I know, thanks to some clarifications received from a user of this site, the definition of a model. When evaluating the cardinality of a model by taking the interpretations of all the constants, functions and $k$-ary relations ($k\ge 0$) into account, what do we consider the interpretation of a $k$-ary relation and, in particular, the interpretation of a 0-ary relation, i.e. a proposition without any argument?
For example for the theory $\{R_1,R_2,\ldots,R_n,...\}$ read as $\{$it rained today, it rained yesterday, it rained the day before yesterday, it rained the day before the day before yesterday,...$\}$, is the cardinality of the considered model $|M|=|\{$it rained today, it rained yesterday, it rained the day before yesterday, it rained the day before the day before yesterday,...$\}|=\aleph_0$ or $|M|=|\{0,1\}|=2$ according to the truth values assigned $R_1,R_2,\ldots$? I thank you anybody for any clarification!
In keeping with Mr. Karagila's answer to your previous question, the cardinality of your example model is 2, not $\aleph_0$.
In general, the interpretation of a $k$-ary relation can be seen as a subset of the cartesian power $M^k$. In particular, suppose that $R$ is a $k$-ary relation in the language $\mathcal L$ and that $M$ is the domain of some given $\mathcal L$-model. Then we can write $R^M\subseteq M^k$ for the interpretation of $R$ in that model, so that $R$ holds of a $k$-tuple $(m_1,\ldots,m_k)$ if and only if $(m_1,\ldots,m_k)\in R^M$. Using this notion to explain interpretation of relation symbols, a $0$-ary relation symbol should hold true only of the empty tuple.