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CARIBBEAN EXAMINATIONS COUNCIL
CARIBBEAN SECONDARY EDUCATION CERTIFICATE@EXAMINATION
MATHEMATICS
Paper 02 - General Prcficiency
2 hours 40 minutes
READ THE FOLLOWING INSTRUCTIONS CAREFULLY.
1. This paper consists of TWO sections: I and II.
2. Section I has EIGHT questions and Section II has THREE questions.
3. AnswerALL questions in Section I and any TWO questions from Section II.
4. Write your answers in the booklet provided.
5. Do NOT write in the margins.
6. All working MUST be clearly shown.
7. A list of formulae is provided on page 4 of this booklet.
8. If you need to rewrite any answer and there is not enough space to do so on theoriginal page, you must use the extra page(s) provided at the back of this booklet.Remember to draw a line through your original answer.
9. If you use the extra page(s) you MUST write the question number clearly in thebox provided at the top of the extra page(s) and, where relevant, include thequestion part beside the answer.
Required Examination Materials
Electronic calculatorGeometry set
DO NOT TURN THIS PAGE UNTIL YOU ARE TOLD TO DO SO.
Copyright @ 2017 Caribbean Examinations Council
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Volume of a prism
Volume of a cylinder
Volume of a right pyramid
Circumference
Trigonometric ratios
Area of a triangle
Sine rule
cos0 = length ofadjacent side
length ofhypotenuse
tanO:
Areaof A=height.
Area of A ABC = |- ab sin C
Area of A ABC : s(s-a)(s-b)(s-c)
V : Ah where I is the area of a cross-section and ft is the perpendicularlength.
V = nf hwhere r is the radius of the base and & is the perpendicular height.
If : ]-,lhwttere ,,{ is the area of the base and & is the perpendicular height.
C = Znr where r is the radius of the circle.
Arc length t: *- x 2nr where 0 is the angle subtended by the arc, measured in
degrees.
Area of a circle A : nf where r is the radius of the circle.
Area of a sector n: #x nl where 0 is the angle of the sector, measured in degtees.
Areaof atrapezium A=+@+ b)ft where aandbare the lengths of theparallel sides and ft
is the perpendicular distance between the parallel sides.
Roots of quadratic equations lf axz + bx -r c: 0,
- -b +,{b? 4a;then l- =
----u-length of opposite side
stn 0 : I#gtfm$Foienuse
length of side Adjacentlength ofadjacent side
) bhwhereb is the length of the base and ft is the perpendicular
Opposite
c
B
where s - a+b*c2
a_b-csm7 silT silU
a
c Ab
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SECTION I
Answer ALL questions in this section.
All working must be clearly shown.
Using a calculator, or otherwise, calculate
(i) t* * ,1 * tf , eivinc your answer as a fraction in its lowest terms
1. (a)
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(ii) 165 x 0.382, giving your answer as an EXACT value.
(2 marks)
(1 mark)
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(b) Write your answer in (a) (ii) correct to
(i) two decimal places
(iD three significant figures
(iii) the nearest whole number.
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(1 mark)
(1 mark)
(1 mark)
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(c)
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MrAdams invested $5 000 at the credit union and received S5 810, inclusive of simpleinterest, after 3 years.
Determine
(i) the simple interest earned
(1 mark)
(ii) the annual interest rate paid by the credit union
(2 marks)
(iii) the length of time it will take for MrAdams' investment to be doubled, at the samerate of interest.
(2 marks)
Total l1 marks
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Given that a * b means J;4b , where the positive root is taken, determine
(i) the value of I * 2
(2 marks)
(ii) whether the operation denoted by * is commutative. Justifu your answer.
(3 marks)
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2. (a)
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(b) (D Solve the inequality 3 -Zx> 5
(ii) Represent your answer in (b) (i) on the number line shown below.
