Albert Einstein in 1905

Carl Friedrich Gauss in 1831

Isaac Newton in 1687

William Rowan Hamilton in 1843

Quaternions are a 2D extension of real numbers

Quaternions are a 4D extension of complex numbers

Quaternions are unrelated to complex numbers

Quaternions are a 3D extension of real numbers

Describing 3D rotations

Solving linear equations

Describing 2D shapes

Calculating probabilities

i times i equals 2

i times i equals -1

i times i equals 0

i times i equals 1

Mapping a line onto a circle

Mapping a circle onto a line

Mapping a sphere into a line

Mapping a plane into a sphere

3D objects in 2D

2D shapes in 1D

5D objects in 4D

4D hyperspheres in 3D

It is distributive

It is associative

It is non-commutative

It is commutative

-1

1

-k

k

It determines the magnitude of quaternions

It helps visualize the direction of rotation

It is irrelevant to quaternion operations

It is used to calculate quaternion addition

Linear algebra

Calculus

Probability

Statistics