Mathemat Ext2 02
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Transcript of Mathemat Ext2 02
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7/31/2019 Mathemat Ext2 02
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General Instructions
Reading time 5 minutes
Working time 3 hours
Write using black or blue pen
Board-approved calculators may
be used
A table of standard integrals is
provided at the back of this paper
All necessary working should be
shown in every question
Total marks 120
Attempt Questions 18
All questions are of equal value
Mathematics Extension 2
412
2002H I G H E R S C H O O L C E R T I F I C A T E
E X A M I N A T I O N
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Total marks 120
Attempt Questions 18
All questions are of equal value
Answer each question in a SEPARATE writing booklet. Extra writing booklets are available.
Marks
Question 1 (15 marks) Use a SEPARATE writing booklet.
(a) By using the substitution u = secx, or otherwise, find
.
(b) By completing the square, find .
(c) Find .
(d) By using two applications of integration by parts, evaluate
.
(e) Use the substitution to find
.d
20
2
+ cos
4t= tan
2
e x dxxcos0
2
4
3x dx
x x+( ) ( ) 3 1
2dx
x x2 2 2+ +
sec tan3x x dx
2
2
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Question 2 (15 marks) Use a SEPARATE writing booklet.
(a) Let z = 1 + 2i and w = 1 + i. Find, in the form x+ iy,
(i)
(ii) .
(b) On an Argand diagram, shade in the region where the inequalities
both hold.
(c) It is given that 2 + i is a root of
P(z) = z3 + rz2 + sz + 20,
where rand s are real numbers.
(i) State why 2 i is also a root of P(z).
(ii) Factorise P(z) over the real numbers.
(d) Prove by induction that, for all integers n 1,
(cos isin)n = cos(n) isin(n).
(e) Let z = 2(cos+ isin) .
(i) Find .
(ii) Show that the real part of is .
(iii) Express the imaginary part of in terms of. 11
1 z
21 2
5 4
cos
cos
1
1 z
11 z
3
2
1
0 2 1 2 + Rez z iand
3
11
w
1zw
3
Marks
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Question 3 (15 marks) Use a SEPARATE writing booklet.
The diagram shows the graph of y =f(x).
Draw separate one-third page sketches of the graphs of the following:
(i)
(ii)
(iii)
(iv) .
Question 3 continues on page 5
2y f x= ( )( )ln
2y f x= ( )
2y f x2 = ( )
2yf x
=( )
1
(3, 1)
(2, 0)
(1, 1)
O
y
xy =f(x)
(a)
4
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Question 3 (continued)
The distinct points are on the same branch of the
hyperbola Hwith equation xy = c2. The tangents to Hat P and Q meet at the
point T.
(i) Show that the equation of the tangent at P is
x+ p2y = 2cp.
(ii) Show that Tis the point .
(iii) Suppose P and Q move so that the tangent at P intersects the x axisat (cq, 0).
Show that the locus ofTis a hyperbola, and state its eccentricity.
End of Question 3
3
22 2cpq
p q
c
p q+ +
,
2
P cpc
pQ cq
c
q, ,
and
O
P
TQ
x
y
H
(b)
5
Marks
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Question 4 (15 marks) Use a SEPARATE writing booklet.
The shaded region bounded by y = 3 x2, y =x+x2 and x= 1 is rotated aboutthe line x= 1. The point P is the intersection of y = 3 x2 and y =x+x2 in thefirst quadrant.
(i) Find thexcoordinate ofP.
(ii) Use the method of cylindrical shells to express the volume of the
resulting solid of revolution as an integral.
(iii) Evaluate the integral in part (ii).
Question 4 continues on page 7
2
3
1
O x
y
x= 1
y= 3 x2
y=x+x2
P
(a)
6
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Question 4 (continued)
In the diagram, A, B, CandD are concyclic, and the pointsR, S, Tare the feet
of the perpendiculars fromD toBA produced, ACandBCrespectively.
(i) Show that DSR = DAR.
(ii) Show that DST= DCT.
(iii) Deduce that the pointsR, Sand Tare collinear.
(c) From a pack of nine cards numbered 1, 2, 3, , 9, three cards are drawn
at random and laid on a table from left to right.
(i) What is the probability that the number formed exceeds 400?
(ii) What is the probability that the digits are drawn in descending order?
End of Question 4
2
1
2
2
2
B
S
D
T
C
A
R(b)
7
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Question 5 (15 marks) Use a SEPARATE writing booklet.
(a) The equation 4x3 27x+ k= 0 has a double root. Find the possible values ofk.
(b) Let , , and be the roots of the equation x3 5x2 + 5 = 0.
(i) Find a polynomial equation with integer coefficients whose roots are
1, 1, and 1.
(ii) Find a polynomial equation with integer coefficients whose roots are
2, 2, and 2.
(iii) Find the value of 3 + 3 + 3.
The ellipse E has equation , and focus Sand directrix Das shown
in the diagram. The point T(x0, y0) lies outside the ellipse and is not on thexaxis.
The chord of contact PQ from Tintersects DatR, as shown in the diagram.
(i) Show that the equation of the tangent to the ellipse at the point P(x1,y1) is
.
(ii) Show that the equation of the chord of contact from Tis
.
