Changes in src/sas/sasgui/perspectives/calculator/media/sas_calculator_help.rst [1b67f3e:55abe4f] in sasview
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src/sas/sasgui/perspectives/calculator/media/sas_calculator_help.rst
r1b67f3e r55abe4f 88 88 89 89 Now let us assume that the angles of the $\vec Q$ vector and the spin-axis ($x'$) 90 to the $x$-axis are $\phi$ and $\theta_\ text{up}$ respectively (see above). Then,90 to the $x$-axis are $\phi$ and $\theta_\mathrm{up}$ respectively (see above). Then, 91 91 depending upon the polarization (spin) state of neutrons, the scattering 92 92 length densities, including the nuclear scattering length density ($\beta_N$) … … 107 107 .. math:: 108 108 109 M_{\perp x'} &= M_{0q_x}\cos\theta_\ text{up} + M_{0q_y}\sin\theta_\text{up} \\110 M_{\perp y'} &= M_{0q_y}\cos\theta_\ text{up} - M_{0q_x}\sin\theta_\text{up} \\109 M_{\perp x'} &= M_{0q_x}\cos\theta_\mathrm{up} + M_{0q_y}\sin\theta_\mathrm{up} \\ 110 M_{\perp y'} &= M_{0q_y}\cos\theta_\mathrm{up} - M_{0q_x}\sin\theta_\mathrm{up} \\ 111 111 M_{\perp z'} &= M_{0z} \\ 112 112 M_{0q_x} &= (M_{0x}\cos\phi - M_{0y}\sin\phi)\cos\phi \\
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