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2008 SPM TRIAL EXAMINATION Marking Scheme
3472/2 Additional Mathematics Paper 2 [Lihat sebelah SULIT
2
Question Solution and marking scheme Sub-mark
Full Mark
1.
3
2yx
or
2 3y x
223 3 10
2 2y y y y
or 22 2 3 2 3 10x x x x
2 2 29 6 6 2 4 40 0y y y y y or
2 2 22 3 4 12 9 10 0x x x x x y = 3.215 , − 3.215 or x = 3.107 , − 0.107 x = 3.107 / 3.108 , − 0.107 / − 0.108 or y = 3.214 / 3.215 , − 3.214 / − 3.215 Answer must correct to 3 decimal places.
5
P1 Make x or y as the subject
Eliminate x or y
Solve quadratic equation
23 31 0y
2 313
y
or 23 9 1 0x x
or using formula
or completing the
square
N1
N1
K1
K1
2008 SPM TRIAL EXAMINATION Marking Scheme
3472/2 Additional Mathematics Paper 2 [Lihat sebelah SULIT
3
Question Solution and marking scheme Sub-mark
Full Mark
2(a)
(b)
16 ,8 ,4 ,......
16a 12
r
7
7
116 12
112
S
= 3314
or 31.75 64 ,16 , 4 ,......
64a 14
r
64
114
S
= 1853
or 85.33
3 3
6
3(a)
2( )f x x px q
= 2 2
2
2 2p px px q
= 2 2
2 4p px q
32p
p = -6
36 54
q q = 4
N1
K1
Use rraS
nn
1)1(
N1
K1
K1
N1
Use 1
aSr
use x² + bx = ( x + 2b )² – 2
2 )( b
or
use axis of symmetry 32ba
P1
P1
N1
2008 SPM TRIAL EXAMINATION Marking Scheme
3472/2 Additional Mathematics Paper 2 [Lihat sebelah SULIT
4
Question Solution and marking scheme Sub-mark
Full Mark
Alternative solution
22 3 5x px q x
= 2 6 9 5x x = 2 6 4x x
6p q = 4
3
3(b) 2 6 4 31 0x x
2 6 27 0x x
( 9)( 3) 0x x
3 9x
2
5
4(a)
tan x + cos1 sin
xx
= sincos
xx
+ cos1 sin
xx
= 2sin (1 sin ) cos
cos (1 sin )x x x
x x
= 2 2sin sin cos
cos (1 sin )x x x
x x
= sin 1cos (1 sin )
xx x
= 1cos x
= sec x
3
K1
N1
Use ( ) 31 0f x and factorization
K1
K1
N1
Use sintancos
xxx
Use identity 2 2sin cos 1x x
Comparing coefficient of x or constant term
N1
K1
N1
2008 SPM TRIAL EXAMINATION Marking Scheme
3472/2 Additional Mathematics Paper 2 [Lihat sebelah SULIT
5
Question Solution and marking scheme Sub-mark
Full Mark
4(b)(i) Negative sine shape correct. Amplitude = 3 [ Maximum = 3 and Minimum = − 3 ] Two full cycle in 0 x 2
3
4(b)(ii) 53sin 2 2xx
or 5 2xy
Draw the straight line 5 2xy
Number of solutions is 3 .
