Open access peer-reviewed chapter

Study of Effect of Temperature Radient on Solid Dissolution Process Under Action of Transverse Rotating Magnetic Field

By Rafał Rakoczy, Marian Kordas and Stanisław Masiuk

Submitted: February 7th 2012Reviewed: July 11th 2012Published: July 24th 2013

DOI: 10.5772/51296

Downloaded: 1068

1. Introduction

The design, scale-up and optimization of industrial processes conducted in agitated systems require, among other, precise knowledge of the hydrodynamics, mass and heat transfer parameters and reaction kinetics. Literature data available indicate that the mass-transfer process is generally the rate-limiting step in many industrial applications. Because of the tremendous importance of mass-transfer in engineering practice, a very large number of studies have determined mass-transfer coefficients both empirically and theoretically. From the practical point of view, the agitated systems are usually employed to dissolve granular or powdered solids into a liquid solvent [3].

Transfer of the solute into the main body of the fluid occurs in the three ways, dependent upon the conditions. For an infinite stagnant fluid, transfer will be by the molecular diffusion augmented by the gradients of temperature and pressure. The natural convection currents are set up owing to the difference in density between the pure solvent and the solution. This difference in inducted flow helps to carry solute away from the interface. The third mode of transport is depended on the external effects. In this way, the forced convection closely resembles natural convection expect that the liquid flow is involved by using the external force.

One of the key aspects in the dynamic behaviour of the mass-transfer processes is the role of hydrodynamics. On a macroscopic scale, the improvement of hydrodynamic conditions can be achieved by using various techniques of mixing, vibration, rotation, pulsation and oscillation in addition to other techniques like the use of fluidization, turbulence promotes or magnetic and electric fields etc. The transverse rotating magnetic field (TRMF) is a versatile option for enhancing several physical and chemical processes. Studies over the recent decades were focused on application of magnetic field (MF) in different areas of engineering processes [21, 22]. Static, rotating or alternating MFs might be used to augment the process intensity instead of mechanically mixing. The practical applications of TRMF are presented in the relevant literature [6, 16, 18, 23, 26, 27, 29].

Recently, TRMF are widely used to control different processes in the various engineering operations [2, 9, 10]. This kind of magnetic field induces a time-averaged azimuthal force, which drives the flow of the electrical conducting fluid in circumferential direction. According to available in technical literature, the mass-transfer during the solid dissolution to the surrounding liquid under the action of TRMF has been deliberated [21, 22]. These papers present literature survey for the applications of magnetic field (MF) and the magnetically assisted fluidization (MAF) in the mass transfer enhancement.

It should be noticed that the temperature gradient induces buoyancy-driven convective flow in the fluid. This temperature gradient has a significant practical interest to the mass transfer process. It is reported that the difference between the surface temperature of solid sample and the liquid temperature has strong influence on the dissolution process [1].

The main objective of the present study is to investigate the solid dissolution process that is induced under the action of TRMF and the gradient temperature between solid surface and liquid. According to the information available in technical literature, the usage of TRMF and gradient temperature is not theoretical and practical analyzed. The obtained experimental data are generalized by using the empirical dimensionless correlations.

2. Theoretical background

2.1. Equation of magnetic induction

The flow under the action of TRMF may be determined by taking into consideration the following magnetohydrodynamic Ohm law

1μmrotB¯=J¯E1

The current density (J¯)and the total electric field current (E¯)may be expressed as follows

J¯=σe[E¯+(w¯×B¯)]E2
E¯=w¯×B¯+rotB¯σeμmE3

The general Eq.(3) may be rewritten as:

rotE¯=rot(w¯×B¯)+rotrotB¯σeμmE4

Taking into consideration the following expressions

ΔB¯=rotrotB¯+graddivB¯E5
rotE¯=B¯τE6
divB¯=0E7

we obtain from the Eq.(3) the well-known advection-diffusion type relation [8, 17]

B¯τ=rot(w¯×B¯)+ΔB¯σeμmE8

The above equation (8) is also called the induction equation and it characterizes the temporal evolution of the magnetic field where

νm=1σeμmE9

is effective diffusion coefficient (magnetic viscosity or magnetic diffusivity).

Taking into accunt the above relation, Eq. (8) may be revritten in the following form

B¯τ=rot(w¯×B¯)+νmΔB¯E10

The term, rot(w¯×B¯), in Eq.(8) dominates when the conductivity is large, and can be regarded as describing freezing of MF lines into the liquid. The term, νmΔB¯, in the B-field equation may be treated as a diffusion term. When the electrical conductivity, σe, is not too large, MF lines diffuse within the fluid.

