Quaternion roots

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DC Field	Value	Language
dc.date.accessioned	2017-12-11T10:57:03Z	-
dc.date.available	2017-12-11T10:57:03Z	-
dc.date.issued	2001	-
dc.identifier.citation	Attard, M. (2001). Quaternion roots. The Collection, 4, 5-6.	en_GB
dc.identifier.uri	https://www.um.edu.mt/library/oar//handle/123456789/24455	-
dc.description.abstract	We define a quaternion to be an expression a + bi + c.1 + dk, where CL, b, c, el E R, and define addition and multiplication in the natural way with: i2=j2 = k2 = -1 ij= -ji = k jk= -kj= i ki= -ik= j (1) The set of real quaternions forms a skew field or a division ring which fails to be a field because commutativity under multiplication does not hold.	en_GB
dc.language.iso	en	en_GB
dc.publisher	University of Malta. Department of Mathematics	en_GB
dc.rights	info:eu-repo/semantics/openAccess	en_GB
dc.subject	Proof theory	en_GB
dc.subject	Mathematics -- Periodicals	en_GB
dc.title	Quaternion roots	en_GB
dc.type	article	en_GB
dc.rights.holder	The copyright of this work belongs to the author(s)/publisher. The rights of this work are as defined by the appropriate Copyright Legislation or as modified by any successive legislation. Users may access this work and can make use of the information contained in accordance with the Copyright Legislation provided that the author must be properly acknowledged. Further distribution or reproduction in any format is prohibited without the prior permission of the copyright holder.	en_GB
dc.description.reviewed	non peer-reviewed	en_GB
dc.publication.title	The Collection	en_GB
dc.contributor.creator	Attard, Maria	-
Appears in Collections:	Collection, No.4 Collection, No.4

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