Dicyclic group of even degree has the same character table as dihedral group of same order

Statement
Suppose $$m$$ is an integer. Then, the fact about::dicyclic group of degree $$2m$$ and hence order $$8m$$ has the same character table as the fact about::dihedral group of degree $$4m$$ and order $$8m$$. In particular, they are fact about::character table-equivalent groups.

The smallest example of this is $$m = 1$$, yielding that the dihedral group:D8 and quaternion group of order eight have equivalent character tables.