z^3=8i=8e^{\dfrac{i\pi}2}=8e^{\left(2k\pi+\dfrac\pi2\right)i} where k is any integer z=2e^{\dfrac{(4k+1)\pi i}6} where k\equiv0,1,2\pmod3 (See this ) Now use Euler Formula

Let w be orthogonal to v, \lVert v \rVert = \lVert w \rVert = 1. We have \lVert \sin(\phi) w + \cos(\phi) v \rVert^2 = \sin(\phi)^2 + \cos(\phi)^2 = 1 and (v, \sin(\phi) w + \cos(\phi) v) = \cos(\phi)

observe that \rho = 3 \sec \phi is the same thing as \rho \cos\phi =3 , or as you have pointed out yourself z=3. Hence the surface is the plane z=3.

false ... the volume of the cone is missing. the volume element in spherical coordinate does not go straight in blocks. It goes radially. If you rotate the below figure by 360^\circ and from \pi/3 \to 2 \pi/3 ...

In spherical coordinates, you are looking for the volume of the following region: E=\{(\rho,\theta,\phi)\;|\;0\le \rho\le 4\cos\phi,0\le \theta \le2\pi, 0\le \phi\le\frac{\pi}{4}\} So your ...

To check the Cauchy-Riemann equations we only need to compute the partial derivatives. For the given function, the partial derivatives at 0 are easily computed, \frac{\partial f}{\partial x}(0) = \lim_{x\to 0} \frac{f(x) - f(0)}{x} = \lim_{x\to 0} \frac{1}{x}\cdot f(x) = \lim_{x\to 0} \frac{1}{x}\cdot \frac{x^3}{x^2} = 1, ...