Abstract
In this paper, we introduce the notion of symmetric bi-derivations on subtraction algebra and investigated some related properties. We prove that a map $D : X\times X\to X$ is a symmetric bi-derivation on $ X$ if and only if $D$ is a symmetric map and it satisfies $D(x-y, z)=D(x, z)-y$ for all $x, y, z\in X.$
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