Direct product of Z10 and Z2

Definition
This group is defined in the following equivalent ways:


 * 1) It is the direct product of the cyclic group of order ten and the cyclic group of order two.
 * 2) It is the direct product of the cyclic group of order five and the Klein four-group.
 * 3) It is the direct product of the cyclic group of order five and two copies of the cyclic group of order two.

Other descriptions
The group can be described using GAP's DirectProduct, CyclicGroup and ElementaryAbelianGroup functions, in any of these ways:

DirectProduct(CyclicGroup(10),CyclicGroup(2))

DirectProduct(CyclicGroup(5),ElementaryAbelianGroup(4))

DirectProduct(CyclicGroup(5),CyclicGroup(2),CyclicGroup(2))