DSE Maths Core · Past Paper Questions

2013 · Paper 1 Q1 Laws of integral indices

Simplify $\frac{x^{20}y^{13}}{(x^{5}y)^{6}}$ and express your answer with positive indices. (3 marks)

2013 · Paper 1 Q2 Formulae

Make $k$ the subject of the formula $\frac{3}{h}-\frac{1}{k}=2$ . (3 marks)

2013 · Paper 1 Q3 Identities

(a)

Factorize $4m^{2}-25n^{2}$

(b)

$4m^{2}-25n^{2}+6m-15n$ (3 marks)

2013 · Paper 1 Q4 Linear equations in two unknowns

The price of 7 pears and 3 oranges is $47 while the price of 5 pears and 6 oranges is $49. Find the price of a pear. (4 marks)

2013 · Paper 1 Q5 Inequalities and linear programming

(a)

Solve the inequality $\frac{19-7x}{3}>23-5x$

(b)

Find all integers satisfying both the inequalities $\frac{19-7x}{3}>23-5x$ and $18-2x\geq 0$ .

2013 · Paper 1 Q6 Trigonometry

In a polar coordinate system, $O$ is the pole. The polar coordinates of the points $A$ and $B$ are $(26,10^{\circ})$ and $(26,130^{\circ})$ respectively. Let $L$ be the axis of reflectional symmetry of $\Delta OAB$ .

(a)

Describe the geometric relationship between $L$ and $\angle AOB$ .

(b)

Find the polar coordinates of the point of intersection of $L$ and $AB$ . (4 marks)

2013 · Paper 1 Q7 Congruent triangles

In Figure 1, $ABCD$ is a quadrilateral. The diagonals $AC$ and $BD$ intersect at $E$ . It is given that $BE = CE$ and $\angle BAC = \angle BDC$ .

(a)

Prove that $\Delta ABC \cong \Delta DCB$ .

(b)

Consider the triangles in Figure 1.

(i)

How many pairs of congruent triangles are there?

(ii)

How many pairs of similar triangles are there? (4 marks)

2013 · Paper 1 Q8 Errors in measurement

A pack of sea salt is termed regular if its weight is measured as $100\text{ g}$ correct to the nearest g.

(a)

Find the least possible weight of a regular pack of sea salt.

(b)

Is it possible that the total weight of $32$ regular packs of sea salt is measured as $3.1\text{ kg}$ correct to the nearest $0.1\text{ kg}$ ? Explain your answer. (5 marks)

2013 · Paper 1 Q9 Measures of dispersion

The bar chart below shows the distribution of the numbers of family members of the employees of company $D$ .

(a)

Find the mean, the inter-quartile range and the standard deviation of the above distribution.

(b)

An employee leaves company $D$ . The number of family members of this employee is $7$ . Find the change in the standard deviation of the numbers of family members of the employees of company $D$ due to the leaving of this employee. (5 marks)

2013 · Paper 1 Q10 Measures of dispersion

The ages of the members of Committee A are shown as follows:

(a)

Write down the median and the mode of the ages of the members of Committee A. (2 marks)

(b)

The stem-and-leaf diagram below shows the distribution of the ages of the members of Committee B. It is given that the range of this distribution is $47$ .

(i)

Find $a$ and $b$ .

(ii)

From each committee, a member is randomly selected as the representative of that committee. The two representatives can join a competition when the difference of their ages exceeds $40$ . Find the probability that these two representatives can join the competition. (4 marks)

2013 · Paper 1 Q11 Variations

The weight of a tray of perimeter $\ell$ metres is $W$ grams. It is given that $W$ is the sum of two parts, one part varies directly as $\ell$ and the other part varies directly as $\ell^{2}$ . When $\ell=1$ , $W=181$ and when $\ell=2$ , $W=402$ .

(a)

Find the weight of a tray of perimeter 1.2 metres. (4 marks)

(b)

If the weight of a tray is 594 grams, find the perimeter of the tray. (2 marks)

2013 · Paper 1 Q12 More about polynomials

Let $f(x)=3x^{3}-7x^{2}+kx-8$ , where $k$ is a constant. It is given that $f(x)\equiv(x-2)(ax^{2}+bx+c)$ , where $a$ , $b$ and $c$ are constants.

