The aim of this work is to study the static bending of functionally graded beams accounting higher order of shear deformat ion theory. The governing equations, derived from the virtual work principle, are a set of ordinary d ifferential equations describing a static bending of a thick beam. Thus, this paper presents the differential transform method used to solve the previous system of equations. The results obtained lay the foundation to determine the exact analytical solution for different boundary conditions and external loadings. The axial displacement and the bending and shear displacements, in the exact analytical form, of a thick clamped-clamped beam with functionally graded material under a unifo rm load will be fully developed. Moreover, normal and shear stresses will be analyzed. To confirm the efficiency of this work, a co mparison with the nu merical results provided by literature is performed. Through this work, the given analytical results provide engineers with an accurate tool to determine the analytical solution for the bending of plates and shells. In addition, the geometric and material parameters that appear clearly in the analytical results allow for a mo re optimized design of functionally graded material beams. This type of beams is frequently used in mechanical engineering fields such as aerospace engineering.