‎Complex-valued harmonic functions that are univalent and‎‎sense-preserving in the open unit disk $U$ can be written as form‎‎$f =h+\bar{g}$‎, ‎where $h$ and $g$ are analytic in $U$‎.‎In this paper‎, ‎we introduce the class $S_H^1(\beta)$‎, ‎where $1<\beta\leq 2$‎, ‎and‎‎consisting of harmonic univalent function $f = h+\bar{g}$‎, ‎where $h$ and $g$ are in the form‎‎$h(z) = z+\sum\limits_{n=2}^\infty |a_n|z^n‎$ ‎and ‎‎$‎g(z) =‎\sum\limits_{n=2}^\infty |b_n|\bar z^n$‎for which‎‎$$\mathrm{Re}\left\{z^2(h''(z)+g''(z))‎ +2z(h'(z)+g'(z))-(h(z)+g(z))-(z-1)\right\}<\beta.$$‎It is shown that the members of this class are convex and starlike‎.‎We obtain distortions bounds extreme point for functions belonging to this class‎,‎and we also show this class is closed under‎convolution and convex combinations‎. تفاصيل المقالة