(a)

Find $a$ , $b$ and $c$ .

(b)

Someone claims that all the roots of the equation $f(x)=0$ are real numbers. Do you agree? Explain your answer. (3 marks)

2013 · Paper 1 Q13 Mensuration

In a workshop, 2 identical solid metal right circular cylinders of base radius $R$ cm are melted and recast into 27 smaller identical solid right circular cylinders of base radius $r$ cm and height $10$ cm. It is given that the base area of a larger circular cylinder is 9 times that of a smaller one.

(a)

Find

(i)

$r:R$ ,

(ii)

the height of a larger circular cylinder.

(b)

A craftsman claims that a smaller circular cylinder and a larger circular cylinder are similar. Do you agree? Explain your answer. (2 marks)

2013 · Paper 1 Q14 Equations of circles

The equation of the circle $C$ is $x^{2}+y^{2}-12x-34y+225=0$ . Denote the centre of $C$ by $R$ .

(a)

Write down the coordinates of $R$ . (1 mark)

(b)

The equation of the straight line $L$ is $4x + 3y + 50 = 0$ . It is found that $C$ and $L$ do not intersect. Let $P$ be a point lying on $L$ such that $P$ is nearest to $R$ .

(i)

Find the distance between $P$ and $R$ .

(ii)

Let $Q$ be a moving point on $C$ . When $Q$ is nearest to $P$ ,

2013 · Paper 1 Q15 Measures of dispersion

The box-and-whisker diagram below shows the distribution of the scores (in marks) of the students of a class in a test. Susan gets the highest score while Tom gets $65$ marks in the test. The standard scores of Susan and Tom in the test are $3$ and $0.5$ respectively.

(a)

Find the mean of the distribution.

(b)

Susan claims that the standard scores of at least half of the students in the test are negative. Do you agree? Explain your answer. (2 marks)

2013 · Paper 1 Q16 Probability

A box contains 5 white cups and 11 blue cups. If 6 cups are randomly drawn from the box at the same time,

(a)

find the probability that at least $4$ white cups are drawn; (2 marks)

(b)

find the probability that at least $3$ blue cups are drawn. (2 marks)

2013 · Paper 1 Q17 Quadratic equations in one unknown

(a)

Let $f(x)=36x-x^{2}$ . Using the method of completing the square, find the coordinates of the vertex of the graph of $y=f(x)$ . (2 marks)

(b)

The length of a piece of string is $108\text{ m}$ . A guard cuts the string into two pieces. One piece is used to enclose a rectangular restricted zone of area $A\text{ m}^{2}$ . The other piece of length $x\text{ m}$ is used to divide this restricted zone into two rectangular regions as shown in Figure 2.

(i)

Express $A$ in terms of $x$ .

(ii)

The guard claims that the area of this restricted zone can be greater than $500\text{ m}^{2}$ . Do you agree? Explain your answer.

2013 · Paper 1 Q18 Trigonometry

(a)

Figure 3(a) shows a piece of triangular paper card $ABC$ with $AB=28\text{ cm}$ , $BC=21\text{ cm}$ and $AC=35\text{ cm}$ . Let $M$ be a point lying on $AC$ such that $\angle BMC=75^{\circ}$ .

Find

(i)

$\angle BCM$ .

(ii)

$CM$ .
(3 marks)

(b)

Peter folds the triangular paper card described in (a) along $BM$ such that $AB$ and $BC$ lie on the horizontal ground as shown in Figure 3(b). It is given that $\angle AMC = 107^{\circ}$ .

(i)

Find the distance between $A$ and $C$ on the horizontal ground.

(ii)

Let $N$ be a point lying on $BC$ such that $MN$ is perpendicular to $BC$ . Peter claims that the angle between the face $BCM$ and the horizontal ground is $\angle ANM$ . Do you agree? Explain your answer.

2013 · Paper 1 Q19 Arithmetic and geometric sequences and their summations

The development of public housing in a city is under study. It is given that the total floor area of all public housing flats at the end of the 1st year is $9 \times 10^6 \text{ m}^2$ and in subsequent years, the total floor area of public housing flats built each year is $r\%$ of the total floor area of all public housing flats at the end of the previous year, where $r$ is a constant, and the total floor area of public housing flats pulled down each year is $3 \times 10^5 \text{ m}^2$ . It is found that the total floor area of all public housing flats at the end of the 3rd year is $1.026 \times 10^7 \text{ m}^2$ .

(a)

(i)

Express, in terms of $r$ , the total floor area of all public housing flats at the end of the 2nd year.

(ii)

Find $r$ .

(b)

(i)

Express, in terms of $n$ , the total floor area of all public housing flats at the end of the $n^{th}$ year.

(ii)

At the end of which year will the total floor area of all public housing flats first exceed $4 \times 10^{7} \text{ m}^{2}$ ?

(5 marks)

(c)

It is assumed that the total floor area of public housing flats needed at the end of the $n$ th year is $(a(1.21)^n + b)\text{ m}^2$ , where $a$ and $b$ are constants. Some research results reveal the following information:

[Table]

A research assistant claims that based on the above assumption, the total floor area of all public housing flats will be greater than the total floor area of public housing flats needed at the end of a certain year. Is the claim correct? Explain your answer. (4 marks)

2013 · Paper 2 Q1 Laws of integral indices

$(27 \cdot 9^{n+1})^3 =$

A

$3^{6n+12}$

B

$3^{6n+15}$

C

$3^{9n+12}$

D

$3^{9n+18}$

2013 · Paper 2 Q2 Formulae

If $\frac{y-1}{c}=\frac{y+1}{d}$ , then y=

A

$\frac{c-d}{c+d}$

B

$\frac{d-c}{c+d}$

C

$\frac{c+d}{c-d}$

D

$\frac{c+d}{d-c}$

2013 · Paper 2 Q3 Polynomials

$h\ell - k\ell + hm - km - hn + kn =$

A

$(h+k)(\ell-m+n)$

B

$(h+k)(\ell+m-n)$

C

$(h-k)(\ell-m+n)$

D

$(h-k)(\ell+m-n)$

2013 · Paper 2 Q4 Approximate values and numerical estimation

$0.0504545 =$

A

$0.051$ (correct to 2 significant figures).

B

$0.0505$ (correct to 3 decimal places).

C

$0.05045$ (correct to 4 significant figures).

D

$0.05046$ (correct to 5 decimal places).

2013 · Paper 2 Q5 Inequalities and linear programming

The solution of $x - \frac{x-1}{2} > 5$ or $1 < x - 11$ is

A

$x > 9$ .

B

$x > 10$ .

C

$x > 11$ .

D

$x > 12$ .

2013 · Paper 2 Q6 Quadratic equations in one unknown

Let $k$ be a constant. Solve the equation $(x-k)^{2}=4k^{2}$ .

A

$x = 3k$

B

$x = 5k$

C

$x = -k$ or $x = 3k$

D

$x = -3k$ or $x = 5k$

2013 · Paper 2 Q7 Functions and graphs

The figure shows the graph of $y = -2x^{2} + ax + b$ , where $a$ and $b$ are constants. The equation of the axis of symmetry of the graph is

A

$x = 2$ .

B

$x = 3$ .

C

$x = 5$ .

D

$y = 8$ .

2013 · Paper 2 Q8 Identities

If $a$ , $b$ and $c$ are non-zero constants such that $x(x+3a)+a \equiv x^{2}+2(bx+c)$ , then $a:b:c=$

A

$2:3:1$ .

B

$2:3:4$ .

C

$3:2:6$ .

D

$6:4:3$ .

2013 · Paper 2 Q9 More about polynomials

Let $f(x)=x^{13}-2x+k$ , where $k$ is a constant. If $f(x)$ is divisible by $x+1$ , find the remainder when $f(x)$ is divided by $x-1$ .

A

0

B

$-1$

C

2

D

$-2$

2013 · Paper 2 Q10 Using percentages

Susan sells two cars for $$80\,080$ each. She gains $30\%$ on one and loses $30\%$ on the other. After the two transactions, Susan

A

loses $$15\,840$ .

B

gains $$5\,544$ .

C

gains $$10\,296$ .

D

has no gain and no loss.

2013 · Paper 2 Q11 Using percentages

A sum of $$50\,000$ is deposited at an interest rate of $8\%$ per annum for 1 year, compounded monthly. Find the interest correct to the nearest dollar.

A

$$4000$

B

$$4122$

C

$$4143$

D

$$4150$

2013 · Paper 2 Q12 Rates, ratios and proportions

The actual area of a playground is $900 ext{ m}^{2}$ . If the area of the playground on a map is $36 ext{ cm}^{2}$ , then the scale of the map is

A

$1:25$ .

B

$1:50$ .

C

$1:500$ .

D

$1:250\ 000$ .

2013 · Paper 2 Q13 Variations

It is given that $z$ varies directly as $x$ and inversely as $\sqrt{y}$ . If $y$ is decreased by $64\%$ and $z$ is increased by $25\%$ , then $x$

A

is increased by $20\%$ .

B

is increased by $80\%$ .

C

is decreased by $25\%$ .

D

is decreased by $75\%$ .

2013 · Paper 2 Q14 Equations of straight lines

The figure shows the graph of the straight line $x + ay + b = 0$ . Which of the following are true?

I. $a < 0$

II. $b < 0$

III. $a < b$

A

I and II only

B

I and III only

C

II and III only

D

I, II and III

2013 · Paper 2 Q15 Polygons

In the figure, the regular octagon is divided into eight identical isosceles triangles and four of the shaded. The number of axes of reflectional symmetry of the octagon is

A

$2$ .

B

$4$ .

C

$8$ .

D

$16$ .

2013 · Paper 2 Q16 Arc lengths and areas of sectors

In the figure, the diameter of the semicircle $ABC$ is $3\text{ cm }$ . If $AC = 2$ cm, find the area of the shaded region correct to the nearest $0.01$ cm $^2$ .

A

$0.23\text{ cm}^{2}$ .

B

$0.52\text{ cm}^{2}$ .

C

$0.64\text{ cm}^{2}$ .

D

$1.07\text{ cm}^{2}$ .

2013 · Paper 2 Q17 Mensuration

In the figure, the solid consists of a right circular cone and a hemisphere with a common base. The base radius and the height of the circular cone are $3\text{ cm }$ and $4\text{ cm }$ respectively. Find the total surface area of the solid.

A

$30\pi\text{ cm}^{2}$ .

B

$33\pi\text{ cm}^{2}$ .

C

$48\pi\text{ cm}^{2}$ .

D

$51\pi\text{ cm}^{2}$ .

2013 · Paper 2 Q18 Similar triangles

In the figure, $ABCD$ is a trapezium with $AD \parallel BC$ and $AD:BC = 2:3$ . Let $E$ be the mid-point of $BC$ . $AC$ and $DE$ intersect at $F$ . If the area of $\triangle CEF$ is $36\text{ cm}^{2}$ , then the area of the trapezium $ABCD$ is

A

$216\text{ cm}^{2}$ .

B

$264\text{ cm}^{2}$ .

C

$280\text{ cm}^{2}$ .

D

$320\text{ cm}^{2}$ .

2013 · Paper 2 Q19 Basic properties of circles

In the figure, $ABCD$ is a circle. $AC$ and $BD$ intersect at $E$ . If $AB = AD$ and $AD \parallel BC$ , then $\angle BAE =$

A

$53^{\circ}$ .

B

$57^{\circ}$ .

C

$69^{\circ}$ .

D

$74^{\circ}$ .

2013 · Paper 2 Q20 Trigonometry

In the figure, the bearing of P from O is $S86^{\circ}E$ and the bearing of Q from O is $N32^{\circ}E$ . If P and Q are equidistant from O, then the bearing of P from Q is

A

$\mathrm{N}24^{\circ}\mathrm{W}$ .

B

$N27^{\circ}W$ .

C

$S24^{\circ}E$ .

D

$S27^{\circ}E$ .

2013 · Paper 2 Q21 Polygons

If an interior angle of a regular n-sided polygon is 4 times an exterior angle of the polygon, which of the following is/are true?

