Loci and Distances in Complex Numbers

Analyzing quadratic functions

Studying linear equations

Delving into deeper representations and transformations

Exploring real numbers

A fixed point on the Argand diagram

A path traced by a complex number

A type of transformation

A real number

As a vector

As an imaginary number

As a real number

As a modulus

It forms a perpendicular bisector

It forms a circle

It forms a triangle

It forms a straight line

Calculating the modulus

Finding the argument

Using the Cartesian form

Graphing the complex number

A linear equation

A quadratic equation

A circle equation

A cubic equation

(12, -10)

(10, -12)

(-10, 12)

(-12, 10)

By comparing distances

By drawing vectors

By calculating areas

By measuring angles

The distance from Z2 is double that of Z1

The distances are equal

The distance from Z1 is double that of Z2

The distance from Z1 is half of Z2

It is easier to visualize

It provides exact solutions

It is faster than geometry

It avoids complex calculations