How do you find the integral of $int [sin(3x)]^4 dx$ ?

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How do you find the integral of $int [sin(3x)]^4 dx$ ?

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Answer 1 · 2015-10-15T17:38:00

Use power reduction formulas twice.

Explanation:

$cos(2x) = cos^2x-sin^2x$
$cos(2x) = 1-2sin^2x$
$cos(2x) = 2cos^2x-1$

So,
$sin^2x = 1/2(1-cos(2x))$
and,
$cos^2x = 1/2(1+cos(2x))$

$[sin(3x)]^4 = [color(blue)(sin^2 3x)]^2$

$= [color(blue)(1/2(1-cos6x))]^2$

$= 1/4[1-2cos6x+color(red)(cos^2 6x)]$

$= 1/4[1-2cos6x+(color(red)(1/2(1+cos12x)))]$

$= 1/8[2(1-2cos6x)+(1+cos12x))]$

$= 1/8[3-4cos6x+cos12x]$

The last expression can be integrated term by term using substitution for the two terms involving cosine.

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How do you find the integral of $int [sin(3x)]^4 dx$ ?

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Explanation:

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How do you find the integral of int [sin(3x)]^4 dxint [sin(3x)]^4 dx?

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Explanation:

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How do you find the integral of $int [sin(3x)]^4 dx$ ?