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HSC 2012-14 MX2 Integration Marathon (archive) (4 Viewers)

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Re: MX2 Integration Marathon

A way to come up with really complicated integrals that can be done using elementary functions: make up a complicated function and differentiate it :D
 
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Re: MX2 Integration Marathon

A way to come up with really complicated integrals that can be done using elementary functions: make up a complicated function and differentiate it :D
That's usually how integrals are made up lols. But you should be careful because not all functions are integratable, but nearly all are differentiatable.
 

Sy123

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Re: MX2 Integration Marathon

To me that final integral seems harder than the first...may be wrong though.
For the cot one, is it a really obscure substitution of the difficulty of like x = (1-u)/(1+u)?
 

Sy123

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Re: MX2 Integration Marathon

Not the way I did it.
I am guessing I need to multiply 1 in a clever way, no?

I need to find a way to prove that:



I am considering some sort of periodicity argument but I don't think that might work.
 

SpiralFlex

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Re: MX2 Integration Marathon

Well I did it by manipulating the x to something.
 

Sy123

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Re: MX2 Integration Marathon

I am guessing I need to multiply 1 in a clever way, no?

I need to find a way to prove that:



I am considering some sort of periodicity argument but I don't think that might work.
Ok here is my attempt at proving the above equality.

We can establish that:



By simply using the substitution 2x = u

And since sin(2x) is symmetrical about pi/4 from x=0 to x=pi/2. Hence (by taking the integral of ln(sin(2x)) from pi/4 to pi/2)



===========

This relates to the problem, because by integrating xcot x by parts:



Taking that specific integral on the RHS, then applying that definite integrals property (x) -> (a-x), then adding and log properties, we arrive at:



Since the integrals are equal, then

====

I think that is valid, the only fishy thing maybe is the symmetry arguments but I think that's fine. EDIT: Actually a simple substitution pi - x = u for ln(sin(x)) is sufficient to prove the symmetry for ln(sin(x)) and x = pi/2 - u for ln(sin(2x)).
So I am absolutely sure its all correct.

Now what's the elegant method!?
 
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Re: MX2 Integration Marathon

We should have an integration party.
 
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