Characteristics of the Properties of Absodan Plus Sorbent and Its Ability to Remove Phosphates and Chromates from Aqueous Solutions

The aim of the research was to characterize the parameters of the diatomite sorbent Absodan Plus as well as to assess its suitability for the adsorption of chromates and phosphates from acidic aqueous solutions simulating the conditions occurring in some types of industrial wastewater. The scope of the research includes XRD, SEM, BET, and PZC analyses, and 3D observation of commercial diatomite granules and batch tests to determine the constants of kinetics and the equilibrium of chromates and phosphates adsorption. Absodan Plus is a diatomite commercial material containing an amorphous phase (33%) and is also the crystalline phase of quartz, hematite, and grossite. The material is macro- and mesoporous and its specific surface area is about 30 m2/g. Its PZC is around pH = 5.5–6.0 and in an acidic environment is able to adsorb the anions. The saturation of the adsorbent surface with molecules of the adsorbed substance occurs after 2 h for chromates and 2.5 h for phosphates. The maximum adsorption capacity of Absodan Plus in terms of phosphorus and chromium amounts to 9.46 mg P/g and 39.1 mg Cr/g, respectively. As shown by XRD analysis, Absodan Plus contains an admixture of hematite, which can support the removal of chromium and phosphorus.


Introduction
Chromium naturally occurs in the environment (air, water, rocks) and contamination of groundwater and soil with chromates can be of natural origin [1], though anthropogenic pollution is the main problem due to the toxicity and genotoxicity of the chromates [2]. The main emitter of chromium water pollution is the energy sector followed by waste and wastewater management, in EU > 80% and about 10% of total emission respectively [3]. In the energy sector, both thermal power plants and refineries generate chromate releases. As has been shown, the leaching of ashes deposited in the lignite power plant is a hexavalent chromium source and results in high contamination of groundwater (even up to 0.120 ppm) [1]. Industrial wastewater has very diverse characteristics. Electroplating wastewater is very rich in hexavalent chrome (400-2000 ppm) and is strongly acidic (pH 2) [4,5]. The tanning industry also generates chromium-rich wastewater. The production is multistage, and the averaged wastewater has a neutral pH and contains up to several Table 1. Physicochemical properties of the tested diatomite-Absodan Plus (safety data sheet) [based on ref. [55]].

Analysis of Absodan Plus Properties
A detailed study was conducted to evaluate Absodan Plus's structure, chemical composition, and properties. The samples of diatomite were subjected to the following set of analyses: • X-ray diffraction analysis (XRD): The mineral composition of diatomite was assessed using X-ray diffraction with CuK α1 radiation, with scan step 0.015 degrees, scan rate 2 s/step, and scan range from 17 to 70 • 2θ at 40 kV and 40 mA (Bruker D8 Advance, Bruker AXS, Germany). The average crystallite sizes (D) of samples were calculated from the XRD data by applying the Debye-Scherrer Equation: D = 0.89λ/BcosΘ, where λ is the wavelength of the X-ray in nanometres, B is the peak width at half-height (FWHM), and θ is the angle between the incident and diffracted beams in angular degrees. • Crystallinity and amorphous % of diatomite from its scan were computed with Bruker Eva software, as follows: % Amorphous = ((Global area − Reduced area)/Global area) × 100 % Crystallinity = 100 − % Amorphous.
• SEM microscopic analysis: The morphological and textural observation of the surface was made by scanning electron microscope (SEM) (TESCAN VEGA 3, Fuveau France). SEM was used also with a back-scattered electron detector (BSE) (INCA x-act, Oxford Instruments) to broaden the scope of the element content analysis. • Brunauer-Emmett-Teller (BET) surface area analysis: Specific surface area and total pore volume were determined using low-temperature nitrogen adsorption-desorption isotherms using an ASAP 2020 porosimeter (Micromeritics, Norcross, GA, USA). Before measurements, the samples were degassed at 200 • C. The specific surface area and total pore volume were calculated by the Brunauer-Emmett-Teller (BET) method and the Barrett-Joyner-Halenda (BJH) method, respectively. • Stereoscopic image of the diatomite was analyzed by X2000 series microscopes (Opta-Tech, Warsaw, Poland) are designed for observation of small, 3D objects in transmitted and reflected light, and the 2D surface of diatomite measurements of topography, and layer thickness were carried out by confocal 3D microscope (NanoFocus, Oberhausen, Germany Hahn'a Method: The method consists in determining the highest increase of the potential (∆E max ) and two adjacent potential values that lie on both sides of it (∆E 1 , ∆E 2 ). Based on these values, the correction (x b ) is calculated, which increases the accuracy of the PZC determination (the correction enables the precise determination of the volume of the titrant at the place of its occurrence [61]. The calculations were done according to Equation (1): where: x b -correction, ∆V-a volume of titrant, ∆E1-a potential gain that occurs before ∆E max .

