8 Quiz

Answer the following questions in order to test your understanding of the key ideas that you have been learning about.

In the following questions you may use the following values of physical constants, as necessary:

Question 1

Which of the following statements about stellar evolution are true?

Answer

The first five statements are all true. The last one is false: high mass stars are much rarer than low mass stars.

Question 2

A stellar core has a density of 3.0 × 10⁷ kg m^-3 and a composition comprising fully ionised helium-4, carbon-12 and oxygen-16 with relative amounts X_He = 0.40, X_C = 0.30 and X_O = 0.30. What is the limiting temperature, below which the electrons in the core would be degenerate?

Answer

Since helium-4, carbon-12 and oxygen-16 all have Y_e = 0.5 electrons per nucleon, the electron number density is simply

equation sequence part 1 n sub e equals part 2 cap y sub e times rho divided by m sub cap h equals part 3 0.5 multiplication 3.0 multiplication 10 super seven times kg m super negative three divided by 1.67 multiplication 10 super negative 27 kg equals part 4 8.98 multiplication 10 super 33 times m super negative three

The limiting temperature below which electrons in the core would be degenerate is

cap t less than h squared times n sub e super two solidus three divided by two times pi times m sub e times k sub cap b

Putting in the numbers gives

cap t less than left parenthesis 6.63 multiplication 10 super negative 34 cap j s right parenthesis squared multiplication left parenthesis 8.98 multiplication 10 super 33 times m super negative three right parenthesis super two solidus three divided by two times pi multiplication 9.11 multiplication 10 super negative 31 kg prefix multiplication of 1.38 multiplication 10 super negative 23 times cap j cap k super negative one

Question 3

Match the following equations of state with the correct dependence on particle number density and temperature.

ultra-relativistic degenerate gas

cap p proportional to n super four solidus three

non-relativistic degenerate gas

cap p proportional to n super five solidus three

ideal gas

cap p proportional to n times cap t

Using the following two lists, match each numbered item with the correct letter.

ultra-relativistic degenerate gas
non-relativistic degenerate gas
ideal gas

The correct answers are:

Answer

The equations of state for degenerate matter do not depend on temperature; they only depend on the particle density to some power. The equation of state for an ideal gas depends on particle density and temperature.

Question 4

A stellar core has a density of 6.9 × 10⁸ kg m^-3 and a composition comprising fully ionised helium-4, carbon-12 and oxygen-16 with relative amounts X_He = 0.70, X_C = 0.15 and X_O = 0.15. What is the Fermi kinetic energy of the electrons as a percentage of the electron rest-mass energy, assuming them to be non-relativistic?

Answer

Since helium-4, carbon-12 and oxygen-16 all have Y_e = 0.5 electrons per nucleon, the electron number density is simply

equation sequence part 1 n sub e equals part 2 cap y sub e times rho divided by m sub cap h equals part 3 0.5 multiplication 6.9 multiplication 10 super eight times kg m super negative three divided by 1.67 multiplication 10 super negative 27 kg equals part 4 2.07 multiplication 10 super 35 times m super negative three

The Fermi kinetic energy can be written as

cap e sub cap f equals left parenthesis three times n sub e divided by eight times pi right parenthesis super two solidus three multiplication h squared divided by two times m sub e

Putting in the numbers gives

cap e sub cap f equals left parenthesis three multiplication 2.07 multiplication 10 super 35 times m super negative three divided by eight times pi right parenthesis super two solidus three multiplication left parenthesis 6.63 multiplication 10 super negative 34 cap j s right parenthesis squared divided by two multiplication 9.11 multiplication 10 super negative 31 kg

Therefore E_F = 2.05 × 10^-14 J which is about 128 keV. Since the rest-mass energy of an electron is 511 keV, this means that E_F is about 25% of the rest mass energy. (So the assumption that the electrons are non-relativistic may not be appropriate.)

Question 5

According to Nauenberg’s formula (Equation 19), what is the radius of a white dwarf (in Earth radii) whose mass is 1.0 M_☉? (The radius of the Earth is R_⊕ = 6370 km.)

