HSC 2015 MX2 Marathon ADVANCED (archive) (1 Viewer)

FrankXie · Jan 7, 2015

Re: HSC 2015 4U Marathon - Advanced Level

no the angle between a fixed line and a fixed plane is a constant, which is defined as the angle between this line and its projection onto the plane.

braintic · Jan 8, 2015

Re: HSC 2015 4U Marathon - Advanced Level

Sy123 said:
so R is only 1 point on the plane (rather than a circle on the plane p)

Is Q allowed to lie on the normal to the plane at P?
In that particular case, don't you get a circle (with radius equal to the height of Q above the plane)?

Sy123 · Jan 8, 2015

Re: HSC 2015 4U Marathon - Advanced Level

FrankXie said:
no the angle between a fixed line and a fixed plane is a constant, which is defined as the angle between this line and its projection onto the plane.

Oh well I meant any line that lies on the plane

Sy123 · Jan 8, 2015

Re: HSC 2015 4U Marathon - Advanced Level

braintic said:
Is Q allowed to lie on the normal to the plane at P?
In that particular case, don't you get a circle (with radius equal to the height of Q above the plane)?

Oh ok yea that's another solution then

FrankXie · Jan 8, 2015

Re: HSC 2015 4U Marathon - Advanced Level

braintic said:
Is Q allowed to lie on the normal to the plane at P?
In that particular case, don't you get a circle (with radius equal to the height of Q above the plane)?

This solution is included in my solution, which is the case where \alpha=90degree, and the maximum is square root of 2, when R lies on the circle.

dan964 · Jan 8, 2015

Re: HSC 2015 4U Marathon - Advanced Level

just for something interesting
which I don't know what it'll look like
sketch the locus of
|z| = arg (z)

seanieg89 · Jan 8, 2015

Re: HSC 2015 4U Marathon - Advanced Level

dan964 said:
just for something interesting
which I don't know what it'll look like
sketch the locus of
|z| = arg (z)

It's just an anticlockwise spiral. You could use calculus to tell you what the gradient of the start of the curve at (0,0) is.

braintic · Jan 8, 2015

Re: HSC 2015 4U Marathon - Advanced Level

Sy123 said:
$\\ $Let$ \ P \ $be a point on the plane$ \ p \ $and$ Q \ $is a fixed point in space that does not lie on$ \ p \\ \\ $Find all points$ \ R \ $on the plane$ \ p \ $such that$ \\ \\ \frac{PR + PQ}{QR} \ $is a maximum$$

If H is the foot of the perpendicular to the plane, I believe the point R we are looking for lies on PH produced such that PQ=PR.
Is that correct?

In any case, it is definitely not H.

braintic · Jan 8, 2015

Re: HSC 2015 4U Marathon - Advanced Level

Sy123 said:
$\\ $Let$ \ P \ $be a point on the plane$ \ p \ $and$ Q \ $is a fixed point in space that does not lie on$ \ p \\ \\ $Find all points$ \ R \ $on the plane$ \ p \ $such that$ \\ \\ \frac{PR + PQ}{QR} \ $is a maximum$$

My solution: View attachment 3D Maximisation.pdf

Sy123 · Jan 10, 2015

Re: HSC 2015 4U Marathon - Advanced Level

$\\ $Solve the equation$ \ \cos^2(x) + \cos^2(2x) + \cos^2(3x) = 1$

Kaido · Jan 10, 2015

Re: HSC 2015 4U Marathon - Advanced Level

(c=cos) (k=desired integer)
c^2x+(2c^2x-1)^2+(4c^3x-3cx)^2=1
->c^2x(16c^4x-20c^2x+6)=0 (expand and factorise)

c^2x=0; x=pi/2 (+kpi)

->16c^4x-20c^2x+6=0
Let c^2x=m
->16m²-20m+6=0 (solve for m, resub c and yeah...)

x=pi/6,-pi/6,pi/4,-pi/4,5pi/6,-5pi/6,3pi/4,-3pi/4 (+k2pi)

(Am tired atm, check my solutions and correct me lol)

dan964 · Jan 10, 2015

Re: HSC 2015 4U Marathon - Advanced Level

tried doing it with cosine, but stuffed up somewhere in my working. So this is the question redone using sine.

can someone else post the next question, all mine are either predictable or have errors in them.

HeroicPandas · Jan 10, 2015

Re: HSC 2015 4U Marathon - Advanced Level

(not mine)

Sy123 · Jan 11, 2015

Re: HSC 2015 4U Marathon - Advanced Level

Kaido said:
(c=cos) (k=desired integer)
c^2x+(2^2x-1)^2+(4c^3x-3cx)^2=1
->c^2x(16c^4x-20c^2x+6)=0 (expand and factorise)

c^2x=0; x=pi/2 (+kpi)

->16c^4x-20c^2x+6=0
Let c^2x=m
->16m²-20m+6=0 (solve for m, resub c and yeah...)

x=pi/6,-pi/6,pi/4,-pi/4,5pi/6,-5pi/6,3pi/4,-3pi/4 (+k2pi)

(Am tired atm, check my solutions and correct me lol)

dan964 said:
tried doing it with cosine, but stuffed up somewhere in my working. So this is the question redone using sine.

can someone else post the next question, all mine are either predictable or have errors in them.

My solution was:

$\cos^2 x + \cos^2 (2x) + \cos^2 (3x) = \frac{1}{2} (3 + \cos (2x) + \cos (4x) + \cos (6x)) = \frac{1}{2} (3 + \cos (4x) + 2\cos (2x) \cos (4x)) = 1$

Which can be solved easily by re-arranging and taking cos(4x) common

FrankXie · Jan 11, 2015

Re: HSC 2015 4U Marathon - Advanced Level

Sy123 said:
My solution was:

$\cos^2 x + \cos^2 (2x) + \cos^2 (3x) = \frac{1}{2} (3 + \cos (2x) + \cos (4x) + \cos (6x)) = \frac{1}{2} (3 + \cos (4x) + 2\cos (2x) \cos (4x)) = 1$

Which can be solved easily by re-arranging and taking cos(4x) common

How? Note that you have constant term other than zero.

seanieg89 · Jan 11, 2015

Re: HSC 2015 4U Marathon - Advanced Level

FrankXie said:
How? Note that you have constant term other than zero.

If u is cos(2x), this equation is cubic in u with zero constant coefficient.

FrankXie · Jan 11, 2015

Re: HSC 2015 4U Marathon - Advanced Level

seanieg89 said:
If u is cos(2x), this equation is cubic in u with zero constant coefficient.

This way I knew. but I thought Sy meant something else?

Chlee1998 · Jan 16, 2015

Re: HSC 2015 4U Marathon - Advanced Level

Since no one has psoted a new question, here's one:

given A+B+C+D = 4, prove that 4/(ABCD) >= A/B +B/C + C/D + D/A

dan964 · Jan 16, 2015

Re: HSC 2015 4U Marathon - Advanced Level

I would first group RHS on common denominator.
then it would be heaps easier

InteGrand · Jan 16, 2015

Re: HSC 2015 4U Marathon - Advanced Level

Chlee1998 said:
Since no one has psoted a new question, here's one:

given A+B+C+D = 4, prove that 4/(ABCD) >= A/B +B/C + C/D + D/A

I think we need to assume that $A, B, C, D > 0$ , because the inequality does not always hold otherwise (e.g if $A = -0.001, B = 1.001, C = 1.5, D = 1.5$ ).

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