The notion of type constancy was introduced by Alfred Gray for nearly Kählerian manifolds and later generalized by Vadim F. Kirichenko and Irina V. Tret’yakova for all Gray — Hervella classes of almost Hermitian manifolds. In the present note, we consider the notion of type constancy for some six-dimensional almost Hermitian planar submanifolds of Cayley algebra. The almost Hermitian structure on such six-dimensional submanifolds is induced by means of so-called Brown — Gray three-fold vector cross products in Cayley algebra. We select the case when six-dimensional submanifolds of Cayley algebra are locally symmetric. It is proved that six-dimensional locally symmetric submanifolds of Ricci type of Cayley algebra are almost Hermitian manifolds of zero constant type. This result means that six-dimensional locally symmetric submanifolds of Ricci type of Cayley algebra possess a property of six-dimensional Kählerian submanifolds of Cayley algebra. However, there exist non-Kählerian six-dimensional locally symmetric submanifolds of Ricci type in Cayley algebra.