Maths - Cayley-Dickson Construction - program to generate

Here is how I generated the tables for this page.

The tables were generated using this program.

The output of this program is shown below. To produce the results the program needs to have an XML input code. At the bottom of this page I have listed this input code.

XML input code

To produce the results the program needs to have an XML input code listed here:

<classDef>
<outputTable type="product" format="html" name="g 3,0,0" analyse="on" enableLabels="on">
<mathTypeMulti name="a" type="3" sign="0" zero="0" subAlgebra="all"/>
</outputTable>
<outputTable type="product" format="html" name="g+ 3,0,0" analyse="on" enableLabels="on">
<mathTypeMulti name="a" type="3" sign="0" zero="0" subAlgebra="even"/>
</outputTable>
<outputTable type="product" format="html" name="g 2,1,0" analyse="on" enableLabels="on">
<mathTypeMulti name="b" type="3" sign="1" zero="0" subAlgebra="all"/>
</outputTable>
<outputTable type="product" format="html" name="g+ 2,1,0" analyse="on" enableLabels="on">
<mathTypeMulti name="b" type="3" sign="1" zero="0" subAlgebra="even"/>
</outputTable>
<outputTable type="product" format="html" name="g 1,2,0" analyse="on" enableLabels="on">
<mathTypeMulti name="b" type="3" sign="3" zero="0" subAlgebra="all"/>
</outputTable>
<outputTable type="product" format="html" name="g+ 1,2,0" analyse="on" enableLabels="on">
<mathTypeMulti name="b" type="3" sign="3" zero="0" subAlgebra="even"/>
</outputTable>
<outputTable type="product" format="html" name="g 0,3,0" analyse="on" enableLabels="on">
<mathTypeMulti name="b" type="3" sign="7" zero="0" subAlgebra="all"/>
</outputTable>
<outputTable type="product" format="html" name="g+ 0,3,0" analyse="on" enableLabels="on">
<mathTypeMulti name="b" type="3" sign="7" zero="0" subAlgebra="even"/>
</outputTable>
<outputTable type="product" format="html" name="g 2,0,1" analyse="on" enableLabels="on">
<mathTypeMulti name="b" type="3" sign="0" zero="2" subAlgebra="all"/>
</outputTable>
<outputTable type="product" format="html" name="g+ 2,0,1" analyse="on" enableLabels="on">
<mathTypeMulti name="b" type="3" sign="0" zero="2" subAlgebra="even"/>
</outputTable>
<outputTable type="product" format="html" name="g 1,1,1" analyse="on" enableLabels="on">
<mathTypeMulti name="b" type="3" sign="1" zero="2" subAlgebra="all"/>
</outputTable>
<outputTable type="product" format="html" name="g+ 1,1,1" analyse="on" enableLabels="on">
<mathTypeMulti name="b" type="3" sign="1" zero="2" subAlgebra="even"/>
</outputTable>
<outputTable type="product" format="html" name="g 1,0,2" analyse="on" enableLabels="on">
<mathTypeMulti name="b" type="3" sign="0" zero="3" subAlgebra="all"/>
</outputTable>
<outputTable type="product" format="html" name="g+ 1,0,2" analyse="on" enableLabels="on">
<mathTypeMulti name="b" type="3" sign="0" zero="3" subAlgebra="even"/>
</outputTable>
<outputTable type="product" format="html" name="g 0,0,3" analyse="on" enableLabels="on">
<mathTypeMulti name="b" type="3" sign="0" zero="7" subAlgebra="all"/>
</outputTable>
</classDef>

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metadata block

see also:
Correspondence about this page
Book Shop - Further reading. Where I can, I have put links to Amazon for books that are relevant to the subject, click on the appropriate country flag to get more details of the book or to buy it from them.	On Quaternions and Octonions
Terminology and Notation Specific to this page here:

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