In this investigation, Biot's (1962) theory for wave propagation in porous solids is applied to study the velocity and attenuation of compressional seismic waves in partially gas-saturated porous rocks. The physical model, proposed by White (1975), is solved rigorously by using Biot's equations which describe the coupled solid-fluid motion of a porous medium in a systematic way. The quantitative results presented here are based on the theory described in Dutta and Ode (1979, this issue). We removed several of White's questioned approximations and examined their effects on the quantitative results. We studied the variation of the attenuation coefficient with frequency, gas saturation, and size of gas inclusions in an otherwise brine-filled rock. Anomalously large absorption (as large as 8 dB/cycle) at the exploration seismic frequency band is predicted by this model for young, unconsolidated sandstones. For a given size of the gas pockets and their spacing, the attenuation coefficient (in dB/cycle) increases almost linearly with frequency f to a maximum value and then decreases approximately as 1/f. A sizable velocity dispersion (of the order of 30 percent) is also predicted by this model. A low gas saturation (4-6 percent) is found to yield high absorption and dispersion.An analysis of all of the field variables (stresses and displacements) is presented in terms of Biot's type I (the classical compressional) wave and type II (the diffusion) wave. It is pointed out that the dissipation of energy in this model is mainly due to the relative fluid flow from the type II wave. From our formulation, many of White's equations can be derived as suitable approximations, and it is shown that the discontinuity in fluid pressure assumed by White at the gas-water interface is the discontinuity in the fluid pressure contribution by the type II wave.Our quantitative results are in reasonably good agreement with White's (1975) approximate theory. However, the phase velocities computed by White's approximate treatment do not approach the correct zero-frequency limit (Gassmann-Wood) when compared to the present theory. Most of these disagreements disappear if the corrections to White's theory as suggested by Dutta and Seriff (1979, this issue) are incorporated.

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