Features of microorganism and two-phase nanofluid in a tangent hyperbolic Darcy-Forchhiemer flow induced by a stretching sheet with Lorentz forces

IF 1.7 4区 综合性期刊 Q2 MULTIDISCIPLINARY SCIENCES
M. Faizan Ahmed , Farhan Ali , Syed Sohaib Zafar , Umair Khan , Yalcin Yilmaz , Nermeen Abdullah , Samia Elattar , Aurang Zaib , Ahmed M. Galal
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引用次数: 0

Abstract

This work examines the two-dimensional tangent hyperbolic flow over a stretching sheet with a uniform magnetic field. The Buongiorno model is utilized to analyze and explain the spread of uneven coefficients in the presence of gyrotactic microorganisms. The concept of microorganisms and the resulting bioconvection enhance the stability of the nanoparticles. The impacts of thermal radiation, heat sources, convective heating, and chemical reactions are also evaluated. The suggested mathematical problem results in a nonlinear set of partial differential equations (PDEs), which are subsequently reduced to ordinary differential equations (ODEs) by applying the appropriate transformation. The resultant highly nonlinear ordinary differential equations (ODEs) are numerically solved using MATLAB's built-in package known as bvp4c. An in-depth investigation into the changes in the velocity field, the temperature profile, the concentration of nanoparticles profile, and the motile density profile is analyzed through graphs against various influencing parameters. Additionally, computations of engineering interest quantities such as skin friction, local Nusselt number, local Sherwood number, and molecular density are presented in both graphical and tabular formats for further examination. It has been explored that with greater values of the Weissenberg number, the fluid velocity upsurges when n<1, whereas the opposite behavior is noticed when n>1. It is also noted that an increment in the Peclet number decreases motile density for both dilatants n>1 and pseudoplastic n<1 fluids. The computed results are compared with existing literature in limiting cases and found good agreement.
微生物和两相纳米流体在具有洛伦兹力的拉伸片材诱导的切线双曲达西-福尔希默流中的特征
这项研究探讨了均匀磁场下拉伸片上的二维切线双曲流动。利用 Buongiorno 模型分析和解释了陀螺接触微生物存在时不均匀系数的扩散。微生物的概念和由此产生的生物对流增强了纳米粒子的稳定性。此外,还评估了热辐射、热源、对流加热和化学反应的影响。所提出的数学问题产生了一组非线性偏微分方程 (PDE),随后通过应用适当的变换将其简化为常微分方程 (ODE)。由此产生的高度非线性常微分方程(ODEs)使用 MATLAB 内置的 bvp4c 软件包进行数值求解。通过与各种影响参数相对应的图表,对速度场、温度曲线、纳米颗粒浓度曲线和运动密度曲线的变化进行了深入研究分析。此外,还以图形和表格的形式展示了工程相关量的计算结果,如表皮摩擦、局部努塞尔特数、局部舍伍德数和分子密度,以供进一步研究。研究还发现,随着韦森伯格数值的增大,当 n<1 时流体速度会上升,而当 n>1 时则相反。计算结果与现有文献中的极限情况进行了比较,发现两者吻合得很好。
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来源期刊
自引率
5.90%
发文量
130
审稿时长
16 weeks
期刊介绍: Journal of Radiation Research and Applied Sciences provides a high quality medium for the publication of substantial, original and scientific and technological papers on the development and applications of nuclear, radiation and isotopes in biology, medicine, drugs, biochemistry, microbiology, agriculture, entomology, food technology, chemistry, physics, solid states, engineering, environmental and applied sciences.
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