Carl Friedrich Gauss in 1831

William Rowan Hamilton in 1843

Albert Einstein in 1905

Isaac Newton in 1687

Calculating probabilities

Describing 3D rotations

Solving algebraic equations

Describing 2D shapes

Quaternions are unrelated to complex numbers

Quaternions are a 4D extension of complex numbers

Quaternions are a 1D extension of complex numbers

Quaternions are a 2D extension of complex numbers

i times i equals 2

i times i equals -1

i times i equals 0

i times i equals 1

Mapping a 3D object onto a 2D plane

Mapping a circle onto a line

Mapping a line onto a circle

Mapping a 4D hypersphere into 3D space

It is commutative

It is non-commutative

It is associative

It is distributive

The direction of rotation

The magnitude of a quaternion

The addition of quaternions

The subtraction of quaternions

-1

0

i

1

A single rotation in 2D space

A double rotation in 4D space

A reflection in 2D space

A translation in 3D space

It represents unit quaternions with zero real part

It represents non-unit quaternions

It represents quaternions with zero magnitude

It represents all quaternions