This article considers a version of the vehicle-routing problem (VRP): A fleet of indentical capacitated vehicles serves a system of one warehouse and N customers of two types dispersed in the plane. Customers may require deliveries from the warehouse, back hauls to the warehouse, or both. The objective is to design a set of routes of minimum total length to serve all customers, without violating the capacity restriction of the vehicles along the routes. The capacity restriction here, in contrast to the VRP without back hauls is complicated because amount of capacity used depends on the order the customers are visited along the routes. The problem is NP-hard. The paper develops a lower bound on the optimal total cost and a heuristic solution for the problem. The routes generated by the heuristic are such that the back-haul customers are served only after terminating service to the delivery customers. However, the heuristic is shown to converge to the optimal solution, under mild probabilistic conditions, as fast as N’-0’.5. The complexity of the heuristic, as well as the computations of the lower bound, is O(N3) if all customers have unit demand size and O(N3logN) otherwise, independently of the demand sizes.