FAC1004 Tutorial 2 — Complex Numbers
Practice problems on complex numbers, powers, De Moivre's theorem, and roots.
Topics Covered
- Powers of complex numbers in polar form
- De Moivre's theorem applications
- Euler's formula and exponential form
- Finding n-th roots of complex numbers
- Solving polynomial equations with complex roots
Problem Set
-
Powers in Cartesian Form: Given $z_1 = -4 + 4i$ and $z_2 = -2\sqrt{3} + 2i$, find $(z_1)^3$ and $(z_2)^4$
-
Simplification: Simplify expressions involving $(\cos x + i\sin x)$ terms
-
Exponential and Cartesian Form: Express complex numbers in both exponential and Cartesian forms
-
Argument Calculations: Calculate arguments and moduli of complex expressions
-
Euler's Identity Applications: Show that $e^{ix} + e^{-ix} = 2\cos x$ and related identities
-
Multiple Angle Formulas: Prove $\cos(5\theta)$ and $\sin(5\theta)$ formulas
-
Cube Roots: Find cube roots of various complex numbers
-
n-th Roots of Unity: Find tenth roots of 1 and classify by quadrant
-
Polynomial Roots: Find all $z$ for which $z^5 = -32i$ with $\text{Im}(z) > 0$
-
Complex Polynomial Equations: Given a root, find coefficients of polynomial
-
Complex Roots: Find roots of various complex numbers
-
Complex Equations: Solve for $z = x + iy$ in various equations
Related
- FAC1004 - Advanced Mathematics II (Computing) — main course page
- Complex Numbers — concept page
- FAC1004 L01 — Complex Numbers — related lecture
- FAC1004 L02 — Euler's Formula — related lecture
- FAC1004 L5-L6 — Functions of Complex Numbers (n-th Roots) — related lecture
Source File
TUTORIALS_SET_2526/FAC1004 Tutorial 2 25-26.pdf