Complex Number I - Presentation

COMPLEX NUMBERS

Beertino
John
Yeong Hui
Yu Jie

CONTENTS
Beertino Yeong Hui
 Approaches/pedagogy  A level syllabus
 Diophantus’s problem  Pedagogical Consideration
 roots of function  Multiplication
 Cubic Example and Division of
complex numbers
 Complex conjugates
Yu Jie
 A level syllabus
 Pedagogical considerations
 Basic definition & John
Argand Diagram  A Level syllabus
 Addition and  Pedagogical considerations
Subtraction of
complex numbers  Learning difficulties
 Uniqueness of Complex Numbers

APPROACHES/PEDAGOGY
 Axiomatic Approach
 Common in textbooks.
 Start by defining complex numbers as numbers of the form a+ib where a, b are real
numbers.

Back to Table of contents Diophantus’s problem

APPROACHES/PEDAGOGY
 Utilitarian Approach
 Briefly describe Complex Numbers lead to the theory of fractals
 It allows computer programmers to create realistic clouds and mountains in video
games.


APPROACHES/PEDAGOGY
 Totalitarian Approach! ( Just kidding )


APPROACHES/PEDAGOGY
 Historical Approach
 Why this approach?
 Real questions faced by mathematicians.
 Build on pre-existing mathematical knowledge,
 Quadratic formula
 Roots.


APPROACHES/PEDAGOGY
 So, how does the approach goes?
 First, bring about the quadratic problem.
 Tapping on prior knowledge
 Quadratic formula.
 Roots of an equation.
 Followed with definition of root.
 Then sub value into root to get a cognitive conflict.

 Give another example, this time it’s cubic
 Tap on prior knowledge again
 Completing Square to get to Completing Cube (Cardano’s Method)

 Solve to get a weird answer.
 Show that weird answer is 4, and get another cognitive conflict.


DIOPHANTUS’S PROBLEM

 Diophantus' Arithhmetica (C.E 275) A right-angled triangle has area 7
square units and perimeter 12 units. Find the lengths of its sides.

Approaches/Pedagogy Back to Table of contents Root of Function

SOLUTION AND PROBLEM

Approaches/Pedagogy Back to Table of contents Root of Function

ROOT OF FUNCTION

Diophantus’s problem Back to Table of contents Cubic Example

CUBIC EXAMPLE

Root of Function Back to Table of contents

LASTLY

Root of Function Back to Table of contents

A-LEVEL SYLLABUS

Back to Table of contents Pedagogical considerations

PEDAGOGICAL CONSIDERATIONS

 Operations in complex plane is
similar but not exactly the same
as vector geometry (see complex
multiplication and division)
 Building on Prior Knowledge
 Rules-Based Approach vs
Theoretical Understanding

SyllabusBack to table of contents (Teaching) Basic Definition


 Multimodal Representation and usage of similarity in
vector geometry for teaching of complex addition and
subtraction
 Algebraic proof for uniqueness of complex numbers
and should it be taught specifically
 No ordering in complex plane, not appropriate to talk
about
z1 > z2
 ordering is appropriate for modulus, since modulus of
complex numbers are real values

SyllabusBack to table of contents (Teaching) Basic Definition

BASIC DEFINITONS

First defined by Leonard Euler, a swiss
mathematician, a complex number, denoted
by i, to be i2 = -1

In general, a complex number z can be
written as

where x denotes the real part and y denotes
the imaginary part

Pedagogical considerationsBack to Table of contents Argand Diagram

ARGAND DIAGRAM
z=x+yi
Im(z)
x : Real Part
P(x,y) y : Imaginary
y Part

Important aspect,
common student
error is forgetting
Re(z)
0 x that x,y are both
real valued

Basic DefinitionsBack to Table of contents Addition

EXTENSION FROM REAL NUMBERS
(ENGAGING PRIOR KNOWLEDGE)
The Real Axis
Im(z)
(x-axis) represents
the real number
z line.
y

|z| In other words the
real numbers just
have the imaginary
θ part to be zero.
Re(z)
0 x
e.g. 1 = 1 + 0 i

