For a positive integer $n$, let $G = (V, E)$ be a graph, where $V = \text{{0,1}}^n$, i.e., $V$ is the set of vertices has one to one correspondence with the set of all $n$-bit binary strings and $E = \{(u,v) \mid u, v$ belongs to $V, u$ and $v$ differ in exactly one bit position$\}$.
- Determine size of $E$
- Show that $G$ is connected