Assume the contrary. Then, there exists a permutation $a_{i1}, a_{i2}, a_{i3}, a_{i4}$, and $a_{i5}$ satisfying $$a_{ij} - a_j\equiv 1\pmod{2}$$for all $1\leq j\leq 5$. Summing these up yields $$1\equiv 1\cdot 5\equiv \left(\sum_{1\leq j\leq 5}a_{ij}\right) - \left(\sum_{1\leq j\leq 5}a_j\right) \equiv \sum_{1\leq j\leq 5}a_j - \sum_{1\leq j\leq 5}a_j \equiv 0,$$a contradiction.

just use casework on the number of evens or the number of odds