahagi dengan 8, maka Y boleh dibahagi dengan 4.
Premise 2:
Premis 2:
Conclusion: 79 is not divisible by 8.
Kesimpulan: 79 tidak boleh dibahagi dengan 8.
(c) Make a general conclusion by induction for the sequence of numbers 7, 14, 27, ... which
follows the following pattern.
Buat satu kesimpulan umum secara aruhan bagi urutan nombor 7, 14, 27, ... yang mengikuti pola
berikut.
7 = 3(2)1
+ 1
14 = 3(2)2
+ 2
27 = 3(2)3
+ 3
... = ..........
(d) Write down two implications based on the following statement:
Tulis dua implikasi berdasarkan pernyataan berikut:
n
2
>
n
9
if and only if n > 0.
n
2
>
n
9
jika dan hanya jika n > 0.
[7 marks]
Answer:

7. 7
12 (a) Combine the following statements to form a true statement.
Gabungkan pernyataan-pernyataan berikut untuk membentuk suatu pernyataan benar.
Statement 1:
Pernyataan 1:
1
10
>
1
5
Statement 2:
Pernyataan 2:
5−2
=
1
25
(b) Write a conclusion based on the following premises.
Tulis satu kesimpulan berdasarkan premis-premis berikut.
Premise 1: If a right prism has a cross-sectionalarea of 70 cm2
and a height of 15 cm, then
the volume of the prism is 1 050 cm3
.
Premis 1: Jika sebuah prisma tegak mempunyai luas keratan rentas 70 cm2 dan ketinggian 15 cm,
maka isipadu prisma itu adalah 1 050 cm3.
Premise 2: The volume of a right prism is not 1 050 cm3
.
Premis 2: Isipadu sebuah prisma tegak bukan 1050 cm3.
Conclusion:
Kesimpulan:
(c) Make a conclusion by induction for the number sequence 4, 7, 12, 19, ...,according to the pattern
below.
Bina satu kesimpulan secara aruhan bagi jujukan nombor 4, 7, 12, 19, ..., mengikut pola berikut.
4 = 12
+ 3
7 = 22
+ 3
12 = 32
+ 3
19 = 42
+ 3
... = ..........
[6 marks]
Answer:
13
Solve the quadratic equation
2(x2
+ 4)
5
= 2x.
Selesaikan persamaan kuadratik
2(x2 + 4)
5
= 2x.
[4 marks]
Answer:

8. 8
14 Diagram 3 shows two straight lines XY and YZ drawn on Cartesian plane.
Rajah 3 menunjukkan dua garislurus XY dan YZ yang dilukis pada satah cartesan.
Diagram 3
Given that YZ = 8XO. Find
Diberi YZ = 8XO. Cari
(a) the value of q,
nilai q,
(b) the gradient of the straight line XY.
kecerunan garis lurus XY.
[5 marks]
Answer:
15 Diagram 4 shows two straight lines PQ and QR drawn on Cartesian plane.
Rajah 4 menunjukkan dua garislurus PQ dan QR yang dilukis pada satah cartesan.
Diagram 4

9. 9
Given that the length of OR is 3 units. Find
Diberi panjang OR ialah 3 unit. Cari
(a) the x-intercept of the straight line PQ,
pintasan-x untuk garislurusPQ,
(b) the gradient of the straight line QR.
kecerunan garislurusQR.
[4 marks]
Answer:
16 Diagram 5 shows a isosceles triangle ABC and a straight line AD.
Rajah 5 menunjukkan segi tiga sama kaki ABC dan garis lurus AD.
Diagram 5
Given that the x-intercept and the gradient of the straight line AD are 4 and −
5
4
. Find
Diberi pintasan-x dan kecerunan garislurus AD ialah 4 dan −
5
4
. Cari
(a) the value of p,
nilai p,
(b) the y-intercept of the straight line AD.
pintasan-y bagi garislurus AD.
[4 marks]
Answer:

10. 10
17 Diagram 6 shows a cylindrical solid. A hemisphere shown by the shaded region, is removed from
the solid.
Rajah 6 menunjukkan sebuah pepejal berbentuk silinder.Kawasan berlorek yang berbentuk hemisfera telah
dikeluarkan dari pepejal itu.
Diagram 6
Given that the diameter of the hemisphere is 4 cm, calculate the volume, in cm3
, of the remaining
solid. (Use π =
22
7
)
Diberi diameter hemisfera itu ialah 4 cm, Hitung isi padu pepejal yang tinggal,dalam cm3
.
(Guna π =
22
7
)
[4 marks]
Answer:
18 Diagram 7 shows a composite solid comprises of a cylinder and a right cone.
Rajah 7 menunjukkan sebuah pepejal gubahan yang terdiri daripada sebuah silinder dan sebuah kon tegak.

11. 11
Diagram 7
The height of the cylinder is 14 cm while the height of the cone is 7 cm. Find the volume of the solid.
(Use π =
22
7
)
Tinggi silinderitu ialah 14 cm manakala tinggi kon itu ialah 7 cm. Cari isi padu bagi pepejal itu.
(Guna π =
22
7
)
[4 marks]
Answer:
19. Table 1 shows the values of two variables, x and y, of a fuction.
Rajah 1 menunjukkan nilai-nilai dua pemboleh ubah x dan y bagi suatu fungsi.
x -6 -4 -2 0 2 4 6
y 7 32 47 52 47 32 7
Table 1
(a) By using scales of 2 cm to 2 units on the x-axis and 2cm to 10 units on the y-axis, label both axes.
Dengan menggunakan skala 2 cm kepada 2 unit pada paksi-x dan 2 cm kepada 10 unit pada paksi-y,labelkan
kedua-dua paksi.
(b) Based on the table, plot the points on a graph paper.
Berdasarkan jadual itu,plotkan titik-titik itu pada kertas graf.
(c) Draw the graph of the function.
Lukiskan graffungsi itu.
[5 marks]
Answer:
20 Table 2 shows the values of two variables, x and y, of a fuction.
Rajah 2 menunjukkan nilai-nilai dua pemboleh ubah x dan y bagi suatu fungsi.
x -3 -2 -1 0 1 2 3
y 75 -15 -35 -15 15 25 -15
Table 2

12. 12
(a) By using scales of 2 cm to 1 unit on the x-axis and 2cm to 10 units on the y-axis, label both axes.
Dengan menggunakan skala 2 cm kepada 1 unit pada paksi-x dan 2 cm kepada 10 unit pada paksi-y,labelkan
kedua-dua paksi.
(b) Based on the table, plot the points on a graph paper.
Berdasarkan jadual itu,plotkan titik-titik itu pada kertas graf.
(c) Draw the graph of the function.
Lukiskan graffungsi itu.
[5 marks]
Answer:
END OF THE QUESTIONS

13. 13
SMK SULTAN ABDUL SAMAD, PETALING JAYA
SKEMA PEMARKAHAN MATEMATIK TINGKATAN 4
PEPERIKSAAN PERTENGAHAN TAHUN 2012
1 s  t = 6
s = 6 + t -------------- (1)
s + t = 4 ------------- (2)
1(6 + t) + t = 4.........................(1)
6 + t + t = 4
2t = 2
t = 1..........................(1)
s = 6 + (1).................(1)
s = 5..........................(1)
∴ s = 5, t = 1
2 4(x2
+ 3)  16x = 0
4x2
 16x + 12 = 0...........................(1)
4(x2
 4x + 3) = 0
4(x  3)(x  1) = 0..........................(1)
(x – 3)(x – 1) = 0
x = 3 or x = 1..............................(2)
3
2t =
4t2
+ 2
3
6t = 4t2
+ 2
4t2
 6t + 2 = 0
2t2
 3t + 1 = 0.........................(1)
(t  1)(2t  1) = 0.....................(1)
(t  1) = 0 or (2t  1) = 0
t = 1 or t =
1
2
.............................(2)
4 3x  2y  12 = 0 ------------ (1)
7x + 6y + 4 = 0 ------------ (2)
(1) × 3, 9x  6y  36 = 0
9x  6y = 36 ---- (3) @ (1)
(2) × 1, 7x + 6y + 4 = 0
7x + 6y = 4 ------------- (4)
(3) + (4)
9x + 7x = 36 + (4).............................(1)
16x = 32
x = 2......................................(1)
3(2)  2y  12 = 0...............(1)
2y = 6  12
2y = 6
y = 3.......................(1)
∴ x = 2, y = 3
5 (a) Length of arc FG
=
45°
360°
× 2 ×
22
7
× 14
= 11 cm
Length of arc HI (1)
=
45°
360°
× 2 ×
22
7
× 28
= 22 cm
Perimeter
= 11 + 22 + 14 × 4..................(1)
= 89 cm .......................(1)
(b) Area of sector OFG
=
45°
360°
×
22
7
× 142
= 77 cm2
Area of sector OHI @ (1)
=
45°
360°
×
22
7
× 282 @
= 308 cm2
Area of sector OGJ
=
45°
360°
×
22
7
× 142
= 77 cm2
Area of the shaded region
= 77 + 308 – 77..................(1)
= 308 cm2................................(1)
6 (a) Length of arc AB
=
45°
360°
× 2 ×
22
7
× 14
= 11 cm
Length of arc CDE @ (1)
=
135°
360°
× 2 ×
22
7
× 28
= 66 cm
Perimeter
= 11 + 66 + 14 + 28.....................(1)
= 119 cm .....................(1)
(b) Area of sector AOB
=
45°
360°
×
22
7
× 142
= 77 cm2
Area of sector OCDE @
=
135°
360°
×
22
7
× 282
(1)
= 924 cm2 @
Area of semicircle OFE
=
1
2
×
22
7
× 142

14. 14
= 308 cm2
Area of the shaded region
= 77 + 924 – 308....................(1)
= 693 cm2................................(1)
7 (a) Some right prisms have cross-sections
in the form of trapezium................(1)
(b)
The area of triangle STU is
1
2
× 45 × 84
that is 1 890 cm2
.......................(2)
(c) Premise 1:
If 4xx
+ 2x + 10 is a quadratic equation
in x, then the value of x is 2...............(2)
8 (a)
(2)
(2)
(c)
(2)
9 ξ = {25, 26, 27, 28, 29, 30, 31, 32, 33, 34,
35, 36, 37, 38, 39, 40, 41, 42, 43, 44, 45}
X = {30, 36, 42}
Y = {25}
Z = {25, 26, 27, 28, 29, 34, 35, 36, 37, 38,
39, 43, 44, 45}
(a) (i) X = {30, 36, 42}.......................(1)
(ii) Y = {25}........................(1)
(b) (i) Y ∩ Z = {25}...............(1)
n(Y ∩ Z) = 1 .................(1)
(ii) X ∪ Z = {25, 26, 27, 28, 29, 30,
34, 35, 36, 37, 38, 39, 42, 43, 44,
45}
(X ∪ Z)' = {31, 32, 33, 40,
41}.........................(1)
n[(X ∪ Z)'] = 5..............(1)
10 (a) Y ∩ Z = {q} .........................(1)
(b) (i) X ∪ Y ∪ Z = {b,d, e, g,h, i, j,k,l,
q, r, s, t, v, x, y}.......................(1)
n(X ∪ Y ∪ Z) = 16 ...................(1)
(ii Z' = {b,d, e, g, h, j, r, s, t, v, x}(1)
n(Z') = 11 ..........................(1)
11 (a) Some quadratic equations have
negative roots.. ......................(1)
(b) Premise 2:
79 is not divisible by 4.. ...................(2)
(c) 3(2)n
+ n ........................(2)
(d) Implication 1:
If
n
2
>
n
9
, then n > 0.......................(1)
Implication 2:
If n > 0, then
n
2
>
n
9
......................(1)
12 (a) 1
10
>
1
5
or 5−2
=
1
25
.........................(2)
(b) Conclusion:
The right prism does not have a cross-
sectional area of 70 cm2
and a height of
15 cm.............................(2)
(c) All the numbers of 4, 7, 12, 19, ... can
be written in the form n2
+ 3, n = 1, 2,
3, 4, ... ..........................(2)
13 2(x2
+ 4)
5
= 2x
2(x2
+ 4) = 10x
2x2
+ 8 = 10x
2x2
 10x + 8 = 0
x2
 5x + 4 = 0.............................(1)
(x  4)(x  1) = 0.........................(1)
(x  4) = 0 or (x  1) = 0
x = 4 or x = 1.................................(2)
14 (a) YZ = 8 × 7................................(1)
= 56..........................(1)
∴q = 56
(b) Gradient of XY
= −
(−7)
(−9)
................(2)
= −
7
9
.......................(1)
15 (a) x-intercept of PQ
= -4 ..............(1)
(b) Gradient of QR
=
−3 − (−8)
0 − (−4)
...(1)

