Octonion
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.
See also Hypercomplex numbers.
External links:
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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