Reference: here
Given 3-dim Euclidean metric in spherical coordinates by
$$ds^2 = dr^2 + r^2 d\theta^2 + r^2 \text{sin}^2 \theta d\phi^2 \tag{1}$$
so restricting to
$$r=R=const. \tag{2}$$
where $R$ is scalar Ricci, gives
$$ds^2 = R^2 d\theta^2 + R^2 \text{sin}^2 \theta d\phi^2 \tag{3}$$
Questions:
What is the physical meaning of $r=R=const.$ as stated in $(2)$?
What is the relation between $r$ and $R$?