15. 15
=
5
4
...........(1)
=
5
4
.............(1)
16 (a) Length of AC
= 4 – 1..............(1)
= 3
AC = CB
∴ p = −3 ..........(1)
(b)
−
intercept-y
intercept-x
= −
5
4
..............(1)
intercept-y = −(−
5
4
×
4)
= 5...(1)
17 Volume of cylinder
= 924 cm3........................(1)
Volume of hemisphere
= 16
16
21
cm3......................(1)
Volume of remaining solid
= 924 − 16
16
21
......................(1)
= 907
5
21
cm3........................(1)
18. Volume
(1) (1)
=
22
7
× 132 × 14 +
1
3
×
22
7
× 62 × 7
=
22
7
× 169 × 14 +
1
3
×
22
7
× 36 × 7
= 7 436 + 264........................(1)
= 7 700 cm3...........................(1)
19 .
Skala .............................(2)
Plot ..............................(2)
Sambung titik...................(2)
20. Skala .............................(2)
Plot ..............................(2)
Sambung titik...................(2)

16. 16
SULIT
NAMA :
TINGKATAN :
PEPERIKSAAN AKHIR TAHUN 2012 1449/2
TINGKATAN 4
MATHEMATICS
Kertas 2
Mei
2
1
2
jam Dua jam tiga puluh minit
JANGAN BUKA KERTAS SOALAN INI SEHINGGA DIBERITAHU
1. Kertas soalan ini mengandungi hanya SATU
bahagian: Bahagian A
2. Jawab semua soalan.
3. Tulis jawapan pada ruang yang disediakan
dan tunjukkan kerja mengira anda untuk
membantu mendapatkan markah.
4. Satu senarai formula disediakan.
5. Anda dibenarkan menggunakan kalkulator
sainstifik
Kertas soalan ini mengandungi 11 halaman bercetak
Untuk Kegunaan Pemeriksa
Kod Pemeriksa :
Bahagian Soalan Markah
Penuh
Markah
Diperolehi
A
1 4
2 4
3 4
4 5
5 6
6 6
7 5
8 6
9 6
10 6
11 7
12 6
13 4
14 5
15 4
16 4
17 4
18 4
19 5
20 5
Jumlah 100
SMK SULTAN ABDUL SAMAD
PETALING JAYA
Disemak Oleh:
..........................................
(Cik Rafeidah Bt Yaacob
Guru Matematik Ting. 5
Disediakan oleh:
.....................................
(Pn Nor Mala Bt Mahadi)
Ketua Panitia Matematik
Disahkan Oleh:
.....................................
(Pn. Naik Soo Fong)
GKMP Sains Dan Math

17. 17