Compute ∫ ( x 3 2 − 2 x 3 + 3 sin ⁡ ( x ) 2 + 2 cos ⁡ ( 3 x ) ) d x.

Question

Compute   ∫  (            x              3              2    −      2          x              3              +            3      sin      ⁡      (      x      )        2    +  2  cos  ⁡  (  3  x  )  )      ﻿    d  x.

exorteygrdh · Accepted Answer

Remove parentheses.∫x32-2x3+3sin(x)2+2cos(3x)dxSplit the single integral into multiple integrals.∫x32dx+∫-2x3dx+∫3sin(x)2dx+∫2cos(3x)dxSince&amp;nbsp;12&amp;nbsp;is constant with respect to&amp;nbsp;x, move&amp;nbsp;12&amp;nbsp;out of the integral.12∫x3dx+∫-2x3dx+∫3sin(x)2dx+∫2cos(3x)dxBy the Power Rule, the integral of&amp;nbsp;x3&amp;nbsp;with respect to&amp;nbsp;x&amp;nbsp;is&amp;nbsp;14x4.12(14x4+C)+∫-2x3dx+∫3sin(x)2dx+∫2cos(3x)dxSince&amp;nbsp;-1&amp;nbsp;is constant with respect to&amp;nbsp;x, move&amp;nbsp;-1&amp;nbsp;out of the integral.12(14x4+C)-∫2x3dx+∫3sin(x)2dx+∫2cos(3x)dxSince&amp;nbsp;2&amp;nbsp;is constant with respect to&amp;nbsp;x, move&amp;nbsp;2&amp;nbsp;out of the integral.12(14x4+C)-(2∫1x3dx)+∫3sin(x)2dx+∫2cos(3x)dxSimplify the expression.12(14x4+C)-2∫x-3dx+∫3sin(x)2dx+∫2cos(3x)dxBy the Power Rule, the integral of&amp;nbsp;x-3&amp;nbsp;with respect to&amp;nbsp;x&amp;nbsp;is&amp;nbsp;-12x-2.12(14x4+C)-2(-12x-2+C)+∫3sin(x)2dx+∫2cos(3x)dxSimplify.12(14x4+C)-2(-12x2+C)+∫3sin(x)2dx+∫2cos(3x)dxSince&amp;nbsp;32&amp;nbsp;is constant with respect to&amp;nbsp;x, move&amp;nbsp;32&amp;nbsp;out of the integral.12(14x4+C)-2(-12x2+C)+32∫sin(x)dx+∫2cos(3x)dxThe integral of&amp;nbsp;sin(x)&amp;nbsp;with respect to&amp;nbsp;x&amp;nbsp;is&amp;nbsp;-cos(x).12(14x4+C)-2(-12x2+C)+32(-cos(x)+C)+∫2cos(3x)dxSince&amp;nbsp;2&amp;nbsp;is constant with respect to&amp;nbsp;x, move&amp;nbsp;2&amp;nbsp;out of the integral.12(14x4+C)-2(-12x2+C)+32(-cos(x)+C)+2∫cos(3x)dxLet&amp;nbsp;u=3x. Then&amp;nbsp;du=3dx, so&amp;nbsp;13du=dx. Rewrite using&amp;nbsp;u&amp;nbsp;and&amp;nbsp;du.12(14x4+C)-2(-12x2+C)+32(-cos(x)+C)+2∫cos(u)13duCombine&amp;nbsp;cos(u)&amp;nbsp;and&amp;nbsp;13.12(14x4+C)-2(-12x2+C)+32(-cos(x)+C)+2∫cos(u)3duSince&amp;nbsp;13&amp;nbsp;is constant with respect to&amp;nbsp;u, move&amp;nbsp;13&amp;nbsp;out of the integral.12(14x4+C)-2(-12x2+C)+32(-cos(x)+C)+2(13∫cos(u)du)Combine&amp;nbsp;13&amp;nbsp;and&amp;nbsp;2.12(14x4+C)-2(-12x2+C)+32(-cos(x)+C)+23∫cos(u)duThe integral of&amp;nbsp;cos(u)&amp;nbsp;with respect to&amp;nbsp;u&amp;nbsp;is&amp;nbsp;sin(u).12(14x4+C)-2(-12x2+C)+32(-cos(x)+C)+23(sin(u)+C)Simplify.x48+1x2-3cos(x)2+23sin(u)+CReplace all occurrences of&amp;nbsp;u&amp;nbsp;with&amp;nbsp;3x.x48+1x2-3cos(x)2+23sin(3x)+CReorder terms.18x4+1x2-32cos(x)+23sin(3x)+C

Compute x 3 </mrow> 2 − 2

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