Integration proofs help (1 Viewer)

LOL™ · May 7, 2010

Hey!! can anyone help me with this? I gave up after like 1/2 hr

If f(x) = f(a - x), prove that

thanks

MOP777 · May 8, 2010

Pretty sure this is correct. I did skip a few steps but it's all correct as far as I know.
$I = 2\int_{0}^{a}xf(x)\\\\ \int_{0}^{r}f(x) = \int_{0}^{r}f(r-x)\\\\\therefore I = 2\int_{0}^{a}(a-x)f(a-x)\\\\ I = 2\int_{0}^{a}af(a-x)\, - 2\int_{0}^{a}xf(a-x)\\\\ I = 2\int_{0}^{a}af(a-x)\, - I\\ $Because f(x) = f(a-x)$\\\\ 2I = 2\int_{0}^{a}af(a-x)\\\\ $divide by 2$\\\\ I = \int_{0}^{a}af(a-x)\\\\ I = a\int_{0}^{a}f(a-x)\\\\ f(a-x) = f(x)\\\\ \therefore I = a\int_{0}^{a}f(x)\\\\$

LOL™ · May 8, 2010

How did you get from the 4th to the 5th line
I dont get how:
<a href="http://www.codecogs.com/eqnedit.php?latex=2\int_{0}^{a}xf(a-x) = I" target="_blank"><img src="http://latex.codecogs.com/gif.latex?2\int_{0}^{a}xf(a-x) = I" title="2\int_{0}^{a}xf(a-x) = I" /></a>
Because that wouldn't be f(a-x)

MOP777 · May 9, 2010

because f(a-x) = f(x) as originally stated, and as stated in the proof.

LOL™ · May 9, 2010

But f(a-x) would be
<a href="http://www.codecogs.com/eqnedit.php?latex=\int_{0}^{a}(a-x)f(a-x)" target="_blank"><img src="http://latex.codecogs.com/gif.latex?\int_{0}^{a}(a-x)f(a-x)" title="\int_{0}^{a}(a-x)f(a-x)" /></a>

rather than this

LOL™ said:
How did you get from the 4th to the 5th line
<a href="http://www.codecogs.com/eqnedit.php?latex=2\int_{0}^{a}xf(a-x) = I" target="_blank"><img src="http://latex.codecogs.com/gif.latex?2\int_{0}^{a}xf(a-x) = I" title="2\int_{0}^{a}xf(a-x) = I" /></a>

MOP777 · May 12, 2010

You split the (a-x) function. Because it is (a-x)*(f(a-x)) it equals a*(f(a-x)) - x*(f(a-x))

Do you get that? I'll give you an example without variables. (5-2) *(f(x)) = 5*(f(x)) - 2*(f(x))
Do you understand?

LOL™ · May 13, 2010

MOP777 said:
You split the (a-x) function. Because it is (a-x)*(f(a-x)) it equals a*(f(a-x)) - x*(f(a-x))

Do you get that? I'll give you an example without variables. (5-2) *(f(x)) = 5*(f(x)) - 2*(f(x))
Do you understand?

Yea i get that of course but how does
$2\int_{0}^{a}xf(a-x) = I$

Because its clearly not f(a - x)

MOP777 · May 13, 2010

Because f(a-x) = f(x)
ie
$2\int_{0}^{a}xf(a-x)\\\\ f(a-x) = f(x)\\\\ $(therefore you can replace f(a-x) with f(x))$\\\\ = 2\int_{0}^{a}xf(x)\\\\ = I$

I don't know how to explain it any clearer.

excuse the

Code:

< br / >

I can't get rid of them

LOL™ · May 13, 2010

MOP777 said:
Because f(a-x) = f(x)
ie
$2\int_{0}^{a}xf(a-x)\\\\ f(a-x) = f(x)\\\\ $(therefore you can replace f(a-x) with f(x))$\\\\ = 2\int_{0}^{a}xf(x)\\\\ = I$

I don't know how to explain it any clearer.

excuse the

Code:

< br / >

I can't get rid of them

lol
the point i don't get is how that is = I
because the function there lets call it g(x) is xf(x)
therefore g(a-x) would have to be (a-x)f(a-x) and not xf(a-x)
Do you get what im trying to ask ? lol sorry

MOP777 · May 13, 2010

I do get what you're saying
but (a-x) TIMES f(a-x)
= (a TIMES f(a-x)) MINUS (x TIMES f(a-x))

you split the a minus x into two separate integrals.

Trebla · May 13, 2010

Would this approach help?

$$Consider $\int_0^a xf(x)\,dx\\\\$Let $u=a-x \Rightarrow x = a-u \Rightarrow dx=-du\\\\x=0\Rightarrow u=a\\x=a\Rightarrow u = 0\\\\ \int_0^a xf(x)\,dx\\\\ = -\int_a^0 (a-u)f(a-u)\,du\\\\=\int_0^a (a-u)f(a-u)\,du\\\\=\int_0^a (a-x)f(a-x)\,dx\quad ($since $u$ is a dummy variable$)\\\\=\int_0^a (a-x)f(x)\,dx\quad $ as $ f(x)=f(a-x)\\\\=a\int_0^a f(x)\,dx - \int_0^a xf(x)\,dx\\\\\therefore 2\int_0^a xf(x)\,dx = a\int_0^a f(x)\,dx$

seanieg89 · May 14, 2010

You've created an extra factor of x in the integrand of the RHS of your final line trebla.

jet · May 14, 2010

LOL™ said:
lol
the point i don't get is how that is = I
because the function there lets call it g(x) is xf(x)
therefore g(a-x) would have to be (a-x)f(a-x) and not xf(a-x)
Do you get what im trying to ask ? lol sorry

Becuase when they refer to f(x) they aren't talking about the integral, they're just talking about the function inside the integrand. So, since f(a -x) = f(x) then
$\int xf(a - x) \, dx &= \int xf(x) \, dx \text{ by replacing } f(a - x) \text{ with } f(x) \\ &= I$

The fact that the first poster replaced every instance of x by a-x at the start of his proof uses a completely different rule altogether.

LOL™ · May 14, 2010

jetblack2007 said:
Becuase when they refer to f(x) they aren't talking about the integral, they're just talking about the function inside the integrand. So, since f(a -x) = f(x) then
$\int xf(a - x) \, dx &= \int xf(x) \, dx \text{ by replacing } f(a - x) \text{ with } f(x) \\ &= I$

The fact that the first poster replaced every instance of x by a-x at the start of his proof uses a completely different rule altogether.

ah ok i think i get what you're trying to say now. So in the question when its says given that f(x) = f(a-x), it is actually saying that those 2 functions are equal rather than refering to the general rule.
So then in the function xf(a-x), you can simply replace the f(a-x) by f(x) so then it would become xf(x)? right?

anyway, thanks for that everybody.

jet · May 14, 2010

Yes that's right

Integration proofs help (1 Viewer)

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