How do you integrate int x^2sinxx2sinx by integration by parts method?

1 Answer
Steve M
Oct 27, 2016

intx^2sinx dx = 2cosx + 2 xsinx -x^2cos x+ Cx2sinxdx=2cosx+2xsinxx2cosx+C

Explanation:

The formula for integration by parts is:
intu(dv)/dxdx = uv - intv(du)/dxdx udvdxdx=uvvdudxdx

Essentially we would like to find one function that simplifies when differentiated, and one that simplifies when integrated (or is at least integrable).

In this case a trig function stays as a trig function but x^2x2 simplifies if differentiated.

Let {(u=x^2, => ,(du)/dx=2x),((dv)/dx=sinx,=>,v =-cosx ):}

So IBP gives:

int(x^2)(sinx)dx = (x^2)(-cos x)-int(-cosx)(2x)dx
:. intx^2sinx dx = -x^2cos x + 2intxcosxdx ..... [1]

Ok, well that is better, but for the second interval we have to use IBP again;

Let {(u=x, => ,(du)/dx=1),((dv)/dx=cosx,=>,v =sinx ):}

So IBP gives:

int (x)(cosx)dx = (x)(sinx) - int (sinx)(1)dx
:. int xcosxdx = xsinx - int sinxdx
:. int xcosxdx = xsinx + cosx ..... [2]

Substituting [2] into [1] we have;

intx^2sinx dx = -x^2cos x + 2{ xsinx + cosx} + C
:. intx^2sinx dx = -x^2cos x + 2 xsinx + 2cosx + C
:. intx^2sinx dx = 2cosx + 2 xsinx -x^2cos x+ C

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