2008 Independent Trial (1 Viewer)

tommykins

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回复: Re: 2008 Independent Trial

Trebla said:
8a)i)
The equation of the tangent is y = x + 1 (check by differentiation)
So the length of CK is the y-value of the tangent at x = k which is k + 1
The area of trapezium OACK = k(1 + k + 1)/2 = k(k+2)/2
The area of trapezium OABK = k(ek + 1)/2
Actual area under the curve is ∫0kexdx = ek - 1
area of trapezium OACK < Actual area under the curve < area of trapezium OABK
=> k(k+2)/2 < ek - 1 < k(ek + 1)/2
Let k = 1
3/2 < e - 1 < (e + 1)/2
Taking the LHS of inequality: 3/2 < e - 1 => 2.5 < e
Taking the RHS of inequality: e - 1 < (e + 1)/2
=> 2e - 2 < e + 1
=> e < 3
.: 2.5 < e < 3
That was a great question, was in my trials (i didn't do the full independant paper) although i didn't get the full 4 marks because i didn't let k = 1 :mad:

Forbidden. said:
Holy fuck have you people from MX2 ever been able to answer every single question in a MX2 paper in time?
Yeah, I've never ran out of time for MX2.
 

m000

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Re: 回复: Re: 2008 Independent Trial

tommykins said:
That was a great question, was in my trials (i didn't do the full independant paper) although i didn't get the full 4 marks because i didn't let k = 1 :mad:



Yeah, I've never ran out of time for MX2.
You must be topping MX2 at your school then?
 

friction

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Re: 回复: Re: 2008 Independent Trial

Ive only recently been not running out of time now that i have been practicing.
 

tommykins

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回复: Re: 回复: Re: 2008 Independent Trial

m000 said:
You must be topping MX2 at your school then?
Nope, we have too many freaks :( 6/34 is my ranking though.
 

friction

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Re: 回复: Re: 回复: Re: 2008 Independent Trial

What have people been getting on this test ??
 

friction

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Re: 回复: Re: 回复: Re: 2008 Independent Trial

I got 104.
 

m000

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Which 4U maths paper did you find the hardest?
 

tommykins

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回复: Re: 2008 Independent Trial

1983.
 

m000

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Would you be able to scan the 1983 paper and load it onto this thread???? possibly with answers too (otherwise for me, it would be useless without it)???? pretty please????:karate:
 

tommykins

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回复: Re: 2008 Independent Trial

nah can't do that, i returned all the papers to my tutor already.

sorry mate.
 

m000

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buchanan said:
Here's the 1983 HSC paper:
Actually, this link doesn't work...
All the questions are just lines of dots!
Oh well...
 

jeremychung

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m000 said:
Actually, this link doesn't work...
All the questions are just lines of dots!
Oh well...
It works for me. I'll copy and paste it. (No answers though :()

Ah the diagrams don't come out.

NSW HSC 4 Unit Mathematics Examination 1983
1. (i)​
Draw a careful sketch of the curve y = x2

x​
21 , indicating clearly any vertical
or horizontal asymptotes, turning points or inflexions.

(ii)​
A function f(x) is known to approach 0 as x appoaches!and −!. Its derivative
is given by
f"(x) = ex2 (x 1)2(2 x).

From this information, describe the behaviour of​
f(x) as x increases from −! to
+
!. Include in your description an indication of those x where f(x) is respectively
increasing or decreasing and any points where
f has a maximum or minimum value.
Also explain why
f(x) must be positive for all real x.
Draw a sketch of a function
f(x) satisfying the given conditions.

2. (i)​
Find: (a) !

#​
3
0

x​
+12

x​
2+9 dx (b) !2
1
60x3(1 + x2)4 dx

(c)​
!T

0​
xe(x/2) dx, where T is a positive number.

(ii)​
Find the partial fraction decomposition of 16x
x
416 . Hence show that

!​
6
4
16
x
x
416 dx = loge(4/3), and also evaluate !1
0
16
x
x
416 dx.

3.​
Use mathematical induction to prove that for any real !, cos 6! + i sin 6! =
(cos
! + i sin !)6.

Find the six sixth roots of​
1, expressing each in the form x + iy with x, y real.
Find also the four roots of the equation
z4 z2 +1 = 0, and indicate their positions
on an Argand diagram.

4. (i)​
Determine the (real) values of " for which the equation x2

4​
! + y2

2​
! = 1 defines
respectively an ellipse and an hyperbola.
Sketch the curve corresponding to the value
" = 1.

Describe how the shape of this curve changes as​
" increases from 1 towards 2. What
is the limiting position of the curve as 2 is approached?

(ii)​
P is a point on the ellipse x2

a​
2 + y2

b​
2 = 1 with centre O. A line drawn from O,
parallel to the tangent to the ellipse at
P, meets the ellipse at Q.
Prrove that the area of the triangle
OPQ is independent of the position of P.

5. (i)​
An egg-timer has the shape of an hour-glass and can be described mathematically
as being obtained by rotating the curve
y = x+6x3,1/#2 $ x $ 1/#2,
about the
y-axis.
Use the method of decomposition into cylindrical shells to calculate its volume,
correct to three significant figures.

9​
(ii)​
A plane curve is defined implicitly by the equation x2 + 2xy + y5 = 4.

This curve has a horizontal tangent at the point​
P(X, Y ). Show that X is the unique
real root of the equation
X5 + X2 + 4 = 0, and that 2 < X < 1.

6.​
An object of irregular shape and of mass 100 kilograms is found to experience
a resistive force, in newtons, of magnitude one-tenth the square of its velocity in
metres per second when it moves through the air.
If the object falls from rest under gravity, assumed constant of value 9
.8 m.s2,
calculate

(i)​
its terminal velocity;

(ii)​
the minimum height, to the nearest metre, of the release point above ground, if
it attains a speed of 80% of its terminal velocity before striking the ground.

7. (i)​
A city council consists of 6 Liberal and 5 Labor aldermen, from whom a
committee of 5 members is chosen at random. What is the probability that the
Liberals have a majority on the committee?

(ii)​
Let #, $, % be the roots of the equation x3 +qx+r = 0, where r %= 0. Obtain as
functions of
q, r in their simplest forms, the coefficients of the cubic equations whose
roots are:

(a)​
#2, $2, %2; (b) #1, $1, %1; (c) #2, $2, %2.

(iii)​
Given that x + y = s, prove that, for x > 0, y > 0, s > 0, 1x

+​
1

y​
& 4s

,​
and that

1​
x​
2 + 1

y​
2 & 8

s​
2 .

8. (i)​
Given sin x sin y = 1!2(cosA cosB), find A,B in terms of x, y. Hence prove
that for any positive integer
n,

sin​
x + sin 3x + sin 5x + · · · + sin(2n 1)x = sin2 nx/ sin x.

(ii)​
In a triangle ABC, the point X on BC is such that AX bisects !BAC. Use
the sine rule to prove that
AB/AC = BX/XC.

In the figure,​
XY represents a vertical
flagsta
ff of length a placed on top of a
vertical tower
AY of height b. An observer
is at a point
O, which is a vertical height h

above​
B, and a horizontal distance d from

A​
. Given that !XOY = !Y OA, show that

(
a b)d2 = (a + b)b2 2b2h (a b)h2.
 

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