∫xarccosxdx=1/2∫arccosxdx^2=1/2(x^2arccosx-∫x^2darccosx)
=1/2x^2arccosx-1/2∫(-x^2)/根号(1-x^2)dx
=1/2x^2arccosx-1/2∫(1-x^2-1)/根号(1-x^2)dx
=1/2x^2arccosx-1/2∫根号(1-x^2)dx+1/2∫1/根号(1-x^2)dx
=1/2x^2arccosx-1/2[1/2arcsinx+1/2*x根号(1-x^2)]+1/2arcsinx
分别将x=根号3/2和x=0代入上式,然后相减就行了,用的就是分部积分法
arccosx=
=--∫(上限 pi/3 ,下限0) t*cos t d cos t
=--根号3/2
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