Recall: Coordinate Plane and Plotting Points
- Two axes: horizontal
-axis and vertical -axis - Plotting
: 3 units right, 4 units up — unique point - Quadrant rule: signs of
and determine the quadrant
Can you plot
The Complex Plane Is the Coordinate Plane
Start with a familiar coordinate plane. Rename the axes:
- Horizontal axis: real axis (instead of x-axis)
- Vertical axis: imaginary axis (instead of y-axis)
You already know how to do this.
Five Complex Numbers on the Plane
Rectangular Form: Two Perpendicular Moves
The form
: real part → horizontal position : imaginary part → vertical position
Axis rules:
: on the real axis : on the imaginary axis
Reading and Plotting in Both Directions
| Point | |||
|---|---|---|---|
Quick Check: Plot and Read
- Plot on the complex plane:
, , - A point is at
on the complex plane. Write it as .
Problem 2: real part is 0.
Two Addresses for the Same Location
One location, two descriptions:
- Rectangular: "3 blocks east, 4 blocks north" → position
- Polar: "5 blocks at 53° from east" → same point
Both are correct. Neither is more right.
Complex numbers have the same two systems.
Polar Coordinates: Modulus and Argument
Every nonzero complex number has:
- Modulus
: distance from origin - Argument
: angle from positive real axis
For
Polar Form of a Complex Number
Conversion Formulas and the Quadrant Rule
Rectangular → Polar:
Polar → Rectangular:
Plot the point first. If
Rectangular to Polar: Worked Example
Convert
Step 1:
Step 2:
Polar form:
Check:
Polar to Rectangular: Worked Example
Convert
Step 1:
Step 2:
Rectangular form:
Quadrant Trap: Second Quadrant Example
Convert
Quick Check: Convert Both Ways
- Convert
to polar form. Exact . - Convert
to rectangular form.
Problem 1: identify the quadrant before computing
Are These the Same Number?
Convert
So
Different forms. Same number.
Each Form Has Its Strongest Use
| Task | Best form |
|---|---|
| Add complex numbers | Rectangular — add parts |
| Multiply complex numbers | Polar — multiply |
| Find modulus | Either |
Preview:
Polar Form Makes Squaring One Line
Square:
Polar squaring: multiply the modulus, double the angle.
Three Computations: No Help Provided
- Plot
. State the quadrant. - Convert
to polar form. Give exact . - Convert
to rectangular form.
Watch for These Three Common Errors
- Axis labels: Imaginary axis is numbered 1, 2, 3 — not
- Quadrant error:
returns — plot first, add when - Negative
: — sign belongs in , not
What You Now Know About the Complex Plane
✓
✓
✓ Polar form:
✓ Both forms: same number, different description
Next Lesson: Multiplication as Rotation
In HSN.CN.B.5, you'll multiply complex numbers geometrically.
The product's modulus multiplies. The product's argument adds.