不定积分问题 如图
1个回答
展开全部
令t=e^x.则x=lnt
∫(arctan(e^x)/e^(2x))dx
=∫(arctant/t²)dlnt
=∫(arctant/t³)dt
= -1/2∫arctantd(1/t²)
=-1/2(arctant/t²-∫(1/t²)darctant)
=-1/2(arctant/t²-∫(1/(t²(t²+1))dt)
=-1/2(arctant/t²-∫((1/t²)-(1/(t²+1))dt)
=-1/2(arctant/t²-∫(1/t²)dt+∫(1/(t²+1))dt
=-1/2(arctant)/t²-1/(2t)-(arctant/)2+C
=-1/2(arctane^x)/e^(2x)-1/(2e^x)-(arctane^x)/2+C
∫(arctan(e^x)/e^(2x))dx
=∫(arctant/t²)dlnt
=∫(arctant/t³)dt
= -1/2∫arctantd(1/t²)
=-1/2(arctant/t²-∫(1/t²)darctant)
=-1/2(arctant/t²-∫(1/(t²(t²+1))dt)
=-1/2(arctant/t²-∫((1/t²)-(1/(t²+1))dt)
=-1/2(arctant/t²-∫(1/t²)dt+∫(1/(t²+1))dt
=-1/2(arctant)/t²-1/(2t)-(arctant/)2+C
=-1/2(arctane^x)/e^(2x)-1/(2e^x)-(arctane^x)/2+C
已赞过
已踩过<
评论
收起
你对这个回答的评价是?
推荐律师服务:
若未解决您的问题,请您详细描述您的问题,通过百度律临进行免费专业咨询
