An interesting example of the notion appears in the context of Joyal’s species of structures.

A species is a functor from the category $\mathrm{Bij}$ of finite sets and bijections to $\mathrm{Set}$, and the functors that are obtained by taking left Kan extensions of species along the embedding $I:\mathrm{Bij}\to \mathrm{Set}$ are called analytic functors. Now taking left Kan extensions along $I$ is pseudomonic, and this implies that the coefficients of an analytic functor are unique up to isomorphism.

I think that in a sense pseudomonic functors are precisely the functors for which it makes sense to say that $A$ is uniquely determined by $\mathrm{FA}$ up to isomorphism (although we do not really need faithfulnes for this, bijectivity on isos suffices).