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need help with an integral (1 Viewer)

andybandy

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show that the integral of ln(x)/(1+x^2) is 0 and the limits are 2 and 1/2, substitution is u=1/x
 

andybandy

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is it suppose to be easy or something? im just not getting it :/
 

hit patel

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Can this question be done without substitution? If so please if possible show me how.

Thanks
 

Sy123

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Can this question be done without substitution? If so please if possible show me how.

Thanks
This integral has no elementary indefinite integral, so I sincerely doubt it can be done without substitution.
Moreover the bounds 2 and 1/2 are very special and designed for the specific sub u=1/x
 

hit patel

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This integral has no elementary indefinite integral, so I sincerely doubt it can be done without substitution.
Moreover the bounds 2 and 1/2 are very special and designed for the specific sub u=1/x
Yes it looked as so to me but just wanted to confirm.
 

anomalousdecay

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This integral has no elementary indefinite integral, so I sincerely doubt it can be done without substitution.
Moreover the bounds 2 and 1/2 are very special and designed for the specific sub u=1/x
You can use integration by parts........

should get I = (lnx)(tan^-1(x)) - Integration of ((tan^-1(x))/x)dx

But it gets very messy.
 
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Sy123

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You can use integration by parts........

should get I = (lnx)(tan^-1(x)) - Integration of ((tan^-1(x))/x)dx

But it gets very messy.
Can you tell me how you would continue from:

?

Because I don't think that is possible with elementary functions
 

anomalousdecay

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Can you tell me how you would continue from:

?

Because I don't think that is possible with elementary functions

1/x =dv, v=lnx.

tan^-1(x) = u

du = dx/(1 + x^2)


I = (lnx)(tan^-1(x)) - (lnx)(tan^-1(x)) + I.


Damn. I hate it when that happens. All I did was prove 0=0.

You're right, only use substitution.
 

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