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| | & \begin{align} | | & \begin{align} |
| − | = \,\, & |T_i T_f|^2 | F_{+1} |^2 && + T_i^2 T_f R_f F_{+1}F_{-2} \\ | + | = \,\, & |T_i T_f|^2 | F_{+1} |^2 && + T_i^2 T_f R_f F_{+1}F_{-2}^* \\ |
| − | & && + T_i R_i T_f^2 F_{+1}F_{+2} + T_i R_i T_f R_f F_{+1} F_{-1} \\ | + | & && + T_i R_i T_f^2 F_{+1}F_{+2}^* + T_i R_i T_f R_f F_{+1} F_{-1}^* \\ |
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| − | & + |T_i R_f|^2 | F_{-2} |^2 && + T_i^2T_fR_f F_{+1} F_{-2} \\ | + | & + |T_i R_f|^2 | F_{-2} |^2 && + T_i^2T_fR_f F_{+1}^* F_{-2} \\ |
| − | & && + T_i R_i T_f R_f F_{+2}F_{-2} + T_i R_i R_f^2 F_{-1} F_{-2} \\ | + | & && + T_i R_i T_f R_f F_{+2}^*F_{-2} + T_i R_i R_f^2 F_{-1}^* F_{-2} \\ |
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| − | & + |R_i T_f|^2 | F_{+2} |^2 && + T_i R_i T_f^2 F_{+1} F_{+2} \\ | + | & + |R_i T_f|^2 | F_{+2} |^2 && + T_i R_i T_f^2 F_{+1}^* F_{+2} \\ |
| − | & && + T_i R_i T_f R_f F_{+2}F_{-2} + R_i^2 T_f R_f F_{-1} F_{+2} \\ | + | & && + T_i R_i T_f R_f F_{+2}^*F_{-2} + R_i^2 T_f R_f F_{-1}^* F_{+2} \\ |
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| − | & + |R_i R_f|^2 | F_{-1} |^2 && + T_i R_i T_f R_f F_{+1} F_{-1} \\ | + | & + |R_i R_f|^2 | F_{-1} |^2 && + T_i R_i T_f R_f F_{+1}^* F_{-1} \\ |
| − | & && + T_i R_i R_f^2 F_{-1}F_{-2} + R_i^2 T_f R_f F_{-1} F_{+2} \\ | + | & && + T_i R_i R_f^2 F_{-1}F_{-2}^* + R_i^2 T_f R_f F_{-1} F_{+2}^* \\ |
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| | \end{align} \\ | | \end{align} \\ |
DWBA Equation in thin film
Using the notation 
for compactness, the DWBA equation inside a thin film can be written:
Expansion (incorrect)
WARNING: This incorrectly ignores the complex components.
Terms
If one expands the 
of the DWBA, one obtains 16 terms:
Equation
The equation can thus be expanded as:
Simplification
We can rearrange to:
![{\displaystyle {\begin{aligned}I_{d}(q_{z})=\,\,&T_{i}^{2}T_{f}^{2}|F(+Q_{z1})|^{2}+T_{i}^{2}R_{f}^{2}|F(-Q_{z2})|^{2}+R_{i}^{2}T_{f}^{2}|F(+Q_{z2})|^{2}+R_{i}^{2}R_{f}^{2}|F(-Q_{z1})|^{2}\\&+T_{i}^{2}T_{f}R_{f}F(+Q_{z1})F(-Q_{z2})\\&+T_{i}R_{i}T_{f}^{2}F(+Q_{z1})F(+Q_{z2})+T_{i}R_{i}T_{f}R_{f}F(+Q_{z1})F(-Q_{z1})\\&+T_{i}^{2}T_{f}R_{f}F(+Q_{z1})F(-Q_{z2})\\&+T_{i}R_{i}T_{f}R_{f}F(+Q_{z2})F(-Q_{z2})+T_{i}R_{i}R_{f}^{2}F(-Q_{z1})F(-Q_{z2})\\&+T_{i}R_{i}T_{f}^{2}F(+Q_{z1})F(+Q_{z2})\\&+T_{i}R_{i}T_{f}R_{f}F(+Q_{z2})F(-Q_{z2})+R_{i}^{2}T_{f}R_{f}F(-Q_{z1})F(+Q_{z2})\\&+T_{i}R_{i}T_{f}R_{f}F(+Q_{z1})F(-Q_{z1})\\&+T_{i}R_{i}R_{f}^{2}F(-Q_{z1})F(-Q_{z2})+R_{i}^{2}T_{f}R_{f}F(-Q_{z1})F(+Q_{z2})\\=\,\,&T_{i}^{2}T_{f}^{2}|F(+Q_{z1})|^{2}+T_{i}^{2}R_{f}^{2}|F(-Q_{z2})|^{2}+R_{i}^{2}T_{f}^{2}|F(+Q_{z2})|^{2}+R_{i}^{2}R_{f}^{2}|F(-Q_{z1})|^{2}\\&+2\times