Direct product of E8 and Z3

Definition
This group is defined in the following equivalent ways:


 * 1) It is the direct product of the elementary abelian group of order eight and the cyclic group of order three.
 * 2) It is the direct product of the cyclic group of order six and the Klein four-group.

Other descriptions
The group can be constructed using GAP's DirectProduct, ElementaryAbelianGroup, and CyclicGroup functions:

DirectProduct(ElementaryAbelianGroup(8),CyclicGroup(3))