We use pseudo-Anosov homeomorphisms of surfaces in order to prove that the first-order theory of non-Abelian free groups, Tƒg, is n-ample for any n ∈ ω . This result adds to the work of Pillay, which proved that Tƒg is non-CM-trivial. The sequence witnessing ampleness is a sequence of primitive elements in 픽ω . Our result provides an alternative proof to the main result of a recent preprint by Ould Houcine and Tent.