-4 -3 -2 -1 0 1 2 3 4
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(2 marks)
(l mark)
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t- rase {(c)
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Statement one: Two adult tickets and three children tickets cost $43.00.Statement two: One adult ticket and one ticket for a child cost $18.50.
(i) Let x represent the cost of an adult ticket andy the cost of a ticket for a child. WriteTWO equations in x andy to represent the information above.
(2 marks)
(iD Solve the equations to determine the cost of an adult ticket.
(2 marks)
Total 12 marks
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The universal set U: {b, d, e,f, g, i, k, s, t,v, w}. The Venn diagram below shows U andthree sets, M, P and R, which are subsets of U.
(i) State the value of n(Pt-rR)
(1 mark)
(ii) List the members of
a) MnP
(2 marks)
b) MwR'
(2 marks)
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(i) Using a ruler, a pencil and a pair of compasses, construct triangle PQR withPQ:8 cm, angle PQR:120" and QR:5 cm.
(4 marks)
(ii) Measure and state the length of the side PR.
(1 mark)
(iii) On your diagram in (b) (i), construct the point S, such that PQRS forms aparallelogram. (2 marks)
Total 12 marks
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(b)
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t- rus" {4. (a) The equation of a straight line, l, is given as 3x - 4y : 5.
(i) Write the equation of the line, /, in the formy : mx * c
(2 marks)
(ii) Hence, determine the gradient of the line, /.
(l mark)
(iii) The point P with coordinates (r, 2) lies on the line /. Determine the value of r.
(2 marks)
(iv) Find the equation of the straight line passing through the point (6, 0) which isperpendicular to l.
(2 marks)
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(i) Draw the straight lines x * y: l0 andy: x on the grid below. (2 marks)
(iD On the same grid, shade the region which satisfies the FOUR inequalities
(2 marks)
Total ll marks
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and
x>0vZ0x+y<10x) v.
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and EF: 5 cm.
Scm F
(D What is the name of the polygon shown above?
(1 mark)
(iD Calculate the perimeter of the polygon EFGHIJ.
(1 mark)
(iii) Determine the size of each interior angle of the polygon.
(2 marks)
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r ease {(iv) Show, by calculation, that the area of the polygon, to the nearest whole number,
is 65 cm2.
(3 marks)
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(i) Determine the capacity of the tank, in litres.
A tank has a cross section with dimensions identical to the polygon EFGHIJ in 5 (a).
Water is poured into the tank at a rate of 75 cm3 per second. After 52 seconds the tank is2 full5
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(3 marks)
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r rae" {(ii) Calculate the height, ft, in metres, of the tank.
(2 marks)
Total 12 marks
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t- rus" {6, The diagram below shows triangle PQR.
(a) State the coordinates of R.
On the diagram above, draw
(i) L P'Q'R' , a reflection of L, PQR in the line y : I
(ii) L P" Q" R" , a reflection of L P'Q'R' in the line x : 0
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(b)
(1 mark)
(2 marks)
(2 marks)
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(c) Describe, fully, the single transformation that maps A P" Q't Rtt onto A PpR
(d)
(3 marks)
Triangle PQRundergoes an enlargement of scale factor 2. Calculate the area of its image.
(2 marks)
Total 10 marks
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r rase I7 , (a) The marks obtained by 10 students in a test, scored out of 60, are shown below.
29 38 26 42 38
45 35 37 38 3r
For the data above, determine
(i) the range
(1 mark)
(iD the median
(1 mark)
(iii) the interquartile range
(2 marks)
(iv) the probability that a student chosen at random scores less than half the total marks
in the test.
(2 marks)
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(b)
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The frequency distribution below shows the masses, in kg, of 50 adults prior to the startof a fitness programme.
Mass (kg) Midpoint Frequency
6044 62 8
65-69 67 11
70-74 72 15
75-79 77 9
80-84 82 5
85-89 87 2
On the grid on page23, using a scale of 2 cm to represent 5 units on the x-axis and I cmto represent 1 unit on the y-axis, draw a frequency polygon to represent the informationin the table. (6 marks)
Total 12 marks
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8. A sequence of figures is made from toothpicks of unit length. The first three figures in the sequenceare shown below.
