Guaranteed minimum withdrawal benefits (GMWB) is an innovative rider of variable annuity (VA) policies. In recent years GMWB has gained popularity due to it being an investment-linked insurance while guaranteeing minimum return. The pricing method of GMWB can be generally classified in two ways: Monte Carlo simulation and numerical PDE techniques. In this research, the tree model is used to price GMWB rider in a more realistic and intuitive fashion than existing methods. We extend the static model in Milevsky and Salisbury (2006), showing that the product can be decomposed into a discrete down-and-out single barrier option plus a generic term-certain annuity. We follow the idea of stair tree in Dai and Lyuu (2004) and Dai (2009), using bino-trinomial tree (BTT) in Dai and Lyuu (2008) to price the GMWB’s embedded exotic option. Numerical experiments show this method to be more accurate and efficient.