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How do you find the indefinite integral of #int (1+secpix)^2secpixtanpixdx#?

1 Answer

Shwetank Mauria

Mar 8, 2018

#int(1+secpix)^2secpixtanpixdx=(1+secpix)^3/(3pi)#

Explanation:

Let #u=1+secpix# then #du=pisec(pix)tan(pix)dx#

and hence #int(1+secpix)^2secpixtanpixdx#

= #intu^2/pidu#

= #u^3/(3pi)#

= #(1+secpix)^3/(3pi)#

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