Preliminary mathematics marathon (2 Viewers)

hscishard · Apr 17, 2010

What is your final answer?

hscishard · Apr 18, 2010

hscishard said:
Sorry exploit, I got a trig question. How can you show in b i) without using the double angle forumale?

ohexploitable · Apr 18, 2010

This marathon ain't so good cos liek most ppl haven't done as much as us, liek my school has only done basic algebra, and geometry.

ohexploitable · Apr 18, 2010

Liek the only people who have posted is me, you, 2010ers and ppl who have already done the HSC.

mitchy_boy · Apr 18, 2010

New question?

LM and FG are two chords of the circle at right angles to each other, and they intersect at P. From P, a line perpendicular to GM is drawn, meeting it at S. SP is produced to meet LF at T.

a) Show that ∆ LTP is isosceles.
b) Show that T is the midpoint of LF.

hscishard · Apr 18, 2010

ohexploitable said:
Liek the only people who have posted is me, you, 2010ers and ppl who have already done the HSC.

You're right.

party · Apr 18, 2010

ohexploitable said:
This marathon ain't so good cos liek most ppl haven't done as much as us, liek my school has only done basic algebra, and geometry.

yeah your right

Drongoski · Apr 18, 2010

mitchy_boy said:
New question?

LM and FG are two chords of the circle at right angles to each other, and they intersect at P. From P, a line perpendicular to GM is drawn, meeting it at S. SP is produced to meet LF at T.

a) Show that ∆ LTP is isosceles.
b) Show that T is the midpoint of LF.

Let angle LFG = A
and angle FLM = B

,: A + B = 90 deg (since in triangle LPF angle LPF = 90 deg)

.: angle LMG = angle LFG = A (angles on same chord LG)
& angle FGM = angle FLM = B (angles on same chord MF)

.: angle SPM = B (angle PSM = 90 deg)

.: angle LPT = angle SPM = B (vert opp angles)

.: angle TLP = B = angle LPT in triangle LTP

.: triangle LTP is isosceles

Similarly in triangle GPS, angle GPS = A (angle PSG = 90 deg)
.: angle TPF = angle GPS = A (vert opp angles)
.: in triangle TFP, angle TPF = A = angle TFP
i.e TPF is an isosceles triangle
.: PT = TF
but TP = LT
.: PT = TF

i.e. T is mid-point of LF

QED

Edit

Didn't realise this is a marathon question; can someone pl post a question for me.

ohexploitable · Apr 18, 2010

Didn't realise this is a marathon question; can someone pl post a question for me.

hscishard said:
Sorry exploit, I got a trig question. How can you show in b i) without using the double angle forumale?

.

frenzal_dude · Apr 18, 2010

ohexploitable said:
$\begin{align*} \text{Let the sides of the triangle = }x \\\text{Let the shorter sides of the rectangle = }y \end{align*}$

$\begin{align*} \therefore 3x+8y&=70 \\y&=\frac{70-3x}{8} \end{align*}$

$\begin{align*} A_{tri}&=\frac{\sqrt{3}x^{2}}{4} \\A_{rect}&=\frac{3(70-3x)}{64} \\A&=\frac{\sqrt{3}x^{2}}{4}+\frac{3(70-3x)}{64} \end{align*}$

Then make it into a general quadratic expression and find the minimum value of the parabola.

What's the final answer? I got 34.45 and 35.46.

hscishard · Apr 19, 2010

frenzal_dude said:
What's the final answer? I got 34.45 and 35.46.

Hi 5!

mitchy_boy · Apr 19, 2010

Drongoski said:
Let angle LFG = A
and angle FLM = B

,: A + B = 90 deg (since in triangle LPF angle LPF = 90 deg)

.: angle LMG = angle LFG = A (angles on same chord LG)
& angle FGM = angle FLM = B (angles on same chord MF)

.: angle SPM = B since angle PSM = 90 deg

.: angle LPT = angle SPM = B (vert opp angles)

.: angle TLP = B = angle LPT in triangle LTP

.: trangle LTP is isosceles

Similarly in triangle GPS, angle GPS = A since angle PSG = 90 deg
.: angle TPF = angle GPS = A (vert opp angles)
.: in triangle TFP, angle TPF = A = angle TFP
i.e TPF is an isosceles triangle
.: PT = TF
but TP = LT
.: PT = TF

i.e. T is mid-point of LF

QED

Edit

Didn't realise this is a marathon question; can someone pl post a question for me.