Adsorbate
The sorption of phosphates and chromates on diatomite was studied by batch experiments. The concentration of phosphates and chromates after the sorption process was determined using a UV-VIS spectrophotometer (JASCO, model V-670) at the wavelength λ = 720 nm and two absorption maxima of 350 nm and 373 nm.

•
Determination of the concentration of phosphates ions by the molybdenum blue method: The standard curve was prepared based on a series of phosphates ions solutions with concentrations ranging from 0 to 1.7 mg/L. The absorbance of the prepared solutions was measured against the reagent blank (sample without the addition of phosphates ions). Immediately before the measurement, 1.5 mL of ammonium molybdate and 2 drops of tin (II) chloride (reducing agent in the reaction of the formation of navy blue molybdenum blue) were added to each of the samples. Because the molybdenum method cannot determine strongly acidic or basic aqueous solutions, all samples were neutralized by adding six drops of 6 M NaOH each. The standard

Batch Studies of the Adsorption Process
2.3.1. Effect of Shaking Time on Adsorption 0.5 g of diatomite and 50 mL of a solution of phosphates or chromates ions at a concentration of 50 mg/L were added to 6 flasks with a capacity of 100 mL. The pH of the solutions was adjusted to 2 with 6 M HNO3 to create conditions typical of acidic industrial wastewater [34,35,48,49]. The prepared samples were shaken for 15-400 min, then the suspension obtained was filtered on a filter paper. The content of phosphates or chromates was determined in the supernatant.

Effect of Adsorbent Concentration on Adsorption
0.5 g of diatomite and 50 mL of previously prepared solutions of phosphates or chromates (pH 2) with concentrations of 10, 50, 200, 350, 400, 1000, 2000, and 3000 mg·L -1 were added to 5 flasks with a capacity of 100 mL. Then they were placed on a shaker, and adsorption was carried out for 1.5 h. After this time, the resulting mixture was filtered on a filter paper, and the content of phosphates or chromates was determined in the filtrate.

Models of Equilibrium and Kinetics of Adsorption
To fully understand the adsorption nature of phosphates or chromates ions in commercial diatomite sorbent, graphs of Freundlich, Langmuir, Halsey, Jovanovich, and Redlich-Peterson isotherms were prepared [ Table 2] [62]. On their basis, it was determined which isotherm equation describes the studied phenomenon most accurately. The   [34,35,48,49]. The prepared samples were shaken for 15-400 min, then the suspension obtained was filtered on a filter paper. The content of phosphates or chromates was determined in the supernatant.

Effect of Adsorbent Concentration on Adsorption
0.5 g of diatomite and 50 mL of previously prepared solutions of phosphates or chromates (pH 2) with concentrations of 10, 50, 200, 350, 400, 1000, 2000, and 3000 mg·L −1 were added to 5 flasks with a capacity of 100 mL. Then they were placed on a shaker, and adsorption was carried out for 1.5 h. After this time, the resulting mixture was filtered on a filter paper, and the content of phosphates or chromates was determined in the filtrate.

