Group Theory/Groups, subgroups and constructions

Henceforth, we shall sometimes refer to the group operation of a group simply as the "operation".

Note: Often, the explicit notation for the group operation is omitted and the product of two elements is denoted solely by juxtaposition.

Subgroups with the inclusion map $ι : H \to G$ represent subobjects of a group.

Exercises

Make explicit the proof of right-cancellation ("right-cancellation" means $y * x = z * x \Rightarrow y = z$ ).
Let $G$ be a group, and let $H, J \leq G$ be subgroups such that neither $H \subseteq J$ nor $J \subseteq H$ . Prove that $H \cup J$ is not a subgroup of $G$ .
Let G={1,−1} together with the operation 1*1=1=−1*−1, 1*−1=−1*1=−1.
1. Prove in detail that $G$ , together with the operation $*$ , is a group.
2. Prove that in $G \times G$ , there exists a subgroup which is not equal to $H \times L$ with subgroups $H, L \leq G$ .