Taking into account the below definitions of the dimensionless parameters

B¯=B¯B0;τ=ττ0;w¯=w¯w0;l=ll0;νm=νmνm0;rot=rotl01;Δ=Δl02;τ=1τ01τE11

we get the modified form of the relation (8)

B0τ0[B¯τ]=w0B0l0[rot(w¯×B¯)]+νm0B0l02[ΔB¯]E12

The above form of Eq. (8) may be used to examine the effect of liquid flow on the MF distribution. The non-dimensional forms of these equations may be scaled against the term(νm0B0l02). The dimensionless form of the equation (12) may be expressed by

l02νm0τ0[B¯t]=w0l0νm0[rot(w¯×B¯)]+[ΔB¯]E13

This equation includes the following dimensionless groups

Fom=νm0τ0l02E14

and

Rem=w0l0νm0E15

The magnetic Reynolds number (Rem)is analogous to the traditional Reynolds number, describes the relative importance of advection and diffusion of the MF.

Taking into account the above definitions of the non-dimensional groups (Eqs (14) and (15)), we obtain the following general relationship of the magnetic induction equation

1Fom[B¯τ]=Rem[rot(w¯×B¯)]+[ΔB¯]E16

It should be noticed that the time of magnetic diffusion, τd, may defined as follows

1Fom~1τ0~l02νm0τd=σeμml02E17

Taking into account the following relation

rot(w¯×B¯)B¯gradw¯w¯gradB¯+w¯divB¯B¯divw¯E18

we obtain the modified form of Eq. (8)

w¯gradB¯=ΔB¯σeμmw¯gradB¯=νmΔB¯E19

The governing Eq.(19) may be rewritten in a symbolic shape which is useful in the case of the dimensionless analysis

w0B0l0[w¯gradB¯]=νm0B0l02[νmΔB¯]E20

The above Eq.(20) admits the following relation

w0B0l0~νm0B0l02E21

where w0ωTRMFl0andΔ=Δl02Δ=Δδ02.

An important consequence of the above expression (Eq.(21)) is that the skin depth (or the penetration depth), δ, may be given as follows

w0B0l0~νm0B0δ02δ0~νml0w0δ=νmωWPME22

This parameter may be used to describe the well-known skin effect. From the practical point of view, this phenomenon is characterized by the so-called shielding parameter

S=ωWPMl02νmE23

This dimensionless parameter see ( Eq (23)) is usually applied characterize the interaction between the MF and the electrical conductivity of liquid. The condition S1means that MF is not changed by the conducting liquid. On the contrary, the condition S1describes the typical skin effect which means that MF can penetrate into the highly electrically conductive liquid.

2.2. Influence of transverse rotating magnetic field on solid dissolution process

Under forced convective conditions, the mathematical description of the solid dissolution process may be described by means of the differential equation of mass balance for the component i

ρiτ+div(ρiwi¯)=ΦiE24

where Φiis the mass flux of component i (the volumetric mass source of component i).

The flux density of component i (Ji¯)may be given by

Ji¯=ρiwi¯E25

The diffusion flux density is described by means of the following expression

Jdyf¯=ρidifwi¯Jdyf¯=ρi(wi¯w¯)E26

The relation between Ji¯and Jdyf¯is defined as

Ji¯=Jdyf¯+ρiw¯ρiwi¯=ρi(wi¯w¯)+ρiw¯E27

Including the relation (27) in equation (24) gives the following relationship for the mass balance of component i

ρiτ+div[Jdyf¯]+div(ρiw¯)=ΦiE28

Introducing the relation

div(ρiw¯)=ρidiv(w¯)+w¯grad(ρi)E29

in Eq.(28) gives the mass balance of component i

ρiτ+w¯grad(ρi)+ρidiv(w¯)+div[Jdyf¯]=ΦiE30

The concentration of component i may be expressed as follows

ci=ρiρρi=ρciE31

Taking into account the above equation, we find the modified form of Eq.(30)

(ρci)τ+w¯grad(ρci)+(ρci)div(w¯)+div[Jdyf¯]=ΦiE32

Eq.(32) may be rewritten by

(ρci)τ+w¯grad(ρci)=ρciτ+ρw¯grad(ci)+ciρτ+ciw¯grad(ρ)E33

or

ρciτ+ρw¯grad(ci)+ci[ρτ+w¯grad(ρ)+ρdiv(w¯)]+div[Jdyf¯]=ΦiE34

The term in square brackets is so-called the continuity equation and this relation may be simplified in the following form

ρτ+w¯grad(ρ)+ρdiv(w¯)=0dρdτ+div(ρw¯)=0E35

This leads to the final expression for the mass balance of component i:

ρciτ+ρw¯grad(ci)+div[Jdyf¯]=ΦiE36

The total diffusion flux density (Jdyf¯)is expressed as a sum of elementary fluxes considering the concentration(Ji¯(ci)), temperature(Ji¯(T)), thermodynamic pressure gradient(Ji¯(p)), and the additional force interactions Ji¯(F¯)(e.g. forced convection as a result of fluid mixing) in the following form

Jdyf¯=Ji¯(ci)+Ji¯(T)+Ji¯(p)+Ji¯(F¯)E37

A more useful form of this equation may be obtained by introducing the proper coefficients as follows

Jdyf¯=ρDigrad(ci)ρDiktgrad(lnt)ρDikpgrad(lnp)+ρDikF¯F¯E38

Under the action of TRMF the force F¯may be defined as the Lorenz magnetic forceFem¯. This force is acting as the driving force for the liquid rotation and it may be described by

Fem¯=J¯×B¯Fem¯=[σeE+σe(w¯×B¯)]×B¯E39

The above relation may be simplified as follows (the electric field vector E¯is omitted)

Fem¯=(σe(w¯×B¯))×B¯E40

The related Lorenz force to the unit of liquid mass may be rewritten in the form

Fem¯=1ρ(σe(w¯×B¯))×B¯E41

Introducing the relation Eq.(41) in Eq.(38) gives the following relationship

Jdyf¯=ρDigrad(ci)ρDiktgrad(lnt)ρDikpgrad(lnp)+DikFem¯((σe(w¯×B¯))×B¯)E42

Taking into account the above relation (Eq.(42)) we obtain the following general relationship for the mass balance of component i

ciτ+w¯grad(ci)+div[Digrad(ci)Diktgrad(lnt)Dikpgrad(lnp)]++div[DikFem¯ρ((σe(w¯×B¯))×B¯)]=ΦiρE43

The obtained Eq.(43) suggests that this dependence may be simplified in the following form

ciτ+w¯grad(ci)+div[Digrad(ci)]+div[Dmρ((σe(w¯×B¯))×B¯)]=ΦiρE44

It should be noticed that the coefficient of magnetic diffusion Dmmay be expressed as follows

Dm=DikFem¯E45

This coefficient may be defined by means of the following expression

Dm=ciτdDm=ciσeμml02Dm=cil02νmE46

Taking into consideration the above relation (Eq.(46)) we obtain the relationship

ciτ+w¯grad(ci)+div[Digrad(ci)]+div[cil02νmρ((σe(w¯×B¯))×B¯)]=ΦiρE47

The above relation (Eq.(47)) may be treated as the differential mathematical model of the solid dissolution process under the action of TRMF. The right side of this equation represents the source mass of component i

Φi=βidFmdV(cicr)Φi=(βi)V(cicr)Φi=(βi)Vci˜Φi=(βi)V(ci˜)E48

where (ci˜)is the driving force for the solid dissolution process.

Introducing Eq.(48) in Eq.(47), gives the following relationship

ciτ+w¯grad(ci)+div[Digrad(ci)]+div[cil02νmρ((σe(w¯×B¯))×B¯)]=(βi)Vci˜ρE49

Taking into account the below definition of the dimensionless parameters

ci=cici0;ci˜=ci˜ci0;w¯=w¯w0;Di=DiDi0;τ=ττ0;μm=μmμm0;νm=νmνm0;ρ=ρρ0;B¯=B¯B0;[(βi)V]=(βi)V[(βi)V]0div=divl01;Div=Divl01;grad=gradl01;E50

we obtain the governing Eq.(50) in a symbolic form

ci0τ0[ciτ]+ci0w0l0[w¯grad(ci)]Di0ci0l02[div[Digrad(ci)]]++ci0σe0w0B02l0νm0ρ0[div[ciνmρ((σe(w¯×B¯))×B¯)]]=[(βi)V]0ci0ρ0[[(βi)V]ci˜ρ]E51

The non-dimensional form of this equation may be scaled against the convective term(ci0w0l0). The dimensionless form of Eq.(51) may be given as follows

l0τ0w0[ciτ]+[w¯grad(ci)]Di0l0w0[div[Digrad(ci)]]++σe0B02l02νm0ρ0[div[ciνmρ((σe(w¯×B¯))×B¯)]]=[(βi)V]0l0ρ0w0[[(βi)V]ci˜ρ]E52

This relation includes the following dimensionless groups characterizing the dissolution process under the action of TRM

l0τ0w0S1E53
Di0l0w0(νw0D)(Di0ν)Re1Sci1Pei1E54
σe0B02l02νm0ρ0(σe0B02l02νρ0)(ννm0)QPrmHa2PrmE55
[(βi)V]0l0ρ0w0([(βi)V]0dp2ρ0Di0)(νw0D)(Di0ν)(D2ds2)ShSc1Re1(D2ds2)E56

Taking into account the proposed relations (53-56), we find the following dimensionless governing equation

S1[ciτ]+[w¯grad(ci)]Pei1[div[Digrad(ci)]]++Ha2Prm[div[ciνmρ((σe(w¯×B¯))×B¯)]]=ShSc1Re1(D2ds2)[[(βi)V]ci˜ρ]E57

From the dimensionless form of Eq.(57) it follows that

ShSc1Re1(D2ds2)~Ha2PrmShSc1~Ha2RePrm(ds2D2)ShSc1~TamPrm(ds2D2)E58

Under convective conditions a relationship for the mass-transfer similar to the relationships obtained for heat-transfer may be expected of the form [11]

Sh=f(Re,Sc)E59

The two principle dimensionless groups of relevance to mass-transfer are Sherwood and Schmidt numbers. The Sherwood number can be viewed as describing the ratio of convective to diffusive transport, and finds its counterpart in heat transfer in the form of the Nusselt number [3].

The Schmidt number is a ratio of physical parameters pertinent to the system. This dimensionless group corresponds to the Prandtl number used in heat-transfer. Moreover, this number provides a measure of the relative effectiveness of momentum and mass transport by diffusion.

Added to these two groups is the Reynolds number, which represents the ratio of convective-to-viscous momentum transport. This number determines the existence of laminar or turbulent conditions of fluid flow. For small values of the Reynolds number, viscous forces are sufficiently large relative to inertia forces. But, with increasing the Reynolds number, viscous effects become progressively less important relative to inertia effects.

Evidently, for Eq.(59) to be of practical use, it must be rendered quantitative. This may be done by assuming that the functional relation is in the following form [4, 13]

Sh=a1Reb1Scc1E60

The mass-transfer coefficients in the mixed systems can be correlated by the combination of Sherwood, Reynolds and Schmidt numbers. Using the proposed relation [60], it has been found possible to correlate a host of experimental data for a wide range of operations. The coefficients of relation [60] are determined from experiment. Under forced convection conditions the relation may be expressed as follows [7]

Sh~Re0.5Sc0.33E61

The exponent upon of the Schmidt number is to be 0.33 [5, 12, 14, 19, 25] as there is some theoretical and experimental evidence for this value [24], although reported values vary from 0.56 [28] to 1.13 [15].

Mass transfer process under the TRMF conditions is very complicated and may be described by the non-dimensional Eq.(57). Use of the dimensionless Sherwood number as a function of the various non-dimensional parameters yields a description of liquid-side mass transfer, which is more general and useful. Taking into account that the magnetic Prandtl number Prm=const(for waterPrm=const) and the ratio of diameters solid sample and diameter of containerdsD=idem, the obtained relationship (see Eq.(58)) may be expressed as follows

ShSc1~TamPrm(ds2D2)Sh=f(Tam,Sc)E62

Basing on the considerations given above, the correlations of mass transfer process under the TRMF action have the general form

Sh=a2Tamb2Scc2E63

2.3. Influence of temperature gradient on the solid dissolution controlled process

As mentioned above, the temperature gradient has strong influence on the solid dissolution process. The heat transfer from the sample to the ambient fluid may be modeled by means of the well-known Nusselt type equation.

Nu=f(Re,Pr)E64

In the present report we consider the process dissolutions described by a similar but somewhat modified relationship between the dimensionless Sherwood number and the numbers which are defined the intensity of the magnetic effects in the tested experimental set-up with the TRMF generator. It should be assumed that the relationship for the heat transport under the TRMF conditions can be characterized in the following general form

Nu=f(Tam,Pr)E65

In order to establish the effect of all important parameters on this process in the wide range of variables data we proposed the following general relationship.

Nu=a3Tamb3Prc3E66

The solid dissolution process under the action of TRMF and the gradient temperature between the solid surface and the liquid may be described by means of the following equations system

{Sh=a2Tamb2Scc2Nu=a3Tamb3Prc3E67

From the above relation (Eq.(67)), the ratio of Sherwood and Nusselt numbers is given by

ShNu=a4Tamb4(ScPr)c4E68

where a2a3a4=a2a3; b2b3b4=b2b3and c2=c3c4=0.33.

In the relevant literature the ratio of the Schmidt and Prandtl numbers is called as the dimensionless Lewis number (the ratio of thermal diffusivity to mass diffusivity)

Le=(ScPr)Le=(νDi)(aν)Le=aDiE69

According to Eq.(69) and the above assumptions, the ratio of Sherwood and Nusselt numbers is defined as follows

ShNu=a4Tamb4Le0.33E70

The enhancement effect of the solid dissolution process due to heat transfer process obtained from Eq.(70) is given by

(βidsDi)(λαsD)=a4Tamb4Le0.33E71

The ratio (βiαs)may be defined by means of the following relationship

(βiαs)=a4Tamb4Le0.33(Dds)(Diλ)E72

Introducing the thermal diffusivity (a=λcpρλ=acpρ)in Eq.(72), gives the relation

(βiαs)=a4Tamb4Le0.33(Dia)(1cpρ)(Dds)(βiαs)=a4Tamb4Le0.33Le1(1cpρ)(Dds)E73

Finally, form relation (73) it follows that

(βiαs)=a4Tamb4Le0.66(1cpρ)(Dds)E74

3. Experimental details

3.1. Experimental set-up

All experimental measurements of mass-transfer process using the TRMF were carried out in a laboratory set-up including electromagnetic field generator. A schematic of the experimental apparatus is presented in figure 1.

Figure 1.

Sketch of experimental set-up: 1 - generator of rotating magnetic field, 2 - glass container, 3,4 - conductivity samples, 5 - electronic control box, 6 - a.c. transistorized inverter, 7 - personal computer, 8 - multifunctional electronic switch, 9 - Hall sample

This setup may be divided into: a generator of the rotating electromagnetic field (1), a glass container (2) with the conductivity samples (3-4), an electric control box (5) and an inverter (6) connected with multifunctional electronic switch (8) and a personal computer (7) loaded with special software. This software made possible the electromagnetic field rotation control, recording working parameters of the generator and various state parameters.

From preliminary tests of the experimental apparatus, the glass container is not influenced by the working parameters of the stator. The TRMF was generated by a modified 3-phase stator of an induction squirrel-cage motor, parameters of which are in accordance with the Polish Standard PN-72/E-06000. The stator is supplied with a 50 Hz three-phase alternating current. The transistorized inverter (4) was used to change the frequency of the rotating magnetic field in the range offTRMF=150Hz. The stator of the electric machine, as the RMF generator is made up of a number of stampings with slots to carry the three phase winding. The number of pair poles per phase winding, p, is equal to 2. The windings are geometrically spaced 120 degrees apart. The stator and the liquid may be treated as apparent virtual electrical circuit of the closed flux of a magnetic induction. The stator windings are connected through the a.c. transistorized inverter to the power source. The generator produces an azimuthal electromagnetic force in the bulk of the TRMF reactor with the magnetic field lines rotating in the horizontal plane.

For the experimental measurements, MF is generated by coils located axially around of the cylindrical container. As mentioned above, this field is rotated around the container with the constant angular frequency,ωTRMF. The TRMF strength is determined by measuring a magnetic induction. The values of the magnetic induction at different points inside the glass container are detected by using a Hall sample connected to the personal computer. The typical example of the dependence between the spatial distributions of magnetic induction and the various values of the alternating current frequency for the cross-section of container is given [20]. The obtained results in this paper suggest that the averaged values of magnetic induction may be analytically described by the following relation

[BTRMF]avg=14.05[1exp(0.05fTRMF)]E75

3.2. Rock-salt sample

Two conductive samples connected to a multifunction computer meter were used to measuring and recording of the concentration of the achieve solution of the salt. The mass of the rock salt sample decreasing during the process of dissolution is determined by an electronic balance that connected with rocking double-arm lever. On the lever arm the sample was hanging, the other arm connected to the balance. In the present investigation the change in mass of solid body in a short time period of dissolution is very small and the mean area of dissolved cylinder of the rock salt may be used. Than the mean mass-transfer Raw rock-salt (>98% NaCl and rest traces quantitative of chloride of K, Ca, Mg and insoluble mineral impurities) cylinders were not fit directly for the experiments because their structure was not homogeneous (certain porosity). Basic requirement concerning the experiments was creating possibly homogeneous transport conditions of mass on whole interfacial surface, which was the active surface of the solid body. These requirements were met thanks to proper preparing of the sample, mounting it in the mixer and matching proper time of dissolving. As an evident effect were fast showing big pinholes on the surface of the dissolved sample as results of local non-homogeneous of material. Departure from the shape of a simple geometrical body made it impossible to take measurements of its area with sufficient precision. So it was necessary to put those samples through the process of so-called hardening. The turned cylinders had been soaked in saturated brine solution for about 15 min and than dried in a room temperature. This process was repeated four times. To help mount the sample in the mixer, a thin copper thread was glued into the sample’s axis. The processing was finished with additional smoothing of the surface with fine-grained abrasive paper. A sample prepared in this way had been keeping its shape during dissolving for about 30 min. The duration of a run was usually 30 sec. The rate of mass-transfer involved did not produce significant dimensional change in diameter of the cylinder. The time of a single dissolving cycle was chosen so that the measurement of mass loss could be made with sufficient accuracy and the decrease of dimensions would be relatively small (maximum about 0.5 mm).

Figure 2.

Sketch of rock-salt sample with the heating set-up

Before starting every experiment, a sample which height, diameter and mass had been known was mounted in a mixer under the free surface of the mixed liquid. The reciprocating plate agitator was started, the recording of concentration changes in time, the weight showing changes in sample’s mass during the process of solution, and time measuring was started simultaneously. After finishing the cycle of dissolving, the agitator was stopped, and then the loss of mass had been read on electronic scale and concentration of NaCl (electrical conductivity) in the mixer as well. This connection is given by a calibration curve, showing the dependence of the relative mass concentration of NaCl on the electrical conductivity [21].

3.3. Rock-salt sample heated by means of the cartridge heater

In the case of this experimental investigations the gradient temperature between the surface and liquid was caused by using the cartridge heater (power ~1200W). This tubular device was inserted into drilled holes of rock-salt sample for heating. Moreover, the heating set-up was contained the temperature controller and sensors. The sensors for the temperature control was placed between the working surface of the sample and the heater. These sensors was also located on the surface of the solid sample. The sketch of rock-salt sample with the heating set-up is graphically presented in figure 2. The sample was kept at a constant temperature (65oC, 70oC or 80oC). The heat transfer from the sample to ambient fluid was realized for the various temperature (20oC, 40oC and 60oC). The system of temperature sensors was used to control the temperature of the water during the solid dissolution process.

3.4. Experimental calculation of mass transfer coefficient

The mass transfer coefficient under the action of TRMF may be calculated form the following equation

dmidτ=βiFmci˜βi=1Fm(ci˜)dmidτE76

The above Eq.(76) cannot be integrated because the area of solid body, Fm, is changing in time of dissolving process. It should be noted that the change in mass of solid body in a short time period of dissolving is very small and the mean area of dissolved cylinder may be used. The relation between loss of mass, mean area of mass-transfer and the mean driving force of this process for the time of dissolving duration is approximately linear and then the mass-transfer coefficient may be calculated from the simple linear equation

[βi]avg=1[Fm]avg[ci˜]avg(difmi)(difτ)E77

The averaged surface Fmis defined as follows

[Fm]avg=π[ds]avghsE78

The volumetric mass transfer coefficient (βi)Vin Eq.(48) is described by relation

(βi)V=βidFmdV[(βi)V]avg=[βi]śr[Fm]śrVlE79

3.5. Experimental calculation of heat transfer coefficient

The heat transfer from the sample to liquid may by modelled by the following relationship

Qs=QlαsFmΔT1=mlcplΔT2E80

This equation can be rewritten as

αsFm(Ts[Tl]t2)=mlcpl([Tl]t2[Tl]t1)αs=mlcpl([Tl]t2[Tl]t1)Fm(Ts[Tl]t2)E81

and the averaged heat transfer coefficient is given as follows

[αs]avg=ml[cpl]avg([Tl]t2[Tl]t1)[Fm]avg(Ts[Tl]t2)E82

The averaged coefficient of heat transfer ([αs]avg)varies with the parameters of the TRMF mixing process and depends on the operating conditions and physical properties of the liquid.

4. Results and discussion

Under the TRMF conditions a relationship for the mass-transfer can be described in the general formSh=f(Tam,Sc). The results of experiments suggest that the Sherwood number, the magnetic Taylor number and the Schmidt number may be defined as follows (see Eqs 53-56)

Sh=[(βi)V]0dp2ρ0Di0Sh=([βi]śr[Fm]śrVl)dp2ρlDilE83
Sci=νDi0Sci=νlDilE84
Tam=Ha2RemTam=(σe0B02l02νρ0)(w0Dν)Tam=(σel([BTRMF]avg)2D2νlρl)(ωTRMFD2νl)Tam=ωTRMF([BTRMF]avg)2D4σelνl2ρlE85

The TRMF Reynolds number (Rem=ωTRMFD2νl)with ωTRMF=2πfTRMFas angular frequency of TRMF equal to angular field frequency of the field generated by the a current of frequency. The product ωTRMFDplays the role of a rotational velocity. The above dimensionless groups (Eqs 83-85) were calculated with the physical properties in the temperature range 20-60oC (the liquid temperature).

The effect of dissolution process under the action of TRF can be described by using the variable ShSc0.33proportional to the terma(Tam)b. The experimental results obtained in this work are graphically illustrated in log(ShSc0.33)versus log(a(Tam)b)in figure 3. Moreover, the influence of the temperature gradient between the surface temperature of solid and the liquid temperature on the mass transfer coefficient is presented in this figure.

In order to establish the effect of all important parameters on the dissolution process in the analyzed set-up, we propose the following relationship to work out the experimental database

ShSc0.33=a(Tam)bE86

The presented results in figure 3 suggest that these points may be described by a unique monotonic function. The constants and exponents are computed by employing the Matlab software and the principle of least squares and the proposed relationships are collected in table 1.

Figure 4 shows the effect of the constant temperature of the surface of rock-salt sample and the variation of the liquid temperature on the Sherwood number.

Table 1.

The developed relationships for the obtained experimental data

Figure 3.

The graphical presentation of mass transfer data under the action of TRMF: a) T s = var ; T l = 20 o C , b) T s = var ; T l = 40 o C and c) T s = var ; T l = 60 o C

Figure 4.

The comparison of obtained results: : a) T s = 65 o C ; T l = var , b) T s = 70 o C ; T l = var and c) T s = 80 o C ; T l = var

Figures 3 and 4 present a graphical form of the collected relations in table 1, as the full curves, correlated the experimental data very well with the percentage relative error±10%. Figure 5 gives an overview results in the form of the proposed analytical relationships for the experimental investigations (see table 1)

Figure 5.

Dependence between experimental and predicted ( S h S c 0.33 ) values

As can be clearly seen (see Figure 3) mass transfer rates expressed as (ShSc0.33)increase with increasing the values of magnetic Taylor number. It is found that as the intensity of magnetic field increases, the velocity of liquid inside the cylindrical container increases. It may be concluded that the TRMF strongly influenced on the mass transfer process. It should be noticed that this process may be improved by means of the gradient temperature between the surface of rock-salt sample and the liquid. Figure 3 shows that Sherwood number increases with the increasing difference between the temperature of rock-salt surface and the liquid temperature. It is clear that the effect of TRMF on the dissolution process is also depended on the temperature gradient.

Comparison of the obtained results for the analyzed process is graphically presented in figure 4. This figure shows that for the given temperature of surface of rock-salt sample the mass transfer coefficients in tested set-up are strongly depended on the values of magnetic Taylor number. These plots also confirm that the gradient temperature has significant effect on the mass transfer process. Initially, the high mass transfer rates is achieved by the liquid temperature 40oC and 60oC. Further increase of the magnetic field intensity leads to even higher mass transfer rates for the liquid temperature is equal to 20oC. It should be noticed that the NaCl-cylinder was placed in the middle of container. When the TRMF rotated slowly the liquid was mixed near the wall of cylindrical container. When the TRMF rotated faster, the resulting liquid movement directly leads to an increase of the mass and heat transfer coefficients. This difference appears to be linked to the increase in the difference between the surface temperature of rock-salt sample and the liquid temperature associated with increasing the influence of TRMF. The high value of the exponents of magnetic Taylor number and the multiplicative coefficients seen in the relations given in table 1 agree with the existence of more intensive flow near the hot surface of the rock-salt sample promoted by the increase of the magnetic induction and the temperature of the cartridge heater.

Figure 6.

The graphical presentation of mass and heat transfer data at TRMF

The enhancement due to heat transfer process is modeled in terms given in Eq.(70). The graphical presentation of the calculated experimental points is presented in figure 6.

The constant a4and exponent b4in Eq.(70) are computed by using the principle of least square. Applying the software Matlab the analytical relationship may be obtained

ShNu=1.5(Tam)0.12Le0.33E87

where the ratio of the dimensionless Sherwood and Nusselt numbers is function of the adequate dimensionless groups. The fit of experimental data with Eq.(87) is given in figure 7. The averaged absolute relative error was estimated at 2.12%.

Figure 7.

Comparison of model prediction (Eq.(87)) with experimental data

Figure 6 shows that the ratio of mass and heat transfer coefficients (via ratio of Sherwood and Nusselt numbers) increases with the magnetic Taylor number. This figure shows a strong increase in mass transfer process when the TRMF is applied. It was found that the intensification of this process is depended on the temperature gradient between the temperature of surface of salt-rock sample and the liquid temperature.

In order to evaluate the influence of the gradient temperature on the mass transfer under the action of TRMF, the comparison between the obtained database and the empirical correlation for the dissolution process under the TRMF is presented. For comparison these results with literature, it is recommended to correlate them under analogous form. The dissolution process under the action of TRMF is correlated by means of the equation [22]

Sh=2+22.5{Tam}x0.015Sc0.33(xD)0.33E88

Taking into account that the dimensionless location of a NaCl-cylindrical sample (xD)is equal to 0.125 (the sample was located in the middle of cylindrical container) and the local Taylor number ({Tam}x)is treated as the magnetic Taylor number(Tam), the Eq.(88) may be rewritten in the following form

Sh=2+11.3{Tam}x0.015Sc0.33ShI=2+11.3(Tam)0.015Sc0.33E89

As a matter of fact, Eq.(70) may be written by alternate equations as follows

ShII=1.5(Tam)0.12Le0.33NuE90

The comparison in this case may be realized by considering the calculated averaged values of the dimensionless Schmidt([Sc]avg=477), Lewis ([Le]avg=74)and Nusselt ([Nu]avg=102)numbers. For established averaged values of these dimensionless groups the Eqs (89-90) reduce to

ShI=2+86.5(Tam)0.015E91
ShII=616.3(Tam)0.12E92

The graphical comparison between Eq.(91) and Eq.(92) are illustrated in the plot in figure 8. This figure demonstrates that the dimensionless Sherwood number for the analyzed case (ShII)increases with increasing the magnetic Taylor number. It was found that as the intensity of TRMF increases, the influence of hydrodynamic conditions on the transport processes inside the cylindrical container increases. The obtained relationship (Eqs (91-92)) indicate that the transfer rates increase with Taylor number for case I ShI~(Tam)0.015and case IIShII~(Tam)0.12. The mass transfer data obtained for the additional transfer gradient is consequently higher than the data obtained for the mass transfer under the action of TRMF.

It can be observed that the enhancement of the mass transfer coefficients due to temperature gradient may be evaluated by applying the ratio(ShIIShI). In the present study (ShIIShI)becomes

(ShIIShI)=616.3(Tam)0.122+86.5(Tam)0.015(ShIIShI)5(Tam)0.105E93

Figure 9 shows the obtained relation (see Eq.(93)) as the function of the magnetic Taylor number. It was found that as the intensity of TRMF has strong influence on the mass transfer rate. It is interesting to note that the enhancement of this process in the case of upper values of the magnetic Taylor number is increased for the supported process by using the cartrige heater.

Figure 8.

Comparison of obtained results ( S h I I ) with literature data ( S h I )

Figure 9.

Graphical presentation of Eq.(93)

5. Conclusion

The present experimental study shows interestingfeatures cocncerning the effects of transverse rotating magnetic field (TRMF) on the mass transfer process. Inspecting the obtained measuremenst reveals the following conclusions:

  1. The study of mass transfer process under the action of TRMF results is significant enhancement of the solid dissolution rate per localization of a NaCl-cylindrical sample. The mass transfer rate increases with an increase of a magnetic field level. It was found that the TRMF strongly influcnecd the mass transfer process.

