Yılmaz, Ciğdem ZeynepSaçlı, Gülsüm Yeliz2024-09-112024-09-1120241310-51322367-8275https://doi.org/10.7546/nntdm.2024.30.2.253-270https://hdl.handle.net/11363/8143In this study, we examine the Leonardo sequence with dual-generalized complex (DGC) coefficients for p is an element of R. Firstly, we express some summation formulas related to the DGC Fibonacci, DGC Lucas, and DGC Leonardo sequences. Secondly, we present some order-2 characteristic relations, involving d'Ocagne's, Catalan's, Cassini's, and Tagiuri's identities. The essential point of the paper is that one can reduce the calculations of the DGC Leonardo sequence by considering p. This generalization gives the dual-complex Leonardo sequence for p = -1, hyper-dual Leonardo sequence for p = 0, and dual-hyperbolic Leonardo sequence for p = 1.eninfo:eu-repo/semantics/openAccessBinet's formulaLeonardo numbersDual -generalized complex numbers.Article30225327010.7546/nntdm.2024.30.2.253-270N/AWOS:001247880700004N/A