Models of Equilibrium and Kinetics of Adsorption
To fully understand the adsorption nature of phosphates or chromates ions in commercial diatomite sorbent, graphs of Freundlich, Langmuir, Halsey, Jovanovich, and Redlich-Peterson isotherms were prepared [ Table 2] [62]. On their basis, it was determined which isotherm equation describes the studied phenomenon most accurately. The coefficient of determination (R 2 ) and the chi-square statistic reduced by the number of degrees of freedom (χ 2 /DoF) were used to define the fit of the models to the results of the experiment. The calculations were made in Origin 7.5. The kinetic evaluation of the realized adsorption process was also performed with the use of pseudo-first and pseudo-second-order kinetic models [ Table 3].
To determine the rate-limiting stage of the adsorption process, the intraparticle diffusion model developed by Weber and Morris [63] was used. This model is presented in the Table 3. Table 2. Lists of adsorption isotherm models.

Adsorbent Characteristics
SEM microscopic observations allowed to characterize the morphology of the diatomite ( Figure 2). The surface composed of mesopores and macropores indicates high porosity and low density of this material, which was also observed in previous studies [57]. The results of the BET analysis show that the specific surface area of the Absodan Plus was 30.6 m 2 /g, while the total pore volume was 0.46 cm 3 /g. The stereoscopic and twodimensional 2D image of diatomaceous earth together with the layer thickness is shown in Figure 2. XRD analysis of Absodan Plus showed that quartz, hematite, and grossite are the main minerals of the crystalline phase. They were found approximately in the 2.73:1:2.68 ratio, respectively ( Figure 3). As a result of the adsorption of chromates and phosphates ions, the structure of the diatomite slightly changes. XRD analysis performed confirms the change in the size of the crystallites and grains of the adsorbent tested ( Figure 3). A strong diffraction peak (1 0 1) at 26.60 • 2θ comes from quartz ( Figure 4). Based on this peak, the crystallite size (D) was calculated for three samples ( Table 4). The change in crystallite size is not significant and remains in the same order of magnitude. Crystallinity and amorphous ratio are shown in Table 4. Diatomite adsorbent is characterized by a twice higher proportion of the crystalline phase as compared to the amorphous phase. The presence of phosphate and chromate adsorbates does not significantly affect the proportion of these phases. twice higher proportion of the crystalline phase as compared to the amorphous phase. The presence of phosphate and chromate adsorbates does not significantly affect the proportion of these phases.   The FTIR spectrum was performed to identify functional groups on the surface of the adsorbent used. As a result, it was possible to observe the structural changes caused by the ongoing adsorption process. This is especially important from the point of view of regenerating this type of adsorbent, and thus the possibility of its multiple uses in subsequent processes. The spectrum analysis is shown in Table 5.   The FTIR spectrum was performed to identify functional groups on the surface of the adsorbent used. As a result, it was possible to observe the structural changes caused by the ongoing adsorption process. This is especially important from the point of view of regenerating this type of adsorbent, and thus the possibility of its multiple uses in subsequent processes. The spectrum analysis is shown in Table 5.  In all the spectra of the tested samples of Absodan Plus, there are characteristic bands in the following areas: 3440 cm −1 , 1630 cm −1 , 1050 cm −1, and 800 cm −1 (Figure 4). The band around 3443 cm −1 can come from both the hydroxyl groups that build the water molecule and those that have been bonded to the AP surface by chemical bonds. The band located at the value of 1643 cm −1 indicates the presence of C=C bonds and carboxyl-carbonate structures. The most intense of the bands located at 1076 cm −1 comes from vibrations of C-O bonds that occur in ether, carboxyl, and phenol groups. The band at the value of 796 cm −1 is the result of the presence of SiO4 4− and AlO4 5− systems in the tetrahedral samples, forming the three-dimensional structure of diatomites [72].
In the spectra of the samples after the adsorption process, an additional band appears at the wavenumber value of 1386 cm −1 . It was suspected that it could be derived from an adsorbed orthophosphate (V) ion or a complex formed by it. To verify the thesis, the experimental spectrum was correlated with the FTIR spectrum of sodium dihydrogen phosphate, the source of phosphate ions in the conducted research. It turned out that there is a characteristic band in the range of 1300-1400 cm −1 . This fact confirms that the 1386 cm −1 band is derived from molecules of the adsorbate attached to the AP surface ( Figure 4). After analyzing the spectroscopic spectra, it was found that the process of adsorption of phosphate ions and, to a lesser extent, chromate ions take place.   In all the spectra of the tested samples of Absodan Plus, there are characteristic bands in the following areas: 3440 cm −1 , 1630 cm −1 , 1050 cm −1, and 800 cm −1 (Figure 4). The band around 3443 cm −1 can come from both the hydroxyl groups that build the water molecule and those that have been bonded to the AP surface by chemical bonds. The band located at the value of 1643 cm −1 indicates the presence of C=C bonds and carboxylcarbonate structures. The most intense of the bands located at 1076 cm −1 comes from vibrations of C-O bonds that occur in ether, carboxyl, and phenol groups. The band at the value of 796 cm −1 is the result of the presence of SiO 4 4− and AlO 4 5− systems in the tetrahedral samples, forming the three-dimensional structure of diatomites [72].
In the spectra of the samples after the adsorption process, an additional band appears at the wavenumber value of 1386 cm −1 . It was suspected that it could be derived from an adsorbed orthophosphate (V) ion or a complex formed by it. To verify the thesis, the experimental spectrum was correlated with the FTIR spectrum of sodium dihydrogen phosphate, the source of phosphate ions in the conducted research. It turned out that there is a characteristic band in the range of 1300-1400 cm −1 . This fact confirms that the 1386 cm −1 band is derived from molecules of the adsorbate attached to the AP surface ( Figure 4). After analyzing the spectroscopic spectra, it was found that the process of adsorption of phosphate ions and, to a lesser extent, chromate ions take place.
The value of the zero point of the adsorbent load determined by the suspension method was 5.6 ( Figure 5a). PZC is the point of intersection of the plot of the dependence ∆pH = f (pH 0) with the OX axis, therefore it is equivalent to the zero point of this function. In the case of the potentiometric method, the PZC was 5.5 ( Figure 5b). The value was read from the graph of the dependence of the potential change [mV] on the volume of used titrant [mL]-PZC is located at the intersection of the lines on the graphs. PZC determined by Hahn's method was 5.9 [ Table 6], its average value fluctuates around pH = 5.5-6.0, i.e., in the area classifying the reaction of the environment as slightly acidic. The pH of the aqueous diatomite solution was 5.2, which is below the zero point of the electric charge. This means that the Absodan Plus surface is positively charged, and it has a greater ability to attach anions than cations. Speciation of phosphorus and chromium anions is strongly pH-dependent. The experiment was carried out in an acidic environment (pH 2), and in the range of the concentrations used, the anions were not fully dissociated.

