We present numerical solution of the equations of motion of the driven spring-block model with stick-slip dynamics. The system
consists of an array of N masses which describes the statistical and dynamical properties of dissipative systems. Here, we mostly emphasise the very low and very high velocity regimes. We show that
there is a clear shift in distribution of the slip-force when we move f_om low velocity regime to intermediate and then to high velocity regime. This changing behaviour is dependent to the behaviour of S
type in intermediate velocity and to Inverse-Gaussian distribution in high values of velocity.