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A practicable and simple averaging procedure of even-rank tensors is described, realizing an idea of Aleksandrov & Aizenberg [Dokl. Akad. Nauk SSSR, (1967), 167, 1028-1031]. It possesses the properties of a geometric mean, identically obeying the physical condition 
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. The orientation distribution function f(g) enters the calculations in the form of the well known arithmetic mean. The general case is completed by the consideration of specific (twice-symmetric) fourth-rank elastic tensors. Calculations with real and modelled orientation distributions lead to results close to those of much more complicated self-consistent schemes.
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. The orientation distribution function f(g) enters the calculations in the form of the well known arithmetic mean. The general case is completed by the consideration of specific (twice-symmetric) fourth-rank elastic tensors. Calculations with real and modelled orientation distributions lead to results close to those of much more complicated self-consistent schemes.