Phosphorus was present as H 3 PO 4 and H 2 PO 4
− with a slight quantitative predominance of the undissociated form [73]. Under these conditions, the dominant form of chromate was partially dissociated HCrO 4 − (~80%) and in a dozen or so percent Cr 2 O 7 2− [74], as well as the possible content of undissociated acid H 2 CrO 4 [75]. This allows the conclusion that the conditions of the experiment are favorable because a positively charged surface would interact with the anions as a result of electrostatic attraction [75].
was present as H3PO4 and H2PO4 with a slight quantitative predominance of the undissociated form [73]. Under these conditions, the dominant form of chromate was partially dissociated HCrO4 − (~80%) and in a dozen or so percent Cr2O7 2− [74], as well as the possible content of undissociated acid H2CrO4 [75]. This allows the conclusion that the conditions of the experiment are favorable because a positively charged surface would interact with the anions as a result of electrostatic attraction [75].

The Adsorption Equilibrium
The adsorption isotherms of phosphates ions ( Figure 6) and chromates ions ( Figure  7) were prepared to select the model that best describes the adsorption process on Absoban Plus. Each of the isotherms is represented by the relation qe = f(Ce). The following isotherms were made: Halsey, Jovanovich, Langmuir, Redlich-Paterson, and Freundlich. The comparisons of isothermal models for adsorbed phosphates and chromates ions are presented in Figures 6 and 7. The parameters obtained for all isothermal models for adsorbed chromates and phosphates ions are presented in Table 7.

