Earth dimensions—radius, mass, and density

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As previously noted, terrestrial arc measurements are capable of yielding a value of the equatorial radius of Earth, but satellite measurements are greatly superior for determining the flattening. After 10 years of satellite observations, the International Union of Geodesy and Geophysics adopted the Geodetic Reference System 1967, defining aequatorial, MG, and J2, o. Minor revisions to the numerical values were made in 1983. The revised values are as follows:Equations.

The adopted value of J2, o corresponds to a flattening of 1/298.257.

While satellite observations determine the value of the product MG to eight significant figures, they cannot determine M and G separately. Because satellites orbit (in general) above the atmosphere, the value of M includes the mass of the atmosphere, but, as shown above, the contribution of the latter to MG is extremely small. The gravitational constant G, measured in the laboratory, is known much less accurately; it is G = 6.67384 × 10−11 m3s−2kg−1 (with uncertainty in the last two places of decimals). The combination of the laboratory value of G and the adopted value of MG results in a value for the mass of Earth (including the atmosphere) of M = 5.97 × 1024 kg. With the volume determined by aequatorial, the flattening, and the portions above sea level, this value of the mass gives the mean density ρ = 5,517 kg/m3.

There is some indication that J2, o, the dynamical form factor, varies slowly with time. There also have been suggestions that G has varied with time throughout the history of the universe and that it is scale-dependent. In the latter case, values determined in the laboratory would not be appropriate for terrestrial or astronomical problems. Evidence for either a time- or scale-dependence of G remains inconclusive.

For many years there has been speculation about the extent to which the actual flattening of the ellipsoid coincides with the theoretical form of a mass of fluid—of the same mass and rotation rate as Earth—in hydrostatic equilibrium under its own attraction and rotational acceleration. In the presatellite era, neither the actual flattening nor the theoretical form was known with sufficient accuracy to permit a meaningful comparison. Recent estimates of the flattening, in the case of hydrostatic equilibrium, for a body free of lateral density variations are close to 1/299.5; the actual flattening, 1/298.257, is therefore slightly greater. Although some investigators have suggested that the discrepancy represents an inheritance from the time when Earth was rotating more rapidly on its axis, the most probable explanation is that it is simply one effect of the recognized lateral heterogeneity in density of the real Earth.

George D. Garland