Complex Numbers and Their Transformations

It reflects the number across the real axis.

It leaves the number unchanged.

It doubles the modulus of the number.

It rotates the number by 90 degrees counterclockwise.

The modulus is doubled.

The modulus becomes zero.

The modulus is halved.

The modulus remains the same.

The argument is negated.

The argument is doubled.

The argument is decreased by π/2.

The argument is increased by π/2.

The modulus is doubled.

The modulus remains unchanged.

The modulus is halved.

The modulus is squared.

The argument is doubled.

The argument is unchanged.

The argument is negated.

The argument is halved.

A scaling and rotation.

A reflection across the real axis.

A translation along the real axis.

A rotation by 180 degrees.

It moves to the opposite side of the origin.

It remains at the same distance from the origin.

It moves further from the origin.

It moves closer to the origin.

The modulus remains the same.

The modulus is squared.

The modulus is halved.

The modulus becomes the reciprocal of the original modulus.

The argument remains unchanged.

The argument is halved.

The argument is doubled.

The argument is negated.

It scales the number down and rotates it.

It leaves the number unchanged.

It rotates the number by 180 degrees.

It reflects the number across the imaginary axis.