3
9
K1
N1
N1
P1
P1
P1
y
3
–3
2
2
3 2 x
5 2xy
O
3sin 2y x
2008 SPM TRIAL EXAMINATION Marking Scheme
3472/2 Additional Mathematics Paper 2 [Lihat sebelah SULIT
6
Question Solution and marking scheme Sub-mark
Full Mark
5 (a)
(b)
1220
x 240x
The mean
240 5 + 8 + 10 + 11 + 14 28825 25
X
= 11.52
2212 3
20x
2 3060x
The standard deviation
2 2 2 2 2
23060 5 8 10 11 14 11.5225
= 23566 11.5225
= 9.9296 = 3.151
7
7
K1
N1
Use formula 2
2xx
N
For the new 2x and X
K1
K1
N1
N1
Use x
xN
N1
2008 SPM TRIAL EXAMINATION Marking Scheme
3472/2 Additional Mathematics Paper 2 [Lihat sebelah SULIT
7
Question Solution and marking scheme Sub-mark
Full Mark
6(a)
(b)
(i) PR PO OR
uuur uuur uuur
= 6 15a b
% %
(ii) OQ OP PQ
uuur uuur uuur
= 365
a ORuuur
%
= 6 9a b
% %
(i) OS hOQ
uuur uuur
= (6 9 )h a b
% %
(ii) OS OP PS
uuur uuur uuur
= 6a kPR
uuur
%
= 6 6 15a k a b
% % %
(6 9 )h a b% %
= 6 6 15a k a b % % %
6 6 6h k 9 15h k
1h k 53
h k
5 13
k k
38
k
5 33 8
h
= 58
3
5
8
N1
N1
K1
Use PR PO OR uuur uuur uuur
or OQ OP PQ uuur uuur uuur
N1
N1
Equate coefficient of a
% or b
%
and Eliminate h or k
K1
N1
N1
2008 SPM TRIAL EXAMINATION Marking Scheme
3472/2 Additional Mathematics Paper 2 [Lihat sebelah SULIT
8
Qn. Solution and Marking Scheme Sub- mark
Full Mark
7(a)
(b)(i)
(ii)
kn
xn
y 4log1log1log
log x 0.18 0.30 0.40 0.60 0.74 log y 0.48 0.54 0.59 0.69 0.76
6
4
10
N1 N1
P1
Correct axes and scale
All points plotted correctly
Line of best-fit
N1
K1 intercept
= kn
4log1
n = 2 k = 1.51
K1
N1
N1
K1
N1
gradient
= n1
N1 N1
2008 SPM TRIAL EXAMINATION Marking Scheme
3472/2 Additional Mathematics Paper 2 [Lihat sebelah SULIT
9
0.6
0.7
Graph of log10 y against log10 x
0.8
0.5
0.4
0.1
0.2
0.3
log 10 x
log 10 y
0.9
0 0.1 0.2 0.3 0.4 0.5 0.6 0.7 0.8 0.9
0.39
2008 SPM TRIAL EXAMINATION Marking Scheme
3472/2 Additional Mathematics Paper 2 [Lihat sebelah SULIT
10
Qn. Solution and Marking Scheme Sub- mark
Full Mark
8. (a)
(b)
(c)
Solving simultaneous equation P(– 2, 2) Q(4, 8)
Use dxyy )( 12
dxxx )2
4(2
Integrate dxyy )( 12
64
2
32 xxx
18
Note : If use area of trapezium and ydx , give the marks
accordingly.
Integrate dxx 2
2)
2(
=
20
5x
58
3
4
3
10
K1
N1 N1
N1
K1
K1
K1
Use correct
limit
4
2into
64
2
32 xxx
N1
K1
K1
Use correct
limit 4
0
into
20
5x
2008 SPM TRIAL EXAMINATION Marking Scheme
3472/2 Additional Mathematics Paper 2 [Lihat sebelah SULIT
11
Qn. Solution and Marking Scheme Sub- mark
Full Mark
9(a)
(b)
(c)
(d)
Equation of AD : y – 6 = –2 ( x – 2 ) y = –2x + 10 or equivalent
y = –2x + 10 and
x – 2y = 0 D(4, 2)
p = 3 or C(8, 4)
Substitute (8, 4) into y = 3x + q
q = – 20
OADOABCArea 4 Using formula
00
62
24
00
21OAD
40 Alternative solution : B(10, 10) Using formula
00
62
1010
48
00
21OABCArea
2
2
3
3
10
K1
N1
Use m = – 2 and find equation of straight line
Solving simultaneous equations
N1
K1
K1
P1
N1
N1
Find area of triangle
K1
K1
N1
Find area of parallelogram
K1
P1
2008 SPM TRIAL EXAMINATION Marking Scheme
3472/2 Additional Mathematics Paper 2 [Lihat sebelah SULIT
12
40
Qn. Solution and Marking Scheme Sub- mark
Full Mark
10(a)
(b)
(c )
106sin 1 or equivalent
2POQ
radPOQ 287.1 Alternative solution : 122 = 102 + 102 – 2(10)(10) cos POQ
)10)(10(2121010cos
2221POQ
radPOQ 287.1
Using (2π – 1.287) Major arc PQ = 10 ( 2π – 1.287 ) = 49.96 cm