  2. It should be noticed that the novel approach to the mixing process presented and based on the application of TRMF to produce better hydrodynamic conditions in the case of the mass-transfer process. From practical point of view, the dissolution process of solid body is involved by using the turbulently agitated systems. In previous publications are not available data describing the mass-transfer operations of the dissolution process under the TRMF conditions and the temperature gradient. Moreover, the influence of the additional indirect heating on the mass-transfer was determined.

  3. With the respect to the other very useful mass transfer equations given in the pertinent literature, the theoretical description of problem and the equations predicted in the present article is much more attractive because it generalizes the experimental data taking into consideration the various parameters, which defined the hydrodynamic state and the intensity of magnetic effects in the tested system (see chapter 2.2).

  4. On the basis of the experimental investigations, the results were successfully correlated by using the general relationship [74]. The influence of the TRMF and the temperature gradient on this process may be also described using the non-dimensional parameters formulated on the base of fluid mechanics equations. These dimensionless numbers allow quantitative representation and characterization of the influence of hydrodynamic state under the TRMF conditions on the mass-transfer process. The dimensionless groups are used to establish the effect of TRMF on this operation in the form of the novel type dimensionless correlation [87].

  5. In order to evaluate the influence of the gradient temperature on the mass transfer under the action of TRMF, the comparison between the obtained database and the empirical correlation for the dissolution process under the TRMF is presented. This coparsion is presented as the specific relation [93]. It can be observed that the enhancement of the mass transfer coefficients due to temperature has strong influence on the mass transfer rate (see Fig.8).

6. Nomenclature

B¯magnetic inductionkgA1s2
ciconcentrationkgikg1
cpspecific heat capacity of liquidJkg1deg1
dssample diameterm
Ddiameter of containerm
Didiffusion coefficientm2s1
Dmmagnetic diffusionm2s1
E¯electric fieldVm1
fTRMFfrequency of electrical current (equal to frequency of TRMF)s1
Fmcylindrical surface of dissoluble samplem2
Fem¯Lorenz magnetic forceN
hslength of samplem
lcharacteristic dimensionm
J¯electrical current density vectorAm2
Ji¯flux density of component ikgim3s1
Jdyf¯diffusion flux densitykgim3s1
kprelative coefficient of barodiffusionkgim2kg1N1(kgims2kg2)
kprelative coefficient of thermodiffusionkgikg1deg1
kFem¯relative coefficient of diffusion resulting from additional forced interactions (e.g. magnetic field)kgim1N1(kgis2m2kg1)
mimass of dissoluble NaCl samplekgNaCl
phydrodynamic pressureNm2
Qlheat flow from liquidW
Qsheat flow from sampleW
Sshielding parameter-
Ttemperaturedeg
[Tl]t1temperature of liquid at momentt1deg
[Tl]t2temperature of liquid at momentt2(after time of dissolution process)deg
Tstemperature of sampledeg
Vvolume of liquidm3
w¯velocityms1
wi¯velocity of component ims1
xdistance (for localization of sample)m

Table 2.

αsheat transfer coefficientWm2deg1
βimass transfer coefficientkgim2s1
δskin depth-
ηdynamic viscositykgm1s1
μmmagnetic permeabilitykgmA2s2
λthermal conductivity of liquidWm1deg1
νkinematic viscositym2s1
νmmagnetic viscositym2s1
ρdensitykgm3
ρiconcentration of component ikgim3
σeelectrical conductivityA2s3kg1m3
τtime dissolution or times
Φimass flux of component ikgim3s1
ωTRMFangular velocity of transverse rotating magnetic fieldrads1

Greek letters

avgaveraged value
lliquid
ssample
0reference value

Subscripts

ACalternating current
MFmagnetic field
TRMFtransverse rotating magnetic field

Abbreviation

Ha=B0l0σe0νρ0Hartman number
Le=aDiLewis number
Nu=[αs]avgDλNusselt number
Pei=l0w0Di0mass Peclet number
Prm=ννm0magnetic Prandtl number
Q=σe0B02l02νρ0Chandrasekhar number
Re=w0DνReynols number
S=τ0w0l0Strouhal number
Sci=νDi0Schmidt number
Sh=[(βi)V]0dp2ρ0Di0Sherwood number

Dimensionless numbers

Acknowledgments

This work was supported by the Polish Ministry of Science and Higher Education from sources for science in the years 2012-2013 under Inventus Plus project

© 2013 The Author(s). Licensee IntechOpen. This chapter is distributed under the terms of the Creative Commons Attribution 3.0 License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited.

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Rafał Rakoczy, Marian Kordas and Stanisław Masiuk (July 24th 2013). Study of Effect of Temperature Radient on Solid Dissolution Process Under Action of Transverse Rotating Magnetic Field, Mass Transfer - Advances in Sustainable Energy and Environment Oriented Numerical Modeling, Hironori Nakajima, IntechOpen, DOI: 10.5772/51296. Available from:

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