Almoneef, Areej A.Hyder, Abd-AllahHezenci, FatihBudak, Hueseyin2025-10-112025-10-1120251029-242Xhttps://doi.org/10.1186/s13660-025-03333-3https://hdl.handle.net/20.500.12684/21733This paper develops weighted Euler-Maclaurin-type inequalities using Riemann-Liouville fractional integrals for classes of differentiable convex functions and functions of bounded variation. The work begins with a foundational integral equality that incorporates a positive weighting function, which serves as the basis for constructing these Euler-Maclaurin-type inequalities. Through this approach, we derive specific fractional inequalities for convex functions and extend them to functions of bounded variation, addressing key accuracy bounds and demonstrating flexibility across applications. Some remarks and particular cases are discussed to provide deeper observation, showcasing variations of the derived inequalities under particular function classes and conditions. This exploration offers a comprehensive view of the potential extensions of weighted fractional inequalities within the context of fractional calculus.en10.1186/s13660-025-03333-3info:eu-repo/semantics/openAccessEuler-Maclaurin inequalityRiemann-Liouville integralsDifferentiable convex functionsBounded variationArticle202512-s2.0-105010103640WOS:001522724900001N/AQ1