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Line 35: =Relation to norm= {{Original Research\|section}} In [[mathematics]], some thinkers{{who}} believe there is a relationship between the norm of a [[Classical Hamiltonian quaternions\|quaternion]] and the [[tensor]] of a quaternion. Some writers<ref>[[Quaternion#Conjugation.2C_the_norm.2C_and_division\|modern thinkers, see proper section of main article]]</ref> define the norm of a quaternion as having the same formula as the tensor of a quaternion, while other writers<ref>Hamilton, Tait, Cayley</ref> define the norm of a quaternion as the square of the tensor. Hamilton uses the term tensor in two different sences as a [[Classical_Hamiltonian_quaternions#Tensor\|positive numerical quantity]] and as an operator that operates on other mathematical entities extracting a tensor quantity from them.

Tensor of a quaternion: Difference between revisions