Mathematics · Topic Cheatsheet
Advanced Complex Numbers (HL)
18 key results accumulated across 2 chapters.
Three equivalent forms
Ch 1
Cartesian for +/−, polar for ×/÷/powers, exponential most compact.
Euler's formula
Ch 1
Derived by substituting into the Maclaurin series of and grouping real and imaginary parts.
Euler's identity
Ch 1
Special case at . Uses each once.
Four quadrant values
Ch 1
Multiplication rule
Ch 1
Imaginary exponents obey the same exponent law as real ones.
Common trap
Ch 1
Track every power of during Maclaurin substitution — (even power flips sign back to positive).
Locus — circle
Ch 2
All complex numbers at distance from form a circle of radius centred at .
Locus — disk
Ch 2
Open disk interior. Use for closed disk; for exterior.
Locus — perpendicular bisector
Ch 2
All points equidistant from and form the perpendicular bisector of segment .
Locus — ray
Ch 2
Half-line from in direction (not the full line).
Locus — vertical / horizontal line
Ch 2
De Moivre's theorem
Ch 2
Source of multi-angle identities — expand binomially and equate real/imaginary parts.
Double-angle from De Moivre
Ch 2
From .
Triple-angle from De Moivre
Ch 2
Rational power — number of values
Ch 2
When is in lowest terms. They sit equally spaced around a circle of radius .
Phasor (real-world bridge)
Ch 2
Encode amplitude (modulus) and phase (argument) of an oscillation as one complex number.
Common trap — locus rewriting
Ch 2
Rewrite the equation as BEFORE reading off the centre. means , not .
Common trap — multi-valued powers
Ch 2
Always list ALL values for . Stating only one loses most of the answer.