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

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Drsoccerball

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Re: HSC 2016 4U Marathon - Advanced Level

Prove that the medians of a triangle meet at a point G which divides each median in the ratio 2:1 using vectors.
 

InteGrand

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Re: HSC 2016 4U Marathon - Advanced Level

Prove that the medians of a triangle meet at a point G which divides each median in the ratio 2:1 using vectors.
I think a complex numbers vectors proof of this was in last year's Carrotsticks BOS 4U Trial. It's easy to prove by elementary geometry as well though. We'll give this proof below.





 

seanieg89

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Re: HSC 2016 4U Marathon - Advanced Level

A little sum I whipped up. For a fixed positive integer n, evaluate

 

seanieg89

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Re: HSC 2016 4U Marathon - Advanced Level

Easier than my unanswered summation problem:

Consider the solid of revolution S formed by rotating the disk about the y-axis.

a) Find it's volume by standard MX2 methods.

b) Show that this volume is also equal to where A is the area of the disk used to construct S and d is the total distance travelled by the centre of the disk as we rotate this disk around the the y-axis.

c) Generalise the above to other solids of revolution.

Hint: The analogue of the centre of the circle in this case is the point on which the region would balance perfectly. First find an expression for this point using calculus or otherwise.

For the sake of simplicity, restrict your attention to solids of revolution generated by plane regions of the form:



where a < b are positive reals and are continuous functions that are equal at a and b.

d) Inscribe and circumscribe regular 2n-gons about the unit circle centred at (2,0) (both oriented to have an edge parallel to the x-axis) and consider the plane region R bounded by these two polygons. What is the volume of the solid of revolution generated by R?
 
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dan964

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Re: HSC 2016 4U Marathon - Advanced Level

Easier than my unanswered summation problem:

Consider the solid of revolution S formed by rotating the disk about the y-axis.

a) Find it's volume by standard MX2 methods.

b) Show that this volume is also equal to where A is the area of the disk used to construct S and d is the total distance travelled by the centre of the disk as we rotate this disk around the the y-axis.

c) Generalise the above to other solids of revolution.

Hint: The analogue of the centre of the circle in this case is the point on which the region would balance perfectly. First find an expression for this point using calculus or otherwise.

For the sake of simplicity, restrict your attention to solids of revolution generated by plane regions of the form:



where a < b are positive reals and are continuous functions that are equal at a and b.

d) Inscribe and circumscribe regular 2n-gons about the unit circle centred at (2,0) (both oriented to have an edge parallel to the x-axis) and consider the plane region R bounded by these two polygons. What is the volume of the solid of revolution generated by R?
Someone is actually do a presentation on this next week in one of my subjects at university.
 

Paradoxica

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Re: HSC 2016 4U Marathon - Advanced Level

The odd natural numbers are partitioned as follows:

1
3,5
7,9,11
13,15,17,19
21,23,25,27,29
...
...
...

And so on, to infinity.

Prove the following statement:

The sum of all the numbers in the nth row is equal to n3
 

KingOfActing

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Re: HSC 2016 4U Marathon - Advanced Level

The odd natural numbers are partitioned as follows:

1
3,5
7,9,11
13,15,17,19
21,23,25,27,29
...
...
...

And so on, to infinity.

Prove the following statement:

The sum of all the numbers in the nth row is equal to n3
The first term of each row is given by . The term in row n and position m is given by .

This gives us that the sum of each row is:

 

abecina

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Re: HSC 2016 4U Marathon - Advanced Level

solid.png
 
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Paradoxica

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Re: HSC 2016 4U Marathon - Advanced Level

By similar triangles, the base of the triangle is a+2x/√3
The height is a-x since the diagonal which generates it is exactly 45 degrees inclined. (the base and height of the object have length a along the axis of generation)
The cross section along the middle is that of a pyramid, so by Cavalieri's Principle, it is a square, so the top length is a-x.

So the infinitesimal change in volume is equal to the area of the trapezium times the infinitesimal change in x

dV = (a-x)(a-x+a+2x/√3)/2 dx

Note that we should test the area function to make sure it is correct. Plugging in x=0 gives a² as expected, and plugging in x=a gives 0 as expected, as these correspond to the cross sections at the extreme ends of the solid.

x goes from 0 to a so the corresponding integral will go from 0 to a



Use the basic border flip property on the integral.



After some tedious computation the volume turns out to be:

 
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InteGrand

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Re: HSC 2016 4U Marathon - Advanced Level

By similar triangles, the base of the triangle is a+2x/√3
The height is a-x since the diagonal which generates it is exactly 45 degrees inclined. (the base and height of the object have length a along the axis of generation)
The cross section along the middle is that of a pyramid, so by Cavalieri's Principle, it is a square, so the top length is a-x.

So the infinitesimal change in volume is equal to the area of the trapezium times the infinitesimal change in x

dV = (a-x)(a-x+a+2x/√3)/2 dx

Note that we should test the area function to make sure it is correct. Plugging in x=0 gives a² as expected, and plugging in x=a gives 0 as expected, as these correspond to the cross sections at the extreme ends of the solid.

x goes from 0 to a so the corresponding integral will go from 0 to a



Use the basic border flip property on the integral.



After some tedious computation the volume turns out to be:



Now why is my volume negative.
I think you made a silly mistake in the computation of the integral at the end. (Also, we'd expect the final answer to only involve cubic terms in a as it's a volume. We can also see by inspection that the integral will result in only cubic terms in a.)
 

tywebb

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Re: HSC 2016 4U Marathon - Advanced Level

2002 HSC Ext. 2 Q8a+solution by mojako attached. The question has four parts.

But the question can be extended with four more parts to prove



as follows.















Historical note: This was first proposed in 1644 by Pietro Mengoli and then solved by Euler in 1734. But Euler did not use this method. In fact there are several methods by which it can be proved. The method in this HSC exam together with the extension was first used by Augustin Louis Cauchy in 1821 in a book called Cours d'Analyse.
 

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Nailgun

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Re: HSC 2016 4U Marathon - Advanced Level

This thread makes me feel a little better for not attempting to do 4U.
 

InteGrand

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Re: HSC 2016 4U Marathon - Advanced Level

This thread makes me feel a little better for not attempting to do 4U.
The questions in HSC 4U (technically "Extension 2" of course) papers of today are overall much easier than most of the Q's in these 4U Advanced Marathons.
 

seanieg89

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Re: HSC 2016 4U Marathon - Advanced Level

Here is a derivation of via a scenic route.









 
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