Given a partition $λ$, we write $e_j(λ)$ for the $j^{\textrm{th}}$ elementary symmetric polynomial $e_j$ evaluated at the parts of $λ$ and $e_jp_A(n)$ for the sum of $e_j(λ)$ as $λ$ ranges over the set of partitions of $n$ with parts in $A$. For $e_jp_A(n)$, we prove analogs of the classical formula for the partition function, $p(n)=1/n \sum_{k=0}^{n-1}σ_1(n-k)p(k)$, where $σ_1$ is the sum of divisors function. We prove several congruences for $e_2p_4(n)$, the sum of $e_2$ over the set of partitions of $n$ into four parts. Define the function $\textrm{pre}_j(λ)$ to be the multiset of monomials in $e_j(λ)$, which is itself a partition. If $\mathcal A$ is a set of partitions, we define $\textrm{pre}_j(\mathcal A)$ to be the set of partitions $\textrm{pre}_j(λ)$ as $λ$ ranges over $\mathcal A$. If $\mathcal P(n)$ is the set of all partitions of $n$, we conjecture that the number of odd partitions in $\textrm{pre}_2(\mathcal P(n))$ is at least the number of distinct partitions. We prove some results about $\textrm{pre}_2(\mathcal B(n))$, where $\mathcal B(n)$ is the set of binary partitions of $n$. We conclude with conjectures on the log-concavity of functions related to $e_jp(n)$, the sum of $e_j(λ)$ for all $λ\in \mathcal P(n)$.