IB Maths AI HL Further Complex Numbers Paper 1 & 2 Argand transformations ~8 min read

Geometry of Complex Numbers

Every operation on a complex number has a picture on the Argand diagram. Adding is a translation, multiplying is a rotation paired with a scaling, and conjugating is a reflection. Once you see the geometry, the algebra makes intuitive sense.

📘 What you need to know

Addition z + w is the resultant of the two vectors — the diagonal of the parallelogram O, z, w, z+w.
Subtraction z − w uses the reverse vector −w. Order matters: z−w ≠ w−z.
Multiplying z₁ by z₂ scales by |z₂| and rotates by arg z₂.
Dividing by z₂ scales by 1/|z₂| and rotates by −arg z₂.
Special cases: × a real k is pure scaling; × i is a pure 90° rotation (counter-clockwise).
Conjugation z → z* is a reflection in the real axis.

Addition and subtraction as vectors

Treat each complex number as a vector from O. Addition uses the head-to-tail rule: travel along z then w, and the resultant is the diagonal of the parallelogram O, z, w, z+w. Order doesn’t matter: z + w = w + z.

For subtraction reverse the second vector first — z − w is z followed by −w. Swapping the order flips the result: w − z = −(z − w).

Translation interpretation: adding w = a + bi to z is the same as translating z by the column vector (a, b); subtracting w translates by (−a, −b).

Multiplication and division as scale and rotation

Multiplication has the most striking geometry. To form z₁z₂, take the arrow for z₁, rotate it about the origin by arg z₂, then stretch (or shrink) its length by the factor |z₂|. Division undoes both: rotate by −arg z₂ and stretch by 1/|z₂|.

Multiplying z = 3 + i by 2i: first i rotates 90° counter-clockwise to give iz (same length), then the factor 2 stretches to twice the length to land at 2iz.

Geometry of × and ÷ × z₂: enlarge by |z₂|, rotate by arg z₂ ÷ z₂: enlarge by 1/|z₂|, rotate by −arg z₂ the geometric reading of |z₁z₂| = |z₁||z₂| and arg(z₁z₂) = arg z₁ + arg z₂

Special cases: real, imaginary, and the conjugate

Three multipliers come up so often that their pictures are worth memorising. A real multiplier k has zero argument, so it scales but doesn’t rotate. A purely imaginary multiplier ki has argument ±π/2, so it rotates 90° and scales by k. Conjugation swaps y for −y — geometrically a reflection across the real axis.

Quick reference: × k (k real, positive) — pure scaling, no rotation; × i — rotate 90° counter-clockwise; × (−i) — rotate 90° clockwise; × (−1) — rotate 180°; z → z* — reflect in the real axis.

🧭 Recipe — sketching z₁z₂ geometrically

Plot z₁ and z₂ as vectors from the origin on an Argand diagram.
Read off |z₂| and arg z₂ — the scale factor and rotation angle.
Rotate the vector z₁ about the origin by arg z₂ (counter-clockwise if positive).
Scale the rotated vector by the factor |z₂| — stretch if > 1, shrink if < 1.
Mark and label the endpoint as z₁z₂; check by expanding (z₁)(z₂) algebraically.

Worked examples

WE 1

Addition on an Argand diagram

Given z = 1 + 4i and w = 5 + 2i, find z + w and describe its position on the Argand diagram.

add real parts, then imaginary parts (1 + 5) + (4 + 2)i = 6 + 6i geometric meaning z + w = 6 + 6i it sits at the fourth corner of the parallelogram with corners O, z, w — the diagonal from O.

WE 2

Subtraction is not commutative

Given z = 4 + 3i and w = 2 − i, find (a) z − w and (b) w − z. Compare them geometrically.

(a) z − w (4 − 2) + (3 − (−1))i = 2 + 4i (b) w − z (2 − 4) + (−1 − 3)i = −2 − 4i (a) 2 + 4i · (b) −2 − 4i opposite vectors: same length, opposite direction — order of subtraction flips the arrow.

WE 3

Multiplication as scale and rotation

Let z = 3 + i and w = 1 + i. (a) Find |w| and arg w. (b) State the transformation z undergoes when multiplied by w. (c) Find zw.

(a) |w| = √(1 + 1), arg w from quadrant 1 |w| = √2, arg w = π/4 (b) z is rotated by π/4 and scaled by √2 (c) expand zw = (3 + i)(1 + i) 3 + 3i + i + i² = 2 + 4i (a) √2, π/4 · (b) rotate by π/4, scale by √2 · (c) 2 + 4i check: |2 + 4i| = √20 = √10 × √2 = |z||w| — the rule lands true.

WE 4

Division by an imaginary number

Find (8 + 6i) ÷ (2i) in Cartesian form and describe what the transformation does geometrically.

multiply top and bottom by −i (the conjugate-trick for 2i) (8 + 6i)(−i) ÷ (2i)(−i) = (−8i − 6i²) ÷ 2 = (6 − 8i) ÷ 2 geometric meaning: |2i| = 2, arg(2i) = π/2 3 − 4i — scale by ½ and rotate by −π/2 starts in quadrant 1, ends in quadrant 4 — a clockwise quarter-turn plus a shrink to half-length.

WE 5

The conjugate as a reflection

Let z = 5 + 2i. Write down z* and describe the geometric relation between z and z*. Then evaluate zz*.

flip the sign of the imaginary part z* = 5 − 2i geometrically: reflection in the real axis zz* = (5 + 2i)(5 − 2i) = 25 − 4i² = 25 + 4 z* = 5 − 2i · zz* = 29 zz* is the product of mirror-image vectors — always a real number, equal to |z|².

WE 6

Full question: three transformations

Let z = 2 + 2i. (a) Find |z| and arg z. (b) Find iz in Cartesian form and describe how it relates to z geometrically. (c) Find zz*.

(a) |z| = √(4 + 4), arg z in quadrant 1 |z| = 2√2, arg z = π/4 (b) iz = i(2 + 2i) = 2i + 2i² = −2 + 2i × i ⇒ rotate z by 90° counter-clockwise; same modulus (c) zz* = (2 + 2i)(2 − 2i) = 4 − 4i² = 8 (a) 2√2, π/4 · (b) −2 + 2i, rotation +π/2 · (c) 8 notice 8 = (2√2)² = |z|², confirming zz* = |z|².

💡 Top tips

For addition use the parallelogram rule; for subtraction draw −w first, then add.
Multiplying by a positive real changes length only — angles stay the same.
Multiplying by i is a 90° counter-clockwise rotation; multiplying by −i is 90° clockwise.
Multiplying by −1 is a 180° rotation — the same as taking −z.
A point lies on the real axis iff z = z* — the reflection coincides with the original.

⚠ Common mistakes

Swapping the order of subtraction — z − w and w − z are opposite vectors, not the same.
Forgetting the rotation in multiplication — only scaling the length gives a wrong answer.
Wrong rotation direction — arg z₂ > 0 is counter-clockwise, arg z₂ < 0 is clockwise.
Confusing z* with −z — conjugate reflects in the real axis; −z is a 180° rotation.
Not adjusting the new argument back into −π < arg z ≤ π after a rotation pushes it past π.

Next up: Modulus-Argument (Polar) Form — rewriting z using its modulus and argument as z = r(cos θ + isin θ). The geometric rules from this note become an algebraic shortcut.

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