The failure of a foundation in soil/rock is often caused by over loading or large displacements. This fact is particularly important to analyze stresses and displacements when structures impose very large loads on the underlying soil/rock. However, it is also important for understanding the influence of the "anisotropy" of soil/rock on stresses, strains and displacements. Based on the orientation of geological structures or direction of planes of elastic symmetry, Elastic materials can be divided into general anisotropic, orthogonal or transversely isotropic materials. The nature of anisotropy of soils/rocks is caused by depositing via sedimentation over a long period of time, cutting by regular discontinuities, such as cleavages, foliations, stratifications and joints. Anisotropic soils/rocks are commonly modeled as transversely isotropic materials based on the practical engineering considerations. Nevertheless, the inclination of planes of elastic symmetry is not always horizontal, and hence, this thesis extending the approach proposed by Hu (2009) to study the closed form solutions for displacements in an half space with vertical transversely isotropy subjected to a surface 3D point load. To obtain the closed form solutions, the double Fourier transform was used to reduce the partial differential equations to ordinary differential equations, firstly. Then, the solutions of displacement and stress in Fourier domain can be determinednd from the boundary conditions. Finally, the closed form solutions for stresses and displacements in a vertical transversely isotropic half space material subjected to a 3D point load can be obtained using the double inverse Fourier transform and residue theorem. The present closed-form solutions demonstrate that the material anisotropy could affect the displacements and stresses in a vertical transversely isotropy. The illustrative examples show that the calculated displacements in a horizontal transversely isotropic half space are the same/similar as those presented by Hu (2009) and Ding et, al., (2006). Hence, the closed form solutions for stresses and displacements in a vertical transversely isotropic half space can be reasonably solved if the all of residue of integrals in the inverse Fourier domain can be determined exactly.