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HSC 2014 MX2 Marathon (archive) (1 Viewer)

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dunjaaa

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Re: HSC 2014 4U Marathon

(i) Can be proven using vectors, I've answered this before so I'll let someone else have a go
(ii) Basic circle geometry; you get a(Ɵ)=sqrt[2(1-cos(Ɵ))] and b(Ɵ)=sqrt[2(1+cos(x))], hence a(Ɵ)/b(Ɵ) turns out to be tan(Ɵ/2). Integrating we obtain the required result
(iii)We can deduce that the arg(z+1)=Ɵ/2 (ext. angle of a triangle is = to the sum of the two opposite int. angles). Therefore the locus of arg(z+1)=Ɵ/2 is a ray with equation y=tan(Ɵ/2)(x+1) for x>-1 and y>0. Thus, P(ω)=itan(Ɵ/2).
 

dunjaaa

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Re: HSC 2014 4U Marathon

Screen shot 2014-04-29 at 8.04.30 PM.png
(iii) Let u=tan(x) and you get the required result
(iv) Hint for this part
(v) Im guessing as n approaches infinity the integral approaches 0 with the use of part (iv)
 

Davo_01

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Re: HSC 2014 4U Marathon

Prove that



Where contains n terms, with the term having k digits, each of them being 8.
 

VBN2470

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Re: HSC 2014 4U Marathon

The function is not defined for . Is there a value that could be given for that would make the function continuous at 2? Give reasons for your answer.
Bump!
 

emilios

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Re: HSC 2014 4U Marathon

God damn dunja some of your solutions are crazy. Are you aiming for a state rank? I think you've got a good chance.
 

dunjaaa

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Re: HSC 2014 4U Marathon

(i) Prove that for any point along the y-axis, there is exactly two normals that can drawn to the hyperbola xy=c^2
(ii) Hence, explain why it is impossible to have 3 normals drawn from an arbitrary point to the hyperbola in the x-y plane
 

dunjaaa

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Re: HSC 2014 4U Marathon

Highly doubt it, there are many people who are better than me. All you can do is work hard I guess :D
 

TL1998

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Re: HSC 2014 4U Marathon

View attachment 30177
The altitudes AP and BQ in an acute-angled triangle ABC meet at H. AP produced cuts the circle through A, B and C at K.
Prove that HP = PK.
I don't think anyone answered this so i'll answer it.

Angle BKP = Angle BCA (subtended by same arc)
Angle BCA = Angle BHK (exterior angle of cyclic quad)
BP is common, and Angle BPH and Angle BPK are both 90

So triangle BPK is congruent to triangle BHP.

Thus HP = PK (corresponding sides on congruent triangles)

not difficult but can't leave a question unanswered.
 

dunjaaa

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Re: HSC 2014 4U Marathon

Part 1 Screen shot 2014-05-16 at 12.23.04 AM.png and Part 2 Screen shot 2014-05-16 at 12.24.33 AM.png, I suck at inequality proving, but this is what I manage to salvage
 

mathing

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Re: HSC 2014 4U Marathon

dunjaaa not sure if what you wrote is correct, it's a bit difficult for me to follow all your steps.
 
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