(iii) Show that TSis perpendicular to SR. 3
x x
a
y y
b
0
2
0
21+ =
2
x x
a
y y
b
1
2
1
21+ =
2
x
a
y
b
2
2
2
21+ =
E
P(x1,y1)
T(x0,y0)
O SQ
R
Directrix D
y
x
(c)
2
2
2
2
8
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Question 6 (15 marks) Use a SEPARATE writing booklet.
(a) A particle of mass m is suspended by a string of length l from a point directly
above the vertex of a smooth cone, which has a vertical axis. The particle
remains in contact with the cone and rotates as a conical pendulum with angular
velocity . The angle of the cone at its vertex is 2, where > , and the string
makes an angle ofwith the horizontal as shown in the diagram. The forces
acting on the particle are the tension in the string T, the normal reaction to the
coneNand the gravitational force mg.
(i) Show, with the aid of a diagram, that the vertical component ofN
is Nsin.
(ii) Show that , and find an expression for TN in terms ofm, l and .
(iii) The angular velocity is increased until N= 0, that is, when the particle isabout to lose contact with the cone. Find an expression for this value of
in terms of, l and g.
Question 6 continues on page 10
2
3T Nmg+ =
sin
1
N
mg
T
l
NOT TO
SCALE
4
9
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Question 6 (continued)
(b) For n = 0, 1, 2, let
.
(i) Show that .
(ii) Show that, for n 2,
.
(iii) For n 2, explain whyIn
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Question 7 (15 marks) Use a SEPARATE writing booklet.
The diagram represents a vertical cylindrical water cooler of constantcross-sectional area A. Water drains through a hole at the bottom of the cooler.
From physical principles, it is known that the volume Vof water decreases at a
rate given by
,
where kis a positive constant andy is the depth of water.
Initially the cooler is full and it takes Tseconds to drain. Thus y =y0 whent= 0, and y = 0 when t= T.
(i) Show that .
(ii) By considering the equation for , or otherwise, show that
for 0 t T.
(iii) Suppose it takes 10 seconds for half the water to drain out. How long
does it take to empty the full cooler?
Question 7 continues on page 12
2
y y tT
= 02
1
4dt
dy
1dy
dt
k
Ay=
dV
dtk y=
yy0
Drainingwater
(a)
11
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12
Marks
Question 7 (continued)
(b) Suppose and define complex numberszn
by
zn = cos(+ n) + i sin(+ n)
for n = 0, 1, 2, 3, 4. The points P0, P1, P2 and P3 are the points in the Arganddiagram that correspond to the complex numbers z0, z0 + z1 , z0 + z1 + z2 and
z0 +z1 +z2 +z3 respectively. The angles 0, 1 and 2 are the external angles atP0, P1 and P2 as shown in the diagram below.
(i) Using vector addition, explain why
0 = 1 = 2 = .
(ii) Show that P0OP1 = P0P2P1, and explain why OP0P1P2 is a cyclicquadrilateral.
(iii) Show that P0
P1
P2
P3
is a cyclic quadrilateral, and explain why the points
O, P0, P1, P2 and P3 are concyclic.
(iv) Suppose thatz0 + z1 + z2 + z3 + z4 = 0. Show that
.
End of Question 7
= 25
2
2
2
2
O
y
x
2
1
0
P3
P2
P1
P0
02
<
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Question 8 (15 marks) Use a SEPARATE writing booklet.
(a) Let m be a positive integer.
(i) By using De Moivres theorem, show that
(ii) Deduce that the polynomial
has m distinct roots
.
(iii) Prove that
.
(iv) You are given that .
Deduce that
.
Question 8 continues on page 14
2
6< + + + +( )( )
11
12
1 2 12 2 12 2 2
2
K
mm
m m
2cot
< <
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Question 8 (continued)
In the diagram, AB and CD are line segments of length 2a in horizontal planes
at a distance 2a apart. The midpointEofCD is vertically above the midpoint F
ofAB, andAB lies in the SouthNorth direction, while CD lies in the WestEast
direction.
The rectangle KLMNis the horizontal cross-section of the tetrahedronABCD at
distancexfrom the midpoint P ofEF(so PE= PF= a).
(i) By considering the triangleABE, deduce that KL = a x, and find thearea of the rectangle KLMN.
(ii) Find the volume of the tetrahedronABCD.
End of paper
2
4
C E
P
D
NK
L
B
F
A
M
a
a
a a
x
(b)
14
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BLANK PAGE
15
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16
STANDARD INTEGRALS
x dxn
x n x n
xdx x x
e dxa
e a
axdxa
ax a
axdxa
ax a
ax dxa
ax a
ax ax dx a ax
n n
ax ax
= +
=
=
=
=
=
+11
1 0 0
10
10
10
10
10
1
1
2
, ;
ln ,
,
cos sin ,
sin cos ,
sec tan ,
sec tan sec ,
, if
aa
a xdx
a
x
aa
a xdx
x
aa a x a
x adx x x a x a
x adx x x a
x x xe
+=
= > < >
+
= + +( )
=
0
1 10
10
1 0
1
2 21
2 2
1
2 2
2 2
2 2
2 2
tan ,
sin , ,
ln ,
ln
ln log ,NOTE : >> 0