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| q & = \frac{4 \pi}{\lambda} \sin \left( \theta_s \right) \\ | | q & = \frac{4 \pi}{\lambda} \sin \left( \theta_s \right) \\ |
| & = \pm \frac{4 \pi}{\lambda} \sqrt{ \frac{1-\cos 2\theta_s }{2} } \\ | | & = \pm \frac{4 \pi}{\lambda} \sqrt{ \frac{1-\cos 2\theta_s }{2} } \\ |
− | & = \frac{4 \pi}{\lambda} \sqrt{ \frac{1}{2}\left(1 - \frac{d}{\sqrt{d^2+x^2+z^2}} \right) } | + | & = \frac{4 \pi}{\lambda} \sqrt{ \frac{1}{2}\left(1 - \frac{d}{\sqrt{d^2+x^2+z^2}} \right) } \\ |
| + | & = \sqrt{2} \frac{2 \pi}{\lambda} \sqrt{ 1 - \frac{d}{\sqrt{x^2+d^2+z^2}} } |
| \end{alignat} | | \end{alignat} |
| </math> | | </math> |
Revision as of 11:42, 13 January 2016
In transmission-SAXS (TSAXS), the x-ray beam hits the sample at normal incidence, and passes directly through without refraction. TSAXS is normally considered in terms of the one-dimensional momentum transfer (q); however the full 3D form of the q-vector is necessary when considering scattering from anisotropic materials. The q-vector in fact has three components:
This vector is always on the surface of the Ewald sphere. Consider that the x-ray beam points along +y, so that on the detector, the horizontal is x, and the vertical is z. We assume that the x-ray beam hits the flat 2D area detector at 90° at detector (pixel) position . The scattering angles are then:
where is the sample-detector distance, is the out-of-plane component (angle w.r.t. to y-axis, rotation about x-axis), and is the in-plane component (rotation about z-axis). The alternate angle, , is the elevation angle in the plane defined by .
Total scattering
The full scattering angle is defined by a right-triangle with base d and height :
The total momentum transfer is:
Given that:
We can also write:
Where we take for granted that q must be positive.
In-plane only
If (and ), then , , and:
The other component can be thought of in terms of the sides of a right-triangle with angle :
Summarizing:
Out-of-plane only
If , then , , and:
The components are:
Summarizing:
Components
For arbitrary 3D scattering vectors, the momentum transfer components are:
In vector form:
Total magnitude
Note that this provides a simple expression for q total:
Check
As a check of these results, consider:
And: