HSC 2016 MX2 Integration Marathon (archive) (3 Viewers)

Paradoxica · Apr 16, 2016

Re: MX2 2016 Integration Marathon

leehuan said:
I got this question off an integration bee btw

Yes, because you can't write your own questions.

leehuan · Apr 16, 2016

Re: MX2 2016 Integration Marathon

Paradoxica said:
Yes, because you can't write your own questions.

I once did. And now I'm not motivated to.

Drsoccerball · Apr 16, 2016

Re: MX2 2016 Integration Marathon

Paradoxica said:
Yes, because you can't write your own questions.

I never knew this was the "Only questions made by yourself Integration Marathon."

Paradoxica · Apr 16, 2016

Re: MX2 2016 Integration Marathon

Drsoccerball said:
I never knew this was the "Only questions made by yourself Integration Marathon."

It's not, but its more fun if it is.

Drsoccerball · Apr 16, 2016

Re: MX2 2016 Integration Marathon

Paradoxica said:
It's not, but its more fun if it is.

If it isn't called, "Only questions made by yourself Integration Marathon," then stop making fun of people for using questions that are not theirs.

Paradoxica · Apr 16, 2016

Re: MX2 2016 Integration Marathon

never mocked them

but then again who knows what you see between the words

leehuan · Apr 16, 2016

Re: MX2 2016 Integration Marathon

Paradoxica said:
never mocked them

but then again who knows what you see between the words

Bluntly putting it out that "you can't ..." sounds at the minimal like mocking.

The alternative was trying to insult me.

abecina · Apr 17, 2016

Re: MX2 2016 Integration Marathon

$\\ $Evaluate $ \int_{0}^{\frac{\pi}{2}}{\log{\sin{x}}}\textrm{d}x$

leehuan · Apr 17, 2016

Re: MX2 2016 Integration Marathon

._. Posted so many times now

abecina · Apr 17, 2016

Re: MX2 2016 Integration Marathon

leehuan said:
._. Posted so many times now

Soz been out of the thread for a while - good to know its a fav

leehuan · Apr 17, 2016

Re: MX2 2016 Integration Marathon

abecina said:
Soz been out of the thread for a while - good to know its a fav

Yea dw about it lol, but at least 2 people have done it.

I'll sketch out the (slightly non-X2) method anyway.

1. Border-flip method allows two integrals to be summed up.
2. Use a log law just to put the thing that will generate the -pi/2 ln(2) aside
3. u-substitution combined with periodicity of sine
4. Riemann sums (or alternatively decompose using L'Hopitals)

porcupinetree · Apr 17, 2016

Re: MX2 2016 Integration Marathon

abecina said:
$\\ $Evaluate $ \int_{0}^{\frac{\pi}{2}}{\log{\sin{x}}}\textrm{d}x$

DatAtarLyfe · Apr 17, 2016

Re: MX2 2016 Integration Marathon

Soz but where did the sin2x go?

InteGrand · Apr 17, 2016

Re: MX2 2016 Integration Marathon

DatAtarLyfe said:
Soz but where did the sin2x go?

Mental substitution of u = 2x.

DatAtarLyfe · Apr 17, 2016

Re: MX2 2016 Integration Marathon

InteGrand said:
Mental substitution of u = 2x.

Oh ok, thanks

leehuan · Apr 17, 2016

Re: MX2 2016 Integration Marathon

This was a question I remember doing (at least a similar variant) last year. Not sure if it was ever posted again.

$\int_{0}^{\frac{\pi}{2}}{\frac{\sin{(2016x)}}{\sin{x}}dx}$

Paradoxica · Apr 17, 2016

Re: MX2 2016 Integration Marathon

leehuan said:
This was a question I remember doing (at least a similar variant) last year. Not sure if it was ever posted again.

$\int_{0}^{\frac{\pi}{2}}{\frac{\sin{(2016x)}}{\sin{x}}dx}$

Recall the following identity:

$2\cos{x}+2\cos{2x}+2\cos{4x}+\cdots+2\cos{(2n-1)x} \equiv \frac{\sin{2nx}}{\sin{x}}$

Setting n=1008, gives us

$\int_0^\frac{\pi}{2} 2\cos{x}+2\cos{3x}+2\cos{5x}+\cdots+2\cos{(2n-1)x}\,\,$d$x$

Then the integral is the following sum:

$\sum_{r=0}^{1008}\frac{2\cos{r \pi}}{1-2r} \equiv \sum_{r=0}^{1008}\frac{2(-1)^r}{1-2r}$

This is the partial sum for the Leibniz formula for π, which has no elementary closed form.

leehuan · Apr 17, 2016

Re: MX2 2016 Integration Marathon

Probably a wrong boundary. Maybe it was meant to be pi, not pi/2

Edit: Hold the thought it still won't work. Ok fair enough

$\int_{0}^{\pi}{\frac{\sin{2017x}}{\sin{x}}dx}$

Carrotsticks · Apr 17, 2016

Re: MX2 2016 Integration Marathon

Paradoxica said:
This is the partial sum for the Leibniz formula for π, which has no elementary closed form.

Yes it does. It will be some giant rational number.

We only really talk about 'closed forms' for infinite sums.

Paradoxica · Apr 17, 2016

Re: MX2 2016 Integration Marathon

leehuan said:
Probably a wrong boundary. Maybe it was meant to be pi, not pi/2

Edit: Hold the thought it still won't work. Ok fair enough

$\int_{0}^{\pi}{\frac{\sin{2017x}}{\sin{x}}dx}$

You have forgotten an earlier conversation of your own which established the niceness of the generalised integral for only odd integer values.

HSC 2016 MX2 Integration Marathon (archive) (3 Viewers)

-insert title here-

Well-Known Member

Well-Known Member

-insert title here-

Well-Known Member

-insert title here-

Well-Known Member

Member

Well-Known Member

Member

Well-Known Member

not actually a porcupine

Booty Connoisseur

Well-Known Member

Booty Connoisseur

Well-Known Member

-insert title here-

Well-Known Member

Retired

-insert title here-

Users Who Are Viewing This Thread (Users: 0, Guests: 3)