Question 5.7.1: Set up the equations of motion for the actuator circuit of F...

This is a magnetic circuit actuator. Choose a convention in which f_{fld} (force imparted to the moving member by the field) is positive in the direction of increasing displacement x as shown. For the equations of motion use the first-order system (5.86), which is written in terms of the independent variables (i, x),

\frac{di(t)}{dt} = \frac{1}{L(x)} [V_{s}(t) – i(t) (R+R_{coil}) – \frac{∂Λ(i,x)}{∂x} v(t)]
\frac{dv(t)}{dt} =\frac{1}{m} F(i,x)
\frac{dx(t)}{dt} = v(t).              (5.140)

To solve Eq. (5.140) we need expressions for the terms L(x), ∂Λ(i, x)/∂x, and F(i, x). As the independent variables are i and x, we work with the coenergy W_{fld}^{c}(i, x). From Eq. (5.139) we have

Eq. (5.139): W_{fld}^{c} = \left\{\begin{matrix} \frac{Λ(i,x)i}{2}=\frac{L(x)i^{2}}{2} \text{(linear motion)} \\  \frac{Λ(i,θ)i}{2}=\frac{L(θ)i^{2}}{2} \text{(rotational motion)}\end{matrix} \right.

W_{fld}^{c} ( i,x) = \frac{L(x)i^{2}}{2}.            (5.141)

The magnetic circuit of Fig. 5.11 was analyzed in Example 3.5.2 from Section 3.5.1. The inductance L(x) was found to be

L(x) =  \frac{μ_{0}N^{2}A_{g}}{(A_{g}/A_{c})(μ_{0}/μ)l_{c}+ 2x}            (5.142)

where l_{c} is the path length in the core, and A_{c} and A_{g} are the cross-sectional areas of the core and gap, respectively. Substitute Eq. (5.142) into Eq. (5.141) and obtain

W_{fld}^{c} ( i,x) = \frac{μ_{0}N^{2}A_{g} i^{2}}{2((A_{g}/A_{c})(μ_{0}/μ)l_{c}+ 2x)}            (5.143)

Next, use Eqs. (5.137) and (5.138) to obtain ∧ and f_{fld}. We find that

∧( i,x) = \frac{∂W_{fld}^{c} ( i,x)}{∂i}

= \frac{μ_{0}N^{2}A_{g} i}{((A_{g}/A_{c})(μ_{0}/μ)l_{c}+ 2x)},            (5.144)

and that

f_{fld}( i,x) = \frac{∂W_{fld}^{c} ( i,x)}{∂x}

= – \frac{μ_{0}N^{2}A_{g} i^{2}}{((A_{g}/A_{c})(μ_{0}/μ)l_{c}+ 2x)^{2}},            (5.145)

The minus sign in Eq. (5.145) implies that the direction of f_{fld} is opposite to the direction of increasing x (i.e., toward the actuator and opposite to the direction of increasing air gap). The total force F(i, x) on the moving member is a sum of the forces due to the field and spring

F(i, x) = f_{fld}(i, x)+f_{s}(x),          (5.146)

where f_{s}(x) is the force due to the spring. In its initial state, the actuator is unenergized with i(0) = 0, and the mass is at rest in an equilibrium position x_{0}. In this position the spring force is zero, f_{s}(x_{0}) = 0. Thus, when the mass is at a position x the spring force is

f_{s}(x)= -k(x- x_{0})          (5.147)

Notice that when x > x_{0} (x < x_{0} ) this force tends to move the mass towards (away from) the magnetic circuit. Substitute Eqs. (5.144), (5.145), (5.146), and (5.147) into Eq. (5.140) and obtain

\frac{di(t)}{dt} = \frac{((A_{g}/A_{c})(μ_{0}/μ)l_{c}+ 2x)}{μ_{0}N^{2}A_{g}}

× [V_{s}(t) – i(t) (R+R_{coil}) + \frac{2μ_{0}N^{2}A_{g} i}{((A_{g}/A_{c})(μ_{0}/μ)l_{c}+ 2x)^{2}} v(t) ]

\frac{dv(t)}{dt} = – \frac{1}{m} [\frac{μ_{0}N^{2}A_{g} i^{2}}{((A_{g}/A_{c})(μ_{0}/μ)l_{c}+ 2x)^{2}} + k(x- x_{0})]

\frac{dx(t)}{dt} = v(t).              (5.148)

This nonlinear first-order system has to be solved subject to the initial conditions x(0) = x_{0}, v(0) = v_{0} and i(0) = i_{0}.