计算下列不定积分

(1)∫xe^(-3x)dx
(2)∫xcos(4x+3)dx
(3)∫xsin^2 xdx
(4)∫x^2 lnxdx
(5)求∫cos√xdx
请教各题详细解题过程~谢谢！

解：（1）∫xe^(-3x)dx=-(1/3)∫xe^(-3x)d(-3x)=-(1/3)∫xde^(-3x)
=-(1/3)[x*^e(-3x)-∫e^(-3x)dx] =-(1/3)[x*^e(-3x)+(1/3)∫e^(-3x)d(-3x)] =-(1/3)[x*^e(-3x)+(1/3)*e^(-3x)]=……（自己化简，我没带草稿）（2）∫xcos(4x+3)dx=(1/4)∫xcos(4x+3)d(4x+3) =(1/4)∫xdsin(4x+3) =(1/4)[x*sin(4x+3)-∫sin(4x+3)dx] =(1/4)[x*sin(4x+3)-(1/4)∫sin(4x+3)d(4x+3)] =(1/4)[x*sin(4x+3)+(1/4)cos(4x+3)]=……(3))∫xsin^2 xdx=∫x*(1-cos2x)/2dx =∫0.5xdx-(1/2)∫xcos(2x)dx =(x^2)/4-(1/4)∫xcos(2x)d(2x) =(x^2)/4-(1/4)∫xd(sin2x) =(x^2)/4-(1/4)[xsin(2x)-∫sin(2x)dx] =(x^2)/4-(1/4)[xsin(2x)-(1/2)∫sin(2x)d2x] ==(x^2)/4-(1/4)[xsin(2x)+(1/2)cos2x]=……(4)∫x^2 lnxdx=(1/3)∫(3x^2)lnxdx =(1/3)∫lnxd(x^3) =(1/3)[x^3*lnx-∫x^3d(lnx)] =(1/3)[x^3*lnx-∫x^2dx]
=(1/3)[x^3*lnx-(1/3)x^3]=……(5)设√x=t ∫cos√xdx=∫costdt^2 =2∫tcostdt =2∫td(sint) =2[t*sint-∫sintdt] =2[t*sint+cost] =2[√x*sin(√x)+cos(√x)]=……所有的结果别忘了加常数C吖

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