The objective of this thesis is to discuss the stress distribution of concentrated forces acting on a two-dimensional infinite plate made of an elastic orthotropic material. The loading cases considered include: (a.) a horizontal concentrated force at the center of the plate; (b.) a vertical concentrated force on the plate surface; (c.) two non-collinear concentrated forces on the top and bottom plate surfaces simulating pure bending; and (d.) three concentrated forces on the plate surfaces simulating three-point bending. In this study the elasticity solutions are separated into two parts. The first part is the solution obtained by the mechanics-of-materials approach, while the second part is a correction term called Seewald-von Karman correction. The Seewald-von Karman correction is calculated using nonsingular boundary integral equations.