Singh,P.Salahshour, SoheılGazi,K.H.Rahaman,M.Salahshour,S.Mondal,S.P.2024-05-252024-05-25202432772-662210.1016/j.dajour.2024.1004022-s2.0-85183484460https://doi.org/10.1016/j.dajour.2024.100402https://hdl.handle.net/20.500.14517/1721Fuzzy fractional differential has the strength to capture the senses of memory and uncertainty simultaneously involved in dynamical systems. However, a solution for fuzzy fractional differential equations is not always found regularly. This paper discusses a numerical solution approach for the fuzzy fractional differential equation using power series approximation with a fuzzy fractional counterpart of Taylor's theorem. Caputo's definition of the fractional derivative and generalized Hukuhara difference are used to describe the fuzzy differential equation in this paper. Utilization of the generalized Hukuhara difference for the fuzzy valued function ensures the uniqueness and boundedness of the fuzzy solution in parametric form. © 2024 The Author(s)eninfo:eu-repo/semantics/openAccessDynamical systemsFuzzy Caputo fractional derivativeFuzzy fractional differential equationFuzzy fractional Taylor's theoremPower series approximationArticleQ310