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Integration Question (1 Viewer)
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SpiralFlex
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Shadowdude
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That should be all you need - and then you can go from there.
Carrotsticks
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You can integrate:
Using substitution u = 4-x^2
nhox_h3o
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what tool did you use to write this
SpiralFlex
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Sorry I made an error. I copied the second line to third line and forgot to remove 1/2
SpiralFlex
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Should that really be assumed knowledge? Because I'm not familiar with itYou don't. I am using
We can manipulate the integral to get it back to the form.
SpiralFlex
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It's not assumed, you should try it! There are some great manipulation exercises in Terry Lee. Alternatively you could always use substitution as Carrot said.
But this method should be quicker if you see it.
SpiralFlex
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LaTeXwhat tool did you use to write this
nhox_h3o
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Is it ok if you send me a link to download it please
thank you Spiralflex
lilly luta
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http://www.latex-project.org/ I think it's this...But not too sureIs it ok if you send me a link to download it please
SpiralFlex
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You can use the online editor, but I am fluent with LaTeX so I know what to type without looking.
http://www.codecogs.com/latex/eqneditor.php
http://www.codecogs.com/latex/eqneditor.php
Annihilist
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Is this integration by parts?
That should be all you need - and then you can go from there.
deswa1
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No, he just split the fraction into two parts...
nhox_h3o
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Thank you Spiralflex and you too Lily
Shadowdude
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^ that.
Carrotsticks
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Personally, I try to avoid integration by substitution as much as possible, and I didn't use it for this question.
I just recognised that there was some form of the derivative in the actual expression, and integrated it directly (and fixed constants).
This is a more advanced technique that can't really be taught, but is 'realised' upon doing masses of integration by substitution questions.
Though it is essentially the same as substitution... you're just doing it mentally.
I just recognised that there was some form of the derivative in the actual expression, and integrated it directly (and fixed constants).
This is a more advanced technique that can't really be taught, but is 'realised' upon doing masses of integration by substitution questions.
Though it is essentially the same as substitution... you're just doing it mentally.