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How do you integrate #int (2x+5)(x^2+5x)^7dx# using substitution?

1 Answer

Mar 7, 2018

#int(2x+5)(x^2+5x)^7dx=1/8(x^2+5x)^8+"c"#

Explanation:

We want to find #int(2x+5)(x^2+5x)^7dx=int(x^2+5x)^7(2x+5)dx#.

Let #u=x^2+5x# and #du=(2x+5)dx# and sub this into the integral to transform it to

#intu^7du=1/8u^8+"c"=1/8(x^2+5x)^8+"c"#

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