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

1 Answer

Oct 20, 2015

#I = (6sin^7x)/7-(2sin^9x)/3+C#

Explanation:

#I = int (6sin^6x)(cos^3x)dx = 6int sin^6x cos^2x cosxdx#

#I = 6int sin^6x (1-sin^2x) cosxdx#

#sinx=t => cosxdx=dt#

#I = 6int t^6 (1-t^2) dt = 6 int (t^6-t^8)dt = 6 (t^7/7-t^9/9+C)#

#I = (6sin^7x)/7-(2sin^9x)/3+C#

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