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Mathematics
Assessment Unit A2 1assessingPure Mathematics
[AMT11]TUESDAY 28 MAY, MORNING
Time2 hours 30 minutes, plus your additional time allowance.
Instructions to CandidatesWrite your Centre Number and Candidate Number in the spaces provided at the top of this page.You must answer all twelve questions in the spaces provided.Do not write on blank pages or tracing paper.Complete in black ink only. Questions which require drawing or sketching should be completed using an H.B. pencil.Show clearly the full development of your answers. Answers without working may not gain full credit.Answers should be given to three signifi cant fi gures unless otherwise stated.You are permitted to use a graphic or scientifi c calculator in this paper.
ADVANCEDGeneral Certifi cate of Education
2019
New
Specifi
catio
n
MV18
Centre Number
Candidate Number
11864.02 MV18
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Information for CandidatesThe total mark for this paper is 150Figures in brackets printed at the end of each question indicate the marks awarded to each question or part question.A copy of the Mathematical Formulae and Tables booklet is provided.Throughout the paper the logarithmic notation used is ln z where it is noted that ln z ≡ loge z
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Blank page
(Questions start overleaf)
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1 A curve is given by the equation
x3 + 3y2 = 11
By using implicit differentiation find dydx in terms of x and y.
[4 marks]
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2 A curve is defined parametrically by
x = at2 and y = 3at
where a is a constant and t is the parameter.
Find the Cartesian equation of this curve. [4 marks]
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3 A mirror ABCDE is designed in the form of a sector of a circle, centred at B, together with two congruent right-angled triangles, BAE and BCD, as shown in Fig. 1 below.
AC = 80 cm AE = CD = 60 cm
D
CA
E
B
60 cm
80 cm Fig. 1
(i) Find the angle EBD in radians. [5 marks]
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(ii) Find the area of the mirror. [7 marks]
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4 (i) Prove that
cosec 2θ − cot 2θ ≡ tan θ [7 marks]
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(ii) Hence find the exact value of tan
π8 [2 marks]
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5 (a) A function f is defined by
f: x x2 − 8, x , x 0
(i) State the range of the function f (x). [1 mark]
(ii) Find the inverse function f −1(x), clearly stating its domain. [4 marks]
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A function g is defined by
g: x | x − 3 |, x
(iii) On the axes below sketch the graph of y = g(x). [2 marks]
y
xO
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(iv) Find the composite function gf(x). [2 marks]
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(b) The graph of the function y = h(x) is sketched in Fig. 2 below.
y
x30
3
6
P
Q
Fig. 2
(i) On the axes below sketch the graph of
y = 13
h(3x)
and clearly label the images of the points P and Q. [2 marks]
y
xO
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(ii) On the axes below sketch the graph of
y = 6 − h(x)
and clearly label the images of the points P and Q. [2 marks]
y
xO
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6 The expression 8 sin x + 15 cos x can be written in the form R sin(x + ), where R is an integer and 0° 90°
(i) Find the values of R and . [6 marks]
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(ii) Hence, or otherwise, determine the maximum value of
18
8 sin x + 15 cos x + 23
and find a corresponding value of x. [4 marks]
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7 (i) Use the Trapezium Rule with 3 ordinates to find an approximate value for
3
2
x2
(x + 3) (x − 1) dx [5 marks]
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(ii) Use partial fractions to calculate the value of
3
2
x2
(x + 3) (x − 1) dx [12 marks]
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(iii) Explain how the use of the Trapezium Rule in (i) could be modified to obtain a better approximation to the integral
3
2
x2
(x + 3) (x − 1) dx
[1 mark]
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8 The population, P, in a housing development grows at a rate proportional to the population at any time t (years).
This can be modelled by the differential equation
dPdt = kP
where k is a constant.
The initial population is P0
(i) Show that
P = P0ekt [6 marks]
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(ii) Given that the initial population doubles in 5 years, find the exact value of k. [3 marks]
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(iii) Find the number of years until the initial population is trebled.
Give the answer to the nearest year. [3 marks]
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(iv) State a limitation of this model. [1 mark]
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9 A curve has the equation
y = (x − 5) ln x
(i) Show that
dydx = 1 −
5x + ln x [4 marks]
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(ii) Show that the curve has a turning point between x = 2 and x = 3 [3 marks]
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(iii) By taking 2.4 as a first approximation to the x-coordinate
of the turning point, use the Newton Raphson method once to find a better approximation. [5 marks]
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10 (a) Find
∫ x– 12ln x dx [7 marks]
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(b) Using the substitution u2 = x2 + 4 , or otherwise, find the exact value of
0x2 + 4
5
∫ x3dx
[8 marks]
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11 The graphs of the curves
y = sin 2x and y = cos 2x
are shown in Fig. 3 below.
The curves intersect at the points A and B.
0
−1 B
x
y
1
R3π4
π4
A
π2
Fig. 3
(i) Show that the x-coordinates of A and B are π8 and 5π8 [4 marks]
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The top section of a trophy is a flat metal sheet modelled in
the shape of the shaded region R.
(ii) Calculate the area of this region. [6 marks]
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A circle has the equation
x2 + y2 = 4
The base of the trophy can be modelled as the solid formed when the area bounded by this circle, the y-axis and the line x = 1 is rotated through 2π radians about the x-axis.
(iii) Find the exact volume of the trophy base. [6 marks]
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12 (a) (i) Prove that the sum of n terms of an arithmetic progression with first term a and last term l is
Sn = 12 n(a + l) [4 marks]
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The first term of an arithmetic progression is 7 and the
last term is 79 The sum of the progression is 1075
(ii) Find the number of terms. [3 marks]
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(iii) Find the common difference. [3 marks]
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(b) A salesman receives a bonus at the end of each year and decides to invest this money in a savings account.
At the end of Year 1 he invests £400
At the end of Year 2 he invests a further £400 and receives 2% interest on the first year’s £400
At the end of Year 3 he invests a further £400 and 2% interest is added to the total sum of money which he has accumulated during the first two years.
(i) Show that he has £1,224.16 in his account at the end of Year 3 [4 marks]
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(ii) Assuming that the man continues to invest in this way, form and sum a series to prove that he will have
£20 000(1.02n − 1)
in his account at the end of n years. [6 marks]
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(iii) Hence find the least number of years until his
investment exceeds £7,000 [4 marks]
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This is the end of the question paper
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11864.02 MV18 [Turn over
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