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How do you find the definite integral of #(sqrt(2x+1))dx# from #[1, 4]#?

1 Answer

Konstantinos Michailidis

Apr 24, 2016

It is

#int sqrt(2x+1)dx=1/3*int (2x+1)'*sqrt(2x+1)dx=1/3*[2x+1]^(3/2)+c#

Hence

#int_1^4 sqrt(2x+1)dx=[1/3*[2x+1]^(3/2)]_1^4=9-sqrt(3) ~~ 7.2679#

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