The Effect of Packaging Shape on the Distribution of Electric and Magnetic Fields and SAR Induced in 3D Models of Water Containers ()
1. Introduction
Over the last few decades, mobile communication devices have completely changed the way we connect with our community. It is no exaggeration to say that modern civilization thrives on our ability to communicate easily using the Internet and mobile devices. However, most of our communication techniques use radio frequency (RF), exposing every biological and nonbiological entity to RF electromagnetic radiation from cellular towers and mobile devices. In fact, we are exposed to electromagnetic radiation at every possible frequency. For example, WI-LAN technology on the Internet and home or office networks use microwaves in the range of 2 - 4 GHz. Bluetooth technology connects our devices, and Wi-Fi technology allows us to remain connected over longer distances. We also use WiMAX technology to communicate over very long distances, ranging from 10 - 20 kilometers [1] . With increasingly demand for communication, we are progressively installing more and more base stations throughout the world.
Recently, some studies have highlighted the health hazards caused by electromagnetic fields (EMs). These health issues have concerned many professionals and the health-conscious public. This concern spurred many researchers to study the effects of electromagnetic fields on biological materials, particularly the absorption rate of electromagnetic radiation when a human body or other biological objects are exposed to such radiation [2] - [14] . Finite element method FEM and finite-difference time-domain FDTD numerical techniques were also used in many studies to investigate the effect of exposure of food and food packages to electromagnetic field in the microwave frequency range [15] - [20] . The exposure of biological materials to radio waves induces internal electric and magnetic fields, which can be solved using Maxwell’s equations for given boundary conditions [21] . It has been observed that EM fields lead to a rise in temperature because biological materials exposed to electromagnetic radiation absorb significant amounts of energy. The term “Specific Absorption Rate” (SAR) is used to define this rate of energy absorption in biological objects. Government regulations and radiation exposure guidelines use the SAR to define safe limits of exposure to high-frequency EM fields for occupational workers as well as the general public. Specific absorption rate has been standardized as watts per kilogram [22] . However, the guidelines and regulations mainly revolve around the thermal effects of microwave radiation. There is sufficient evidence to prove that non-thermal effects also deteriorate our health and well-being; unfortunately, current regulations are not effective enough to prevent non-thermal health hazards of electromagnetic radiation [23] . Numerous dosimetric studies have intensively used numerical SAR calculations to evaluate the effects of exposure to EM radiations from communication towers and other mobile devices on human tissues [24] [25] . A study on EM radiations and its effects on water has also been conducted [26] . All these studies provide valuable information about the thermal effects of electromagnetic radiation, demonstrating how rises in temperature through electromagnetic radiation affect our tissues and other biological materials.
Over the last few decades, a number of studies were carried out to understand the effects of energy fields reinforced inside pyramidal and other geometrical shapes [27] - [37] . Influenced by this shape-effect phenomenon, one study used flux gate magnetometer measurements to demonstrate that pyramidal-shaped structures made of fiberglass actually induce magnetic fields [35] . A special sensor was developed by an electronic engineer to measure the energy that flows from the pyramidal structure [35] . It was observed that the reinforced energy fields within the pyramidal structure provide several benefits: changes in the pH value of stored materials, increased moisture loss of biological samples, and almost three times quicker decomposition ratio of H2O2 or aqueous hydrogen peroxide [34] . A recent study demonstrated that in comparison to other control samples, pyramidal structures can be more effective in controlling growth of microorganisms in milk [30] . Another study demonstrated the role of pyramidal-shaped packages in improving the quality of packaged water through chang- ing the water structure by forming filament-shaped crystals. This study demonstrated that pyramidal-shaped packages significantly reduce solid substrate-bound crystals and prevent scale formation so that water quality gradually improves [28] .
To analyze the effect of shape and dimension on the distribution of electric and magnetic fields and specific absorption rate SAR, a recent study used different shapes of human head models―such as flat, spherical, and ellipsoidal―to evaluate the changes in specific absorption rate induced by the different shapes of human heads [38] . The study confirmed that the shapes of our heads significantly affect the amount of energy absorbed from the environmentally abundant electromagnetic radiation at 900 MHz frequency.
The main aim of this study is to find out how different geometrical shapes influence the distribution of electric and magnetic fields and the resulting specific absorption rate SAR of water that is sorted in pyramidal-, rectangular-, spherical-, and square-shaped packaging containers exposed to the environmentally abundant electromagnetic radiation, using both FEM and FDTD simulation methods. The specific objective was to simulate EM waves at 300, 900, and 2400 MHz irradiated from occupational wireless communications to monitor the distribution of electric (E) and magnetic (H) fields and then record the specific absorption rate induced in water stored in different geometric-shaped containers.
2. Methods
2.1. Experimental Setup
Two evaluate the effects of four different shapes of packaging containers on the distribution of electric and magnetic fields in stored water and associated SARs. FEKO 6.3 was used to model four containers and simulate electromagnetic radiation at 300 and 900 MHz frequencies. The 3D models were exported from FEKO software and imported in XFDTD 7 software to simulate the EM field at 2400 MHz. The 3D models were standing in a free space. The electric and magnetic fields and SAR of four container models was estimated at frequencies of 300, 900, and 2400 MHz using plane wave excitation with 1 V/m magnitude.
2.2. SAR Calculation
SAR provides a measure of electromagnetic radiation that is absorbed by any biological object. It has become a crucial dosimetric variable for evaluating the effects of electromagnetic radiation from a wide range of frequencies, 100 KHz to 10 GHz. SAR can be calculated in the following manner [39] :
(1)
σ = electric conductivity of biological object in S/m;
ρ = mass density in kg/m3;
E = root-mean-square (rms) magnitude of the electric field strength in V/m.
The database of dielectrics from FEKO 6.3 and XFDTD7 libraries served as the main sources of reference.
3. Modeling
In this study, the FEKO 6.3 software―based on FEM [40] ―was used to construct 3D models of pyramidal-, rectangular-, spherical-, and square-shaped containers with nearly the same volume, all 100% filled with water (Figures 1(a)-(d)). Each modeled container consisted of three parts: 1) polymethylemetacrylate or PMMA with 3 mm thickness serving as the external layer, 2) high-density polyethylene or HDPE with 0.02 mm thickness as the internal layer, and 3) water as the inner medium. The dimensions of the four containers are described in Table 1. The various software configuration parameters―such as the electrical properties of Water, HDPE and PMMA used for simulation―are described in Table 2. The conductivity and dielectric constant of external and internal layers reflect their capacitance and energy storage capabilities [40] . To simulate the electromagnetic radiation in the modern living environment, a broad range of frequencies (ranging from 300 MHz - 2.4 GHz) were simulated. The configuration of the computer for conducting simulation consisted of a dual-core 2.9 GHz processor with 8 GB RAM. However, the maximum possible configuration parameters of the system served as the maximum limits of upper frequency ranges. FEKO simulated frequencies up to 900 MHz, and then the FEKO 3D models exported and imported to XFDTD software to simulate the frequency ranges of 2.4 GHz. Electromagnetic radiation contains both electric and magnetic fields that oscillate in a fixed relationship, perpendicular to each other and perpendicular to the direction of energy and propagation of waves. Having different dimensions, the four containers influence electromagnetic waves in an entirely different manner, inducing changes in electric and magnetic fields inside and around the containers. The simulation was carried out to determine various study parameters (e.g., electric and magnetic fields distribution, and maximum SAR values) to compare the results from the four container models and analyze the results in light of other scientific studies.
