🍳Separation Processes Unit 3 – Mass Transfer and Diffusion

Mass transfer and diffusion are fundamental concepts in separation processes. These principles govern the movement of substances between regions of different concentrations, playing a crucial role in various industrial applications like absorption, distillation, and extraction. Understanding mass transfer mechanisms, including Fick's laws and diffusion coefficients, is essential for engineers. This knowledge enables the design and optimization of separation equipment, considering factors like steady-state and unsteady-state diffusion, convective mass transfer, and interphase interactions.

Study Guides for Unit 3

3.1

Principles of mass transfer

2 min read

3.2

Fick's laws of diffusion

3 min read

3.3

Convective mass transfer and mass transfer coefficients

2 min read

3.4

Interphase mass transfer and overall mass transfer coefficients

2 min read

Fundamentals of Mass Transfer

Mass transfer involves the movement of a substance from a region of higher concentration to a region of lower concentration
Occurs due to a concentration gradient, which is the driving force for mass transfer
Can happen in various systems, including gas-liquid, liquid-liquid, and solid-liquid interfaces
Plays a crucial role in separation processes, such as absorption, adsorption, and extraction
Influenced by factors like temperature, pressure, and the properties of the substances involved
Requires an understanding of the thermodynamic and kinetic aspects of the system
Governed by the principles of conservation of mass and energy

Diffusion Mechanisms and Fick's Laws

Diffusion is the spontaneous movement of molecules from a region of higher concentration to a region of lower concentration
Fick's first law describes the steady-state diffusion flux ( $J$ $J$ ) as proportional to the concentration gradient ( $\frac{dC}{dx}$ $\frac{d C}{d x}$ ): $J = -D \frac{dC}{dx}$ $J = - D \frac{d C}{d x}$
- $D$ is the diffusion coefficient, which depends on the properties of the diffusing species and the medium
Fick's second law describes the change in concentration over time ( $\frac{\partial C}{\partial t}$ ) due to diffusion: $\frac{\partial C}{\partial t} = D \frac{\partial^2 C}{\partial x^2}$
Molecular diffusion occurs due to the random motion of molecules (Brownian motion)
Eddy diffusion occurs in turbulent flows and enhances the mixing of substances
Effective diffusion coefficient ( $D_{eff}$ ) accounts for the combined effects of molecular and eddy diffusion
Diffusion in porous media is influenced by factors like porosity, tortuosity, and pore size distribution

Steady-State and Unsteady-State Diffusion

Steady-state diffusion occurs when the concentration profile does not change with time ( $\frac{\partial C}{\partial t} = 0$ $\frac{\partial C}{\partial t} = 0$ )
- Concentration gradient remains constant
- Flux is uniform throughout the system
Unsteady-state diffusion occurs when the concentration profile changes with time ( $\frac{\partial C}{\partial t} \neq 0$ $\frac{\partial C}{\partial t} \neq = 0$ )
- Concentration gradient varies with position and time
- Flux is non-uniform and changes with time
Analytical solutions for unsteady-state diffusion can be obtained using Fick's second law and appropriate boundary conditions
Numerical methods (finite difference, finite element) are often used to solve complex unsteady-state diffusion problems
Quasi-steady-state approximation assumes that the concentration profile adjusts quickly to changes in boundary conditions
Transient diffusion is important in processes like adsorption, drying, and membrane separation

Mass Transfer Coefficients

Mass transfer coefficient ( $k$ ) relates the mass transfer rate to the concentration driving force
Depends on the geometry of the system, fluid properties, and flow conditions
Can be determined experimentally or estimated using empirical correlations
Overall mass transfer coefficient ( $K$ $K$ ) accounts for the resistances in both phases (gas and liquid, or liquid and solid)
- Calculated using the resistance-in-series model: $\frac{1}{K} = \frac{1}{k_1} + \frac{1}{k_2}$
Dimensionless numbers (Sherwood, Schmidt, Reynolds) are used to correlate mass transfer coefficients
Analogous to heat transfer coefficients in heat transfer processes
Higher mass transfer coefficients indicate faster mass transfer rates

Convective Mass Transfer

Convective mass transfer involves the transport of a substance due to the bulk motion of a fluid
Can be either natural convection (driven by density differences) or forced convection (driven by external forces)
Characterized by the Sherwood number ( $Sh$ $S h$ ), which relates the convective mass transfer to the diffusive mass transfer
- $Sh = \frac{k L}{D}$ , where $L$ is a characteristic length and $D$ is the diffusion coefficient
Correlations for the Sherwood number are available for various geometries and flow conditions (laminar flow, turbulent flow)
Boundary layer theory is used to analyze convective mass transfer in external flows
Penetration theory and surface renewal theory are used to model convective mass transfer in gas-liquid systems
Convective mass transfer is enhanced by factors like turbulence, surface roughness, and high fluid velocities

Interphase Mass Transfer

Interphase mass transfer occurs between two immiscible phases (gas-liquid, liquid-liquid, or gas-solid)
Governed by the equilibrium distribution of the transferring component between the phases
Equilibrium distribution is described by partition coefficients or solubility data
Mass transfer rate is determined by the concentration driving force and the mass transfer coefficients in each phase
Two-film theory assumes that the resistance to mass transfer is concentrated in thin films near the interface
Penetration theory considers the unsteady-state diffusion of the transferring component into the bulk phases
Danckwerts' surface renewal theory assumes that the interface is continuously replaced by fresh fluid elements
Interphase mass transfer is crucial in separation processes like absorption, stripping, and extraction

Mass Transfer Equipment and Operations

Various types of equipment are used to facilitate mass transfer in separation processes
Packed columns contain a bed of packing material (random or structured) to provide a large interfacial area for mass transfer
- Used in absorption, stripping, and distillation processes
Tray columns use a series of perforated trays to create stages for mass transfer
- Commonly used in distillation and extraction processes
Falling film contactors employ a thin film of liquid flowing over a surface to enhance gas-liquid mass transfer
Spray columns disperse one phase into droplets or a spray to increase the interfacial area
Membrane contactors use a permeable membrane to separate the phases and facilitate selective mass transfer
Design of mass transfer equipment involves considerations like capacity, efficiency, pressure drop, and material compatibility

Applications in Separation Processes

Mass transfer principles are applied in various separation processes to purify or recover valuable components
Absorption involves the transfer of a solute from a gas phase to a liquid phase (CO2 capture, gas sweetening)
Stripping is the reverse of absorption, where a solute is transferred from a liquid phase to a gas phase (air stripping, steam stripping)
Distillation separates components based on their relative volatilities, using vaporization and condensation (petroleum refining, alcohol production)
Liquid-liquid extraction transfers a solute between two immiscible liquid phases (metal extraction, pharmaceutical purification)
Adsorption involves the selective binding of a solute onto a solid surface (water treatment, gas purification)
Ion exchange uses solid resins to exchange ions between a liquid and a solid phase (water softening, chemical purification)
Membrane separation processes (reverse osmosis, ultrafiltration, pervaporation) rely on selective mass transfer through a membrane