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11.7: Problems

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    141676

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    1. Find the ratio of ionized to neutral hydrogen at τλ (λ = 5000Å) = 1 in (a) the sun, (b) Sirius, and (c) Rigel.
    2. Find the ratio of SiI to SiII to SiIII in η Ursa Majoris.
    3. Consider an atmosphere made up of pure hydrogen that is almost all in a neutral state. The radiation pressure is negligible, and the opacity is due to the H-minus ion.
      1. Determine how the pressure at a given optical depth depends on the surface gravity (i.e., how it would change if g were changed).
      2. Express the pressure as a function of the temperature. Leave the answer in integral form.
      3. How can one find the pressure as a function of physical depth? Display explicitly all equations.
      4. Suppose that the effective temperature is \(T_e\) and that one wants to find the pressure at the point in the atmosphere corresponding to that temperature. Further, suppose that the surface temperature is in error by 10 percent. Estimate the resultant error in \(\mathrm{P}(T_e)\).
    4. Use a model atmosphere code to construct a model as described in Problem 3 (try \(T_e=6000\mathrm{K}\) and \(\log g=3\) and \(\log g=4\)). Compare your results with those of Problem 3.
    5. Consider a gas composed of 60 percent hydrogen and 40 percent helium at 10,000 K in a gravity field where \(\log g=4.5\).
      1. Find the ratio of neutral to ionized hydrogen and the ratio of the three states of ionization for helium.
      2. Find the ratio of the level populations for the first four levels of excitation in neutral hydrogen.
    6. Use a model atmosphere code to find how the state of ionization of hydrogen varies with physical depth in a star with \(T_e=10,000\mathrm{K}\) and \(\log g=4.0\). Repeat the calculation for a star with \(T_e=7000\mathrm{K}\) and \(\log g=1.5\). Compare the two cases.

    This page titled 11.7: 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.