Nervous networks in the spinal marrow are capable to produce rhythmic movements, such as: swimming, jumping, and walking. These specialised nervous systems are known as central pattern generators (CPGs). Nonlinear os- cillators can be used in control systems of locomotion as pattern generators similar to the pattern of human gait, providing the approach trajectories of the legs. The objective of this work is to present the simulation of the biped gait using a cen- tral pattern generator formed by coupled nonlinear oscillators. Using nonlinear oscillators with integer relation of fre- quency, the transient motion and stable limit cycles of the network formed by oscillators were determined, showing the behavior of the hip and knee angles. Modification of the step length and gait frequency can be obtained by means of the change of few parameters in the oscillators.