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HSC 2015 MX1 Marathon (archive) (2 Viewers)

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PhysicsMaths

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Re: HSC 2015 3U Marathon

rofl, pre sure u dont learn that in yr 12 ^

i reckon its 30!!/15!! ?
You could do that, but intended for you to use 3u methods
It is solvable using intuition!
 
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dan964

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Re: HSC 2015 3U Marathon

@kaido
you do its the last thing you learn **
I originally thought 30!/15!
or 30P15
which is massive

but if you reread it
it is just 2^15 * (28 * 24 * 20 * 16 * 8 * 4)
= 2^22*7!


**edit: only if the question was actually what you thought it was.
 
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dan964

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Re: HSC 2015 3U Marathon

(a) Prove by mathematical induction that
2^(11n) - 1 is divisible by 23

(b) Hence deduce that
2^2047 -2 is divisible by 2047
 
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leehuan

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Re: HSC 2015 3U Marathon

@kaido
you do its the last thing you learn **
I originally thought 30!/15!
or 30P15
which is massive

but if you reread it
it is just 2^15


**edit: only if the question was actually what you though it was.
At first, I thought it was 2^15 as well. But it's a product, not a sum.
 

Kaido

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Re: HSC 2015 3U Marathon

part b) seems surprisingly simple :p
 

Kaido

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Re: HSC 2015 3U Marathon

Yup, seems legit

(since no allocated marks, safest bet)
 
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FrankXie

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Re: HSC 2015 3U Marathon

NEXT QUESTION -- a mc on perm and comb

Four shoes are selected from five distinct pairs of shoes. In how many ways can these four shoes include exactly one pair?
A. 240 B. 140 C. 120 D. 60
 

integral95

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Re: HSC 2015 3U Marathon

NEXT QUESTION -- a mc on perm and comb

Four shoes are selected from five distinct pairs of shoes. In how many ways can these four shoes include exactly one pair?
A. 240 B. 140 C. 120 D. 60
I got B, with 8C2 x 5 .....not too confident with this one.
 

InteGrand

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Re: HSC 2015 3U Marathon

NEXT QUESTION -- a mc on perm and comb

Four shoes are selected from five distinct pairs of shoes. In how many ways can these four shoes include exactly one pair?
A. 240 B. 140 C. 120 D. 60
I'm getting C) 120.

5 ways to select the pair.

From the remaining 8 shoes (note that all shoes are different), we need to pick 2, but avoid a pair, and there are 8C2 – 4 ways to do this (subtracting 4 since we don't want to make a pair from the last 2 we pick, and there are 4 ways to make a pair).

So answer is 5(8C2 – 4) = 120.
 
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Drsoccerball

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Re: HSC 2015 3U Marathon

NEXT QUESTION

sorry guys havnt learnt Latex yet but:
(20C13)(3^7)(ax)^13 is the greatest term.
Therefore for it to be the greatest term 13th term/12th term has to be less than 1
so you get ((20C13)(3)^7(a)^13)/((20C12)(3^8)(a^12)) <1
When you re arrange you get a< 39/8
 

braintic

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Re: HSC 2015 3U Marathon

sorry guys havnt learnt Latex yet but:
(20C13)(3^7)(ax)^13 is the greatest term.
Therefore for it to be the greatest term 13th term/12th term has to be less than 1
so you get ((20C13)(3)^7(a)^13)/((20C12)(3^8)(a^12)) <1
When you re arrange you get a< 39/8
Assuming you are using the Cambridge formula for Tn:

For T13 to be the greatest term, you need T13/T12 to be GREATER than 1, giving a>39/8

BUT you also need T13/T14 >1, giving a<6

So the solution is 39/8 < a < 6 (or 'less than or equal' if you allow for equal greatest terms)
 
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