HSC Mathematics Marathon (8 Viewers)

Drongoski · Feb 13, 2011

jyu said:
New question:

Show
(sinx+sin3x+sin5x+sin7x+sin9x)/(cosx+cos3x+cos5x+cos7x+cos9x) = tan5x

LHS

$= \frac {(sinx + sin9x) + (sin3x + sin7x) + sin5x} {(cosx + cos9x) + (cos3x + cos7x) + cos5x}$

$= \frac {2 sin\frac {x+9x}{2} cos \frac{x-9x}{2}+ 2sin \frac {3x+7x}{2} cos \frac {3x-7x}{2} + sin5x} {2cos \frac{x+9x}{2}cos \frac{x-9x}{2} + 2cos \frac{3x+7x}{2} cos\frac {3x-7x}{2} + cos5x}$

$= \frac{ 2sin5xcos4x +2sin5xcos2x + sin5x} {2cos5xcos4x + 2cos5xcos2x + cos5x}$

$= \frac{sin5x[2cos4x + 2cos2x +1]}{cos5x[2cos4x + 2cos2x + 1]}$

$= \frac {sin5x}{cos5x}$

$= tan5x$

ohexploitable · Feb 13, 2011

Drongoski, are those identities in the HSC course?

I'm talking about,
$\sin \theta \pm \sin \varphi = 2 \sin\left( \frac{\theta \pm \varphi}{2} \right) \cos\left( \frac{\theta \mp \varphi}{2} \right)$
etc.

ninetypercent · Feb 13, 2011

^ yes and no. typical exam questions will have part (i) to show the identity and then in part (ii) you use it

ohexploitable · Feb 13, 2011

Anyway, new question:

"hscishard" and "bored of fail", you're not allowed to answer this

hscishard · Feb 13, 2011

Lol. Good luck to whoever attempts that question ^

4025808 · Feb 13, 2011

ohexploitable said:
Drongoski, are those identities in the HSC course?

I'm talking about,
$\sin \theta \pm \sin \varphi = 2 \sin\left( \frac{\theta \pm \varphi}{2} \right) \cos\left( \frac{\theta \mp \varphi}{2} \right)$
etc.

it used to be in the syllabus but they took it off...
nevertheless it's still useful to learn esp in trig expansion

Drongoski · Feb 13, 2011

ninetypercent said:
^ yes and no. typical exam questions will have part (i) to show the identity and then in part (ii) you use it

Yes = not directly. But if I were doing Ext 2 I will try to add it to my arsenal. Useful in some of the messier derivations in conics (see P89, Cambridge 4U book)

jyu · Feb 13, 2011

jyu said:
New question:

Show
(sinx+sin3x+sin5x+sin7x+sin9x)/(cosx+cos3x+cos5x+cos7x+cos9x) = tan5x

This question does not require the use of those formulas.

AAEldar · Feb 13, 2011

ohexploitable said:
Anyway, new question:

"hscishard" and "bored of fail", you're not allowed to answer this

I'll give it a crack. I remember seeing your solution/hscishard's solution (whichever one of you uploaded the handwritten answer) but can't really remember it LOL. Might not end well.

ohexploitable · Feb 13, 2011

AAEldar said:
I'll give it a crack. I remember seeing your solution/hscishard's solution (whichever one of you uploaded the handwritten answer) but can't really remember it LOL. Might not end well.

It was mine

jyu · Feb 13, 2011

ohexploitable said:
Anyway, new question:

"hscishard" and "bored of fail", you're not allowed to answer this

Trebla · Feb 13, 2011

Find

$\displaystyle\int\dfrac{1-\sin^{10}x}{\cos x}\,dx$

jyu · Feb 13, 2011

Trebla said:
Find

$\displaystyle\int\dfrac{1-\sin^{10}x}{\cos x}\,dx$

Factorise: 1-(sinx)^10=(1-(sinx)^2)(1+(sinx)^2+(sinx)^4+(sinx)^6+(sinx)^8)
=(cosx)^2 (1+(sinx)^2+(sinx)^4+(sinx)^6+(sinx)^8)

integ (cosx)(1+(sinx)^2+(sinx)^4+(sinx)^6+(sinx)^8) dx

let u=sinx etc.

integ (1+u^2+u^4+u^6+u^8) du etc.

Trebla · Feb 13, 2011

Nice work...though I was hoping someone would pick it up more in the lines of a geometric series

$\noindent\dfrac{1-\sin^{10}x}{\cos x}=\dfrac{\cos x(1-\sin^{10}x)}{\cos^2x}\\\\=\dfrac{\cos x(1-(\sin^2x)^5)}{1-\sin^2x}\\\\=\cos x+\cos x\sin^2x+\cos x\sin^4x+\cos x\sin^6x+\cos x\sin^8x$

hscishard · Feb 13, 2011

Why are uni students dominating this thread?

ohexploitable · Feb 13, 2011

hscishard said:
Why are uni students dominating this thread?

I've noticed that too...

Drongoski · Feb 14, 2011

Trebla said:
Nice work...though I was hoping someone would pick it up more in the lines of a geometric series

$\noindent\dfrac{1-\sin^{10}x}{\cos x}=\dfrac{\cos x(1-\sin^{10}x)}{\cos^2x}\\\\=\dfrac{\cos x(1-(\sin^2x)^5)}{1-\sin^2x}\\\\=\cos x+\cos x\sin^2x+\cos x\sin^4x+\cos x\sin^6x+\cos x\sin^8x$

Trebla

Interesting question & beautiful solution. I thought I knew how to integrate. Ends up similar to jyu's.

UnrealAnchovies · Feb 14, 2011

Trebla said:
Find

$\displaystyle\int\dfrac{1-\sin^{10}x}{\cos x}\,dx$

What's the likelihood of that appearing in the 4U HSC exam?

cutemouse · Feb 14, 2011

UnrealAnchovies said:
What's the likelihood of that appearing in the 4U HSC exam?

Probably like 15% I'd say...

jyu · Feb 14, 2011

very likely with a hinting question beforehand

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