Adsorption of anionic dyes onto natural, thermally and chemically modified smectite clays

The aim of this study was to determine the adsorption capacity of the smectite clays (from the overburden of the lignite deposit in Belchatow) for two anionic dyes, i.e. Reactive Blue 81 (RB-81) and Direct Blue 74 (DB-74). Additionally, the influence of the thermal and chemical (acid and alkali) cla...

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Bibliographic Details
Published in:Polish journal of chemical technology 2014-12, Vol.16 (4), p.33-40
Main Authors: Kyzioł-Komosińska, Joanna, Rosik-Dulewska, Czesława, Pająk, Magdalena, Krzyżewska, Iwona, Dzieniszewska, Agnieszka
Format: Article
Language:English
Subjects:
Direct Blue 74
linear regression
modified clay
non-linear regression
Reactive Blue 81
smectite clay
sorption isotherms
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Summary:The aim of this study was to determine the adsorption capacity of the smectite clays (from the overburden of the lignite deposit in Belchatow) for two anionic dyes, i.e. Reactive Blue 81 (RB-81) and Direct Blue 74 (DB-74). Additionally, the influence of the thermal and chemical (acid and alkali) clay modifications on the amount of bonded dyes was investigated. The adsorption capacity of the clay (natural and modified) was different for studied dyes and depended on the initial concentration and modification type. All the modified clays adsorbed the dyes at pH>pH as the negatively charged surfaces of their particles (in accordance with the formula: AOH ↔ AO + H ) prevented the formation of electrostatic bonds between the anionic dyes and the clay surface. The dyes were mainly bound with the hydrogen bonds forming between the donor groups in the dyes and the acceptor groups (-SiO and -Al OH) in the clays. The coefficients in the adsorption isotherms were estimated with the linear and non-linear regression. The linear regression method was found that the Freundlich and Dubinin-Radushkevich isotherms described the dye sorption much better than the Langmuir model. On the other hand, all three models described well the experimental data in the non-linear regression method. Furthermore, the 1/n value (
ISSN:1899-4741
1509-8117
1899-4741
DOI:10.2478/pjct-2014-0066