HSC 2016 MX1 Marathon (archive) (3 Viewers)

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jathu123

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Re: HSC 2016 3U Marathon

I have 1 quick perms and combs question which I'm kinda stuck on, it may not be that hard but I don't want to create a new thread just for 1 question, so ill post it here.

Find the number of ways in which the letters of the word SQUARE can be arranged in a straight line so that exactly two vowels are next to each other.

The answer is 432 and since I got this from a past paper, the method they did was 12*3!*3!
Really appreciate if anyone could help me out on how they got that answer, thanks
 

ml125

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Re: HSC 2016 3U Marathon

I have 1 quick perms and combs question which I'm kinda stuck on, it may not be that hard but I don't want to create a new thread just for 1 question, so ill post it here.

Find the number of ways in which the letters of the word SQUARE can be arranged in a straight line so that exactly two vowels are next to each other.

The answer is 432 and since I got this from a past paper, the method they did was 12*3!*3!
Really appreciate if anyone could help me out on how they got that answer, thanks
3! x 3! is ordering the vowels and consonants as separate groups. You then multiply this by 12 as this is the possible number of arrangements of the two groups, as follows:

xx_x__
xx__x_
xx___x
_xx_x_
_xx__x
x_xx__
__xx_x
x__xx_
_x_xx_
x___xx
_x__xx
__x_xx

Pretty sure there might be a quicker way to do this but I just did it by listing lol
 

jathu123

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Re: HSC 2016 3U Marathon

3! x 3! is ordering the vowels and consonants as separate groups. You then multiply this by 12 as this is the possible number of arrangements of the two groups, as follows:

xx_x__
xx__x_
xx___x
_xx_x_
_xx__x
x_xx__
__xx_x
x__xx_
_x_xx_
x___xx
_x__xx
__x_xx

Pretty sure there might be a quicker way to do this but I just did it by listing lol
You made it look so simple haha, thankyou!
 

Hooters

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Re: HSC 2016 3U Marathon

Is my proof correct for this question? and can it be simplified? Capture3.PNG
 
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leehuan

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Re: HSC 2016 3U Marathon

Not sure if this can be done with HSC level maths but I'll just chuck it here.

 

Paradoxica

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Re: HSC 2016 3U Marathon

Not sure if this can be done with HSC level maths but I'll just chuck it here.

The higher order derivatives of any polynomial will eventually vanish.

This means that the values of the lesser derivatives are eventually overtaken by the exponential function.

But the lesser functions are arbitrary, and so we can jump inductively to the derivative of the polynomial in question.

Thus, the value of the derivative is eventually outstripped by the exponential function.

So the exponential function itself will eventually overtake the polynomial.

Can't be bothered constructing a formal argument, but if somebody wants to fill in the details, feel free to do so.
 

parad0xica

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Re: HSC 2016 3U Marathon

Let's get the ball rolling again with this question:





Modification: you cannot use or similar identities
 
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parad0xica

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Re: HSC 2016 3U Marathon

I'm going to modify this question: you cannot use this identity (or similar ones) to help you

There is a method without using that trig identity and I want that person to think of it instead of using memory
 

Paradoxica

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Re: HSC 2016 3U Marathon

Let's get the ball rolling again with this question:



Use the following diagram as a reference image:



By the reflective property of the parabola, the angle between the tangent and the focal chord is equal to the angle between the abscissa line and the tangent.

From the reference diagram, solve for the points B and D.



The lengths BE, DE are respectively:



 
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leehuan

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Re: HSC 2016 3U Marathon

Thought about this question just now. Not sure if it can be done.

 
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