Algebra and Geometry in the complex plane

The complex plane is the visualization of complex numbers as points in $R^{2}$ , with the real part on the horizontal axis and the imaginary part on the vertical axis. The geometric viewpoint connects complex algebra to plane geometry — addition becomes vector addition, multiplication becomes rotation and scaling.

Complex numbers

A complex number has the form

$z = x + i y$

where $x = Re (z)$ is the real part, $y = Im (z)$ is the imaginary part, and $i = - 1$ .

The set of complex numbers is denoted $C$ . The real numbers form the subset where $Im (z) = 0$ .

The complex plane is identified with $R^{2}$ via the bijection $x + i y \leftrightarrow (x, y)$ .

Addition and subtraction

Component-wise:

$(x_{1} + i y_{1}) + (x_{2} + i y_{2}) = (x_{1} + x_{2}) + i (y_{1} + y_{2})$

Geometrically, this is parallelogram-rule vector addition.

Multiplication

Use $i^{2} = - 1$ and distribute:

$(x_{1} + i y_{1}) (x_{2} + i y_{2}) = x_{1} x_{2} - y_{1} y_{2} + i (x_{1} y_{2} + x_{2} y_{1})$

Geometrically, multiplication scales by the product of magnitudes and rotates by the sum of arguments — see Polar representation of complex numbers.

Conjugate

The complex conjugate of $z = x + i y$ is

$\overset{z}{ˉ} = x - i y$

Geometrically: reflection across the real axis. Properties:

$z + \overset{z}{ˉ} = 2 Re (z)$
$z - \overset{z}{ˉ} = 2 i Im (z)$
$z \overset{z}{ˉ} = x^{2} + y^{2} = ∣ z ∣^{2}$
$\overline{z_{1} + z_{2}} = \overset{z}{ˉ}_{1} + \overset{z}{ˉ}_{2}$
$\overline{z_{1} z_{2}} = \overset{z}{ˉ}_{1} \overset{z}{ˉ}_{2}$

Modulus (absolute value)

The modulus $∣ z ∣$ is the distance from the origin:

$∣ z ∣ = x^{2} + y^{2}$

Properties:

$∣ z ∣ \geq 0$ , with equality iff $z = 0$ .
$∣ z_{1} z_{2} ∣ = ∣ z_{1} ∣ \cdot ∣ z_{2} ∣$ .
$∣ z_{1} + z_{2} ∣ \leq ∣ z_{1} ∣ + ∣ z_{2} ∣$ (triangle inequality).

Division

Multiply numerator and denominator by the conjugate of the denominator:

$\frac{z _{1}}{z _{2}} = \frac{z _{1} z ˉ _{2}}{z _{2} z ˉ _{2}} = \frac{z _{1} z ˉ _{2}}{∣ z _{2} ∣ ^{2}}$

This rationalizes the denominator and gives an explicit form for the quotient.

Algebraic structure

$C$ forms a field: closed under addition, multiplication, and division (by nonzero elements), with associative, commutative, and distributive laws. It’s algebraically closed — every non-constant polynomial with complex coefficients has a complex root (Fundamental Theorem of Algebra).

Why this matters

Complex numbers come up in:

Electrical engineering: phasors and AC circuit analysis. See Phasor.
Signal processing: Fourier transforms.
Quantum mechanics: wave functions are complex-valued.
Differential equations: complex eigenvalues correspond to oscillatory solutions. See Complex conjugate eigenvalues case.
Geometry: complex multiplication is rotation + scaling.

For the polar form (radius/angle parameterization), see Polar representation of complex numbers.

Idriss Rami — Notes

Explorer