Octonion - Wikipedia

The octonions are a non-associative extension of the quaternions. They were discovered by John T. Graves[?] in 1843, and independently by Arthur Cayley[?], who published the first paper on them in 1845. They are sometimes referred to as Cayley numbers or the Cayley algebra.

The octonions form an 8-dimensional algebra over the real numbers, and can therefore be thought of as octets of real numbers. Every octonion is a real linear combination of the unit octonions 1, e₁, e₂, e₃, e₄, e₅, e₆ and e₇, the multiplication table for which looks as follows.

·	1	e₁	e₂	e₃	e₄	e₅	e₆	e₇
1	1	e₁	e₂	e₃	e₄	e₅	e₆	e₇
e₁	e₁	-1	e₄	e₇	-e₂	e₆	-e₅	-e₃
e₂	e₂	-e₄	-1	e₅	e₁	-e₃	e₇	-e₆
e₃	e₃	-e₇	-e₅	-1	e₆	e₂	-e₄	e₁
e₄	e₄	e₂	-e₁	-e₆	-1	e₇	e₃	-e₅
e₅	e₅	-e₆	e₃	-e₂	-e₇	-1	e₁	e₄
e₆	e₆	e₅	-e₇	e₄	-e₃	-e₁	-1	e₂
e₇	e₇	e₃	e₆	-e₁	e₅	-e₄	-e₂	-1