Classifying the term Fundix, and identifying Self Generating Propensity in Variable targets In this paper I take a square of x and fill in the gap by integer addition, I term something called the Fundix, which is a direct square concatentation to a square of itself (i.e. 25 ± 5), and add what I call a "Linear Adjustment Value" to complete the square on an integer step basis. This can be considered a novel approach to square identification, and in the paper I assert that the integer itself has a selt sustaining paradox of intent to promulgate it's own squares on a minimally remedial basis. Consequently, one can derive trees of knowledge through the use of "in between" x values. Such as it is, we generate all sorts of square roots with the combination of decimal values, and I leave that up to the explorer with this formulaic tool. Propensity alive!
Matthew William Pdlysny (Sat,) studied this question.