T_{i}^{2}T_{f}R_{f}F(+Q_{z1})F(-Q_{z2})\\&+2\times T_{i}R_{i}T_{f}^{2}F(+Q_{z1})F(+Q_{z2})\\&+2\times T_{i}R_{i}T_{f}R_{f}[F(+Q_{z1})F(-Q_{z1})+F(+Q_{z2})F(-Q_{z2})]\\&+2\times T_{i}R_{i}R_{f}^{2}F(-Q_{z1})F(-Q_{z2})\\&+2\times R_{i}^{2}T_{f}R_{f}xF(-Q_{z1})F(+Q_{z2})\\=\,\,&T_{i}^{2}T_{f}^{2}|F(+Q_{z1})|^{2}+T_{i}^{2}R_{f}^{2}|F(-Q_{z2})|^{2}+R_{i}^{2}T_{f}^{2}|F(+Q_{z2})|^{2}+R_{i}^{2}R_{f}^{2}|F(-Q_{z1})|^{2}\\&+2\times T_{i}^{2}T_{f}R_{f}F(+Q_{z1})F(-Q_{z2})+2\times T_{i}R_{i}T_{f}^{2}F(+Q_{z1})F(+Q_{z2})\\&+2\times T_{i}R_{i}T_{f}R_{f}[F(+Q_{z1})F(-Q_{z1})+F(+Q_{z2})F(-Q_{z2})]\\&+2\times T_{i}R_{i}R_{f}^{2}F(-Q_{z1})F(-Q_{z2})+2\times R_{i}^{2}T_{f}R_{f}xF(-Q_{z1})F(+Q_{z2})\\\end{aligned}}}](https://wikimedia.org/api/rest_v1/media/math/render/svg/255a3de6b04851277911d2d7c5dd1465af49d540)
We can rewrite in a more compact form using the notation and 
:
![{\displaystyle {\begin{aligned}I_{d}(q_{z})=\,\,&T_{i}^{2}T_{f}^{2}|F_{+1}|^{2}+T_{i}^{2}R_{f}^{2}|F_{-2}|^{2}+R_{i}^{2}T_{f}^{2}|F_{+2}|^{2}+R_{i}^{2}R_{f}^{2}|F_{-1}|^{2}\\&+2\times T_{i}^{2}T_{f}R_{f}F_{+1}F_{-2}+2\times T_{i}R_{i}T_{f}^{2}F_{+1}F_{+2}\\&+2\times T_{i}R_{i}T_{f}R_{f}[F_{+1}F_{-1}+F_{+2}F_{-2}]\\&+2\times T_{i}R_{i}R_{f}^{2}F_{-1}F_{-2}+2\times R_{i}^{2}T_{f}R_{f}F_{-1}F_{+2}\end{aligned}}}](https://wikimedia.org/api/rest_v1/media/math/render/svg/938b875c2cb46e82376844f6bf35b4f58fcbca4d)
Expansion
Terms
If one expands the of the DWBA, one obtains 16 terms:
Equation
We take advantage of a more compact form using the notation and . The DWBA equation can thus be expanded as:
Breaking into components
The experimental data 
can be broken into contributions from the transmitted channel 
and reflected channel 
:
![{\displaystyle {\begin{aligned}I_{d}(q_{z})&=[|T_{i}T_{f}|^{2}+|R_{i}R_{f}|^{2}]I_{Tc}(q_{z})+[|T_{i}R_{f}|^{2}+|R_{i}T_{f}|^{2}]I_{Rc}(q_{z})\\&=|Tc|^{2}I_{Tc}(q_{z})+|Rc|^{2}I_{Rc}(q_{z})\\\end{aligned}}}](https://wikimedia.org/api/rest_v1/media/math/render/svg/8c2d5532dbb74ec0e8cd553301b2fc65f628122c)
We define the ratio between the channels to be:
Such that one can compute the two components from:
and:
