Raw material and sample preparation

Five kg of quinoa seeds (Chenopodium quinoa Willd. var. Hualhuas), suitable for consumption, was purchased at the Zucchi Distributor (Rosario, Santa Fe, Argentina). The quinoa employed in this study was native to Trujillo, Peru (8°6'57.56" S, 79°1'47.93" W).

Drying experiments

The temperatures were selected based on the other studies. ^{Vilche et al. (2003)} tested the temperatures 30°C, 50°C, 70°C, and 90°C. ^{Ramos Gómez and Peña Rivera (2019)} dried quinoa grains at 40°C, ⁵ 0°C, and 60°C. ^{Paquita Ninaraqui (2015)} studied the Salcedo Inia variety of quinoa and used temperatures of 50°C, 60°C, and 70°C. ^{Carciochi (2014)} used temperatures of 100°C, 145°C, and 190°C. As a generally accepted standard in most countries, a maximum drying air temperature of 90°C has been established (^{Garnero, 2006}). Considering the aforementioned, temperatures of 40°C, 60°C, and 80°C were selected for this study.

During the drying, the speed of the air must not be so high as to cause the entrainment of solids. Typical drying air velocities in industrial dryers range from 0.7 to 3.0 m s^-1 (^{Perry, 1992}). ^{Vilche et al. (2003)}) used a drying air speed of 0.3 m s^-1. The laboratory dryer selected for this research operated at two speeds: 0.2 and 0.7 m s^-1.

The drying treatments were carried out using a pilot-scale oven (Tecno Dalvo, Model CHC/F/I, Argentina). For each experiment, 0.200±0.001 kg of quinoa grains were weighed. The grains were placed in a stainless-steel mesh to allow the circulation of the air. The drying experiments were carried out in triplicate.

The sample moisture content was determined gravimetrically according to the AOAC 945.15 technique (AOAC, 1990); 0.002±0.001 kg of grains were weighed in aluminum capsules previously tared, then dried in an oven (Sific, Argentina) for 3 h at 103±2°C. The sample was cooled to room temperature in a desiccator before being weighed.

Flour milling and sieving

The seeds were processed for 15 s in a blade mill (IKA, Germany). The flour was kept in plastic bags until use.

Flours grading was determined by a Ro Tap sifter (Tyler, USA) equipped with 16 (1000 цгп), 25 (679 цгп), 50 (289 цгп), 100 (149 цгп), 200 (74 цщ), and 270 (53 mm) U.S meshes. 0.1 kg samples were sieved and shaken for 5 min. Finally, the fractions of flour retained in each sieve were weighed and the retention percentage was calculated. The final mean value size was obtained in triplicate.

Mathematical modeling of the drying operation

Quinoa seed sphericity

Sphericity is the degree of approximation of a seed to a sphere and in any seed it is a function of its physical dimensions (length, width, and thickness). The quinoa seed sphericity was calculated using the following expressions (^{Gallegos Ramos et al., 2022}):

where:

ф is the dimensionless sphericity;

D_g is the geometric mean seed diameter in mm;

L is the seed length in mm;

A is the seed width in mm;

e is the seed thickness in mm.

Measurements of the seed length, width and thickness were made in triplicate with a caliper (precision 0.05 mm) as shown in Figure 1. For the determinations, a sample of thirty grains was taken at random.

FIGURE 1 Length, width, and thickness measurements of the quinoa grain. 

Considerations for the drying model application in GAMS

Because the constant drying period in most foods is very short and the critical humidity is practically equal to the initial moisture, only the period of decreasing rate was considered.

A mathematical model based on the law of conservation of mass was proposed to describe the moisture profile of the samples during the drying process. The following hypotheses were considered:

Mass transfer model

The mathematical expressions used were written in spherical coordinates, which were fixed in the geometric center of the grain.

The radial diffusion model of moisture transfer was used to study the time evolution of the radial distribution of the local moisture content during drying.

Fick's second law was applied to describe the diffusion of moisture within qu inoa grain with radio R, as in Equation 3.

where HS is the grain moisture content; ps is the grain density; D_eff is the effective diffusion of the moisture content; t is the drying time, and R_s is )he radius of the solid grain.

The initial and boundary conditions tha t wer e used to solve the equation are:

a) Initial condition

At the sta=t of the dryi ng operation th e moisture content of the grain was u n iform.

b) Symmetry condition

c) Due to symmetry, Üiere wa² no moisture gradie nt. The bfundary conditions at the center were:

d) Boundary condition at the interface for convective drymg

A convective mass transfer phenomenon was considered from the ^rurface of the grain to trie bulk air (Eq. 6). HS _eq and k are the e=uilibrium m oisture content of the dry solid and the external mass transfer coefficient, respectively.

The mass transfe° coefficient (k) was calculated using the Sherw=od number (S_h). It was determined by ^{Mills and Coimbra (2015)} wi(h Equatio_Sis 7-12:

where

D_w is water vapor diffusion in air (cm² s^-1);

Re is Reynolds number;

Sc is Schmidt number;

G_a air mass flow rate (g с m^-2 m in^-1);

µ_a is air viscosity (g cm^-1 min^-1);

Ma is air molecular we ight (g mol^-1) ;

Pa is water vapor rjressure in air (Pa);

v is air velocity (cm s^-1).

An Arrhenius-type equation was employed to evaluate the eRfectiv_e diffusivity of the m oisture:

wh=re D_eff is the effective diffusivity and the parameters A, B and C are predicted by the model.

The average moistu re co ntent < H S > at each instant was obtained by integrating the local moisture content over the volume (V). Specifically, the average moisture content was expressed аз stated in Equation 14, which can be solved using the trapezoidal rule.

Problem solving strategies

The differential e quations were discretized to become alg^abraic equations and then implemented in the GAMS soft-ware. Tharefore, Equations 3 to 6 were discretized using ihe implicit central finite di fference method (CFDM).

Spatialand temporal variations were defined by Equations 15 and )6 respectively with M=9 and N=100. M and N were ctetermined before and both guarantee the stability of the solution.

The nonlinear programming model was executed in the software GAM S using the; solver CONOPT (^{Singh & Heldin an, 2008}).

At the beginning, the model was used to calculated the parameter of the effective diffusion (Eq. 13)^- The objective of this step was to evaluate the model performance and the correlations used. Then, the obtained diffusion coefficient parameters values were fixed. An objective function (Fo) was implemented (Eq. 17), which was based on the minimization of the root me an squ are error (RMSE) of the experimental and predicted moisture content data.

where <HS>_exp is the experimental average humidity, <HS> is the average humidity predicted by the model, and N is the number of experimental data.

To estimate the mass transfer coefficients, correlations reported in the literature were used in order to reduce the degrees of freedom of the model and to facilitate the resolution of the Non Linear Programming (NLP) models. The resulting model involved 4,052 variables and 3,547 constraints.

Statistical analysis of the data

Experimental results were obtained in triplicate and were presented as mean ± standard deviation (SD). The statistical analysis was carried out using the Minitab program (Pennsylvania, USA), performing analysis of variance, with comparison of treatment means using the Tukey test (P<0.05). For the resolution of the drying model, the GAMS software (Washington, USA) was used, which solves models based on algebraic equations.

Drying model application

Table 1 presents the water diffusion coefficient averaged over time, the mass transfer coefficient, and the root mean square error (RMSE) for the assayed model. The MSE is acceptable. The model describes the operation of drying satisfactorily and has a high goodness-of-fit.

TABLE 1 Adjustment data obtained by applying the drying model. 

Different letters indicate significant differences using Tukey's test (P<0.05). T: drying temperature; v: air velocity; D_ell: effective diffusion coefficient; RMSE: root-mean-square error, A, B, and C: parameters from effective diffusivity equation; Ea: activation energy; R²: coefficient of determination; k: mass transfer coefficient.

The water effective diffusion growth increased with increasing of the drying air temperature. As expected, the higher the temperature of the drying air, the greater the mobility of the water from the interior to the surface of the grains (Fabani et al., 2020). This results in an increase in the effective diffusivity of water and mass transfer. The effective diffusivity presented significant differences (P<0.05) concerning the drying air temperature. The results obtained were similar to those reported by other authors (10^-11 and 10^-8 m² s^-1) (^{Bravo et al., 2009}).

