What You Will Learn Today
- Find the conjugate of any complex number
- Compute the modulus using
- Divide complex numbers by multiplying by the conjugate
- Express division results in standard form
The Conjugate Product You Already Know
From last lesson:
The result is real. Its square root is
We call
The modulus is the square root of the conjugate product.
Modulus as a Distance in the Plane
The Conjugate: Flip the Imaginary Sign
Conjugate of
Only the imaginary sign flips.
Conjugate vs. Negation: Know the Difference
These are different operations:
| Operation | Result | |
|---|---|---|
| Conjugate |
flip imaginary sign | |
| Negation |
flip both signs |
Conjugate: mirror across the real axis. Negation: rotate 180°.
The Modulus Formula Uses Both Parts
Quick Check: Conjugate and Modulus
Compute for each:
: find and : find and
For problem 1: both parts give a whole-number modulus.
Recall: Rationalizing a Radical Denominator
- Problem:
— radical in denominator is not simplified form - Move: Multiply by
— value unchanged, form changed - Result:
— denominator is now rational
Can you describe why multiplying by a form of 1 clears the radical?
Division Uses the Same Tool as Rationalization
Real algebra:
Complex division:
The conjugate plays the role of
Division Strategy: Multiply by One
To compute
The denominator
You are multiplying by 1 — the value doesn't change, only the form.
Four Steps for Complex Division
Step 1: Identify the conjugate of the denominator.
Step 2: Multiply both numerator and denominator by it.
Step 3: Expand the numerator (FOIL, replace
Step 4: Denominator
Each step uses skills you already have.
Division Example: Two Plus Three i
Division Example: Five Plus i
Step 1: Conjugate of
Step 2:
Step 3: Numerator:
Step 4: Denominator:
Guided Practice: Complete the Division
Given:
Steps 1–2 done:
Step 3: Expand numerator:
Step 4: Denominator
Complete steps 3 and 4.
Spot the Errors in This Division
Two errors are hidden above. Find and correct both.
Three Computations With No Scaffolding
Write each result in
- Find
and for - Compute
- Use modulus to check: is
?
Modulus of a Product Is Multiplicative
Property:
Let
, so ✓
Both routes give the same answer.
Watch for These Three Common Errors
- Wrong conjugate:
, not — only imaginary sign flips - Numerator skipped: multiply
to both top and bottom, not denominator only - Denominator sign:
, not —
What You Now Know About Complex Numbers
✓
✓
✓ Divide: use
✓
Conjugate ≠ negation
Next Lesson: The Complex Plane
In HSN.CN.B.4, you'll plot complex numbers as points
The modulus
The conjugate