The Hieroglyph of Numerical Composition

                  1
                1   1
              1   2   1
            1   3   3   1
          1   4   6   4   1
            

The arrangement above, a series of ascending numbers sequenced in three-dimensional form, whispers profound mysteries. The numerical structure known to modern scholars as "Pascal's Triangle" bears semblance to frescoed inscriptions that dot the annals of antiquity. Its layers, resembling the sandy deposits of a temporal river, are composed, indeed, of integers so simple yet so intricate.

Each row, corresponding to coefficients of binomial expansions, holds insights akin to celestial orbits. The ages have not shifted its order; time encircles it not with decay but with respect. These numbers are the fossils of mathematical history, unearthed from the strata of numerical truth.

Scholars and elementary practitioners alike toil in the gardens of this triangle. They plant questions; they harvest relationships—between rows, diagonals, and the hidden symmetries that defy our classical intuitions. Such is the legacy it bequeaths.