Integer as Sums and Differences of Consecutive Squares/Examples

Example of use of Integer as Sums and Differences of Consecutive Squares
Since the proof above is constructive, we can follow the proof and derive:

and its associated family of solutions:

and so on.

However this may not give the least number of squares that this works for.

In fact we have:

from Triangular Number as Alternating Sum and Difference of Squares.