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OLDMAN

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Give Spice Girl's integral notation a run, btw where's Spice?

I{0--->pi/2}f(x)dx integral upper limit pi/2, lower limit 0 wrt x, and f(x)=1/(1+tan^.25 (x))
 

Affinity

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hmm Pi/4 :p,

wasn't that <u>trivial</u>

very nice question~
 

ezzy85

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is this similar to the sinx/sinx + cosx question? where you make 2 identities and add them, then divide by 2.
 

freaking_out

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Originally posted by Affinity
hmm Pi/4 :p,

wasn't that <u>trivial</u>

very nice question~
what trivial??????:( ....don't even have a clue as to where to start with this question.

Give Spice Girl's integral notation a run, btw where's Spice?
yeah, spice girl's hanging around more in the chemistry forum these days.:D
 

ezzy85

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Originally posted by underthesun
I would have done I{a-->b}f(x)dx = I{a-->b}f(a-x)dx

or something like that? I quite forgot, have been slacking off integration..
ye, thats what i was thinking. using cotx for f(a-x)
 

Affinity

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well.. alternatively, you could do a x=arctan(y^4) substitution.
 

OLDMAN

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Affinity quote: well.. alternatively, you could do a x=arctan(y^4) substitution.
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Did you get the right answer pi/4 using that substitution ? Didn't think of that. Tell us, Affinity, where did you come from? Mars?!:p
 

OLDMAN

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Originally posted by underthesun
I would have done I{a-->b}f(x)dx = I{a-->b}f(a-x)dx

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ezzy85 quote:
ye, thats what i was thinking. using cotx for f(a-x)
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didn't use substitution, but used above special integration rule.
 

OLDMAN

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Just a note : .25 is actually irrelevant, it could be any number eg.

I{0--->pi/2}(1/(1+tan^.1(x))dx =I{0--->pi/2}(1/(1+cot^.1(x))dx

thus 2I=I{0--->pi/2}(1)dx giving pi/4.
 
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OLDMAN

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freaking_out:

1/(1+tan^.1(x)) + 1/(1+cot^.1(x)) =1
 
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freaking_out

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Originally posted by OLDMAN
freaking_out:

1/(1+tan^.1(x)) + 1/(1+cot^.1(x)) =1
i'm sorry, but i still don't get it...(i'm braindead from the trials)...:(

anyway, did u use any trig identities???? how did u get them to equal 2 one??:confused:
 
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Just write it down and do it. It would come out to (2+tan^.1(x)+cot^.1(x))/(2+tan^.1(x)+cot^.1(x))=1
 

OLDMAN

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or
1/(1+tan^.1(x)) + 1/(1+cot^.1(x)) =1/(1+tan^.1(x)) + tan^.1(x)/(1+tan^.1(x)) =1 since cot=1/tan.

Quite useful to remember 1/(1+tan)+1/(1+cot)=1
 

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