作业帮∫(arctan√x)/[√x*(1+x)]dx
来源:学生作业帮助网 编辑:作业帮 时间:2024/05/09 14:36:51
![∫(arctan√x)/[√x*(1+x)]dx](/uploads/image/z/2650929-33-9.jpg?t=%E2%88%AB%28arctan%E2%88%9Ax%29%2F%5B%E2%88%9Ax%2A%281%2Bx%29%5Ddx)
∫(arctan√x)/[√x*(1+x)]dx
∫(arctan√x)/[√x*(1+x)]dx
∫(arctan√x)/[√x*(1+x)]dx
一步一步微分、积分并用,就可以还原出原函数,也就是一些教师所说的“还原法”,或“凑微分法”:
∫(arctan√x)/[√x×(1+x)]dx
=2∫(arctan√x)/[1+x]d√x
=2∫(arctan√x)/[1+(√x)²]d√x
=2∫(arctan√x)d(arctan√x)
= arctan²√x + C
d(artan√x) = 1/(1+x) d(√x) = 1/2√x*(1+x) dx;
∫(arctan√x)/[√x*(1+x)]dx
= ∫ 2(arctan√x) d(arctan√x)
= (arctan√x)^2 + C .
证明:令t=√x =>x=t^2 dx=2*t*dt
∫(arctan√x)/[√x*(1+x)]dx=∫(arctan(t)/(t*(1+t^2))*2*t*dt
=2∫(arctan(t)/(1+t^2)*dt
=2∫arctan(t)*d(arctan(t))
=arctan^2(t)+C
证毕!
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