Let Z_{3} act on C^{2} by non-trivial opposite
characters. Let X =[C^{2}/Z_{3}] be the orbifold
quotient, and let Y be the unique crepant resolution. We show the
equivariant genus 0 Gromov-Witten potentials F^{X} and
F^{Y} are equal after a change of variables --- verifying the
Crepant Resolution Conjecture for the pair (X,Y). Our computations
involve Hodge integrals on trigonal Hurwitz spaces which are of
independent interest. In a self contained Appendix, we derive closed
formulas for these Hurwitz-Hodge integrals.