9.2 SYMMETRY AND NORMAL MODES
(a)ω^2 =0 (b)ω^2 =0 (c)ω^2 =0 (d)ω^2 =2k/M(e)ω^2 =k/M (f)ω^2 =k/M (g)ω^2 =k/M (h)ω^2 =k/MFigure 9.5 The displacements and frequencies of the eight normal modes of
the system shown in figure 9.4. Modes (a), (b) and (c) are not true oscillations:
(a) and (b) are purely translational whilst (c) is a mode of bodily rotation.
Mode (d), the ‘breathing mode’, has the highest frequency and the remaining
four, (e)–(h), of lower frequency, are degenerate.mode’. Expressing this motion in coordinate form gives as the fourth eigenvector
x(4)=1
√
2(− 1111 − 1 − 11 −1)T.Evaluation ofBx(4)yields
Bx(4)=k
4√
2(− 8888 − 8 − 88 −8)T=2kx(4),i.e. a multiple ofx(4), confirming that it is indeed an eigenvector. Further, since
Ax(4)=Mx(4), it follows from (B−ω^2 A)x= 0 thatω^2 =2k/Mforthisnormal
mode. Diagram (d) of the figure illustrates the corresponding motions of the four
masses.
As the next step in exploiting the symmetry properties of the system we notethat, because of its reflection symmetry in thex-axis, the system is invariant under
the double interchange ofy 1 with−y 3 andy 2 with−y 4. This leads us to try an
eigenvector of the form
x(5)=(0 α 0 β 0 −α 0 −β)T.Substituting this trial vector into (B−ω^2 A)x= 0 gives, of course, eight simulta-