Dihedral and dicyclic groups are isoclinic

Statement
Suppose $$m \ge 2$$ is an integer. Then, the following two groups are isoclinic groups:


 * 1) The dicyclic group of degree $$m$$ and order $$4m$$.
 * 2) The dihedral group of degree $$2m$$ and order $$4m$$.

Further, if $$m$$ is odd, the nboth of these are also isoclinic to the dihedral group of degree $$m$$ and order $$2m$$.