We present a new geometric proof of the motif monodromy conjecture for nondegenerate hypersurfaces of dimension $3$. More generally, we are given a nondegenerate complex polynomial $f$ in any number of variables and a set $\mathbf{B}$ of $B_1$ facets of Newtonian polytopes in $f$ with consistent basis directions. and the stack-theoretic embedding desingularization of $f^{-1}(0)$ above the origin. That numerical data set excludes the known candidate poles of the motivation zeta function of f at the origin. $\mathbf{B}$. We anticipate that the constructs here may inspire new insights as well as new possibilities for solving conjectures.
