z=x+iy
代入得:f(z)=(x+iy)³+2i(x+iy)
=x³+3ix²y-3xy²-iy³+2ix-2y
=x³-3xy²-2y+i(3x²y-y³+2x)
则:u=x³-3xy²-2y,v=3x²y-y³+2x
解析要求满足柯西黎曼条件
∂u/∂x=∂v/∂y,∂u/∂y=-∂v/∂x
∂u/∂x=3x²-3y²,∂v/∂y=3x²-3y²二者相等
∂u/∂y=-6xy-2,∂v/x=6xy+2二者互为相反数,满足柯西黎曼条件,因此该函数在复平面处处解析
f '(z)=3z²+2i