HSC 2013 MX2 Marathon (archive) (6 Viewers)

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RealiseNothing

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Re: HSC 2013 4U Marathon

Here's what I did which ended up wrong (I think?)

Since one root is , the other must be

So we get:





Using:

and adding the two equation together we obtain:



Using the identity:



We get a quadratic in which when solved using the quadratic formula gives:

or

Now the first solution works for all , but the second solution doesn't as for certain values of A within the domain of

Hence solving for A:





Which is a different result to

(note I forgot to add the fact that )

What's wrong with this solution?
2nd last line.
 

bleakarcher

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Re: HSC 2013 4U Marathon

I stated that they were lol (well it was a late edit lol).
Well, by conjugate root theorem, the modulus has to be 1 given the roots are non-real anyway. Say some non-real number a is a root of x^2+Ax+1=0 then conjugate(a) is a root. But 1/a is also a root. => conjugate(a)=1/a <=> lal=1
 

seanieg89

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Re: HSC 2013 4U Marathon

oh okay, that makes the question trivial then, roots must be conjugates and for some theta in (0,pi). The range of A follows.
 

RealiseNothing

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Re: HSC 2013 4U Marathon

oh okay, that makes the question trivial then, roots must be conjugates and for some theta in (0,pi). The range of A follows.
But how come my solution gives a range of A that is wrong?
 

RealiseNothing

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Re: HSC 2013 4U Marathon

Well, by conjugate root theorem, the modulus has to be 1 given the roots are non-real anyway. Say some non-real number a is a root of x^2+Ax+1=0 then conjugate(a) is a root. But 1/a is also a root. => conjugate(a)=1/a <=> lal=1
True, I don't even have to state it has a modulus of 1 I guess.
 

seanieg89

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Re: HSC 2013 4U Marathon

It's probably some small calculation error along the way, because that method should work right?
Well yeah, but its just a roundabout way of getting to the same A=-2cos(theta).
 

RealiseNothing

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Re: HSC 2013 4U Marathon

Well yeah, but its just a roundabout way of getting to the same A=-2cos(theta).
I wanted to try and make the question so that the polynomial was to the n'th degree, but it seemed to be a lot messier and harder, so I stuck with a quadratic.
 

bleakarcher

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Re: HSC 2013 4U Marathon

oh okay, that makes the question trivial then, roots must be conjugates and for some theta in (0,pi). The range of A follows.
sean, one question bro, how do you know (0,pi) is open and not [0,pi]?
 

bleakarcher

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Re: HSC 2013 4U Marathon

Show that:

The only way I can think of is mathematical induction. Also, when n=1,
LHS=[sin(θ)+sin(θ)[1-sin(θ)]]/[2-2cos(θ)]=sin(θ)[2-sin(θ)]/[2-2cos(θ)]
RHS=sin(θ)
LHS=/=RHS

Maybe your formula is wrong?
 

RealiseNothing

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Re: HSC 2013 4U Marathon

The only way I can think of is mathematical induction. Also, when n=1,
LHS=[sin(θ)+sin(θ)[1-sin(θ)]]/[2-2cos(θ)]=sin(θ)[2-sin(θ)]/[2-2cos(θ)]
RHS=sin(θ)
LHS=/=RHS

Maybe your formula is wrong?
Probably, it worked when I put in and so i assumed it was right for any values (cos what are the odds of it working for a random value I choose lol).

edit: ok I have no idea where I went wrong, and the working out is too annoying to check, basically what I tried to do was find a closed form for:



Some one else might be able to get it.
 
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bleakarcher

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Re: HSC 2013 4U Marathon

Probably, it worked when I put in and so i assumed it was right for any values (cos what are the odds of it working for a random value I choose lol).

edit: ok I have no idea where I went wrong, and the workin out is too annoying to check, basically what I tried to do was find a closed form for:



Some one else might be able to get it.
lol, it always comes to probability with you, doesn't it haha..
 
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bleakarcher

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Re: HSC 2013 4U Marathon

I'm going to keep thinking about it. Got nothing so far.
 
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