∫ arctanx / （x-1）的3次方 dx 求详解

smilingxj2022-10-04 11:39:542条回答

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isjing 共回答了16个问题 | 采纳率93.8%: 分部积分法
∫arctanx/(x-1)^3dx
=-2∫arctanxd1/(x-1)^2
=-2(arctanx*1/(x-1)^2-∫1/(x-1)^2darctanx)
=-2(arctanx*1/(x-1)^2-∫1/(x-1)^2*1/(1+x^2)dx)
∫1/(x-1)^2*1/(1+x^2)dx
=∫1/[(x-1)^2*(1+x^2)]dx
已经到达有理函数积分了
设1/(x-1)^2*1/(1+x^2)=A/(x-1)+B/(x-1)^2+(Cx+D)/(x^2+1)
分别解得A=-1/2 B=1/2 C=1/2 D=0
∫1/(x-1)^2*1/(1+x^2)dx
=-1/2∫1/(x-1)-1/(x-1)^2-x/(x^2+1)dx
=-1/2[∫1/(x-1)dx-∫1/(x-1)^2dx-∫x/(x^2+1)dx]
=-1/2[ln｜x-1｜+1/(x-1)-1/2ln(x^2+1)]+C
所以
∫arctanx/(x-1)^3dx
=-2(arctanx*1/(x-1)^2+1/2[ln｜x-1｜+1/(x-1)-1/2ln(x^2+1)]+C
ok.; 1年前

lim(x→0) arctanx / 2x ＝1/2怎么来的 等我一分钟1年前1: cc桥梁共回答了23个问题 | 采纳率87%

1、把 arctanx用泰勒展开
2、洛比达法则

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