What You Will Learn Today
- Explain why
is defined by - Write any complex number in standard form
- Classify numbers as pure real, pure imaginary, or mixed
- Evaluate integer powers of
using the four-cycle
Recall: What Squaring Real Numbers Produces
- Positive:
, — result is positive - Negative:
, — result is still positive - Zero:
— the only square that equals zero
Can you name a real number whose square is negative?
Can You Solve ?
: ✗ — : ✗ : ✗ — : ✗
Every square ≥ 0 —
All Real Squares Land at Zero or Greater
The real number line has no landing spot for
Each Number System Extended to Solve a Problem
- Counting numbers → couldn't solve
→ invented integers - Integers → couldn't solve
→ invented rationals - Rationals → couldn't solve
→ invented irrationals - Real numbers → can't solve
→ define complex numbers
The Imaginary Unit: Defined by
We define
This is a definition — not a calculation from previous rules.
Two solutions:
Name Both Solutions to
What are the two solutions to
Write your answer before the next slide.
Introducing Standard Form:
Every complex number is written
is the real part; is the imaginary part (a real coefficient)- Like
packages two values into one point, packages two reals
Reading and from Any Complex Number
Every real number is a complex number — just with imaginary part
The Imaginary Part Is , Not
Given
- Imaginary part =
✓ (the real coefficient) - Imaginary part =
✗ (that's the imaginary term)
Compare: in
The coefficient is the part; the full term includes the variable.
Three Categories of Complex Numbers
- Pure real:
→ e.g. - Pure imaginary:
→ e.g. - Mixed:
→ e.g. - Zero:
→
Real Numbers Live Inside Complex Numbers
Complex Numbers Cannot Be Ordered Like Reals
Is
- Real-part comparison:
larger ( ) - Imaginary-part comparison:
smaller ( )
No consistent ordering exists — complex numbers live on a plane, not a line.
Spot the Error in These Identifications
One row has a wrong imaginary part. Which one, and what should it be?
| Complex number | ||
|---|---|---|
Your Turn: Identify and
For each complex number, write the real part and imaginary part:
Write $a = $ and $b = $ for each before advancing.
Write Form and Classify Each
For each: write in
No hints — complete all five.
Higher Powers Need No New Rules
Replace
Deriving the Period-4 Cycle of Powers
From
← cycle repeats
Use the Remainder to Evaluate
Divide
: — : — : — :
Applying the Remainder Rule:
Step 1: Divide the exponent by 4
Step 2: Remainder 3 →
Check:
Applying the Remainder Rule:
Step 1: Divide the exponent by 4
Step 2: Remainder 0 →
Multiples of 4 always give
Quick Check: and
Evaluate each using the remainder method:
Use
Practice: Powers, Parts, and Classification
Evaluate each:
- Real part of
- Imaginary part of
- Classify
and explain why
What You Now Know About Complex Numbers
✓
✓ Form
✓ Powers cycle period 4; divide exponent by 4
Reals are complex:
Next Lesson: Arithmetic with Complex Numbers
In HSN.CN.A.2, you'll add, subtract, and multiply complex numbers in standard form.
Every computation uses
Click to begin the narrated lesson
Know the imaginary unit and complex number form