This paper contains a theoretical formulations and solutions of multiple cracks subjected to an anti-plane time-harmonic point load in a functionally graded strip.The distributed dislocation technique is used to construct integral equations for a functionally graded material strip weakened by several cracks under anti-plane time-harmonic load.These equations are of Cauchy singular type at the location of dislocation,which are solved numerically to obtain the dislocation density on the faces of the cracks.The dislocation densities are employed to evaluate the stress intensity factor and strain energy density factors(SEDFs)for multiple cracks with diferent configurations.Numerical calculations are presented to show the efects of material properties and the crack configuration on the dynamic stress intensity factors and SEDFs of the functionally graded strip with multiple curved cracks. This paper contains a theoretical formulations and solutions of multiple cracks by to an anti-plane time-harmonic point load in a functionally graded strip. The distributed dislocation technique is used to construct integral equations for a functionally graded material strip weakened by several cracks under anti -plane time-harmonic load. These equations are of Cauchy singular type at the location of dislocation, which are solved numerically to obtain the dislocation density on the faces of the cracks. dis disposition densities are employed to evaluate the stress intensity factor and strain energy density factors (SEDFs) for multiple cracks with diferent configurations.Numerical calculations are presented to show the efects of material properties and the crack configuration on the dynamic stress intensity factors and SEDFs of the functionally graded strip with multiple bend cracks.