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The energy-size reduction relationships in comminution of solids

✍ Scribed by P.C. Kapur

Publisher
Elsevier Science
Year
1971
Tongue
English
Weight
468 KB
Volume
26
Category
Article
ISSN
0009-2509

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✦ Synopsis

Starting with the integro-differential equation of grinding kinetics, a new derivation of the Charles energy-size reduction relationship is presented. The procedure entails matching the moments of particle-size distribution from the grinding equation with those computed from the empirical Gaudin-Schuhmann size distribution equation. The analysis is extended to the Rosin-Rammler size distribution function, and an analogous energy-size reduction expression is obtained. It is shown that functionally both the Gaudin-Schuhmann and Rosin-Rammler distributions conform to the similarity solution to the integro-differential equation of grinding kinetics, moreover, this similarity solution provides a general energy-size reduction relationship of which the Charles equation is a specialized case.

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