A representative of the quartic orbit is $e_{156} + e_{246} + e_{345}$ (I write $e_{ijk}$ for $e_i\wedge e_j\wedge e_k$). A resolution of this orbit is given by the projective closure of the tangent bundle to the Grassmannian. Indeed, if $V = \mathbb{C}^6$ and $U$ is the tautological bundle on $X = Gr(3,V)$ then 
$$
T_X \cong U^*\otimes V/U \cong \Lambda^2U\otimes V/U\otimes O(1),
$$
so $T_X(-1) \cong \Lambda^2U \otimes V/U$. Note that the tautological filtration $U\subset V$ induces a filtration of $\Lambda^3 V$ with factors $\Lambda^3U$, $\Lambda^2U\otimes V/U$, $U\otimes\Lambda^2(V/U)$, and $\Lambda^3(V/U)$. Consequently, there is a canonical exact sequence
$$
0 \to T^+ \to \Lambda^3 V\otimes O_X \to T^- \to 0,
$$
where $T^+$ is the extension of $\Lambda^2U\otimes V/U$ by $\Lambda^3U$ and $T^-$ is the extension of $\Lambda^3(V/U)$ by $U\otimes\Lambda^2(V/U)$. In particular, $T^+$ fits into exact sequence
$$
0 \to O_X(-1) \to T^+ \to T_X(-1) \to 0.
$$
The embedding $T^+\to \Lambda^3 V\otimes O_X$ induces a map $P_X(T^+) \to P(\Lambda^3 V)$. Its image is the invariant quartic hypersurface.