Foundations of Colloid Science, Volume 1Liquid suspension systems are the basic ingredients of paints, detergents, biological cells, and countless other systems of scientific and technological importance. This book presents the fundamental physical and chemical concepts necessary to the understanding of these systems and of colloid science in general. New ideas are introduced carefully and formulae are developed in full, with exercises to help the reader throughout. The frequent references to the many applications of colloid science will be especially helpful to beginning research scientists and people in industry, medicine and agriculture who often find their training in this area inadequate. Integrating developments from the time of colloid science's infancy forty years ago to its present state as a rigorous discipline, this intelligently assembled work elucidates a remarkable range of concepts, techniques, and behaviors. |
From inside the book
Results 1-3 of 86
Page 104
... distribution 3.3.1 The mean and standard deviation 3.3.2 Moments of a distribution 3.3.3 The continuous distribution function 3.3.4 Logarithmic distributions 3.3.5 The geometric mean 3.3.6 The measure of polydispersity 3.4 Theoretical ...
... distribution 3.3.1 The mean and standard deviation 3.3.2 Moments of a distribution 3.3.3 The continuous distribution function 3.3.4 Logarithmic distributions 3.3.5 The geometric mean 3.3.6 The measure of polydispersity 3.4 Theoretical ...
Page 128
... distribution shown in Table 3.1 . What is the difference between the mean and the mode in this case ? 3.3.2 Establish eqn ( 3.3.3 ) from ( 3.3.2 ) . 3.3.3 Calculate the number area mean diameter , d of the particles described in Table ...
... distribution shown in Table 3.1 . What is the difference between the mean and the mode in this case ? 3.3.2 Establish eqn ( 3.3.3 ) from ( 3.3.2 ) . 3.3.3 Calculate the number area mean diameter , d of the particles described in Table ...
Page 131
... rather than differences from the mean ( Herdan 1960 , p . 81 ) . Making the transformation z = Ind we then say that d is log - normally distributed if z has the distribution function : fG ( z ) = 1 { 1 THEORETICAL DISTRIBUTION FUNCTIONS ...
... rather than differences from the mean ( Herdan 1960 , p . 81 ) . Making the transformation z = Ind we then say that d is log - normally distributed if z has the distribution function : fG ( z ) = 1 { 1 THEORETICAL DISTRIBUTION FUNCTIONS ...
Contents
CHARACTERIZATION OF COLLOIDAL | 2 |
BEHAVIOUR OF COLLOIDAL DISPERSIONS | 49 |
PARTICLE SIZE AND SHAPE | 104 |
Copyright | |
10 other sections not shown
Other editions - View all
Common terms and phrases
adsorbed adsorption aggregation approximation aqueous assumed behaviour Brownian motion bulk calculated capillary chemical chemical potential coagulation coefficient Colloid interface Sci colloid science colloidal dispersions colloidal particles component constant contact angle crystal curvature curve density determined dielectric diffuse dipole distance distribution DLVO theory double layer droplet effect electrolyte electron electrostatic enthalpic entropy equation equilibrium Establish eqn Exercise experimental flocculation flow fluid force formula free energy frequency function given head group hydrocarbon interaction energy ions liquid material measured method micelle microscope molar mass molecular molecules monomer negative Note obtained occurs Overbeek phase plates polymer potential energy procedure quantity R₁ radius region repulsion result scattering sedimentation separation shear silver iodide solid solution solvent spheres spherical stabilizing moieties steric stabilization stress surface tension surfactant suspension temperature term theory thermodynamic vector velocity viscosity volume Waals x₁ Young-Laplace equation zero