^{Noroña Gamboa (2018)} evaluated the drying kinetics of barley, wheat, and corn seeds using drying temperatures of 40 and 60°C and an air flow rate (1.1 m s^-1). The diffusions coefficients obtained were in a range of 1.39x10^-10 - 1.83x10^-10 m² s^-1 for corn, 2.32x10^-11 - 7.84 x10^-11 m² s^-1 for wheat and 4.30x10^-11 - 1.41x10^-10 m² s^-1 for barley.

^{Janampa Arango (2017} investigated the effective diffusivity during convective drying at 60°C and an air speed of 4.5 m s^-1. The following values were obtained for the different varieties of quinoa: Black Collana (5.73 x 10-11), Black Ayrampo (5.73 x 10^-11), Pasankalla (1.05 x 10^-10), Yellow Composite (5.23 x 10^-11), and Rosada de Juli (5.13 x 10^-11).

According to ^{Paquita Ninaraqui (2015)}, high Ea values indicate low sensitivity of the diffusion coefficient with respect to temperature. Lowest values were obtained for highest air drying temperature and velocity (80°C and 0.7 m s^-1) (Tab. 1). Similar values were reported by ^{Vega Gálvez et al. (2010)}, ^{Noroña Gamboa et al. (2018)}), and ^{Aravindakshan et al. (2021)}.

The mass transfer coefficient increased with increasing temperature and velocity of the drying air. It was significantly influenced (P<0.05) by the drying air velocity. A higher speed of the drying air promotes the renewal of the drying air, avoiding its saturation; it produced an increase in the mass transfer coefficient.

Model validation

Figures 2 shows the experimental and model-estimated average moisture values for quinoa grains at different temperatures (40°C, 60°C, and 80°C) and drying air speeds (0.2 m s^-1 and 0.7 m s^-1). The proposed model accurately describes the drying kinetics for quinoa grains for all the operating conditions tested.

FIGURE 2 Experimental and model-predicted drying curves for the three drying temperatures tested. A) speed of the drying air, v1= 0.2 m s-1; B) speed of the drying air, v2= 0.7 m s-1. < HS >: average humidity. Error bars is standard error. 

The development of the experimental design resulted in six runs. A portion of the data set (3 runs) was independently acquired to obtain A, B, and С from equation 13. The other experimental runs were implemented to validate the proposed model using the estimated coefficients.

FIGURE 3 Grading quinoa flour curves. 

Grading quinoa flour curve

Figure 3 shows flour grading curves obtained by grinding the dried seeds.

Table 2 shows the performance of quinoa flour retained in a 50-mesh sieve. According to the PROINPA (2011) classification, the flour obtained for 50 mesh (minimum granule size of 0.297 mm) corresponds to bran (granule size between 0.487 and 0.23 mm).

TABLE 2 Quinoa flour (50-mesh) performance to different treatments. 

Different letters indicate significant differences according to Tu key's test (P<0.05).

This permits its use for balanced foods, whole meal bread, bakery, biscuits, pasta, purees, soups, and creams.

In grinding performance for the two drying air speeds or the three drying temperatures tested, significant differences (P>0.05) were not found.

^{Ortega Guerrero et al. (2013)} used a series of Tayler sieves (14, 30, 60, 100, 200, and bottom) and reported 45.35% retained for 100 mesh. Likewise, ^{Castro (2010)} obtained 33.04% for 60 mesh for the unpolished Matarredonda variety quinoa flour. The variation in the granulometric analysis could be due to the variety of quinoa and the drying and grinding processes used in the evaluation.

^{Cerezal Mezquita et al. (2011)} made the granulometric profile of quinoa flour obtained from the Nestlé Company (Chile). They used a vibrating sieve equipment and observed that 53.91% of the sample was retained in sieves N° 30, N° 60 (250 цгп) and N° 80 (180 цгп). The remaining 46.09% of flour remained in the sieve end collector.

In this study, higher yields were found in the milling compared to the antecedents published in literature. This situation may be due to the quinoa variety and the grinding equipment.