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

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

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Answer 1 · 2015-10-11T03:05:42

This belongs in your mathematical toolbox: $int sin^m u cos^n u du$ with at least one of $m, n$ odd.

Explanation:

$int sin^m u cos^n u du$ with at least one of $m, n$ odd.
Integrate by substitution. Do this by pulling off one from the odd power, then convert the remaining even power to the other function. Integrate the resulting polynomial in $sinu$ or $cosu$ term by term.

$I = int cos^3xsin^6x dx = int cos^2xsin^6x cosxdx$

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

$= int (sin^6x-sin^8x) cosxdx$

$= sin^7x/7 - sin^9/9x +C$

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

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

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