Infinite thickness is a term used to describe the minimum thickness a sample must be in order to absorb all the x-rays of the primary x-ray beam emitted from an XRF instrument and emit the characteristic signal from the sample.
- Penetration Depth – how deep the primary X-ray radiation into the sample?
- Escape Depth (Analysis Layer) – how deep the fluorescence (secondary) radiation can be detected from?
Usually we can assume that once we exceed the penetration Depth for our sample that we also have exceeded the escape depth. The Escape depth controls the analyzed layer.
Often, people who encounter XRF methodology and data analysis for the first time are confused by this term, because it makes no sense for something to be “infinitely thick” when taken literally. To get a better understanding of infinite thickness, think of it as a sample that is thicker than the distance that the primary x-ray emission (penetrating) and returning x-ray energies (escaping) can travel through, or at least as thick as the x-rays from your instrument can “penetrate or see.” In other words, a sample is considered infinitely thick for a specific fluorescence energy when it is thick enough to absorb all fluorescence of atoms deep inside the sample:
Infinite thickness will be different for every material, and it can be calculated. The more dense the sample, the less thickness it takes to achieve the x-ray fluorescence definition of infinite thickness. For example, infinite thickness in metal may be only a few microns, while infinite thickness in a polymer may be multiple millimeters. In order to obtain accurate quantitative measurements from any given sample, infinite thickness—among other requirements—must be met.
Penetration depth for infinite thickness is based on the kV (Tube excitation) settings of your instrument as well as the Tube material (Generally for S1 TITAN and TRACER = Rhodium).
Infinite thickness can be calculated both for individual elements and for compounds. For calculating the infinite thickness of a sample, one needs to know the MAC (mass attenuation coefficient) and density of the sample. For pure element samples, obtaining these two data points is a matter of looking at specialized tables of element density and elemental MACs. For compounds, the situation is significantly more complicated.
How to Calculate Infinite Thickness for XRF Analysis
To calculate the MAC of a compound, one needs to know the elemental MAC of the elements of which the compound consists, the specific energy in question (KeV), and the mass fraction of the various elements of the compound. To calculate the MAC of a compound knowing this information, the formula is:
μ_{s,E}= μ_{i,e}* C_{i}+ μ_{j,e}* C_{j}
Where:
μ_{s,E} =MAC of a compound or a mixture at a specific KeV
μ_{i,e} = MAC of element ‘i’ at a specific KeV
μ_{j,e} = MAC of element ‘j’ at a specific KeV
C_{i} = Concentration of element ‘i’ at a specific energy expressed as weight fraction
C_{j} = Concentration of element ‘j’ at a specific energy expressed as weight fraction
Now, knowing the MAC of the compound in question, one can apply the formula for calculation of infinite thickness. The formula for infinite thickness (t) for any energy in any sample is:
log_{e}[1-l_{t}/l_{∞}]=μ_{s}^{*} * ρ * t
Where μ_{s}^{*} = Total Effective MAC, ρ= density, and t = infinite thickness
At infinite thickness, l_{t}/l_{∞} = 0.99, thus yielding a result:
μ_{s}^{*} * ρ * t_{0.99}=6.91
or
t_{0.99}=6.91/(μ_{s}^{* }* ρ)
Note, there are some interval calculations that need to be done in order to apply these formulas, including sample density ρ and the weight fractions of the various elements in the compound in questions. The necessary information and formulas for such calculations are not specific to XRF and can be found in a variety of textbooks and online sources.