>>535198541
There exists an integer on the natural number scale between 6 and 7 known as thrembo. Because 6 and 7 are non-inclusive in the set, there has been debate on whether or not thrembo is truly an integer in Euclidian geometry. Thrembo can only be expressed through the convergence of a Riemann integral of a periodic function ranging from 0 to π such that the distance of the mesh of each partition in the Riemann sum is within root π of the lower Darboux integral convergence of the same partition containing only integers ranging from 1 to 6 inclusively contained in the Euclidian set. Thrembo can also be alternatively expressed in quantum mathematics through a Hilbert space (assuming the domain is analogous to the Euclidian set) where the sum of the convergence of a square-integrable function for every quantum integer in the Euclidian-analog space will equal to thrembo. The caveat with this is that this only applies if the space has a valid spectral decomposition, otherwise that would mean the Hilbert space is not analogous to the Euclidian set used.
