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HSC 2016 MX2 Marathon ADVANCED (archive) (1 Viewer)

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lita1000

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Re: HSC 2016 4U Marathon - Advanced Level

second part


Alternatively, prove that if n is true, n+6 is true, then show trivially that it is true for the first six natural numbers and draw your conclusion from there.
 
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Sy123

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Re: HSC 2016 4U Marathon - Advanced Level

Yep, well done

My solution was pretty much the same (I'll write it out in case people can't read your solution)













 

lita1000

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Re: HSC 2016 4U Marathon - Advanced Level

Yep, well done

My solution was pretty much the same (I'll write it out in case people can't read your solution)













I know that this is a mere typo, but ur last statement about a,b, and c being necessarily rational isn't quite right. Perhaps a different notation would fix the problem :D

Just really nit picking here
 

Sy123

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Re: HSC 2016 4U Marathon - Advanced Level

I know that this is a mere typo, but ur last statement about a,b, and c being necessarily rational isn't quite right. Perhaps a different notation would fix the problem :D

Just really nit picking here
Right, my bad, instead:







(or, -(a+b+c) is the co-efficient of x^2 in p which is rational, and so (a+b+c) is rational, and so p(a+b+c) is rational and so is the above expression)
 

lita1000

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Re: HSC 2016 4U Marathon - Advanced Level

Sy, can you post some difficult questions like you usually do? I know that you stepped the difficulties down a little for your last couple of questions lol
 

Sy123

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Re: HSC 2016 4U Marathon - Advanced Level

This is a good one that I just did:



I don't know if you consider this difficult enough
 

VBN2470

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Re: HSC 2016 4U Marathon - Advanced Level

This is a good one that I just did:



I don't know if you consider this difficult enough
I got one solution to be for , but I don't know if that's all the possible solutions.
 

Sy123

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Re: HSC 2016 4U Marathon - Advanced Level

I got one solution to be for , but I don't know if that's all the possible solutions.
I got that too (with p(x) = 0) but I managed to show that it was the only possible solution
 

Paradoxica

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Re: HSC 2016 4U Marathon - Advanced Level

I got one solution to be for , but I don't know if that's all the possible solutions.
Try contradiction. Everything you need to know is given to you, all you need to do is make a few assumptions about P(x)
 

Sy123

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Re: HSC 2016 4U Marathon - Advanced Level

Something a little easier:

 

VBN2470

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Re: HSC 2016 4U Marathon - Advanced Level

Something a little easier:

For The square of an even number is always divisible by 4 and so no number of the form , where is a positive integer, can be a perfect square.

For , since this always odd for any positive integer , for it to be square it must be the square of another odd number (say) for some positive integer . Suppose that is a perfect square. Then which is a contradiction since and are always positive integers. Therefore no number of that form can be expressed as a perfect square.
 

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Re: HSC 2016 4U Marathon - Advanced Level

Show that no integer of the form 9k + 4 or 9k + 5 can be expressed as the sum of three integer cubes. (Taken from a recent Numberphile video)
 

Sy123

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Re: HSC 2016 4U Marathon - Advanced Level

Yep that's the idea, but to clean up the solution, it should be noted that if we started with then we possibly will not get an infinite chain if we kept squaring it.

But, suppose that is a root, then substitute into the equation:

Since (as the root must have modulus 1), then:



And then we are off again with infinitely many solutions unless we can guarantee no infinite chain results

Therefore, the only roots to the polynomial can be of the form:



Where also, applying the mapping and must all form finite sequences





 
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simpleetal

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Re: HSC 2016 4U Marathon - Advanced Level

Yep that's the idea, but to clean up the solution, it should be noted that if we started with then we possibly will not get an infinite chain if we kept squaring it.

But, suppose that is a root, then substitute into the equation:

Since (as the root must have modulus 1), then:



And then we are off again with infinitely many solutions unless we can guarantee no infinite chain results

Therefore, the only roots to the polynomial can be of the form:



Where also, applying the mapping and must all form finite sequences





When I said in my solution that you could show that the complex roots satisfying this condition had imaginary part =0, I meant exactly what you had outlined in your post (showing that theta=0)
 

InteGrand

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Re: HSC 2016 4U Marathon - Advanced Level

When I said in my solution that you could show that the complex roots satisfying this condition had imaginary part =0, I meant exactly what you had outlined in your post (showing that theta=0)
I think maybe Sy123 didn't notice your edit to include the complex roots case (or maybe he started typing his reply before the edit).
 
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