Basic DefinitionsBack to Table of contents Addition

ADDITION OF COMPLEX NUMBERS
 Complex Addition
 Addition of 2 complex numbers
 z1 = x1 + y1i, z2 = x2 + y2i
 z1 + z2 = (x1 + y1i) + (x2 + y2i)
= (x1 + x2) + (y1 + y2) i
 Addition of real and imaginary portions and summing the 2
parts up
 Geometric Interpretation (vector addition)

Rationale
Multimodal Representation: Argand Diagram
Engaging prior knowledge: Addition for Real Numbers

Argand DiagramBack to Table of contents Subtraction

MMR IN ADDITION
 Multimodal Representation used: Pictorial
 Geometric Interpretation
 Vector Addition

Im(z)

z1 z1+z2

z2
Re(z)
0

Argand DiagramBack to Table of contents Subtraction

SUBTRACTION OF COMPLEX NUMBERS

 Complex Subtraction
 Difference of 2 complex numbers
 z1 = x1 + y1i, z2 = x2 + y2i

 z1 - z2 = (x1 + y1i) - (x2 + y2i)
= (x1 - x2) + (y1 - y2) i
 Subtraction of real and imaginary portions and summing the 2
parts up
 Geometric Interpretation (vector subtraction)
Rationale
Engaging prior knowledge: Subtraction for Real Numbers

AdditionBack to Table of contents Uniqueness

MMR IN SUBTRACTION
 Multimodal Representation used: Pictorial
 Geometric Interpretation
 Vector Subtraction
Im(z)

z1-z2 z1

Re(z)
-z2 0

AdditionBack to Table of contents Uniqueness

UNIQUENESS OF COMPLEX NUMBERS

 If two complex numbers are the same, i.e. z1 = z2, then their real parts
must be equal, and their imaginary parts are equal.

 Algebraically, let z1 = x1 + y1i, z2 = x2 + y2 i, if z1 = z2 then we have

 x1 = x2 and y1 = y2

 Geometrically, from the argand diagram we can see that if two complex
numbers are the same, then they are represented by the same point on
the argand diagram, and immediately we can see that the x and y co-
ordinates of the point must be the same.

Subtraction Back to table of contents

A-LEVEL SYLLABUS

Back to Table of contents Pedagogical Considerations


 Operations in complex plane is similar but not exactly the same as
vector geometry (see complex multiplication and division)

 Limitations in relating to Argand diagram (pictorial) for teaching of
complex multiplication and division in Cartesian form

 Building on Prior Knowledge

 Rules-Based Approach vs Theoretical Understanding

Syllabus Back to table of contents Multiplication


 Properties…
 of complex multiplication assumed
(commutative, associative, distributive over complex addition)
 of complex division assumed
(not associative, not commutative)
 of complex conjugates
(self-verification exercise)

 Notion of identity element, multiplicative inverse

 Use of GC
 Accuracy of answers

Syllabus Back to table of contents Multiplication

MULTIPLICATION OF COMPLEX NUMBERS

 Complex multiplication
 Multiplication of 2 complex numbers
 z1 = x1 + y1i, z2 = x2 + y2i
 z1 z2 = (x1 + y1i) (x2 + y2i)
= x1x2 + x1y2i + x2y1i - y1y2i2
= (x1x2 - y1y2 ) + (x1y2+ x2y1)i
 Geometric Interpretation (Modulus Argument form)

Rationale
Engaging prior knowledge: Multiplication for Real Numbers

Pedagogical considerations Back to Table of contents Division


 Complex multiplication
 Scalar Multiplication
 z = x + yi, k real number
kz = k(x + yi)
= kx + kyi
 Geometric Interpretation (vector scaling)
 k ≥ 0 and k < 0

Rationale



 i4n = I, i4n+1 = i, i4n+2 = -1, i4n+3 = -I for any integer n
 Explore using GC (Limitations)

 Extension of algebraic identities from real number system
 (z1 + z2 )(z1 – z2 ) = z12 – z22
 (x + iy)(x – iy) = x2 – xyi + xyi + y2 = x2 + y2
 ALWAYS real

