\newcommand{\RR}{\mathbf{R}} \newcommand{\Sn}{{\bf S}^n} \newcommand{\Mm}{\mathcal{M}} This paper studies structural properties of locally symmetric submanifolds. One of the main result states that a locally symmetric submanifold $\Mm$ of $\RR^n$ admits a locally symmetric tangential parametrization in an appropriately reduced ambient space. This property has its own interest and is the key element to establish, in a follow-up paper of the authors [Spectral (isotropic) manifolds and their dimension, J. Anal. Math., to appear], that the spectral set $\lambda^{-1}(\Mm):=\{X \in\Sn :\lambda(X)\in\Mm\}$ consisting of all $n \times n$ symmetric matrices having their eigenvalues on $\Mm$, is a smooth submanifold of the space of symmetric matrices $\Sn$. Here $\lambda(X)$ is the $n$-dimensional ordered vector of the eigenvalues of $X$.