Why does metabolic rate scale with body size?

A long-standing problem has been the origin of quarter-power allometric scaling laws that relate many characteristics of organisms to their body mass1,2 — specifically, whole-organism metabolic rate, B = aMb, where M is body mass, a is a taxon-dependent normalization, and b ≈ 3/4 for animals and plants. Darveau et al.3 propose a multiple-cause model for mammalian metabolic rate as the “sum of multiple contributors”, Bi, which they assume to scale as Bi = a i MML:M b i , and obtain b ≈ 0.78 for the basal and 0.86 for the maximally active rate, $${\mathop V\limits^{\bullet}}{}_{{\rm O}_2}^{\max}$$ . We argue, however, that this scaling equation is based on technical, theoretical and conceptual errors, including misrepresentations of our published results4,5.