This paper is concerned with the transient deformation of functionally graded(FG)shallow spherical shells subjected to time-dependent thermomechanical load. Based on TimoshenkoMindlin hypothesis and von Karman nonlinear theory, a set of nonlinear governing equations of motion for FG shallow spherical shells in regard to transverse shear deformation and all the inertia terms are established using Hamilton’s principle. The collocation point method and Newmarkbeta scheme in conjunction with the finite difference method are adopted to solve the governing equations of motion and the unsteady heat conduction equation numerically. In the numerical examples, the transient deflection and stresses of FG shallow spherical shells with various material properties under different loading conditions are presented. Based on TimoshenkoMindlin hypothesis and von Karman nonlinear theory, a set of nonlinear governing equations of motion for FG shallow spherical shells in regard to transverse shear deformation and all the inertia terms are established using Hamilton’s principle. The collocation point method and newmarkbeta scheme in conjunction with the finite difference method are adopted to solve the governing equations of motion and the unsteady heat conduction equation numerically. In the numerical examples , the transient deflection and stresses of FG shallow spherical shells with various material properties under different loading conditions are presented.