We introduce and study some basic properties of rough – statistical convergent of weight g (A), where g : is a function statisying g (m, n, k) → ∞ and g (m, n, k) ↛ 0 as m, n, k → 0 of triple sequence of Bernstein
polynomials, where A represent the RH-regular matrix and also prove the Korovkin approximation theorem by using the
notion of weighted A-statistical convergence of weight g (A) limits of a triple sequence of Bernstein polynomials.
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