3.1. FEKO Model
Based on the FEM method, FEKO provides better results for electrically large and dielectric bodies. The vo-
Table 1. Dimensions of spherical-shaped, pyramid-shaped, square-shaped, and rectangular-shaped containers.
lume-meshing technique of FEM uses tetrahedral elements for meshing arbitrarily shaped heterogeneous volumes with extreme accuracy. The standard mesh was applied for 300 MHz frequency, and the custom mesh with 6.405 tetrahedral edge length was applied for 900 MHz. The simulation was carried out using linear plane wave excitation and the finite element method (FEM). To excite the surface of the four containers from one side, a single incident wave with magnitude of 1 V/m and 45˚ angle was generated at frequencies of 300 and 900 MHz. Near-field calculations were performed to analyze the distribution of electric (E) and magnetic (H) fields
Table 2. Electrical properties of PMMA, HDPE, and water.
aPolymethyl methacrylate (PMMA); bHigh-density polyethylene (HDPE).
within the four containers. In addition, maximum SAR were calculated to measure the amount of energy or electromagnetic radiation absorbed by the water stored in the four containers. Thus, FEKO simulation allowed the study of E, H, and SAR distribution up to 900 MHz; to study the E, H and SAR distribution for higher frequency ranges of 2400 MHz, another simulation using XFDTD 7 software was conducted.
3.2. XFDTD Model
The XFDTD7 software package is very useful for studying three-dimensional finite difference time domains [41] . Based on the FDTD method, this package provides full-wave time-domain solutions for Maxwell’s equations. This robust technique is known for its accuracy. Features such as graphical user interface and automatic calculation of E, H and SAR distributions make it a versatile simulation software. It can simulate physical structures under observation by using a mesh of cells; this is the key feature of this FDTD-based model. The entire process involved four basic steps: 1) importing the 3D geometry, 2) creating the mesh, 3) defining the parameters, and 4) running the process for final results. In this study, XFDTD 7 software was used to simulate and obtain E, H and SAR distributions from higher frequency electromagnetic radiations up to 2400 MHz.
4. Results and Discussion
Using FEM with standard mesh at 300 MHz and coarse mesh at 900 MHz, the distribution of the electric, magnetic, and SAR of the four container models is presented in Figures 2(a)-(c), Figures 3(a)-(c), Figures 4(a)-(c), Figures 5(a)-(c), Figures 6(a)-(c), Figures 7(a)-(c), Figures 8(a)-(c) and Figures 9(a)-(c).
Significant variations in the electric field of the four containers was observed during the study: The electric field induced in water stored inside the pyramidal-shaped package reached the highest levels (25 and 15.75 V/m) at 300 and 900 MHz respectively (Figure 2(a) and Figure 3(a)), followed by the rectangular-shaped container with 4.5 and 1.5 V/m at 300 and 900 MHz, respectively (Figure 4(a) and Figure 5(a)), then the spherical- shaped container with 3 and 1.8 V/m at 300 and 900 MHz, respectively (Figure 8(a) and Figure 9(a)), and the square-shaped container with 2 and 1.75 V/m at 300 and 900 MHz, respectively (Figure 6(a) and Figure 7(a)). Although the peak level of the magnetic field induced in water stored inside the rectangular-shaped container model reached 25 mA/m at 300 MHz (Figure 4(b)) compared to 20 mA/m in both pyramidal-shaped and squa- re-shaped container models (Figure 2(b) and Figure 6(b)), the pyramidal-shaped and spherical-shaped container models produced the highest magnetic field of 18 and 25 mA/m at 900 MHz , respectively (Figure 3(b) and Figure 9(b)), compared to 12.5 and 16.5 mA/m (Figure 5(b) and Figure 7(b)) for rectangular-shaped and square-shaped container models, respectively.
The maximum SARs in water were identical: 90 µW/kg at 900 MHz for pyramidal-shaped, rectangular-shap- ed, and square-shaped container models (Figure 3(c), Figure 5(c), and Figure 7(c)). Although the maximum
(a)(b) (c)
Figure 2. (a) Electric field distribution of xy surface of water stored inside pyramid-shaped container at 300 MHz; (b) Magnetic field distribution of xy surface of water stored inside pyramid-shaped container at 300 MHz; (c) Maximum SAR distribution of xy surface of water stored inside pyramid-shaped container at 300 MHz.
