86                         Dynamic Analysis of Drives


        and for the particular solution we have


        Substituting these solutions in the homogeneous form of Equation (3.83) and in its
        complete form, respectively, we obtain





        Using the initial conditions that for t = 0 the speed co = 0, we obtain for the constant A





        Thus, the complete solution has the form





        The next step is to calculate the 0(Z) dependence. This can obviously be achieved by
        direct integration of solution (3.88):






        or





           For the second assumption, we introduce into the excitation torque a "saw"-like
        periodic component. To do so we must express this "saw" in a convenient form, i.e.,
        describe it in terms of a Fourier series. Let us approximate this "saw" by inclined straight
        lines, as shown in Figure 3.21 (the reader can make another choice for the approxi-
        mation form). Then, this periodic torque component T p can be described analytically
        by the expression













                                                 FIGURE 3.21 Approximation of the
                                                 "saw"-like characteristic (see Figure
                                                 3.18) of a stepper motor by inclined
                                                 straight lines.
               TEAM LRN