How do you find the integral of #int sin^6(x) cos^3(x) dx#?

1 Answer
Jim H
Oct 6, 2015

#int sin^mxcos^nx dx# with one (or both) #m, n# odd should be added to your mathematics recipe book.

Explanation:

Because sine and cosine are (up to a mminus sign) derivatives of each other, we can integrate by substitution.

Regroup one the the functions that has an odd exponent to join #dx#. This pair will be #du# when we make a substitution. It also leaves an even power that can be rewritten using #sin^2x+cos^2x =1#

Do the substitution, expand and integrate the resulting polynomial.

Reverse the substitution to finish.

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