HSC 2015 MX1 Marathon (archive) (1 Viewer)

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Sy123

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Re: HSC 2015 3U Marathon

Where 1 is not apart of the series
Well give it a go if you think it will work. Also for that expression, I don't know how you simplified:

because that is not true
 
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integral95

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Re: HSC 2015 3U Marathon

I get the feeling @Drsoccorball is not familiar with binomial theorem yet.
 

Drsoccerball

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Re: HSC 2015 3U Marathon

Well give it a go if you think it will work. Also for that expression, I don't know how you simplified:

because that is not true
The RHS is the last term of the series its not equal to (n-1)Ck
 

FrankXie

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Re: HSC 2015 3U Marathon

well, another way is applying (which is a well-known result in any textbook) again and again
 
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SilentWaters

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Re: HSC 2015 3U Marathon

This could work by induction on n. For the base case n = 1, we are forced to have k = 0:



which is true since both sides equate to 1.

Assuming this is true for , where we make the hypothesis:



We finish the inductive step in two cases.

(1) For



which by our assumption is



This will hold from Pascal's rule.

(2) k = s - 1



Both sides here equate to 1, and we're done.

EDIT: Missed a case, thank you InteGrand + FrankXie.
 
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FrankXie

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Re: HSC 2015 3U Marathon

This could work by induction on n-1. For the base case (zero):



The right hand side produces the same results case-wise.

So assuming this is true up to some n-2, we complete the inductive step using Pascal's rule, as FrankXie mentioned:



which equates to

there is a flaw when proving by induction, can you find it? ;) this is a very good example that shows how to fully understand the logic behind induction.
 

InteGrand

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Re: HSC 2015 3U Marathon

there is a flaw when proving by induction, can you find it? ;) this is a very good example that shows how to fully understand the logic behind induction.
Is the flaw that, when we make the assumption for the inductive hypothesis, k can take on certain values only, but in the inductive step, k can also take on one more value, but this value isn't accounted for in the inductive hypothesis?
 

SilentWaters

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Re: HSC 2015 3U Marathon

Consider selecting n members for an exec. team from a pool of 2n candidates, where men and women are equally numbered.

On the left-hand side, we use the symmetric property of combinations to change the summation to:



Now choose 0 men, n women; 1 man, n-1 women; 2 men, n-2 women; and so on and so forth until we have exec teams with all the possible number of men and women.

This gives us the left hand side.

Simply selecting n people from the pool of 2n in the first place gives us the right hand side, and we are done.
 
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SilentWaters

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Re: HSC 2015 3U Marathon

Frank's one is a bit tedious (unless, of course, there is a shorter way). Accounting for the saw-tooth shape of y = arcsin(sinx), such that each term of the sum oscillates in



we posit the following:



for some integral k. Working from decimal-point approximations of the positive half-pi intervals, we determine which quadrant each value of x falls into. From there, we compute:

 
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FrankXie

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Re: HSC 2015 3U Marathon

Frank's one is a bit tedious (unless, of course, there is a shorter way). Accounting for the saw-tooth shape of y = arcsin(sinx), such that each term of the sum oscillates in



we posit the following:



for some integral k. Working from decimal-point approximations of the positive half-pi intervals, we determine which quadrant each value of x falls into. From there, we compute:

lol as far as i know there is no shorter way, like there is no general formula for
 

Drsoccerball

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Re: HSC 2015 3U Marathon

In how many ways can 10 identical coins be allocated to 4 different boxes if no box will be left empty
 
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