## Foundations of Colloid Science, Volume 2 |

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Page 855

If the dispersion is monodisperse ( or may be approximated as monodisperse ) , however , F. ( Q ) no longer depends on n , so that eqn ( 14.4.1 )

If the dispersion is monodisperse ( or may be approximated as monodisperse ) , however , F. ( Q ) no longer depends on n , so that eqn ( 14.4.1 )

**reduces**to 19 ) = NF * 0 [ 1 + 6 ) ££ expliQ . rm ) ] ( 14.4.2 ) where F ( Q ) is the form ...Page 885

15.2.2 Show that eqn ( 15.2.5 )

15.2.2 Show that eqn ( 15.2.5 )

**reduces**to Ea = -Ayy / ( 121D2 ) when Aca = 0 and d = 0 . 15.2.3 Show that eqn ( 15.2.6 )**reduces**to ( 15.2.7 ) when war = YBY . ( This was Exercise 7.4.6 ) . Note that in this case the energy is ...Page 956

pressure required to

pressure required to

**reduce**Yow to zero is , therefore , significantly**reduced**. Most effective co - surfactants are fairly small molecules which would be expected to diffuse rapidly between the bulk phase and the interface .### What people are saying - Write a review

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### Contents

INTRODUCTION TO STATISTICAL MECHANICS | 675 |

ADSORPTION FROM SOLUTION | 709 |

THE ELECTROKINETIC EFFECTS | 786 |

Copyright | |

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### Common terms and phrases

adsorbed adsorption applied approach approximation assumed average becomes behaviour bulk calculated Chapter charge Chem Colloid interface Sci colloidal component concentration constant correlation corresponding density depends described determined developed direction discussed dispersion distance double layer droplets effect electrical electrokinetic electrolyte emulsion energy equation equilibrium estimate et al example Exercise expression factor field film flow fluid force fraction function given gives groups important increases interaction interface involved ions limit liquid material measured microemulsion molecules Note observed obtained occur pair parameters particles phase positive possible potential present pressure problem procedure radius range reduces referred region result scattering Section separation shear rate shown solution specific spheres stability stress structure surface surface charge surface tension suspension temperature theory thin usually values viscosity volume zero