Complex Number Multiplication and Rotation

A 90° rotation in the complex plane

A reflection over the real axis

A translation along the imaginary axis

A scaling by a factor of J

They remain unchanged

They are both negated

They switch places with a sign change

They are added together

A 180° rotation

A 90° clockwise rotation

A 90° counterclockwise rotation

A reflection over the imaginary axis

e to the J 90°

e to the J 180°

e to the J 45°

e to the J 0°

It scales the magnitude by J

It adds 90° to the angle

It subtracts 90° from the angle

It doubles the angle

It is the real part of the complex number

It is the angle of rotation from the real axis

It represents the magnitude of the complex number

It is the imaginary part of the complex number

It eliminates the need for imaginary numbers

It allows for easier addition of complex numbers

It provides a clear geometric interpretation

It simplifies the calculation of magnitude

It becomes zero

It halves

It doubles

It remains the same

The exponents are subtracted

The exponents are multiplied

The exponents are added

The exponents are divided

Measuring power consumption

Calculating resistance in circuits

Analyzing current and voltage in inductors and capacitors

Designing digital circuits