Based on the boundary integral equation proposed by Wu and Hsiao (2015), a new boundary integral equation is established for the analysis of anisotropic elastic plates under bending or transverse shear loading. The boundary integral equation contains gradients of rotation angle on the exterior boundary as parameters and uses the differences between angles of rotation gradients of the crack faces which are called disclination densities which establish the boundary integral equation for finite plate with cracks. The method of the boundary integral equation discretization is to divide into several parts of line in surrounding boundary. The parameters is constant on each line. Using Gauss-Chebyshev integration formulas and integral equation on cracks to express the disclination density in specific integral points. Crack closure conditions are used to provide additional equations. To verify the effectiveness of the proposed method, numerical examples provided include finite plates containing one or more cracks under bending and transverse shear loading; Isotropic, orthotropic, monolayer anisotropic and bilayer anisotropic materials are considered. Comparison of the numerical results with those in the literature shows that the proposed method yields accurate values of the stress intensity factors at each crack tip with few elements for the exterior boundary and integration points on the crack lines.