/\ AZ N/N(a)
(b)
Frgure 1 Figure 2
Draw Figure 4 of the sequence.
Figure 3
(2 marks)
Study the patterns of numbers in each row of the table below. Each row relates to one ofthe figures in the sequence of figures above. Some rows have not been included in thetable.
Complete the rows numbered (i), (ii), (iii) and (iv).
FigureNumber of Toothpicks
in PatternPerimeter of Figure
1aJ 0+l+2:3
2 7 I +2+2:5
J 1l 2+3 +2:7
4
19+20+2:41
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(2 marks)
(2 marks)
(2 marks)
(2 marks)
Total 10 marks
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(iii)
(iv)
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9. (a)
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SECTION II
Answer TWO questions in this section.
ALGEBRAAI\D RELATIONS, FUNCTIONS AND GRAPHS
(i) Show, by calculation, that the EXACT roots of the quadratic equation
*+2x-5:0are-1 +./6.
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(3 marks)
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r eug" {(ii) Hence, or otherwise, solve the simultaneous equations
2+ x=yxy: 5.
(4 marks)
The incomplete table below shows values of x andy for the function !:2, for integervalues ofx from -l to 4.
(D Complete the table for the functiony:2' (2 marks)
(ii) On the grid provided on page 27, draw the graph of y:2', using a scale of 2 cmto represent 1 unit on the x-axis and I cm to represent 1 unit on they-axis.
(4 marks)
(iii) Drawing appropriate lines on your graph, determine the value of x for which2': lI.
(2 marks)
Total 15 marks
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10. (a)
MEASUREMENT, GEOMETRY AND TRIGONOMETRY
The diagram below, not drawn to scale, shows a circle with centre O. The points A, B,C and D are on the circumference of the circle. EAF and EDG arc tangents to the circleat A andD respectiv ely.,a6O : ll4o and CbC: 18o.
E
Calculate, giving reasons for EACH step of your answer, the measure ofn(i) ACD
(ii) AED
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(iv) ebc
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(2 marks)
(2 marks)
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r rue" {(b) The diagram below shows a cuboid
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60cm.-----------._ R
V
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Give your answer correct to one decimal place.
O A straight adjustable wire connects R to P along the top of the cuboid. Calculatethe length of the wire.ttP.
(1 mark)
(ii) The connection at P is now adjusted and moved to Z.
Calculate the length of the wire RZ.
(2 marks)
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(iiD Calculate the angle TRV.
(iv) Complete the following statements
The size of the angle through which the wire moves from i?P to RZ is
An angle which is the same in size as RTVis
(2 marks)
(2 marks)
Total 15 marks
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11. (a) Given the vectors O? :[iJ ,fr:[-N,.or:[l]'
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--)(i) determine the vector 0p
(iD show that dr"parallel to RS]giving a reason for your answer,
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(2 marks)
(1 mark)
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XYZis a triangle and Mis the midpointof XZ.
---) --)XY:t and YZ:b.
Express the following vectors in terms of a and b, simplifying your answers where possible:
---)(i) xz
(1 mark)
(ii) MY
(3 marks)
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(c)
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(i) Determine A-t,the inverse ofl.
(ii) Show that A tA = I, the identity matrix.
The matrices I and .B are given ,., : f-l | ""0 , : [-i ?1' l+ 6J
(2 marks)
(2 marks)
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(iii) Determine the ma1u.ixA2
(2 marks)
(iv) a) Explain why the matrix ptoduct AB is NOT possible
(1 mark)
b) Without calculating, state the order of the matrix product BA.
(l mark)
Total 15 marks
END OF TEST
IF YOU FINISH BEFORE TIME IS CALLED, CHECK YOUR WORI( ON THIS TEST.
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