This paper considers the propagation of elastic waves in an eight-ply quasi
-isotropic laminate arising from line sources of dislocation located at eac
h of the seven interfaces in turn. The line source sets up a straight crest
ed wave travelling along the laminate in a direction normal to the load lin
e, and the elastodynamic equations within each layer are solved by taking t
he Laplace transform with respect to time and the Fourier transform with re
spect to the spatial coordinate in the direction of propagation. The result
ing system of six first-order differential equations in each layer is solve
d to obtain the transforms of the displacement and stress components throug
hout the laminate. The time history of any displacement or stress component
at any location may then be recovered by numerical inversion of the double
transform. Examples are shown of the time history of the normal displaceme
nt of the top surface of the laminate at a distance of 20 plate thicknesses
from the plane of action of the sources. The numerical inversion involves
a summation over different modes of Rayleigh-Lamb waves in the laminate and
contributions to the overall response from some of the individual modes ar
e displayed. (C) 2000 Elsevier Science B.V. All rights reserved.