Question 5.4: Determine the steady state response of the single degree of ...

The equation of motion of this system is given by
m_{e} \ddot{θ} + c_{e} \dot{θ} + k_{e}θ = F(t) l
where
m_{e} = \frac{ml²}{3},     c_{e} = ca²,     k_{e} = ka²

where c and k are, respectively, the damping and spring coefficients. It was shown in Example 5.2 that the periodic forcing function F(t) can be written as

F(t) = \frac{a_{0}}{2} +\sum\limits_{n=1}^{\infty }{a_{n} cos nω_{f}t}
where
a_{0} = F_{0}

Since
cos nω_{f}t = sin (nω_{f}t + \frac{π}{2})

the periodic force function F(t) can be written as

F(t) = \frac{a_{0}}{2} + \sum\limits_{n=1}^{\infty }{a_{n}} sin (nω_{f}t + \frac{π}{2})

= \frac{F_{0}}{2} + \frac{2F_{0}}{π} sin(nω_{f}t + \frac{π}{2}) − \frac{2F_{0}}{3π}sin (3ω_{f}t + \frac{π}{2})+ . . .

where the angle Φ_{n}, n = 1, 2, . . ., of Eq. 5.29 is given by

F_0 = \frac{a_0}{2}, \quad F_n = \sqrt{a^2_n + b^2_n}, \quad \phi_n = \tan^{-1} (\frac{a_n}{b_n})                    (5.29)

Φ_{n} = \frac{π}{2},              n= 1, 2, . . .

The equation of motion of this single degree of freedom system can be written as

m_{e}\ddot{θ} + c_{e} \dot{θ} + k_{e}θ = \frac{F_{0}l}{2} + \frac{2F_{0}l}{π}sin (nω_{f}t + \frac{π}{2}) − \frac{2F_{0}l}{3π}sin (3ω_{f}t + \frac{π}{2})+ . . .

Consequently,
x_{p}0 = \frac{F_{0}l}{2k_{e}}

Therefore,

x_{p} = \frac{F_{0}l}{2k_{e}}+\sum\limits_{n=1, 3, 5}^{\infty }{(−1)^{(n−1)/2}\frac{2F_{0}l/nπk_{e}}{\sqrt{ (1 − r_{n}^{2})^{2} + (2r_{n}ξ)^{2}}}}sin(nω_{f}t + \frac{π}{2}− ψ_{n})

where the damping factor ξ is given by
ξ = \frac{c_{e}}{C_{c}} = \frac{ca^{2}}{2m_{e}ω} = \frac{3ca^{2}}{2ml^{2}ω}

and ω is the system natural frequency defined by
ω = \sqrt{\frac{k_{e}}{m_{e}}} =\sqrt{\frac{3ka^{2}}{ml^{2}}}