Ions. In the influence of body forces, the fundamental equations for
Ions. In the influence of physique forces, the basic equations for immiscible and irrotational flows are as follows [40]: u v + = 0, (1) + = 0, x y 2 2 0 1 two u + [( – 1 – ) – ( – ) – g – ( -) – – ( – )( N – N + = – u + vsin2 two u – B0 sin2 u)(1g- T )(1 – C )( – ) C – C (g )( -)] -) – u – c u2 , F 2u + (T p N m x y = y2 k k (two) two – , 2 c p p T T k 2 T D u 2 B0 T C T two u +v2 =) two + + + DB two + T sin2 u2 , two two x y ( py p y T y 0 c2 y c c y c p p 2 (3) ( +) = + [ + ]+ + sin , two 2 m1 D T 2 T C – Ea C 2 C T u D2 + two C +v = B two – k2 (1 – C – exp , ) two ( -y ) r exp , + =x 2y + ( y – ) T T k0 T (four) 2 0 N N bW 2 C 2 N u +v + C= 2 , N = Dm two , + + (five) x y ( -) (Cw – C ) y y y(1)(2)(three)(four) (5)Figure 1. Schematic flow diagram. 1. Schematic flow diagram. FigureThe following will be the corresponding boundary The following would be the corresponding boundary situations: circumstances: = = , = 0, = = 0 + 1 , = = 0 + 1 , } (6) = Uw = , T T = u = = dx, v = 0, = =w0, T0 + b1 x, C = Cw = C0 + d1 x, 0+ 1 (six) N = = N+ e 2 at 0, = = 0 + 2 ,= Nw = 0 0 + 1 x,, y = 0, } (7) = = 0 + two , as . u 0, T conductivities of C fluid; the inclination angle where , will be the electrical and thermal = T = T0 + b2 x,the= C = C0 + d2 x, (7) from the magnetic field is ; gravitationalN = N = N0 +;2theas y . field intensity is acceleration is e x, magnetic 0 ; the volume expansion coefficient is and thermal would be the velocityof the fluid; the inclination angle where , k would be the electrical ; and conductivities elements for the and directions, successively; the densities of nanofluid, nanoparticles,magnetic field intensity is with the magnetic field is ; gravitational acceleration is g; the and microorganism’s particles, respectively, are , coefficient istheu and v are the velocity elements for the x temperature is represented by , B0 ; the volume expansion , and ; ; the concentration of nanoparticles is ; the the densities of nanofluid, nanoparticles, and GNF6702 Autophagy microorganand y directions, successively; concentration of microorganisms is indicated by ; and also the reference temperature, concentration of nanoparticles, and concentration of by T, the ism’s particles, respectively, are , p , and m ; the temperature is represented microorganisms are 0 , 0 , and 0 , respectively. The power-law index is represented by is indicated by concentration of nanoparticles is C; the concentration of microorganisms ; is definitely the timeN; and the will be the kinematic viscosity; is the temperature; , , and YC-001 Endogenous Metabolite continuous; reference temperature, concentration of nanoparticles, and concentration of microorganisms are T0 , C0 , and N0 , respectively. The power-law index is represented by g; could be the time continual; is the kinematic viscosity; T is the temperature; Tw , C, and C are the concentration susceptibility; DB and DT describe the Brownian diffusion coefficientMathematics 2021, 9,five ofand the thermophoresis diffusion coefficient, respectively; c p represents the distinct heat; will be the inclination angle; Fc indicates the Forchheimer coefficient; kr will be the chemical reaction ratio; Ea indicates the activation power; k0 is the Boltzmann continuous; and b1 , c1 , d1 , and e1 would be the dimensionless constants. The following similarity transformations are employed for further mathematical formulation:= x dF , = =C -C Cw -C0 , =N – N Nw – N0 ,dy, =u = Uw F , v = – Uw F ,T – T Tw – T0 ,(eight)The.