• 1.

  draft
  Write complex numbers in real-imaginary form.
• 2.

  draft
  Modulus and argument of a single complex number, where $\mathrm{Re}(z)=\mathrm{Im}(z)$.
• 3.

  draft
  Modulus and argument of a single complex number $z=z_1/z_2$, where $\mathrm{Re}(z_1)=\mathrm{Im}(z_1)$ and $\mathrm{Re}(z_2)=-\mathrm{Im}(z_2)$.
• 4.

  Ready to use
  Calculation of modulus, argument, multiplication by complex conjugate, given two complex numbers.
• 5.

  Ready to use
  Polar form of a complex number.
• 6.

  draft
  Express $f(z)$ in real-imaginary form, given that $z=x+iy$.
• 7.

  draft
  Express $f(z)$ in real-imaginary form, given that $z=x+iy$, where $f(z)$ involves hyperbolic functions.
• 8.

  Ready to use
  Calculate the principal value of a complex number.
• 9.

  draft
  Expressing $\log(f(i))$ in the form $u+iv$.  Principal values of log.
• 10.

  draft
  Find the roots of $\sin(z)=a$.
• 11.

  draft
  Cauchy's integral theorem/formula for several functions $f(z)$ and $C$ the unit circle.
• 12.

  draft
  Contour integral of $z^2$ along any path.
• 13.

  draft
  Contour integral of $\mathrm{e}^{-z}$ along any path.
• 14.

  draft
  Poles, residues, and contour integral of a complex-valued function.  Pair of pure imaginary poles.
• 15.

  draft
  Poles, residues, and contour integral of a complex-valued function.  Pair of real poles.
• 16.

  draft
  Poles, residues, and contour integral of a complex-valued function.  Single, simple pole.
• 17.

  draft
  Contour integral of a complex-valued function $f(z)$ with the poles of $f(z)$ either inside or outside the path $C$.

There are no questions in this group.