x∈[0,1]
设u=arcsinx, u∈[0,π/2]
则x=sinu, dx=cosudu
xarcsinxdx=usinucosudu=(1/2)usin2udu=-(1/4)ud(cos2u)
∫xarcsinxdx=-(1/4)∫ud(cos2u)
=-(1/4)ucos2u+(1/4)∫cos2udu
=-(1/4)ucos2u+(1/8)sin2u(因为是定积分,所以不加常数了)
原式=-(1/4)ucos2u+(1/8)sin2u|<0,π/2>
=(-1/4)(π/2)cosπ+(1/8)sinπ+0-0
=π/8
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