FILOMAT

This study develops fractional Weddle inequalities for $h$-convex functions utilizing Riemann-Liouville operators.  This represents a novel variant of the established fractional Weddle inequalities applicable to twice differentiable functions, derived through basic computations involving the $B$-function. Furthermore, new results regarding Weddle inequalities related to Riemann integral,  $s$-convex functions, and $P$-functions are introduced.