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15.6: Problems

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    141708

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    1. Estimate the ratio of collisional ionization to photoionization for hydrogen from the ground state, and compare it to the ratio from the second level. Assume the pressure is 300 bars. Obtain the physical constants you may need from the literature, but give the appropriate references.
    2. Calculate the Doppler-broadened angle-averaged redistribution function for Hummer's case I, but assuming a Rayleigh phase function [i.e., find <R(x,x')>I,B] and compare it to <R(x,x')>I,A and the result for electron scattering.
    3. Show that \[J\left(\tau_x\right)=\frac{1}{2} \int_0^{\infty} S_{\ell}(t) E_1\left|\int_{\tau_x}^t \phi_x\left(t^{\prime}\right) d t^{\prime}\right| \phi_x d t\nonumber\] is indeed a solution \[\mu \frac{d I_x}{d \tau_x}=\phi_x\left(I_x-S_{\ell}\right)\nonumber\] and obtain an integral equation for \(\boldsymbol{S_l}\).
    4. Describe the mechanisms which determine the \(\text{Ly}\alpha\) profile in the sun. Be specific about the relative importance of these mechanisms and the parts of the profile that they affect.
    5. Given a line profile of the form \[\phi_x\left(\tau_x\right)= \begin{cases}0 & \text { for }|x|>x_0 \\ 1 & \text { for }|x| \leq x_0\end{cases}\nonumber\] find \(\boldsymbol{S_l}\). Assume complete redistribution of the line radiation. State what further assumptions you may need; indicate your method of solution and your reasons for choosing it.
    6. Show explicitly how equation (15.2.21) is obtained.
    7. Show how equation (15.3.25) is implied by equation (15.3.15).
    8. How does equation (15.3.27) follow from equation (15.3.26).
    9. Derive equations (15.3.28) and (15.3.29).
    10. Use equation (15.3.30) to obtain the angle-averaged form of <RIV,A(x',x)>.
    11. Show explicitly how equations (15.3.40) and (15.3.41) are obtained.

    This page titled 15.6: Problems is shared under a Public Domain license and was authored, remixed, and/or curated by George W. Collins II (Pachart Foundation) via source content that was edited to the style and standards of the LibreTexts platform.