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How do you evaluate the integral #int e^-xdx# from 0 to #oo#?

1 Answer

Jul 19, 2016

1

Explanation:

#int_0^oo e^-x \ dx#

#= int_0^oo -d/dx (e^-x) \ dx#

#= int_oo^0 d/dx (e^-x) \ dx#

#= [ e^-x ]_oo^0#

#=1 - 0 = 1 #

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