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Let be an abelian category, or more generally a weakly idempotent complete exact category, and suppose we have two complete hereditary cotorsion pairs $(,\tilde{})$ and $(\tilde{},)$ in satisfying $\tilde{}\subseteq$ and $\cap \tilde{}=\tilde{}\cap$. We show how to construct a (necessarily unique) abelian model structure on with (resp. $\tilde{}$) as the class of cofibrant (resp. trivially cofibrant) objects, and (resp. $\tilde{}$) as the class of fibrant (resp. trivially fibrant) objects.