The angle of the complex number

The distance from the origin

The real part of the complex number

The imaginary part of the complex number

It is stretched vertically

It is shifted 3 units to the right

It is shifted 3 units to the left

It is reflected over the x-axis

Moving the circle along the real axis

Changing the radius of the circle

Reflecting the circle over the imaginary axis

Rotating the circle around the origin

It is the axis of symmetry for a circle

It divides the complex plane into two equal halves

It is the line equidistant from two points

It represents the shortest path between two points

Calculating the derivative

Applying the distance formula

Using the quadratic formula

Finding the midpoint

A quadratic equation

A linear equation

A cubic equation

A constant value

To make the problem more complex

To eliminate the need for graphing

To avoid using the distance formula

To verify the accuracy of solutions