“…On the other hand, the space Y is not totally countably pracompact. For this purpose it suffices to show that for any point x = (x α ) ∈ Y a set {x} (everywhere in this example we by S we mean closure in Y of its subset S) is not compact , because {x} is closure (in Y ) of any subsequence of a constant sequence {x n }, where x n = x for each n. By [11,Proposition 2 Since sequential feebly compactness is preserved by extensions, the next proposition strengthen a bit Theorem 4.1 of [10].…”