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Class Index Number
Candidate Name
ANDERSON SECONDARY SCHOOL
2010 Preliminary Examination Secondary Four Express / Five
Normal Academic
ADDITIONAL MATHEMATICS Paper 1 4038/01
2 September 2010 2 hours Candidates answer on writing papers.
Additional materials: Writing paper (10 sheets)
READ THESE INSTRUCTIONS FIRST Write your name, class and
register number on all the work you hand in. Write in dark blue or
black pen. You may use a soft pencil for any diagrams or graphs. Do
not use staples, paper clips, highlighters, glue or correction
fluid. Answer all the questions. If working is needed for any
question it must be shown with the answer. Omission of essential
working will result in loss of marks. Calculators should be used
where appropriate. If the degree of accuracy is not specified in
the question, and if the answer is not exact, give the answer to
three significant figures. Give answers in degrees to one decimal
place. For , use either your calculator value or 3.142, unless the
question requires the answer in terms of . At the end of the
examination, fasten all your work securely together. Hand in the
question paper and your answer scripts separately. The number of
marks is given in brackets [ ] at the end of each question or part
question. The total number of marks for this paper is 80.
This document consists of 4 printed pages. ANDSS 4E5N Prelim
2010 Add Math (4038/01) [Turn over
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Mathematical Formulae
1. ALGEBRA Quadratic Equation
For the equation , 02 =++ cbxax
aacbbx
242 =
Binomial expansion
nrrnnnnn bbarn
ban
ban
aba ++
++
+
+=+ ......
21)( 221 ,
where n is a positive integer and !
)1(...)1()!(!
!r
rnnnrnr
nrn +==
2. TRIGONOMETRY
Identities 1cossin 22 =+ AA
AA 22 tan1sec +=
AAcosec 22 cot1+=
BABABA sincoscossin)sin( =
BABABA sinsincoscos)cos( m=
BABABA
tantan1tantan)tan( m
=
AAA cossin22sin =
AAAAA 2222 sin211cos2sincos2cos ===
AAA 2tan1
tan22tan =
)(cos)(sin2sinsin 2121 BABABA +=+
)(sin)(cos2sinsin 2121 BABABA +=
)(cos)(cos2coscos 2121 BABABA +=+
)(sin)(sin2coscos 2121 BABABA += Formulae for ABC
Cc
Bb
Aa
sinsinsin==
Abccba cos2222 +=
Cab sin21=
2 ANDSS 4E5N Prelim 2010 Add Math (4038/01) [Turn over
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1. (a) Given that A = 3 41 2
and B =
7 100 3
,
(i) If A2 B = kC , where k and all the elements of C are
integers, find the greatest value of k and the matrix C. [2]
(ii) Write down the inverse matrix of A. [1] (b) If a pair of
simultaneous equations is represented by a matrix equation
2 34 h
xy
=
1k
,
state the value of h and of k such that the equations have
infinite number of solutions. [2]
2. (a) Find the range of values of k for which the expression kx
2 + 2kx + 3k 4x 2
is never positive for all real values of x. [3]
(b) The line is a tangent to the curve y = mx +1 y = x + 1x
.
Show that the value of m = 34
. [3]
3. It is given that sin = 25
and is obtuse. Find the exact value of (a) tan A , given that
tan(A + ) = 4 . [2] (b) tan B , given that 3cos(B ) sin(B + ) = 0
[3]
4. Solve the equation 22x +2 2x+2 = 9(2x 1) 1. [6] 5. A curve
has the equation y = 1+ 4 x 3x 2 + x 3.
(a) Express dydx
in the form a(x + b)2 + c where a, b and c are constants. [2]
(b) Explain why the curve is an increasing function for all real
values of x. [1] (c) With the values of a, b and c obtained, sketch
the graph of dy
dx= a(x + b)2 + c ,
labelling its turning point and intercepts. [3]
6. (a) Find the term independent of x in the expansion of x 2
2x
9
. [4]
(b) Find the coefficient of x 9 in the expansion of x 2 2x
9
(4x 9 + 3) . [3] 7. If 4 x 2 +11x 3 is a factor of )314 , find
the remaining factor. ()74(2 + xxx
Find the roots of the equation . 0)314()74(2 =+ xxxHence, solve
the equation e2x (4ex + 7) =14ex 3. [7]
3 ANDSS 4E5N Prelim 2010 Add Math (4038/01) [Turn over
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8. The length of each side of a regular hexagon is x cm. Find
the area of the hexagon, A, in terms of x. If x is increasing at
the rate of 0.4 cm/s, find the rate of change of A when x = 5.
[6]
9. (a) Solve the equation 2x 1 3 = 2x . [3]
(b) On the same graph, sketch the graphs 12 = xy and 32 += xy
for 1 x 3, labelling the vertex and all intercepts clearly. [3]
(c) Hence solve the inequality 2x 1 2x 3. [2] 10. Solve the
following equations, giving all angles between 0 and 360.
(a) 1)50 [3] 2sin(2 =x(b) 5 [4] tan5sec3 2 = xx
11. A circle C passes through points P(0, 2), Q(7, 3) and R(8,
4) where PQRS is a
square. Find (a) the centre and the radius of the circle C, [3]
(b) the equation the circle that is the reflection of the circle C
in the line y = x. [3]
12. The figure shows a trapezium ABCD in which the coordinates
of A, C and D are
(0, 4), (5, 3) and (6, 5) respectively. AD is parallel to BC and
is perpendicular to AB. (a) Show that the coordinates of B are (3,
6). [4]
(b) The point E lies on the line AD such that 32=
ABDofAreaABEofArea .
Find the coordinates of E. [2] (c) The point F with coordinates
(1, 12) lies on the line CB produced.
Show that AFBE is a parallelogram. [2] (d) Find the ratio of
area of AFBE : area of EBD. [2] y
B
A (0, 4)
C (5, 3)
x 0
D (6, 5)
4 ANDSS 4E5N Prelim 2010 Add Math (4038/01) [End of paper
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2010 Preliminary ExaminationSecondary Four Express / Five Normal
Academic
READ THESE INSTRUCTIONS FIRST