Flow-rate based method for velocity of fully developed laminar flow in tubes

Abstract: This work proposes an explicit method to determine velocity profiles of non-Newtonian fluids flowing in the laminar fully developed regime through a straight tube with a circular cross section. An integral expression for local velocity is derived by introducing the concept of a core-flow rate at a point in the tube as the rate of the partial flow passing through a coaxially centered circular cross section with a radius equal to the radial position of that point. In this approach, the velocity is expressed as t… Show more

“…Here, η 0 and η ∞ are zero and infinite shear viscosity respectively (Meter and Bird, 1964). Although Sochi (Sochi, 2015) and Kim (Kim, 2018) proposed analytical solutions for Carreau and Cross fluid flow through a circular tube and Peralta et al, (Peralta et al, 2014(Peralta et al, , 2017 proposed analytical solution for flow over free-draining vertical plate, the exact analytical solution is absent for estimation of the radial velocity profile, average velocity and volumetric flow rate of fluid flow in a circular tube/micro-capillary obeying Cross, Carreau, Meter, or Steller-Ivako model. The Reynolds number of non-Newtonian fluids in a circular tube/capillary is commonly defined using the viscosity of the fluid at the wall (Escudier et al, 2005;Kim, 2018), the zero-shear viscosity (Ferrás et al, 2020) or Metzner and Reeds equation (Metzner and Reed, 1955). The shear viscosity of non-Newtonian fluids vary along the radial direction in a fully developed circular capillary.…”

Effective viscosity and Reynolds number of non-Newtonian fluids using Meter model

“…Here, η 0 and η ∞ are zero and infinite shear viscosity respectively (Meter and Bird, 1964). Although Sochi (Sochi, 2015) and Kim (Kim, 2018) proposed analytical solutions for Carreau and Cross fluid flow through a circular tube and Peralta et al, (Peralta et al, 2014(Peralta et al, , 2017 proposed analytical solution for flow over free-draining vertical plate, the exact analytical solution is absent for estimation of the radial velocity profile, average velocity and volumetric flow rate of fluid flow in a circular tube/micro-capillary obeying Cross, Carreau, Meter, or Steller-Ivako model. The Reynolds number of non-Newtonian fluids in a circular tube/capillary is commonly defined using the viscosity of the fluid at the wall (Escudier et al, 2005;Kim, 2018), the zero-shear viscosity (Ferrás et al, 2020) or Metzner and Reeds equation (Metzner and Reed, 1955). The shear viscosity of non-Newtonian fluids vary along the radial direction in a fully developed circular capillary.…”

Effective viscosity and Reynolds number of non-Newtonian fluids using Meter model

“…where l T;0 and l T;1 are the low shear rates and high shear rates viscosity plateaus, c T is the consistency and n T is the shearthinning index. This model allows for the development of simple analytical solutions to relate effective viscosity to pressure drop during the flow of a non-Newtonian fluid in a capillary, which is not the case of Carreau fluids despite recent progress [11,15,27,28]. Nonetheless, whereas the truncated power law approximates reasonably well Carreau model under low shear rates, the differences are important at the highest shear rates [3].…”

A pore network modelling approach to investigate the interplay between local and Darcy viscosities during the flow of shear-thinning fluids in porous media

“…The inlet is a fully developed profile with a volumetric flow rate of 5 × 10 −3 m 3 /sec. Velocity is calculated based on the method given by Kim [17].Velocity and temperature profiles are adapted from Wei and Michaeli [5,18,19]. In this method, velocity is given as follows: (9) where:…”

“…In these equations, shear rate and shear stress are substituted by the Carreau-Yasuda viscosity in Equation (8) as mentioned in the study by Kim [17]. Integrations of Equations ( 10) and (11) are solved numerically by the trapezoidal method.…”

Optimization of Polymer Extrusion Die Based on Response Surface Method