I. The value of n is 10.

II. The number of diagonals of the polygon is 10.

III. The number of folds of rotational symmetry of the polygon is 10.

A

I only.

B

II only.

C

I and III only.

D

II and III only.

2013 · Paper 2 Q22 Trigonometry

In $\triangle ABC$ , $AB:BC:AC=8:15:17$ . Find $\cos A:\cos C$ .

A

$8:15$

B

$8:17$

C

$15:8$

D

$15:17$

2013 · Paper 2 Q23 Trigonometry

If $0^{\circ}<x<90^{\circ}$ , which of the following must be true?

I. $\tan x\tan(90^{\circ}-x)=1$

II. $\sin x - \sin(90^{\circ} - x) < 0$

III. $\cos x + \cos(90^{\circ} - x) > 0$

A

I and II only

B

I and III only

C

II and III only

D

I, II and III

2013 · Paper 2 Q24 Equations of straight lines

The coordinates of the points $A$ and $B$ are $(2, 5)$ and $(4, -1)$ respectively. Let $P$ be a moving point in the rectangular coordinate plane such that $AP = BP$ . Find the equation of the locus of $P$ .

A

$x-3y+3=0$

B

$x-3y-7=0$

C

$x-3y+13=0$

D

$3x+y-11=0$

2013 · Paper 2 Q25 Equations of circles

The equation of the circle $C$ is $2x^{2} + 2y^{2} - 4x + 8y - 5 = 0$ . The coordinates of the points $P$ and $Q$ are $(-1, 2)$ and $(4, 0)$ respectively. Which of the following is/are true?

I. The radius of $C$ is 5.

II. The mid-point of $PQ$ lies outside $C$ .

III. If $G$ is the centre of $C$ , then $\angle PGQ$ is an acute angle.

A

I only

B

II only

C

I and III only

D

II and III only

2013 · Paper 2 Q26 Probability

Two numbers are randomly drawn at the same time from seven cards numbered 1, 2, 3, 4, 5, 6 and 7 respectively. Find the probability that the product of the numbers drawn is an odd number.

A

$\frac{2}{7}$

B

$\frac{4}{7}$

C

$\frac{12}{49}$

D

$\frac{16}{49}$

2013 · Paper 2 Q27 Measures of dispersion

If the mean and the mode of the nine numbers 14, 6, 4, 5, 7, 5, x, y and z are 8 and 14 respectively, then the median of these nine numbers is

A

B

C

D

2013 · Paper 2 Q28 Variations

The scatter diagram below shows the relation between x and y. Which of the following may represent the relation between x and y?

A

y increases when x increases.

B

y decreases when x increases.

C

y varies inversely as $x^{2}$ .

D

y varies directly as $x^{-3}$ .

2013 · Paper 2 Q29 Presentation of data

The stem-and-leaf diagram below shows the distribution of the hourly wages (in dollars) of some workers.

\end{array} $$ Which of the following box-and-whisker diagrams may represent the distribution of their hourly wages? Figure 1 Figure 2 Figure 3 Figure 4

A

B

C

D

2013 · Paper 2 Q30 Presentation of data

The pie charts below show the distributions of the profits of stationery shop X and stationery shop Y from the sales of stationery in a certain month. Which of the following must be true?

Distribution of the profits of stationery shop X

Distribution of the profits of stationery shop Y

[Figure 5]

[Figure 6]

A

In that month, the profit from the sales of pencils of stationery shop X is the same as that of stationery shop Y.

B

In that month, the total profit from the sales of pens and notebooks of stationery shop X is less than the total profit from the sales of rulers and pencils of the shop.

C

$k=14$

D

$\theta = 36^{\circ}$

2013 · Paper 2 Q31 More about polynomials

The L.C.M. of $a^{2}+4a+4$ , $a^{2}-4$ and $a^{3}+8$ is

A

$a+2$

B

$(a-2)(a+2)^{2}(a^{2}-2a+4)$

C

$(a-2)(a+2)^{2}(a^{2}+2a+4)$

D

$(a-2)(a+2)^{4}(a^{2}-2a+4)$