Wanjala, VictorObiero, Beatrice Adhiambo2023-02-152023-02-152022-12VICTOR, W., & ADHIAMBO, B. O. (2022). On Skew Class (BQ) Operators.ISSN: 2456-8880http://repository.rongovarsity.ac.ke/handle/123456789/2465The class of Skew (BQ) operators acting complex Hilbert on an separable H is introduced in this paper. An operator if K ∈L (H) is said to belong to class Skew (BQ) if K commutes with a (BQ) operator, that is, [K∗2K2 (K∗K) 2] K = K [(K∗K) 2 K∗2K2]. We explore some properties that this class is enriched with. We then scan the relation of this class to other classes and then oversimplify it to the class of Skew (nBQ).enIndexed Terms- Skew-Normal, Skew-Binormal operators, (BQ) operators, Skew-(BQ) OperatorsArticle