用分部积分法求下列不定积分:
(1)∫xsinzdx;
(2)∫xe2xdx;
(3)∫ln(x+1)dx
【正确答案】:(1)∫xsinxdx=-∫xdcosx =-(xcosx-∫cosxdx) =-xcosx+sinx. (2)∫xe2xdx=1/2∫xde2x =1/2(xe2x—∫e2xdx) =1/2xe2x一1/4∫e2xd(2x) =1/2xe2x-1/4e2x+C. (3)∫ln(x+1)dx=xln(x+1)-∫x•1/(x+1)dx =xln(x+1)-∫[(x+1-1)/(x+1)]dz =xln(x+1)-∫[1-1/(x+1)]dx =xln(x+1)-x+ln|x+1|+C