Rationale
Cognitive process: Assimilation


DIVISION OF COMPLEX NUMBERS
 Complex division
 Division of 2 complex numbers (Realising the denominator)
 z1 = x1 + y1i, z2 = x2 + y2i
.
z1 x1 + y1i x1 + y1i ( x2 − y2i ) x1 x2 + y1 y2 x2 y1 − x1 y2
= = = + 2 i
z2 x2 + y2i x2 + y2i ( x2 − y2i ) x2 + y2
2 2
x2 + y2 2

Rationale
Engaging prior knowledge: Rationalising the denominator

Multiplication Back to Table of contents Conjugates

DIVISION OF COMPLEX NUMBERS
 Solve simultaneous equations
(using the four complex number operations)

 Finding square root of complex number

Multiplication Back to Table of contents Conjugates

COMPLEX CONJUGATES
 Let z = x + iy. The complex conjugate of z is given by z* = x – iy.
 Conjugate pair: z and z*
 Geometrical representation: Reflection about the real axis

 Multiplication: (x + iy)(x – iy) = x2 + y2
 Division: Realising the denominator

Rationale
 Bruner’s CPA
 Recalling prior knowledge, Law of recency

DivisionBack to Table of contents Learning Difficulties

COMPLEX CONJUGATES
 Properties:
Exercise for students (direct verification)
 1. Re(z*) = Re(z); Im(z*) = -Im(z) 7. (z1 + z2)* = z1* + z2*
 2. |z*| = |z| 8. (z1z2)* = z1*z2*
 3. (z*)* = z 9. (z1/z2)* = z1*/z2*,
 4. z + z* = 2Re(z); z – z* = 2Im(z) if z2 ≠ 0
 5. zz* = |z|2
 6. z = z* if and only if z is real

Rationale
 Self-directed learning

DivisionBack to Table of contents Learning Difficulties

LEARNING DIFFICULTIES
/COMMON MISTAKES
 In z = x + yi, x and y are always REAL numbers

 Solve equations using z directly or sub z = x + yi

 Common mistake: (1 + zi)* = (1 – zi)
 Confused with (x + yi)* = (x - yi)

DivisionBack to Table of contents

PEDAGOGICAL CONSIDERATION
 Start with a simple quadratic equation
 Example: x2 + 2x + 2 = 0.

 Get students to observe and comment on the roots.

Rationale:
 Bruner’s CPA Approach: Concrete
 Engaging Prior Knowledge

SyllabusBack to Table of contents Learning Difficulties

 Direct attention to discriminant of quadratic equation
 What can we say about the discriminant?

Rationale:
 Engaging Prior Knowledge:
 Linking to O-Level Additional Maths knowledge
 Involving students in active learning (Vygotsky’s ZPD)


 Examples on Solving for Complex Roots of Quadratic
Equations
 Expose students to different methods:
 Quadratic Formula
 Completing the Square Method

Rationale:
Making Connections between real case and complex case
Getting students to think actively


 Different version: What if we are given one complex root?

Example:
If one of the roots α of the equation z2 + pz + q = 0 is 3 − 2i,
and p, q ∈ ℝ , find p and q.

Rationale:
Understanding and applying concepts learnt


Good to
 Fundamental Theorem of Algebra
know

Over the set of complex numbers, every polynomial with real
coefficients can be factored into a product of linear factors.

Consequently, every polynomial of degree n with real coefficients
has n roots, subjected to repeated roots.

Rationale:
Making Connections to Prior Knowledge in Real Case


Good to
 Visualizing Complex Roots
know
 Exploration with GeoGebra

Rationale:
Stretch higher ability students to think further
Motivates interest in topic of complex numbers


 Extending from quadratic equations to cubic equations
 Can we generalize to any polynomial?

 Recall: finding conjugate roots of polynomials with real
coefficients

Rationale:
Making sense through comparing and contrasting


LEARNING DIFFICULTIES
/COMMON MISTAKES
 X: complex roots will always appear in conjugate pairs

 ‘No roots’ versus ‘No real roots’

 Difficulty in applying factor theorem

 Careless when performing long division

 Application of ‘uniqueness of complex numbers’ does
not occur naturally

Pedagogical ConsiderationsBack to Table of contents

Complex Number I - Presentation

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