SARs reached 175 and 225 µW/kg in the rectangular-shaped and spherical-shaped containers at 300 MHz and 900 MHz, respectively (Figure 4(c) and Figure 9(c)), the maximum SAR was 54 µW/kg in spherical-shaped container (Figure 8(c)) at 300 MHz and it was identical 60 µW/kg in the pyramidal-shaped and square-shaped container models at 300 MHz (Figure 2(c) and Figure 6(c)).
Using FDTD at 2400 MHz, the distribution of the electric fields, magnetic fields, and SAR of the four container models are presented in Figures 10(a)-(c), Figures 11(a)-(c), Figures 12(a)-(c) and Figures 13(a)-(c). Considerable variations in the electric and magnetic fields of the four container models were observed at 2400 MHz frequency. The electric field induced in the water stored in the pyramidal-shaped container model again
(a)(b) (c)
Figure 3. (a) Electric field distribution of xy surface of water stored inside pyramid-shaped container at 900 MHz; (b) Magnetic field distribution of xy surface of water stored inside pyramid-shaped container at 900 MHz; (c) Maximum SAR distribution of xy surface of water stored inside pyramid-shaped container at 900 MHz.
reached the highest levels of 12.782 V/m (Figure 10(a)), followed by the square-shaped model with 10.907 V/m (Figure 12(a)), the rectangular-shaped container model with 10.625 V/m (Figure 11(a)), and then the spherical- shaped container model with 0.81867 V/m (Figure 13(a)). Regarding magnetic fields, the square-shaped container model topped with a magnetic field of 0.25624 A/m (Figure 12(b)), followed by the rectangular-shaped container model with 0.25485 A/m (Figure 11(b)), and the pyramidal-shaped container model with 0.078444 A/m (Figure 10(b)), the lowest level was the spherical-shaped container model with 0.0069309 A/m (Figure 13(b)). In the same trend, the maximum SAR 0.071744 W/kg was observed in the square-shaped container model (Figure 12(c)), while the rectangular-, pyramidal-, spherical-shaped container models followed with 0.070817, 0.0052121 and 5.959e−05 W/kg, respectively, as shown in (Figure 11(c), Figure 10(c) and Figure 13(c)). According to both the FEM and FDTD simulation techniques results, the pyramidal-shaped container model showed the highest peak level of electric fields at 300, 900, and 2400 MHz. Due to dimensional differ-
(a)(b) (c)
Figure 4. (a) Electric field distribution of xy surface of water stored inside rectangular-shaped container at 300 MHz; (b) Magnetic field distribution of xy surface of water stored inside rectangular-shaped container at 300 MHz; (c) Maximum SAR distribution of xy surface of water stored inside rectangular-shaped container at 300 MHz.
ences, each container might exerted a different impact on the propagation of the electromagnetic waves and thus affect the distribution of the electric and magnetic fields inside and around the containers. The slope angle of the pyramid-shaped container might affected the propagation of the electromagnetic waves, which result in an increase in the electric and magnetic fields. To rule out any inconsistencies, all the variables and configuration parameters―such as PMMA, HDPE, and water materials and their dielectric constants, dielectric loss tangent, thickness of PMMA and HDPE layers―were kept identical in all four container models. This study successfully demonstrated that shape and dimensions of packaging containers significantly influence the distribution of
(a)(b)(c)
Figure 5. (a) Electric field distribution of xy surface of water stored inside rectangular-shaped container at 900 MHz; (b) Magnetic field distribution of xy surface of water stored inside rectangular-shaped container at 900 MHz; (c) Maximum SAR distribution of xy surface of water stored inside rectangular-shaped container at 900 MHz.
(a)(b)(c)
Figure 6. (a) Electric field distribution of xy surface of water stored inside square-shaped container at 300 MHz; (b) Magnetic field distribution of xy surface of water stored inside square-shaped container at 300 MHz; (c) Maximum SAR distribution of xy surface of water stored inside square-shaped container at 300 MHz.
