In paper I of this series we gave positive formulae for expanding the product $\mathfrak S^π\mathfrak S^ρ$ of two Schubert polynomials, in the case that both $π,ρ$ had shared descent set of size $\leq 3$. Here we introduce and give positive formulae for two new classes of Schubert product problems: separated descent in which $π$'s last descent occurs at (or before) $ρ$'s first, and almost separated descent in which $π$'s last two descents occur at (or before) $ρ$'s first two respectively. In both cases our puzzle formulae extend to $K$-theory (multiplying Grothendieck polynomials), and in the separated descent case, to equivariant $K$-theory. The two formulae arise (via quantum integrability) from fusion of minuscule quantized loop algebra representations in types $A$, $D$ respectively.