Answer

The radius is given by

cap r sub WD almost equals 7.8 multiplication 10 super six m prefix multiplication of left square bracket left parenthesis 1.4 times cap m sub circled dot operator divided by cap m sub WD right parenthesis super two solidus three minus left parenthesis cap m sub WD divided by 1.4 times cap m sub circled dot operator right parenthesis super two solidus three right square bracket super one solidus two full stop

Putting in the numbers gives

cap r sub WD almost equals 7.8 multiplication 10 super six m prefix multiplication of left square bracket left parenthesis 1.4 divided by 1.0 right parenthesis super two solidus three minus left parenthesis 1.0 divided by 1.4 right parenthesis super two solidus three right square bracket super one solidus two full stop

So R_WD = 5.25 × 10⁶ m which is equivalent to 0.82 R_⊕.

Question 6

Match the following compact remnants with the progenitor single star main-sequence mass.

He white dwarf

M _MS = 0.15 M_☉

CO white dwarf

M _MS = 1.5 M_☉

neutron star

M _MS = 15 M_☉

Using the following two lists, match each numbered item with the correct letter.

He white dwarf
CO white dwarf
neutron star

1
M _MS = 0.15 M_☉
2
M _MS = 1.5 M_☉
3
M _MS = 15 M_☉

The correct answers are:

Answer

Main-sequence stars with masses below 0.5 M_☉ will form He white dwarfs, those with masses in the range 0.5–8 M_☉ will form CO white dwarfs, and those with masses in the range 11–16 M_☉ (or possibly up to 25 M_☉) will form neutron stars.

Question 7

The core of a massive star on the verge of collapse has a mass of 1.6 M_☉ and is comprised of 20% helium-4 nuclei and 80% iron-56 nuclei, by mass. Assume (somewhat artificially) that all of the helium in the core undergoes photodisintegration, absorbing 28.3 MeV for each nucleus disintegrated; all of the iron in the core experiences electron capture, releasing a neutrino with energy 10 MeV for each neutronisation.

How much energy in total would be removed from the collapsing core by the combined effects of photodisintegration and neutronisation?

You may assume m_He = 6.6447 × 10^-27 kg and m_Fe = 9.3480 × 10^-26 kg. A nucleus of helium-4 contains two protons and two neutrons; a nucleus of iron-56 contains 26 protons and 30 neutrons.

Answer

First consider the helium nuclei. The number of helium-4 nuclei in the core is

equation sequence part 1 cap n sub He equals part 2 left parenthesis 20 solidus 100 right parenthesis multiplication 1.6 multiplication 1.99 multiplication 10 super 30 kg divided by 6.6447 multiplication 10 super negative 27 kg equals part 3 9.58 multiplication 10 super 55 full stop

The total energy absorbed by the helium-4 nuclei is therefore

cap e sub He equals 9.58 multiplication 10 super 55 multiplication 28.3 MeV prefix multiplication of 1.60 multiplication 10 super negative 13 cap j MeV super negative one equals 4.34 multiplication 10 super 44 cap j

Now consider the iron nuclei. The number of iron-56 nuclei in the core is

equation sequence part 1 cap n sub Fe equals part 2 left parenthesis 80 solidus 100 right parenthesis multiplication 1.6 multiplication 1.99 multiplication 10 super 30 kg divided by 9.3480 multiplication 10 super negative 26 kg equals part 3 2.72 multiplication 10 super 55 full stop

Note that each nucleus will contain 26 protons. Now assuming that each proton is converted into a neutron by electron capture, emitting a neutrino with energy 10 MeV, the energy removed by electron capture is

cap e sub Fe equals 2.72 multiplication 10 super 55 multiplication 26 multiplication 10 MeV prefix multiplication of 1.60 multiplication 10 super negative 13 cap j MeV super negative one equals 1.13 multiplication 10 super 45 cap j

So the total energy removed is E = E_He + E_Fe = 1.6 × 10⁴⁵ J

Question 8

Which of the following statements about white dwarfs and neutron stars are true?

Answer

Only the fourth statement is true. The most massive white dwarfs can be more massive than the least massive neutron stars; white dwarfs are always larger than neutron stars and always less dense too. Neutron stars are supported by neutron degeneracy pressure because neutrons far outnumber protons in their composition. CO white dwarfs are more common than ONeMg white dwarfs because they form from lower mass progenitor stars which are more common than higher mass progenitor stars. The maximum neutron star mass is no more than about 2.5 times the mass of the Sun.

OpenLearn - White dwarfs and neutron stars
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