5.7: Problems

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Page ID: 141628

George W. Collins II
Ohio State University via Pachart Foundation

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Find the fraction by mass and radius inside of which 20 percent, 50 percent, and 99 percent of the sun's energy is generated. Compare the results with a star of the same chemical composition but with 10 times the mass.
Determine the mass for which stars with the chemical composition of the sun derive equal amounts of energy from the CNO and p-p Cycles.
Determine the relative importance of free-free and bound-free absorption and electron scattering as opacity sources in the sun.
Calculate the evolutionary tracks for a 1M_⊙ star and 10M_⊙ star.
Choose a representative set of models from the evolutionary calculations in Problem 4, (a) Calculate the moment of inertia, gravitational and internal energies of the core and envelope, and the total energy of the star (b) Determine the extent to which the conditions in Section 5.5a are met during the evolution of the star.
Compute the Henyey track for a 1M_⊙ star, and compare it with that of a polytrope of index n = 3. Would you recommend that the comparison be made with a polytrope of some different index? If so, why?
Compute the evolutionary track for the sun from early on the Hayashi track as far as you can. At what point do you feel the models no longer represent the actual future of the sun, and why?
Discuss the evolution of a 5M_⊙ star as it leaves the main sequence. Detail specifically the conditions that exist immediately before and after the onset of hydrogen-shell burning.
Consider a star composed of an isothermal helium core and a convective hydrogen envelope. Suppose that the mass in the core remains constant with time but that the core contracts. By constructing a model of appropriate polytropes, show what happens to the envelope and comment on the external appearance of the star.

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