assessment unit c4 module c4: *amc41* core …...centre number candidate number 11795 *24amc4101*...
TRANSCRIPT
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Centre Number
Candidate Number
11795
*24AMC4101*
*24AMC4101*
*AMC41*
*AMC41*
Mathematics
Assessment Unit C4assessingModule C4:Core Mathematics 4
[AMC41]WEDNESDAY 5 JUNE, MORNINGTIME
1 hour 30 minutes.
INSTRUCTIONS TO CANDIDATES
Write your Centre Number and Candidate Number in the spaces provided at the top of this page.You must answer all eight questions in the spaces provided.Do not write outside the boxed area on each page or on blank pages.Complete in black ink only. Do not write with a gel pen.Questions which require drawing or sketching should be completed using an H.B. pencil.All working should be clearly shown in the spaces provided. Marks may be awarded for partially correct solutions. Answers without working may not gain full credit.Answers should be given to three significant figures unless otherwise stated.You are permitted to use a graphic or scientific calculator in this paper.
INFORMATION FOR CANDIDATES
The total mark for this paper is 75Figures in brackets printed down the right-hand side of pages 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 1n z where it is noted that 1n z ≡ loge z
ADVANCEDGeneral Certificate of Education
2019
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*24AMC4102*
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1 The functions f and g are defined by:
f(x) = x2
g(x) = x + 2
(i) Find the composite function fg(x). [2]
(ii) Find the composite function gf(x). [1]
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(iii) Hence find the value of x for which fg(x) = gf(x). [2]
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*24AMC4104*
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2 Fig. 1 below shows part of the curve
y = 6 – 2√x
0
y
5x
Fig. 1
A plastic funnel can be modelled by rotating this curve between x = 0 and x = 5 through 360° about the x-axis.
Find the volume that the funnel can hold. [6]
14x + 1
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*24AMC4106*
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3 An aircraft flies in a straight line from A to B. The position vectors of A and B, relative to a fixed origin O, are
and
( 201 ) and ( 565 ) and
respectively.
(i) Find the distance travelled between A and B. [2]
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(ii) Find a vector equation of the line AB. [4]
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*24AMC4108*
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At B the aircraft changes course and flies towards point C whose position vector is ( 394 ) (iii) Find, in degrees, the angle ABC. [5]
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*24AMC4109*
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4 (a) Find
∫(3x + 1)e2x dx [4]
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*24AMC4110*
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(b) (i) Prove that
1sin 2x + cot 2x ≡ cot x [6]
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(ii) Hence find
∫ 1sin 2x + cot 2x dx
[2]
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*24AMC4112*
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5 (i) Using partial fractions, show that
1(2x +1)(x+1) = 2
(2x +1) – 1(x +1) [4]
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(ii) When it is recharged from empty, the voltage, V volts, of a rechargeable battery can be modelled by the equation
(2t +1) dVdt = k
t +1
where t is the number of hours for which the battery is charged and k is a positive constant.
Initially V = 0 When t = 2, V = 2.36 The battery company recommends that a battery needs 24 hours to be fully charged.
Find V when the battery is fully charged. [10]
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*24AMC4114*
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*24AMC4115*
*24AMC4115*
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*24AMC4116*
*24AMC4116*
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6 A curve has equation
x2 – 4xy + 2y2 + 18 = 0
(i) Show that
dydx = x – 2y
2x – 2y [5]
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(ii) Hence find the coordinates of the stationary points of this curve. [5]
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*24AMC4118*
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7 Solve the equation
7sin θ + 24cos θ = 8 where 0°G H I JθG H I J360° [7]
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*24AMC4119*
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*24AMC4120*
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8 The metal blade of a scalpel can be modelled as the area enclosed by the curve
y = (sin x – 2cos x)2
the x and y-axes and the line x = π4 , as shown in Fig. 2 below.
0
y
x
y = (sin x – 2cos x)2
π4
Fig. 2
Find the exact area of one face of the blade. [10]
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THIS IS THE END OF THE QUESTION PAPER
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TotalMarks
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