Let $A = \{a_1, a_2, a_3, a_4, a_5\}$ be a set of $5$ positive integers. Show that for any rearrangement of $A$, $a_{i1}$, $a_{i2}$, $a_{i3}$, $a_{i4}$, $a_{i5}$, the product $$(a_{i1} -a_1) (a_{i2} -a_2) (a_{i3} -a_3) (a_{i4} -a_4) (a_{i5} -a_5)$$is always even.