Woah that was ext2 harder ext1 question. I don't have time to go through now but I think you might have hit it on the head. Nice work man.

hscishard · Apr 19, 2010

Why would you post that on a prelim? Lol

That is pretty hard

ohexploitable · Apr 22, 2010

New Question:

Differentiate:

$f(x)=\sqrt[3]{(3x+5)(2x-7)^{2}}$

Drongoski · Apr 22, 2010

Trebla · Apr 22, 2010

Very tempting to do that one above using logarithmic differentiation....

Have you Prelimers done series? I have a nice series question here:

$$Suppose that an infinite series is given by : $\\\\S=\dfrac{2}{3}+\dfrac{5}{3^2}+\dfrac{8}{3^3}+....\\\\$Find the value of $S$\\\\\left (Hint: consider \: \dfrac{1}{3}S \right )$

Otherwise, another one from differential calculus:

The tangent to the hyperbola xy = k at the point P(x₁, y₁) cuts the x-axis at X and the y-axis at Y. Show that the area of triangle OXY is constant.

hscishard · Apr 22, 2010

Trebla said:
Very tempting to do that one above using logarithmic differentiation....

Have you Prelimers done series? I have a nice series question here:

$$Suppose that an infinite series is given by : $\\\\S=\dfrac{2}{3}+\dfrac{5}{3^2}+\dfrac{8}{3^3}+....\\\\$Find the value of $S$\\\\\left (Hint: consider \: \dfrac{1}{3}S \right )$

Otherwise, another one from differential calculus:

The tangent to the hyperbola xy = k at the point P(x₁, y₁) cuts the x-axis at X and the y-axis at Y. Show that the area of triangle OXY is constant.

I'll try the second one.
f'(x) = -k/x^2

Therefore tangent is
$y= -\frac{k}{x_{1}^{2}}(x-x_{1})+y_{1}$
y-intercept:
$y= \frac{k}{x_{1}} + y_{1}$
x intercept
$x_{1}(1+x_{1}/k)$

Area of triangle = 1/2AB
B is perp height.
$=x_{1}/2(\frac{k}{x_{1}}+y_{1})(1+\frac{x_{1}}{k})$

k is a constant and points of P(x1,y1) are also constants.
Therefore area is constant?

Edit: Oh For the first one, I think S = 7/4 (calculator LOL)

ohexploitable · Apr 23, 2010

I think P is any point on the curve, so not constant.

nikkifc · Apr 23, 2010

hscishard said:
I'll try the second one.
f'(x) = -k/x^2

Therefore tangent is
$y= -\frac{k}{x_{1}^{2}}(x-x_{1})+y_{1}$
y-intercept:
$y= \frac{k}{x_{1}} + y_{1}$
x intercept
$x_{1}(1+x_{1}/k)$

Area of triangle = 1/2AB
B is perp height.
$=x_{1}/2(\frac{k}{x_{1}}+y_{1})(1+\frac{x_{1}}{k})$

k is a constant and points of P(x1,y1) are also constants.
Therefore area is constant?

P is not a constant lol. You need to use the condition (ie. xy=k) since you are not using parametrics.

And Trebla, this is a typical 4U conics question isn't it? It's a bit mean asking it to the prelimers

ohexploitable · Apr 23, 2010

Trebla said:
Otherwise, another one from differential calculus:

The tangent to the hyperbola xy = k at the point P(x₁, y₁) cuts the x-axis at X and the y-axis at Y. Show that the area of triangle OXY is constant.

I was thinking of like a logical approach...

A = 1/2 ab

height = y
length = x

xy=k

therefore A = 1/2 k

since k is constant, area is constant

amirite?

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