The Adsorption Equilibrium
The adsorption isotherms of phosphates ions ( Figure 6) and chromates ions ( Figure 7) were prepared to select the model that best describes the adsorption process on Absoban Plus. Each of the isotherms is represented by the relation q e = f (C e ). The following isotherms were made: Halsey, Jovanovich, Langmuir, Redlich-Paterson, and Freundlich. The comparisons of isothermal models for adsorbed phosphates and chromates ions are presented in Figures 6 and 7. The parameters obtained for all isothermal models for adsorbed chromates and phosphates ions are presented in Table 7.
A good fit to the experimental points is represented by those isotherms that determine the relationship q e = f (C e ). The parameters determined from each of these equations can help assess the adsorption efficiency, the affinity of the adsorbent for the adsorbate, and whether the sorption system used is favorable or not.
The Redlich-Peterson isotherm was the best fit for the experimental points. This is confirmed by the calculated coefficient of determination, which for this model has the highest value: R 2 = 0.975 (chromates ions) and 0.994 (phosphates ions). The error in fitting the theoretical curve to the experimental data also reaches the smallest value (χ 2 = 6.0 and 8.5, respectively) ( Table 7). The parameters of this equation are, in the case of chromium ions, respectively: K RP = 29.7 L·g −1 , a RP = 1.13 L·mg −1 and B = 0.8. For phosphates ions, the parameters assume the following values: K RP = 255 L·g −1 , a RP = 40.3 L·mg −1 and B = 0.8 ( Table 7). The worst fit shows the Halsey isotherm, for which the value of R 2 is <0.1 and the value of χ 2 /DoF is 520 (phosphates ions) and 4320 (chromates ions). The Halsey model is used for multilayer adsorption on the heterogeneous surface [76], which does not occur with the adsorption performed.    The 1 n parameter in the Freundlich isotherm characterizes the surface of the adsorbent. The values should be between 0 and 1. The closer the value to 1 n is to 0, the more ideal the adsorbent surface is. On the other hand, values of 1 n close to 1 define the surface as heterogeneous. In the experiment, the value of n was determined at 4.2 (chromates ions) and 4.9 (phosphates ions), and 1 n at 0.24 (chromates ions) and 0.20 (phosphates ions). To predict whether sorption under certain conditions is favorable, the partition coefficient R L can be calculated for each measuring point. R L is characteristic of systems described by the Langmuir isotherm. When the R L is between 0-1, then adsorption on selected components is favorable. If R L > 1, it means that the system has unfavorable sorption characteristics for the phenomenon studied. The relationship is calculated based on the following equations: where: R L -partition coefficient; a L -the quotient of the equilibrium constant for the isotherm and the maximum area coverage for the model.
For the analyzed adsorption system, a graph of R L = f (C 0 ) was prepared (Figure 8). It shows that the calculated parameter is in the range from 0 to 1. This means that the surface phenomenon related to the removal of the examined ions is favorable. q where: RL-partition coefficient; aL-the quotient of the equilibrium constant for the isotherm and the maximum area coverage for the model.
For the analyzed adsorption system, a graph of RL = f(C0) was prepared (Figure 8). It shows that the calculated parameter is in the range from 0 to 1. This means that the surface phenomenon related to the removal of the examined ions is favorable. The Langmuir maximal adsorption capacity of Absodan Plus converted to phosphorus is 9.46 mg P/g. It is rather a high capacity compared to other capacities obtained for natural diatomites and ranges from 0.46-3.51 mg P/g ( Table 7). The Absodan Plus adsorption capacity converted to chrome is 39.1 mg Cr/g. It is a very good result compared to capacities of calcined diatomite and raw Carpathian diatomite equal to 0.2 mg Cr/g and 0.12 mg Cr/g respectively [48,49]. As shown in Table 8, the adsorption capacity of Absodan Plus is satisfactory compared to unmodified diatomites. Various modifications lead to an increase in the efficiency of removing of phosphates and chromates by the transformed surface of the diatomite. A much higher removal capacity can be achieved by lanthanum oxide modified diatomite [77] or MCM-41 composite with refined diatomite containing a higher concentration of diatom frustules [50]. However, they are more advanced materials that require special reagents to produce. It is also a mineral that effectively adsorbs phosphates by surface complexation and precipitation [78][79][80]. As shown in Table 8 diatomite coated by hydrous iron oxide and metallic iron/iron oxides are characterized by a significant increase in the adsorption capacity of phosphates and chromates [27,28]. Other studies have shown that hematite can adsorb chromates, especially in an acidic environment [81]. As shown by the XRD analysis, Absodan Plus contains an admixture of hematite, which can support the removal of chromium and phosphorus. The Langmuir maximal adsorption capacity of Absodan Plus converted to phosphorus is 9.46 mg P/g. It is rather a high capacity compared to other capacities obtained for natural diatomites and ranges from 0.46-3.51 mg P/g ( Table 7). The Absodan Plus adsorption capacity converted to chrome is 39.1 mg Cr/g. It is a very good result compared to capacities of calcined diatomite and raw Carpathian diatomite equal to 0.2 mg Cr/g and 0.12 mg Cr/g respectively [48,49]. As shown in Table 8, the adsorption capacity of Absodan Plus is satisfactory compared to unmodified diatomites. Various modifications lead to an increase in the efficiency of removing of phosphates and chromates by the transformed surface of the diatomite. A much higher removal capacity can be achieved by lanthanum oxide modified diatomite [77] or MCM-41 composite with refined diatomite containing a higher concentration of diatom frustules [50]. However, they are more advanced materials that require special reagents to produce. It is also a mineral that effectively adsorbs phosphates by surface complexation and precipitation [78][79][80]. As shown in Table 8 diatomite coated by hydrous iron oxide and metallic iron/iron oxides are characterized by a significant increase in the adsorption capacity of phosphates and chromates [27,28]. Other studies have shown that hematite can adsorb chromates, especially in an acidic environment [81]. As shown by the XRD analysis, Absodan Plus contains an admixture of hematite, which can support the removal of chromium and phosphorus. diatomite 0.60 mg P/g [28] diatomite 3.51 mg P/g [27] hydrous Fe oxide modified diatomite 5-25 mg P/g [28] diatomite coated by Fe 0 and Fe oxides 37.0 mg P/g [27] La oxide modified diatomite 58.7 mg P/g [77] Absodan Plus 9.46 mg P/g present study Cr calcined diatomite 0.20 mg Cr/g [47] diatomite 0.12 mg Cr/g [75] Fe oxide modified diatomite 6.10 mg Cr/g [47] diatomite-MCM-41 composite 70.9 mg Cr/g [50] Absodan Plus 39.1 mg Cr/g present study

