What is Static Light Scattering?
Static light scattering (SLS) is a technique that leverages high precision photon counting to measure size, molecular weight, and other structural parameters. Common samples include synthetic polymers, nanoparticles, biomolecules, and other macromolecules. SLS makes extensive use of extrapolation, typically with respect to scattering angle, concentration, or in the case of the Zimm Plot, a dual extrapolation.
How is Static Light Scattering Different from Dynamic Light Scattering (DLS)?
Photon Counting vs. Autocorrelation
In both cases, molecules are in motion, but whereas DLS emphasizes rapid fluctuations in intensity due to Brownian motion, SLS emphasizes photon counting such that very accurate measurements of the time-averaged intensity of scattered light are made. While DLS and SLS produce complimentary information, they rely on fundamentally different principles to do so. DLS is fundamentally a measure of motion, or diffusion speed, something that can be related to a hydrodynamic size through the Stokes-Einstein expression which relates the translational diffusion coefficient, DT, to the hydrodynamic diameter, dh. In contrast, SLS is fundamentally a structural technique.
Scattering Angles
Angle dependence is a core feature of static light scattering. The intensity of scattered light can either be plotted as a function of scattering angle, θ, or scattering vector, q. The scattering vector, sometimes referred to as the momentum transfer vector in small-angle scattering literature, is a function of θ, the wavelength of light in a vacuum, λo and the refractive index of the medium, ni.
The form of a particular particle or polymer gives rise to a geometric function describing its shape. This function, sometimes written as P(θ), describes the angle dependence of scattered light. For pure liquids and very small particles, this term appears constant over the typical angular range of a goniometer-based SLS experiment.
Conventional applications of SLS:
The Zimm Plot
The Zimm Plot is one of the best-known models used to fit SLS data and is the canonical method for determining polymer molecular weights. The Zimm Equation requires angle and concentration dependent measurements be made. This data can be acquired using either a goniometer or a MALS instrument. This method must be used for any primary particle large enough to exhibit angle dependence.
The Debye Plot
For smaller particles and for low MW polymers for which there is minimal angle dependence, it is possible to simplify the Zimm Expression such that only a single scattering angle is required. This simplification starts to break down for Rg greater than about 20 nm, and should therefore be used with care.
Zimm Plot of 179K polystyrene in Toluene. Note that extrapolation is done with respect to angle and concentration. Note the Radius of gyration, Rg, obtained is on the order of 15 nm.
Debye Plot of 179K polystyrene in Toluene using only θ = 90 degree data.
Advantages: The Debye plot does not require a multi-angle instrument.
Disadvantages: The approximation becomes increasingly poor as MW or Rg increase.
See also: DLS theory and Principles
Applications: DLSMolecular WeightSLS
Posted on: May 20, 2021
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