As of today, additive technologies are making it possible to create products being close to the optimal shape. Topological optimization is widely used to design such products. The paper considers two common approaches to solving this problem: SIMP and BESO methods. Essence of the topological optimization problem, its formulation in a general form and typical examples to demonstrate this problem are described. Theoretical foundations and implementation features are presenting each method; algorithms sensitivity to the initial settings is analyzed. The problems that arise within the solution, such as the chessboard problem and dependence on the finite element mesh, are analyzed; options for solving these problems are provided. Two approaches were compared. It is concluded that the BESO method is offering more efficient and more design-friendly solutions.