Direct product of Z32 and Z2

Definition
This group is defined as the uses as intermediate construct::external direct product of the cyclic group of order 32 and cyclic group of order 2.

As an abelian group of prime power order
This group is the abelian group of prime power order corresponding to the partition:

$$\! 6 = 5 + 1$$

In other words, it is the group $$\mathbb{Z}_{p^5} \times \mathbb{Z}_p$$.

Other descriptions
The group can be defined using GAP's DirectProduct and CyclicGroup functions:

DirectProduct(CyclicGroup(32),CyclicGroup(2))