Location of Points on Plane and the Order of Disposition of Sum of Powers of Cardinal Coordinates
Abstract:This article exposed the structure of all orders of the sum of powers of cardinal coordinates with
the explicitly determined computational disposition of similarity, between the coefficient of
binomial expansion and the sum of powers of pairs of cardinal points on the plane. The proofs
were achieved by a logical deployment of combinatorial techniques, laws of indices on powers
of cardinal bases, and a comparison of corresponding results. The results proved conclusively
that the sum of the powers of cardinal points is equal to the coefficients of the Binomial
expansion with respect to the Pascal triangle pattern and entries.
Theorem, the sum of powers of cardinal coordinate equals the corresponding elements of
Binomial coefficient at every stage on a plane ʃn (x + y) = nCr : n ≥ 0, r ≤ n, r n ≥ 0.