The Adsorption Kinetics
When the adsorbent surface is saturated with molecules of the adsorbed substance, the adsorption capacity deteriorates, and the process should be stopped. Changes in phosphate ions concentration in solution and on the surface of the adsorbent during the adsorption process are shown in Figure 9. During the adsorption process, there is an exponential increase in the concentration of phosphate ions immobilized on the surface of the Absodan Plus and a decrease in their concentration in the solution. The concentration of the tested ions on the adsorbent surface initially increases rapidly, and after about 2 h, it practically does not change. Initially, the decrease in the concentration of phosphate ions is significant, then it is slowed down to a constant value after about 2.5 h. The situation is similar in the case of chromate ions (Figure 9). The obtained results indicate that chromate ions had easier access to the active centers of diatomite, which was confirmed by the size of the analyzed ions (phosphate ions are higher than chromate ions).
, 3540 17 of 21 Figure 9. The pseudo-first-order and pseudo-second-order kinetic curves for the adsorption process for chromates and phosphates ions on an Absodan Plus.
To determine the rate-limiting stage of the adsorption process, the intraparticle diffusion model developed by Weber and Morris [63] was used ( Figure 10). The adsorption process can be divided into two stages: surface diffusion and intraparticle diffusion (mass transport takes place in each stage). The surface diffusion that occurs through the boundary layer is characterized by a high rate. Then the substance migrates deep into the structure of the diatomite, slowly filling the available pores until it fills their entire volume. The Weber model allows us to determine which of these stages affects the overall rate of adsorption [63].
The non-linear course of the entire adsorption process confirms that it is multistage. For the linear fragments in the diagrams (Figure 10), additional graphs were prepared and simple equations were determined. The slope values in the equations are equal to the diffusion process rate constant (Table 10). The first segment in the graphs is assigned to boundary layer diffusion, which is the main rate-limiting step for the entire process. The higher the value of the intercept in the equation of these lines, the greater the effect of To investigate the mechanism and determine the rate of the adsorption process, pseudofirst-order (PFO) and pseudo-second-order (PSO) kinetic models were developed (Table 9). Both the adsorbent and the adsorbate molecules could participate in the adsorption of chromates and phosphates ions on the diatomite. The analysis of pseudo kinetic curves showed that they were not linear (the kinetic equation is not fulfilled). The pseudosecond-order kinetic curves showed linear dependencies that go through the origin of the coordinate system (Figure 9). The pseudo-second-order kinetic equation has been met, as evidenced by a very good fit to the experimental data (R 2 values equal to 1). Three factors influence adsorption: the adsorbent, water, and the ions dissolved in it. To determine the rate-limiting stage of the adsorption process, the intraparticle diffusion model developed by Weber and Morris [63] was used ( Figure 10). The adsorption process can be divided into two stages: surface diffusion and intraparticle diffusion (mass transport takes place in each stage). The surface diffusion that occurs through the boundary layer is characterized by a high rate. Then the substance migrates deep into the structure of the diatomite, slowly filling the available pores until it fills their entire volume. The Weber model allows us to determine which of these stages affects the overall rate of adsorption [63].

