Yilmaz, YilmazAkdemir, Ahmet Ocak2024-08-042024-08-0420232073-8994https://doi.org/10.3390/sym15040791https://hdl.handle.net/11616/101331Mathematical concepts are aesthetic tools that are useful to create methods or solutions to real-world problems in theory and practice, and that sometimes contain symmetrical and asymmetrical structures due to the nature of the problems. In this study, we investigate whether the sequence spaces X-q(p), 0= p<8, and X8, which are constructed by q-Cesaro matrix, satisfy some of the further properties described with respect to the bounded linear operators on them. More specifically, we answer to the question: Which of these spaces have the Approximation, Dunford-Pettis, Radon-Riesz and Hahn-Banach extension properties?. Furthermore, we try to investigate some geometric properties such as rotundity and smootness of these spaces.eninfo:eu-repo/semantics/openAccessCesaro matrixsequence spacesHahn-Banach operatorArticle15410.3390/sym150407912-s2.0-85156148809Q2WOS:000981102900001Q2