Lsector = 287.1)10(21 2
Ltriangle = 287.1sin)10(
21 2
= 16.35 cm2
3
3
4
10
Using formula Lsector = 2
1 r2 K1
K1
K1 Lsector - LΔ
N1
Using formula LΔ = 2
1 absin C
Use formula s = r
K1
N1
K1
N1
K1 Use cosine rule
N1
N1
K1
K1
2008 SPM TRIAL EXAMINATION Marking Scheme
3472/2 Additional Mathematics Paper 2 [Lihat sebelah SULIT
13
= 3.9149 cm
Qn. Solution and Marking Scheme Sub- mark
Full Mark
11 (a)(i)
(ii) b)(i) (ii)
p = 53 , p + q = 1
P( X = 0 )
= 5C0(53 )0(
52 )5
= 0.01024 Using P( X ≥ 4 ) = P( X = 4 ) + P( X = 5 )
= 5C4(53 )4(
52 )1 + (
53 )5
= 0.337 P ( 30 ≤ X ≤ 60 )
= P ( 10
3530 ≤ Z ≤ 60 3510 )
Use P( – 0.5 ≤ Z ≤ 2.5 ) = 1 – P( Z 0.5 ) – P( Z 2.5 ) = 1- 0.30854 – 0.00621 = 0.68525 Number of pupils = P( X 60 ) × 483
3
2
3
K1
N1
K1
N1
Use P(X = r) = n Cr prqn–r , p + q = 1
K1
N1
K1 use
Z =
X
K1
N1
P1
2008 SPM TRIAL EXAMINATION Marking Scheme
3472/2 Additional Mathematics Paper 2 [Lihat sebelah SULIT
14
3
2
10
Qn. Solution and Marking Scheme Sub- mark
Full mark
12. (a) (b) (c) (d)
Subst. t = 0 into dvdt
a= 15 – 6t 15 ms-2
1 175 3/184 4
ms ms
Integrate
Use s = 0
152
/ 17 / 7.52
S4 – S3
2 2 3
K1
N1
K1
N1
K1
Use 0dvdt
and subst. t in v = 15t – 3t2
[t = 52
]
K1
K1
N1
2 3152
s v dt t t
Subst. t = 3 or t = 4 in 2 315
2s t t
K1
N1
2008 SPM TRIAL EXAMINATION Marking Scheme
3472/2 Additional Mathematics Paper 2 [Lihat sebelah SULIT
15
1152
Note : If use 4
3vdt , give the marks accordingly.
3
10
Qn. Solution and Marking Scheme Sub- mark
Full mark
13. (a)
(b) (i)
(ii)
(iii)
Use I = 2007
2005100
PP
Value of m : 25, m, 80, 30 or equivalent 120 25+130m+135 80+139 30
Use i i
i
I WI
W
132.1 = 120×25+130m+135×80+139 30135+m
m =65
100150.00 x132.1
RM 113.55 /I . ( . x . )08 05 132 1 132 1 0 3
3 3 2
N2, 1, 0
K1
x = 48.6 y = 135 z = 80
K1
K1
N1
K1
N1
P1
N1
2008 SPM TRIAL EXAMINATION Marking Scheme
3472/2 Additional Mathematics Paper 2 [Lihat sebelah SULIT
16
171.73
2
10
Qn. Solution and Marking Scheme Sub- mark
Full mark
14. (a) (b) (c)
x + y ≤ 80 or equivalent y ≤ 4x or equivalent
x + 4y ≥ 120 or equivalent
x=30
(16,64)
x + 4y = 120
x + y = 80
y = 4x100
90
80
70
60
50
40
30
20
10
10080604020 9070503010x
y
At least one straight line is drawn correctly from inequalities involving x and y
All the three straight lines are drawn correctly
Region is correctly shaded
(i) minimum = 23
3 3
N1P1 N1
N1
K1
N1
N1
N1
N1
2008 SPM TRIAL EXAMINATION Marking Scheme
3472/2 Additional Mathematics Paper 2 [Lihat sebelah SULIT
17
(ii) (16,64) Subst. point in the range
in 20x + 40y
RM2880
4
10
Qn. Solution and Marking Scheme Sub- mark
Full mark
15. (a) (b) (c)
(d)
120 9.3 6 sin2
BCD
45o48’ / 45.8o
0.74545 4555 Use cosine rule in ΔBCD BD2 = 9.32 + 62 − 2×9.3×6 cos 45°48’ 6.685 Use sine rule in ΔBCD
osin CBD sin '
. .
45 48
9 3 6 685
94o 10’ 4444 qqq11111aaaaaaaaaaaaaaaaaa 14s4 5.555555 5555 z5555555555555555 Sum of area:
4 2
K1
N1
Use area △= ½ ab sin c in △BCD K1
N1
K1
N1
K1
N1
K1
K1
N1
K1
Use area ADB = ½ 6.685 13 sin ADB
Obtain ADB by using 180o – 85o50’ – BAD or equivalent
2008 SPM TRIAL EXAMINATION Marking Scheme
3472/2 Additional Mathematics Paper 2 [Lihat sebelah SULIT
18
20 cm2 + ΔABD 555 102 58.82 cm2
4
10
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