作业帮y=f[(x-1)/(x+1)],f'(x)=arctanx^2,求dy/dx,dy
来源:学生作业帮助网 编辑:作业帮 时间:2024/04/28 00:21:19
![y=f[(x-1)/(x+1)],f'(x)=arctanx^2,求dy/dx,dy](/uploads/image/z/1730711-47-1.jpg?t=y%3Df%5B%28x-1%29%2F%28x%2B1%29%5D%2Cf%27%28x%29%3Darctanx%5E2%2C%E6%B1%82dy%2Fdx%2Cdy)
y=f[(x-1)/(x+1)],f'(x)=arctanx^2,求dy/dx,dy
y=f[(x-1)/(x+1)],f'(x)=arctanx^2,求dy/dx,dy
y=f[(x-1)/(x+1)],f'(x)=arctanx^2,求dy/dx,dy
y=f[(x-1)/(x+1)],f'(x)=arctanx^2,求dy/dx,dy
两边对x求导:
dy/dx=f'[(x-1)/(x+1)]*2/(x+1)^2
=arctan[(x-1)/(x+1)]^2*2/(x+1)^2
dy=f'[(x-1)/(x+1)]*2/(x+1)^2
=arctan[(x-1)/(x+1)]^2*2/(x+1)^2*dx
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