Conclusions
The Absodan Plus is a diatomite commercial material containing an amorphous phase (33%) and also the crystalline phase of quartz, hematite, and grossite. The material is macro and mesoporous and its specific surface area is about 30 m 2 /g. Its PZC is around pH = 5.5-6.0 and in an acidic environment is able to adsorb the anions. The saturation of the adsorbent surface with the adsorbed anions occurs after 2 h for chromates ions and 2.5 The non-linear course of the entire adsorption process confirms that it is multistage. For the linear fragments in the diagrams (Figure 10), additional graphs were prepared and simple equations were determined. The slope values in the equations are equal to the diffusion process rate constant (Table 10). The first segment in the graphs is assigned to boundary layer diffusion, which is the main rate-limiting step for the entire process. The higher the value of the intercept in the equation of these lines, the greater the effect of boundary layer diffusion on the overall rate of the adsorption process. The second segment shows intraparticle diffusion. The slope values in the simple equations fitted to this stage correspond to the intraparticle diffusion constant (k 1 , k 2 ), which in both cases is close and almost equal to zero. This is because this adsorption step is almost a constant function and does not significantly affect the rate of the entire process.

Conclusions
The Absodan Plus is a diatomite commercial material containing an amorphous phase (33%) and also the crystalline phase of quartz, hematite, and grossite. The material is macro and mesoporous and its specific surface area is about 30 m 2 /g. Its PZC is around pH = 5.5-6.0 and in an acidic environment is able to adsorb the anions. The saturation of the adsorbent surface with the adsorbed anions occurs after 2 h for chromates ions and 2.5 h for phosphates ions. The results obtained indicate that chromate ions had easier access to the diatomite's activity centers. Among the analyzed models of isotherms, the Redlich-Peterson isotherm is the best fit for the experimental points (R 2 = 0.975 and 0.994 for chromates and phosphates ions, respectively) showed. The rate-limiting stage of the adsorption of chromates and phosphates ions on diatomite is diffusion in the boundary layer. Intraparticle diffusion slightly affects the kinetics of the process. The maximum adsorption capacity of Absodan Plus in terms of phosphorus and chromium amounts to 9.46 mg P/g and 39.1 mg Cr/g, respectively. The adsorption capacity of Absodan Plus is satisfactory compared to unmodified diatomites. Various modifications lead to an increase in the phosphate and chromate removal efficiency by the reshaped diatomaceous earth surface. As shown by XRD analysis, Absodan Plus contains an admixture of hematite, which can support the removal of chromium and phosphorus.