conflicting solutions to this q (1 Viewer)

mecramarathon

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how do you integrate by substitution the following q?

x√(1-x) dx ?

i get conflicting answers from fitzpatrick and cambridge! (in terms of positive and negative signs)

thnx:jump:
 

ilikebeeef

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let u=1-x
x=1-u

Sum[x(1-x)^1/2]dx
=Sum[(1-u)u^1/2]du
=Sum[u^1/2 - u^3/2]du
=(2/3)u^3/2 - (2/5)u^5/2 + c
=(2/3)(1-x)^3/2 - (2/5)(1-x)^5/2 + c

Hopefully that's correct :spin:
 

Trebla

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jet

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Just to clarify Trebla's post, he realised that to get rid of the square root, you could say u2 = 1 - x instead of u = 1 - x (which will still leave in the square root).

Then he rearranged to get x = 1 - u2 and could differentiate from there.

That is a very useful substitution method for these sorts of questions :)
 

The Nomad

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Just to clarify Trebla's post, he realised that to get rid of the square root, you could say u2 = 1 - x instead of u = 1 - x (which will still leave in the square root).

Then he rearranged to get x = 1 - u2 and could differentiate from there.

That is a very useful substitution method for these sorts of questions :)
I would just like to point out that u2 = 1 - x is not a clear-cut definition of the value of u.

That particular solution suggests that (u2)1/2 = u, when in actuality, (u2)1/2 = |u|.

Hence, there are 2 cases:

  • If u > 0, |u| = u, and (u2)1/2 = u.
  • If u < 0, |u| = -u, and (u2)1/2 = -u.
 

jet

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I would just like to point out that u2 = 1 - x is not a clear-cut definition of the value of u.

That particular solution suggests that (u2)1/2 = u, when in actuality, (u2)1/2 = |u|.

Hence, there are 2 cases:

  • If u > 0, |u| = u, and (u2)1/2 = u.
  • If u < 0, |u| = -u, and (u2)1/2 = -u.
That's a true point, though I've always been under the impression that 3 unit doesn't require such a large amount of rigour. I do always feel guilty when I have to resubstitute back in though.
 

The Nomad

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That's a true point, though I've always been under the impression that 3 unit doesn't require such a large amount of rigour. I do always feel guilty when I have to resubstitute back in though.
I guess the rigour point is fair enough.

Just wondering though, if 10 people get 84/84 in the HSC exam, how do they choose who is ranked first, and who is second...and so on? Do they not check working out? Just a little query I have.
 

jet

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I guess the rigour point is fair enough.

Just wondering though, if 10 people get 84/84 in the HSC exam, how do they choose who is ranked first, and who is second...and so on? Do they not check working out? Just a little query I have.
They look at 2 unit marks. Then they combine it with assessment marks, to 1 decimal place. That usually sorts it out.
 

Trebla

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I would just like to point out that u2 = 1 - x is not a clear-cut definition of the value of u.

That particular solution suggests that (u2)1/2 = u, when in actuality, (u2)1/2 = |u|.

Hence, there are 2 cases:

  • If u > 0, |u| = u, and (u2)1/2 = u.
  • If u < 0, |u| = -u, and (u2)1/2 = -u.
Despite this technical issue, it just takes just one extra piece of information to clear it up since the substitution in this case is of a free choice (i.e. just state u > 0 lol)
 

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