(a)(b)(c)
Figure 7. (a) Electric field distribution of xy surface of water stored inside square-shaped container at 900 MHz; (b) Magnetic field distribution of xy surface of water stored inside square-shaped container at 900 MH; (c) Maximum SAR distribution of xy surface of water stored inside square-shaped container at 900 MHz.
Figure 8. (a) Electric field distribution of PhiTheta-surface of water stored inside spherical-shaped container at 300 MHz; (b) Magnetic field distribution of PhiTheta-surface of water stored inside spherical-shaped container at 300 MHz; (c) Maximum SAR distribution of RPhi-surface of water stored inside spherical-shaped container at 300 MHz.
Figure 9. (a) Electric field distribution of PhiTheta-surface of water stored inside spherical-shaped container at 900 MHz; (b) Magnetic field distribution of PhiTheta-surface of water stored inside spherical-shaped container at 900 MHz; (c) Maximum SAR distribution of PhiTheta-surface of water stored inside spherical-shaped container at 900 MHz.
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Figure 10. (a) Electric field distribution of yz surface of water stored inside pyramid-shaped container at 2400 MHz; (b) Magnetic field distribution of yz surface of water stored inside pyramid-shaped container at 2400 MHz; (c) Maximum SAR distribution of xz surface of water stored inside pyramid-shaped container at 2400 MHz.
(a)(b)(c)
Figure 11. (a) Electric field distribution of yz surface of water stored inside rectangular-shaped container at 2400 MHz; (b) Magnetic field distribution of yz surface of water stored inside rectangular-shaped container at 2400 MHz; (c) Maximum SAR distribution of yz surface of water stored inside rectangular-shaped container at 2400 MHz.
(a)(b)(c)
Figure 12. (a) Electric field distribution of yz surface of water stored inside square-shaped container at 2400 MHz; (b) Magnetic field distribution of yz surface of water stored inside square-shaped container at 2400 MHz; (c) Maximum SAR distribution of yz surface of water stored inside square-shaped container at 2400 MHz.
(a)(b)(c)
Figure 13. (a) Electric field distribution of yz surface of water stored inside spherical-shaped container at 2400 MHz; (b) Magnetic field distribution of yz surface of water stored inside spherical-shaped container at 2400 MHz; (c) Maximum SAR distribution of yz surface of water stored inside square-shaped container at 2400 MHz.
electric and magnetic fields. The reduction of pH, crystallization of mineral content of water, and prevention of microorganism growth associated with pyramidal-shaped containers observed during previous studies might have resulted from variations in the distribution of electric and magnetic fields, as well as the resulting increase of SAR.
This study provides several benefits: First, it will foster development of innovative packaging techniques by improving our understanding about the role packaging shape and dimension of materials play in enhancing absorption of energy from environmentally abundant electromagnetic fields. The relationship between the shape and dimension of packaging materials and the distribution of electric and magnetic fields, and the resulting SAR of stored materials will provide the groundwork for researchers to evaluate the effect of packaging shape on food and nutrition, cosmetics, pharmaceuticals, and other biological and nonbiological materials.
5. Conclusion
This research was carried out to evaluate the role of shape and dimensions of packaging materials in influencing the distribution of electric and magnetic fields and the resulting SAR induced in water caused by environmentally abundant electromagnetic radiation at 300, 900, and 2400 MHz. The study established that pyramidal- shaped containers induce the highest levels of electric fields in stored water. In terms of influencing the distribution of electric fields, rectangular- and square-shaped container models retained the second and third positions, respectively. It can be concluded that that the shape and dimensions of packaging containers significantly influence the distribution of electric and magnetic fields caused by environmentally abundant electromagnetic radiation at 300, 900, and 2400 MHz; further studies should be conducted to evaluate how specific shapes or dimensions can affect distribution of electric and magnetic fields and resulting SAR by using different packaging materials in the EM simulation.
Acknowledgements
The authors would like to thank lectures, colleague and friends for giving valuable advices. We also wish to acknowledge Remcom Inc., USA for the trial license of XFDTD7 and for technical support.