It is shown that whenever a nonlinear diffusion model can be solved on
a semi-infinite domain, with the standard boundary conditions of cons
tant concentration, then the same model can be adjusted to yield exact
solutions to free boundary problems. This is true not only for those
diffusion equations that can be solved directly, but also for the spec
ial models obtainable via Philip's inverse method. New solutions are d
eveloped for two practical free boundary problems. The first represent
s solidification over a mould with dissimilar nonlinear thermal proper
ties and the second represents saturated/unsaturated absorption in the
soil beneath a pond.