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How do you evaluate the definite integral #int 1+sinx# from #[pi/4, pi/2]#?

1 Answer

Oct 25, 2016

#pi/4+sqrt2/2#

Explanation:

#int_(pi/4)^(pi/2)(1+sinx)dx#

#=[x-cosx]_(pi/4)^(pi/2)#

#=[x-cosx]^(pi/2)-[x-cosx]_(pi/4)#

#(pi/2-cos(pi/2))-(pi/4-cos(pi/4))#

#=pi/2-0-pi/4+sqrt2/2#

#pi/4+sqrt2/2#

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