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How do you evaluate the integral #int e^x/(1+e^(2x))dx# from #-oo# to #oo#?

1 Answer

Aug 22, 2016

#pi#

Explanation:

Making #y = e^x# we have #dy = e^x dx = y dx#

#int e^x/(1+e^(2x))dx equiv int dy/(1+y^2) = arctan(y)#

but

#lim_{x->oo}e^x=lim_{y->oo}=oo#

so

#lim_{a->oo} int_{-a}^a dy/(1+y^2) = pi/2-(-pi/2) = pi#

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